{"scales":{"05-19":{"title":"5 out of 19-tET","filename":"05-19.scl","rnbo":[5,252.63158,0,505.26316,0,757.89474,0,1010.52632,0,2,1]},"05-22":{"title":"Pentatonic \"generator\" of 09-22.scl","filename":"05-22.scl","rnbo":[5,272.72727,0,545.45455,0,709.09091,0,981.81818,0,2,1]},"05-24":{"title":"5 out of 24-tET, symmetrical","filename":"05-24.scl","rnbo":[5,100.0,0,550.0,0,650.0,0,1100.0,0,2,1]},"06-41":{"title":"Hexatonic scale in 41-tET, Magic-6","filename":"06-41.scl","rnbo":[6,321.95122,0,380.4878,0,702.43902,0,760.97561,0,1141.46341,0,2,1]},"07-19":{"title":"Nineteen-tone equal major","filename":"07-19.scl","rnbo":[7,189.47368,0,378.94737,0,505.26316,0,694.73684,0,884.21053,0,1073.68421,0,2,1]},"07-31":{"title":"Strange diatonic-like strictly proper scale","filename":"07-31.scl","rnbo":[7,116.12903,0,387.09677,0,425.80645,0,696.77419,0,812.90323,0,1006.45161,0,2,1]},"07-37":{"title":"Miller's Porcupine-7","filename":"07-37.scl","rnbo":[7,162.16216,0,324.32432,0,486.48649,0,648.64865,0,810.81081,0,972.97297,0,2,1]},"08-11":{"title":"8 out of 11-tET","filename":"08-11.scl","rnbo":[8,218.18182,0,327.27273,0,436.36364,0,654.54545,0,763.63636,0,872.72727,0,1090.90909,0,2,1]},"08-13":{"title":"8 out of 13-tET","filename":"08-13.scl","rnbo":[8,92.30769,0,276.92308,0,461.53846,0,553.84615,0,738.46154,0,830.76923,0,1015.38462,0,2,1]},"08-19":{"title":"8 out of 19-tET, Mandelbaum","filename":"08-19.scl","rnbo":[8,126.31579,0,315.78947,0,442.10526,0,568.42105,0,757.89474,0,884.21053,0,1010.52632,0,2,1]},"08-37":{"title":"Miller's Porcupine-8","filename":"08-37.scl","rnbo":[8,162.16216,0,324.32432,0,486.48649,0,648.64865,0,810.81081,0,972.97297,0,1135.13514,0,2,1]},"09-15":{"title":"Charyan scale of Andal, Boudewijn Rempt (1999), 1/1=A","filename":"09-15.scl","rnbo":[9,160.0,0,320.0,0,400.0,0,560.0,0,720.0,0,800.0,0,960.0,0,1120.0,0,2,1]},"09-19":{"title":"9 out of 19-tET, Mandelbaum. Negri[9]","filename":"09-19.scl","rnbo":[9,126.31579,0,252.63158,0,442.10526,0,568.42105,0,694.73684,0,821.05263,0,947.36842,0,1073.68421,0,2,1]},"09-19a":{"title":"Second strictly proper 9 out of 19 scale","filename":"09-19a.scl","rnbo":[9,126.31579,0,315.78947,0,378.94737,0,568.42105,0,694.73684,0,821.05263,0,947.36842,0,1073.68421,0,2,1]},"09-22":{"title":"Trivalent scale in 22-tET, TL 05-12-2000","filename":"09-22.scl","rnbo":[9,109.09091,0,272.72727,0,381.81818,0,545.45455,0,709.09091,0,818.18182,0,981.81818,0,1036.36364,0,2,1]},"09-23":{"title":"9 out of 23-tET, Dan Stearns","filename":"09-23.scl","rnbo":[9,156.52174,0,260.86957,0,417.3913,0,521.73913,0,678.26087,0,782.6087,0,939.13043,0,1043.47826,0,2,1]},"09-29":{"title":"Cycle of g=124.138 in 29-tET (Negri temperament)","filename":"09-29.scl","rnbo":[9,124.13793,0,248.27586,0,372.41379,0,496.55172,0,620.68966,0,744.82759,0,868.96552,0,993.10345,0,2,1]},"09-31":{"title":"Scott Thompson scale 724541125","filename":"09-31.scl","rnbo":[9,270.96774,0,348.3871,0,503.22581,0,696.77419,0,851.6129,0,890.32258,0,929.03226,0,1006.45161,0,2,1]},"10-13-58":{"title":"Single chain pseudo-MOS of major and neutral thirds in 58-tET","filename":"10-13-58.scl","rnbo":[10,186.2069,0,289.65517,0,393.10345,0,537.93103,0,641.37931,0,744.82759,0,931.03448,0,1034.48276,0,1096.55172,0,2,1]},"10-13":{"title":"10 out of 13-tET MOS, Carl Lumma, TL 21-12-1999","filename":"10-13.scl","rnbo":[10,184.61538,0,276.92308,0,369.23077,0,553.84615,0,646.15385,0,738.46154,0,923.07692,0,1015.38462,0,1107.69231,0,2,1]},"10-19":{"title":"10 out of 19-tET, Mandelbaum. Negri[10]","filename":"10-19.scl","rnbo":[10,126.31579,0,252.63158,0,315.78947,0,442.10526,0,568.42105,0,694.73684,0,821.05263,0,947.36842,0,1073.68421,0,2,1]},"10-29":{"title":"10 out of 29-tET, chain of 124.138 cents intervals, Keenan","filename":"10-29.scl","rnbo":[10,124.13793,0,248.27586,0,372.41379,0,455.17241,0,579.31034,0,703.44828,0,827.58621,0,951.72414,0,1075.86207,0,2,1]},"11-18":{"title":"11 out of 18-tET, g=333.33, TL 27-09-2009","filename":"11-18.scl","rnbo":[11,133.33333,0,200.0,0,333.33333,0,466.66667,0,533.33333,0,666.66667,0,800.0,0,866.66667,0,1000.0,0,1133.33333,0,2,1]},"11-19-gould":{"title":"11 out of 19-tET, Mark Gould (2002)","filename":"11-19-gould.scl","rnbo":[11,126.31579,0,252.63158,0,315.78947,0,442.10526,0,568.42105,0,694.73684,0,757.89474,0,884.21053,0,1010.52632,0,1136.84211,0,2,1]},"11-19-krantz":{"title":"11 out of 19-tET, Richard Krantz","filename":"11-19-krantz.scl","rnbo":[11,126.31579,0,252.63158,0,378.94737,0,505.26316,0,631.57895,0,694.73684,0,821.05263,0,884.21053,0,1010.52632,0,1136.84211,0,2,1]},"11-19-mclaren":{"title":"11 out of 19-tET, Brian McLaren. Asc: 311313313 Desc: 313131313","filename":"11-19-mclaren.scl","rnbo":[11,189.47368,0,252.63158,0,315.78947,0,505.26316,0,568.42105,0,631.57895,0,694.73684,0,757.89474,0,947.36842,0,1010.52632,0,2,1]},"11-23":{"title":"11 out of 23-tET, Dan Stearns","filename":"11-23.scl","rnbo":[11,104.34783,0,208.69565,0,313.04348,0,417.3913,0,521.73913,0,678.26087,0,782.6087,0,886.95652,0,991.30435,0,1095.65217,0,2,1]},"11-31":{"title":"Jon Wild, 11 out of 31-tET, g=7/6, TL 9-9-1999","filename":"11-31.scl","rnbo":[11,116.12903,0,232.25806,0,387.09677,0,503.22581,0,541.93548,0,658.06452,0,774.19355,0,929.03226,0,1045.16129,0,1161.29032,0,2,1]},"11-34":{"title":"Erv Wilson, 11 out of 34-tET, chain of minor thirds, Kleismic-11","filename":"11-34.scl","rnbo":[11,70.58824,0,247.05882,0,317.64706,0,494.11765,0,564.70588,0,635.29412,0,811.76471,0,882.35294,0,952.94118,0,1129.41176,0,2,1]},"11-37":{"title":"Jake Freivald, 11 out of 37-tET, g=11/8, TL 22-08-2012","filename":"11-37.scl","rnbo":[11,162.16216,0,259.45946,0,356.75676,0,454.05405,0,551.35135,0,713.51351,0,810.81081,0,908.10811,0,1005.40541,0,1102.7027,0,2,1]},"11-limit-only":{"title":"11-limit-only","filename":"11-limit-only.scl","rnbo":[11,12,11,11,10,11,9,14,11,11,8,16,11,11,7,18,11,20,11,11,6,2,1]},"12-17":{"title":"12 out of 17-tET, chain of fifths","filename":"12-17.scl","rnbo":[12,70.58824,0,141.17647,0,282.35294,0,352.94118,0,494.11765,0,564.70588,0,635.29412,0,776.47059,0,847.05882,0,988.23529,0,1058.82353,0,2,1]},"12-19":{"title":"12 out of 19-tET scale from Mandelbaum's dissertation","filename":"12-19.scl","rnbo":[12,63.15789,0,189.47368,0,252.63158,0,378.94737,0,505.26316,0,568.42105,0,694.73684,0,757.89474,0,884.21053,0,947.36842,0,1073.68421,0,2,1]},"12-22":{"title":"12 out of 22-tET, chain of fifths","filename":"12-22.scl","rnbo":[12,163.63636,0,218.18182,0,381.81818,0,436.36364,0,490.90909,0,654.54545,0,709.09091,0,872.72727,0,927.27273,0,1090.90909,0,1145.45455,0,2,1]},"12-22h":{"title":"Hexachordal 12-tone scale in 22-tET","filename":"12-22h.scl","rnbo":[12,109.09091,0,218.18182,0,327.27273,0,436.36364,0,490.90909,0,600.0,0,709.09091,0,818.18182,0,927.27273,0,1036.36364,0,1145.45455,0,2,1]},"12-27":{"title":"12 out of 27, Herman Miller's Galticeran scale","filename":"12-27.scl","rnbo":[12,133.33333,0,222.22222,0,311.11111,0,400.0,0,533.33333,0,622.22222,0,711.11111,0,800.0,0,933.33333,0,1022.22222,0,1111.11111,0,2,1]},"12-31":{"title":"12 out of 31-tET, meantone Eb-G#","filename":"12-31.scl","rnbo":[12,77.41935,0,193.54839,0,309.67742,0,387.09677,0,503.22581,0,580.64516,0,696.77419,0,774.19355,0,890.32258,0,1006.45161,0,1083.87097,0,2,1]},"12-31_11":{"title":"11-limit 12 out of 31-tET, George Secor","filename":"12-31_11.scl","rnbo":[12,38.70968,0,193.54839,0,270.96774,0,387.09677,0,464.51613,0,541.93548,0,696.77419,0,774.19355,0,890.32258,0,967.74194,0,1083.87097,0,2,1]},"12-43":{"title":"12 out of 43-tET (1/5-comma meantone)","filename":"12-43.scl","rnbo":[12,83.72093,0,195.34884,0,306.97674,0,390.69767,0,502.32558,0,586.04651,0,697.67442,0,781.39535,0,893.02326,0,1004.65116,0,1088.37209,0,2,1]},"12-46":{"title":"12 out of 46-tET, diaschismic","filename":"12-46.scl","rnbo":[12,104.34783,0,208.69565,0,286.95652,0,391.30435,0,495.65217,0,600.0,0,704.34783,0,808.69565,0,886.95652,0,991.30435,0,1095.65217,0,2,1]},"12-46p":{"title":"686/675 comma pump scale in 46-tET","filename":"12-46p.scl","rnbo":[12,130.43478,0,260.86957,0,391.30435,0,443.47826,0,521.73913,0,573.91304,0,704.34783,0,834.78261,0,965.21739,0,1069.56522,0,1095.65217,0,2,1]},"12-50":{"title":"12 out of 50-tET, meantone Eb-G#","filename":"12-50.scl","rnbo":[12,72.0,0,192.0,0,312.0,0,384.0,0,504.0,0,576.0,0,696.0,0,768.0,0,888.0,0,1008.0,0,1080.0,0,2,1]},"12-79mos159et":{"title":"12-tones out of 79 MOS 159ET, Splendid Beat Rates Based on Simple Frequencies version, C=262hz","filename":"12-79mos159et.scl","rnbo":[12,91.68918,0,197.53525,0,302.37506,0,392.9089,0,4,3,589.34246,0,3,2,792.07675,0,897.52405,0,1003.09655,0,1093.54687,0,2,1]},"12-yarman24a":{"title":"12-tones out of Yarman24a, circulating in the style of Rameau's Modified Meantone Temperament","filename":"12-yarman24a.scl","rnbo":[12,84.36,0,192.18,0,292.18,0,5,4,4,3,584.07906,0,696.09,0,788.27,0,888.27,0,16,9,15,8,2,1]},"12-yarman24b":{"title":"12-tones out of Yarman24b, circulating in the style of Rameau's Modified Meantone Temperament","filename":"12-yarman24b.scl","rnbo":[12,84.36,0,192.18,0,292.18,0,5,4,4,3,584.35871,0,696.09,0,788.27,0,888.27,0,16,9,15,8,2,1]},"12-yarman24c":{"title":"12-tones out of Yarman24c, circulating in the style of Rameau's Modified Meantone Temperament","filename":"12-yarman24c.scl","rnbo":[12,85.05893,0,191.77076,0,292.41297,0,156,125,4,3,581.3819,0,695.88538,0,788.73595,0,887.65614,0,16,9,234,125,2,1]},"12-yarman24d":{"title":"12-tones out of Yarman24d, circulating in the style of Rameau's Modified Meantone Temperament","filename":"12-yarman24d.scl","rnbo":[12,83.32982,0,190.84857,0,291.83661,0,381.69714,0,4,3,579.07643,0,695.42429,0,787.58321,0,886.27286,0,16,9,1083.65214,0,2,1]},"13-19":{"title":"13 out of 19-tET, Mandelbaum","filename":"13-19.scl","rnbo":[13,126.31579,0,189.47368,0,315.78947,0,378.94737,0,505.26316,0,568.42105,0,694.73684,0,757.89474,0,884.21053,0,947.36842,0,1073.68421,0,1136.84211,0,2,1]},"13-22":{"title":"13 out of 22-tET, generator = 5","filename":"13-22.scl","rnbo":[13,109.09091,0,218.18182,0,327.27273,0,381.81818,0,490.90909,0,600.0,0,654.54545,0,763.63636,0,872.72727,0,927.27273,0,1036.36364,0,1145.45455,0,2,1]},"13-30t":{"title":"Tritave with 13/10 generator, 91/90 tempered out","filename":"13-30t.scl","rnbo":[13,126.797,0,253.594,0,443.7895,0,570.5865,0,697.3835,0,887.579,0,1014.376,0,1141.173,0,1331.3685,0,1458.1655,0,1584.9625,0,1775.158,0,3,1]},"13-31":{"title":"13 out of 31-tET Hemiwürschmidt[13]","filename":"13-31.scl","rnbo":[13,154.83871,0,193.54839,0,348.3871,0,387.09677,0,541.93548,0,580.64516,0,735.48387,0,774.19355,0,929.03226,0,967.74194,0,1122.58065,0,1161.29032,0,2,1]},"14-19":{"title":"14 out of 19-tET, Mandelbaum","filename":"14-19.scl","rnbo":[14,63.15789,0,189.47368,0,252.63158,0,315.78947,0,442.10526,0,505.26316,0,568.42105,0,694.73684,0,757.89474,0,821.05263,0,947.36842,0,1010.52632,0,1136.84211,0,2,1]},"14-26":{"title":"Two interlaced diatonic in 26-tET, tetrachordal. Paul Erlich (1996)","filename":"14-26.scl","rnbo":[14,92.30769,0,184.61538,0,276.92308,0,369.23077,0,461.53846,0,507.69231,0,600.0,0,692.30769,0,784.61538,0,876.92308,0,969.23077,0,1061.53846,0,1153.84615,0,2,1]},"14-26a":{"title":"Two interlaced diatonic in 26-tET, maximally even. Paul Erlich (1996)","filename":"14-26a.scl","rnbo":[14,92.30769,0,184.61538,0,276.92308,0,369.23077,0,461.53846,0,553.84615,0,600.0,0,692.30769,0,784.61538,0,876.92308,0,969.23077,0,1061.53846,0,1153.84615,0,2,1]},"15-37":{"title":"Miller's Porcupine-15","filename":"15-37.scl","rnbo":[15,97.2973,0,162.16216,0,259.45946,0,324.32432,0,421.62162,0,486.48649,0,583.78378,0,648.64865,0,745.94595,0,810.81081,0,908.10811,0,972.97297,0,1070.27027,0,1135.13514,0,2,1]},"15-46":{"title":"Valentine[15] in 46-et tuning","filename":"15-46.scl","rnbo":[15,78.26087,0,156.521739,0,234.782609,0,313.043478,0,391.304348,0,469.565217,0,547.826087,0,626.086957,0,704.347826,0,782.608696,0,886.956522,0,965.217391,0,1043.478261,0,1121.73913,0,2,1]},"16-139":{"title":"g=9 steps of 139-tET. Gene Ward Smith \"Quartaminorthirds\" 7-limit temperament","filename":"16-139.scl","rnbo":[16,77.69784,0,155.39568,0,233.09353,0,310.79137,0,388.48921,0,466.18705,0,543.88489,0,621.58273,0,699.28058,0,776.97842,0,854.67626,0,932.3741,0,1010.07194,0,1087.76978,0,1165.46763,0,2,1]},"16-145":{"title":"Magic[16] in 145-tET","filename":"16-145.scl","rnbo":[16,148.96552,0,206.89655,0,264.82759,0,322.75862,0,380.68966,0,438.62069,0,587.58621,0,645.51724,0,703.44828,0,761.37931,0,819.31034,0,968.27586,0,1026.2069,0,1084.13793,0,1142.06897,0,2,1]},"16-31":{"title":"Armodue semi-equalizzato","filename":"16-31.scl","rnbo":[16,77.41935,0,154.83871,0,232.25806,0,309.67742,0,387.09677,0,464.51613,0,541.93548,0,619.35484,0,696.77419,0,774.19355,0,851.6129,0,929.03226,0,967.74194,0,1045.16129,0,1122.58065,0,2,1]},"17-31":{"title":"17 out of 31, with split C#/Db, D#/Eb, F#/Gb, G#/Ab and A#/Bb","filename":"17-31.scl","rnbo":[17,77.41935,0,116.12903,0,193.54839,0,270.96774,0,309.67742,0,387.09677,0,503.22581,0,580.64516,0,619.35484,0,696.77419,0,774.19355,0,812.90323,0,890.32258,0,967.74194,0,1006.45161,0,1083.87097,0,2,1]},"17-53":{"title":"17 out of 53-tET, Arabic Pythagorean scale, Safiyuddîn Al-Urmawî (Safi al-Din)","filename":"17-53.scl","rnbo":[17,90.56604,0,181.13208,0,203.77358,0,294.33962,0,384.90566,0,407.54717,0,498.11321,0,588.67925,0,679.24528,0,701.88679,0,792.45283,0,883.01887,0,905.66038,0,996.22642,0,1086.79245,0,1177.35849,0,2,1]},"19-31":{"title":"19 out of 31-tET, meantone Gb-B#","filename":"19-31.scl","rnbo":[19,77.41935,0,116.12903,0,193.54839,0,270.96774,0,309.67742,0,387.09677,0,464.51613,0,503.22581,0,580.64516,0,619.35484,0,696.77419,0,774.19355,0,812.90323,0,890.32258,0,967.74194,0,1006.45161,0,1083.87097,0,1161.29032,0,2,1]},"19-31ji":{"title":"A septimal interpretation of 19 out of 31 tones, after Wilson, XH7+8","filename":"19-31ji.scl","rnbo":[19,25,24,16,15,9,8,7,6,6,5,5,4,9,7,4,3,7,5,10,7,3,2,14,9,8,5,5,3,7,4,16,9,15,8,27,14,2,1]},"19-36":{"title":"19 out of 36-tET, Tomasz Liese, Tuning List, 1997","filename":"19-36.scl","rnbo":[19,66.66667,0,133.33333,0,200.0,0,266.66667,0,333.33333,0,400.0,0,466.66667,0,500.0,0,566.66667,0,633.33333,0,700.0,0,766.66667,0,833.33333,0,900.0,0,966.66667,0,1033.33333,0,1100.0,0,1133.33333,0,2,1]},"19-50":{"title":"19 out of 50-tET, meantone Gb-B#","filename":"19-50.scl","rnbo":[19,72.0,0,120.0,0,192.0,0,264.0,0,312.0,0,384.0,0,456.0,0,504.0,0,576.0,0,624.0,0,696.0,0,768.0,0,816.0,0,888.0,0,960.0,0,1008.0,0,1080.0,0,1152.0,0,2,1]},"19-53":{"title":"19 out of 53-tET, Larry H. Hanson (1978), key 8 is Mason Green's 1953 scale","filename":"19-53.scl","rnbo":[19,67.92453,0,135.84906,0,203.77358,0,249.0566,0,316.98113,0,384.90566,0,452.83019,0,498.11321,0,566.03774,0,633.96226,0,701.88679,0,769.81132,0,815.09434,0,883.01887,0,950.9434,0,1018.86792,0,1086.79245,0,1132.07547,0,2,1]},"19-55":{"title":"19 out of 55-tET, meantone Gb-B#","filename":"19-55.scl","rnbo":[19,87.27273,0,109.09091,0,196.36364,0,283.63636,0,305.45455,0,392.72727,0,480.0,0,501.81818,0,589.09091,0,610.90909,0,698.18182,0,785.45455,0,807.27273,0,894.54545,0,981.81818,0,1003.63636,0,1090.90909,0,1178.18182,0,2,1]},"19-any":{"title":"Two out of 1/7 1/5 1/3 1 3 5 7 CPS","filename":"19-any.scl","rnbo":[19,16,15,35,32,8,7,7,6,6,5,5,4,21,16,4,3,7,5,10,7,3,2,32,21,8,5,5,3,12,7,7,4,64,35,15,8,2,1]},"20-31":{"title":"20 out of 31-tET","filename":"20-31.scl","rnbo":[20,77.41935,0,116.12903,0,193.54839,0,270.96774,0,309.67742,0,387.09677,0,425.80645,0,503.22581,0,580.64516,0,619.35484,0,696.77419,0,735.48387,0,774.19355,0,851.6129,0,890.32258,0,967.74194,0,1006.45161,0,1083.87097,0,1161.29032,0,2,1]},"20-55":{"title":"20 out of 55-tET, J. Chesnut: Mozart's teaching of intonation, JAMS 30/2 (1977)","filename":"20-55.scl","rnbo":[20,87.27273,0,109.09091,0,196.36364,0,218.18182,0,283.63636,0,305.45455,0,392.72727,0,414.54545,0,501.81818,0,589.09091,0,610.90909,0,698.18182,0,785.45455,0,807.27273,0,894.54545,0,916.36364,0,981.81818,0,1003.63636,0,1090.90909,0,2,1]},"21-any":{"title":"2)7 1.3.5.7.9.11.13 21-any, 1.3 tonic","filename":"21-any.scl","rnbo":[21,33,32,13,12,9,8,55,48,7,6,39,32,5,4,21,16,65,48,11,8,35,24,143,96,3,2,77,48,13,8,5,3,7,4,11,6,15,8,91,48,2,1]},"22-100":{"title":"MODMOS with 10 and 12-note chains of fifths by Gene Ward Smith, similar to Pajara","filename":"22-100.scl","rnbo":[22,60.0,0,108.0,0,168.0,0,216.0,0,276.0,0,336.0,0,384.0,0,444.0,0,492.0,0,552.0,0,600.0,0,660.0,0,708.0,0,768.0,0,828.0,0,876.0,0,936.0,0,984.0,0,1044.0,0,1092.0,0,1152.0,0,2,1]},"22-100a":{"title":"Alternative version with 600 cents period","filename":"22-100a.scl","rnbo":[22,60.0,0,108.0,0,168.0,0,216.0,0,276.0,0,324.0,0,384.0,0,432.0,0,492.0,0,540.0,0,600.0,0,660.0,0,708.0,0,768.0,0,816.0,0,876.0,0,924.0,0,984.0,0,1032.0,0,1092.0,0,1140.0,0,2,1]},"22-41":{"title":"22 out of 41 by Stephen Soderberg, TL 17-11-98","filename":"22-41.scl","rnbo":[22,58.53659,0,117.07317,0,175.60976,0,234.14634,0,292.68293,0,351.21951,0,380.4878,0,439.02439,0,497.56098,0,556.09756,0,614.63415,0,673.17073,0,731.70732,0,760.97561,0,819.5122,0,878.04878,0,936.58537,0,995.12195,0,1053.65854,0,1112.19512,0,1170.73171,0,2,1]},"22-46":{"title":"22 shrutis out of 46-tET by Graham Breed","filename":"22-46.scl","rnbo":[22,78.26087,0,104.34783,0,182.6087,0,208.69565,0,286.95652,0,313.04348,0,391.30435,0,417.3913,0,495.65217,0,521.73913,0,600.0,0,626.08696,0,704.34783,0,782.6087,0,808.69565,0,886.95652,0,913.04348,0,991.30435,0,1017.3913,0,1095.65217,0,1121.73913,0,2,1]},"22-53":{"title":"22 shrutis out of 53-tET","filename":"22-53.scl","rnbo":[22,90.56604,0,113.20755,0,181.13208,0,203.77358,0,294.33962,0,316.98113,0,384.90566,0,407.54717,0,498.11321,0,520.75472,0,588.67925,0,611.32075,0,701.88679,0,792.45283,0,815.09434,0,883.01887,0,905.66038,0,996.22642,0,1018.86792,0,1086.79245,0,1109.43396,0,2,1]},"24-60":{"title":"12 and 15-tET mixed. Novaro (1951)","filename":"24-60.scl","rnbo":[24,80.0,0,100.0,0,160.0,0,200.0,0,240.0,0,300.0,0,320.0,0,400.0,0,480.0,0,500.0,0,560.0,0,600.0,0,640.0,0,700.0,0,720.0,0,800.0,0,880.0,0,900.0,0,960.0,0,1000.0,0,1040.0,0,1100.0,0,1120.0,0,2,1]},"24-80":{"title":"Regular 705-cent temperament, 24 of 80-tET","filename":"24-80.scl","rnbo":[24,60.0,0,135.0,0,195.0,0,210.0,0,270.0,0,285.0,0,345.0,0,420.0,0,480.0,0,495.0,0,555.0,0,630.0,0,690.0,0,705.0,0,765.0,0,840.0,0,900.0,0,915.0,0,975.0,0,990.0,0,1050.0,0,1125.0,0,1185.0,0,2,1]},"24-94":{"title":"24 tone schismic temperament in 94-tET, Gene Ward Smith (2002)","filename":"24-94.scl","rnbo":[24,25.53191,0,89.3617,0,114.89362,0,178.7234,0,204.25532,0,293.61702,0,319.14894,0,382.97872,0,408.51064,0,497.87234,0,523.40426,0,587.23404,0,612.76596,0,676.59574,0,702.12766,0,791.48936,0,817.02128,0,880.85106,0,906.38298,0,995.74468,0,1021.2766,0,1085.10638,0,1110.6383,0,2,1]},"28-any":{"title":"6)8 1.3.5.7.9.11.13.15 28-any, only 26 tones","filename":"28-any.scl","rnbo":[26,65,64,15,14,13,12,195,176,65,56,13,11,39,32,5,4,195,154,13,10,65,48,15,11,39,28,13,9,65,44,3,2,65,42,13,8,5,3,195,112,39,22,65,36,13,7,15,8,65,33,2,1]},"30-29-min3":{"title":"30/29 x 29/28 x 28/27 plus 6/5","filename":"30-29-min3.scl","rnbo":[9,30,29,15,14,10,9,4,3,3,2,45,29,45,28,5,3,2,1]},"31-171":{"title":"Tertiaseptal-31 in 171-tET, g=11\\171","filename":"31-171.scl","rnbo":[31,42.10526,0,77.19298,0,119.29825,0,154.38596,0,196.49123,0,231.57895,0,273.68421,0,308.77193,0,350.87719,0,385.96491,0,428.07018,0,463.15789,0,505.26316,0,540.35088,0,582.45614,0,617.54386,0,659.64912,0,701.75439,0,736.84211,0,778.94737,0,814.03509,0,856.14035,0,891.22807,0,933.33333,0,968.42105,0,1010.52632,0,1045.61404,0,1087.7193,0,1122.80702,0,1164.91228,0,2,1]},"46_72":{"title":"46 note subset of 72-tET containing the 17-limit otonalities and utonalities by Rick Tagawa","filename":"46_72.scl","rnbo":[46,100.0,0,116.66667,0,133.33333,0,150.0,0,166.66667,0,183.33333,0,200.0,0,216.66667,0,233.33333,0,250.0,0,266.66667,0,283.33333,0,316.66667,0,350.0,0,383.33333,0,416.66667,0,433.33333,0,500.0,0,533.33333,0,550.0,0,566.66667,0,583.33333,0,600.0,0,616.66667,0,633.33333,0,650.0,0,666.66667,0,700.0,0,766.66667,0,783.33333,0,816.66667,0,850.0,0,883.33333,0,916.66667,0,933.33333,0,950.0,0,966.66667,0,983.33333,0,1000.0,0,1016.66667,0,1033.33333,0,1050.0,0,1066.66667,0,1083.33333,0,1100.0,0,2,1]},"53-commas":{"title":"so-called 1/9 comma division of Turkish Music by equal division of 9/8 into 9 equal string lengths","filename":"53-commas.scl","rnbo":[53,73,72,37,36,25,24,19,18,77,72,13,12,79,72,10,9,9,8,73,64,37,32,75,64,19,16,77,64,39,32,79,64,5,4,81,64,985,768,499,384,337,256,4,3,73,54,37,27,25,18,38,27,77,54,13,9,79,54,40,27,3,2,73,48,37,24,25,16,19,12,77,48,13,8,79,48,5,3,27,16,219,128,111,64,225,128,57,32,231,128,117,64,237,128,15,8,243,128,985,512,499,256,1011,512,2,1]},"56-any":{"title":"3)8 1.3.5.7.9.11.13.15 56-any, 1.3.5 tonic, only 48 notes","filename":"56-any.scl","rnbo":[48,65,64,33,32,1001,960,21,20,13,12,35,32,11,10,143,128,9,8,91,80,7,6,143,120,77,64,39,32,99,80,5,4,77,60,13,10,21,16,429,320,11,8,7,5,45,32,91,64,231,160,117,80,143,96,3,2,91,60,99,64,63,40,77,48,13,8,33,20,27,16,273,160,55,32,7,4,143,80,9,5,117,64,11,6,15,8,91,48,77,40,39,20,63,32,2,1]},"67-135":{"title":"67 out of 135-tET by Ozan Yarman, g=17.7777","filename":"67-135.scl","rnbo":[67,17.77778,0,35.55556,0,53.33333,0,71.11111,0,88.88889,0,106.66667,0,124.44444,0,142.22222,0,160.0,0,177.77778,0,195.55556,0,213.33333,0,231.11111,0,248.88889,0,266.66667,0,284.44444,0,302.22222,0,320.0,0,337.77778,0,355.55556,0,373.33333,0,391.11111,0,408.88889,0,426.66667,0,444.44444,0,462.22222,0,480.0,0,497.77778,0,515.55556,0,533.33333,0,551.11111,0,568.88889,0,586.66667,0,604.44444,0,622.22222,0,640.0,0,657.77778,0,675.55556,0,702.22222,0,720.0,0,737.77778,0,755.55556,0,773.33333,0,791.11111,0,808.88889,0,826.66667,0,844.44444,0,862.22222,0,880.0,0,897.77778,0,915.55556,0,933.33333,0,951.11111,0,968.88889,0,986.66667,0,1004.44444,0,1022.22222,0,1040.0,0,1057.77778,0,1075.55556,0,1093.33333,0,1111.11111,0,1128.88889,0,1146.66667,0,1164.44444,0,1182.22222,0,2,1]},"70-any":{"title":"4)8 1.3.5.7.11.13.17.19 70-any, tonic 1.3.5.7","filename":"70-any.scl","rnbo":[70,323,320,2717,2688,143,140,247,240,3553,3360,17,16,13,12,2431,2240,209,192,4199,3840,11,10,247,224,187,168,221,192,323,280,187,160,19,16,143,120,2717,2240,17,14,209,168,4199,3360,2431,1920,143,112,247,192,13,10,209,160,221,168,3553,2688,187,140,323,240,19,14,11,8,221,160,2717,1920,17,12,323,224,2431,1680,247,168,143,96,209,140,247,160,187,120,4199,2688,11,7,221,140,19,12,3553,2240,2717,1680,13,8,187,112,323,192,17,10,143,84,46189,26880,209,120,247,140,143,80,2431,1344,11,6,221,120,3553,1920,13,7,209,112,4199,2240,19,10,323,168,187,96,221,112,2,1]},"79-159":{"title":"79 out of 159-tET MOS by Ozan Yarman, 79-tone Tuning & Theory For Turkish Maqam Music","filename":"79-159.scl","rnbo":[79,15.09434,0,30.18868,0,45.28302,0,60.37736,0,75.4717,0,90.56604,0,105.66038,0,120.75472,0,135.84906,0,150.9434,0,166.03774,0,181.13208,0,196.22642,0,211.32075,0,226.41509,0,241.50943,0,256.60377,0,271.69811,0,286.79245,0,301.88679,0,316.98113,0,332.07547,0,347.16981,0,362.26415,0,377.35849,0,392.45283,0,407.54717,0,422.64151,0,437.73585,0,452.83019,0,467.92453,0,483.01887,0,498.11321,0,513.20755,0,528.30189,0,543.39623,0,558.49057,0,573.58491,0,588.67925,0,603.77358,0,618.86792,0,633.96226,0,649.0566,0,664.15094,0,679.24528,0,701.88679,0,716.98113,0,732.07547,0,747.16981,0,762.26415,0,777.35849,0,792.45283,0,807.54717,0,822.64151,0,837.73585,0,852.83019,0,867.92453,0,883.01887,0,898.11321,0,913.20755,0,928.30189,0,943.39623,0,958.49057,0,973.58491,0,988.67925,0,1003.77358,0,1018.86792,0,1033.96226,0,1049.0566,0,1064.15094,0,1079.24528,0,1094.33962,0,1109.43396,0,1124.5283,0,1139.62264,0,1154.71698,0,1169.81132,0,1184.90566,0,2,1]},"79-159_arel-ezgi-uzdilek":{"title":"Arel-Ezgi-Uzdilek style of 11 fifths up, 12 down from tone of origin in 79 MOS 159-tET","filename":"79-159_arel-ezgi-uzdilek.scl","rnbo":[24,90.56604,0,120.75472,0,181.13208,0,211.32075,0,301.88679,0,316.98113,0,377.35849,0,407.54717,0,498.11321,0,513.20755,0,588.67925,0,618.86792,0,679.24528,0,701.88679,0,792.45283,0,822.64151,0,883.01887,0,913.20755,0,1003.77358,0,1018.86792,0,1079.24528,0,1109.43396,0,1169.81132,0,2,1]},"79-159_equidistant5ths":{"title":"79 MOS 159-tET equi-distant fifths from pure 3:2 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MOS 159-tET Splendid Beat Rates Based on Simple Frequencies, C=262 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MOS 159tET Splendid Beat Rates Based on Simple Frequencies, C=262 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MOS 159-tET Splendid Beat Rates Based on Simple Frequencies, C=262 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MOS 159tET Splendid Beat Rates Based on Simple Frequencies, C=262 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1991","filename":"ammerbach1.scl","rnbo":[12,89.68501,0,197.91,0,300.135,0,395.82,0,4,3,593.73001,0,3,2,791.64001,0,893.865,0,1002.09,0,1097.775,0,2,1]},"ammerbach2":{"title":"Elias Mikolaus Ammerbach (1571, 1583) interpretation 2, Ratte, 1991","filename":"ammerbach2.scl","rnbo":[12,85.68501,0,197.91,0,303.135,0,391.82,0,4,3,589.73001,0,3,2,783.64001,0,893.865,0,999.09,0,1091.775,0,2,1]},"angklung":{"title":"Scale of an anklung set from Tasikmalaya. 1/1=174 Hz","filename":"angklung.scl","rnbo":[8,206.12,0,382.329,0,610.009,0,823.607,0,1234.478,0,1406.12,0,1633.425,0,1841.204,0]},"ankara":{"title":"Ankara Turkish State Radio Tanbur Frets","filename":"ankara.scl","rnbo":[34,1053,1000,533,500,1079,1000,273,250,111,100,281,250,589,500,239,200,1211,1000,123,100,156,125,158,125,1333,1000,677,500,1373,1000,1393,1000,7,5,1421,1000,721,500,3,2,317,200,201,125,407,250,1653,1000,167,100,211,125,1777,1000,1801,1000,1827,1000,1853,1000,47,25,951,500,1931,1000,2,1]},"appunn":{"title":"Probable tuning of A. Appunn's 36-tone harmonium w. 3 manuals 80/81 apart (1887)","filename":"appunn.scl","rnbo":[36,25,24,135,128,2187,2048,800,729,10,9,9,8,204800,177147,2560,2187,32,27,100,81,5,4,81,64,25600,19683,320,243,4,3,25,18,45,32,729,512,3200,2187,40,27,3,2,25,16,405,256,6561,4096,400,243,5,3,27,16,102400,59049,1280,729,16,9,50,27,15,8,243,128,12800,6561,160,81,2,1]},"arabic_bastanikar_on_b":{"title":"Arabic Bastanikar with perde iraq on B by Dr. Ozan Yarman","filename":"arabic_bastanikar_on_b.scl","rnbo":[12,825,784,55,49,40,33,49,40,147,110,45,32,3,2,165,98,19,11,25,14,147,80,441,220]},"arabic_bayati_and_bayati-shuri_on_d":{"title":"Arabic Bayati and Bayati-Shuri (Karjighar) with perde dugah on D by Dr. Oz.","filename":"arabic_bayati_and_bayati-shuri_on_d.scl","rnbo":[11,55,49,11,9,49,40,147,110,77,48,3,2,25,14,165,98,11,6,90,49,441,220]},"arabic_bayati_and_ushshaq-misri_on_d":{"title":"Arabic Bayati and Ushshaq Misri with perde dugah on D by Dr. 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2","filename":"arch_ptol2.scl","rnbo":[12,28,27,16,15,9,8,6,5,4,3,112,81,3,2,14,9,8,5,27,16,9,5,2,1]},"arch_sept":{"title":"Archytas Septimal","filename":"arch_sept.scl","rnbo":[12,28,27,16,15,9,8,32,27,4,3,112,81,3,2,14,9,8,5,27,16,16,9,2,1]},"archchro":{"title":"Archytas' Chromatic in hemif temperament, 58-tET tuning","filename":"archchro.scl","rnbo":[7,62.06897,0,206.89655,0,496.55172,0,703.44828,0,765.51724,0,910.34483,0,2,1]},"archytas12":{"title":"Archytas[12] (64/63) hobbit, 9-limit minimax","filename":"archytas12.scl","rnbo":[12,98.09924,0,217.54205,0,315.64129,0,393.12974,0,491.22898,0,610.67178,0,708.77102,0,806.87026,0,926.31307,0,982.45795,0,1101.90076,0,2,1]},"archytas12sync":{"title":"Archytas[12] (64/63) hobbit, sync beating","filename":"archytas12sync.scl","rnbo":[12,96.45889,0,222.99262,0,319.4515,0,392.04481,0,488.50369,0,615.03742,0,711.49631,0,807.95519,0,934.48892,0,977.00738,0,1103.54111,0,2,1]},"archytas7":{"title":"Archytas (64/63) hobbit in POTE 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3","filename":"artusi3.scl","rnbo":[12,77.0077,0,10,9,298.00613,0,403.40214,0,508.79814,0,585.80585,0,691.20186,0,768.20956,0,873.60557,0,989.20799,0,1094.60399,0,2,1]},"athan_chrom":{"title":"Athanasopoulos's Byzantine Liturgical mode Chromatic","filename":"athan_chrom.scl","rnbo":[7,150.0,0,400.0,0,500.0,0,700.0,0,850.0,0,1100.0,0,2,1]},"atomschis":{"title":"Atom Schisma Scale","filename":"atomschis.scl","rnbo":[12,156348578434374084375,147573952589676412928,134217728,119574225,1307544150375,1099511627776,18014398509481984,14297995284350625,10935,8192,1709671705179880612640625,1208925819614629174706176,16384,10935,14297995284350625,9007199254740992,2199023255552,1307544150375,119574225,67108864,295147905179352825856,156348578434374084375,2,1]},"augdimhextrug":{"title":"Sister wakalix to Wilson class","filename":"augdimhextrug.scl","rnbo":[12,15,14,35,32,6,5,5,4,75,56,7,5,3,2,25,16,12,7,7,4,15,8,2,1]},"augdommean":{"title":"August-dominant-meantone Fokker 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C.I.","filename":"augtetd.scl","rnbo":[8,27,26,27,25,9,8,11,8,16,11,216,143,432,275,18,11]},"augtete":{"title":"5/4 C.I.","filename":"augtete.scl","rnbo":[8,33,32,33,31,11,10,11,8,16,11,3,2,48,31,8,5]},"augtetf":{"title":"5/4 C.I. again","filename":"augtetf.scl","rnbo":[8,99,98,33,32,11,10,11,8,16,11,72,49,3,2,8,5]},"augtetg":{"title":"9/8 C.I.","filename":"augtetg.scl","rnbo":[8,33,31,33,29,11,9,11,8,16,11,48,31,48,29,16,9]},"augteth":{"title":"9/8 C.I. A gapped version of this scale is called AugTetI","filename":"augteth.scl","rnbo":[8,33,31,11,10,11,9,11,8,16,11,48,31,8,5,16,9]},"augtetj":{"title":"9/8 C.I. comprised of 11:10:9:8 subharmonic series on 1 and 8:9:10:11 on 16/11","filename":"augtetj.scl","rnbo":[6,11,10,11,9,11,8,16,11,18,11,20,11]},"augtetk":{"title":"9/8 C.I. This is the converse form of AugTetJ","filename":"augtetk.scl","rnbo":[6,9,8,5,4,11,8,16,11,8,5,16,9]},"augtetl":{"title":"9/8 C.I. This is the harmonic form of AugTetI","filename":"augtetl.scl","rnbo":[6,9,8,5,4,11,8,16,11,18,11,20,11]},"avg_bac":{"title":"Average Bac System","filename":"avg_bac.scl","rnbo":[7,10,9,20,17,4,3,3,2,5,3,30,17,2,1]},"avicenna_17":{"title":"Tuning by Avicenna (Ibn Sina), Ahmed Mahmud Hifni, Cairo, 1977","filename":"avicenna_17.scl","rnbo":[17,273,256,13,12,9,8,32,27,39,32,81,64,4,3,91,64,13,9,3,2,128,81,13,8,27,16,16,9,91,48,52,27,2,1]},"avicenna_19":{"title":"Arabic scale by Ibn Sina","filename":"avicenna_19.scl","rnbo":[19,256,243,1024,945,9,8,32,27,8192,6561,81,64,4,3,48,35,729,512,4096,2835,3,2,128,81,512,315,27,16,16,9,64,35,243,128,129140163,67108864,2,1]},"avicenna_chrom":{"title":"Dorian mode a chromatic genus of Avicenna","filename":"avicenna_chrom.scl","rnbo":[7,36,35,8,7,4,3,3,2,54,35,12,7,2,1]},"avicenna_chrom2":{"title":"Dorian Mode, a 1:2 Chromatic, 4 + 18 + 8 parts","filename":"avicenna_chrom2.scl","rnbo":[7,66.66667,0,366.66667,0,500.0,0,700.0,0,766.66667,0,1066.66667,0,2,1]},"avicenna_chrom3":{"title":"Avicenna's Chromatic permuted","filename":"avicenna_chrom3.scl","rnbo":[7,10,9,35,27,4,3,3,2,5,3,35,18,2,1]},"avicenna_diat":{"title":"A soft diatonic genus of Avicenna","filename":"avicenna_diat.scl","rnbo":[7,14,13,7,6,4,3,3,2,21,13,7,4,2,1]},"avicenna_diat2":{"title":"A soft diatonic genus of Avicenna (Ibn Sina)","filename":"avicenna_diat2.scl","rnbo":[7,10,9,8,7,4,3,3,2,5,3,12,7,2,1]},"avicenna_diff":{"title":"Difference tones of Avicenna's Soft diatonic reduced by 2/1","filename":"avicenna_diff.scl","rnbo":[12,33,32,35,32,9,8,19,16,21,16,45,32,3,2,49,32,27,16,7,4,63,32,2,1]},"avicenna_enh":{"title":"Dorian mode of Avicenna's (Ibn Sina) Enharmonic genus","filename":"avicenna_enh.scl","rnbo":[7,40,39,16,15,4,3,3,2,20,13,8,5,2,1]},"awad":{"title":"d'Erlanger vol.5, p. 37, after Mans.ur 'Awad","filename":"awad.scl","rnbo":[24,40,39,20,19,40,37,10,9,8,7,20,17,40,33,5,4,40,31,4,3,48,35,24,17,16,11,3,2,20,13,30,19,60,37,5,3,12,7,30,17,20,11,15,8,60,31,2,1]},"awraamoff":{"title":"Awraamoff Septimal Just (1920)","filename":"awraamoff.scl","rnbo":[12,9,8,8,7,6,5,5,4,21,16,4,3,3,2,8,5,12,7,7,4,15,8,2,1]},"ayers_19":{"title":"Lydia Ayers, NINETEEN, for 19 for the 90's CD. Repeats at 37/19 (or 2/1)","filename":"ayers_19.scl","rnbo":[19,37,36,37,35,37,34,37,33,37,32,37,31,37,30,37,29,37,28,37,27,37,26,37,25,37,24,37,23,37,22,37,21,37,20,37,19,2,1]},"ayers_37":{"title":"Lydia Ayers, algorithmic composition, subharmonics 1-37","filename":"ayers_37.scl","rnbo":[36,37,36,37,35,37,34,37,33,37,32,37,31,37,30,37,29,37,28,37,27,37,26,37,25,37,24,37,23,37,22,37,21,37,20,37,19,37,18,37,17,37,16,37,15,37,14,37,13,37,12,37,11,37,10,37,9,37,8,37,7,37,6,37,5,37,4,37,3,37,2,37,1]},"ayers_me":{"title":"Lydia Ayers, Merapi (1996), Slendro 0 2 4 5 7 9, Pelog 0 1 3 6 8 9","filename":"ayers_me.scl","rnbo":[9,15,14,8,7,33,28,9,7,3,2,45,28,12,7,27,14,2,1]},"b10_13":{"title":"10-tET approximation with minimal order 13 beats","filename":"b10_13.scl","rnbo":[10,14,13,8,7,16,13,4,3,17,12,3,2,13,8,7,4,13,7,2,1]},"b12_17":{"title":"12-tET approximation with minimal order 17 beats","filename":"b12_17.scl","rnbo":[12,18,17,9,8,19,16,5,4,4,3,17,12,3,2,27,17,5,3,16,9,17,9,2,1]},"b14_19":{"title":"14-tET approximation with minimal order 19 beats","filename":"b14_19.scl","rnbo":[14,20,19,21,19,7,6,11,9,9,7,4,3,17,12,3,2,25,16,23,14,31,18,29,16,19,10,2,1]},"b15_21":{"title":"15-tET approximation with minimal order 21 beats","filename":"b15_21.scl","rnbo":[15,22,21,11,10,23,20,6,5,5,4,4,3,29,21,13,9,3,2,27,17,5,3,7,4,31,17,21,11,2,1]},"b8_11":{"title":"8-tET approximation with minimal order 11 beats","filename":"b8_11.scl","rnbo":[8,12,11,6,5,13,10,7,5,17,11,5,3,11,6,2,1]},"badings1":{"title":"Henk Badings, harmonic scale, Lydomixolydisch","filename":"badings1.scl","rnbo":[9,9,8,5,4,11,8,3,2,13,8,7,4,2,1,9,4,5,2]},"badings2":{"title":"Henk Badings, subharmonic scale, Dorophrygisch","filename":"badings2.scl","rnbo":[9,10,9,5,4,10,7,20,13,5,3,20,11,2,1,20,9,5,2]},"bagpipe1":{"title":"Bulgarian bagpipe tuning","filename":"bagpipe1.scl","rnbo":[12,66.0,0,202.0,0,316.0,0,399.0,0,509.0,0,640.0,0,706.0,0,803.0,0,910.0,0,1011.0,0,1092.0,0,2,1]},"bagpipe2":{"title":"Highland Bagpipe, from Acustica4: 231 (1954) J.M.A Lenihan and S. 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From Australian Pipe Band College","filename":"bagpipe3.scl","rnbo":[9,9,10,1,1,9,8,5,4,4,3,3,2,5,3,9,5,2,1]},"bagpipe4":{"title":"Highland Bagpipe, Ewan Macpherson in 'NZ Pipeband', Winter 1998","filename":"bagpipe4.scl","rnbo":[9,7,8,1,1,9,8,5,4,4,3,3,2,5,3,7,4,1190.0,0]},"bailey_well":{"title":"Paul Bailey's proportional beating modern temperament (1993)","filename":"bailey_well.scl","rnbo":[12,92.16501,0,195.19,0,296.05501,0,391.68,0,499.94501,0,590.17001,0,698.695,0,794.06001,0,893.785,0,997.95001,0,1093.675,0,2,1]},"bailey_well2":{"title":"Paul Bailey's modern well temperament (2002)","filename":"bailey_well2.scl","rnbo":[12,92.51501,0,195.69,0,296.45501,0,392.18,0,500.44501,0,590.57001,0,699.995,0,794.46001,0,894.285,0,998.45001,0,1094.175,0,2,1]},"bailey_well3":{"title":"Paul Bailey's equal beating well temperament","filename":"bailey_well3.scl","rnbo":[12,256,243,12224,10935,32,27,13696,10935,4,3,1024,729,16348,10935,128,81,18304,10935,16,9,4096,2187,2,1]},"balafon":{"title":"Observed balafon tuning from Patna, Helmholtz/Ellis p. 518, nr.81","filename":"balafon.scl","rnbo":[7,187.0,0,356.0,0,526.0,0,672.0,0,856.0,0,985.0,0,1222.0,0]},"balafon2":{"title":"Observed balafon tuning from West-Africa, Helmholtz/Ellis p. 518, nr.86","filename":"balafon2.scl","rnbo":[7,152.0,0,287.0,0,533.0,0,724.0,0,890.0,0,1039.0,0,2,1]},"balafon3":{"title":"Pitt-River's balafon tuning from West-Africa, Helmholtz/Ellis p. 518, nr.87","filename":"balafon3.scl","rnbo":[7,195.0,0,289.0,0,513.0,0,686.0,0,796.0,0,1008.0,0,1209.0,0]},"balafon4":{"title":"Mandinka balafon scale from Gambia","filename":"balafon4.scl","rnbo":[7,151.0,0,345.0,0,526.0,0,660.0,0,861.0,0,1025.0,0,1141.0,0]},"balafon5":{"title":"An observed balafon tuning from Singapore, Helmholtz/Ellis p. 518, nr.82","filename":"balafon5.scl","rnbo":[7,169.0,0,350.0,0,543.0,0,709.0,0,894.0,0,1040.0,0,1205.0,0]},"balafon6":{"title":"Observed balafon tuning from Burma, Helmholtz/Ellis p. 518, nr.84","filename":"balafon6.scl","rnbo":[7,114.0,0,350.0,0,550.0,0,687.0,0,838.0,0,1032.0,0,1196.0,0]},"balafon7":{"title":"Observed South Pacific pentatonic balafon tuning, Helmholtz/Ellis p. 518, nr.93","filename":"balafon7.scl","rnbo":[5,202.0,0,370.0,0,685.0,0,903.0,0,2,1]},"baldy17":{"title":"Baldy[17] 2.9.5.7.13 subgroup scale in 147-tET tuning","filename":"baldy17.scl","rnbo":[17,24.4898,0,179.59184,0,204.08163,0,228.57143,0,383.67347,0,408.16327,0,432.65306,0,587.7551,0,612.2449,0,636.73469,0,791.83673,0,816.32653,0,971.42857,0,995.91837,0,1020.40816,0,1175.5102,0,2,1]},"bamboo":{"title":"Pythagorean scale with fifth average from Chinese bamboo tubes","filename":"bamboo.scl","rnbo":[23,48.0,0,102.0,0,156.0,0,204.0,0,258.0,0,312.0,0,366.0,0,414.0,0,468.0,0,522.0,0,570.0,0,624.0,0,678.0,0,726.0,0,780.0,0,834.0,0,882.0,0,936.0,0,990.0,0,1044.0,0,1092.0,0,1146.0,0,2,1]},"banchieri":{"title":"Adriano Banchieri, in L'Organo suonarino (1605)","filename":"banchieri.scl","rnbo":[12,135,128,9,8,6,5,81,64,4,3,45,32,3,2,405,256,27,16,9,5,243,128,2,1]},"bapere":{"title":"African, Bapere Horns Aerophone, made of reed, one note each","filename":"bapere.scl","rnbo":[5,599.0,0,813.0,0,1011.0,0,1217.0,0,1510.0,0]},"barbour_chrom1":{"title":"Barbour's #1 Chromatic","filename":"barbour_chrom1.scl","rnbo":[7,55,54,10,9,4,3,3,2,55,36,5,3,2,1]},"barbour_chrom2":{"title":"Barbour's #2 Chromatic","filename":"barbour_chrom2.scl","rnbo":[7,40,39,10,9,4,3,3,2,20,13,5,3,2,1]},"barbour_chrom3":{"title":"Barbour's #3 Chromatic","filename":"barbour_chrom3.scl","rnbo":[7,64,63,8,7,4,3,3,2,32,21,12,7,2,1]},"barbour_chrom3p":{"title":"permuted Barbour's #3 Chromatic","filename":"barbour_chrom3p.scl","rnbo":[7,9,8,8,7,4,3,3,2,27,16,12,7,2,1]},"barbour_chrom3p2":{"title":"permuted Barbour's #3 Chromatic","filename":"barbour_chrom3p2.scl","rnbo":[7,7,6,32,27,4,3,3,2,7,4,16,9,2,1]},"barbour_chrom4":{"title":"Barbour's #4 Chromatic","filename":"barbour_chrom4.scl","rnbo":[7,81,80,9,8,4,3,3,2,243,160,27,16,2,1]},"barbour_chrom4p":{"title":"permuted Barbour's #4 Chromatic","filename":"barbour_chrom4p.scl","rnbo":[7,10,9,9,8,4,3,3,2,5,3,27,16,2,1]},"barbour_chrom4p2":{"title":"permuted Barbour's #4 Chromatic","filename":"barbour_chrom4p2.scl","rnbo":[7,32,27,6,5,4,3,3,2,16,9,9,5,2,1]},"barca":{"title":"Barca","filename":"barca.scl","rnbo":[12,92.18,0,197.39333,0,296.09,0,393.48333,0,4,3,590.225,0,698.045,0,794.135,0,895.43833,0,16,9,1091.52833,0,2,1]},"barca_a":{"title":"Barca A","filename":"barca_a.scl","rnbo":[12,92.18,0,200.0,0,296.09,0,397.39333,0,4,3,593.48333,0,3,2,794.135,0,899.34833,0,998.045,0,1095.43833,0,2,1]},"barkechli":{"title":"Mehdi Barkechli, 27-tone pyth. Arabic scale","filename":"barkechli.scl","rnbo":[27,531441,524288,256,243,2187,2048,65536,59049,9,8,4782969,4194304,32,27,19683,16384,8192,6561,81,64,4,3,177147,131072,1024,729,729,512,262144,177147,3,2,1594323,1048576,128,81,6561,4096,32768,19683,27,16,16,9,59049,32768,4096,2187,243,128,1048576,531441,2,1]},"barlow_13":{"title":"7-limit rational 13-equal, Barlow, On the Quantification of Harmony and Metre","filename":"barlow_13.scl","rnbo":[13,135,128,9,8,7,6,5,4,21,16,48,35,81,56,243,160,8,5,12,7,9,5,243,128,2,1]},"barlow_17":{"title":"11-limit rational 17-equal, Barlow, On the Quantification of Harmony and Metre","filename":"barlow_17.scl","rnbo":[17,25,24,27,25,9,8,32,27,11,9,32,25,4,3,25,18,36,25,3,2,25,16,18,11,27,16,16,9,50,27,48,25,2,1]},"barnes":{"title":"John Barnes' temperament (1977) made after analysis of Wohltemperierte Klavier, 1/6 P","filename":"barnes.scl","rnbo":[12,94.135,0,196.09,0,298.045,0,392.18,0,501.955,0,592.18,0,698.045,0,796.09,0,894.135,0,1000.0,0,1094.135,0,2,1]},"barnes2":{"title":"John Barnes' temperament (1971), 1/8 P","filename":"barnes2.scl","rnbo":[12,96.09,0,198.045,0,297.0675,0,396.09,0,500.9775,0,594.135,0,699.0225,0,798.045,0,897.0675,0,999.0225,0,1095.1125,0,2,1]},"barton":{"title":"Jacob Barton, tetratetradic scale on 6:7:9:11","filename":"barton.scl","rnbo":[12,77,72,12,11,9,8,7,6,14,11,11,8,3,2,18,11,121,72,7,4,11,6,2,1]},"barton2":{"title":"Jacob Barton, mode of 88CET, TL 17-01-2007","filename":"barton2.scl","rnbo":[11,176.0,0,264.0,0,440.0,0,528.0,0,616.0,0,792.0,0,880.0,0,1056.0,0,1144.0,0,1320.0,0,1408.0,0]},"battaglia_16":{"title":"Mike Battaglia 5-limit 16-tone scale","filename":"battaglia_16.scl","rnbo":[16,16,15,10,9,9,8,6,5,5,4,4,3,45,32,3,2,25,16,8,5,5,3,27,16,16,9,9,5,15,8,2,1]},"baumeister":{"title":"In 1988 observed temperament of organ in Maihingen by Johann Martin Baumeister (1737)","filename":"baumeister.scl","rnbo":[12,84.94649,0,199.218,0,306.4515,0,386.70599,0,500.9775,0,582.99149,0,3,2,781.03649,0,896.481,0,994.3305,0,1085.72849,0,2,1]},"beardsley_8":{"title":"David Beardsley's scale used in \"Sonic Bloom\" (1999)","filename":"beardsley_8.scl","rnbo":[8,9,8,7,6,9,7,11,8,3,2,13,8,7,4,2,1]},"bedos":{"title":"Temperament of Dom François Bédos de Celles (1770), after M. Tessmer","filename":"bedos.scl","rnbo":[12,74.97368,0,191.00623,0,311.34003,0,5,4,502.34626,0,577.31994,0,697.65374,0,25,16,888.65997,0,1008.99377,0,1083.96746,0,2,1]},"belet":{"title":"Belet, Brian 1992  Proceedings of the ICMC pp.158-161.","filename":"belet.scl","rnbo":[13,16,15,10,9,9,8,6,5,5,4,4,3,11,8,3,2,8,5,13,8,7,4,15,8,2,1]},"bell_mt_partials":{"title":"Partials of major third bell. 1/1=523.5677 Hz, hum note=-1200.42 c. André Lehr, 2006.","filename":"bell_mt_partials.scl","rnbo":[8,398.84731,0,698.85161,0,961.92407,0,1198.84247,0,1321.95084,0,1653.88234,0,1898.84245,0,2470.16884,0]},"bellingwolde":{"title":"Current 1/6-P. comma mod.mean of Freytag organ in Bellingwolde. 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Ph. Bendeler well temperament","filename":"bendeler.scl","rnbo":[12,256,243,194.63,0,32,27,392.45,0,4,3,1024,729,3,2,128,81,890.495,0,16,9,1094.405,0,2,1]},"bendeler1":{"title":"Bendeler I temperament (c.1690), three 1/3P comma tempered fifths","filename":"bendeler1.scl","rnbo":[12,256,243,188.26999,0,32,27,392.18,0,4,3,1024,729,694.135,0,128,81,890.225,0,16,9,1094.135,0,2,1]},"bendeler2":{"title":"Bendeler II temperament (c.1690), three 1/3P comma tempered fifths","filename":"bendeler2.scl","rnbo":[12,256,243,196.09,0,32,27,392.18,0,4,3,596.09,0,694.135,0,128,81,890.225,0,16,9,1094.135,0,2,1]},"bendeler3":{"title":"Bendeler III temperament (c.1690), four 1/4P tempered fifths","filename":"bendeler3.scl","rnbo":[12,96.09,0,192.18,0,32,27,396.09,0,4,3,594.135,0,696.09,0,798.045,0,894.135,0,16,9,1092.18,0,2,1]},"bermudo-v":{"title":"Bermudo's vihuela temperament, 3 1/6P, 1 1/2P comma","filename":"bermudo-v.scl","rnbo":[12,492075,463684,540,481,32,27,1215,964,4,3,164025,115921,3,2,1476225,927368,810,481,16,9,3645,1928,2,1]},"bermudo":{"title":"Temperament of Fr. Juan Bermudo (1555)","filename":"bermudo.scl","rnbo":[12,100.10289,0,200.20579,0,32,27,400.41158,0,4,3,598.14789,0,3,2,802.0579,0,902.16079,0,16,9,1102.36658,0,2,1]},"bermudo2":{"title":"Temperament of Fr. Juan Bermudo, interpr. of Franz Josef Ratte: Die Temperatur der Clavierinstrumente, p. 227","filename":"bermudo2.scl","rnbo":[12,100.0,0,200.0,0,32,27,400.0,0,4,3,598.045,0,3,2,801.955,0,901.955,0,16,9,1101.955,0,2,1]},"betacub":{"title":"inverted 3x3x3 9-limit quintad cube beta (5120/5103) synch tempered","filename":"betacub.scl","rnbo":[46,49.729878,0,85.285706,0,110.150645,0,120.600012,0,135.015584,0,170.32989,0,181.020779,0,205.885718,0,230.750657,0,255.615596,0,266.306484,0,316.036363,0,351.350669,0,386.906496,0,436.636374,0,472.192202,0,497.057141,0,521.92208,0,546.787019,0,582.342847,0,617.657153,0,632.072725,0,667.387031,0,702.942859,0,727.807798,0,752.672737,0,763.363626,0,788.228565,0,813.093504,0,823.542871,0,883.963637,0,898.379209,0,908.828577,0,933.693516,0,969.249343,0,994.114282,0,1004.563649,0,1018.979221,0,1043.844161,0,1079.399988,0,1089.849355,0,1114.714294,0,1129.129866,0,1139.579233,0,1164.444172,0,2,1]},"bethisy":{"title":"Bethisy temperament ordinaire, see Pierre-Yves Asselin: Musique et temperament","filename":"bethisy.scl","rnbo":[12,86.804,0,193.157,0,288.758,0,5,4,496.253,0,586.804,0,696.578,0,786.803,0,889.735,0,992.506,0,1086.314,0,2,1]},"biezen":{"title":"Jan van Biezen modified meantone (1974)","filename":"biezen.scl","rnbo":[12,86.80214,0,193.15686,0,299.51157,0,5,4,503.42157,0,584.84714,0,696.57843,0,788.75714,0,889.73529,0,1001.46657,0,15,8,2,1]},"biezen2":{"title":"Jan van Biezen 2, also Siracusa (early 17th cent.), modified 1/4 comma MT","filename":"biezen2.scl","rnbo":[12,86.80374,0,193.1575,0,32,27,386.31499,0,4,3,584.84874,0,696.57875,0,788.75875,0,889.73625,0,16,9,1082.89374,0,2,1]},"biezen3":{"title":"Jan van Biezen 3 (2004) (also called Van Biezen I)","filename":"biezen3.scl","rnbo":[12,256,243,196.09,0,298.045,0,392.18,0,501.955,0,1024,729,698.045,0,128,81,894.135,0,1000.0,0,1090.225,0,2,1]},"biezen_chaumont":{"title":"Jan van Biezen, after Chaumont, 1/8 Pyth. comma. Lochem, Hervormde Gudulakerk (1978)","filename":"biezen_chaumont.scl","rnbo":[12,99.0225,0,198.045,0,302.9325,0,396.09,0,500.9775,0,600.0,0,699.0225,0,798.045,0,897.0675,0,1001.955,0,1095.1125,0,2,1]},"biggulp-bunya":{"title":"Biggulp tempered in POTE-tuned 13-limit bunya","filename":"biggulp-bunya.scl","rnbo":[12,62.40123,0,207.08642,0,269.48764,0,382.97222,0,476.57406,0,558.85802,0,703.54321,0,765.94444,0,910.62962,0,973.03085,0,1086.51543,0,2,1]},"biggulp":{"title":"Big Gulp","filename":"biggulp.scl","rnbo":[12,33,32,9,8,7,6,5,4,21,16,11,8,3,2,99,64,27,16,7,4,15,8,2,1]},"bigler12":{"title":"Kurt Bigler, JI organ tuning, TL 28-3-2004","filename":"bigler12.scl","rnbo":[12,25,24,9,8,7,6,5,4,4,3,11,8,3,2,25,16,5,3,7,4,15,8,2,1]},"bihex-top":{"title":"Bihexany in octoid TOP tuning","filename":"bihex-top.scl","rnbo":[12,101.318325,0,267.590529,0,385.147324,0,417.624264,0,535.181059,0,701.453263,0,802.771588,0,883.963938,0,969.043793,0,1033.997672,0,1119.077527,0,1200.269877,0]},"bihex540":{"title":"Bihexany in 540/539 tempering","filename":"bihex540.scl","rnbo":[12,101.621102,0,267.824229,0,386.256798,0,417.215888,0,535.648458,0,701.851584,0,803.472686,0,884.228421,0,969.675813,0,1033.620081,0,1119.067472,0,1199.823207,0]},"bihexany-octoid":{"title":"Octoid tempering of bihexany, 600-equal","filename":"bihexany-octoid.scl","rnbo":[12,102.0,0,268.0,0,386.0,0,418.0,0,536.0,0,702.0,0,804.0,0,884.0,0,970.0,0,1034.0,0,1120.0,0,2,1]},"bihexany":{"title":"Hole around [0, 1/2, 1/2, 1/2]","filename":"bihexany.scl","rnbo":[12,35,33,7,6,5,4,14,11,15,11,3,2,35,22,5,3,7,4,20,11,21,11,2,1]},"bihexanymyna":{"title":"Myna tempered bihexany, 89-tET","filename":"bihexanymyna.scl","rnbo":[12,107.86517,0,269.66292,0,391.01124,0,417.97753,0,539.32584,0,701.1236,0,808.98876,0,889.88764,0,970.78652,0,1038.20225,0,1119.10112,0,2,1]},"billeter":{"title":"Organ well temperament of Otto Bernhard Billeter","filename":"billeter.scl","rnbo":[12,93.1575,0,198.045,0,297.0675,0,392.18,0,500.9775,0,591.2025,0,699.0225,0,795.1125,0,895.1125,0,999.0225,0,1092.18,0,2,1]},"billeter2":{"title":"Bernhard Billeter's Bach temperament (1977/79), 1/12 and 7/24 Pyth. comma","filename":"billeter2.scl","rnbo":[12,92.18,0,200.0,0,296.09,0,390.225,0,500.0,0,590.225,0,700.0,0,794.135,0,895.1125,0,998.045,0,1090.225,0,2,1]},"bimarveldenewoo":{"title":"bimarveldene = genus(27*25*11) in [10/3 7/2 11] marvel tuning","filename":"bimarveldenewoo.scl","rnbo":[24,66.81488,0,116.23027,0,151.28207,0,232.46054,0,267.51234,0,316.92773,0,383.74261,0,433.158,0,450.55749,0,499.97288,0,584.44007,0,616.20315,0,651.25495,0,700.67034,0,767.48522,0,816.90061,0,883.71549,0,933.13088,0,968.18268,0,999.94576,0,1084.41295,0,1133.82835,0,1151.22783,0,1200.64322,0]},"blackbeat15":{"title":"Blackwood[15] with brats of -1","filename":"blackbeat15.scl","rnbo":[15,82.836732,0,157.163268,0,240.0,0,322.836732,0,397.163268,0,480.0,0,562.836732,0,637.163268,0,720.0,0,802.836732,0,877.163268,0,960.0,0,1042.836732,0,1117.163268,0,2,1]},"blackchrome2":{"title":"Second 25/24&256/245 scale","filename":"blackchrome2.scl","rnbo":[10,16,15,9,8,6,5,4,3,27,20,3,2,8,5,16,9,9,5,2,1]},"blackj_gws":{"title":"Detempered Blackjack in 1/4 kleismic marvel tuning","filename":"blackj_gws.scl","rnbo":[21,37.62469,0,115.58705,0,153.21174,0,8,7,268.79879,0,346.76114,0,384.38583,0,468.85303,0,499.97288,0,584.44007,0,615.55993,0,700.02712,0,731.14697,0,815.61417,0,853.23886,0,931.20121,0,7,4,1046.78826,0,1084.41295,0,1162.37531,0,2,1]},"blackjack":{"title":"21 note MOS of \"MIRACLE\" temperament, Erlich & Keenan, miracle1.scl,TL 2-5-2001","filename":"blackjack.scl","rnbo":[21,83.33333,0,116.66667,0,200.0,0,233.33333,0,316.66667,0,350.0,0,383.33333,0,466.66667,0,500.0,0,583.33333,0,616.66667,0,700.0,0,733.33333,0,816.66667,0,850.0,0,933.33333,0,966.66667,0,1050.0,0,1083.33333,0,1166.66667,0,2,1]},"blackjack_r":{"title":"Rational \"Wilson/Grady\"-style version, Paul Erlich, TL 28-11-2001","filename":"blackjack_r.scl","rnbo":[21,21,20,15,14,9,8,8,7,6,5,11,9,5,4,21,16,4,3,7,5,10,7,3,2,32,21,8,5,18,11,12,7,7,4,11,6,15,8,63,32,2,1]},"blackjack_r2":{"title":"Another rational Blackjack maximising 1:3:7:9:11, Paul Erlich, TL 5-12-2001","filename":"blackjack_r2.scl","rnbo":[21,49,48,77,72,12,11,8,7,7,6,27,22,96,77,21,16,4,3,108,77,63,44,3,2,49,32,77,48,18,11,12,7,7,4,11,6,144,77,21,11,2,1]},"blackjack_r3":{"title":"7-Limit rational Blackjack, Dave Keenan, TL 5-12-2001","filename":"blackjack_r3.scl","rnbo":[21,21,20,16,15,28,25,8,7,6,5,49,40,5,4,21,16,4,3,7,5,10,7,3,2,32,21,8,5,49,30,12,7,7,4,147,80,28,15,49,25,2,1]},"blackjackg":{"title":"Blackjack on G-D","filename":"blackjackg.scl","rnbo":[21,83.333,0,116.667,0,200.0,0,233.333,0,316.667,0,350.0,0,433.333,0,466.667,0,550.0,0,583.333,0,666.667,0,700.0,0,783.333,0,816.667,0,900.0,0,933.333,0,1016.667,0,1050.0,0,1083.333,0,1166.667,0,2,1]},"blackjb":{"title":"Marvel (1,1) tuning of pipedum_21b","filename":"blackjb.scl","rnbo":[21,34.14257,0,116.51971,0,150.66228,0,233.03942,0,267.18199,0,349.55913,0,383.7017,0,466.73918,0,500.22141,0,583.25888,0,616.74112,0,699.77859,0,733.26082,0,816.2983,0,850.44087,0,932.81801,0,966.96058,0,1049.33772,0,1083.48029,0,1116.96252,0,2,1]},"blackopkeegil1":{"title":"Blacksmith-Opossum-Keemun-Gilead Wakalix 1","filename":"blackopkeegil1.scl","rnbo":[15,21,20,15,14,7,6,6,5,5,4,9,7,7,5,10,7,3,2,49,30,5,3,7,4,9,5,35,18,2,1]},"blackopkeegil2":{"title":"Blacksmith-Opossum-Keemun-Gilead Wakalix 2","filename":"blackopkeegil2.scl","rnbo":[15,36,35,10,9,8,7,6,5,35,27,4,3,7,5,10,7,14,9,8,5,5,3,12,7,28,15,40,21,2,1]},"blackwoo":{"title":"Irregular Blackjack from marvel woo tempering of Cartesian scale below","filename":"blackwoo.scl","rnbo":[21,35.0518,0,116.23027,0,151.28207,0,232.46054,0,267.51234,0,348.69081,0,383.74261,0,468.2098,0,499.97288,0,584.44007,0,616.20315,0,700.67034,0,732.43342,0,816.90061,0,851.95241,0,933.13088,0,968.18268,0,1049.36115,0,1084.41295,0,1165.59142,0,1200.64322,0]},"blackwood":{"title":"Blackwood temperament, g=84.663787, p=240, 5-limit","filename":"blackwood.scl","rnbo":[25,70.67243,0,141.34485,0,155.33621,0,226.00864,0,240.0,0,310.67243,0,381.34485,0,395.33621,0,466.00864,0,480.0,0,550.67243,0,621.34485,0,635.33621,0,706.00864,0,720.0,0,790.67243,0,861.34485,0,875.33621,0,946.00864,0,960.0,0,1030.67243,0,1101.34485,0,1115.33621,0,1186.00864,0,1200.0,0]},"blackwood_6":{"title":"Easley Blackwood, whole tone scale, arrangement of 4:5:7:9:11:13, 1/1=G, p.114","filename":"blackwood_6.scl","rnbo":[6,9,8,5,4,11,8,13,8,7,4,2,1]},"blackwood_9":{"title":"Blackwood, scale with pure triads on I II III IV VI and dom.7th on V. page 83","filename":"blackwood_9.scl","rnbo":[9,10,9,9,8,5,4,21,16,4,3,3,2,5,3,15,8,2,1]},"blasquinten":{"title":"Blasquintenzirkel. 23 fifths in 2 oct. C. Sachs, Vergleichende Musikwiss. p. 28","filename":"blasquinten.scl","rnbo":[23,156.0,0,312.0,0,468.0,0,624.0,0,678.0,0,780.0,0,834.0,0,936.0,0,990.0,0,1092.0,0,1146.0,0,1248.0,0,1302.0,0,1404.0,0,1458.0,0,1560.0,0,1614.0,0,1716.0,0,1770.0,0,1926.0,0,2082.0,0,2238.0,0,2394.0,0]},"blueji-cataclysmic":{"title":"John O'Sullivan's Blueji tempered in 13-limit POTE-tuned cataclysmic","filename":"blueji-cataclysmic.scl","rnbo":[12,112.60347,0,204.43258,0,317.03605,0,385.18024,0,497.78371,0,589.61282,0,702.21629,0,814.81976,0,882.96395,0,1019.25234,0,1087.39653,0,2,1]},"bluesmarvwoo":{"title":"Marvel woo version of Graham Breed's Blues scale","filename":"bluesmarvwoo.scl","rnbo":[12,133.88259,0,183.04515,0,383.74261,0,450.55749,0,499.97288,0,651.25495,0,683.01803,0,834.55293,0,883.71549,0,950.53037,0,1151.22783,0,1200.64322,0]},"bluesrag":{"title":"Ragismic tempered bluesji in 8419-tET","filename":"bluesrag.scl","rnbo":[12,133.41252,0,182.30194,0,386.26915,0,449.12697,0,498.01639,0,653.09419,0,680.31833,0,835.39613,0,884.28554,0,947.14337,0,1151.11058,0,2,1]},"bobro_phi":{"title":"Cameron Bobro's phi scale, TL 06-05-2009","filename":"bobro_phi.scl","rnbo":[8,366.9097,0,466.181,0,560.06656,0,733.81941,0,833.0903,0,982.55396,0,1068.8647,0,2,1]},"bobro_phi2":{"title":"Cameron Bobro, first 5 golden cuts of Phi, TL 09-05-2009","filename":"bobro_phi2.scl","rnbo":[6,93.88597,0,149.46366,0,235.77441,0,366.9097,0,560.06656,0,833.0903,0]},"bobrova":{"title":"Bobrova Cheerful 12 WT based on *19 EDL","filename":"bobrova.scl","rnbo":[12,19,18,19,17,19,16,361,288,4,3,361,256,323,216,19,12,57,34,57,32,361,192,2,1]},"bockhorn":{"title":"Modified 1/8-comma temperament after Bockhorn","filename":"bockhorn.scl","rnbo":[12,88.54928,0,192.18,0,296.81614,0,390.72771,0,4,3,589.27542,0,696.09,0,787.82314,0,891.45385,0,16,9,1090.00157,0,2,1]},"boeth_chrom":{"title":"Boethius's Chromatic. The CI is 19/16","filename":"boeth_chrom.scl","rnbo":[7,256,243,64,57,4,3,3,2,128,81,32,19,2,1]},"boeth_enh":{"title":"Boethius's Enharmonic, with a CI of 81/64 and added 16/9","filename":"boeth_enh.scl","rnbo":[8,512,499,256,243,4,3,3,2,768,499,16,9,128,81,2,1]},"bohlen-eg":{"title":"Bohlen-Pierce with two tones altered by minor BP diesis, slightly more equal","filename":"bohlen-eg.scl","rnbo":[13,49,45,25,21,9,7,7,5,75,49,5,3,9,5,49,25,15,7,7,3,63,25,135,49,3,1]},"bohlen-p":{"title":"See Bohlen, H. 13-Tonstufen in der Duodezime, Acustica 39: 76-86 (1978)","filename":"bohlen-p.scl","rnbo":[13,27,25,25,21,9,7,7,5,75,49,5,3,9,5,49,25,15,7,7,3,63,25,25,9,3,1]},"bohlen-p_9":{"title":"Bohlen-Pierce subscale by J.R. Pierce with 3:5:7 triads","filename":"bohlen-p_9.scl","rnbo":[9,146.30423,0,438.91269,0,585.21692,0,877.82539,0,1024.12962,0,1316.73808,0,1463.04231,0,1755.65077,0,3,1]},"bohlen-p_9a":{"title":"Pierce's 9 of 3\\13, see Mathews et al., J. Acoust. Soc. Am. 84, 1214-1222","filename":"bohlen-p_9a.scl","rnbo":[9,49,45,9,7,7,5,81,49,9,5,15,7,7,3,135,49,3,1]},"bohlen-p_eb":{"title":"Bohlen-Pierce scale with equal beating 5/3 and 7/3","filename":"bohlen-p_eb.scl","rnbo":[13,152.07683,0,296.64928,0,441.22173,0,585.79418,0,737.87101,0,882.44346,0,1027.01591,0,1171.58837,0,1323.66519,0,1468.23765,0,1612.8101,0,1757.38255,0,3,1]},"bohlen-p_ebt":{"title":"Bohlen-Pierce scale with equal beating 7/3 tenth","filename":"bohlen-p_ebt.scl","rnbo":[13,145.30508,0,291.92921,0,439.77583,0,584.70367,0,730.97784,0,878.50029,0,1023.13607,0,1169.13919,0,1316.41049,0,1460.81993,0,1606.61294,0,1753.68948,0,3,1]},"bohlen-p_ebt2":{"title":"Bohlen-Pierce scale with equal beating 7/5 tritone","filename":"bohlen-p_ebt2.scl","rnbo":[13,145.69063,0,292.08731,0,439.13583,0,586.78567,0,732.13177,0,878.21021,0,1024.96498,0,1172.34389,0,1317.44491,0,1463.29687,0,1609.84255,0,1757.02855,0,3,1]},"bohlen-p_et":{"title":"13-tone equal division of 3/1. Bohlen-Pierce equal approximation","filename":"bohlen-p_et.scl","rnbo":[13,146.30423,0,292.60846,0,438.91269,0,585.21692,0,731.52115,0,877.82539,0,1024.12962,0,1170.43385,0,1316.73808,0,1463.04231,0,1609.34654,0,1755.65077,0,3,1]},"bohlen-p_ring":{"title":"Todd Harrop, symmetrical ring of Bohlen-Pierce enharmonics using 4 major and 8 minor dieses (2012)","filename":"bohlen-p_ring.scl","rnbo":[13,49,45,147,125,35,27,243,175,189,125,81,49,49,27,125,63,175,81,81,35,125,49,135,49,3,1]},"bohlen-p_sup":{"title":"Superparticular Bohlen-Pierce scale","filename":"bohlen-p_sup.scl","rnbo":[13,10,9,25,21,325,252,325,231,4225,2772,4225,2541,16900,9317,2600,1331,260,121,280,121,28,11,30,11,3,1]},"bohlen47":{"title":"Heinz Bohlen, mode of 4\\47 (1998), www.huygens-fokker.org/bpsite/pythagorean.html","filename":"bohlen47.scl","rnbo":[21,102.12766,0,255.31915,0,357.44681,0,459.57447,0,510.6383,0,612.76596,0,714.89362,0,817.02128,0,970.21277,0,1072.34043,0,1327.65957,0,1429.78723,0,1582.97872,0,1685.10638,0,1787.23404,0,1889.3617,0,1940.42553,0,2042.55319,0,2144.68085,0,2297.87234,0,4,1]},"bohlen47r":{"title":"Rational version, with alt.9 64/49 and alt.38 40/13","filename":"bohlen47r.scl","rnbo":[23,52,49,196,169,16,13,13,10,64,49,35,26,10,7,98,65,8,5,7,4,13,7,28,13,16,7,5,2,130,49,14,5,104,35,49,16,40,13,13,4,169,49,49,13,4,1]},"bohlen5":{"title":"5-limit version of Bohlen-Pierce","filename":"bohlen5.scl","rnbo":[13,27,25,6,5,162,125,25,18,972,625,5,3,9,5,625,324,54,25,125,54,5,2,25,9,3,1]},"bohlen_11":{"title":"11-tone scale by Bohlen, generated from the 1/1 3/2 5/2 triad","filename":"bohlen_11.scl","rnbo":[11,10,9,6,5,4,3,3,2,5,3,9,5,2,1,9,4,5,2,27,10,3,1]},"bohlen_12":{"title":"12-tone scale by Bohlen generated from the 4:7:10 triad, Acustica 39/2, 1978","filename":"bohlen_12.scl","rnbo":[12,11,10,6,5,30,23,10,7,11,7,7,4,21,11,21,10,23,10,5,2,11,4,3,1]},"bohlen_8":{"title":"See Bohlen, H. 13-Tonstufen in der Duodezime, Acustica 39: 76-86 (1978)","filename":"bohlen_8.scl","rnbo":[8,10,9,6,5,9,7,7,5,14,9,5,3,9,5,2,1]},"bohlen_arcturus":{"title":"Paul Erlich, Arcturus-7, TOP tuning (15625/15309 tempered)","filename":"bohlen_arcturus.scl","rnbo":[7,145.18162,0,734.21217,0,879.39379,0,1024.5754,0,1169.75702,0,1758.78757,0,1903.96919,0]},"bohlen_canopus":{"title":"Paul Erlich, Canopus-7, TOP tuning (16875/16807 tempered)","filename":"bohlen_canopus.scl","rnbo":[7,150.19306,0,583.78912,0,733.98218,0,1167.57824,0,1317.77131,0,1751.36736,0,1901.56043,0]},"bohlen_coh":{"title":"Differentially coherent Bohlen-Pierce, 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(1978)","filename":"bohlen_delta.scl","rnbo":[9,292.60846,0,438.91269,0,731.52115,0,877.82539,0,1024.12962,0,1316.73808,0,1463.04231,0,1755.65077,0,3,1]},"bohlen_diat_top":{"title":"BP Diatonic, TOP tuning (245/243 tempered)","filename":"bohlen_diat_top.scl","rnbo":[9,141.64621,0,440.4317,0,582.0779,0,880.86339,0,1022.5096,0,1321.29509,0,1462.9413,0,1761.72679,0,1903.373,0]},"bohlen_enh":{"title":"Bohlen-Pierce scale, all enharmonic tones","filename":"bohlen_enh.scl","rnbo":[49,27,25,49,45,375,343,625,567,729,625,147,125,405,343,25,21,3969,3125,2401,1875,9,7,35,27,243,175,7,5,3375,2401,625,441,189,125,343,225,75,49,125,81,5103,3125,1029,625,81,49,5,3,9,5,49,27,625,343,3125,1701,243,125,49,25,675,343,125,63,1323,625,2401,1125,15,7,175,81,81,35,7,3,5625,2401,3125,1323,63,25,343,135,125,49,625,243,1701,625,343,125,135,49,25,9,3,1]},"bohlen_eq":{"title":"Most equal selection from all enharmonic Bohlen-Pierce tones","filename":"bohlen_eq.scl","rnbo":[13,49,45,405,343,9,7,7,5,343,225,5,3,9,5,675,343,15,7,7,3,343,135,135,49,3,1]},"bohlen_g_ji":{"title":"Bohlen's gamma scale, just version","filename":"bohlen_g_ji.scl","rnbo":[9,27,25,9,7,7,5,5,3,9,5,49,25,7,3,25,9,3,1]},"bohlen_gamma":{"title":"Bohlen's gamma scale, a mode of the Bohlen-Pierce scale","filename":"bohlen_gamma.scl","rnbo":[9,146.30423,0,438.91269,0,585.21692,0,877.82539,0,1024.12962,0,1170.43385,0,1463.04231,0,1755.65077,0,3,1]},"bohlen_h_ji":{"title":"Bohlen's harmonic scale, just version","filename":"bohlen_h_ji.scl","rnbo":[9,27,25,9,7,7,5,5,3,9,5,15,7,7,3,63,25,3,1]},"bohlen_harm":{"title":"Bohlen's harmonic scale, inverse of lambda","filename":"bohlen_harm.scl","rnbo":[9,146.30423,0,438.91269,0,585.21692,0,877.82539,0,1024.12962,0,1316.73808,0,1463.04231,0,1609.34654,0,3,1]},"bohlen_l_ji":{"title":"Bohlen's lambda scale, just version","filename":"bohlen_l_ji.scl","rnbo":[9,25,21,9,7,7,5,5,3,9,5,15,7,7,3,25,9,3,1]},"bohlen_lambda":{"title":"Bohlen's lambda scale, a mode of the Bohlen-Pierce scale","filename":"bohlen_lambda.scl","rnbo":[9,292.60846,0,438.91269,0,585.21692,0,877.82539,0,1024.12962,0,1316.73808,0,1463.04231,0,1755.65077,0,3,1]},"bohlen_lambda_pyth":{"title":"Dave Benson's BP-Pythagorean scale, lambda mode of bohlen_pyth.scl","filename":"bohlen_lambda_pyth.scl","rnbo":[9,19683,16807,9,7,343,243,81,49,49,27,729,343,7,3,6561,2401,3,1]},"bohlen_mean":{"title":"1/3 minor BP diesis (245/243) tempered 7/3 meantone scale","filename":"bohlen_mean.scl","rnbo":[13,142.69792,0,41553,35000,439.81427,0,7,5,75,49,879.62854,0,1022.32646,0,49,25,15,7,1462.14073,0,1604.83865,0,1759.25708,0,3,1]},"bohlen_pent_top":{"title":"BP Pentatonic, TOP tuning (245/243 tempered)","filename":"bohlen_pent_top.scl","rnbo":[5,440.4317,0,880.86339,0,1321.29509,0,1761.72679,0,1903.373,0]},"bohlen_pyth":{"title":"Cycle of 13 7/3 BP tenths","filename":"bohlen_pyth.scl","rnbo":[13,2401,2187,19683,16807,9,7,343,243,177147,117649,81,49,49,27,117649,59049,729,343,7,3,16807,6561,6561,2401,3,1]},"bohlen_quintuple_j":{"title":"Bohlen-Pierce quintuple scale (just version of 65ED3). Georg Hajdu (2017)","filename":"bohlen_quintuple_j.scl","rnbo":[65,891,875,65,63,81,77,125,117,49,45,21,19,91,81,63,55,729,625,13,11,729,605,11,9,81,65,19,15,9,7,17,13,539,405,441,325,29,21,7,5,891,625,13,9,81,55,175,117,75,49,45,29,11,7,441,275,57,35,5,3,225,133,325,189,425,243,625,351,9,5,35,19,455,243,21,11,29,15,49,25,351,175,55,27,27,13,625,297,15,7,85,39,325,147,169,75,39,17,7,3,45,19,65,27,27,11,605,243,33,13,625,243,55,21,243,91,19,7,135,49,351,125,77,27,189,65,875,297,3,1]},"bohlen_quintuple_t":{"title":"Bohlen-Pierce quintuple scale, 65th root of 3. Georg Hajdu (2017)","filename":"bohlen_quintuple_t.scl","rnbo":[65,29.26085,0,58.52169,0,87.78254,0,117.04338,0,146.30423,0,175.56508,0,204.82592,0,234.08677,0,263.34762,0,292.60846,0,321.86931,0,351.13015,0,380.391,0,409.65185,0,438.91269,0,468.17354,0,497.43438,0,526.69523,0,555.95608,0,585.21692,0,614.47777,0,643.73862,0,672.99946,0,702.26031,0,731.52115,0,760.782,0,790.04285,0,819.30369,0,848.56454,0,877.82539,0,907.08623,0,936.34708,0,965.60792,0,994.86877,0,1024.12962,0,1053.39046,0,1082.65131,0,1111.91215,0,1141.173,0,1170.43385,0,1199.69469,0,1228.95554,0,1258.21639,0,1287.47723,0,1316.73808,0,1345.99892,0,1375.25977,0,1404.52062,0,1433.78146,0,1463.04231,0,1492.30315,0,1521.564,0,1550.82485,0,1580.08569,0,1609.34654,0,1638.60739,0,1667.86823,0,1697.12908,0,1726.38992,0,1755.65077,0,1784.91162,0,1814.17246,0,1843.43331,0,1872.69415,0,3,1]},"bohlen_sirius":{"title":"Paul Erlich, Sirius-7, TOP tuning (3125/3087 tempered)","filename":"bohlen_sirius.scl","rnbo":[7,293.59737,0,587.19473,0,880.7921,0,1022.60982,0,1316.20719,0,1609.80455,0,1903.40192,0]},"bohlen_t":{"title":"Bohlen, scale based on the twelfth","filename":"bohlen_t.scl","rnbo":[8,300.0,0,500.0,0,700.0,0,900.0,0,1200.0,0,1400.0,0,1600.0,0,1900.0,0]},"bohlen_t_ji":{"title":"Bohlen, scale based on twelfth, just version","filename":"bohlen_t_ji.scl","rnbo":[8,6,5,4,3,3,2,5,3,2,1,9,4,5,2,3,1]},"bolivia":{"title":"Observed scale from pan-pipe from La Paz. 1/1=171 Hz","filename":"bolivia.scl","rnbo":[7,326.0,0,742.0,0,1046.0,0,1382.0,0,1739.0,0,2108.0,0,2394.0,0]},"boomsliter":{"title":"Boomsliter & Creel basic set of their referential tuning. [1 3 5 7 9] x u[1 3 5] cross set","filename":"boomsliter.scl","rnbo":[12,9,8,7,6,6,5,5,4,4,3,7,5,3,2,8,5,5,3,7,4,9,5,2,1]},"boop19":{"title":"19 note detempered sensi MOS boop (245/243) scale, rms tuning","filename":"boop19.scl","rnbo":[19,54.196169,0,122.781755,0,176.977924,0,263.949327,0,318.145497,0,386.731082,0,440.927252,0,495.123421,0,582.094824,0,617.905176,0,704.876579,0,759.072748,0,813.268918,0,881.854503,0,936.050673,0,1023.022076,0,1077.218245,0,1145.803831,0,2,1]},"bossart-muri":{"title":"Victor Ferdinand Bossart's Modified meantone (1743/44), organ in Klosterkirche Muri","filename":"bossart-muri.scl","rnbo":[12,80.44999,0,195.1125,0,305.865,0,388.26999,0,501.955,0,582.40499,0,699.0225,0,779.47249,0,891.2025,0,1000.9775,0,1085.33749,0,2,1]},"bossart1":{"title":"Victor Ferdinand Bossart (erste Anweisung) organ temperament (1740?)","filename":"bossart1.scl","rnbo":[12,256,243,198.045,0,308.7975,0,390.225,0,503.91,0,1024,729,699.0225,0,794.135,0,894.135,0,1007.82,0,1089.2475,0,2,1]},"bossart2":{"title":"Victor Ferdinand Bossart (zweite Anweisung) organ temperament (1740?)","filename":"bossart2.scl","rnbo":[12,94.135,0,195.1125,0,308.7975,0,394.135,0,503.91,0,592.18,0,699.0225,0,796.09,0,894.135,0,1004.8875,0,1096.09,0,2,1]},"bossart3":{"title":"Victor Ferdinand Bossart (dritte Anweisung) organ temperament (1740?)","filename":"bossart3.scl","rnbo":[12,93.1575,0,198.045,0,305.865,0,390.225,0,503.91,0,591.2025,0,699.0225,0,797.0675,0,894.135,0,1004.8875,0,1089.2475,0,2,1]},"bossier11":{"title":"Bossier[11] 2.7.11.13 subgroup scale in 225-tET tuning","filename":"bossier11.scl","rnbo":[11,64.0,0,128.0,0,192.0,0,421.333333,0,485.333333,0,549.333333,0,778.666667,0,842.666667,0,906.666667,0,970.666667,0,2,1]},"boulliau":{"title":"Monsieur Boulliau's irregular temp. (1373), reported by Mersenne in 1636","filename":"boulliau.scl","rnbo":[12,18,17,9,8,81,68,81,64,4,3,24,17,3,2,27,17,27,16,16,9,32,17,2,1]},"bourdelle1":{"title":"Compromis Cordier, piano tuning by Jean-Pierre Chainais","filename":"bourdelle1.scl","rnbo":[88,100.1046295,0,200.209,0,300.314,0,400.419,0,500.523,0,600.628,0,700.732,0,800.837,0,900.942,0,1001.046,0,1101.151,0,1201.256,0,1301.36,0,1401.465,0,1501.569,0,1601.674,0,1701.779,0,1801.883,0,1901.988,0,2002.093,0,2102.197,0,2202.302,0,2302.406,0,2402.511,0,2502.616,0,2602.72,0,2702.825,0,2802.93,0,2903.034,0,3003.139,0,3103.244,0,3203.348,0,3303.453,0,3403.557,0,3503.662,0,3603.767,0,3703.871,0,3803.976,0,3904.081,0,4004.185,0,4104.29,0,4204.394,0,4304.499,0,4404.604,0,4504.708,0,4604.813,0,4704.918,0,4805.022,0,4905.127,0,5005.239,0,5105.358,0,5205.484,0,5305.618,0,5405.759,0,5505.907,0,5606.063,0,5706.226,0,5806.396,0,5906.573,0,6006.758,0,6106.95,0,6207.149,0,6307.356,0,6407.57,0,6507.791,0,6608.019,0,6708.255,0,6808.498,0,6908.748,0,7009.005,0,7109.27,0,7209.542,0,7309.821,0,7410.108,0,7510.402,0,7610.703,0,7711.011,0,7811.327,0,7911.65,0,8011.98,0,8112.318,0,8212.662,0,8313.014,0,8413.374,0,8513.74,0,8614.114,0,8714.495,0,8814.884,0]},"bozuji":{"title":"Bostjan Zupancic, 5-limit JI scale \"Bozuji\"","filename":"bozuji.scl","rnbo":[23,128,125,16,15,9,8,144,125,75,64,6,5,5,4,32,25,675,512,4,3,45,32,64,45,3,2,192,125,25,16,8,5,5,3,128,75,225,128,9,5,15,8,125,64,2,1]},"bpg55557777":{"title":"Bohlen-Pierce extended to [55557777]","filename":"bpg55557777.scl","rnbo":[25,245,243,27,25,49,45,25,21,9,7,35,27,243,175,7,5,75,49,81,49,5,3,1225,729,2187,1225,9,5,49,27,49,25,15,7,175,81,81,35,7,3,63,25,135,49,25,9,729,245,3,1]},"bps_temp17":{"title":"Bohlen-Pierce-Stearn temperament. Highest 7-limit error 8.4 cents, 2001","filename":"bps_temp17.scl","rnbo":[17,47.935,0,179.49,0,311.045,0,442.6,0,490.535,0,622.09,0,753.645,0,885.2,0,933.135,0,1064.69,0,1196.245,0,1327.8,0,1375.735,0,1507.29,0,1638.845,0,1770.4,0,3,1]},"brac":{"title":"Circulating temperament with simple beat ratios: 4 3/2 4 3/2 2 2 177/176 4 3/2 2 3/2 2","filename":"brac.scl","rnbo":[12,56640,53701,60008,53701,63720,53701,67264,53701,71685,53701,75056,53701,80276,53701,84960,53701,89920,53701,95580,53701,100544,53701,2,1]},"breed-blues1":{"title":"Graham Breed's blues scale in 22-tET","filename":"breed-blues1.scl","rnbo":[7,218.18182,0,381.81818,0,436.36364,0,709.09091,0,872.72727,0,927.27273,0,2,1]},"breed-blues2":{"title":"Graham Breed's blues scale in 29-tET","filename":"breed-blues2.scl","rnbo":[8,206.89655,0,248.27586,0,372.41379,0,455.17241,0,703.44828,0,868.96552,0,951.72414,0,2,1]},"breed-bluesji":{"title":"7-limit JI version of Graham Breed's Blues scale","filename":"breed-bluesji.scl","rnbo":[12,27,25,10,9,5,4,35,27,4,3,35,24,40,27,81,50,5,3,140,81,35,18,2,1]},"breed-dias13":{"title":"13-limit Diaschismic temperament, g=103.897, oct=1/2, 13-limit","filename":"breed-dias13.scl","rnbo":[46,23.38056,0,46.76112,0,70.14168,0,103.89676,0,127.27732,0,150.65788,0,174.03844,0,207.79352,0,8,7,254.55464,0,277.9352,0,311.69028,0,335.07084,0,358.4514,0,381.83196,0,415.58704,0,438.9676,0,64,49,485.72872,0,519.4838,0,542.86436,0,566.24492,0,600.0,0,623.38056,0,646.76112,0,670.14168,0,703.89676,0,727.27732,0,750.65788,0,774.03844,0,807.79352,0,831.17408,0,854.55464,0,877.9352,0,911.69028,0,935.07084,0,958.4514,0,981.83196,0,1015.58704,0,1038.9676,0,1062.34816,0,1085.72872,0,1119.4838,0,1142.86436,0,1166.24492,0,2,1]},"breed-ht":{"title":"Hemithird temperament, g=193.202, 5-limit","filename":"breed-ht.scl","rnbo":[19,111.62852,0,152.41536,0,193.20219,0,304.83072,0,345.61755,0,386.40439,0,498.03291,0,538.81975,0,579.60658,0,691.2351,0,732.02194,0,772.80878,0,884.4373,0,925.22413,0,966.01097,0,1077.63949,0,1118.42633,0,1159.21316,0,2,1]},"breed-kleismic":{"title":"Kleismic temperament, g=317.080, 5-limit","filename":"breed-kleismic.scl","rnbo":[7,68.3187,0,317.07968,0,385.39838,0,634.15935,0,702.47805,0,951.23903,0,2,1]},"breed-magic":{"title":"Graham Breed's Magic temperament, g=380.384, 9-limit, close to 41-tET","filename":"breed-magic.scl","rnbo":[13,203.83722,0,262.68605,0,321.53489,0,380.38372,0,584.22094,0,643.06978,0,701.91861,0,760.76744,0,964.60466,0,1023.4535,0,1082.30233,0,1141.15117,0,2,1]},"breed-magic5":{"title":"Magic temperament, g=379.967949, 5-limit","filename":"breed-magic5.scl","rnbo":[19,79.48718,0,139.58334,0,199.67949,0,259.77564,0,319.8718,0,379.96795,0,459.45513,0,519.55129,0,579.64744,0,639.74359,0,699.83975,0,759.9359,0,839.42308,0,899.51924,0,959.61539,0,1019.71154,0,1079.80769,0,1139.90385,0,2,1]},"breed-mystery":{"title":"Mystery temperament, g=15.563, oct=1/29, 15-limit","filename":"breed-mystery.scl","rnbo":[58,15.56278,0,41.37931,0,56.94209,0,82.75862,0,98.3214,0,124.13793,0,139.70071,0,165.51724,0,181.08002,0,206.89655,0,222.45933,0,248.27586,0,263.83864,0,289.65517,0,305.21795,0,331.03448,0,346.59726,0,372.41379,0,387.97657,0,413.7931,0,429.35588,0,455.17241,0,470.73519,0,496.55172,0,512.1145,0,537.93103,0,553.49381,0,579.31034,0,594.87312,0,620.68966,0,636.25243,0,662.06897,0,677.63174,0,703.44828,0,719.01105,0,744.82759,0,760.39036,0,786.2069,0,801.76967,0,827.58621,0,843.14898,0,868.96552,0,884.52829,0,910.34483,0,925.9076,0,951.72414,0,967.28692,0,993.10345,0,1008.66623,0,1034.48276,0,1050.04554,0,1075.86207,0,1091.42485,0,1117.24138,0,1132.80416,0,1158.62069,0,1174.18347,0,2,1]},"breed":{"title":"Graham Breed's fourth based 12-tone keyboard scale. Tuning List 23-10-97","filename":"breed.scl","rnbo":[12,531441,524288,46.92002,0,2187,2048,1162261467,1073741824,9,8,4782969,4194304,32,27,19683,16384,341.05502,0,81,64,43046721,33554432,4,3]},"breed11":{"title":"Breed[11] hobbit in 2749-tET","filename":"breed11.scl","rnbo":[11,119.60713,0,231.35686,0,350.96399,0,386.3223,0,582.32084,0,617.67916,0,813.6777,0,849.03601,0,968.64314,0,1080.39287,0,2,1]},"breed7-3":{"title":"Graham Breed's 7 + 3 scale in 24-tET","filename":"breed7-3.scl","rnbo":[10,150.0,0,200.0,0,350.0,0,500.0,0,650.0,0,700.0,0,850.0,0,1000.0,0,1050.0,0,2,1]},"breedball3":{"title":"Third Breed ball around 49/40-7/4","filename":"breedball3.scl","rnbo":[12,49,48,21,20,15,14,49,40,5,4,7,5,10,7,3,2,49,32,12,7,7,4,2,1]},"breedball4":{"title":"Fourth Breed ball around 49/40-7/4","filename":"breedball4.scl","rnbo":[14,49,48,21,20,15,14,6,5,49,40,5,4,7,5,10,7,3,2,49,32,12,7,7,4,25,14,2,1]},"breedpump":{"title":"Comma pump in breed (2401/2400 planar) [[1, 1, -2]->[1, 1, -1]->[0, 1, -1]->[0, 0, -1]->[0, 0, 0]->[0, -1, 0],[0, -1, 1]->[0, -2, 1]->[-1, -2, 1]","filename":"breedpump.scl","rnbo":[16,50,49,16807,16000,343,320,400,343,20000,16807,49,40,5,4,7,5,10,7,2401,1600,49,32,80,49,4000,2401,7,4,25,14,2,1]},"breedt2":{"title":"Graham Breed's 1/5 P temperament, TL 10-06-99","filename":"breedt2.scl","rnbo":[12,94.917,0,199.218,0,298.827,0,393.744,0,502.737,0,592.962,0,3,2,796.872,0,896.481,0,1000.782,0,1095.699,0,2,1]},"breedt3":{"title":"Graham Breed's other 1/4 P temperament, TL 10-06-99","filename":"breedt3.scl","rnbo":[12,96.09,0,198.045,0,300.0,0,396.09,0,503.91,0,594.135,0,3,2,798.045,0,894.135,0,1001.955,0,1092.18,0,2,1]},"breetet2":{"title":"doubled Breed tetrad","filename":"breetet2.scl","rnbo":[13,49,48,25,24,7,6,49,40,5,4,4,3,10,7,35,24,3,2,49,30,5,3,7,4,2,1]},"breetet3":{"title":"tripled Breed tetrad","filename":"breetet3.scl","rnbo":[25,49,48,25,24,15,14,35,32,9,8,7,6,49,40,5,4,245,192,125,96,21,16,4,3,10,7,35,24,3,2,49,32,25,16,49,30,5,3,7,4,25,14,175,96,90,49,15,8,2,1]},"breeza":{"title":"A 40353607/40000000 & 40960000/40353607 Fokker block with 11 otonal and 10 utonal tetrads","filename":"breeza.scl","rnbo":[27,50,49,16807,16000,128000,117649,6400000,5764801,8,7,400,343,2401,2000,49,40,5,4,64,49,3200,2401,160000,117649,7,5,10,7,117649,80000,2401,1600,1280000,823543,8,5,80,49,4000,2401,343,200,7,4,5764801,3200000,640,343,32000,16807,49,25,2,1]},"breezb":{"title":"Alternative block to breeza 40353607/40000000 & 40960000/40353607","filename":"breezb.scl","rnbo":[27,50,49,16807,16000,128000,117649,28,25,8,7,400,343,2401,2000,49,40,5,4,64,49,3200,2401,160000,117649,7,5,10,7,117649,80000,2401,1600,1280000,823543,8,5,80,49,4000,2401,343,200,7,4,5764801,3200000,640,343,32000,16807,49,25,2,1]},"bremmer":{"title":"Bill Bremmer's Shining Brow (1998)","filename":"bremmer.scl","rnbo":[12,95.525,0,197.49,0,299.015,0,395.03999,0,500.005,0,595.02999,0,699.495,0,798.52,0,897.485,0,998.51,0,1095.53499,0,2,1]},"bremmer_ebvt1":{"title":"Bill Bremmer EBVT I temperament (2011)","filename":"bremmer_ebvt1.scl","rnbo":[12,94.87252,0,197.05899,0,297.8,0,394.21889,0,4,3,592.91752,0,699.3119,0,796.82704,0,896.20299,0,999.1,0,1096.17389,0,2,1]},"bremmer_ebvt2":{"title":"Bill Bremmer EBVT II temperament (2011)","filename":"bremmer_ebvt2.scl","rnbo":[12,94.87252,0,197.05899,0,297.8,0,395.79561,0,4,3,592.91752,0,699.3119,0,796.82704,0,896.20299,0,999.1,0,1096.17389,0,2,1]},"bremmer_ebvt3":{"title":"Bill Bremmer EBVT III temperament (2011)","filename":"bremmer_ebvt3.scl","rnbo":[12,94.87252,0,197.05899,0,297.8,0,395.79561,0,4,3,595.89736,0,699.3119,0,796.82704,0,896.20299,0,999.1,0,1096.17389,0,2,1]},"broadwood":{"title":"Broadwood's Best (Ellis tuner number 4), Victorian (1885)","filename":"broadwood.scl","rnbo":[12,95.96501,0,197.99,0,297.95501,0,392.98,0,498.94501,0,594.97001,0,699.995,0,796.96001,0,894.985,0,998.95001,0,1093.975,0,2,1]},"broadwood2":{"title":"Broadwood's Usual (Ellis tuner number 2), Victorian (1885)","filename":"broadwood2.scl","rnbo":[12,94.96501,0,196.99,0,296.95501,0,391.98,0,498.94501,0,593.97001,0,699.995,0,795.96001,0,893.985,0,997.95001,0,1092.975,0,2,1]},"broadwood3":{"title":"John Broadwood´s 1832 unequal temperament compiled by A.Sparschuh, a=403.0443","filename":"broadwood3.scl","rnbo":[12,633527,600000,2691301,2400000,1429123,1200000,75449,60000,1068389,800000,1692133,1200000,898549,600000,3795083,2400000,1343481,800000,535057,300000,1506547,800000,2,1]},"broeckaert-pbp":{"title":"Johan Broeckaert-Devriendt, PBP temperament (2007). Equal PBP for C-E and G-B","filename":"broeckaert-pbp.scl","rnbo":[12,256,243,195.25271,0,32,27,386.87185,0,4,3,1024,729,699.44315,0,128,81,891.06228,0,16,9,4096,2187,2,1]},"brown":{"title":"Tuning of Colin Brown's Voice Harmonium, Glasgow. Helmholtz/Ellis p. 470-473, genus [3333333333333355]","filename":"brown.scl","rnbo":[45,25,24,256,243,135,128,2187,2048,800,729,10,9,18225,16384,9,8,2560,2187,75,64,32,27,1215,1024,100,81,5,4,81,64,320,243,675,512,4,3,10935,8192,25,18,1024,729,45,32,729,512,3200,2187,40,27,6075,4096,3,2,25,16,128,81,405,256,400,243,5,3,54675,32768,27,16,1280,729,225,128,16,9,3645,2048,50,27,4096,2187,15,8,243,128,160,81,2025,1024,2,1]},"bruder-vier":{"title":"Ignaz Bruder organ temperament (1829) according to P. Vier","filename":"bruder-vier.scl","rnbo":[12,95.0,0,200.0,0,295.0,0,389.0,0,499.0,0,593.5,0,698.5,0,796.0,0,897.0,0,998.0,0,1092.0,0,2,1]},"bruder":{"title":"Ignaz Bruder organ temperament (1829), systematised by Ratte, p. 406","filename":"bruder.scl","rnbo":[12,95.1125,0,202.9325,0,297.0675,0,391.2025,0,499.0225,0,593.64625,0,701.46625,0,796.09,0,897.0675,0,998.045,0,1092.18,0,2,1]},"bug-pelog":{"title":"Pelog-like subset of bug[9] and superpelog[9], g=260.256797","filename":"bug-pelog.scl","rnbo":[7,101.28399,0,260.2568,0,520.51359,0,679.48641,0,780.77039,0,939.7432,0,2,1]},"bugblock19":{"title":"Bug (<<2 3 0||) and <<5 2 -15|| <19 30 45| weak Fokker block: generators -9 to 9","filename":"bugblock19.scl","rnbo":[19,128,125,25,24,16,15,75,64,6,5,5,4,32,25,4,3,45,32,64,45,3,2,25,16,8,5,5,3,128,75,15,8,48,25,125,64,2,1]},"burma3":{"title":"Burmese scale, von Hornbostel: Über ein akustisches Kriterium.., 1911, p.613. 1/1=336 Hz","filename":"burma3.scl","rnbo":[7,164.53576,0,336.1295,0,505.75652,0,688.16023,0,859.44844,0,1036.66952,0,2,1]},"burt1":{"title":"W. Burt's 13diatsub #1","filename":"burt1.scl","rnbo":[12,26,25,13,12,26,23,13,11,13,10,26,19,13,9,27,17,13,8,26,15,13,7,2,1]},"burt10":{"title":"W. Burt's 19enhsub #10","filename":"burt10.scl","rnbo":[12,76,75,38,37,76,73,19,18,19,14,38,27,19,13,152,103,76,51,152,101,38,25,2,1]},"burt11":{"title":"W. Burt's 19enhharm #11","filename":"burt11.scl","rnbo":[12,25,19,101,76,51,38,103,76,26,19,27,19,28,19,36,19,73,38,37,19,75,38,2,1]},"burt12":{"title":"W. Burt's 19diatharm #12","filename":"burt12.scl","rnbo":[12,22,19,23,19,24,19,25,19,26,19,27,19,28,19,32,19,34,19,36,19,37,19,2,1]},"burt13":{"title":"W. Burt's 23diatsub #13","filename":"burt13.scl","rnbo":[12,23,22,23,21,46,41,23,20,23,18,23,17,23,16,23,15,23,14,46,27,23,13,2,1]},"burt14":{"title":"W. Burt's 23enhsub #14","filename":"burt14.scl","rnbo":[12,92,91,46,45,92,89,23,22,23,18,23,17,23,16,92,63,46,31,92,61,23,15,2,1]},"burt15":{"title":"W. Burt's 23enhharm #15","filename":"burt15.scl","rnbo":[12,30,23,61,46,31,23,63,46,32,23,34,23,36,23,44,23,89,46,45,23,91,46,2,1]},"burt16":{"title":"W. Burt's 23diatharm #16","filename":"burt16.scl","rnbo":[12,26,23,27,23,28,23,30,23,32,23,34,23,36,23,40,23,41,23,42,23,44,23,2,1]},"burt17":{"title":"W. Burt's \"2 out of 3,5,11,17,31 dekany\" CPS with 1/1=3/1. 1/1 vol. 10(1) '98","filename":"burt17.scl","rnbo":[36,98549,98304,2057,2048,13175,12288,275,256,52855,49152,8959,8192,561,512,4805,4096,28985,24576,605,512,2635,2048,165,128,10571,8192,15895,12288,63767,49152,8525,6144,1445,1024,5797,4096,775,512,4675,3072,18755,12288,1581,1024,3179,2048,425,256,81685,49152,1705,1024,10285,6144,465,256,44795,24576,935,512,179707,98304,3751,2048,255,128,16337,8192,1023,512,2,1]},"burt18":{"title":"W. Burt's \"2 out of 1,3,5,7,11 dekany\" CPS with 1/1=1/1. 1/1 vol. 10(1) '98","filename":"burt18.scl","rnbo":[36,525,512,33,32,4235,4096,539,512,275,256,35,32,1155,1024,147,128,75,64,605,512,77,64,315,256,2541,2048,165,128,21,16,2695,2048,693,512,175,128,45,32,363,256,735,512,385,256,99,64,1617,1024,825,512,105,64,847,512,55,32,1815,1024,231,128,15,8,1925,1024,245,128,495,256,63,32,2,1]},"burt19":{"title":"W. Burt's \"2 out of 2,3,4,5,7 dekany\" CPS with 1/1=1/1. 1/1 vol. 10(1) '98","filename":"burt19.scl","rnbo":[20,525,512,35,32,9,8,147,128,75,64,315,256,5,4,21,16,175,128,45,32,735,512,3,2,49,32,25,16,105,64,7,4,15,8,245,128,63,32,2,1]},"burt2":{"title":"W. Burt's 13enhsub #2","filename":"burt2.scl","rnbo":[12,104,103,52,51,104,101,26,25,13,10,104,79,4,3,104,77,26,19,52,33,13,7,2,1]},"burt20":{"title":"Warren Burt tuning for \"Commas\" (1993). 1/1=263 Hz, XH 16","filename":"burt20.scl","rnbo":[12,36,35,16,15,2187,2048,9,8,729,640,512,405,6561,5120,45,32,36,25,63,40,8,5,2,1]},"burt3":{"title":"W. Burt's 13enhharm #3","filename":"burt3.scl","rnbo":[12,14,13,33,26,19,13,77,52,3,2,79,52,20,13,25,13,101,52,51,26,103,52,2,1]},"burt4":{"title":"W. Burt's 13diatharm #4, see his post 3/30/94 in Tuning Digest #57","filename":"burt4.scl","rnbo":[12,14,13,15,13,16,13,17,13,18,13,19,13,20,13,22,13,23,13,24,13,25,13,2,1]},"burt5":{"title":"W. Burt's 17diatsub #5","filename":"burt5.scl","rnbo":[12,17,16,17,15,17,14,17,13,17,12,34,23,17,11,34,21,17,10,34,19,17,9,2,1]},"burt6":{"title":"W. Burt's 17enhsub #6","filename":"burt6.scl","rnbo":[12,68,67,34,33,68,65,17,16,17,12,34,23,17,11,136,87,68,43,8,5,34,21,2,1]},"burt7":{"title":"W. Burt's 17enhharm #7","filename":"burt7.scl","rnbo":[12,21,17,5,4,43,34,87,68,22,17,23,17,24,17,32,17,65,34,33,17,67,34,2,1]},"burt8":{"title":"W. Burt's 17diatharm #8, harmonics 16 to 32","filename":"burt8.scl","rnbo":[12,18,17,19,17,20,17,21,17,22,17,23,17,24,17,26,17,28,17,30,17,32,17,2,1]},"burt9":{"title":"W. Burt's 19diatsub #9","filename":"burt9.scl","rnbo":[12,38,37,19,18,19,17,19,16,19,14,38,27,19,13,38,25,19,12,38,23,19,11,2,1]},"burt_fibo":{"title":"Warren Burt, 3/2+5/3+8/5+etc. \"Recurrent Sequences\", 2002","filename":"burt_fibo.scl","rnbo":[12,17,16,9,8,305,256,5,4,21,16,89,64,377,256,3,2,13,8,55,32,233,128,2,1]},"burt_fibo23":{"title":"Warren Burt, 23-tone Fibonacci scale. \"Recurrent Sequences\", 2002","filename":"burt_fibo23.scl","rnbo":[23,4181,4096,17,16,17711,16384,9,8,75025,65536,305,256,5,4,323,256,21,16,5473,4096,89,64,1449,1024,377,256,3,2,1597,1024,13,8,6765,4096,55,32,28657,16384,233,128,121393,65536,987,512,2,1]},"burt_forks":{"title":"Warren Burt, 19-tone Forks. Interval 5(3): pp. 13+23, Winter 1986-87","filename":"burt_forks.scl","rnbo":[19,28,27,16,15,10,9,9,8,6,5,5,4,9,7,4,3,7,5,10,7,3,2,14,9,8,5,5,3,16,9,9,5,15,8,27,14,2,1]},"burt_primes":{"title":"Warren Burt, primes until 251. \"Some Numbers\", Dec. 2002","filename":"burt_primes.scl","rnbo":[54,131,128,67,64,17,16,137,128,139,128,71,64,73,64,37,32,149,128,151,128,19,16,157,128,79,64,5,4,163,128,41,32,83,64,167,128,43,32,173,128,11,8,89,64,179,128,181,128,23,16,47,32,191,128,3,2,193,128,97,64,197,128,199,128,101,64,103,64,13,8,211,128,53,32,107,64,109,64,223,128,7,4,113,64,227,128,229,128,29,16,233,128,59,32,239,128,241,128,61,32,31,16,251,128,127,64,2,1]},"buselik pentachord 13-limit":{"title":"Buselik pentachord 132:147:156:176:198","filename":"buselik pentachord 13-limit.scl","rnbo":[4,49,44,13,11,4,3,3,2]},"buselik pentachord 19-limit":{"title":"Buselik pentachord 48:54:57:64:72","filename":"buselik pentachord 19-limit.scl","rnbo":[4,9,8,19,16,4,3,3,2]},"buselik tetrachord 13-limit":{"title":"Buselik tetrachord 132:147:156:176","filename":"buselik tetrachord 13-limit.scl","rnbo":[3,49,44,13,11,4,3]},"buselik tetrachord 19-limit":{"title":"Buselik tetrachord 48:54:57:64","filename":"buselik tetrachord 19-limit.scl","rnbo":[3,9,8,19,16,4,3]},"bushmen":{"title":"Observed scale of South-African bushmen, almost (4 notes) equal pentatonic","filename":"bushmen.scl","rnbo":[4,489.0,0,710.0,0,954.0,0,2,1]},"buurman":{"title":"Buurman temperament, 1/8-Pyth. comma, organ Doetinchem Gereformeerde Gemeentekerk","filename":"buurman.scl","rnbo":[12,93.1575,0,198.045,0,297.0675,0,396.09,0,500.9775,0,594.135,0,699.0225,0,795.1125,0,897.0675,0,999.0225,0,1095.1125,0,2,1]},"buzurg10decoid":{"title":"buzurg_al-erin10 in decoid temperament, POTE tuning","filename":"buzurg10decoid.scl","rnbo":[10,128.91679,0,231.08321,0,360.0,0,497.83359,0,626.75038,0,702.16641,0,831.08321,0,933.24962,0,1062.16641,0,2,1]},"buzurg_al-erin10":{"title":"Decatonic with septimal Buzurg, Rastlike modes (cf. Secor, blarney.txt)","filename":"buzurg_al-erin10.scl","rnbo":[10,14,13,8,7,16,13,4,3,56,39,3,2,21,13,12,7,24,13,2,1]},"c1029cp":{"title":"1029/1024 comma pump scale in 190-tET","filename":"c1029cp.scl","rnbo":[16,82.10526,0,202.10526,0,233.68421,0,385.26316,0,467.36842,0,618.94737,0,701.05263,0,783.15789,0,852.63158,0,884.21053,0,934.73684,0,966.31579,0,1086.31579,0,1117.89474,0,1168.42105,0,2,1]},"c10976cp":{"title":"10976/10935 comma pump scale in 695-tET","filename":"c10976cp.scl","rnbo":[28,60.43165,0,120.86331,0,145.03597,0,205.46763,0,265.89928,0,326.33094,0,386.76259,0,436.83453,0,447.19424,0,471.36691,0,497.26619,0,531.79856,0,557.69784,0,581.8705,0,592.23022,0,642.30216,0,702.73381,0,763.16547,0,823.59712,0,884.02878,0,908.20144,0,968.63309,0,1029.06475,0,1079.13669,0,1089.4964,0,1139.56835,0,1149.92806,0,2,1]},"c126cp":{"title":"126/125 comma pump scale in 185-tET","filename":"c126cp.scl","rnbo":[11,45.40541,0,77.83784,0,123.24324,0,311.35135,0,389.18919,0,467.02703,0,622.7027,0,700.54054,0,966.48649,0,1011.89189,0,2,1]},"c1728cp":{"title":"1728/1715 comma pump scale in 111-tET","filename":"c1728cp.scl","rnbo":[14,43.24324,0,270.27027,0,313.51351,0,389.18919,0,540.54054,0,583.78378,0,659.45946,0,702.7027,0,810.81081,0,854.05405,0,929.72973,0,972.97297,0,1124.32432,0,2,1]},"c225cp":{"title":"225/224 comma pump scale in 197-tET","filename":"c225cp.scl","rnbo":[12,115.73604,0,152.28426,0,268.0203,0,383.75635,0,499.49239,0,584.77157,0,700.50761,0,767.51269,0,852.79188,0,968.52792,0,1084.26396,0,2,1]},"c3136cp":{"title":"3136/3125 comma pump scale in 446-tET","filename":"c3136cp.scl","rnbo":[20,121.07623,0,156.05381,0,193.72197,0,266.36771,0,277.13004,0,314.79821,0,387.44395,0,508.52018,0,581.16592,0,702.24215,0,774.88789,0,812.55605,0,895.96413,0,968.60987,0,1006.27803,0,1078.92377,0,1089.6861,0,1127.35426,0,1162.33184,0,2,1]},"c385cp":{"title":"385/384 comma pump scale in 284-tET","filename":"c385cp.scl","rnbo":[16,50.70423,0,202.8169,0,283.09859,0,316.90141,0,384.50704,0,435.21127,0,549.29577,0,701.40845,0,752.11268,0,781.69014,0,866.19718,0,933.80282,0,967.60563,0,1047.88732,0,1098.59155,0,2,1]},"c5120cp":{"title":"5120/5103 comma pump scale in 391-tET","filename":"c5120cp.scl","rnbo":[28,70.58824,0,85.9335,0,95.14066,0,156.52174,0,181.07417,0,205.6266,0,291.5601,0,300.76726,0,386.70077,0,411.2532,0,472.63427,0,497.1867,0,567.77494,0,592.32737,0,653.70844,0,678.26087,0,702.8133,0,788.7468,0,797.95396,0,883.88747,0,908.4399,0,969.82097,0,1028.13299,0,1089.51407,0,1114.0665,0,1150.89514,0,1175.44757,0,2,1]},"c6144cp":{"title":"6144/6125 comma pump scale in 381-tET","filename":"c6144cp.scl","rnbo":[21,47.24409,0,85.03937,0,119.68504,0,157.48031,0,204.72441,0,277.16535,0,314.96063,0,387.40157,0,434.64567,0,472.44094,0,544.88189,0,655.11811,0,702.3622,0,774.80315,0,859.84252,0,932.28346,0,970.07874,0,1017.32283,0,1089.76378,0,1127.55906,0,2,1]},"c64827cp":{"title":"64827/64000 comma pump scale in 122-tET","filename":"c64827cp.scl","rnbo":[16,147.54098,0,226.22951,0,304.91803,0,383.60656,0,462.29508,0,540.98361,0,619.67213,0,649.18033,0,698.36066,0,727.86885,0,806.55738,0,885.2459,0,963.93443,0,1042.62295,0,1121.31148,0,2,1]},"cairo":{"title":"d'Erlanger vol.5, p. 42. Congress of Arabic Music, Cairo, 1932","filename":"cairo.scl","rnbo":[26,625,607,5000,4739,400,367,1000,891,1250,1087,2000,1689,500,419,400,327,5000,3989,2500,1937,4,3,250,183,10000,7111,10000,6881,3,2,2500,1631,1000,631,1000,627,2500,1529,500,297,10000,5789,500,279,200,109,250,133,125,64,2,1]},"cal46":{"title":"Gene Ward Smith, 46 note scale for Caleb","filename":"cal46.scl","rnbo":[46,22.9251,0,56.2576,0,80.6369,0,104.0612,0,126.6171,0,160.4026,0,184.7357,0,208.171,0,231.9308,0,263.2192,0,288.7711,0,311.2289,0,336.7808,0,368.0692,0,391.829,0,415.2643,0,439.5974,0,473.3829,0,495.9388,0,519.3631,0,543.7424,0,577.0749,0,600.0,0,622.9251,0,656.2576,0,680.6369,0,704.0612,0,726.6171,0,760.4026,0,784.7357,0,808.171,0,831.9308,0,863.2192,0,888.7711,0,911.2289,0,936.7808,0,968.0692,0,991.829,0,1015.2643,0,1039.5974,0,1073.3829,0,1095.9388,0,1119.3631,0,1143.7424,0,1177.0749,0,2,1]},"canright":{"title":"David Canright's piano tuning for \"Fibonacci Suite\" (2001). Also 84-tET version of 11-limit \"Orwell\"","filename":"canright.scl","rnbo":[9,157.14286,0,271.42857,0,428.57143,0,542.85714,0,700.0,0,814.28571,0,971.42857,0,1085.71429,0,2,1]},"cantonpenta":{"title":"Freivald's Canton scale in 13-limit pentacircle (351/350 and 364/363) temperament, 271-tET","filename":"cantonpenta.scl","rnbo":[12,128.41328,0,208.11808,0,287.82288,0,416.23616,0,495.94096,0,575.64576,0,704.05904,0,783.76384,0,912.17712,0,991.88192,0,1071.58672,0,2,1]},"capurso":{"title":"Equal temperament with equal beating 3/1 = 4/1 opposite (2009). Circular Harmonic System C.HA.S.","filename":"capurso.scl","rnbo":[12,100.03832,0,200.07664,0,300.11496,0,400.15327,0,500.19159,0,600.22991,0,700.26823,0,800.30655,0,900.34487,0,1000.38318,0,1100.4215,0,1200.45982,0]},"carlos_alpha":{"title":"Wendy Carlos' Alpha scale with perfect fifth divided in nine","filename":"carlos_alpha.scl","rnbo":[18,78.0,0,156.0,0,234.0,0,312.0,0,390.0,0,468.0,0,546.0,0,624.0,0,702.0,0,780.0,0,858.0,0,936.0,0,1014.0,0,1092.0,0,1170.0,0,1248.0,0,1326.0,0,1404.0,0]},"carlos_alpha2":{"title":"Wendy Carlos' Alpha prime scale with perfect fifth divided by eightteen","filename":"carlos_alpha2.scl","rnbo":[36,39.0,0,78.0,0,117.0,0,156.0,0,195.0,0,234.0,0,273.0,0,312.0,0,351.0,0,390.0,0,429.0,0,468.0,0,507.0,0,546.0,0,585.0,0,624.0,0,663.0,0,702.0,0,741.0,0,780.0,0,819.0,0,858.0,0,897.0,0,936.0,0,975.0,0,1014.0,0,1053.0,0,1092.0,0,1131.0,0,1170.0,0,1209.0,0,1248.0,0,1287.0,0,1326.0,0,1365.0,0,1404.0,0]},"carlos_beta":{"title":"Wendy Carlos' Beta scale with perfect fifth divided by eleven","filename":"carlos_beta.scl","rnbo":[22,63.8,0,127.6,0,191.4,0,255.2,0,319.0,0,382.8,0,446.6,0,510.4,0,574.2,0,638.0,0,701.8,0,765.6,0,829.4,0,893.2,0,957.0,0,1020.8,0,1084.6,0,1148.4,0,1212.2,0,1276.0,0,1339.8,0,1403.6,0]},"carlos_beta2":{"title":"Wendy Carlos' Beta prime scale with perfect fifth divided by twentytwo","filename":"carlos_beta2.scl","rnbo":[44,31.9,0,63.8,0,95.7,0,127.6,0,159.5,0,191.4,0,223.3,0,255.2,0,287.1,0,319.0,0,350.9,0,382.8,0,414.7,0,446.6,0,478.5,0,510.4,0,542.3,0,574.2,0,606.1,0,638.0,0,669.9,0,701.8,0,733.7,0,765.6,0,797.5,0,829.4,0,861.3,0,893.2,0,925.1,0,957.0,0,988.9,0,1020.8,0,1052.7,0,1084.6,0,1116.5,0,1148.4,0,1180.3,0,1212.2,0,1244.1,0,1276.0,0,1307.9,0,1339.8,0,1371.7,0,1403.6,0]},"carlos_gamma":{"title":"Wendy Carlos' Gamma scale with third divided by eleven or fifth by twenty","filename":"carlos_gamma.scl","rnbo":[35,35.099,0,70.198,0,105.297,0,140.396,0,175.495,0,210.594,0,245.693,0,280.792,0,315.891,0,350.99,0,386.089,0,421.188,0,456.287,0,491.386,0,526.485,0,561.584,0,596.683,0,631.782,0,666.881,0,701.98,0,737.079,0,772.178,0,807.277,0,842.376,0,877.475,0,912.574,0,947.673,0,982.772,0,1017.871,0,1052.97,0,1088.069,0,1123.168,0,1158.267,0,1193.366,0,1228.465,0]},"carlos_harm":{"title":"Carlos Harmonic & Ben Johnston's scale of 'Blues' from Suite f.micr.piano (1977) & David Beardsley's scale of 'Science Friction'","filename":"carlos_harm.scl","rnbo":[12,17,16,9,8,19,16,5,4,21,16,11,8,3,2,13,8,27,16,7,4,15,8,2,1]},"carlos_super":{"title":"Carlos Super Just","filename":"carlos_super.scl","rnbo":[12,17,16,9,8,6,5,5,4,4,3,11,8,3,2,13,8,5,3,7,4,15,8,2,1]},"carlson":{"title":"Brian Carlson's guitar scale (or 7 is 21/16 instead) fretted by Mark Rankin","filename":"carlson.scl","rnbo":[19,21,20,35,32,9,8,7,6,6,5,5,4,35,27,4,3,7,5,35,24,3,2,14,9,8,5,5,3,7,4,9,5,15,8,35,18,2,1]},"cartwheel":{"title":"Andrew Heathwite's 13-limit wakalix","filename":"cartwheel.scl","rnbo":[17,28,27,13,12,9,8,7,6,11,9,5,4,4,3,11,8,13,9,3,2,14,9,13,8,5,3,7,4,11,6,15,8,2,1]},"cassandra1":{"title":"Cassandra temperament (Erv Wilson), 13-limit, g=497.866, aka Schismic, Garibaldi and Andromeda","filename":"cassandra1.scl","rnbo":[41,25.60083,0,63.73216,0,89.33299,0,114.93381,0,140.53464,0,178.66598,0,204.2668,0,229.86763,0,267.99897,0,293.59979,0,319.20062,0,344.80144,0,382.93278,0,408.53361,0,434.13443,0,472.26577,0,497.8666,0,523.46742,0,549.06825,0,587.19959,0,612.80041,0,638.40124,0,676.53258,0,702.1334,0,727.73423,0,765.86557,0,791.46639,0,817.06722,0,842.66804,0,880.79938,0,906.40021,0,932.00103,0,970.13237,0,995.7332,0,1021.33402,0,1046.93485,0,1085.06619,0,1110.66701,0,1136.26784,0,1174.39917,0,2,1]},"cassandra2":{"title":"Cassandra temperament, schismic variant, 13-limit, g=497.395","filename":"cassandra2.scl","rnbo":[41,24.44514,0,55.70922,0,86.9733,0,111.41844,0,142.68252,0,173.9466,0,198.39174,0,229.65582,0,260.9199,0,292.18398,0,316.62912,0,347.8932,0,379.15728,0,403.60242,0,434.8665,0,466.13058,0,497.39466,0,521.8398,0,553.10388,0,584.36796,0,608.8131,0,640.07718,0,671.34126,0,702.60534,0,727.05048,0,758.31456,0,789.57864,0,814.02378,0,845.28786,0,876.55194,0,900.99708,0,932.26116,0,963.52524,0,994.78932,0,1019.23446,0,1050.49854,0,1081.76262,0,1106.20776,0,1137.47184,0,1168.73592,0,2,1]},"cassmagmirrod":{"title":"Cassandra-magic-miracle-rodan Fokker block 385/384, 441/440, 225/224, 896/891 all generators -20..20","filename":"cassmagmirrod.scl","rnbo":[41,56,55,28,27,21,20,16,15,12,11,10,9,9,8,8,7,7,6,32,27,6,5,11,9,5,4,14,11,9,7,21,16,4,3,224,165,11,8,7,5,10,7,16,11,165,112,3,2,32,21,14,9,11,7,8,5,18,11,5,3,27,16,12,7,7,4,16,9,9,5,11,6,15,8,40,21,27,14,55,28,2,1]},"cassmagmonkrod":{"title":"Cassandra-magic-monkey-rodan Fokker block 385/384, 5120/5103, 100/99, 896/891 all generators -20..20","filename":"cassmagmonkrod.scl","rnbo":[41,81,80,33,32,21,20,16,15,12,11,10,9,9,8,8,7,7,6,32,27,6,5,11,9,5,4,81,64,128,99,21,16,4,3,27,20,11,8,891,640,1280,891,16,11,40,27,3,2,32,21,99,64,128,81,8,5,18,11,5,3,27,16,12,7,7,4,16,9,9,5,11,6,15,8,40,21,64,33,160,81,2,1]},"cassmagoctrod":{"title":"Cassandra-magic-octacot-rodan Fokker block 245/243, 441/440, 896/891, 100/99 all generators -20..20 (Paul Erlich, 1999)","filename":"cassmagoctrod.scl","rnbo":[41,81,80,28,27,21,20,297,280,12,11,10,9,9,8,8,7,7,6,33,28,6,5,11,9,5,4,14,11,9,7,21,16,4,3,27,20,11,8,7,5,10,7,16,11,40,27,3,2,32,21,14,9,11,7,8,5,18,11,5,3,56,33,12,7,7,4,16,9,9,5,11,6,560,297,40,21,27,14,160,81,2,1]},"cassmagsuprod":{"title":"Cassandra-magic-superkliesmic-rodan Fokker block 385/384, 441/440, 100/99, 896/891 all generators -20..20","filename":"cassmagsuprod.scl","rnbo":[41,56,55,33,32,21,20,16,15,12,11,10,9,9,8,8,7,7,6,33,28,6,5,11,9,5,4,14,11,128,99,21,16,4,3,27,20,11,8,7,5,10,7,16,11,40,27,3,2,32,21,99,64,11,7,8,5,18,11,5,3,56,33,12,7,7,4,16,9,9,5,11,6,15,8,40,21,64,33,55,28,2,1]},"cat22":{"title":"5-limit Dwarf(22) in catakleismic tempering, <197 312 457 553 681 728| tuning","filename":"cat22.scl","rnbo":[22,48.73096,0,85.27919,0,134.01015,0,201.01523,0,249.74619,0,316.75127,0,383.75635,0,432.48731,0,450.76142,0,517.7665,0,584.77157,0,633.50254,0,700.50761,0,749.23858,0,816.24365,0,834.51777,0,901.52284,0,950.25381,0,1017.25888,0,1084.26396,0,1132.99492,0,2,1]},"catakleismic34":{"title":"Catakleismic[34] 11-limit 3.5 cents lesfip optimized","filename":"catakleismic34.scl","rnbo":[34,16.49695,0,66.2954,0,84.05375,0,134.0083,0,150.79237,0,199.33786,0,249.33368,0,266.98536,0,316.80742,0,333.19956,0,383.02162,0,400.6733,0,450.66912,0,499.21461,0,515.99868,0,565.95323,0,583.71158,0,633.51003,0,650.00698,0,700.38204,0,717.29515,0,766.76698,0,816.00493,0,832.6738,0,882.78493,0,899.92196,0,950.08502,0,967.22205,0,1017.33318,0,1034.00205,0,1083.24,0,1132.71183,0,1149.62494,0,2,1]},"catakleismic34fok":{"title":"Catakleismic[34] 5-limit 15625/15552&20000/19683 Fokker transversal","filename":"catakleismic34fok.scl","rnbo":[34,250,243,25,24,3125,2916,27,25,10,9,9,8,125,108,729,625,6,5,100,81,5,4,625,486,162,125,4,3,27,20,25,18,3125,2187,36,25,40,27,3,2,125,81,25,16,8,5,81,50,5,3,1250,729,125,72,16,9,9,5,50,27,15,8,625,324,243,125,2,1]},"catakleismic34semitransversal":{"title":"17 note 2.3.7 semitransversal of Catakleismic[34]","filename":"catakleismic34semitransversal.scl","rnbo":[17,28,27,243,224,9,8,7,6,243,196,9,7,4,3,112,81,81,56,3,2,14,9,392,243,12,7,16,9,448,243,27,14,2,1]},"catakleismic34trans":{"title":"Catakleismic[34] 2.5.7 transversal","filename":"catakleismic34trans.scl","rnbo":[34,128,125,401408,390625,48828125,44957696,15625,14336,125,112,28,25,3584,3125,11239424,9765625,1953125,1605632,15625,12544,5,4,32,25,100352,78125,12845056,9765625,78125,57344,625,448,7,5,896,625,114688,78125,9765625,6422528,78125,50176,25,16,8,5,25088,15625,3211264,1953125,9765625,5619712,3125,1792,25,14,224,125,28672,15625,89915392,48828125,390625,200704,125,64,2,1]},"catler":{"title":"Catler 24-tone JI from \"Over and Under the 13 Limit\", 1/1 3(3)","filename":"catler.scl","rnbo":[24,33,32,16,15,9,8,8,7,7,6,6,5,128,105,16,13,5,4,21,16,4,3,11,8,45,32,16,11,3,2,8,5,13,8,5,3,27,16,7,4,16,9,24,13,15,8,2,1]},"cauldron":{"title":"Circulating temperament with two pure 9/7 thirds and 7 meantone, 2 slightly wide, 3 superpyth fifths","filename":"cauldron.scl","rnbo":[12,70.31346,0,189.20489,0,291.90367,0,378.40979,0,505.39755,0,567.61468,0,694.60245,0,781.10856,0,883.80734,0,1002.69878,0,1073.01223,0,2,1]},"cbrat19":{"title":"Circulating 19-tone temperament with exact brats, G.W. Smith","filename":"cbrat19.scl","rnbo":[19,3688037,3546660,9545591,8866650,197729,177333,686317,591110,6815759,5674656,441637,354666,1149379,886665,395458,295555,2468497,1773330,1280918,886665,264304,177333,28241,18188,1141103,709332,493284,295555,1026089,591110,528608,295555,329881,177333,686317,354666,2,1]},"cdia22":{"title":"Circulating 22 note scale, two 11-tET cycles 5/4 apart, 11 pure major thirds","filename":"cdia22.scl","rnbo":[22,59.04099,0,109.09091,0,168.1319,0,218.18182,0,277.2228,0,327.27273,0,5,4,436.36364,0,495.40462,0,545.45454,0,604.49553,0,654.54545,0,713.58644,0,763.63636,0,822.67735,0,872.72727,0,931.76826,0,981.81818,0,1040.85917,0,1090.90909,0,1149.95008,0,2,1]},"ceb88f":{"title":"88 cents steps with equal beating fifths","filename":"ceb88f.scl","rnbo":[13,88.21897,0,175.92057,0,264.4488,0,352.44257,0,439.93133,0,528.25538,0,616.05624,0,704.67971,0,792.76342,0,880.33719,0,968.7428,0,1056.62072,0,1144.0,0]},"ceb88s":{"title":"88 cents steps with equal beating sevenths","filename":"ceb88s.scl","rnbo":[14,88.05984,0,175.91216,0,264.14035,0,352.15228,0,439.95917,0,528.144,0,616.11482,0,703.88273,0,792.03035,0,879.96589,0,967.70033,0,1055.81601,0,1143.72127,0,1232.0,0]},"ceb88t":{"title":"88 cents steps with equal beating 7/6 thirds","filename":"ceb88t.scl","rnbo":[14,87.59652,0,175.92414,0,262.95957,0,350.74928,0,439.26203,0,526.47086,0,614.42684,0,703.09889,0,790.45689,0,878.55589,0,967.36495,0,1054.85122,0,1143.07317,0,1232.0,0]},"cet10":{"title":"20th root of 9/8, on Antonio Soler's tuning box, afinador or templante","filename":"cet10.scl","rnbo":[118,10.1955,0,20.391,0,30.5865,0,40.782,0,50.9775,0,61.173,0,71.3685,0,81.564,0,91.7595,0,101.955,0,112.1505,0,122.346,0,132.5415,0,142.737,0,152.9325,0,163.128,0,173.3235,0,183.519,0,193.7145,0,9,8,214.1055,0,224.301,0,234.4965,0,244.692,0,254.8875,0,265.083,0,275.2785,0,285.474,0,295.6695,0,305.865,0,316.0605,0,326.256,0,336.4515,0,346.647,0,356.8425,0,367.038,0,377.2335,0,387.429,0,397.6245,0,81,64,418.0155,0,428.211,0,438.4065,0,448.602,0,458.7975,0,468.993,0,479.1885,0,489.384,0,499.5795,0,509.775,0,519.9705,0,530.166,0,540.3615,0,550.557,0,560.7525,0,570.948,0,581.1435,0,591.33901,0,601.53451,0,729,512,621.92551,0,632.12101,0,642.31651,0,652.51201,0,662.70751,0,672.90301,0,683.09851,0,693.29401,0,703.48951,0,713.68501,0,723.88051,0,734.07601,0,744.27151,0,754.46701,0,764.66251,0,774.85801,0,785.05351,0,795.24901,0,805.44451,0,6561,4096,825.83551,0,836.03101,0,846.22651,0,856.42201,0,866.61751,0,876.81301,0,887.00851,0,897.20401,0,907.39951,0,917.59501,0,927.79051,0,937.98601,0,948.18151,0,958.37701,0,968.57251,0,978.76801,0,988.96351,0,999.15901,0,1009.35451,0,59049,32768,1029.74551,0,1039.94101,0,1050.13651,0,1060.33201,0,1070.52751,0,1080.72301,0,1090.91851,0,1101.11401,0,1111.30951,0,1121.50501,0,1131.70051,0,1141.89601,0,1152.09151,0,1162.28701,0,1172.48251,0,1182.67801,0,1192.87351,0,1203.06901,0]},"cet100":{"title":"28th root of 5","filename":"cet100.scl","rnbo":[28,99.5112,0,199.02241,0,298.53361,0,398.04482,0,497.55602,0,597.06722,0,696.57843,0,796.08963,0,895.60084,0,995.11204,0,1094.62324,0,1194.13445,0,1293.64565,0,1393.15686,0,1492.66806,0,1592.17927,0,1691.69047,0,1791.20167,0,1890.71288,0,1990.22408,0,2089.73529,0,2189.24649,0,2288.75769,0,2388.2689,0,2487.7801,0,2587.29131,0,2686.80251,0,5,1]},"cet100a":{"title":"12-tET 5-limit TOP tuning","filename":"cet100a.scl","rnbo":[12,99.80617,0,199.61234,0,299.41852,0,399.22469,0,499.03086,0,598.83703,0,698.64321,0,798.44938,0,898.25555,0,998.06172,0,1097.8679,0,1197.67407,0]},"cet100b":{"title":"12-tET 5-limit TOP-RMS tuning","filename":"cet100b.scl","rnbo":[12,99.87003,0,199.74006,0,299.61009,0,399.48012,0,499.35014,0,599.22017,0,699.0902,0,798.96023,0,898.83026,0,998.70029,0,1098.57032,0,1198.44035,0]},"cet100c":{"title":"step is 6 ^ 1/pi^3","filename":"cet100c.scl","rnbo":[12,100.04281,0,200.08562,0,300.12843,0,400.17123,0,500.21404,0,600.25685,0,700.29966,0,800.34247,0,900.38528,0,1000.42809,0,1100.47089,0,1200.5137,0]},"cet104":{"title":"23rd root of 4, Tútim Dennsuul","filename":"cet104.scl","rnbo":[23,104.34783,0,208.69565,0,313.04348,0,417.3913,0,521.73913,0,626.08696,0,730.43478,0,834.78261,0,939.13043,0,1043.47826,0,1147.82609,0,1252.17391,0,1356.52174,0,1460.86957,0,1565.21739,0,1669.56522,0,1773.91304,0,1878.26087,0,1982.6087,0,2086.95652,0,2191.30435,0,2295.65217,0,4,1]},"cet104a":{"title":"38th root of 10","filename":"cet104a.scl","rnbo":[38,104.90299,0,209.80598,0,314.70898,0,419.61197,0,524.51496,0,629.41795,0,734.32095,0,839.22394,0,944.12693,0,1049.02992,0,1153.93292,0,1258.83591,0,1363.7389,0,1468.64189,0,1573.54489,0,1678.44788,0,1783.35087,0,1888.25386,0,1993.15686,0,2098.05985,0,2202.96284,0,2307.86583,0,2412.76883,0,2517.67182,0,2622.57481,0,2727.4778,0,2832.3808,0,2937.28379,0,3042.18678,0,3147.08977,0,3251.99277,0,3356.89576,0,3461.79875,0,3566.70174,0,3671.60474,0,3776.50773,0,3881.41072,0,10,1]},"cet105":{"title":"13th root of 11/5, has very good 6/5 and 13/8","filename":"cet105.scl","rnbo":[13,105.00033,0,210.00065,0,315.00098,0,420.0013,0,525.00163,0,630.00195,0,735.00228,0,840.0026,0,945.00293,0,1050.00325,0,1155.00358,0,1260.0039,0,11,5]},"cet105a":{"title":"18th root of 3","filename":"cet105a.scl","rnbo":[18,105.66417,0,211.32833,0,316.9925,0,422.65667,0,528.32083,0,633.985,0,739.64917,0,845.31333,0,950.9775,0,1056.64167,0,1162.30583,0,1267.97,0,1373.63417,0,1479.29833,0,1584.9625,0,1690.62667,0,1796.29083,0,3,1]},"cet108":{"title":"4th root of 9/7, Chris Vaisvil","filename":"cet108.scl","rnbo":[11,108.77102,0,217.54205,0,326.31307,0,9,7,543.85512,0,652.62614,0,761.39717,0,81,49,978.93921,0,1087.71024,0,1196.48126,0]},"cet109":{"title":"LS optimal 11-tET 2.7.9.11.15.17 JI subgroup tuning","filename":"cet109.scl","rnbo":[11,108.91867,0,217.83734,0,326.756,0,435.67467,0,544.59334,0,653.51201,0,762.43068,0,871.34934,0,980.26801,0,1089.18668,0,1198.10535,0]},"cet11":{"title":"36th root of 5/4, Mohajeri Shahin","filename":"cet11.scl","rnbo":[112,10.73094,0,21.46187,0,32.19281,0,42.92375,0,53.65468,0,64.38562,0,75.11656,0,85.84749,0,96.57843,0,107.30936,0,118.0403,0,128.77124,0,139.50217,0,150.23311,0,160.96405,0,171.69498,0,182.42592,0,193.15686,0,203.88779,0,214.61873,0,225.34967,0,236.0806,0,246.81154,0,257.54248,0,268.27341,0,279.00435,0,289.73529,0,300.46622,0,311.19716,0,321.92809,0,332.65903,0,343.38997,0,354.1209,0,364.85184,0,375.58278,0,5,4,397.04465,0,407.77559,0,418.50652,0,429.23746,0,439.9684,0,450.69933,0,461.43027,0,472.16121,0,482.89214,0,493.62308,0,504.35402,0,515.08495,0,525.81589,0,536.54682,0,547.27776,0,558.0087,0,568.73963,0,579.47057,0,590.20151,0,600.93244,0,611.66338,0,622.39432,0,633.12525,0,643.85619,0,654.58713,0,665.31806,0,676.049,0,686.77994,0,697.51087,0,708.24181,0,718.97275,0,729.70368,0,740.43462,0,751.16555,0,761.89649,0,25,16,783.35836,0,794.0893,0,804.82024,0,815.55117,0,826.28211,0,837.01305,0,847.74398,0,858.47492,0,869.20586,0,879.93679,0,890.66773,0,901.39867,0,912.1296,0,922.86054,0,933.59148,0,944.32241,0,955.05335,0,965.78428,0,976.51522,0,987.24616,0,997.97709,0,1008.70803,0,1019.43897,0,1030.1699,0,1040.90084,0,1051.63178,0,1062.36271,0,1073.09365,0,1083.82459,0,1094.55552,0,1105.28646,0,1116.0174,0,1126.74833,0,1137.47927,0,1148.21021,0,125,64,1169.67208,0,1180.40301,0,1191.13395,0,1201.86489,0]},"cet111":{"title":"25th root of 5, Karlheinz Stockhausen in \"Studie II\" (1954)","filename":"cet111.scl","rnbo":[25,111.45255,0,222.9051,0,334.35765,0,445.81019,0,557.26274,0,668.71529,0,780.16784,0,891.62039,0,1003.07294,0,1114.52549,0,1225.97803,0,1337.43058,0,1448.88313,0,1560.33568,0,1671.78823,0,1783.24078,0,1894.69333,0,2006.14587,0,2117.59842,0,2229.05097,0,2340.50352,0,2451.95607,0,2563.40862,0,2674.86117,0,5,1]},"cet111a":{"title":"17th root of 3. McLaren 'Microtonal Music', volume 1, track 8","filename":"cet111a.scl","rnbo":[17,111.87971,0,223.75941,0,335.63912,0,447.51882,0,559.39853,0,671.27824,0,783.15794,0,895.03765,0,1006.91735,0,1118.79706,0,1230.67677,0,1342.55647,0,1454.43618,0,1566.31588,0,1678.19559,0,1790.07529,0,3,1]},"cet112":{"title":"53rd root of 31. McLaren 'Microtonal Music', volume 4, track 16","filename":"cet112.scl","rnbo":[53,112.17048,0,224.34096,0,336.51145,0,448.68193,0,560.85241,0,673.02289,0,785.19338,0,897.36386,0,1009.53434,0,1121.70482,0,1233.87531,0,1346.04579,0,1458.21627,0,1570.38675,0,1682.55724,0,1794.72772,0,1906.8982,0,2019.06868,0,2131.23917,0,2243.40965,0,2355.58013,0,2467.75061,0,2579.9211,0,2692.09158,0,2804.26206,0,2916.43254,0,3028.60303,0,3140.77351,0,3252.94399,0,3365.11447,0,3477.28496,0,3589.45544,0,3701.62592,0,3813.7964,0,3925.96689,0,4038.13737,0,4150.30785,0,4262.47833,0,4374.64882,0,4486.8193,0,4598.98978,0,4711.16026,0,4823.33075,0,4935.50123,0,5047.67171,0,5159.84219,0,5272.01268,0,5384.18316,0,5496.35364,0,5608.52412,0,5720.69461,0,5832.86509,0,31,1]},"cet112a":{"title":"30th root of 7","filename":"cet112a.scl","rnbo":[30,112.2942,0,224.58839,0,336.88259,0,449.17679,0,561.47098,0,673.76518,0,786.05938,0,898.35358,0,1010.64777,0,1122.94197,0,1235.23617,0,1347.53036,0,1459.82456,0,1572.11876,0,1684.41295,0,1796.70715,0,1909.00135,0,2021.29554,0,2133.58974,0,2245.88394,0,2358.17813,0,2470.47233,0,2582.76653,0,2695.06073,0,2807.35492,0,2919.64912,0,3031.94332,0,3144.23751,0,3256.53171,0,7,1]},"cet114":{"title":"21st root of 4","filename":"cet114.scl","rnbo":[21,114.28571,0,228.57143,0,342.85714,0,457.14286,0,571.42857,0,685.71429,0,800.0,0,914.28571,0,1028.57143,0,1142.85714,0,1257.14286,0,1371.42857,0,1485.71429,0,1600.0,0,1714.28571,0,1828.57143,0,1942.85714,0,2057.14286,0,2171.42857,0,2285.71429,0,4,1]},"cet115":{"title":"2nd root of 8/7. Werner Linden, Musiktheorie, 2003 no.1 midi 15.Eb=19.44544 Hz","filename":"cet115.scl","rnbo":[10,115.58705,0,8,7,346.76114,0,64,49,577.93523,0,512,343,809.10933,0,4096,2401,1040.28342,0,32768,16807]},"cet116":{"title":"31st root of 8, Jake Freivald in \"A Call in Summer\"","filename":"cet116.scl","rnbo":[31,116.12903,0,232.25806,0,348.3871,0,464.51613,0,580.64516,0,696.77419,0,812.90323,0,929.03226,0,1045.16129,0,1161.29032,0,1277.41935,0,1393.54839,0,1509.67742,0,1625.80645,0,1741.93548,0,1858.06452,0,1974.19355,0,2090.32258,0,2206.45161,0,2322.58065,0,2438.70968,0,2554.83871,0,2670.96774,0,2787.09677,0,2903.22581,0,3019.35484,0,3135.48387,0,3251.6129,0,3367.74194,0,3483.87097,0,8,1]},"cet117":{"title":"72nd root of 128, step = generator of Miracle","filename":"cet117.scl","rnbo":[36,116.66667,0,233.33333,0,350.0,0,466.66667,0,583.33333,0,700.0,0,816.66667,0,933.33333,0,1050.0,0,1166.66667,0,1283.33333,0,1400.0,0,1516.66667,0,1633.33333,0,1750.0,0,1866.66667,0,1983.33333,0,2100.0,0,2216.66667,0,2333.33333,0,2450.0,0,2566.66667,0,2683.33333,0,2800.0,0,2916.66667,0,3033.33333,0,3150.0,0,3266.66667,0,3383.33333,0,3500.0,0,3616.66667,0,3733.33333,0,3850.0,0,3966.66667,0,4083.33333,0,4200.0,0]},"cet117a":{"title":"6th root of 3/2","filename":"cet117a.scl","rnbo":[11,116.9925,0,233.985,0,350.9775,0,467.97,0,584.9625,0,3,2,818.9475,0,935.94,0,1052.9325,0,1169.925,0,1286.9175,0]},"cet118":{"title":"16th root of 3. 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(1984)","filename":"cet38.scl","rnbo":[67,38.86433,0,77.72866,0,116.59299,0,155.45731,0,194.32164,0,233.18597,0,272.0503,0,310.91463,0,349.77896,0,388.64328,0,427.50761,0,466.37194,0,505.23627,0,544.1006,0,582.96493,0,621.82925,0,660.69358,0,699.55791,0,738.42224,0,777.28657,0,816.1509,0,855.01522,0,893.87955,0,932.74388,0,971.60821,0,1010.47254,0,1049.33687,0,1088.20119,0,1127.06552,0,1165.92985,0,1204.79418,0,1243.65851,0,1282.52284,0,1321.38717,0,1360.25149,0,1399.11582,0,1437.98015,0,1476.84448,0,1515.70881,0,1554.57314,0,1593.43746,0,1632.30179,0,1671.16612,0,1710.03045,0,1748.89478,0,1787.75911,0,1826.62343,0,1865.48776,0,1904.35209,0,1943.21642,0,1982.08075,0,2020.94508,0,2059.8094,0,2098.67373,0,2137.53806,0,2176.40239,0,2215.26672,0,2254.13105,0,2292.99537,0,2331.8597,0,2370.72403,0,2409.58836,0,2448.45269,0,2487.31702,0,2526.18134,0,2565.04567,0,9,2]},"cet39":{"title":"49th root of 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Scott","filename":"cet39e.scl","rnbo":[15,38.83415,0,77.66829,0,116.50244,0,155.33658,0,194.17073,0,233.00488,0,271.83902,0,310.67317,0,349.50732,0,388.34146,0,427.17561,0,466.00975,0,504.8439,0,543.67805,0,7,5]},"cet39f":{"title":"10th root of 5/4","filename":"cet39f.scl","rnbo":[31,38.63137,0,77.26274,0,115.89411,0,154.52549,0,193.15686,0,231.78823,0,270.4196,0,309.05097,0,347.68234,0,5,4,424.94509,0,463.57646,0,502.20783,0,540.8392,0,579.47057,0,618.10194,0,656.73331,0,695.36468,0,733.99606,0,25,16,811.2588,0,849.89017,0,888.52154,0,927.15291,0,965.78428,0,1004.41566,0,1043.04703,0,1081.6784,0,1120.30977,0,125,64,1197.57251,0]},"cet39g":{"title":"31-tET 11-limit TOP-RMS tuning","filename":"cet39g.scl","rnbo":[31,38.74856,0,77.49712,0,116.24568,0,154.99423,0,193.74279,0,232.49135,0,271.23991,0,309.98847,0,348.73703,0,387.48559,0,426.23414,0,464.9827,0,503.73126,0,542.47982,0,581.22838,0,619.97694,0,658.7255,0,697.47405,0,736.22261,0,774.97117,0,813.71973,0,852.46829,0,891.21685,0,929.96541,0,968.71396,0,1007.46252,0,1046.21108,0,1084.95964,0,1123.7082,0,1162.45676,0,1201.20532,0]},"cet43":{"title":"9th root of 5/4, Samuel Pellman","filename":"cet43.scl","rnbo":[28,42.92375,0,85.84749,0,128.77124,0,171.69498,0,214.61873,0,257.54248,0,300.46622,0,343.38997,0,5,4,429.23746,0,472.16121,0,515.08495,0,558.0087,0,600.93244,0,643.85619,0,686.77994,0,729.70368,0,25,16,815.55117,0,858.47492,0,901.39867,0,944.32241,0,987.24616,0,1030.1699,0,1073.09365,0,1116.0174,0,125,64,1201.86489,0]},"cet44":{"title":"least maximum error of 10.0911 cents to a set of 11-limit consonances","filename":"cet44.scl","rnbo":[28,44.03239,0,88.06478,0,132.09717,0,176.12956,0,220.16195,0,264.19434,0,308.22673,0,352.25912,0,396.29151,0,440.3239,0,484.35629,0,528.38868,0,572.42107,0,616.45346,0,660.48585,0,704.51824,0,748.55063,0,792.58302,0,836.61541,0,880.6478,0,924.68019,0,968.71258,0,1012.74497,0,1056.77736,0,1100.80975,0,1144.84214,0,1188.87453,0,1232.90692,0]},"cet44a":{"title":"91th root of 10, Jim Kukula","filename":"cet44a.scl","rnbo":[91,43.80565,0,87.61129,0,131.41694,0,175.22258,0,219.02823,0,262.83387,0,306.63952,0,350.44516,0,394.25081,0,438.05645,0,481.8621,0,525.66774,0,569.47339,0,613.27903,0,657.08468,0,700.89032,0,744.69597,0,788.50161,0,832.30726,0,876.1129,0,919.91855,0,963.72419,0,1007.52984,0,1051.33548,0,1095.14113,0,1138.94678,0,1182.75242,0,1226.55807,0,1270.36371,0,1314.16936,0,1357.975,0,1401.78065,0,1445.58629,0,1489.39194,0,1533.19758,0,1577.00323,0,1620.80887,0,1664.61452,0,1708.42016,0,1752.22581,0,1796.03145,0,1839.8371,0,1883.64274,0,1927.44839,0,1971.25403,0,2015.05968,0,2058.86532,0,2102.67097,0,2146.47662,0,2190.28226,0,2234.08791,0,2277.89355,0,2321.6992,0,2365.50484,0,2409.31049,0,2453.11613,0,2496.92178,0,2540.72742,0,2584.53307,0,2628.33871,0,2672.14436,0,2715.95,0,2759.75565,0,2803.56129,0,2847.36694,0,2891.17258,0,2934.97823,0,2978.78387,0,3022.58952,0,3066.39516,0,3110.20081,0,3154.00645,0,3197.8121,0,3241.61775,0,3285.42339,0,3329.22904,0,3373.03468,0,3416.84033,0,3460.64597,0,3504.45162,0,3548.25726,0,3592.06291,0,3635.86855,0,3679.6742,0,3723.47984,0,3767.28549,0,3811.09113,0,3854.89678,0,3898.70242,0,3942.50807,0,10,1]},"cet44b":{"title":"16th root of 3/2","filename":"cet44b.scl","rnbo":[16,43.87219,0,87.74438,0,131.61656,0,175.48875,0,219.36094,0,263.23313,0,307.10531,0,350.9775,0,394.84969,0,438.72188,0,482.59406,0,526.46625,0,570.33844,0,614.21063,0,658.08281,0,3,2]},"cet45":{"title":"11th root of 4/3","filename":"cet45.scl","rnbo":[11,45.27682,0,90.55364,0,135.83045,0,181.10727,0,226.38409,0,271.66091,0,316.93773,0,362.21454,0,407.49136,0,452.76818,0,4,3]},"cet45a":{"title":"13th root of 7/5, X.J. Scott","filename":"cet45a.scl","rnbo":[13,44.80863,0,89.61726,0,134.42589,0,179.23452,0,224.04315,0,268.85178,0,313.66041,0,358.46904,0,403.27767,0,448.0863,0,492.89493,0,537.70356,0,7,5]},"cet46":{"title":"18th root of phi, Walter O´Connell (1993)","filename":"cet46.scl","rnbo":[18,46.28279,0,92.56559,0,138.84838,0,185.13118,0,231.41397,0,277.69677,0,323.97956,0,370.26235,0,416.54515,0,462.82794,0,509.11074,0,555.39353,0,601.67633,0,647.95912,0,694.24191,0,740.52471,0,786.8075,0,833.0903,0]},"cet48":{"title":"30th root of 7/3","filename":"cet48.scl","rnbo":[30,48.8957,0,97.79139,0,146.68709,0,195.58279,0,244.47848,0,293.37418,0,342.26988,0,391.16557,0,440.06127,0,488.95697,0,537.85267,0,586.74836,0,635.64406,0,684.53976,0,733.43545,0,782.33115,0,831.22685,0,880.12254,0,929.01824,0,977.91394,0,1026.80963,0,1075.70533,0,1124.60103,0,1173.49672,0,1222.39242,0,1271.28812,0,1320.18382,0,1369.07951,0,1417.97521,0,7,3]},"cet49":{"title":"39th root of 3, Triple Bohlen-Pierce, good 3.5.7.11.13 system","filename":"cet49.scl","rnbo":[39,48.76808,0,97.53615,0,146.30423,0,195.07231,0,243.84038,0,292.60846,0,341.37654,0,390.14462,0,438.91269,0,487.68077,0,536.44885,0,585.21692,0,633.985,0,682.75308,0,731.52115,0,780.28923,0,829.05731,0,877.82539,0,926.59346,0,975.36154,0,1024.12962,0,1072.89769,0,1121.66577,0,1170.43385,0,1219.20192,0,1267.97,0,1316.73808,0,1365.50615,0,1414.27423,0,1463.04231,0,1511.81039,0,1560.57846,0,1609.34654,0,1658.11462,0,1706.88269,0,1755.65077,0,1804.41885,0,1853.18692,0,3,1]},"cet50":{"title":"14th root of 3/2, stretched 24-tET","filename":"cet50.scl","rnbo":[24,50.13964,0,100.27929,0,150.41893,0,200.55857,0,250.69821,0,300.83786,0,350.9775,0,401.11714,0,451.25679,0,501.39643,0,551.53607,0,601.67572,0,651.81536,0,3,2,752.09464,0,802.23429,0,852.37393,0,902.51357,0,952.65322,0,1002.79286,0,1052.9325,0,1103.07214,0,1153.21179,0,1203.35143,0]},"cet51":{"title":"47nd root of 4","filename":"cet51.scl","rnbo":[47,51.06383,0,102.12766,0,153.19149,0,204.25532,0,255.31915,0,306.38298,0,357.44681,0,408.51064,0,459.57447,0,510.6383,0,561.70213,0,612.76596,0,663.82979,0,714.89362,0,765.95745,0,817.02128,0,868.08511,0,919.14894,0,970.21277,0,1021.2766,0,1072.34043,0,1123.40426,0,1174.46809,0,1225.53191,0,1276.59574,0,1327.65957,0,1378.7234,0,1429.78723,0,1480.85106,0,1531.91489,0,1582.97872,0,1634.04255,0,1685.10638,0,1736.17021,0,1787.23404,0,1838.29787,0,1889.3617,0,1940.42553,0,1991.48936,0,2042.55319,0,2093.61702,0,2144.68085,0,2195.74468,0,2246.80851,0,2297.87234,0,2348.93617,0,4,1]},"cet53":{"title":"5th root of 7/6, X.J. Scott","filename":"cet53.scl","rnbo":[5,53.37418,0,106.74836,0,160.12254,0,213.49672,0,7,6]},"cet54":{"title":"62nd root of 7","filename":"cet54.scl","rnbo":[62,54.3359,0,108.6718,0,163.00771,0,217.34361,0,271.67951,0,326.01541,0,380.35131,0,434.68721,0,489.02312,0,543.35902,0,597.69492,0,652.03082,0,706.36672,0,760.70262,0,815.03853,0,869.37443,0,923.71033,0,978.04623,0,1032.38213,0,1086.71803,0,1141.05394,0,1195.38984,0,1249.72574,0,1304.06164,0,1358.39754,0,1412.73344,0,1467.06935,0,1521.40525,0,1575.74115,0,1630.07705,0,1684.41295,0,1738.74885,0,1793.08476,0,1847.42066,0,1901.75656,0,1956.09246,0,2010.42836,0,2064.76427,0,2119.10017,0,2173.43607,0,2227.77197,0,2282.10787,0,2336.44377,0,2390.77968,0,2445.11558,0,2499.45148,0,2553.78738,0,2608.12328,0,2662.45918,0,2716.79509,0,2771.13099,0,2825.46689,0,2879.80279,0,2934.13869,0,2988.47459,0,3042.8105,0,3097.1464,0,3151.4823,0,3205.8182,0,3260.1541,0,3314.49,0,7,1]},"cet54a":{"title":"101st root of 24","filename":"cet54a.scl","rnbo":[101,54.4748,0,108.9496,0,163.42441,0,217.89921,0,272.37401,0,326.84881,0,381.32361,0,435.79842,0,490.27322,0,544.74802,0,599.22282,0,653.69762,0,708.17243,0,762.64723,0,817.12203,0,871.59683,0,926.07163,0,980.54644,0,1035.02124,0,1089.49604,0,1143.97084,0,1198.44564,0,1252.92045,0,1307.39525,0,1361.87005,0,1416.34485,0,1470.81965,0,1525.29446,0,1579.76926,0,1634.24406,0,1688.71886,0,1743.19366,0,1797.66847,0,1852.14327,0,1906.61807,0,1961.09287,0,2015.56767,0,2070.04248,0,2124.51728,0,2178.99208,0,2233.46688,0,2287.94168,0,2342.41649,0,2396.89129,0,2451.36609,0,2505.84089,0,2560.31569,0,2614.7905,0,2669.2653,0,2723.7401,0,2778.2149,0,2832.6897,0,2887.16451,0,2941.63931,0,2996.11411,0,3050.58891,0,3105.06371,0,3159.53852,0,3214.01332,0,3268.48812,0,3322.96292,0,3377.43772,0,3431.91253,0,3486.38733,0,3540.86213,0,3595.33693,0,3649.81173,0,3704.28654,0,3758.76134,0,3813.23614,0,3867.71094,0,3922.18574,0,3976.66055,0,4031.13535,0,4085.61015,0,4140.08495,0,4194.55975,0,4249.03456,0,4303.50936,0,4357.98416,0,4412.45896,0,4466.93376,0,4521.40857,0,4575.88337,0,4630.35817,0,4684.83297,0,4739.30777,0,4793.78258,0,4848.25738,0,4902.73218,0,4957.20698,0,5011.68178,0,5066.15658,0,5120.63139,0,5175.10619,0,5229.58099,0,5284.05579,0,5338.53059,0,5393.0054,0,5447.4802,0,24,1]},"cet54b":{"title":"35th root of 3 or shrunk 22-tET","filename":"cet54b.scl","rnbo":[35,54.34157,0,108.68314,0,163.02471,0,217.36629,0,271.70786,0,326.04943,0,380.391,0,434.73257,0,489.07414,0,543.41571,0,597.75729,0,652.09886,0,706.44043,0,760.782,0,815.12357,0,869.46514,0,923.80671,0,978.14829,0,1032.48986,0,1086.83143,0,1141.173,0,1195.51457,0,1249.85614,0,1304.19771,0,1358.53929,0,1412.88086,0,1467.22243,0,1521.564,0,1575.90557,0,1630.24714,0,1684.58872,0,1738.93029,0,1793.27186,0,1847.61343,0,3,1]},"cet54c":{"title":"22-tET 11-limit TOP tuning","filename":"cet54c.scl","rnbo":[22,54.48435,0,108.96869,0,163.45304,0,217.93738,0,272.42173,0,326.90607,0,381.39042,0,435.87476,0,490.35911,0,544.84345,0,599.3278,0,653.81214,0,708.29649,0,762.78083,0,817.26518,0,871.74953,0,926.23387,0,980.71822,0,1035.20256,0,1089.68691,0,1144.17125,0,1198.6556,0]},"cet54d":{"title":"22-tET 11-limit TOP-RMS 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Scott","filename":"cet67.scl","rnbo":[14,66.65208,0,133.30416,0,199.95623,0,266.60831,0,333.26039,0,399.91247,0,466.56455,0,533.21663,0,599.8687,0,666.52078,0,733.17286,0,799.82494,0,866.47702,0,12,7]},"cet67a":{"title":"28th root of 3, Carlo Serafini","filename":"cet67a.scl","rnbo":[28,67.92696,0,135.85393,0,203.78089,0,271.70786,0,339.63482,0,407.56179,0,475.48875,0,543.41571,0,611.34268,0,679.26964,0,747.19661,0,815.12357,0,883.05054,0,950.9775,0,1018.90446,0,1086.83143,0,1154.75839,0,1222.68536,0,1290.61232,0,1358.53929,0,1426.46625,0,1494.39321,0,1562.32018,0,1630.24714,0,1698.17411,0,1766.10107,0,1834.02804,0,3,1]},"cet68":{"title":"3rd root of 9/8","filename":"cet68.scl","rnbo":[18,67.97,0,135.94,0,9,8,271.88,0,339.85,0,81,64,475.79,0,543.76,0,729,512,679.70001,0,747.67001,0,6561,4096,883.61001,0,951.58001,0,59049,32768,1087.52001,0,1155.49001,0,531441,262144]},"cet68a":{"title":"49th root of 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7/3","filename":"cet77.scl","rnbo":[19,77.20373,0,154.40746,0,231.6112,0,308.81493,0,386.01866,0,463.22239,0,540.42612,0,617.62985,0,694.83359,0,772.03732,0,849.24105,0,926.44478,0,1003.64851,0,1080.85225,0,1158.05598,0,1235.25971,0,1312.46344,0,1389.66717,0,7,3]},"cet78":{"title":"9th root of 3/2","filename":"cet78.scl","rnbo":[9,77.995,0,155.99,0,233.985,0,311.98,0,389.975,0,467.97,0,545.965,0,623.96,0,3,2]},"cet78a":{"title":"43rd root of 7, stretched Carlos 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5","filename":"cet80.scl","rnbo":[35,79.60896,0,159.21793,0,238.82689,0,318.43585,0,398.04482,0,477.65378,0,557.26274,0,636.87171,0,716.48067,0,796.08963,0,875.6986,0,955.30756,0,1034.91652,0,1114.52549,0,1194.13445,0,1273.74341,0,1353.35238,0,1432.96134,0,1512.5703,0,1592.17927,0,1671.78823,0,1751.39719,0,1831.00615,0,1910.61512,0,1990.22408,0,2069.83304,0,2149.44201,0,2229.05097,0,2308.65993,0,2388.2689,0,2467.87786,0,2547.48682,0,2627.09579,0,2706.70475,0,5,1]},"cet83":{"title":"83.33333 cent steps by Alexander Nemtin (1963)","filename":"cet83.scl","rnbo":[15,83.33333,0,166.66667,0,250.0,0,333.33333,0,416.66667,0,500.0,0,583.33333,0,666.66667,0,750.0,0,833.33333,0,916.66667,0,1000.0,0,1083.33333,0,1166.66667,0,1250.0,0]},"cet83a":{"title":"48th root of 10","filename":"cet83a.scl","rnbo":[48,83.0482,0,166.0964,0,249.14461,0,332.19281,0,415.24101,0,498.28921,0,581.33742,0,664.38562,0,747.43382,0,830.48202,0,913.53023,0,996.57843,0,1079.62663,0,1162.67483,0,1245.72304,0,1328.77124,0,1411.81944,0,1494.86764,0,1577.91585,0,1660.96405,0,1744.01225,0,1827.06045,0,1910.10865,0,1993.15686,0,2076.20506,0,2159.25326,0,2242.30146,0,2325.34967,0,2408.39787,0,2491.44607,0,2574.49427,0,2657.54248,0,2740.59068,0,2823.63888,0,2906.68708,0,2989.73529,0,3072.78349,0,3155.83169,0,3238.87989,0,3321.92809,0,3404.9763,0,3488.0245,0,3571.0727,0,3654.1209,0,3737.16911,0,3820.21731,0,3903.26551,0,10,1]},"cet84":{"title":"33rd root of 5","filename":"cet84.scl","rnbo":[33,84.43375,0,168.8675,0,253.30125,0,337.735,0,422.16874,0,506.60249,0,591.03624,0,675.46999,0,759.90374,0,844.33749,0,928.77124,0,1013.20499,0,1097.63874,0,1182.07248,0,1266.50623,0,1350.93998,0,1435.37373,0,1519.80748,0,1604.24123,0,1688.67498,0,1773.10873,0,1857.54248,0,1941.97622,0,2026.40997,0,2110.84372,0,2195.27747,0,2279.71122,0,2364.14497,0,2448.57872,0,2533.01247,0,2617.44622,0,2701.87996,0,5,1]},"cet86":{"title":"22nd root of 3","filename":"cet86.scl","rnbo":[22,86.4525,0,172.905,0,259.3575,0,345.81,0,432.2625,0,518.715,0,605.1675,0,691.62,0,778.0725,0,864.525,0,950.9775,0,1037.43,0,1123.8825,0,1210.335,0,1296.7875,0,1383.24,0,1469.6925,0,1556.145,0,1642.5975,0,1729.05,0,1815.5025,0,3,1]},"cet87":{"title":"Least-squares stretched ET to telephone dial tones. 1/1=697 Hz","filename":"cet87.scl","rnbo":[15,86.67933,0,173.35867,0,260.038,0,346.71733,0,433.39667,0,520.076,0,606.75533,0,693.43467,0,780.114,0,866.79333,0,953.47267,0,1040.152,0,1126.83133,0,1213.51067,0,1300.19,0]},"cet88":{"title":"88.0 cents steps by Gary Morrison alias mr88cet","filename":"cet88.scl","rnbo":[14,88.0,0,176.0,0,264.0,0,352.0,0,440.0,0,528.0,0,616.0,0,704.0,0,792.0,0,880.0,0,968.0,0,1056.0,0,1144.0,0,1232.0,0]},"cet88_snake":{"title":"3+1 mode of 88cET, nicknamed Snake by Andrew Heathwaite","filename":"cet88_snake.scl","rnbo":[21,264.0,0,352.0,0,616.0,0,704.0,0,968.0,0,1056.0,0,1320.0,0,1408.0,0,1672.0,0,1760.0,0,2024.0,0,2112.0,0,2376.0,0,2464.0,0,2728.0,0,2816.0,0,3080.0,0,3168.0,0,3432.0,0,3520.0,0,3608.0,0]},"cet88b":{"title":"87.97446 cent steps. Least squares for 7/6, 11/9, 10/7, 3/2, 7/4","filename":"cet88b.scl","rnbo":[14,87.97446,0,175.94891,0,263.92337,0,351.89782,0,439.87228,0,527.84674,0,615.82119,0,703.79565,0,791.7701,0,879.74456,0,967.71902,0,1055.69347,0,1143.66793,0,1231.64238,0]},"cet88b2":{"title":"87.75412 cent steps. Minimax for 7/6, 11/9, 10/7, 3/2, 7/4","filename":"cet88b2.scl","rnbo":[14,87.75412,0,175.50824,0,263.26236,0,351.01648,0,438.7706,0,526.52472,0,614.27884,0,702.03296,0,789.78708,0,877.5412,0,965.29532,0,1053.04944,0,1140.80356,0,1228.55768,0]},"cet88b3":{"title":"87.84635 cent steps. Minimax for 3, 5, 7, 8, 11","filename":"cet88b3.scl","rnbo":[14,87.84635,0,175.6927,0,263.53905,0,351.38539,0,439.23174,0,527.07809,0,614.92444,0,702.77079,0,790.61714,0,878.46348,0,966.30983,0,1054.15618,0,1142.00253,0,1229.84888,0]},"cet88b4":{"title":"87.80488 cent steps. Least squares for 3, 5, 7, 8, 11","filename":"cet88b4.scl","rnbo":[14,87.80488,0,175.60976,0,263.41463,0,351.21951,0,439.02439,0,526.82927,0,614.63415,0,702.43902,0,790.2439,0,878.04878,0,965.85366,0,1053.65854,0,1141.46341,0,1229.26829,0]},"cet88c":{"title":"38th root of 7, McLaren 'Microtonal Music', volume 3, track 7","filename":"cet88c.scl","rnbo":[38,88.65331,0,177.30663,0,265.95994,0,354.61325,0,443.26657,0,531.91988,0,620.57319,0,709.22651,0,797.87982,0,886.53313,0,975.18645,0,1063.83976,0,1152.49307,0,1241.14639,0,1329.7997,0,1418.45301,0,1507.10633,0,1595.75964,0,1684.41295,0,1773.06627,0,1861.71958,0,1950.37289,0,2039.02621,0,2127.67952,0,2216.33283,0,2304.98615,0,2393.63946,0,2482.29277,0,2570.94609,0,2659.5994,0,2748.25271,0,2836.90603,0,2925.55934,0,3014.21265,0,3102.86597,0,3191.51928,0,3280.17259,0,7,1]},"cet88d":{"title":"41th root of 8","filename":"cet88d.scl","rnbo":[41,87.80488,0,175.60976,0,263.41463,0,351.21951,0,439.02439,0,526.82927,0,614.63415,0,702.43902,0,790.2439,0,878.04878,0,965.85366,0,1053.65854,0,1141.46341,0,1229.26829,0,1317.07317,0,1404.87805,0,1492.68293,0,1580.4878,0,1668.29268,0,1756.09756,0,1843.90244,0,1931.70732,0,2019.5122,0,2107.31707,0,2195.12195,0,2282.92683,0,2370.73171,0,2458.53659,0,2546.34146,0,2634.14634,0,2721.95122,0,2809.7561,0,2897.56098,0,2985.36585,0,3073.17073,0,3160.97561,0,3248.78049,0,3336.58537,0,3424.39024,0,3512.19512,0,8,1]},"cet88e":{"title":"35th root of 6","filename":"cet88e.scl","rnbo":[35,88.62729,0,177.25457,0,265.88186,0,354.50914,0,443.13643,0,531.76371,0,620.391,0,709.01829,0,797.64557,0,886.27286,0,974.90014,0,1063.52743,0,1152.15471,0,1240.782,0,1329.40929,0,1418.03657,0,1506.66386,0,1595.29114,0,1683.91843,0,1772.54571,0,1861.173,0,1949.80029,0,2038.42757,0,2127.05486,0,2215.68214,0,2304.30943,0,2392.93671,0,2481.564,0,2570.19129,0,2658.81857,0,2747.44586,0,2836.07314,0,2924.70043,0,3013.32772,0,6,1]},"cet88f":{"title":"18th root of 5/2","filename":"cet88f.scl","rnbo":[18,88.12854,0,176.25708,0,264.38562,0,352.51416,0,440.6427,0,528.77124,0,616.89978,0,705.02832,0,793.15686,0,881.2854,0,969.41394,0,1057.54248,0,1145.67102,0,1233.79956,0,1321.92809,0,1410.05663,0,1498.18517,0,5,2]},"cet88g":{"title":"27th root of 4","filename":"cet88g.scl","rnbo":[27,88.88889,0,177.77778,0,266.66667,0,355.55556,0,444.44444,0,533.33333,0,622.22222,0,711.11111,0,800.0,0,888.88889,0,977.77778,0,1066.66667,0,1155.55556,0,1244.44444,0,1333.33333,0,1422.22222,0,1511.11111,0,1600.0,0,1688.88889,0,1777.77778,0,1866.66667,0,1955.55556,0,2044.44444,0,2133.33333,0,2222.22222,0,2311.11111,0,4,1]},"cet89":{"title":"31st root of 5, McLaren 'Microtonal Music', volume 2, track 22","filename":"cet89.scl","rnbo":[31,89.88109,0,179.76218,0,269.64326,0,359.52435,0,449.40544,0,539.28653,0,629.16761,0,719.0487,0,808.92979,0,898.81088,0,988.69196,0,1078.57305,0,1168.45414,0,1258.33523,0,1348.21631,0,1438.0974,0,1527.97849,0,1617.85958,0,1707.74066,0,1797.62175,0,1887.50284,0,1977.38393,0,2067.26501,0,2157.1461,0,2247.02719,0,2336.90828,0,2426.78936,0,2516.67045,0,2606.55154,0,2696.43263,0,5,1]},"cet90":{"title":"Scale with limma steps","filename":"cet90.scl","rnbo":[17,256,243,65536,59049,16777216,14348907,360.89998,0,451.12498,0,541.34997,0,631.57497,0,721.79997,0,812.02496,0,902.24996,0,992.47495,0,1082.69995,0,1172.92494,0,1263.14994,0,1353.37494,0,1443.59993,0,1533.82493,0]},"cet93":{"title":"Tuning used in John Chowning's Stria (1977), 9th root of Phi","filename":"cet93.scl","rnbo":[9,92.56559,0,185.13118,0,277.69677,0,370.26235,0,462.82794,0,555.39353,0,647.95912,0,740.52471,0,833.0903,0]},"cet95":{"title":"20th root of 3","filename":"cet95.scl","rnbo":[20,95.09775,0,190.1955,0,285.29325,0,380.391,0,475.48875,0,570.5865,0,665.68425,0,760.782,0,855.87975,0,950.9775,0,1046.07525,0,1141.173,0,1236.27075,0,1331.3685,0,1426.46625,0,1521.564,0,1616.66175,0,1711.7595,0,1806.85725,0,3,1]},"cet96":{"title":"4th root of 5/4","filename":"cet96.scl","rnbo":[16,96.57843,0,193.15686,0,289.73529,0,5,4,482.89214,0,579.47057,0,676.049,0,25,16,869.20586,0,965.78428,0,1062.36271,0,125,64,1255.51957,0,1352.098,0,1448.67643,0,625,256]},"cet97":{"title":"Manfred Stahnke, PARTCH HARP synth tuning. Minimax for 5/4 and 7/4, acceptable 11/4","filename":"cet97.scl","rnbo":[12,96.79569,0,193.59138,0,290.38707,0,387.18276,0,483.97845,0,580.77414,0,677.56983,0,774.36551,0,871.1612,0,967.95689,0,1064.75258,0,1161.54827,0]},"cet97a":{"title":"15th root of 7/3","filename":"cet97a.scl","rnbo":[15,97.79139,0,195.58279,0,293.37418,0,391.16557,0,488.95697,0,586.74836,0,684.53976,0,782.33115,0,880.12254,0,977.91394,0,1075.70533,0,1173.49672,0,1271.28812,0,1369.07951,0,7,3]},"cet98":{"title":"8th root of 11/7, X.J. Scott","filename":"cet98.scl","rnbo":[8,97.8115,0,195.62301,0,293.43451,0,391.24602,0,489.05752,0,586.86903,0,684.68053,0,11,7]},"cet98phi":{"title":"Phi + 1 equal division by 17, Brouncker (1653)","filename":"cet98phi.scl","rnbo":[17,98.01062,0,196.02125,0,294.03187,0,392.04249,0,490.05312,0,588.06374,0,686.07436,0,784.08498,0,882.09561,0,980.10623,0,1078.11685,0,1176.12748,0,1274.1381,0,1372.14872,0,1470.15935,0,1568.16997,0,1666.18059,0]},"cet99":{"title":"16th root of 5/2","filename":"cet99.scl","rnbo":[16,99.14461,0,198.28921,0,297.43382,0,396.57843,0,495.72304,0,594.86764,0,694.01225,0,793.15686,0,892.30146,0,991.44607,0,1090.59068,0,1189.73529,0,1288.87989,0,1388.0245,0,1487.16911,0,5,2]},"chahargah":{"title":"Chahargah in C","filename":"chahargah.scl","rnbo":[12,100.0,0,140.0,0,300.0,0,386.0,0,498.0,0,590.0,0,702.0,0,800.0,0,840.0,0,1000.0,0,1100.0,0,2,1]},"chahargah2":{"title":"Dastgah Chahargah in C, Mohammad Reza Gharib","filename":"chahargah2.scl","rnbo":[7,140.0,0,390.0,0,498.0,0,702.0,0,840.0,0,1100.0,0,2,1]},"chahargah3":{"title":"Iranian Chahargah, Julien J. Weiss","filename":"chahargah3.scl","rnbo":[7,13,12,5,4,4,3,3,2,13,8,15,8,2,1]},"chalmers":{"title":"Chalmers' 19-tone with more hexanies than Perrett's Tierce-Tone","filename":"chalmers.scl","rnbo":[19,21,20,16,15,9,8,7,6,6,5,5,4,21,16,4,3,7,5,35,24,3,2,63,40,8,5,5,3,7,4,9,5,28,15,63,32,2,1]},"chalmers_17":{"title":"7-limit figurative scale, Chalmers '96 Adnexed S&H decads","filename":"chalmers_17.scl","rnbo":[17,36,35,35,32,9,8,6,5,5,4,9,7,21,16,36,25,72,49,3,2,49,32,25,16,12,7,7,4,9,5,15,8,2,1]},"chalmers_17marvwoo":{"title":"Marvel woo version of chalmers_17","filename":"chalmers_17marvwoo.scl","rnbo":[17,49.41539,0,151.28207,0,200.69746,0,316.92773,0,383.74261,0,433.158,0,468.2098,0,633.85547,0,665.61854,0,700.67034,0,735.72214,0,767.48522,0,933.13088,0,968.18268,0,1017.59808,0,1084.41295,0,1200.64322,0]},"chalmers_19":{"title":"7-limit figurative scale. Reversed S&H decads","filename":"chalmers_19.scl","rnbo":[19,36,35,10,9,9,8,7,6,6,5,9,7,4,3,49,36,25,18,36,25,72,49,3,2,14,9,5,3,12,7,16,9,9,5,35,18,2,1]},"chalmers_csurd":{"title":"Combined Surd Scale, combination of Surd and Inverted Surd, JHC, 26-6-97","filename":"chalmers_csurd.scl","rnbo":[15,75.90187,0,160.53817,0,256.34665,0,325.85509,0,366.90634,0,4,3,539.98536,0,660.01995,0,3,2,833.08148,0,874.14491,0,943.65335,0,1039.46183,0,1124.09813,0,2,1]},"chalmers_isurd":{"title":"Inverted Surd Scale, of the form 4/(SQRT(N)+1, JHC, 26-6-97","filename":"chalmers_isurd.scl","rnbo":[8,75.90187,0,160.53817,0,256.34665,0,366.90634,0,4,3,660.01995,0,874.14491,0,2,1]},"chalmers_ji1":{"title":"Based loosely on Wronski's and similar JI scales, May 2, 1997.","filename":"chalmers_ji1.scl","rnbo":[12,17,16,9,8,19,16,5,4,4,3,17,12,3,2,19,12,5,3,57,32,15,8,2,1]},"chalmers_ji2":{"title":"Based loosely on Wronski's and similar JI scales, May 2, 1997.","filename":"chalmers_ji2.scl","rnbo":[12,17,16,9,8,19,16,5,4,4,3,17,12,3,2,51,32,27,16,57,32,15,8,2,1]},"chalmers_ji3":{"title":"15 16 17 18 19 20 21 on 1/1, 15-20 on 3/2, May 2, 1997. See other scales","filename":"chalmers_ji3.scl","rnbo":[12,16,15,17,15,6,5,19,15,4,3,7,5,3,2,8,5,17,10,9,5,19,10,2,1]},"chalmers_ji4":{"title":"15 16 17 18 19 20 on 1/1, same on 4/3, + 16/15 on 16/9","filename":"chalmers_ji4.scl","rnbo":[12,16,15,17,15,6,5,19,15,4,3,64,45,68,45,8,5,76,45,16,9,256,135,2,1]},"chalmers_surd":{"title":"Surd Scale, Surds of the form (SQRT(N)+1)/2, JHC, 26-6-97","filename":"chalmers_surd.scl","rnbo":[8,325.85509,0,539.98536,0,3,2,833.08148,0,943.65335,0,1039.46183,0,1124.09813,0,2,1]},"chalmers_surd2":{"title":"Surd Scale, Surds of the form (SQRT(N)+1)/4","filename":"chalmers_surd2.scl","rnbo":[40,68.84785,0,131.88444,0,190.04384,0,244.04863,0,294.46971,0,341.76635,0,5,4,428.42236,0,468.35241,0,506.32393,0,542.52489,0,577.11709,0,610.24088,0,642.01879,0,672.55847,0,3,2,730.2928,0,757.64716,0,784.08555,0,809.66863,0,834.45119,0,858.48284,0,881.8087,0,904.46987,0,926.50396,0,947.94541,0,7,4,989.17461,0,1009.01845,0,1028.38235,0,1047.28941,0,1065.76109,0,1083.81735,0,1101.47681,0,1118.75684,0,1135.67369,0,1152.24258,0,1168.4778,0,1184.39273,0,2,1]},"chalung":{"title":"Tuning of chalung from Tasikmalaya, slendro-like. 1/1=185 Hz","filename":"chalung.scl","rnbo":[11,391.91944,0,562.34225,0,692.5716,0,1048.512,0,1213.98043,0,1569.38679,0,1772.45659,0,1984.19266,0,2253.61137,0,2413.98043,0,2776.93031,0]},"chan34":{"title":"34 note hanson based circulating scale with 15 pure major thirds and 18 -1 brats","filename":"chan34.scl","rnbo":[34,254754959781491,249729352508160,30071722855,28903860244,38421792648,36129825305,6759548793775,6243233812704,1081527807004,975505283235,14412856352274025,12786142848417792,576514254090961,499458705016320,991798286653,843680244960,960013575180847,799133928026112,30614793048041,24972935250816,5,4,638254280871377,499458705016320,150358614275,115615440976,48114756568,36129825305,1459280021371,1076419622880,270381951751,195101056647,60205443660021679,42620476161392640,576514254090961,399566964013056,30663265517723,20810779375680,4800067875904235,3196535712104448,21305517838327,13873852917120,25,16,8,5,50840497270643,31216169063520,12028689142,7225965061,424031442260527,249729352508160,1351909758755,780404226588,1727914373344,975505283235,2882571270454805,1598267856052224,230425355849681,124864676254080,24000339379521175,12786142848417792,960013575180847,499458705016320,412730869507,210920061240,2,1]},"chargah pentachord 7-limit":{"title":"Chargah pentachord 150:162:189:200:225","filename":"chargah pentachord 7-limit.scl","rnbo":[4,27,25,63,50,4,3,3,2]},"chargah tetrachord 7-limit":{"title":"Chargah tetrachord 150:162:189:200","filename":"chargah tetrachord 7-limit.scl","rnbo":[3,27,25,63,50,4,3]},"chaumont":{"title":"Lambert Chaumont organ temperament (1695), 1st interpretation","filename":"chaumont.scl","rnbo":[12,76.049,0,193.15686,0,290.90905,0,5,4,503.42157,0,579.47057,0,696.57843,0,25,16,889.73529,0,997.16531,0,1082.89214,0,2,1]},"chaumont2":{"title":"Lambert Chaumont organ temperament (1695), 2nd interpretation","filename":"chaumont2.scl","rnbo":[12,83.5762,0,195.30749,0,289.83374,0,390.61497,0,502.34626,0,585.92246,0,697.65374,0,781.22994,0,892.96123,0,16,9,15,8,2,1]},"chimes":{"title":"Heavenly Chimes","filename":"chimes.scl","rnbo":[3,32,29,1,2,16,29]},"chimes_peck":{"title":"Kris Peck, 9-tone windchime tuning. TL 7-3-2001","filename":"chimes_peck.scl","rnbo":[8,5,4,3,2,7,4,9,4,11,4,13,4,15,4,4,1]},"chin_12":{"title":"Chinese scale, 4th cent.","filename":"chin_12.scl","rnbo":[12,99.2,0,199.5,0,296.7,0,398.0,0,492.9,0,595.2,0,699.0,0,790.9,0,896.1,0,984.9,0,1091.4,0,2,1]},"chin_5":{"title":"Chinese pentatonic from Zhou period","filename":"chin_5.scl","rnbo":[5,9,8,4,3,3,2,27,16,2,1]},"chin_60":{"title":"Chinese scale of fifths (the 60 lü)","filename":"chin_60.scl","rnbo":[60,3.61505,0,531441,524288,46.92002,0,70.38003,0,93.84004,0,2187,2048,1162261467,1073741824,160.60503,0,184.06504,0,9,8,207.52505,0,4782969,4194304,250.83002,0,274.29003,0,297.75004,0,19683,16384,341.05502,0,364.51503,0,387.97504,0,81,64,411.43505,0,43046721,33554432,454.74002,0,478.20003,0,501.66005,0,177147,131072,544.96502,0,568.42503,0,591.88504,0,729,512,615.34505,0,387420489,268435456,658.65003,0,682.11004,0,3,2,705.57005,0,1594323,1048576,748.87502,0,772.33503,0,795.79504,0,6561,4096,839.10002,0,862.56003,0,886.02004,0,27,16,909.48005,0,14348907,8388608,952.78502,0,976.24503,0,999.70504,0,59049,32768,1043.01002,0,1066.47003,0,1089.93004,0,243,128,1113.39005,0,129140163,67108864,1156.69503,0,1180.15504,0,2,1]},"chin_7":{"title":"Chinese heptatonic scale and tritriadic of 64:81:96 triad","filename":"chin_7.scl","rnbo":[7,9,8,81,64,4,3,3,2,27,16,243,128,2,1]},"chin_bianzhong":{"title":"Pitches of Bianzhong bells (Xinyang). 1/1=b, Liang Mingyue, 1975.","filename":"chin_bianzhong.scl","rnbo":[12,104.0,0,308.0,0,624.0,0,820.0,0,1012.0,0,1144.0,0,1329.0,0,1515.0,0,1857.0,0,2039.0,0,2231.0,0,2674.0,0]},"chin_bianzhong2a":{"title":"A-tones (GU) of 13 Xinyang bells (Ma Cheng-Yuan) 1/1=d#=619 Hz","filename":"chin_bianzhong2a.scl","rnbo":[12,147.0,0,308.0,0,612.0,0,792.0,0,931.0,0,1092.0,0,1326.0,0,1581.0,0,1693.0,0,2068.0,0,2252.0,0,2598.0,0]},"chin_bianzhong2b":{"title":"B-tones (SUI) of 13 Xinyang bells (Ma Cheng-Yuan) 1/1=b+=506.6 Hz","filename":"chin_bianzhong2b.scl","rnbo":[12,114.9854,0,308.99317,0,624.99652,0,812.98131,0,1009.98545,0,1138.97957,0,1323.94786,0,1506.0175,0,1852.9698,0,2039.00232,0,2206.96993,0,2658.99308,0]},"chin_bianzhong3":{"title":"A and B-tones of 13 Xinyang bells (Ma Cheng-Yuan) abs. pitches wrt middle-C","filename":"chin_bianzhong3.scl","rnbo":[26,1150.0,0,1262.0,0,1460.0,0,1491.0,0,1638.0,0,1776.0,0,1799.0,0,1962.0,0,2103.0,0,2160.0,0,2283.0,0,2290.0,0,2422.0,0,2474.0,0,2583.0,0,2656.0,0,2817.0,0,3004.0,0,3072.0,0,3184.0,0,3188.0,0,3357.0,0,3559.0,0,3743.0,0,3810.0,0,4089.0,0]},"chin_bronze":{"title":"Scale found on ancient Chinese bronze instrument 3rd c.BC & \"Scholar's Lute\"","filename":"chin_bronze.scl","rnbo":[7,8,7,6,5,5,4,4,3,3,2,5,3,2,1]},"chin_chime":{"title":"Pitches of 12 stone chimes, F. Kuttner, 1951, ROMA Toronto. 1/1=b4","filename":"chin_chime.scl","rnbo":[12,88.0,0,550.5,0,790.5,0,1370.5,0,1660.5,0,1827.0,0,1991.5,0,2201.5,0,2207.0,0,2396.5,0,2484.0,0,2898.0,0]},"chin_ching":{"title":"Scale of Ching Fang, c.45 BC. Pyth.steps 0 1 2 3 4 5 47 48 49 50 51 52 53","filename":"chin_ching.scl","rnbo":[12,93.84004,0,9,8,297.75004,0,81,64,501.66005,0,591.88504,0,3,2,795.79504,0,27,16,999.70504,0,243,128,1203.61505,0]},"chin_di":{"title":"Chinese di scale","filename":"chin_di.scl","rnbo":[6,229.46929,0,329.9708,0,555.03167,0,777.52793,0,875.24684,0,1213.57835,0]},"chin_di2":{"title":"Observed tuning from Chinese flute dizi, Helmholtz/Ellis p. 518, nr.103","filename":"chin_di2.scl","rnbo":[7,178.0,0,339.0,0,448.0,0,662.0,0,888.0,0,1103.0,0,1196.0,0]},"chin_huang":{"title":"Huang Zhong qin tuning","filename":"chin_huang.scl","rnbo":[6,81,64,3,2,27,16,2,1,9,4,81,32]},"chin_liu-an":{"title":"Scale of Liu An, in: \"Huai Nan Tzu\", c.122 BC, 1st known corr. to Pyth. scale","filename":"chin_liu-an.scl","rnbo":[11,81,76,9,8,81,68,81,64,27,20,27,19,3,2,27,17,27,16,9,5,27,14]},"chin_lu":{"title":"Chinese Lü scale by Huai Nan zi, Han era. Père Amiot 1780, Kurt Reinhard","filename":"chin_lu.scl","rnbo":[12,18,17,9,8,6,5,54,43,4,3,27,19,3,2,27,17,27,16,9,5,36,19,2,1]},"chin_lu2":{"title":"Chinese Lü (Lushi chunqiu, by Lu Buwei). Mingyue: Music of the billion, p.67","filename":"chin_lu2.scl","rnbo":[12,2187,2048,9,8,19683,16384,81,64,177147,131072,729,512,3,2,6561,4096,27,16,59049,32768,243,128,2,1]},"chin_lu3":{"title":"Chinese Lü scale by Ho Ch'êng-T'ien, reported in Sung Shu (500 AD)","filename":"chin_lu3.scl","rnbo":[12,101.0,0,200.0,0,297.0,0,398.0,0,493.0,0,596.0,0,699.0,0,791.0,0,897.0,0,985.0,0,1092.0,0,2,1]},"chin_lu3a":{"title":"Chinese Lü scale by Ho Ch'êng-T'ien, calc. basis is \"big number\" 177147","filename":"chin_lu3a.scl","rnbo":[12,17714700,16727831,2952450,2631019,590490,497483,1476225,1173019,708588,533029,177147,125686,708588,473185,885735,560906,1771470,1055723,8857350,5014657,177147,94357,2,1]},"chin_lu4":{"title":"Chinese Lü \"749-Temperament\"","filename":"chin_lu4.scl","rnbo":[12,97.51604,0,561001,500000,296.80634,0,398.58059,0,496.09663,0,597.87089,0,749,500,797.16119,0,420189749,250000000,996.45149,0,1098.22574,0,2,1]},"chin_lu5":{"title":"Chinese Lü scale by Ch'ien Lo-Chih, c.450 AD Pyth.steps 0 154 255 103 204 etc.","filename":"chin_lu5.scl","rnbo":[12,101.07013,0,198.52522,0,301.36509,0,398.82018,0,499.89031,0,599.11513,0,700.18527,0,799.41009,0,900.48022,0,999.70504,0,1100.77518,0,1198.23,0]},"chin_lusheng":{"title":"Observed tuning of a small Lusheng, 1/1=d, OdC '97","filename":"chin_lusheng.scl","rnbo":[5,329.0,0,498.0,0,688.0,0,1003.0,0,1191.0,0]},"chin_mannen":{"title":"Observed scale from song Mannen-fon, B.I. Gilman, On Some Psychological Aspects of the Chinese Musical System, 1892","filename":"chin_mannen.scl","rnbo":[7,190.0,0,345.0,0,500.0,0,700.0,0,900.0,0,2,1,1400.0,0]},"chin_pan":{"title":"Pan Huai-su pure Pythagorean system, in: Sin-Yan Shen, 1991","filename":"chin_pan.scl","rnbo":[23,256,243,2187,2048,65536,59049,9,8,32,27,8192,6561,81,64,2097152,1594323,4,3,1024,729,729,512,262144,177147,3,2,128,81,6561,4096,32768,19683,27,16,8388608,4782969,16,9,4096,2187,243,128,1048576,531441,2,1]},"chin_pipa":{"title":"Observed tuning from Chinese balloon lute p'i-p'a, Helmholtz/Ellis p. 518, nr.109","filename":"chin_pipa.scl","rnbo":[5,145.0,0,351.0,0,647.0,0,874.0,0,1195.0,0]},"chin_sheng":{"title":"Observed tuning from Chinese sheng or mouth organ, Helmholtz/Ellis p. 518, nr.105","filename":"chin_sheng.scl","rnbo":[7,210.0,0,338.0,0,498.0,0,715.0,0,908.0,0,1040.0,0,1199.0,0]},"chin_shierlu":{"title":"Old Chinese Lü scale, from http://en.wikipedia.org/wiki/Shi_Er_L%C3%BC","filename":"chin_shierlu.scl","rnbo":[12,2187,2048,9,8,1968,1683,81,64,1771,1311,729,512,3,2,6561,4096,27,16,5905,3277,243,128,2,1]},"chin_sientsu":{"title":"Observed tuning from Chinese tamboura sienzi, Helmholtz/Ellis p. 518, nr.108","filename":"chin_sientsu.scl","rnbo":[5,189.0,0,386.0,0,702.0,0,893.0,0,2,1]},"chin_sona":{"title":"Observed tuning from Chinese oboe (so-na), Helmholtz/Ellis p. 518, nr.104","filename":"chin_sona.scl","rnbo":[7,145.0,0,297.0,0,440.0,0,637.0,0,813.0,0,1014.0,0,1216.0,0]},"chin_wang-po":{"title":"Scale of Wang Po, 958 AD. H. Pischner: Musik in China, Berlin, 1955, p.20","filename":"chin_wang-po.scl","rnbo":[7,9,8,403.22751,0,609.2634,0,3,2,903.70231,0,1106.39699,0,1180.87015,0]},"chin_yangqin":{"title":"Observed tuning from Chinese dulcimer yangqin, Helmholtz/Ellis p. 518, nr.107","filename":"chin_yangqin.scl","rnbo":[7,169.0,0,274.0,0,491.0,0,661.0,0,878.0,0,996.0,0,1198.0,0]},"chin_yunlo":{"title":"Observed tuning from Chinese gong-chime (yün-lo), Helmholtz/Ellis p. 518, nr.106","filename":"chin_yunlo.scl","rnbo":[7,169.0,0,367.0,0,586.0,0,674.0,0,775.0,0,1062.0,0,1208.0,0]},"chopsticks":{"title":"Symmetrical non-octave MOS, subset of 15-tET","filename":"chopsticks.scl","rnbo":[10,320.0,0,480.0,0,800.0,0,960.0,0,1280.0,0,1440.0,0,1760.0,0,1920.0,0,2240.0,0,4,1]},"choquel":{"title":"Choquel/Barbour/Marpurg?","filename":"choquel.scl","rnbo":[12,25,24,9,8,6,5,5,4,4,3,45,32,3,2,25,16,5,3,20,11,15,8,2,1]},"chordal":{"title":"Chordal Notes subharmonic and harmonic","filename":"chordal.scl","rnbo":[40,3,2,5,4,7,4,9,4,11,4,13,4,15,4,15,4,15,8,17,8,19,8,19,16,2,1,4,3,8,5,8,7,16,9,16,11,16,13,16,15,7,3,7,2,10,3,8,3,5,2,12,5,12,7,11,9,13,9,17,10,17,5,9,7,9,8,16,9,11,7,7,6,7,5,10,7,6,5,9,5]},"chrom15":{"title":"Tonos-15 Chromatic","filename":"chrom15.scl","rnbo":[7,15,14,15,13,15,11,3,2,30,19,5,3,2,1]},"chrom15_inv":{"title":"Inverted Chromatic Tonos-15 Harmonia","filename":"chrom15_inv.scl","rnbo":[7,6,5,19,15,4,3,22,15,26,15,28,15,2,1]},"chrom15_inv2":{"title":"A harmonic form of the Chromatic Tonos-15 inverted","filename":"chrom15_inv2.scl","rnbo":[7,16,15,17,15,4,3,22,15,23,15,8,5,2,1]},"chrom17":{"title":"Tonos-17 Chromatic","filename":"chrom17.scl","rnbo":[7,17,16,17,15,17,12,17,11,34,21,17,10,2,1]},"chrom17_con":{"title":"Conjunct Tonos-17 Chromatic","filename":"chrom17_con.scl","rnbo":[7,17,16,17,15,17,12,34,23,17,11,17,9,2,1]},"chrom19":{"title":"Tonos-19 Chromatic","filename":"chrom19.scl","rnbo":[7,19,18,19,17,19,14,19,13,38,25,19,12,2,1]},"chrom19_con":{"title":"Conjunct Tonos-19 Chromatic","filename":"chrom19_con.scl","rnbo":[7,19,18,19,17,19,14,38,27,19,13,19,11,2,1]},"chrom21":{"title":"Tonos-21 Chromatic","filename":"chrom21.scl","rnbo":[7,21,20,21,19,21,16,3,2,14,9,21,13,2,1]},"chrom21_inv":{"title":"Inverted Chromatic Tonos-21 Harmonia","filename":"chrom21_inv.scl","rnbo":[7,26,21,9,7,4,3,32,21,38,21,40,21,2,1]},"chrom21_inv2":{"title":"Inverted harmonic form of the Chromatic Tonos-21","filename":"chrom21_inv2.scl","rnbo":[7,16,15,8,7,4,3,32,21,34,21,12,7,2,1]},"chrom23":{"title":"Tonos-23 Chromatic","filename":"chrom23.scl","rnbo":[7,23,22,23,21,23,18,23,16,23,15,23,14,2,1]},"chrom23_con":{"title":"Conjunct Tonos-23 Chromatic","filename":"chrom23_con.scl","rnbo":[7,23,22,23,21,23,18,23,17,23,16,23,13,2,1]},"chrom25":{"title":"Tonos-25 Chromatic","filename":"chrom25.scl","rnbo":[7,50,47,25,22,25,18,25,16,5,3,25,14,2,1]},"chrom25_con":{"title":"Conjunct Tonos-25 Chromatic","filename":"chrom25_con.scl","rnbo":[7,50,47,25,22,25,18,25,17,25,16,25,13,2,1]},"chrom27":{"title":"Tonos-27 Chromatic","filename":"chrom27.scl","rnbo":[7,18,17,9,8,27,20,3,2,27,17,27,16,2,1]},"chrom27_inv":{"title":"Inverted Chromatic Tonos-27 Harmonia","filename":"chrom27_inv.scl","rnbo":[7,32,27,34,27,4,3,40,27,16,9,17,9,2,1]},"chrom27_inv2":{"title":"Inverted harmonic form of the Chromatic Tonos-27","filename":"chrom27_inv2.scl","rnbo":[7,28,27,29,27,4,3,40,27,14,9,5,3,2,1]},"chrom29":{"title":"Tonos-29 Chromatic","filename":"chrom29.scl","rnbo":[7,29,28,29,27,29,22,29,20,29,19,29,18,2,1]},"chrom29_con":{"title":"Conjunct Tonos-29 Chromatic","filename":"chrom29_con.scl","rnbo":[7,29,28,29,27,29,22,29,21,29,20,29,16,2,1]},"chrom31":{"title":"Tonos-31 Chromatic. Tone 24 alternates with 23 as MESE or A","filename":"chrom31.scl","rnbo":[8,31,29,31,27,31,24,31,23,31,22,31,21,31,20,2,1]},"chrom31_con":{"title":"Conjunct Tonos-31 Chromatic","filename":"chrom31_con.scl","rnbo":[8,31,29,31,27,31,24,31,23,31,22,31,21,31,18,2,1]},"chrom33":{"title":"Tonos-33 Chromatic. A variant is 66 63 60 48","filename":"chrom33.scl","rnbo":[7,33,31,33,29,11,8,3,2,11,7,33,20,2,1]},"chrom33_con":{"title":"Conjunct Tonos-33 Chromatic","filename":"chrom33_con.scl","rnbo":[7,33,31,33,29,11,8,33,23,3,2,11,6,2,1]},"chrom_new":{"title":"New Chromatic genus 4.5 + 9 + 16.5","filename":"chrom_new.scl","rnbo":[7,75.0,0,225.0,0,500.0,0,700.0,0,775.0,0,925.0,0,2,1]},"chrom_new2":{"title":"New Chromatic genus 14/3 + 28/3 + 16 parts","filename":"chrom_new2.scl","rnbo":[7,77.77778,0,233.33333,0,500.0,0,700.0,0,777.77778,0,933.33333,0,2,1]},"chrom_soft":{"title":"100/81 Chromatic. This genus is a good approximation to the soft chromatic","filename":"chrom_soft.scl","rnbo":[7,27,26,27,25,4,3,3,2,81,52,81,50,2,1]},"chrom_soft2":{"title":"1:2  Soft Chromatic","filename":"chrom_soft2.scl","rnbo":[7,44.44444,0,133.33333,0,500.0,0,700.0,0,744.44444,0,833.33333,0,2,1]},"chrom_soft3":{"title":"Soft chromatic genus from Kathleen Schlesinger's modified Mixolydian Harmonia","filename":"chrom_soft3.scl","rnbo":[7,28,27,14,13,4,3,3,2,14,9,21,13,2,1]},"chrys_diat-1st-ji":{"title":"Chrysanthos JI Diatonic and 1st Byzantine Liturgical mode","filename":"chrys_diat-1st-ji.scl","rnbo":[7,12,11,32,27,4,3,3,2,18,11,16,9,2,1]},"chrys_diatenh-var-ji":{"title":"JI interpretation of Chrysanthos Diatonic-Enharmonic Byzantine mode","filename":"chrys_diatenh-var-ji.scl","rnbo":[7,12,11,32,27,4,3,3,2,14,9,16,9,2,1]},"chrys_enhdiat-var-ji":{"title":"JI interpretation of Chrysanthos Enharmonic-Diatonic Byzantine Mode","filename":"chrys_enhdiat-var-ji.scl","rnbo":[7,8,7,9,7,4,3,3,2,18,11,16,9,2,1]},"cifariello":{"title":"F. Cifariello Ciardi, ICMC 86 Proc. 15-tone 5-limit tuning","filename":"cifariello.scl","rnbo":[15,16,15,10,9,9,8,6,5,5,4,4,3,25,18,36,25,3,2,8,5,5,3,16,9,9,5,15,8,2,1]},"circ5120":{"title":"Circle of seven minor, six major, and one subminor thirds in 531-tET","filename":"circ5120.scl","rnbo":[14,24.858757,0,205.649718,0,230.508475,0,316.384181,0,411.299435,0,522.033898,0,616.949153,0,702.824859,0,727.683616,0,908.474576,0,933.333333,0,1019.20904,0,1114.124294,0,2,1]},"circb22":{"title":"circulating scale from pipedum_22c in 50/49 (-1,5) tuning; approximate pajara","filename":"circb22.scl","rnbo":[22,56.609169,0,108.337097,0,165.79894,0,217.526867,0,274.136036,0,325.863964,0,382.473133,0,434.20106,0,491.662903,0,543.390831,0,600.0,0,656.609169,0,708.337097,0,765.79894,0,817.526867,0,874.136036,0,925.863964,0,982.473133,0,1034.20106,0,1091.662903,0,1143.390831,0,2,1]},"circle31":{"title":"Approximate 31-tET with 18 5^(1/4) fifths, 12 (56/5)^(1/6) fifths, and a (4096/6125)*sqrt(5)","filename":"circle31.scl","rnbo":[31,39.04564,0,76.049,0,117.10786,0,153.61881,0,193.15686,0,233.21637,0,269.20586,0,310.26471,0,347.78954,0,5,4,427.3871,0,462.36271,0,503.42157,0,541.96027,0,579.47057,0,620.52943,0,656.53344,0,696.57843,0,736.131,0,25,16,8,5,850.70417,0,889.73529,0,930.30173,0,965.78428,0,1006.84314,0,1044.87491,0,1082.89214,0,1123.951,0,1159.44808,0,2,1]},"circls12":{"title":"Least squares circulating temperament","filename":"circls12.scl","rnbo":[12,79.70961,0,198.27445,0,285.43857,0,390.29238,0,495.14619,0,582.31031,0,700.87514,0,780.58476,0,894.97858,0,990.29238,0,1085.60618,0,2,1]},"circos":{"title":"[1, 3] weight range weighted least squares circulating temperament","filename":"circos.scl","rnbo":[12,89.617502,0,195.633226,0,300.984164,0,391.528643,0,501.698852,0,587.325482,0,697.824592,0,796.007518,0,893.677492,0,1002.402613,0,1088.884819,0,2,1]},"ckring9":{"title":"Double-tie circular mirroring with common pivot of 3:5:7:9","filename":"ckring9.scl","rnbo":[13,10,9,7,6,6,5,9,7,4,3,7,5,10,7,3,2,14,9,5,3,12,7,9,5,2,1]},"clampitt_phi":{"title":"David Clampitt, phi+1 mod 3phi+2, from \"Pairwise Well-Formed Scales\", 1997","filename":"clampitt_phi.scl","rnbo":[7,175.07764,0,350.15528,0,458.35921,0,633.43685,0,916.71842,0,1091.79607,0,2,1]},"classr":{"title":"Marvel projection to the 5-limit of class","filename":"classr.scl","rnbo":[12,135,128,1125,1024,6,5,5,4,675,512,45,32,3,2,25,16,27,16,225,128,15,8,2,1]},"claudi-enigma":{"title":"Claudi Meneghin's 11-limit JI Enigma theme scale","filename":"claudi-enigma.scl","rnbo":[15,9,8,7,6,5,4,21,16,4,3,45,32,3,2,14,9,44,27,5,3,27,16,7,4,11,6,15,8,2,1]},"clipper100":{"title":"Clipper(100/99), 2.3.5.11, POTE tuning","filename":"clipper100.scl","rnbo":[17,110.97925,0,174.16103,0,237.3428,0,348.32205,0,384.06751,0,495.04676,0,558.22853,0,606.02601,0,669.20779,0,732.38956,0,815.93249,0,879.11427,0,942.29604,0,990.09352,0,1053.27529,0,1164.25455,0,2,1]},"clipper1029":{"title":"clipper(1029/1024), 2.3.7, POTE tuning","filename":"clipper1029.scl","rnbo":[7,31.56229,0,233.68754,0,265.24983,0,498.93738,0,732.62492,0,966.31246,0,2,1]},"clipper105":{"title":"Clipper(105/104), 2.3.5.7.13, POTE tuning","filename":"clipper105.scl","rnbo":[15,197.65902,0,238.18605,0,317.83053,0,340.47195,0,460.64346,0,556.01658,0,578.658,0,698.82951,0,819.00102,0,841.64244,0,937.01556,0,1057.18707,0,1079.82849,0,1159.47297,0,2,1]},"clipper121":{"title":"Clipper(121/120), 2.3.5.11, POTE tuning","filename":"clipper121.scl","rnbo":[11,228.21813,0,340.79562,0,385.96469,0,498.54218,0,543.71125,0,656.28875,0,884.50687,0,929.67595,0,1042.25344,0,1154.83093,0,2,1]},"clipper126":{"title":"Clipper(126/125) 7-limit, POTE tuning","filename":"clipper126.scl","rnbo":[23,78.94254,0,108.65147,0,157.88508,0,187.594,0,266.53654,0,311.15449,0,390.09702,0,419.80595,0,469.03956,0,498.74849,0,577.69103,0,656.63357,0,686.34249,0,701.25151,0,809.90298,0,859.13659,0,888.84551,0,918.55444,0,967.78805,0,1076.43952,0,1091.34853,0,1121.05746,0,2,1]},"clipper144":{"title":"Clipper(144/143), 2.3.11.13, POTE tuning","filename":"clipper144.scl","rnbo":[11,144.91886,0,289.83773,0,349.44325,0,497.73781,0,642.65667,0,702.26219,0,787.57553,0,847.18106,0,992.09992,0,1140.39448,0,2,1]},"clipper169":{"title":"Clipper(169/168), 2.3.7.13, POTE tuning","filename":"clipper169.scl","rnbo":[11,133.5533,0,267.1066,0,364.80229,0,498.35559,0,603.94872,0,631.90889,0,835.19771,0,863.15788,0,968.75101,0,1102.30431,0,2,1]},"clipper176":{"title":"Clipper(176/175), 2.5.7.11, POTE tuning","filename":"clipper176.scl","rnbo":[11,161.87535,0,227.88872,0,389.76408,0,551.63943,0,617.6528,0,779.52815,0,810.23592,0,941.40351,0,1038.12465,0,1169.29223,0,2,1]},"clipper2048":{"title":"Clipper(2048/2025) 5-limit, POTE tuning","filename":"clipper2048.scl","rnbo":[14,104.89817,0,180.40732,0,209.79634,0,314.69451,0,390.20366,0,495.10183,0,600.0,0,704.89817,0,809.79634,0,885.30549,0,990.20366,0,1019.59268,0,1095.10183,0,2,1]},"clipper225":{"title":"Clipper(225/224), 7-limit, POTE tuning","filename":"clipper225.scl","rnbo":[17,49.08706,0,115.95486,0,200.81497,0,231.90973,0,316.76984,0,383.63765,0,432.7247,0,548.67957,0,584.45262,0,615.54738,0,700.40749,0,816.36235,0,932.31722,0,1017.17733,0,1048.27208,0,1084.04514,0,2,1]},"clipper243":{"title":"Clipper(243/242), 2.3.11, POTE tuning","filename":"clipper243.scl","rnbo":[17,94.74626,0,148.42388,0,202.10149,0,296.84776,0,350.52537,0,404.20299,0,498.94925,0,552.62687,0,647.37313,0,701.05075,0,795.79701,0,849.47463,0,903.15224,0,997.89851,0,1051.57612,0,1105.25374,0,2,1]},"clipper245":{"title":"Clipper(245/243), 7-limit, POTE tuning","filename":"clipper245.scl","rnbo":[35,25.93232,0,55.35554,0,122.7061,0,152.12932,0,178.06164,0,207.48486,0,233.41718,0,262.84039,0,288.77271,0,359.61418,0,385.5465,0,411.47882,0,440.90203,0,470.32525,0,496.25757,0,522.18989,0,593.03136,0,618.96367,0,648.38689,0,674.31921,0,703.74243,0,729.67475,0,759.09797,0,826.44853,0,855.87175,0,881.80407,0,907.73639,0,937.15961,0,966.58282,0,992.51514,0,1089.28893,0,1115.22124,0,1144.64446,0,1174.06768,0,2,1]},"clipper245242":{"title":"Clipper(245/242), 2.5.7.11","filename":"clipper245242.scl","rnbo":[17,87.18417,0,148.60607,0,172.01159,0,235.79025,0,384.39632,0,407.80184,0,471.5805,0,556.40791,0,643.59209,0,728.4195,0,792.19816,0,815.60368,0,964.20975,0,1027.98841,0,1051.39393,0,1112.81583,0,2,1]},"clipper3125":{"title":"Clipper(3125/3072), 5-limit, POTE tuning","filename":"clipper3125.scl","rnbo":[11,59.82464,0,119.64929,0,380.05845,0,439.8831,0,499.70774,0,760.1169,0,819.94155,0,879.76619,0,939.59083,0,1140.17536,0,2,1]},"clipper3136":{"title":"Clipper(3136/3125), 2.5.7, POTE tuning","filename":"clipper3136.scl","rnbo":[17,37.36988,0,74.73975,0,193.77169,0,231.14156,0,350.1735,0,387.54337,0,424.91325,0,462.28313,0,581.31506,0,618.68494,0,775.08675,0,812.45663,0,849.8265,0,1006.22831,0,1043.59819,0,1162.63012,0,2,1]},"clipper385":{"title":"Clipper(385/384), 11-limit, POTE tuning","filename":"clipper385.scl","rnbo":[15,101.60799,0,152.25568,0,265.75961,0,334.39669,0,385.04439,0,418.01529,0,498.54831,0,650.80399,0,803.05967,0,883.5927,0,916.5636,0,967.21129,0,1035.84838,0,1149.35231,0,2,1]},"clipper4000":{"title":"Clipper(4000/3993), 2.3.5.11, POTE tuning","filename":"clipper4000.scl","rnbo":[31,54.32322,0,95.60807,0,124.67273,0,149.93129,0,165.95758,0,220.2808,0,261.56565,0,274.60402,0,315.88887,0,370.21209,0,386.23838,0,411.49694,0,440.5616,0,481.84645,0,536.16967,0,552.19596,0,647.80404,0,702.12725,0,772.47676,0,797.73532,0,813.76162,0,826.79998,0,868.08484,0,909.36969,0,922.40805,0,938.43435,0,963.69291,0,1034.04242,0,1088.36564,0,1183.97371,0,2,1]},"clipper5120":{"title":"Clipper(5120/5103), 7-limit, POTE tuning","filename":"clipper5120.scl","rnbo":[27,61.35474,0,85.85389,0,110.35304,0,205.65844,0,267.01318,0,291.51233,0,316.01148,0,377.36622,0,472.67163,0,497.17078,0,521.66993,0,583.02467,0,607.52382,0,678.33007,0,702.82922,0,764.18396,0,788.68311,0,813.18226,0,874.537,0,908.48767,0,969.84241,0,994.34156,0,1018.84071,0,1080.19545,0,1104.6946,0,1175.50085,0,2,1]},"clipper6144":{"title":"Clipper(6144/6125), 7-limit, POTE tuning","filename":"clipper6144.scl","rnbo":[23,72.47746,0,110.239,0,157.46768,0,229.94514,0,267.70668,0,302.42261,0,340.18415,0,387.41282,0,497.65182,0,544.8805,0,582.64204,0,617.35796,0,655.1195,0,727.59697,0,774.82564,0,812.58718,0,885.06464,0,970.05486,0,1004.77078,0,1042.53232,0,1080.29386,0,1115.00979,0,2,1]},"clipper625":{"title":"Clipper(625/624), 2.3.5.13, POTE tuning","filename":"clipper625.scl","rnbo":[19,26.09351,0,43.22463,0,69.31814,0,316.27365,0,342.36716,0,385.59179,0,428.81642,0,454.90993,0,701.86544,0,727.95895,0,745.09007,0,771.18358,0,814.40821,0,840.50172,0,883.72635,0,1087.45723,0,1130.68186,0,1156.77537,0,2,1]},"clipper640":{"title":"Clipper(640/637), 2.5.7.13, POTE tuning","filename":"clipper640.scl","rnbo":[11,30.96384,0,100.32422,0,228.28077,0,259.24461,0,387.20115,0,456.56153,0,487.52538,0,615.48192,0,843.76269,0,1072.04346,0,2,1]},"clipper65536":{"title":"Clipper(65536/65219), 2.7.11, POTE tuning","filename":"clipper65536.scl","rnbo":[11,93.48674,0,186.97348,0,323.37169,0,416.85843,0,553.25663,0,646.74337,0,740.23011,0,833.71685,0,970.11506,0,1063.6018,0,2,1]},"clipper65625":{"title":"Clipper(65625/65536), 7-limit, POTE 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(1753), also Marpurg 4 and Yamaha Pure Minor","filename":"corrette3.scl","rnbo":[12,25,24,10,9,6,5,5,4,4,3,25,18,3,2,25,16,5,3,9,5,15,8,2,1]},"coul_12":{"title":"Scale 1 5/4 3/2 2 successively split largest intervals by smallest interval","filename":"coul_12.scl","rnbo":[12,25,24,10,9,6,5,5,4,125,96,25,18,3,2,25,16,5,3,9,5,15,8,2,1]},"coul_12a":{"title":"Scale 1 6/5 3/2 2 successively split largest intervals by smallest interval","filename":"coul_12a.scl","rnbo":[12,25,24,10,9,6,5,5,4,4,3,36,25,3,2,25,16,5,3,9,5,15,8,2,1]},"coul_12sup":{"title":"Superparticular approximation to Pythagorean scale, Op de Coul (2003)","filename":"coul_12sup.scl","rnbo":[12,15,14,9,8,19,16,19,15,4,3,10,7,3,2,45,28,27,16,57,32,19,10,2,1]},"coul_13":{"title":"Symmetrical 13-tone 5-limit JI scale","filename":"coul_13.scl","rnbo":[13,16,15,9,8,6,5,5,4,4,3,25,18,36,25,3,2,8,5,5,3,16,9,15,8,2,1]},"coul_17sup":{"title":"Superparticular approximation to Pythagorean 17-tone scale, Op de Coul 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Couperin organ temperament (1690), from C. di Veroli, 1985","filename":"couperin_org.scl","rnbo":[12,76.049,0,193.15686,0,297.10287,0,5,4,503.42157,0,579.47057,0,696.57843,0,783.38057,0,889.73529,0,1006.84314,0,1082.89214,0,2,1]},"cpak19a":{"title":"First 19-epimorphic ordered tetrad pack scale, Gene Ward Smith, TL 23-10-2005","filename":"cpak19a.scl","rnbo":[19,21,20,15,14,9,8,7,6,6,5,5,4,21,16,4,3,7,5,10,7,3,2,63,40,8,5,5,3,7,4,9,5,15,8,63,32,2,1]},"cpak19b":{"title":"Second 19-epimorphic ordered tetrad pack scale, Gene Ward Smith, TL 23-10-2005","filename":"cpak19b.scl","rnbo":[19,21,20,15,14,9,8,7,6,6,5,5,4,21,16,4,3,7,5,10,7,3,2,63,40,8,5,5,3,7,4,25,14,15,8,63,32,2,1]},"cross13":{"title":"13-limit harmonic/subharmonic cross","filename":"cross13.scl","rnbo":[19,14,13,12,11,10,9,8,7,7,6,16,13,14,11,9,7,7,5,10,7,14,9,11,7,13,8,12,7,7,4,9,5,11,6,13,7,2,1]},"cross2":{"title":"John Pusey's double 5-7 cross reduced by 3/1","filename":"cross2.scl","rnbo":[9,27,25,35,27,7,5,5,3,9,5,15,7,81,35,25,9,3,1]},"cross2_5":{"title":"double 3-5 cross reduced by 2/1","filename":"cross2_5.scl","rnbo":[9,16,15,9,8,6,5,4,3,3,2,5,3,16,9,15,8,2,1]},"cross2_7":{"title":"longer 3-5-7 cross reduced by 2/1","filename":"cross2_7.scl","rnbo":[13,9,8,8,7,5,4,32,25,64,49,4,3,3,2,49,32,25,16,8,5,7,4,16,9,2,1]},"cross3":{"title":"John Pusey's triple 5-7 cross reduced by 3/1","filename":"cross3.scl","rnbo":[13,27,25,25,21,9,7,243,175,125,81,5,3,9,5,243,125,175,81,7,3,63,25,25,9,3,1]},"cross_7":{"title":"3-5-7 cross reduced by 2/1, quasi diatonic, similar to Zalzal's, Flynn Cohen","filename":"cross_7.scl","rnbo":[7,8,7,5,4,4,3,3,2,8,5,7,4,2,1]},"cross_72":{"title":"double 3-5-7 cross reduced by 2/1","filename":"cross_72.scl","rnbo":[13,16,15,9,8,7,6,6,5,21,16,4,3,3,2,32,21,5,3,12,7,16,9,15,8,2,1]},"cross_7a":{"title":"2-5-7 cross reduced by 3/1","filename":"cross_7a.scl","rnbo":[7,9,7,3,2,5,3,9,5,2,1,7,3,3,1]},"crossbone1":{"title":"7-limit Crossbone Scale (1st order, 1st sepent)","filename":"crossbone1.scl","rnbo":[12,16,15,7,6,5,4,9,7,10,7,3,2,14,9,5,3,12,7,7,4,15,8,2,1]},"cruciform":{"title":"Cruciform Lattice","filename":"cruciform.scl","rnbo":[12,9,8,75,64,6,5,5,4,4,3,45,32,3,2,25,16,8,5,5,3,15,8,2,1]},"cube3":{"title":"7-limit Cube[3] scale, Gene Ward Smith","filename":"cube3.scl","rnbo":[32,49,48,25,24,21,20,15,14,35,32,9,8,8,7,7,6,6,5,60,49,49,40,5,4,9,7,21,16,4,3,7,5,10,7,35,24,3,2,49,32,25,16,8,5,105,64,5,3,42,25,12,7,7,4,25,14,9,5,15,8,35,18,2,1]},"cube3enn":{"title":"7-limit Cube[3] scale, 3600-ET ennealimmal tempered","filename":"cube3enn.scl","rnbo":[32,35.66667,0,70.66667,0,84.33333,0,119.33333,0,155.0,0,204.0,0,231.33333,0,267.0,0,315.66667,0,350.66667,0,351.33333,0,386.33333,0,435.0,0,470.66667,0,498.0,0,582.66667,0,617.33333,0,653.33333,0,702.0,0,737.66667,0,772.66667,0,813.66667,0,857.0,0,884.33333,0,898.0,0,933.0,0,968.66667,0,1003.66667,0,1017.66667,0,1088.33333,0,1151.33333,0,2,1]},"cube4":{"title":"7-limit Cube[4] scale, Gene Ward Smith","filename":"cube4.scl","rnbo":[63,50,49,49,48,36,35,25,24,21,20,16,15,15,14,35,32,10,9,28,25,9,8,8,7,7,6,25,21,6,5,128,105,60,49,49,40,5,4,32,25,9,7,35,27,64,49,21,16,4,3,168,125,49,36,48,35,25,18,480,343,7,5,10,7,343,240,36,25,35,24,72,49,125,84,3,2,32,21,49,32,54,35,14,9,25,16,8,5,80,49,49,30,105,64,5,3,42,25,12,7,7,4,16,9,25,14,9,5,64,35,28,15,15,8,40,21,48,25,35,18,96,49,49,25,2,1]},"cube4enn":{"title":"7-limit Cube[4] scale, 3600-tET ennealimmal 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epimorphic","filename":"cv11.scl","rnbo":[12,15,14,9,8,6,5,9,7,21,16,7,5,3,2,8,5,12,7,9,5,15,8,2,1]},"cv13":{"title":"Thirteenth 12/5 scale <12 19 28 34| epimorphic","filename":"cv13.scl","rnbo":[12,16,15,28,25,6,5,5,4,4,3,7,5,3,2,8,5,12,7,7,4,28,15,2,1]},"cv5":{"title":"Fifth 12/5 scale <12 19 28 34| epimorphic = inverse hen12","filename":"cv5.scl","rnbo":[12,15,14,9,8,6,5,5,4,21,16,7,5,3,2,8,5,12,7,7,4,15,8,2,1]},"cv7":{"title":"Seventh 12/5 scale <12 19 28 34| epimorphic","filename":"cv7.scl","rnbo":[12,21,20,9,8,6,5,9,7,21,16,7,5,3,2,8,5,12,7,9,5,15,8,2,1]},"cv9":{"title":"Ninth 12/5 scale <12 19 28 34| epimorphic","filename":"cv9.scl","rnbo":[12,15,14,8,7,7,6,5,4,4,3,10,7,32,21,8,5,5,3,25,14,40,21,2,1]},"cw12_11":{"title":"CalkinWilf(<12 19 28 34 42|)","filename":"cw12_11.scl","rnbo":[12,12,11,8,7,6,5,5,4,4,3,7,5,3,2,8,5,5,3,7,4,11,6,2,1]},"cw19_11":{"title":"CalkinWilf(<19 30 44 53 66|)","filename":"cw19_11.scl","rnbo":[19,35,33,12,11,9,8,7,6,6,5,5,4,9,7,4,3,7,5,10,7,3,2,14,9,8,5,5,3,7,4,9,5,11,6,40,21,2,1]},"cw19_5":{"title":"CalkinWilf(<19 30 44|)","filename":"cw19_5.scl","rnbo":[19,135,128,27,25,9,8,75,64,6,5,5,4,32,25,4,3,25,18,36,25,3,2,25,16,8,5,5,3,128,75,9,5,15,8,48,25,2,1]},"cw19_7":{"title":"CalkinWilf(<19 30 44 53|)","filename":"cw19_7.scl","rnbo":[19,21,20,35,32,9,8,7,6,6,5,5,4,9,7,4,3,7,5,10,7,3,2,14,9,8,5,5,3,7,4,9,5,15,8,40,21,2,1]},"cx4":{"title":"Fourth 10/4 scale <10 16 23 28| epimorphic","filename":"cx4.scl","rnbo":[10,35,32,9,8,5,4,21,16,35,24,3,2,105,64,7,4,15,8,2,1]},"cxi1":{"title":"First 11/5 <11 17 26 31| permutation epimorphic scale","filename":"cxi1.scl","rnbo":[11,15,14,6,5,5,4,9,7,7,5,3,2,8,5,12,7,7,4,15,8,2,1]},"cxi3":{"title":"Third 11/5 <11 17 26 31| permutation epimorphic scale","filename":"cxi3.scl","rnbo":[11,49,48,35,32,7,6,5,4,7,5,35,24,3,2,25,16,7,4,15,8,2,1]},"cycle19":{"title":"19-note lesfip scale, 9-limit, 10 cents tolerance","filename":"cycle19.scl","rnbo":[19,68.20867,0,136.05163,0,202.95562,0,268.42817,0,316.37773,0,386.43387,0,451.91444,0,519.78797,0,576.96741,0,634.14686,0,702.02039,0,767.50096,0,837.5571,0,885.50666,0,950.97921,0,1017.8832,0,1085.72616,0,1153.93483,0,2,1]},"dakota-sun19":{"title":"Scott Dakota, Sun-19 tuning","filename":"dakota-sun19.scl","rnbo":[19,27,26,19,18,9,8,7,6,19,16,24,19,21,16,4,3,18,13,189,128,3,2,14,9,19,12,32,19,7,4,16,9,24,13,63,32,2,1]},"dakota-sun24":{"title":"Scott Dakota, Sun-24 tuning","filename":"dakota-sun24.scl","rnbo":[24,64,63,19,18,13,12,9,8,8,7,19,16,39,32,24,19,9,7,4,3,351,256,27,19,13,9,3,2,32,21,19,12,13,8,32,19,12,7,16,9,117,64,36,19,52,27,2,1]},"dan_seman":{"title":"Semantix-Semantic, 5-limit, common tones to Semantic-36 and Semantix-36 with different A","filename":"dan_seman.scl","rnbo":[12,27,25,9,8,243,200,100,81,4,3,25,18,3,2,81,50,400,243,729,400,50,27,2,1]},"dan_semantic":{"title":"The Semantic Scale, from Alain Daniélou: \"Sémantique 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temperament, TL 10-10-2005","filename":"dent3.scl","rnbo":[12,95.0,0,197.0,0,299.0,0,394.0,0,500.0,0,594.0,0,699.0,0,797.0,0,895.0,0,1000.0,0,1094.0,0,2,1]},"dent4":{"title":"Tom Dent, modified meantone with appr. to 7/5, 13/11, 14/11, 19/15, 19/16. TL 30-01-2009","filename":"dent4.scl","rnbo":[12,86.0,0,195.0,0,296.0,0,389.0,0,503.0,0,584.0,0,698.0,0,791.0,0,892.0,0,1001.0,0,1087.0,0,2,1]},"dent_19otti":{"title":"Tom Dent's 19otti scale","filename":"dent_19otti.scl","rnbo":[12,135,128,573,512,19,16,2565,2048,171,128,45,32,383,256,2431,1536,3429,2048,57,32,15,8,2,1]},"dent_berger":{"title":"Tom Dent's 19berger scale","filename":"dent_berger.scl","rnbo":[12,256,243,151,135,19,16,304,243,4864,3645,2215,1576,2423,1620,155648,98415,271,162,8417,4728,15,8,2,1]},"dent_mean7":{"title":"Tom Dent's 7-limit irregular meantone","filename":"dent_mean7.scl","rnbo":[12,1875,1792,28,25,1875,1568,5,4,75,56,7,5,3,2,196,125,375,224,224,125,15,8,2,1]},"deporcy":{"title":"A 15-note chord-based detempering of 7-limit porcupine","filename":"deporcy.scl","rnbo":[15,25,24,35,32,8,7,6,5,5,4,4,3,48,35,35,24,3,2,8,5,5,3,7,4,64,35,48,25,2,1]},"diab17a":{"title":"[25, 125, 175, 2401, 12005] breed diamond","filename":"diab17a.scl","rnbo":[17,2560,2401,343,320,8,7,400,343,2401,2000,5,4,3200,2401,7,5,10,7,2401,1600,8,5,4000,2401,343,200,7,4,640,343,2401,1280,2,1]},"diab17bb":{"title":"[25, 125, 175, 2401, 16807] breed diamond","filename":"diab17bb.scl","rnbo":[17,84.33333,0,231.33333,0,266.66667,0,315.66667,0,386.33333,0,470.66667,0,498.0,0,582.33333,0,617.66667,0,702.0,0,729.33333,0,813.66667,0,884.33333,0,933.33333,0,968.66667,0,1115.66667,0,2,1]},"diab17cb":{"title":"[25, 35, 125, 175, 2401] breed diamond, 3600-tET tempered","filename":"diab17cb.scl","rnbo":[17,119.66667,0,196.0,0,231.33333,0,266.66667,0,315.66667,0,386.33333,0,498.0,0,582.33333,0,617.66667,0,702.0,0,813.66667,0,884.33333,0,933.33333,0,968.66667,0,1004.0,0,1080.33333,0,2,1]},"diab17db":{"title":"[25, 125, 175, 245, 2401] breed diamond, 3600-tET tempered","filename":"diab17db.scl","rnbo":[17,35.33333,0,231.33333,0,266.66667,0,315.66667,0,351.0,0,386.33333,0,498.0,0,582.33333,0,617.66667,0,702.0,0,813.66667,0,849.0,0,884.33333,0,933.33333,0,968.66667,0,1164.66667,0,2,1]},"diab19_612":{"title":"diab19a in 612-tET","filename":"diab19_612.scl","rnbo":[19,35.29412,0,119.60784,0,231.37255,0,266.66667,0,315.68628,0,350.98039,0,386.27451,0,498.03922,0,582.35294,0,617.64706,0,701.96078,0,813.72549,0,849.01961,0,884.31372,0,933.33333,0,968.62745,0,1080.39216,0,1164.70588,0,2,1]},"diab19_72":{"title":"diab19a in 72-tET","filename":"diab19_72.scl","rnbo":[19,33.33333,0,116.66667,0,233.33333,0,266.66667,0,316.66667,0,350.0,0,383.33333,0,500.0,0,583.33333,0,616.66667,0,700.0,0,816.66667,0,850.0,0,883.33333,0,933.33333,0,966.66667,0,1083.33333,0,1166.66667,0,2,1]},"diab19a":{"title":"19-tone 7-limit JI scale","filename":"diab19a.scl","rnbo":[19,50,49,15,14,8,7,7,6,6,5,49,40,5,4,4,3,7,5,10,7,3,2,8,5,80,49,5,3,12,7,7,4,28,15,49,25,2,1]},"diab19ab":{"title":"[25, 125, 175, 245, 1715, 2401] breed diamond, 3600-tET tempered","filename":"diab19ab.scl","rnbo":[19,35.33333,0,119.66667,0,231.33333,0,266.66667,0,315.66667,0,351.0,0,386.33333,0,498.0,0,582.33333,0,617.66667,0,702.0,0,813.66667,0,849.0,0,884.33333,0,933.33333,0,968.66667,0,1080.33333,0,1164.66667,0,2,1]},"diablack":{"title":"Unique 256/245&2048/2025 Fokker block","filename":"diablack.scl","rnbo":[10,16,15,9,8,6,5,81,64,64,45,3,2,8,5,27,16,9,5,2,1]},"diabree":{"title":"detempered convex closure of 11-limit diamond in {243/242, 441/440} temperament plane","filename":"diabree.scl","rnbo":[39,45,44,21,20,15,14,12,11,11,10,10,9,9,8,8,7,7,6,6,5,11,9,5,4,14,11,9,7,21,16,4,3,15,11,11,8,7,5,10,7,16,11,22,15,3,2,32,21,14,9,11,7,8,5,18,11,5,3,12,7,7,4,16,9,9,5,20,11,11,6,28,15,21,11,49,25,2,1]},"diachrome1":{"title":"First 25/24&2048/2025 scale","filename":"diachrome1.scl","rnbo":[10,16,15,9,8,6,5,32,25,45,32,3,2,8,5,27,16,9,5,2,1]},"diaconv1029":{"title":"convex closure of 7-limit diamond with respect to 1029/1024","filename":"diaconv1029.scl","rnbo":[19,21,20,35,32,8,7,7,6,6,5,5,4,21,16,4,3,7,5,10,7,3,2,32,21,8,5,5,3,12,7,7,4,64,35,40,21,2,1]},"diaconv225":{"title":"convex closure of 7-limit diamond with respect to 225/224","filename":"diaconv225.scl","rnbo":[15,15,14,8,7,7,6,6,5,5,4,4,3,7,5,10,7,3,2,8,5,5,3,12,7,7,4,15,8,2,1]},"diaconv2401":{"title":"convex closure of 7-limit diamond with respect to 2401/2400","filename":"diaconv2401.scl","rnbo":[17,49,48,8,7,7,6,6,5,49,40,5,4,4,3,7,5,10,7,3,2,8,5,49,30,5,3,12,7,7,4,49,25,2,1]},"diaconv2401t":{"title":"convex closure of 7-limit diamond with respect to 2401/2400, 3600-tET","filename":"diaconv2401t.scl","rnbo":[17,35.33333,0,231.33333,0,266.66667,0,315.66667,0,351.0,0,386.33333,0,498.0,0,582.33333,0,617.66667,0,702.0,0,813.66667,0,849.0,0,884.33333,0,933.33333,0,968.66667,0,1164.66667,0,2,1]},"diaconv3136":{"title":"convex closure of 7-limit diamond with respect to 3136/3125","filename":"diaconv3136.scl","rnbo":[23,25,24,15,14,28,25,8,7,7,6,6,5,5,4,32,25,4,3,75,56,7,5,10,7,112,75,3,2,25,16,8,5,5,3,12,7,7,4,25,14,28,15,48,25,2,1]},"diaconv4375":{"title":"convex closure of 7-limit diamond with respect to 4375/4374","filename":"diaconv4375.scl","rnbo":[25,36,35,27,25,10,9,8,7,7,6,6,5,100,81,5,4,35,27,4,3,25,18,7,5,10,7,36,25,3,2,54,35,8,5,81,50,5,3,12,7,7,4,9,5,50,27,35,18,2,1]},"diaconv5120":{"title":"convex closure of 7-limit diamond with respect to 5120/5103","filename":"diaconv5120.scl","rnbo":[29,64,63,21,20,10,9,9,8,8,7,7,6,32,27,6,5,5,4,80,63,21,16,4,3,27,20,7,5,10,7,40,27,3,2,32,21,63,40,8,5,5,3,27,16,12,7,7,4,16,9,9,5,40,21,63,32,2,1]},"diaconv6144":{"title":"convex closure of 7-limit diamond with respect to 6144/6125","filename":"diaconv6144.scl","rnbo":[19,35,32,8,7,7,6,6,5,5,4,32,25,4,3,48,35,7,5,10,7,35,24,3,2,25,16,8,5,5,3,12,7,7,4,64,35,2,1]},"diacycle13":{"title":"Diacycle on 20/13, 13/10; there are also nodes at 3/2, 4/3; 13/9, 18/13","filename":"diacycle13.scl","rnbo":[23,40,39,20,19,40,37,10,9,8,7,20,17,40,33,5,4,40,31,4,3,40,29,10,7,40,27,20,13,30,19,60,37,5,3,12,7,30,17,20,11,15,8,60,31,2,1]},"diaddim1":{"title":"First 2048/2025&2048/1875 scale","filename":"diaddim1.scl","rnbo":[14,135,128,9,8,6,5,32,25,675,512,512,375,45,32,3,2,8,5,128,75,9,5,15,8,48,25,2,1]},"dialim1":{"title":"First 27/25&2048/2025 scale","filename":"dialim1.scl","rnbo":[14,16,15,9,8,6,5,32,25,4,3,27,20,45,32,3,2,8,5,27,16,9,5,15,8,48,25,2,1]},"diam19":{"title":"Optimized 13-limit from diamond9plus","filename":"diam19.scl","rnbo":[19,182.1261,0,204.0654,0,231.198,0,266.9967,0,315.5588,0,383.3099,0,435.7345,0,497.2228,0,582.3425,0,617.6575,0,702.7772,0,764.2655,0,816.6901,0,884.4412,0,933.0033,0,968.802,0,995.9346,0,1017.8739,0,2,1]},"diamin7":{"title":"permutation epimorphic scale with 7-limit diamond, Hahn and TM reduced <18 29 42 50|","filename":"diamin7.scl","rnbo":[18,16,15,10,9,7,6,8,7,6,5,5,4,4,3,27,20,7,5,10,7,3,2,8,5,5,3,7,4,12,7,9,5,15,8,2,1]},"diamin7_72":{"title":"diamin7 in 72-tET","filename":"diamin7_72.scl","rnbo":[18,116.666667,0,183.333333,0,266.666667,0,233.333333,0,316.666667,0,383.333333,0,500.0,0,516.666667,0,583.333333,0,616.666667,0,700.0,0,816.666667,0,883.333333,0,966.666667,0,933.333333,0,1016.666667,0,1083.333333,0,2,1]},"diamin7marv":{"title":"1/4 kleismic tempered diamin7","filename":"diamin7marv.scl","rnbo":[18,115.58705,0,184.33159,0,268.79879,0,8,7,6,5,384.38583,0,499.97288,0,515.69553,0,584.44007,0,615.55993,0,700.02712,0,815.61417,0,5,3,7,4,931.20121,0,1015.66841,0,1084.41295,0,2,1]},"diamisty":{"title":"Diamisty scale 2048/2025 and 67108864/66430125","filename":"diamisty.scl","rnbo":[12,135,128,9,8,1215,1024,512,405,4,3,64,45,3,2,405,256,54675,32768,32768,18225,256,135,2,1]},"diamond11a":{"title":"11-limit Diamond (partch_29.scl) with added 16/15 & 15/8, Zoomoozophone tuning: 1/1 = 392 Hz","filename":"diamond11a.scl","rnbo":[31,16,15,12,11,11,10,10,9,9,8,8,7,7,6,6,5,11,9,5,4,14,11,9,7,4,3,11,8,7,5,10,7,16,11,3,2,14,9,11,7,8,5,18,11,5,3,12,7,7,4,16,9,9,5,20,11,11,6,15,8,2,1]},"diamond11ak":{"title":"microtempered version of diamond11a, Dave Keenan TL 11-1-2000, 225/224&385/384","filename":"diamond11ak.scl","rnbo":[31,115.79629,0,151.99206,0,11,10,10,9,201.2,0,231.60409,0,267.79591,0,316.99629,0,11,9,383.60371,0,419.78796,0,432.8041,0,499.4,0,548.60794,0,584.79219,0,615.20781,0,651.39206,0,700.6,0,767.1959,0,780.21204,0,816.39629,0,18,11,883.00371,0,932.20409,0,968.39591,0,998.8,0,9,5,20,11,1048.00794,0,1084.20371,0,2,1]},"diamond11map":{"title":"11-limit diamond on a 'centreless' map","filename":"diamond11map.scl","rnbo":[72,7,6,4,3,3,2,5,3,11,6,2,1,7,3,8,3,3,1,10,3,11,3,12,11,14,11,16,11,18,11,20,11,2,1,24,11,28,11,32,11,36,11,40,11,4,1,6,5,7,5,8,5,9,5,2,1,11,5,12,5,14,5,16,5,18,5,4,1,22,5,4,3,14,9,16,9,2,1,20,9,22,9,8,3,28,9,32,9,4,1,40,9,44,9,3,2,7,4,2,1,9,4,5,2,11,4,3,1,7,2,4,1,9,2,5,1,11,2,12,7,2,1,16,7,18,7,20,7,22,7,24,7,4,1,32,7,36,7,40,7,44,7,4,1]},"diamond11strange":{"title":"Lesfip scale, 11-limit diamond, 10 cents tolerance","filename":"diamond11strange.scl","rnbo":[16,116.94577,0,177.7385,0,266.17058,0,322.76186,0,381.86836,0,498.63344,0,557.73994,0,614.33123,0,702.76331,0,763.55603,0,880.5018,0,936.15732,0,996.30671,0,1084.19509,0,1144.34448,0,2,1]},"diamond11tr":{"title":"11-limit triangular diamond lattice with 64/63 intervals removed","filename":"diamond11tr.scl","rnbo":[15,9,8,7,6,6,5,5,4,4,3,11,8,7,5,10,7,16,11,3,2,8,5,5,3,12,7,16,9,2,1]},"diamond15":{"title":"15-limit diamond + 2nd ratios. See Novaro, 1927, Sistema Natural...","filename":"diamond15.scl","rnbo":[59,33,32,16,15,15,14,14,13,13,12,12,11,11,10,10,9,9,8,8,7,15,13,7,6,13,11,32,27,6,5,39,32,11,9,16,13,5,4,14,11,9,7,13,10,21,16,4,3,15,11,11,8,18,13,7,5,45,32,64,45,10,7,13,9,16,11,22,15,3,2,32,21,20,13,14,9,11,7,8,5,13,8,18,11,64,39,5,3,27,16,22,13,12,7,26,15,7,4,16,9,9,5,20,11,11,6,24,13,13,7,28,15,15,8,64,33,2,1]},"diamond17":{"title":"17-limit diamond","filename":"diamond17.scl","rnbo":[43,17,16,14,13,13,12,12,11,11,10,8,7,7,6,20,17,13,11,6,5,17,14,16,13,5,4,14,11,22,17,13,10,17,13,4,3,11,8,7,5,24,17,17,12,10,7,16,11,3,2,26,17,20,13,17,11,11,7,8,5,13,8,28,17,5,3,22,13,17,10,12,7,7,4,20,11,11,6,24,13,13,7,32,17,2,1]},"diamond17a":{"title":"17-limit, +9 diamond","filename":"diamond17a.scl","rnbo":[55,18,17,17,16,14,13,13,12,12,11,11,10,10,9,9,8,8,7,7,6,20,17,13,11,6,5,17,14,11,9,16,13,5,4,14,11,9,7,22,17,13,10,17,13,4,3,11,8,18,13,7,5,24,17,17,12,10,7,13,9,16,11,3,2,26,17,20,13,17,11,14,9,11,7,8,5,13,8,18,11,28,17,5,3,22,13,17,10,12,7,7,4,16,9,9,5,20,11,11,6,24,13,13,7,32,17,17,9,2,1]},"diamond17b":{"title":"17-limit, +9 +15 diamond, Denny Genovese, 3/2=384 Hz","filename":"diamond17b.scl","rnbo":[65,18,17,17,16,16,15,15,14,14,13,13,12,12,11,11,10,10,9,9,8,17,15,8,7,15,13,7,6,20,17,13,11,6,5,17,14,11,9,16,13,5,4,14,11,9,7,22,17,13,10,17,13,4,3,15,11,11,8,18,13,7,5,24,17,17,12,10,7,13,9,16,11,22,15,3,2,26,17,20,13,17,11,14,9,11,7,8,5,13,8,18,11,28,17,5,3,22,13,17,10,12,7,26,15,7,4,30,17,16,9,9,5,20,11,11,6,24,13,13,7,28,15,15,8,32,17,17,9,2,1]},"diamond19":{"title":"19-limit diamond","filename":"diamond19.scl","rnbo":[57,20,19,17,16,14,13,13,12,12,11,11,10,19,17,8,7,22,19,7,6,20,17,13,11,19,16,6,5,17,14,16,13,5,4,24,19,14,11,22,17,13,10,17,13,4,3,19,14,26,19,11,8,7,5,24,17,17,12,10,7,16,11,19,13,28,19,3,2,26,17,20,13,17,11,11,7,19,12,8,5,13,8,28,17,5,3,32,19,22,13,17,10,12,7,19,11,7,4,34,19,20,11,11,6,24,13,13,7,32,17,19,10,2,1]},"diamond27":{"title":"Diamond 21 23 25 27, Christopher Vaisvil","filename":"diamond27.scl","rnbo":[13,27,25,25,23,23,21,27,23,25,21,9,7,14,9,42,25,46,27,42,23,46,25,50,27,2,1]},"diamond7-13":{"title":"7 9 11 13 diamond","filename":"diamond7-13.scl","rnbo":[13,14,13,13,11,11,9,14,11,9,7,18,13,13,9,14,9,11,7,18,11,22,13,13,7,2,1]},"diamond7":{"title":"7-limit diamond, also double-tie circular mirroring of 4:5:6:7 with common pivot","filename":"diamond7.scl","rnbo":[13,8,7,7,6,6,5,5,4,4,3,7,5,10,7,3,2,8,5,5,3,12,7,7,4,2,1]},"diamond7_126":{"title":"7-limit diamond starling (126/125) 5-limit convex closure","filename":"diamond7_126.scl","rnbo":[15,25,24,144,125,125,108,6,5,5,4,4,3,25,18,36,25,3,2,8,5,5,3,216,125,125,72,48,25,2,1]},"diamond7_225":{"title":"7-limit diamond marvel (225/224) 5-limit convex closure","filename":"diamond7_225.scl","rnbo":[15,16,15,256,225,75,64,6,5,5,4,4,3,45,32,64,45,3,2,8,5,5,3,128,75,225,128,15,8,2,1]},"diamond9":{"title":"9-limit tonality diamond","filename":"diamond9.scl","rnbo":[19,10,9,9,8,8,7,7,6,6,5,5,4,9,7,4,3,7,5,10,7,3,2,14,9,8,5,5,3,12,7,7,4,16,9,9,5,2,1]},"diamond9_875":{"title":"9-limit diamond keemic (875/864) 5-limit convex closure","filename":"diamond9_875.scl","rnbo":[27,25,24,16,15,10,9,9,8,144,125,125,108,6,5,5,4,32,25,125,96,4,3,864,625,25,18,36,25,625,432,3,2,192,125,25,16,8,5,5,3,216,125,125,72,16,9,9,5,15,8,48,25,2,1]},"diamond9block":{"title":"Weak Fokker block one note different from the 9-limit diamond","filename":"diamond9block.scl","rnbo":[19,10,9,9,8,8,7,7,6,6,5,5,4,9,7,4,3,7,5,10,7,3,2,14,9,5,3,12,7,7,4,16,9,9,5,27,14,2,1]},"diamond9keemic":{"title":"Keemic (875/864) tempering of 9-limit diamond, POTE tuning","filename":"diamond9keemic.scl","rnbo":[19,176.72185,0,203.74653,0,235.78536,0,262.34137,0,321.40488,0,380.46839,0,439.53189,0,498.12673,0,583.74625,0,616.25375,0,701.87327,0,760.46811,0,819.53161,0,878.59512,0,937.65863,0,964.21464,0,996.25347,0,1023.27815,0,2,1]},"diamond9plus":{"title":"9-limit tonality diamond extended with two secors","filename":"diamond9plus.scl","rnbo":[21,115.587,0,10,9,9,8,8,7,7,6,6,5,5,4,9,7,4,3,7,5,10,7,3,2,14,9,8,5,5,3,12,7,7,4,16,9,9,5,1084.413,0,2,1]},"diamond_chess":{"title":"9-limit chessboard pattern diamond. OdC","filename":"diamond_chess.scl","rnbo":[11,8,7,6,5,9,7,4,3,7,5,10,7,3,2,14,9,5,3,7,4,2,1]},"diamond_chess11":{"title":"11-limit chessboard pattern diamond. OdC","filename":"diamond_chess11.scl","rnbo":[17,11,10,8,7,6,5,11,9,9,7,4,3,11,8,7,5,10,7,16,11,3,2,14,9,18,11,5,3,7,4,20,11,2,1]},"diamond_dup":{"title":"Two 7-limit diamonds 3/2 apart","filename":"diamond_dup.scl","rnbo":[20,21,20,15,14,9,8,8,7,7,6,6,5,5,4,9,7,21,16,4,3,7,5,10,7,3,2,8,5,5,3,12,7,7,4,9,5,15,8,2,1]},"diamond_mod":{"title":"13-tone Octave Modular Diamond, based on Archytas's Enharmonic","filename":"diamond_mod.scl","rnbo":[13,36,35,28,27,16,15,5,4,9,7,4,3,3,2,14,9,8,5,15,8,27,14,35,18,2,1]},"diamond_tetr":{"title":"Tetrachord Modular Diamond based on Archytas's Enharmonic","filename":"diamond_tetr.scl","rnbo":[8,28,27,16,15,5,4,9,7,35,27,4,3,48,35,2,1]},"diamondupblock":{"title":"Weak Fokker block with val <20 31 46 59|","filename":"diamondupblock.scl","rnbo":[20,16,15,10,9,9,8,8,7,7,6,6,5,5,4,21,16,4,3,7,5,10,7,3,2,8,5,5,3,12,7,7,4,16,9,9,5,15,8,2,1]},"diaphonic_10":{"title":"10-tone Diaphonic Cycle","filename":"diaphonic_10.scl","rnbo":[10,18,17,9,8,6,5,9,7,18,13,3,2,8,5,12,7,24,13,2,1]},"diaphonic_12":{"title":"12-tone Diaphonic Cycle, conjunctive form on 3/2 and 4/3","filename":"diaphonic_12.scl","rnbo":[12,21,20,21,19,7,6,21,17,21,16,7,5,3,2,30,19,5,3,30,17,15,8,2,1]},"diaphonic_12a":{"title":"2nd 12-tone Diaphonic Cycle, conjunctive form on 10/7 and 7/5","filename":"diaphonic_12a.scl","rnbo":[12,21,20,21,19,7,6,21,17,21,16,7,5,28,19,14,9,28,17,7,4,28,15,2,1]},"diaphonic_7":{"title":"7-tone Diaphonic Cycle, disjunctive form on 4/3 and 3/2","filename":"diaphonic_7.scl","rnbo":[7,12,11,6,5,4,3,16,11,8,5,16,9,2,1]},"diat13":{"title":"This genus is from K.S's  diatonic Hypodorian harmonia","filename":"diat13.scl","rnbo":[7,16,15,16,13,4,3,3,2,8,5,24,13,2,1]},"diat15":{"title":"Tonos-15 Diatonic and its own trite synemmenon Bb","filename":"diat15.scl","rnbo":[8,15,13,5,4,15,11,10,7,3,2,5,3,15,8,2,1]},"diat15_inv":{"title":"Inverted Tonos-15 Harmonia, a harmonic series from 15 from 30.","filename":"diat15_inv.scl","rnbo":[8,16,15,6,5,4,3,7,5,22,15,8,5,26,15,2,1]},"diat17":{"title":"Tonos-17 Diatonic and its own trite synemmenon Bb","filename":"diat17.scl","rnbo":[8,17,15,17,13,17,12,34,23,17,11,17,10,17,9,2,1]},"diat19":{"title":"Tonos-19 Diatonic and its own trite synemmenon Bb","filename":"diat19.scl","rnbo":[8,19,18,19,16,19,14,38,27,19,13,19,12,19,11,2,1]},"diat21":{"title":"Tonos-21 Diatonic and its own trite synemmenon Bb","filename":"diat21.scl","rnbo":[8,21,19,7,6,21,16,7,5,3,2,21,13,7,4,2,1]},"diat21_inv":{"title":"Inverted Tonos-21 Harmonia, a harmonic series from 21 from 42.","filename":"diat21_inv.scl","rnbo":[8,8,7,26,21,4,3,10,7,32,21,12,7,38,21,2,1]},"diat23":{"title":"Tonos-23 Diatonic and its own trite synemmenon Bb","filename":"diat23.scl","rnbo":[8,23,21,23,20,23,18,23,17,23,16,23,14,23,13,2,1]},"diat25":{"title":"Tonos-25 Diatonic and its own trite synemmenon Bb","filename":"diat25.scl","rnbo":[8,25,22,5,4,25,18,25,17,25,16,25,14,25,13,2,1]},"diat27":{"title":"Tonos-27 Diatonic and its own trite synemmenon Bb","filename":"diat27.scl","rnbo":[8,9,8,9,7,27,20,27,19,3,2,27,16,27,14,2,1]},"diat27_inv":{"title":"Inverted Tonos-27 Harmonia, a harmonic series from 27 from 54","filename":"diat27_inv.scl","rnbo":[8,28,27,32,27,4,3,13,9,40,27,14,9,16,9,2,1]},"diat29":{"title":"Tonos-29 Diatonic and its own trite synemmenon Bb","filename":"diat29.scl","rnbo":[8,29,26,29,24,29,22,29,21,29,20,29,18,29,16,2,1]},"diat31":{"title":"Tonos-31 Diatonic. The disjunctive and conjunctive diatonic forms are the same","filename":"diat31.scl","rnbo":[8,31,28,31,26,31,24,31,23,31,22,31,20,31,18,2,1]},"diat33":{"title":"Tonos-33 Diatonic. The conjunctive form  is 23 (Bb instead of B) 20 18 33/2","filename":"diat33.scl","rnbo":[8,11,10,11,9,11,8,33,23,3,2,33,20,11,6,2,1]},"diat_chrom":{"title":"Diatonic- Chromatic, on the border between the chromatic and diatonic genera","filename":"diat_chrom.scl","rnbo":[7,15,14,15,13,4,3,3,2,45,28,45,26,2,1]},"diat_dies2":{"title":"Dorian Diatonic, 2 part Diesis","filename":"diat_dies2.scl","rnbo":[7,33.33333,0,300.0,0,500.0,0,700.0,0,733.33333,0,1000.0,0,2,1]},"diat_dies5":{"title":"Dorian Diatonic, 5 part Diesis","filename":"diat_dies5.scl","rnbo":[7,83.33333,0,300.0,0,500.0,0,700.0,0,783.33333,0,1000.0,0,2,1]},"diat_enh":{"title":"Diat. + Enharm. Diesis, Dorian Mode","filename":"diat_enh.scl","rnbo":[7,50.0,0,300.0,0,500.0,0,700.0,0,750.0,0,1000.0,0,2,1]},"diat_enh2":{"title":"Diat. + Enharm. Diesis, Dorian Mode 3 + 12 + 15 parts","filename":"diat_enh2.scl","rnbo":[7,50.0,0,250.0,0,500.0,0,700.0,0,750.0,0,950.0,0,2,1]},"diat_enh3":{"title":"Diat. + Enharm. Diesis, Dorian Mode, 15 + 3 + 12 parts","filename":"diat_enh3.scl","rnbo":[7,250.0,0,300.0,0,500.0,0,700.0,0,950.0,0,1000.0,0,2,1]},"diat_enh4":{"title":"Diat. + Enharm. Diesis, Dorian Mode, 15 + 12 + 3 parts","filename":"diat_enh4.scl","rnbo":[7,250.0,0,450.0,0,500.0,0,700.0,0,950.0,0,1150.0,0,2,1]},"diat_enh5":{"title":"Dorian Mode, 12 + 15 + 3 parts","filename":"diat_enh5.scl","rnbo":[7,200.0,0,450.0,0,500.0,0,700.0,0,900.0,0,1150.0,0,2,1]},"diat_enh6":{"title":"Dorian Mode, 12 + 3 + 15 parts","filename":"diat_enh6.scl","rnbo":[7,200.0,0,250.0,0,500.0,0,700.0,0,900.0,0,950.0,0,2,1]},"diat_eq":{"title":"Equal Diatonic, Islamic form, similar to 11/10 x 11/10 x 400/363","filename":"diat_eq.scl","rnbo":[7,166.66667,0,333.33333,0,500.0,0,700.0,0,866.66667,0,1033.33333,0,2,1]},"diat_eq2":{"title":"Equal Diatonic, 11/10 x 400/363 x 11/10","filename":"diat_eq2.scl","rnbo":[7,11,10,40,33,4,3,3,2,33,20,20,11,2,1]},"diat_hemchrom":{"title":"Diat. + Hem. Chrom. Diesis, Another genus of Aristoxenos, Dorian Mode","filename":"diat_hemchrom.scl","rnbo":[7,75.0,0,300.0,0,500.0,0,700.0,0,775.0,0,1000.0,0,2,1]},"diat_smal":{"title":"\"Smallest number\" diatonic scale","filename":"diat_smal.scl","rnbo":[7,8,7,5,4,4,3,3,2,5,3,7,4,2,1]},"diat_sofchrom":{"title":"Diat. + Soft Chrom. Diesis, Another genus of Aristoxenos, Dorian Mode","filename":"diat_sofchrom.scl","rnbo":[7,66.66667,0,300.0,0,500.0,0,700.0,0,766.66667,0,1000.0,0,2,1]},"diat_soft":{"title":"Soft Diatonic genus 5 + 10 + 15 parts","filename":"diat_soft.scl","rnbo":[7,83.33333,0,250.0,0,500.0,0,700.0,0,783.33333,0,950.0,0,2,1]},"diat_soft2":{"title":"Soft Diatonic genus with equally divided Pyknon; Dorian Mode","filename":"diat_soft2.scl","rnbo":[7,125.0,0,250.0,0,500.0,0,700.0,0,825.0,0,950.0,0,2,1]},"diat_soft3":{"title":"New Soft Diatonic genus with equally divided Pyknon; Dorian Mode; 1:1 pyknon","filename":"diat_soft3.scl","rnbo":[7,125.0,0,375.0,0,500.0,0,700.0,0,825.0,0,1075.0,0,2,1]},"diat_soft4":{"title":"New Soft Diatonic genus with equally divided Pyknon; Dorian Mode; 1:1 pyknon","filename":"diat_soft4.scl","rnbo":[7,250.0,0,375.0,0,500.0,0,700.0,0,950.0,0,1075.0,0,2,1]},"didy_chrom":{"title":"Didymus Chromatic","filename":"didy_chrom.scl","rnbo":[7,16,15,10,9,4,3,3,2,8,5,5,3,2,1]},"didy_chrom1":{"title":"Permuted Didymus Chromatic","filename":"didy_chrom1.scl","rnbo":[7,16,15,32,25,4,3,3,2,8,5,48,25,2,1]},"didy_chrom2":{"title":"Didymos's Chromatic, 6/5 x 25/24 x 16/15","filename":"didy_chrom2.scl","rnbo":[7,6,5,5,4,4,3,3,2,9,5,15,8,2,1]},"didy_chrom3":{"title":"Didymos's Chromatic, 25/24 x 16/15 x 6/5","filename":"didy_chrom3.scl","rnbo":[7,25,24,10,9,4,3,3,2,25,16,5,3,2,1]},"didy_diat":{"title":"Didymus Diatonic","filename":"didy_diat.scl","rnbo":[7,16,15,32,27,4,3,3,2,8,5,16,9,2,1]},"didy_enh":{"title":"Dorian mode of Didymos's Enharmonic","filename":"didy_enh.scl","rnbo":[7,32,31,16,15,4,3,3,2,48,31,8,5,2,1]},"didy_enh2":{"title":"Permuted Didymus Enharmonic","filename":"didy_enh2.scl","rnbo":[7,256,243,16,15,4,3,3,2,128,81,8,5,2,1]},"didymus19sync":{"title":"Didymus[19] hobbit (81/80) in synchronized tuning ! 3-2x, 5-x, 7-2x, where x is the smaller root of 16x^4 - 96x^3 + 216x^2 - 200x + 1","filename":"didymus19sync.scl","rnbo":[19,41.37646,0,119.28478,0,192.28609,0,233.66254,0,311.57087,0,384.57217,0,462.4805,0,503.85696,0,545.23341,0,654.76659,0,696.14304,0,737.5195,0,815.42783,0,888.42913,0,966.33746,0,1007.71391,0,1080.71522,0,1158.62354,0,2,1]},"diesic-m":{"title":"Minimal Diesic temperament, g=176.021, 5-limit","filename":"diesic-m.scl","rnbo":[7,176.02067,0,352.04134,0,528.06201,0,704.08268,0,880.10335,0,1056.12402,0,2,1]},"diesic-t":{"title":"Tiny Diesic temperament, g=443.017, 5-limit","filename":"diesic-t.scl","rnbo":[19,73.18474,0,129.05038,0,202.23513,0,258.10077,0,331.28551,0,387.15115,0,443.01679,0,516.20154,0,572.06718,0,645.25192,0,701.11756,0,774.3023,0,830.16795,0,886.03359,0,959.21833,0,1015.08397,0,1088.26871,0,1144.13436,0,2,1]},"diff19-9-4":{"title":"Scale derived from (19,9,4) Type Q cyclic difference set, 19-tET","filename":"diff19-9-4.scl","rnbo":[10,63.15789,0,252.63158,0,315.78947,0,378.94737,0,442.10526,0,568.42105,0,694.73684,0,1010.52632,0,1073.68421,0,2,1]},"diff31-h8":{"title":"(31, 15, 7) type H8 cyclic difference set, 31-tET","filename":"diff31-h8.scl","rnbo":[16,38.70968,0,77.41935,0,116.12903,0,154.83871,0,232.25806,0,309.67742,0,464.51613,0,580.64516,0,619.35484,0,658.06452,0,890.32258,0,929.03226,0,1045.16129,0,1122.58065,0,1161.29032,0,2,1]},"diff31-q":{"title":"(31, 15, 7) type Q cyclic difference set, 31-tET","filename":"diff31-q.scl","rnbo":[16,38.70968,0,77.41935,0,154.83871,0,193.54839,0,270.96774,0,309.67742,0,348.3871,0,387.09677,0,541.93548,0,619.35484,0,696.77419,0,735.48387,0,774.19355,0,967.74194,0,1083.87097,0,2,1]},"diff31_72":{"title":"Diff31, 11/9, 4/3, 7/5, 3/2, 7/4, 9/5 difference diamond, tempered to 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sequence","filename":"dudon_atlantis.scl","rnbo":[12,327,314,1403,1256,188,157,12547,10048,210,157,3497,2512,469,314,1955,1256,4191,2512,281,157,37399,20096,2,1]},"dudon_aulos":{"title":"Double clarinet -c version of Ptolemy's Diatonon Homalon","filename":"dudon_aulos.scl","rnbo":[12,12,11,35,32,6,5,53,44,4,3,1,1,3,2,1,1,18,11,9,5,317,176,2,1]},"dudon_b":{"title":"Dudon Tetrachord B","filename":"dudon_b.scl","rnbo":[7,13,12,59,48,4,3,3,2,13,8,59,32,2,1]},"dudon_baka":{"title":"Baka typical semifourth pentatonic, can also be accepted as a circular Slendro","filename":"dudon_baka.scl","rnbo":[12,8,7,668,581,768,581,768,581,110,83,880,581,880,581,144,83,144,83,1152,581,1160,581,2,1]},"dudon_bala_ribbon":{"title":"Parizekmic scale based on a double Bala sequence","filename":"dudon_bala_ribbon.scl","rnbo":[12,25,24,9,8,6,5,13,10,4,3,83,60,3,2,8,5,26,15,9,5,39,20,2,1]},"dudon_bala_ribbon19":{"title":"Parizekmic scale based on a double Bala 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1985)","filename":"dudon_baziguzuk.scl","rnbo":[12,1,1,13,12,4,3,13,12,4,3,11,6,3,2,11,6,4,3,11,6,3,2,2,1]},"dudon_bhairav":{"title":"Bhairav thaat raga, based on 17th harmonic","filename":"dudon_bhairav.scl","rnbo":[12,17,16,16,15,5,4,301,240,4,3,1,1,3,2,51,32,307,192,179,96,15,8,2,1]},"dudon_bhairavi":{"title":"Bhairavi thaat raga, by Dudon (2004)","filename":"dudon_bhairavi.scl","rnbo":[12,17,16,19,17,19,16,304,255,4,3,17,12,3,2,19,12,1216,765,57,32,152,85,2,1]},"dudon_bhatiyar":{"title":"Early morning North indian raga, a modelisation based on Amlak 57","filename":"dudon_bhatiyar.scl","rnbo":[12,20,19,271,256,5,4,24,19,4,3,80,57,3,2,57,34,32,19,107,57,36,19,2,1]},"dudon_bhavapriya":{"title":"Bhavapriya (South indian, prati madhyama mela # 44) or Bhavani (North indian)","filename":"dudon_bhavapriya.scl","rnbo":[12,17,16,273,256,19,16,307,256,45,32,361,256,3,2,51,32,205,128,16,9,57,32,2,1]},"dudon_brazil":{"title":"Triple equal-beating 1/5 syntonic comma meantone, limited to 8 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fifths","filename":"dudon_comptine_h3.scl","rnbo":[12,2225,2112,592,528,20025,16896,1323,1056,4,3,29667,21120,3,2,6675,4224,885,528,60075,33792,9889,5280,2,1]},"dudon_country_blues":{"title":"Differentially-coherent 12 tones country blues scale","filename":"dudon_country_blues.scl","rnbo":[12,101,96,9,8,29,24,5,4,4,3,67,48,3,2,19,12,5,3,43,24,15,8,2,1]},"dudon_countrysongs":{"title":"CDEG chords and all transpositions equal-beating meantone sequence","filename":"dudon_countrysongs.scl","rnbo":[12,7413,7072,495,442,264,221,4429,3536,591,442,9925,7072,1323,884,11097,7072,2961,1768,395,221,6633,3536,2,1]},"dudon_crying_commas":{"title":"Pentatonic differentiallly-coherent scale with crying commas","filename":"dudon_crying_commas.scl","rnbo":[12,9,8,217,192,437,384,55,48,4,3,3,2,3,2,5,3,323,192,163,96,55,32,2,1]},"dudon_darbari":{"title":"Darbari Kanada  (midnight raga)","filename":"dudon_darbari.scl","rnbo":[12,1,1,9,8,19,16,115,96,4,3,9,8,3,2,19,12,115,72,57,32,115,64,2,1]},"dudon_diat":{"title":"Dudon Neutral Diatonic","filename":"dudon_diat.scl","rnbo":[7,9,8,27,22,59,44,3,2,18,11,81,44,2,1]},"dudon_diatess":{"title":"Sequence of 11 Diatess fifths from Eb (75)","filename":"dudon_diatess.scl","rnbo":[12,16549,15984,1114,999,400,333,4969,3996,446,333,1385,999,1492,999,8237,5328,1109,666,1792,999,1855,999,2,1]},"dudon_didymus":{"title":"Greek-genre scale rich in commas","filename":"dudon_didymus.scl","rnbo":[12,21,20,9,8,6,5,56,45,7,5,45,32,3,2,8,5,5,3,9,5,28,15,2,1]},"dudon_egyptian_rast":{"title":"Egyptian style Rast -c modelisation","filename":"dudon_egyptian_rast.scl","rnbo":[12,107,96,9,8,11,9,59,48,4,3,1,1,3,2,5,3,121,72,11,6,133,72,2,1]},"dudon_evan_thai":{"title":"Evan differentially-coherent double Thai 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variations","filename":"dudon_gnawa-pelog.scl","rnbo":[12,141,140,39,35,157,140,191,140,48,35,48,35,52,35,52,35,3,2,64,35,64,35,2,1]},"dudon_golden_h7eb":{"title":"12 of 19/31/50 etc... Golden meantone harmonic 7-c and eq-b version","filename":"dudon_golden_h7eb.scl","rnbo":[12,44603,42752,2987,2672,200,167,3337,2672,447,334,29839,21376,999,668,33339,21376,4465,2672,299,167,2495,1336,2,1]},"dudon_gulu-nem":{"title":"5 tones Pelog from a sequence of very low \"Gulu-nem\" fifths (about 5/9 of an octave)","filename":"dudon_gulu-nem.scl","rnbo":[12,1,1,1393,1284,1393,1284,2015,1712,2015,1712,2015,1712,473,321,473,321,4105,2568,4105,2568,4105,2568,2,1]},"dudon_harm_minor":{"title":"So-called \"harmonic\" minor scale, also raga Kiravani, one of Dudon's versions","filename":"dudon_harm_minor.scl","rnbo":[12,143,128,9,8,19,16,6,5,4,3,429,320,3,2,8,5,57,32,9,5,301,160,2,1]},"dudon_harry":{"title":"Hommage to Harry Partch, 20th century just intonation pioneer (1901-1974)","filename":"dudon_harry.scl","rnbo":[12,10,9,9,8,8,7,7,6,21,16,4,3,40,27,3,2,32,21,14,9,7,4,2,1]},"dudon_hawaiian":{"title":"Equal-beating lapsteel-style Major 6th chords (C:E:G:A:C:E) meantone 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(not traditional)","filename":"dudon_ifbis.scl","rnbo":[12,61,56,8,7,17,14,9,7,75,56,10,7,3,2,11,7,93,56,7,4,13,7,2,1]},"dudon_iph-arax":{"title":"Iph-Arax heptatone","filename":"dudon_iph-arax.scl","rnbo":[6,93.88582,0,366.90974,0,466.1806,0,560.06655,0,833.0903,0,926.97633,0]},"dudon_isrep":{"title":"Fractal Isrep -c recurrent sequence,  x^2 = 8x - 8  from F=64","filename":"dudon_isrep.scl","rnbo":[12,2,1,75,64,75,32,1,1,11,8,11,4,3,2,3,1,13,8,13,4,75,64,2,1]},"dudon_jamlak":{"title":"Cycle of fifths developped around a 19-limit Amlak sequence","filename":"dudon_jamlak.scl","rnbo":[12,321,320,9,8,381,320,101,80,107,80,57,40,3,2,127,80,539,320,571,320,19,10,2,1]},"dudon_jazz":{"title":"Jazz in 7 tones","filename":"dudon_jazz.scl","rnbo":[12,1,1,301,256,19,16,4,3,171,128,361,256,767,512,3,2,5,3,455,256,57,32,2,1]},"dudon_jobim":{"title":"Triple equal-beating 1/5 syntonic comma meantone, full 12 tones scale","filename":"dudon_jobim.scl","rnbo":[12,13893147,13238272,1809,1616,246989,206848,64801,51712,135,101,2321289,1654784,1209,808,10155,6464,10827,6464,184251,103424,387843,206848,2,1]},"dudon_jog":{"title":"Jog with (ascent only) additional 15/8","filename":"dudon_jog.scl","rnbo":[12,1,1,19,16,6,5,5,4,4,3,43,32,3,2,3,2,16,9,43,24,15,8,2,1]},"dudon_joged-bumbung":{"title":"Typical Balinese grantang and tingklik (bamboo xylophones) slendro tuning","filename":"dudon_joged-bumbung.scl","rnbo":[12,1,1,1448,1273,8,7,1688,1273,1688,1273,4,3,3,2,1920,1273,12,7,2184,1273,2,1,2,1]},"dudon_kalyana":{"title":"Kalyana thaat raga, harmonics 3-5-17-19-43 version by Dudon 2004","filename":"dudon_kalyana.scl","rnbo":[12,19,17,172,153,5,4,64,51,45,32,24,17,3,2,256,153,57,34,15,8,32,17,2,1]},"dudon_kanakangi":{"title":"Raga Kanakangi (Karnatic music, suddha madhyama mela # 1)","filename":"dudon_kanakangi.scl","rnbo":[12,17,16,9,8,9,8,4,3,4,3,3,2,3,2,19,12,5,3,5,3,2,1,2,1]},"dudon_kellner_eb":{"title":"JI version of Anton Kellner 1/5 Pyth.c well-temperament, based on Skisni algorithm","filename":"dudon_kellner_eb.scl","rnbo":[12,256,243,272,243,32,27,2738,2187,4,3,1024,729,3272,2187,128,81,3664,2187,16,9,1369,729,2,1]},"dudon_kidarvani":{"title":"Kidarvani, combination tuning of ragas Kirvani and Darbari","filename":"dudon_kidarvani.scl","rnbo":[10,9,8,19,16,6,5,4,3,3,2,8,5,16,9,9,5,15,8,2,1]},"dudon_kirvanti":{"title":"Raga Kirvanti (known also as Hungarian Gypsy scale)","filename":"dudon_kirvanti.scl","rnbo":[12,1,1,9,8,19,16,6,5,64,45,57,40,3,2,51,32,8,5,15,8,303,160,2,1]},"dudon_kora-chimere":{"title":"Kora diatonic, slightly neutral","filename":"dudon_kora-chimere.scl","rnbo":[12,635,382,425,382,2,1,945,764,256,191,945,382,285,191,512,191,635,382,1415,764,570,191,2,1]},"dudon_kora_snd":{"title":"Kora tuning in the Mandinka semi-neutral diatonic style","filename":"dudon_kora_snd.scl","rnbo":[12,129,104,29,26,35,26,129,104,35,26,43,26,3,2,24,13,345,208,2,1,24,13,2,1]},"dudon_kumoyoshi_19-l":{"title":"Japanese famous mode, -c 17+19th harmonics interpretation","filename":"dudon_kumoyoshi_19-l.scl","rnbo":[12,3,2,19,18,17,16,1,1,4,3,17,8,3,2,2,1,19,12,51,32,1,1,2,1]},"dudon_lakota":{"title":"Comma variations add to the richness of differential tones","filename":"dudon_lakota.scl","rnbo":[12,1,1,19,16,6,5,29,24,4,3,107,80,3,2,1,1,5,3,57,32,9,5,2,1]},"dudon_liane":{"title":"Class 1 differentially coherent interleaved intervals, hexatonic scale","filename":"dudon_liane.scl","rnbo":[12,6273,6272,55,49,9,8,121,98,969,784,10,7,561,392,11,7,11,7,89,49,51,28,2,1]},"dudon_lucie":{"title":"Sequence of 11 fractal Lucie fifths (exactly 695,5023126 c.) from Eb","filename":"dudon_lucie.scl","rnbo":[12,1477,1424,1789,1602,320,267,111,89,1072,801,1489,1068,133,89,2229,1424,297,178,4304,2403,663,356,2,1]},"dudon_madhuvanti":{"title":"Madhuvanti (also called Ambika), late evening raga","filename":"dudon_madhuvanti.scl","rnbo":[12,1,1,9,8,19,16,6,5,45,32,91,64,3,2,429,256,27,16,15,8,483,256,2,1]},"dudon_mahur":{"title":"Persian Dastgah Mahur","filename":"dudon_mahur.scl","rnbo":[12,143,128,9,8,5,4,1287,1024,4,3,171,128,3,2,5,3,429,256,57,32,15,8,2,1]},"dudon_mandinka":{"title":"Guinean Balafon circular tuning, neutral diatonic -c interpretation","filename":"dudon_mandinka.scl","rnbo":[12,1,1,581,524,581,524,161,131,176,131,176,131,195,131,195,131,865,524,865,524,240,131,2,1]},"dudon_marovany":{"title":"Typical Malagasy scale, neutral diatonic, multiways -c and eq-b","filename":"dudon_marovany.scl","rnbo":[12,783,704,3141,2816,2,1,871,704,59,44,871,352,525,352,1053,704,73,44,10393,5632,5197,2816,2,1]},"dudon_marva":{"title":"Raga Marva, differential-coherent version, modelized by Jacques Dudon","filename":"dudon_marva.scl","rnbo":[12,20,19,17,16,5,4,24,19,1,1,45,32,27,19,5,3,32,19,15,8,36,19,2,1]},"dudon_meancaline":{"title":"12 of 19-tones quasi-equal HT with coherent semifourths on black keys","filename":"dudon_meancaline.scl","rnbo":[12,1420,1371,7648,6855,8224,6855,2844,2285,9178,6855,3168,2285,2048,1371,10606,6855,3808,2285,4096,2285,12736,6855,2,1]},"dudon_melkis":{"title":"Sequence of 11 Melkis fourths (499.11472 c.) from D","filename":"dudon_melkis.scl","rnbo":[12,30739,29088,3064,2727,3238,2727,36499,29088,539,404,15379,10908,4088,2727,160,101,584345,349056,1618,909,10259,5454,2,1]},"dudon_melkis_3f":{"title":"Sequence of 6 Melkis fourths from G, then 3 pure fourths between C# and E","filename":"dudon_melkis_3f.scl","rnbo":[12,540,511,573,511,2427,2044,640,511,2727,2044,720,511,766,511,1619,1022,856,511,2079,1168,960,511,2,1]},"dudon_meso-iph12":{"title":"Partial Meso-Iph fifth transposition of two Iph fractal series (2010)","filename":"dudon_meso-iph12.scl","rnbo":[12,3008,2783,3072,2783,3184,2783,3440,2783,3712,2783,3936,2783,4168,2783,4608,2783,4864,2783,4960,2783,224,121,2,1]},"dudon_meso-iph7":{"title":"Neutral diatonic variation based on two Iph fractal series","filename":"dudon_meso-iph7.scl","rnbo":[7,3072,2783,3440,2783,3712,2783,4168,2783,4608,2783,224,121,2,1]},"dudon_michemine":{"title":"Triple equal-beating of all minor triads  meantone sequence","filename":"dudon_michemine.scl","rnbo":[12,333711,321536,1403,1256,188,157,12547,10048,210,157,112283,80384,469,314,1006387,643072,4191,2512,281,157,37399,20096,2,1]},"dudon_moha_baya":{"title":"Mohajira + Bayati (Dudon) 3 + 4 + 3 Mohajira and 3 + 3 + 4 Bayati tetrachords","filename":"dudon_moha_baya.scl","rnbo":[7,150.0,0,350.0,0,500.0,0,700.0,0,850.0,0,1000.0,0,2,1]},"dudon_mohajira":{"title":"Dudon's Mohajira, neutral diatonic. g^5-g^4=1/2","filename":"dudon_mohajira.scl","rnbo":[7,153.26216,0,348.91261,0,502.17478,0,697.82522,0,851.08739,0,1046.73784,0,2,1]},"dudon_mohajira117":{"title":"Jacques Dudon Mohajira, 1/1 vol.2 no.1, p. 11, with 3/2 (117:78)","filename":"dudon_mohajira117.scl","rnbo":[7,44,39,16,13,4,3,3,2,64,39,24,13,2,1]},"dudon_mohajira_r":{"title":"Jacques Dudon, JI Mohajira, Lumières audibles","filename":"dudon_mohajira_r.scl","rnbo":[7,13,12,59,48,4,3,3,2,13,8,11,6,2,1]},"dudon_mougi":{"title":"Tsigan-style raga, based on the  19/16 minor third -c properties","filename":"dudon_mougi.scl","rnbo":[12,9,8,361,320,19,16,115,96,361,256,57,40,3,2,57,32,115,64,361,192,19,10,2,1]},"dudon_mounos":{"title":"Mounos extended fifths -c sequence, quasi-septimal minor diatonic scale","filename":"dudon_mounos.scl","rnbo":[12,9,8,1647,1448,211,181,4,3,240,181,3,2,273,181,27,16,9937,5792,1273,724,16,9,2,1]},"dudon_nan-kouan":{"title":"Nan-Kouan (medieval chinese ballade) scale interpretation","filename":"dudon_nan-kouan.scl","rnbo":[12,19,17,172,153,5,4,321,256,64,51,11,8,3,2,107,64,256,153,57,34,11,6,2,1]},"dudon_napolitan":{"title":"Napolitan scale, class-1 differential coherence ; whole tone scale by omitting C","filename":"dudon_napolitan.scl","rnbo":[12,17,16,205,192,455,384,19,16,4,3,171,128,3,2,3,2,5,3,15,8,241,128,2,1]},"dudon_natte":{"title":"Sequence of 7 consecutive tones of a Natte series from 28 to 151","filename":"dudon_natte.scl","rnbo":[12,86,57,65,57,98,57,74,57,151,114,2,1,86,57,65,57,98,57,74,57,112,57,2,1]},"dudon_nung-phan1":{"title":"7 tones from a sequence of Nung-Phan very low fifths (in theory 679.5604542 c.)","filename":"dudon_nung-phan1.scl","rnbo":[12,2,1,57,52,57,26,125,104,275,208,275,104,77,52,77,26,13,8,13,4,185,104,2,1]},"dudon_nung-phan2":{"title":"7 tones from a Nung-Phan sequence (very low fifths, in theory 679.5604542 c.)","filename":"dudon_nung-phan2.scl","rnbo":[12,3,2,169,150,5,3,37,30,27,20,2,1,3,2,169,75,5,3,37,15,11,6,2,1]},"dudon_okna_hwt":{"title":"Harmonic well-temperament for mongolian lute","filename":"dudon_okna_hwt.scl","rnbo":[12,135,128,1149,1024,19,16,321,256,171,128,45,32,3,2,405,256,429,256,7293,4096,15,8,2,1]},"dudon_over-under_ht":{"title":"Cycle of fifths, one half above 3/2, the other below (meantone)","filename":"dudon_over-under_ht.scl","rnbo":[12,33,32,215,192,75,64,239,192,4,3,131,96,287,192,149,96,5,3,85,48,179,96,2,1]},"dudon_pelog_35":{"title":"JI -c Pelog with 5, 13, 35 and complements","filename":"dudon_pelog_35.scl","rnbo":[12,256,349,384,349,280,349,512,349,1,1,350,349,416,349,385,349,512,349,416,349,560,349,2,1]},"dudon_pelog_59":{"title":"JI -c Pelog with 5, 11, 59 and complements","filename":"dudon_pelog_59.scl","rnbo":[12,321,256,11,8,5,4,645,512,11,8,3,2,385,256,119,64,255,128,59,32,119,64,2,1]},"dudon_pelog_ambi":{"title":"Differential-coherent 5 notes Pelog, ambiguous tonic between C & E","filename":"dudon_pelog_ambi.scl","rnbo":[12,575,384,43,32,59,48,119,96,4,3,43,32,575,384,469,384,1,1,11,6,59,32,2,1]},"dudon_phi13":{"title":"Division of phi giving close approximations to ratios with Fibonacci denominators","filename":"dudon_phi13.scl","rnbo":[13,93.88597,0,149.46359,0,235.77436,0,317.98569,0,366.9097,0,443.254,0,488.80753,0,560.06655,0,628.50809,0,669.4931,0,733.81941,0,795.84097,0,833.0903,0]},"dudon_phidiama":{"title":"Two Phidiama series, used in \"Appel\", x^2=3x-1","filename":"dudon_phidiama.scl","rnbo":[8,9,8,55,48,21,16,4,3,3,2,55,32,7,4,2,1]},"dudon_piphat":{"title":"Gazelle-Naggar -c series + comma 953-960, major mode","filename":"dudon_piphat.scl","rnbo":[12,1,1,953,865,192,173,1048,865,1052,865,1029,692,1288,865,1288,865,1408,865,1408,865,1408,865,2,1]},"dudon_piphat_min":{"title":"Gazelle-Naggar -c series + comma 953-960, minor mode","filename":"dudon_piphat_min.scl","rnbo":[12,1,1,176,161,176,161,176,161,865,644,865,644,953,644,240,161,262,161,263,161,264,161,2,1]},"dudon_purvi":{"title":"Purvi Thaat Raga","filename":"dudon_purvi.scl","rnbo":[12,101,96,19,18,5,4,121,96,45,32,17,12,3,2,101,64,19,12,15,8,91,48,2,1]},"dudon_quechua":{"title":"Gazelle-Naggar -c series + comma 953-960, F.11 mode","filename":"dudon_quechua.scl","rnbo":[12,1,1,1,1,865,704,865,704,953,704,15,11,131,88,263,176,3,2,161,88,161,88,2,1]},"dudon_raph":{"title":"Raph recurrent sequence, series Phi17 & Phi93","filename":"dudon_raph.scl","rnbo":[12,31,30,191,180,131,120,19,15,59,45,27,20,25,18,73,45,5,3,103,60,53,30,2,1]},"dudon_rast-iph39":{"title":"Neutral diatonic composed of Rast and Iph tetrachords, based on F and 3F series","filename":"dudon_rast-iph39.scl","rnbo":[7,233,208,16,13,4,3,233,156,64,39,24,13,2,1]},"dudon_rast-iph63":{"title":"Neutral diatonic composed of Rast and Iph tetrachords, based on F and 3F series","filename":"dudon_rast-iph63.scl","rnbo":[7,377,336,26,21,4,3,377,252,104,63,233,126,2,1]},"dudon_rast-mohajira":{"title":"Rast + Mohajira -c quartertones set","filename":"dudon_rast-mohajira.scl","rnbo":[12,107,96,9,8,11,9,59,48,4,3,11,8,3,2,5,3,27,16,11,6,59,32,2,1]},"dudon_rast_matrix":{"title":"Wusta-Zalzal Arijaom sequence with Rast on white keys and other maqamat","filename":"dudon_rast_matrix.scl","rnbo":[12,171,157,176,157,192,157,387,314,419,314,216,157,236,157,258,157,264,157,1129,628,288,157,2,1]},"dudon_rebab":{"title":"Gazelle, x^5 = 8x^4 - 32,  -c series + comma 953-960, Dudon (2009)","filename":"dudon_rebab.scl","rnbo":[12,1,1,1048,953,1052,953,5145,3812,1288,953,1288,953,1408,953,1419,953,1420,953,1730,953,1730,953,2,1]},"dudon_s-n-buzurg":{"title":"Decaphonic system inspired by medieval Persian mode Buzurg (Safi al-Din)","filename":"dudon_s-n-buzurg.scl","rnbo":[12,14,13,13,12,8,7,26,21,55,42,39,28,3,2,21,13,13,8,12,7,13,7,2,1]},"dudon_saba-c":{"title":"Differentially coherent version of Maqam Saba","filename":"dudon_saba-c.scl","rnbo":[12,259,240,87,80,19,16,6,5,19,15,179,120,3,2,8,5,129,80,71,40,9,5,2,1]},"dudon_sapaan":{"title":"7 tones from a sequence of Sapaan very low fifths (in theory 680.015678 c.)","filename":"dudon_sapaan.scl","rnbo":[12,1,1,337,300,337,300,277,225,304,225,304,225,1333,900,1333,900,374,225,374,225,82,45,2,1]},"dudon_saqqara":{"title":"Scale of a ney flute (n¡ 69815) from ancient Egypt found in Saqqara","filename":"dudon_saqqara.scl","rnbo":[12,212,211,475,422,259,211,260,211,571,422,318,211,320,211,342,211,344,211,382,211,384,211,2,1]},"dudon_satara":{"title":"Rajasthani double flute drone-c tuning amusement","filename":"dudon_satara.scl","rnbo":[12,3,4,9,8,3,4,5,4,43,32,3,4,3,2,3,4,27,16,3,4,15,8,2,1]},"dudon_saung_gauk":{"title":"Typical diatonic heptaphone played on the saung gauk (burmese harp)","filename":"dudon_saung_gauk.scl","rnbo":[12,1,1,3463,3114,3463,3114,623881,504468,232,173,232,173,258,173,258,173,23240,14013,23240,14013,232600,126117,2,1]},"dudon_segah":{"title":"Dastgah Segah, JI interpretation","filename":"dudon_segah.scl","rnbo":[12,285,256,9,8,38,31,157,128,4,3,343,256,3,2,13,8,157,96,56,31,29,16,2,1]},"dudon_segah_subh":{"title":"Inversed Dudon Neutral Diatonic (mediants of major and minor)","filename":"dudon_segah_subh.scl","rnbo":[12,1,1,66,59,11,9,11,9,4,3,4,3,3,2,3,2,44,27,11,6,11,6,2,1]},"dudon_septimal_2":{"title":"Slendro formed by five 8/7 separated by two commas, Dudon (2009)","filename":"dudon_septimal_2.scl","rnbo":[12,264,233,266,233,304,233,304,233,308,233,352,233,352,233,400,233,402,233,460,233,464,233,2,1]},"dudon_septimal_3":{"title":"Five 8/7 or close approximations separated by three commas, Dudon (2009)","filename":"dudon_septimal_3.scl","rnbo":[12,413,361,416,361,472,361,472,361,476,361,544,361,549,361,624,361,33,19,712,361,716,361,2,1]},"dudon_shaku":{"title":"Japanese Shakuhachi scale, -c interpretation","filename":"dudon_shaku.scl","rnbo":[12,1,1,2431,2304,19,18,17,16,85,64,4,3,2303,1536,3,2,127,72,113,64,16,9,2,1]},"dudon_shri_rag":{"title":"Sunset indian raga (Purvi Thaat), as modeled from a 19-limit Amlak sequence","filename":"dudon_shri_rag.scl","rnbo":[12,20,19,161,152,191,152,24,19,107,76,27,19,3,2,30,19,19,12,575,304,36,19,2,1]},"dudon_shur":{"title":"Shur Dastgah -c version, modelisation by Dudon (1990)","filename":"dudon_shur.scl","rnbo":[12,13,12,59,54,32,27,65,54,4,3,1,1,3,2,13,8,44,27,16,9,97,54,2,1]},"dudon_siam_97":{"title":"Black keys = 5 quasi-edo ; White keys = 7 quasi-edo (Dudon 1997)","filename":"dudon_siam_97.scl","rnbo":[12,49,48,53,48,169,144,39,32,3101,2304,97,72,107,72,223,144,105,64,16,9,29,16,2,1]},"dudon_simdek":{"title":"Heptatonic scale from a sequence of Simdek very low fifths (in theory 676,48557456 c.)","filename":"dudon_simdek.scl","rnbo":[12,769,621,704,621,280,207,769,621,280,207,1040,621,34,23,1136,621,1040,621,2,1,1136,621,2,1]},"dudon_sireine_f":{"title":"Sequence of 11 Sireine fifths (exactly 691.2348426 c.) from F","filename":"dudon_sireine_f.scl","rnbo":[12,10503,10304,1431,1288,23157,20608,3179,2576,216,161,63,46,240,161,7807,5152,2133,1288,34191,20608,4737,2576,2,1]},"dudon_skisni":{"title":"Triple equal-beating sequence of 11 quasi-1/5 Pythagorean comma meantone fifths","filename":"dudon_skisni.scl","rnbo":[12,3480,3321,3716,3321,3968,3321,4158,3321,4440,3321,9305,6642,4968,3321,5206,3321,5559,3321,5936,3321,6220,3321,2,1]},"dudon_skisni_hwt":{"title":"Triple equal-beating sequence from C to B, optimal major chords on white keys","filename":"dudon_skisni_hwt.scl","rnbo":[12,256,243,573,512,32,27,641,512,4,3,1024,729,383,256,128,81,857,512,16,9,959,512,2,1]},"dudon_slendra":{"title":"Cylf-scale (Baka pentatonic Slendro plus pure fifths)","filename":"dudon_slendra.scl","rnbo":[12,112,111,212,185,644,555,244,185,736,555,4,3,56,37,846,555,322,185,976,555,368,185,2,1]},"dudon_slendro_m-mean":{"title":"Wilson meantone from Bb to F# extended in a Slendro M on black keys","filename":"dudon_slendro_m-mean.scl","rnbo":[12,2689,2576,359,322,55,46,803,644,215,161,32,23,481,322,36,23,537,322,288,161,1199,644,2,1]},"dudon_slendro_matrix":{"title":"Ten tones for many 7-limit slendros from Lou Harrison, of the five types N, M, A, S, J","filename":"dudon_slendro_matrix.scl","rnbo":[12,1,1,8,7,8,7,64,49,21,16,4,3,3,2,32,21,12,7,256,147,7,4,2,1]},"dudon_smallest_numbers":{"title":"Chromatic scale achieved with smallest possible numbers","filename":"dudon_smallest_numbers.scl","rnbo":[12,17,16,9,8,19,16,5,4,43,32,45,32,3,2,51,32,27,16,57,32,15,8,2,1]},"dudon_soria":{"title":"12 from a 17-notes cycle, equal-beating extended fifths (705.5685 c.) sequence","filename":"dudon_soria.scl","rnbo":[12,481,445,4011,3560,2067,1780,1133,890,9503,7120,128,89,533,356,723,445,754,445,1233,712,1703,890,2,1]},"dudon_soria12":{"title":"12 from a 17-notes cycle, equal-beating extended fifths (705.5685 c.) sequence","filename":"dudon_soria12.scl","rnbo":[12,959,886,15995,14176,8345,7088,2259,1772,37727,28352,638,443,5319,3544,2883,1772,1503,886,12443,7088,6791,3544,2,1]},"dudon_sumer":{"title":"Neutral diatonic soft Rast scale with Ishku -c variations","filename":"dudon_sumer.scl","rnbo":[12,79,72,10,9,11,9,89,72,4,3,49,36,3,2,119,72,5,3,131,72,11,6,2,1]},"dudon_synch12":{"title":"Synchronous-beating alternative to 12-tET, cycle of fourths beats from C:F = 1 2 1 1 2 4 3 6 8 8 8 32","filename":"dudon_synch12.scl","rnbo":[12,373,352,395,352,419,352,887,704,235,176,249,176,527,352,559,352,37,22,157,88,1329,704,2,1]},"dudon_tango":{"title":"Fractal Melkis lowest numbers HWT fifths sequence, from D","filename":"dudon_tango.scl","rnbo":[12,203,192,9,8,19,16,241,192,4,3,361,256,3,2,19,12,643,384,57,32,361,192,2,1]},"dudon_thai":{"title":"Dudon, coherent Thai heptatonic scale, 1/1 vol.11 no.2, 2003","filename":"dudon_thai.scl","rnbo":[7,11266,10225,12414,10225,13696,10225,60417,40900,16656,10225,18368,10225,2,1]},"dudon_thai2":{"title":"Slightly better version, 3.685 cents deviation","filename":"dudon_thai2.scl","rnbo":[7,120,109,131,109,1157,872,1277,872,176,109,12675,6976,2,1]},"dudon_thai3":{"title":"Dudon, Thai scale with two 704/703 = 2.46 c. deviations and simpler numbers","filename":"dudon_thai3.scl","rnbo":[7,107,96,59,48,65,48,193,128,319,192,703,384,2,1]},"dudon_tibet":{"title":"Differentially coherent minor pentatonic","filename":"dudon_tibet.scl","rnbo":[12,1,1,38,31,157,128,4,3,166,124,167,124,3,2,3,2,3,2,56,31,29,16,2,1]},"dudon_tielenka":{"title":"Tielenka (Romanian harmonic flute) scale JI imitation, Dudon (2009)","filename":"dudon_tielenka.scl","rnbo":[12,1,1,162,143,1341,1144,5,4,2,1,18,13,3,2,18,11,7,4,252,143,270,143,2,1]},"dudon_timbila":{"title":"Bala tuning whole tone intervals -c heptaphone","filename":"dudon_timbila.scl","rnbo":[12,1,1,107,97,107,97,118,97,130,97,1041,776,287,194,144,97,639,388,639,388,176,97,2,1]},"dudon_tit_fleur":{"title":"Differentially coherent semi-neutral diatonic, small numbers","filename":"dudon_tit_fleur.scl","rnbo":[12,43,39,29,26,16,13,129,104,4,3,58,39,3,2,64,39,43,26,11,6,24,13,2,1]},"dudon_todi":{"title":"Morning Thaat raga (with G = Todi ; without G = Gujari Todi)","filename":"dudon_todi.scl","rnbo":[12,20,19,161,152,45,38,19,16,215,152,27,19,3,2,30,19,1935,1216,2297,1216,36,19,2,1]},"dudon_tsaharuk24":{"title":"Rational version of Tsaharuk linear temperament","filename":"dudon_tsaharuk24.scl","rnbo":[24,28,27,59,56,35,32,9,8,7,6,32,27,59,48,5,4,35,27,4,3,112,81,59,42,35,24,3,2,14,9,128,81,59,36,27,16,7,4,16,9,59,32,15,8,35,18,2,1]},"dudon_valiha":{"title":"Typical Malagasy scale, neutral diatonic, equal-beating on minor triads","filename":"dudon_valiha.scl","rnbo":[12,1,1,1431,1288,1431,1288,3179,2576,216,161,216,161,240,161,240,161,2133,1288,34191,20608,4737,2576,2,1]},"dudon_werckmeister3_eb":{"title":"Harmonic equal-beating version of the famous well-temperament (2006)","filename":"dudon_werckmeister3_eb.scl","rnbo":[12,256,243,21995,19683,32,27,2740,2187,4,3,1024,729,9808,6561,128,81,10960,6561,16,9,1370,729,2,1]},"dudon_x-slen_31":{"title":"X-slen fractal temperament, sequence of 420 to 1600","filename":"dudon_x-slen_31.scl","rnbo":[31,41,40,1171,1120,15,14,153,140,251,224,8,7,41,35,1339,1120,49,40,5,4,41,32,209,160,75,56,153,112,7,5,10,7,41,28,3,2,857,560,439,280,8,5,459,280,937,560,12,7,7,4,251,140,64,35,15,8,153,80,549,280,2,1]},"dudon_zinith":{"title":"Dudon's \"Zinith\" generator, (sqrt(3)+1)/2, TL 30-03-2009","filename":"dudon_zinith.scl","rnbo":[20,59.83059,0,120.03765,0,179.86823,0,239.69882,0,299.90588,0,359.73647,0,419.94353,0,479.77411,0,539.98118,0,599.81176,0,660.01882,0,719.84941,0,780.05647,0,839.88706,0,899.71764,0,959.9247,0,1019.75529,0,1079.96235,0,1139.79294,0,2,1]},"dudon_ziraat":{"title":"Dudon's \"Zira'at\" generator, sqrt(3)+2, TL 30-03-2009","filename":"dudon_ziraat.scl","rnbo":[10,119.66117,0,239.69882,0,359.73647,0,479.77411,0,599.81176,0,719.84941,0,839.88706,0,959.9247,0,1079.96235,0,2,1]},"dudon_zurna":{"title":"Quartertone scale with tonic transposition on a turkish segah of 159/128","filename":"dudon_zurna.scl","rnbo":[12,3,2,172,159,128,159,64,53,66,53,70,53,238,159,256,159,86,53,278,159,280,159,2,1]},"duncan":{"title":"Dudley Duncan's Superparticular Scale","filename":"duncan.scl","rnbo":[12,17,16,9,8,6,5,5,4,4,3,7,5,3,2,8,5,5,3,7,4,15,8,2,1]},"duoden12":{"title":"Almost equal 12-tone subset of Duodenarium","filename":"duoden12.scl","rnbo":[12,135,128,9,8,1215,1024,512,405,4,3,64,45,3,2,405,256,2048,1215,3645,2048,256,135,2,1]},"duodenarium":{"title":"Ellis's Duodenarium : genus [3^12 5^8]","filename":"duodenarium.scl","rnbo":[117,2048,2025,81,80,128,125,250,243,16875,16384,648,625,25,24,273375,262144,256,243,135,128,16,15,2187,2048,32768,30375,27,25,625,576,2048,1875,2187,2000,1125,1024,10,9,18225,16384,9,8,256,225,729,640,144,125,125,108,151875,131072,729,625,75,64,32,27,1215,1024,6,5,4096,3375,243,200,625,512,768,625,100,81,10125,8192,5,4,512,405,81,64,32,25,625,486,65536,50625,162,125,125,96,1366875,1048576,320,243,675,512,4,3,10935,8192,8192,6075,27,20,512,375,2187,1600,5625,4096,864,625,25,18,91125,65536,45,32,64,45,729,512,36,25,625,432,8192,5625,729,500,375,256,40,27,6075,4096,3,2,1024,675,243,160,192,125,125,81,50625,32768,972,625,25,16,128,81,405,256,8,5,16384,10125,81,50,625,384,1024,625,400,243,3375,2048,5,3,54675,32768,2048,1215,27,16,128,75,2187,1280,262144,151875,216,125,125,72,455625,262144,2187,1250,225,128,16,9,3645,2048,9,5,2048,1125,729,400,1875,1024,1152,625,50,27,30375,16384,15,8,256,135,243,128,48,25,625,324,32768,16875,243,125,125,64,160,81,2025,1024,2,1]},"duodene":{"title":"Ellis's Duodene : genus [33355]","filename":"duodene.scl","rnbo":[12,16,15,9,8,6,5,5,4,4,3,45,32,3,2,8,5,5,3,9,5,15,8,2,1]},"duodene14-18-21":{"title":"14-18-21 Duodene","filename":"duodene14-18-21.scl","rnbo":[12,28,27,9,8,7,6,9,7,4,3,81,56,3,2,14,9,12,7,7,4,27,14,2,1]},"duodene3-11_9":{"title":"3-11/9 Duodene","filename":"duodene3-11_9.scl","rnbo":[12,12,11,9,8,11,9,27,22,4,3,11,8,3,2,44,27,18,11,11,6,81,44,2,1]},"duodene6-7-9":{"title":"6-7-9 Duodene","filename":"duodene6-7-9.scl","rnbo":[12,9,8,8,7,7,6,9,7,21,16,4,3,3,2,14,9,12,7,7,4,27,14,2,1]},"duodene_double":{"title":"Ellis's Duodene union 11/9 times the duodene in 240-tET","filename":"duodene_double.scl","rnbo":[24,35.0,0,115.0,0,165.0,0,200.0,0,235.0,0,315.0,0,350.0,0,385.0,0,465.0,0,500.0,0,550.0,0,585.0,0,665.0,0,700.0,0,735.0,0,815.0,0,850.0,0,885.0,0,935.0,0,1015.0,0,1050.0,0,1085.0,0,1165.0,0,2,1]},"duodene_min":{"title":"Minor Duodene","filename":"duodene_min.scl","rnbo":[12,10,9,9,8,6,5,5,4,4,3,27,20,3,2,8,5,5,3,9,5,15,8,2,1]},"duodene_r-45":{"title":"Ellis's Duodene rotated -45 degrees","filename":"duodene_r-45.scl","rnbo":[12,16,15,9,8,6,5,32,25,27,20,36,25,192,125,25,16,5,3,16,9,15,8,2,1]},"duodene_r45":{"title":"Ellis's Duodene rotated 45 degrees","filename":"duodene_r45.scl","rnbo":[12,135,128,16,15,9,8,6,5,32,25,375,256,25,16,5,3,225,128,16,9,15,8,2,1]},"duodene_skew":{"title":"Rotated 6/5x3/2 duodene","filename":"duodene_skew.scl","rnbo":[12,27,25,10,9,6,5,5,4,4,3,36,25,3,2,8,5,5,3,9,5,48,25,2,1]},"duodene_t":{"title":"Duodene with equal tempered fifths","filename":"duodene_t.scl","rnbo":[12,113.68629,0,200.0,0,313.68629,0,5,4,500.0,0,586.31371,0,700.0,0,8,5,886.31371,0,1013.68629,0,1086.31371,0,2,1]},"duodene_w":{"title":"Ellis duodene well-tuned to fifth=(7168/11)^(1/16) third=(11/7)^(1/2), G.W. Smith","filename":"duodene_w.scl","rnbo":[12,107.65973,0,202.1885,0,309.84823,0,391.24602,0,498.90575,0,593.43451,0,701.09425,0,808.75398,0,890.15177,0,1010.94248,0,1092.34027,0,2,1]},"duohex":{"title":"Scale with two hexanies, inverse mode of hahn_7.scl","filename":"duohex.scl","rnbo":[12,15,14,9,8,6,5,5,4,9,7,10,7,3,2,45,28,12,7,9,5,15,8,2,1]},"duohexmarvwoo":{"title":"Marvel woo version of duohex, a scale with two hexanies","filename":"duohexmarvwoo.scl","rnbo":[12,15,14,9,8,6,5,5,4,9,7,10,7,3,2,45,28,12,7,9,5,15,8,2,1]},"dwarf11marv":{"title":"Semimarvelous dwarf: 1/4 kleismic dwarf(<11 17 26|)","filename":"dwarf11marv.scl","rnbo":[11,115.587047,0,315.641287,0,384.385833,0,499.97288,0,515.695527,0,700.02712,0,815.614167,0,884.358713,0,1015.668407,0,1084.412953,0,2,1]},"dwarf12_11":{"title":"Dwarf(<12 19 28 34 42|) two otonal hexads","filename":"dwarf12_11.scl","rnbo":[12,16,15,11,10,6,5,5,4,4,3,7,5,22,15,8,5,5,3,9,5,28,15,2,1]},"dwarf12_11marvwoo":{"title":"Marvel woo version of dwarf(<12 19 28 34 42|)","filename":"dwarf12_11marvwoo.scl","rnbo":[12,116.23027,0,165.64566,0,316.92773,0,383.74261,0,499.97288,0,584.44007,0,665.61854,0,816.90061,0,883.71549,0,1017.59808,0,1084.41295,0,1200.64322,0]},"dwarf12_7":{"title":"Dwarf(<12 19 28 34|) five major triads, four minor triads two otonal pentads","filename":"dwarf12_7.scl","rnbo":[12,16,15,9,8,6,5,5,4,4,3,7,5,3,2,8,5,5,3,9,5,28,15,2,1]},"dwarf12marv":{"title":"Marvelous dwarf: 1/4 kleismic tempered duodene","filename":"dwarf12marv.scl","rnbo":[12,131.309694,0,200.05424,0,315.641287,0,431.228334,0,515.695527,0,631.282574,0,700.02712,0,815.614167,0,900.08136,0,1015.668407,0,1131.255454,0,2,1]},"dwarf13_7d":{"title":"Dwarf(<13 21 30 37|)","filename":"dwarf13_7d.scl","rnbo":[13,15,14,8,7,7,6,5,4,4,3,10,7,3,2,32,21,5,3,12,7,15,8,40,21,2,1]},"dwarf13marv":{"title":"Semimarvelous dwarf: 1/4 kleismic dwarf(<13 20 30|)","filename":"dwarf13marv.scl","rnbo":[13,200.05424,0,268.798786,0,315.641287,0,384.385833,0,431.228334,0,631.282574,0,700.02712,0,768.771666,0,815.614167,0,1015.668407,0,1084.412953,0,1131.255454,0,2,1]},"dwarf14block":{"title":"Weak Fokker block tweaked from dwarf(<14 23 36 40|)","filename":"dwarf14block.scl","rnbo":[14,8,7,7,6,6,5,4,3,7,5,3,2,14,9,8,5,49,30,5,3,12,7,7,4,9,5,2,1]},"dwarf14c7-hecate":{"title":"7-limit dwarf(14c) in hecate tempering, 166-tET tuning","filename":"dwarf14c7-hecate.scl","rnbo":[14,65.06024,0,202.40964,0,231.3253,0,296.38554,0,433.73494,0,498.79518,0,701.20482,0,730.12048,0,881.92771,0,903.61446,0,932.53012,0,1113.25301,0,1134.93976,0,2,1]},"dwarf14marv":{"title":"Semimarvelous dwarf: 1/4 kleismic dwarf(<14 22 33})","filename":"dwarf14marv.scl","rnbo":[14,200.05424,0,315.641287,0,384.385833,0,431.228334,0,584.440073,0,631.282574,0,700.02712,0,768.771666,0,815.614167,0,1015.668407,0,1084.412953,0,1131.255454,0,1153.157499,0,2,1]},"dwarf15marv":{"title":"Marvelous dwarf: 1/4 kleismic dwarf(<15 24 35|) subset rosatimarv","filename":"dwarf15marv.scl","rnbo":[15,115.587047,0,184.331593,0,200.05424,0,315.641287,0,384.385833,0,499.97288,0,584.440073,0,615.559927,0,700.02712,0,815.614167,0,884.358713,0,999.94576,0,1015.668407,0,1084.412953,0,2,1]},"dwarf15marvwoo":{"title":"Marvelous dwarf: dwarf(<15 24 35|) in [10/3 7/2 11] marvel woo tuning","filename":"dwarf15marvwoo.scl","rnbo":[15,116.23027,0,183.04515,0,200.69746,0,316.92773,0,383.74261,0,499.97288,0,584.44007,0,616.20315,0,700.67034,0,816.90061,0,883.71549,0,999.94576,0,1017.59808,0,1084.41295,0,1200.64322,0]},"dwarf16marv":{"title":"Semimarvelous dwarf: 1/4 kleismic dwarf(<16 25 37|)","filename":"dwarf16marv.scl","rnbo":[16,15.722647,0,68.744546,0,115.587047,0,184.331593,0,315.641287,0,384.385833,0,499.97288,0,515.695527,0,568.717426,0,615.559927,0,768.771666,0,815.614167,0,884.358713,0,999.94576,0,1015.668407,0,2,1]},"dwarf17marv":{"title":"Semimarvelous dwarf: 1/4 kleismic dwarf(<17 27 40|)","filename":"dwarf17marv.scl","rnbo":[17,68.744546,0,115.587047,0,184.331593,0,268.798786,0,315.641287,0,384.385833,0,499.97288,0,568.717426,0,615.559927,0,700.02712,0,768.771666,0,815.614167,0,884.358713,0,953.103259,0,999.94576,0,1084.412953,0,2,1]},"dwarf17marveq":{"title":"Semimarvelous dwarf: equal beating dwarf(<17 27 40|)","filename":"dwarf17marveq.scl","rnbo":[17,70.24793017369039,0,115.13195688812421,0,185.3798870618146,0,269.9067008737312,0,314.790727588165,0,385.0386577618554,0,500.1706146499796,0,570.41854482367,0,615.3025715381038,0,699.8293853500204,0,770.0773155237108,0,814.9613422381447,0,885.209272411835,0,955.4572025855254,0,1000.3412292999592,0,1084.8680431118757,0,2,1]},"dwarf17marvwoo":{"title":"Semimarvelous dwarf: dwarf(<17 27 40|) in [10/3 7/2 11] marvel woo tuning","filename":"dwarf17marvwoo.scl","rnbo":[17,66.81488,0,116.23027,0,183.04515,0,267.51234,0,316.92773,0,383.74261,0,499.97288,0,566.78776,0,616.20315,0,700.67034,0,767.48522,0,816.90061,0,883.71549,0,950.53037,0,999.94576,0,1084.41295,0,1200.64322,0]},"dwarf18marv":{"title":"Marvelous dwarf: 1/4 kleismic dwarf(<18 29 42|)","filename":"dwarf18marv.scl","rnbo":[18,15.722647,0,115.587047,0,131.309694,0,200.05424,0,315.641287,0,400.10848,0,431.228334,0,499.97288,0,515.695527,0,631.282574,0,700.02712,0,815.614167,0,831.336814,0,900.08136,0,931.201214,0,1015.668407,0,1131.255454,0,2,1]},"dwarf19_43":{"title":"Dwarf scale for 43-limit patent val of 19-tET","filename":"dwarf19_43.scl","rnbo":[19,33,32,17,16,9,8,37,32,19,16,5,4,21,16,43,32,11,8,23,16,3,2,25,16,13,8,27,16,7,4,29,16,15,8,31,16,2,1]},"dwarf19marv":{"title":"Marvelous dwarf: 1/4 kleismic dwarf(<19 30 44|) = inverse wilson1","filename":"dwarf19marv.scl","rnbo":[19,68.74455,0,115.58705,0,200.05424,0,268.79879,0,6,5,384.38583,0,431.22833,0,499.97288,0,584.44007,0,36,25,700.02712,0,768.77167,0,815.61417,0,5,3,931.20121,0,1015.66841,0,1084.41295,0,1131.25545,0,2,1]},"dwarf20marv":{"title":"Marvelous dwarf: 1/4 kleismic dwarf(<20 32 47|) = genus(3^4 5^3)","filename":"dwarf20marv.scl","rnbo":[20,68.744546,0,184.331593,0,253.076139,0,299.91864,0,368.663186,0,384.385833,0,453.130379,0,499.97288,0,568.717426,0,684.304473,0,753.049019,0,768.771666,0,799.89152,0,884.358713,0,953.103259,0,999.94576,0,1068.690306,0,1153.157499,0,1184.277353,0,2,1]},"dwarf21marv":{"title":"Marvelous dwarf: 1/4 kleismic dwarf(<21 33 49|)","filename":"dwarf21marv.scl","rnbo":[21,68.744546,0,184.331593,0,200.05424,0,268.798786,0,299.91864,0,368.663186,0,384.385833,0,499.97288,0,568.717426,0,584.440073,0,684.304473,0,700.02712,0,768.771666,0,799.89152,0,884.358713,0,968.825906,0,999.94576,0,1068.690306,0,1084.412953,0,1184.277353,0,2,1]},"dwarf22_77":{"title":"7-limit dwarf(22), 77-tET tuning","filename":"dwarf22_77.scl","rnbo":[22,15.58442,0,77.92208,0,124.67532,0,187.01299,0,280.51948,0,311.68831,0,389.61039,0,420.77922,0,467.53247,0,514.28571,0,576.62338,0,623.37662,0,701.2987,0,779.22078,0,810.38961,0,825.97403,0,888.31169,0,966.23377,0,1012.98701,0,1090.90909,0,1122.07792,0,2,1]},"dwarf22marv":{"title":"Semimarvelous dwarf: 1/4 kleismic dwarf22_5 and dwarf22_7","filename":"dwarf22marv.scl","rnbo":[22,68.744546,0,115.587047,0,131.309694,0,200.05424,0,268.798786,0,315.641287,0,384.385833,0,431.228334,0,499.97288,0,515.695527,0,584.440073,0,631.282574,0,700.02712,0,768.771666,0,815.614167,0,884.358713,0,931.201214,0,968.825906,0,1015.668407,0,1084.412953,0,1131.255454,0,2,1]},"dwarf25marv":{"title":"Marvelous dwarf: 1/4 kleismic dwarf(<25 40 58|) = genus(3^4 5^4)","filename":"dwarf25marv.scl","rnbo":[25,68.74455,0,115.58705,0,184.33159,0,253.07614,0,268.79879,0,299.91864,0,315.64129,0,384.38583,0,453.13038,0,499.97288,0,568.71743,0,615.55993,0,653.18462,0,684.30447,0,700.02712,0,768.77167,0,815.61417,0,884.35871,0,953.10326,0,999.94576,0,1068.69031,0,1084.41295,0,1115.53281,0,1153.1575,0,2,1]},"dwarf271_bp":{"title":"Tritave dwarf(<171 271 397 480|)","filename":"dwarf271_bp.scl","rnbo":[271,1600000,1594323,245,243,179200,177147,20000,19683,43904000,43046721,2240,2187,250,243,548800,531441,28,27,20480,19683,6860,6561,5017600,4782969,256,243,62500,59049,62720,59049,7000,6561,5120000,4782969,784,729,573440,531441,64000,59049,15625000,14348907,7168,6561,800,729,1756160,1594323,196000,177147,10,9,21952,19683,2450,2187,1792000,1594323,200000,177147,200704,177147,22400,19683,2500,2187,5488000,4782969,280,243,204800,177147,68600,59049,50176000,43046721,2560,2187,625000,531441,627200,531441,32,27,51200000,43046721,7840,6561,875,729,640000,531441,98,81,71680,59049,8000,6561,1953125,1594323,896,729,100,81,219520,177147,24500,19683,8192,6561,2744,2187,2007040,1594323,224000,177147,25000,19683,25088,19683,2800,2187,2048000,1594323,686000,531441,35,27,25600,19683,8575,6561,6272000,4782969,320,243,78125,59049,78400,59049,4,3,6400000,4782969,980,729,716800,531441,80000,59049,19531250,14348907,8960,6561,1000,729,2195200,1594323,112,81,81920,59049,27440,19683,20070400,14348907,1024,729,343,243,250880,177147,28000,19683,3125,2187,3136,2187,350,243,256000,177147,85750,59049,28672,19683,3200,2187,781250,531441,784000,531441,40,27,87808,59049,9800,6561,7168000,4782969,800000,531441,802816,531441,89600,59049,10000,6561,21952000,14348907,1120,729,125,81,274400,177147,14,9,10240,6561,3430,2187,2508800,1594323,128,81,31250,19683,31360,19683,3500,2187,2560000,1594323,392,243,286720,177147,32000,19683,7812500,4782969,3584,2187,400,243,878080,531441,98000,59049,5,3,10976,6561,1225,729,896000,531441,100000,59049,100352,59049,11200,6561,1250,729,2744000,1594323,140,81,102400,59049,34300,19683,25088000,14348907,1280,729,312500,177147,313600,177147,16,9,25600000,14348907,3920,2187,2867200,1594323,320000,177147,49,27,35840,19683,4000,2187,8780800,4782969,448,243,50,27,109760,59049,12250,6561,4096,2187,1372,729,1003520,531441,112000,59049,12500,6561,12544,6561,1400,729,1024000,531441,343000,177147,114688,59049,12800,6561,3125000,1594323,3136000,1594323,160,81,351232,177147,39200,19683,2,1,3200000,1594323,490,243,358400,177147,40000,19683,9765625,4782969,4480,2187,500,243,1097600,531441,56,27,40960,19683,13720,6561,10035200,4782969,512,243,125000,59049,125440,59049,14000,6561,10240000,4782969,1568,729,175,81,128000,59049,42875,19683,14336,6561,1600,729,390625,177147,392000,177147,20,9,43904,19683,4900,2187,3584000,1594323,400000,177147,401408,177147,44800,19683,5000,2187,10976000,4782969,560,243,409600,177147,137200,59049,7,3,5120,2187,1715,729,1254400,531441,64,27,15625,6561,15680,6561,1750,729,1280000,531441,196,81,143360,59049,16000,6561,3906250,1594323,1792,729,200,81,439040,177147,49000,19683,16384,6561,5488,2187,4014080,1594323,448000,177147,50000,19683,50176,19683,5600,2187,625,243,1372000,531441,70,27,51200,19683,17150,6561,12544000,4782969,640,243,156250,59049,156800,59049,8,3,12800000,4782969,1960,729,1433600,531441,160000,59049,39062500,14348907,17920,6561,2000,729,4390400,1594323,224,81,25,9,54880,19683,6125,2187,2048,729,686,243,501760,177147,56000,19683,6250,2187,6272,2187,700,243,512000,177147,171500,59049,57344,19683,6400,2187,1562500,531441,1568000,531441,80,27,175616,59049,19600,6561,3,1]},"dwarf27_7tempered":{"title":"Irregularly tempered dwarf(<27 43 63 76|)","filename":"dwarf27_7tempered.scl","rnbo":[27,8.50411,0,44.05819,0,94.02735,0,155.44995,0,204.62445,0,239.75461,0,275.21962,0,300.57603,0,386.4402,0,410.42948,0,471.11121,0,506.30767,0,541.94592,0,591.15701,0,616.87618,0,702.25982,0,737.66181,0,772.99566,0,797.33536,0,857.59196,0,907.39146,0,969.00623,0,977.50974,0,1003.78401,0,1088.74607,0,1113.63615,0,2,1]},"dwarf31_11":{"title":"Dwarf(<31 49 72 87 107|)","filename":"dwarf31_11.scl","rnbo":[31,36,35,22,21,16,15,11,10,9,8,8,7,7,6,6,5,128,105,44,35,9,7,55,42,4,3,48,35,7,5,10,7,22,15,3,2,32,21,11,7,8,5,49,30,176,105,12,7,7,4,9,5,64,35,28,15,40,21,55,28,2,1]},"dwart14block":{"title":"Weak Fokker block tweaked from Dwarf(<14 23 36 40|)","filename":"dwart14block.scl","rnbo":[14,8,7,7,6,6,5,4,3,7,5,3,2,14,9,8,5,49,30,5,3,12,7,7,4,9,5,2,1]},"dyadic53tone9div":{"title":"Philolaos tone-9-division 8:9=72:73:74:75:76:77:78:79:80:81","filename":"dyadic53tone9div.scl","rnbo":[53,1039,1024,1053,1024,2133,2048,135,128,547,512,1109,1024,4495,4096,569,512,9,8,73,64,37,32,75,64,19,16,77,64,39,32,79,64,5,4,81,64,657,512,333,256,675,512,683,512,693,512,351,256,711,512,45,32,729,512,2957,2048,2997,2048,759,512,3,2,779,512,1579,1024,25,16,405,256,821,512,13,8,3371,2048,1707,1024,27,16,219,128,111,64,225,128,1823,1024,231,128,117,64,237,128,15,8,243,128,495,256,999,512,253,128,2,1]},"edson17":{"title":"Edson[17] 2.3.7/5.11/5.13/5 subgroup MOS in 17\\29 tuning","filename":"edson17.scl","rnbo":[17,82.75862,0,165.51724,0,206.89655,0,289.65517,0,372.41379,0,455.17241,0,496.55172,0,579.31034,0,662.06897,0,703.44828,0,786.2069,0,868.96552,0,951.72414,0,993.10345,0,1075.86207,0,1158.62069,0,2,1]},"efg333":{"title":"Genus primum [333]","filename":"efg333.scl","rnbo":[4,9,8,4,3,3,2,2,1]},"efg333333333337":{"title":"Genus [333333333337]","filename":"efg333333333337.scl","rnbo":[24,137781,131072,2187,2048,567,512,9,8,1240029,1048576,19683,16384,5103,4096,81,64,21,16,177147,131072,45927,32768,729,512,189,128,3,2,413343,262144,6561,4096,1701,1024,27,16,7,4,59049,32768,15309,8192,243,128,63,32,2,1]},"efg333333355":{"title":"Genus [333333355]","filename":"efg333333355.scl","rnbo":[24,81,80,135,128,16,15,10,9,9,8,1215,1024,6,5,5,4,81,64,4,3,27,20,45,32,64,45,3,2,243,160,405,256,8,5,5,3,27,16,16,9,9,5,15,8,243,128,2,1]},"efg33335":{"title":"Genus [33335], Dwarf(<10 16 23|), also blackchrome1","filename":"efg33335.scl","rnbo":[10,135,128,9,8,5,4,4,3,45,32,3,2,5,3,27,16,15,8,2,1]},"efg3333555":{"title":"Genus [3333555]","filename":"efg3333555.scl","rnbo":[20,25,24,16,15,10,9,9,8,75,64,6,5,5,4,4,3,25,18,45,32,64,45,3,2,25,16,8,5,5,3,225,128,16,9,9,5,15,8,2,1]},"efg33335555":{"title":"Genus bis-ultra-chromaticum [33335555], also dwarf25_5, limmic-magic weak Fokker block","filename":"efg33335555.scl","rnbo":[25,25,24,16,15,10,9,9,8,256,225,75,64,6,5,5,4,32,25,4,3,25,18,45,32,64,45,36,25,3,2,25,16,8,5,5,3,128,75,225,128,16,9,9,5,15,8,48,25,2,1]},"efg333355577":{"title":"Genus [333355577]","filename":"efg333355577.scl","rnbo":[60,49,48,525,512,25,24,21,20,1225,1152,16,15,2205,2048,49,45,35,32,10,9,9,8,147,128,7,6,75,64,1225,1024,6,5,175,144,49,40,315,256,56,45,5,4,245,192,21,16,4,3,11025,8192,49,36,175,128,441,320,25,18,7,5,45,32,64,45,735,512,35,24,3,2,49,32,1575,1024,14,9,25,16,63,40,1225,768,8,5,49,30,105,64,5,3,245,144,441,256,7,4,225,128,16,9,3675,2048,9,5,175,96,147,80,28,15,15,8,245,128,35,18,63,32,2,1]},"efg333357":{"title":"Genus [333357]","filename":"efg333357.scl","rnbo":[20,35,32,10,9,9,8,7,6,315,256,5,4,21,16,4,3,45,32,35,24,3,2,14,9,105,64,5,3,7,4,16,9,15,8,35,18,63,32,2,1]},"efg33337":{"title":"Genus [33337]","filename":"efg33337.scl","rnbo":[10,9,8,7,6,21,16,4,3,189,128,3,2,27,16,7,4,63,32,2,1]},"efg3335":{"title":"Genus diatonicum veterum correctum [3335]","filename":"efg3335.scl","rnbo":[8,10,9,5,4,4,3,3,2,5,3,16,9,15,8,2,1]},"efg33355":{"title":"Genus diatonico-chromaticum hodiernum correctum [33355]","filename":"efg33355.scl","rnbo":[12,25,24,10,9,32,27,5,4,4,3,25,18,40,27,25,16,5,3,16,9,50,27,2,1]},"efg333555":{"title":"Genus diatonico-hyperchromaticum [333555]","filename":"efg333555.scl","rnbo":[16,25,24,16,15,10,9,75,64,6,5,5,4,4,3,25,18,64,45,3,2,25,16,8,5,5,3,16,9,15,8,2,1]},"efg33355555":{"title":"Genus [33355555]","filename":"efg33355555.scl","rnbo":[24,25,24,16,15,1125,1024,9,8,75,64,6,5,625,512,5,4,125,96,4,3,5625,4096,45,32,375,256,3,2,25,16,8,5,625,384,5,3,225,128,9,5,1875,1024,15,8,125,64,2,1]},"efg333555777":{"title":"Genus [333555777]","filename":"efg333555777.scl","rnbo":[64,225,224,49,48,525,512,36,35,25,24,21,20,16,15,15,14,2205,2048,35,32,9,8,8,7,147,128,7,6,75,64,25,21,1225,1024,6,5,128,105,49,40,315,256,5,4,245,192,9,7,21,16,4,3,75,56,11025,8192,175,128,48,35,441,320,7,5,45,32,10,7,735,512,35,24,3,2,32,21,49,32,1575,1024,25,16,63,40,1225,768,8,5,45,28,49,30,105,64,5,3,12,7,441,256,7,4,225,128,25,14,3675,2048,9,5,175,96,64,35,147,80,28,15,15,8,40,21,245,128,63,32,2,1]},"efg333555plusmarvwoo":{"title":"Genus [333555] plus 10125/8192, marvel woo tuning","filename":"efg333555plusmarvwoo.scl","rnbo":[17,84.46719,0,151.28207,0,200.69746,0,267.51234,0,351.97953,0,383.74261,0,468.2098,0,584.44007,0,651.25495,0,700.67034,0,767.48522,0,851.95241,0,901.36781,0,968.18268,0,1084.41295,0,1151.22783,0,1200.64322,0]},"efg333557":{"title":"Genus diatonico-enharmonicum [333557]","filename":"efg333557.scl","rnbo":[24,64,63,16,15,15,14,10,9,8,7,6,5,128,105,5,4,80,63,4,3,48,35,64,45,10,7,3,2,32,21,8,5,512,315,5,3,12,7,16,9,64,35,15,8,40,21,2,1]},"efg33357":{"title":"Genus diatonico-enharmonicum [33357]","filename":"efg33357.scl","rnbo":[16,21,20,16,15,7,6,6,5,56,45,21,16,4,3,7,5,64,45,3,2,14,9,8,5,7,4,16,9,28,15,2,1]},"efg3335711":{"title":"Genus [3 3 3 5 7 11], expanded hexany 1 3 5 7 9 11","filename":"efg3335711.scl","rnbo":[32,2079,2048,33,32,135,128,35,32,9,8,1155,1024,297,256,77,64,315,256,5,4,10395,8192,165,128,21,16,693,512,11,8,45,32,1485,1024,189,128,3,2,385,256,99,64,105,64,27,16,3465,2048,55,32,7,4,231,128,945,512,15,8,495,256,63,32,2,1]},"efg333577":{"title":"Genus [333577]","filename":"efg333577.scl","rnbo":[24,49,48,2205,2048,35,32,9,8,147,128,7,6,315,256,5,4,245,192,21,16,4,3,45,32,735,512,35,24,3,2,49,32,105,64,5,3,441,256,7,4,15,8,245,128,63,32,2,1]},"efg3337":{"title":"Genus [3337]","filename":"efg3337.scl","rnbo":[8,9,8,7,6,21,16,4,3,3,2,7,4,63,32,2,1]},"efg33377":{"title":"Genus [33377] Bi-enharmonicum simplex","filename":"efg33377.scl","rnbo":[12,9,8,8,7,7,6,9,7,21,16,4,3,3,2,32,21,12,7,7,4,63,32,2,1]},"efg335":{"title":"Genus secundum [335]","filename":"efg335.scl","rnbo":[6,5,4,4,3,3,2,5,3,15,8,2,1]},"efg3355":{"title":"Genus chromaticum veterum correctum [3355]","filename":"efg3355.scl","rnbo":[9,16,15,6,5,5,4,4,3,3,2,8,5,5,3,15,8,2,1]},"efg33555":{"title":"Genus bichromaticum [33555]","filename":"efg33555.scl","rnbo":[12,9,8,75,64,6,5,5,4,45,32,3,2,25,16,8,5,225,128,9,5,15,8,2,1]},"efg335555577":{"title":"Genus [335555577]","filename":"efg335555577.scl","rnbo":[45,49,48,525,512,25,24,21,20,16,15,35,32,28,25,147,128,7,6,75,64,1225,1024,6,5,49,40,5,4,245,192,32,25,98,75,21,16,4,3,175,128,7,5,735,512,35,24,147,100,112,75,3,2,49,32,25,16,1225,768,8,5,49,30,105,64,5,3,42,25,128,75,7,4,3675,2048,175,96,147,80,28,15,15,8,245,128,48,25,49,25,2,1]},"efg335555marvwoo":{"title":"Genus [335555] in marvel temperament, woo tuning","filename":"efg335555marvwoo.scl","rnbo":[15,66.81488,0,116.23027,0,267.51234,0,316.92773,0,383.74261,0,433.158,0,499.97288,0,700.67034,0,767.48522,0,816.90061,0,883.71549,0,933.13088,0,1084.41295,0,1133.82835,0,1200.64322,0]},"efg33555marvwoo":{"title":"Genus [33555] in marvel temperament, woo tuning","filename":"efg33555marvwoo.scl","rnbo":[12,66.81488,0,116.23027,0,267.51234,0,316.92773,0,383.74261,0,499.97288,0,700.67034,0,767.48522,0,816.90061,0,883.71549,0,1084.41295,0,1200.64322,0]},"efg33557":{"title":"Genus chromatico-enharmonicum [33557]","filename":"efg33557.scl","rnbo":[18,21,20,16,15,35,32,7,6,6,5,5,4,21,16,4,3,7,5,35,24,3,2,8,5,105,64,5,3,7,4,28,15,15,8,2,1]},"efg335577":{"title":"Genus chromaticum septimis triplex [335577]","filename":"efg335577.scl","rnbo":[27,21,20,16,15,15,14,35,32,8,7,7,6,6,5,128,105,5,4,21,16,4,3,48,35,7,5,10,7,35,24,3,2,32,21,8,5,105,64,5,3,12,7,7,4,64,35,28,15,15,8,40,21,2,1]},"efg3357":{"title":"Genus enharmonicum vocale [3357]","filename":"efg3357.scl","rnbo":[12,35,32,7,6,5,4,21,16,4,3,35,24,3,2,105,64,5,3,7,4,15,8,2,1]},"efg335711":{"title":"Genus [335711]","filename":"efg335711.scl","rnbo":[24,33,32,35,32,9,8,1155,1024,77,64,315,256,5,4,165,128,21,16,693,512,11,8,45,32,3,2,385,256,99,64,105,64,3465,2048,55,32,7,4,231,128,15,8,495,256,63,32,2,1]},"efg33577":{"title":"Genus [33577]","filename":"efg33577.scl","rnbo":[18,15,14,35,32,8,7,7,6,5,4,21,16,4,3,10,7,35,24,3,2,32,21,105,64,5,3,12,7,7,4,15,8,40,21,2,1]},"efg337":{"title":"Genus quintum [337]","filename":"efg337.scl","rnbo":[6,9,8,21,16,3,2,7,4,63,32,2,1]},"efg3377":{"title":"Genus [3377]","filename":"efg3377.scl","rnbo":[9,8,7,7,6,21,16,4,3,3,2,32,21,12,7,7,4,2,1]},"efg33777":{"title":"Genus [33777]","filename":"efg33777.scl","rnbo":[12,49,48,8,7,147,128,7,6,21,16,4,3,3,2,32,21,49,32,12,7,7,4,2,1]},"efg33777a":{"title":"Genus [33777] with 1029/1024 discarded which vanishes in 31-tET","filename":"efg33777a.scl","rnbo":[10,49,48,8,7,7,6,21,16,4,3,3,2,32,21,12,7,7,4,2,1]},"efg355":{"title":"Genus tertium [355]","filename":"efg355.scl","rnbo":[6,6,5,5,4,3,2,8,5,15,8,2,1]},"efg3555":{"title":"Genus enharmonicum veterum correctum [3555]","filename":"efg3555.scl","rnbo":[8,75,64,5,4,375,256,3,2,25,16,15,8,125,64,2,1]},"efg35555":{"title":"Genus [35555]","filename":"efg35555.scl","rnbo":[10,75,64,6,5,5,4,32,25,3,2,25,16,8,5,15,8,48,25,2,1]},"efg35557":{"title":"Genus 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13]","filename":"efg3571113.scl","rnbo":[32,65,64,33,32,2145,2048,273,256,35,32,143,128,1155,1024,77,64,39,32,5005,4096,5,4,165,128,21,16,1365,1024,11,8,715,512,91,64,3003,2048,3,2,385,256,195,128,13,8,105,64,429,256,55,32,7,4,455,256,231,128,15015,8192,15,8,1001,512,2,1]},"efg3577":{"title":"Genus [3577]","filename":"efg3577.scl","rnbo":[12,15,14,35,32,8,7,5,4,21,16,10,7,3,2,105,64,12,7,7,4,15,8,2,1]},"efg35777":{"title":"Genus [35777]","filename":"efg35777.scl","rnbo":[16,15,14,35,32,8,7,147,128,5,4,21,16,10,7,735,512,3,2,49,32,105,64,12,7,7,4,15,8,245,128,2,1]},"efg35777a":{"title":"Genus [35777] with comma discarded which disappears in 31-tET","filename":"efg35777a.scl","rnbo":[14,15,14,35,32,8,7,5,4,21,16,10,7,3,2,49,32,105,64,12,7,7,4,15,8,245,128,2,1]},"efg3711":{"title":"Genus [3 7 11]","filename":"efg3711.scl","rnbo":[8,12,11,14,11,21,16,16,11,3,2,7,4,21,11,2,1]},"efg377":{"title":"Genus octavum 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eikohole ball","filename":"eikohole6.scl","rnbo":[54,56,55,126,121,21,20,16,15,12,11,11,10,28,25,9,8,112,99,8,7,63,55,7,6,196,165,6,5,40,33,27,22,56,45,63,50,14,11,9,7,72,55,4,3,147,110,27,20,224,165,15,11,168,121,7,5,63,44,16,11,22,15,3,2,84,55,14,9,63,40,8,5,18,11,33,20,42,25,56,33,12,7,189,110,96,55,7,4,16,9,98,55,9,5,20,11,224,121,28,15,21,11,64,33,108,55,2,1]},"eikosany":{"title":"3)6 1.3.5.7.9.11 Eikosany (1.3.5 tonic)","filename":"eikosany.scl","rnbo":[20,33,32,21,20,11,10,9,8,7,6,99,80,77,60,21,16,11,8,7,5,231,160,3,2,63,40,77,48,33,20,7,4,9,5,11,6,77,40,2,1]},"eikosanyplusop":{"title":"Eikosanyplus 11-limit 5 cents optimized","filename":"eikosanyplusop.scl","rnbo":[21,50.2289,0,151.1434,0,201.3723,0,233.5938,0,316.8132,0,383.4821,0,435.2874,0,467.2527,0,548.9774,0,585.1985,0,649.8394,0,700.6861,0,751.5329,0,816.1738,0,852.3949,0,934.1196,0,966.0849,0,1017.8902,0,1084.5591,0,1167.7785,0,2,1]},"eikoseven":{"title":"Seven-limit version of 385/384-tempered 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circular mirroring of 3:5:7","filename":"ekring5bp.scl","rnbo":[12,27,25,9,7,243,175,7,5,189,125,81,49,49,25,15,7,81,35,7,3,63,25,3,1]},"ekring6":{"title":"Single-tie circular mirroring of 6:7:9","filename":"ekring6.scl","rnbo":[12,54,49,8,7,9,7,4,3,72,49,3,2,14,9,81,49,16,9,648,343,96,49,2,1]},"ekring7":{"title":"Single-tie circular mirroring of 5:7:9","filename":"ekring7.scl","rnbo":[12,50,49,10,9,500,441,100,81,9,7,450,343,14,9,100,63,81,49,9,5,90,49,2,1]},"ekring7bp":{"title":"Single-tie BP circular mirroring of 5:7:9","filename":"ekring7bp.scl","rnbo":[12,25,21,9,7,75,49,81,49,5,3,9,5,675,343,7,3,125,49,135,49,25,9,3,1]},"elevenplus":{"title":"11-tET plus the 22-tET fifth; C-D-Eb-F-Gb-A-Bb-C' form the Orgone[7] scale","filename":"elevenplus.scl","rnbo":[12,109.09091,0,218.18182,0,327.27273,0,436.36364,0,545.45455,0,654.54545,0,709.09091,0,763.63636,0,872.72727,0,981.81818,0,1090.90909,0,2,1]},"elf12f":{"title":"A {352/351, 364/363} 2.3.7.11.13 elf transversal","filename":"elf12f.scl","rnbo":[12,28,27,9,8,13,11,9,7,4,3,11,8,3,2,14,9,22,13,16,9,27,14,2,1]},"elf87":{"title":"Elf[87], a strictly proper MOS of elf, the 224&311 temperament","filename":"elf87.scl","rnbo":[87,15.434084,0,27.009646,0,42.44373,0,54.019293,0,69.453376,0,81.028939,0,96.463023,0,111.897106,0,123.472669,0,138.906752,0,150.482315,0,165.916399,0,177.491961,0,192.926045,0,208.360129,0,219.935691,0,235.369775,0,246.945338,0,262.379421,0,273.954984,0,289.389068,0,304.823151,0,316.398714,0,331.832797,0,343.40836,0,358.842444,0,374.276527,0,385.85209,0,401.286174,0,412.861736,0,428.29582,0,439.871383,0,455.305466,0,470.73955,0,482.315113,0,497.749196,0,509.324759,0,524.758842,0,536.334405,0,551.768489,0,567.202572,0,578.778135,0,594.212219,0,605.787781,0,621.221865,0,632.797428,0,648.231511,0,663.665595,0,675.241158,0,690.675241,0,702.250804,0,717.684887,0,729.26045,0,744.694534,0,760.128617,0,771.70418,0,787.138264,0,798.713826,0,814.14791,0,825.723473,0,841.157556,0,856.59164,0,868.167203,0,883.601286,0,895.176849,0,910.610932,0,926.045016,0,937.620579,0,953.054662,0,964.630225,0,980.064309,0,991.639871,0,1007.073955,0,1022.508039,0,1034.083601,0,1049.517685,0,1061.093248,0,1076.527331,0,1088.102894,0,1103.536977,0,1118.971061,0,1130.546624,0,1145.980707,0,1157.55627,0,1172.990354,0,1184.565916,0,2,1]},"elfjove7":{"title":"Jove tempering of [8/7, 11/9, 4/3, 3/2, 18/11, 7/4, 2], 202-tET tuning","filename":"elfjove7.scl","rnbo":[7,231.68317,0,350.49505,0,499.0099,0,700.9901,0,849.50495,0,968.31683,0,2,1]},"elfkeenanismic11c":{"title":"Keenanismic tempered [12/11, 8/7, 5/4, 21/16, 4/3, 3/2, 32/21, 8/5, 7/4, 11/6, 2], 284-tET tuning","filename":"elfkeenanismic11c.scl","rnbo":[11,152.11268,0,232.39437,0,384.50704,0,469.01408,0,498.59155,0,701.40845,0,730.98592,0,815.49296,0,967.60563,0,1047.88732,0,2,1]},"elfkeenanismic12":{"title":"Keenanismic tempered [12/11, 8/7, 6/5, 5/4, 4/3, 11/8, 3/2, 8/5, 5/3, 7/4, 11/6, 2], 284et tuning","filename":"elfkeenanismic12.scl","rnbo":[12,152.11268,0,232.39437,0,316.90141,0,384.50704,0,498.59155,0,549.29577,0,701.40845,0,815.49296,0,883.09859,0,967.60563,0,1047.88732,0,2,1]},"elfkeenanismic7":{"title":"Keenanismic tempered [8/7, 5/4, 4/3, 3/2, 8/5, 7/4, 2] = cross_7, 284et tuning","filename":"elfkeenanismic7.scl","rnbo":[7,232.39437,0,384.50704,0,498.59155,0,701.40845,0,815.49296,0,967.60563,0,2,1]},"elfleapday10":{"title":"Leapday tempering of [21/20, 9/8, 14/11, 4/3, 7/5, 3/2, 11/7, 16/9, 21/11, 2], 46-tET tuning, 13-limit patent val elf","filename":"elfleapday10.scl","rnbo":[10,78.26087,0,208.69565,0,417.3913,0,495.65217,0,573.91304,0,704.34783,0,782.6087,0,991.30435,0,1121.73913,0,2,1]},"elfleapday12f":{"title":"Leapday tempering of [21/20, 9/8, 13/11, 14/11, 4/3, 7/5, 3/2, 11/7, 22/13, 16/9, 21/11, 2], in 46-tET, 13-limit 12f elf","filename":"elfleapday12f.scl","rnbo":[12,78.26087,0,208.69565,0,286.95652,0,417.3913,0,495.65217,0,573.91304,0,704.34783,0,782.6087,0,913.04348,0,991.30435,0,1121.73913,0,2,1]},"elfleapday7":{"title":"Leapday tempering of [9/8, 13/11, 4/3, 3/2, 22/13, 16/9, 2], 46-tET tuning, 13-limit patent val elf","filename":"elfleapday7.scl","rnbo":[7,208.69565,0,286.95652,0,495.65217,0,704.34783,0,913.04348,0,991.30435,0,2,1]},"elfleapday8d":{"title":"Leapday tempering of [21/20, 9/8, 4/3, 7/5, 3/2, 16/9, 13/7, 2], 46-tET tuning, 13-limit 8d elf","filename":"elfleapday8d.scl","rnbo":[8,78.26087,0,208.69565,0,495.65217,0,573.91304,0,704.34783,0,991.30435,0,1069.56522,0,2,1]},"elfleapday9":{"title":"Leapday tempering of [9/8, 13/11, 14/11, 4/3, 3/2, 11/7, 22/13, 16/9, 2], 46-tET tuning, 13-limit patent val elf","filename":"elfleapday9.scl","rnbo":[9,208.69565,0,286.95652,0,417.3913,0,495.65217,0,704.34783,0,782.6087,0,913.04348,0,991.30435,0,2,1]},"elfmadagascar12f":{"title":"Madagascar tempering of [26/25, 15/13, 6/5, 9/7, 4/3, 7/5, 3/2, 14/9, 5/3, 26/15, 25/13, 2], 313-tET tuning","filename":"elfmadagascar12f.scl","rnbo":[12,65.17572,0,249.20128,0,314.377,0,433.22684,0,498.40256,0,582.7476,0,701.59744,0,766.77316,0,885.623,0,950.79872,0,1134.82428,0,2,1]},"elfmagic10":{"title":"Magic tempering of [15/14, 7/6, 5/4, 9/7, 11/8, 14/9, 8/5, 12/7, 15/8, 2], 104-tET tuning, patent val elf","filename":"elfmagic10.scl","rnbo":[10,115.38462,0,265.38462,0,380.76923,0,438.46154,0,553.84615,0,761.53846,0,819.23077,0,934.61538,0,1084.61538,0,2,1]},"elfmagic12":{"title":"Magic tempering of [25/24, 10/9, 6/5, 5/4, 4/3, 11/8, 3/2, 8/5, 5/3, 9/5, 27/14, 2], 104-tET tuning, patent val elf","filename":"elfmagic12.scl","rnbo":[12,57.69231,0,173.07692,0,323.07692,0,380.76923,0,496.15385,0,553.84615,0,703.84615,0,819.23077,0,876.92308,0,1026.92308,0,1142.30769,0,2,1]},"elfmagic7":{"title":"Magic tempering of [10/9, 5/4, 4/3, 3/2, 8/5, 27/14, 2], 104-tET tuning, patent val elf","filename":"elfmagic7.scl","rnbo":[7,173.07692,0,380.76923,0,496.15385,0,703.84615,0,819.23077,0,1142.30769,0,2,1]},"elfmagic8":{"title":"Magic tempering of [25/24, 6/5, 5/4, 9/7, 8/5, 5/3, 12/7, 2], 104-tET tuning, patent val elf","filename":"elfmagic8.scl","rnbo":[8,57.69231,0,323.07692,0,380.76923,0,438.46154,0,819.23077,0,876.92308,0,934.61538,0,2,1]},"elfmagic9":{"title":"Magic tempering of [25/24, 6/5, 5/4, 4/3, 3/2, 8/5, 5/3, 27/14, 2], 104-tET tuning, patent val elf","filename":"elfmagic9.scl","rnbo":[9,57.69231,0,323.07692,0,380.76923,0,496.15385,0,703.84615,0,819.23077,0,876.92308,0,1142.30769,0,2,1]},"elfmiracle12":{"title":"Miracle tempered [15/14, 8/7, 7/6, 11/9, 21/16, 7/5, 32/21, 18/11, 12/7, 7/4, 15/8, 2], 72et tuning, 11-limit patent val elf","filename":"elfmiracle12.scl","rnbo":[12,116.66667,0,233.33333,0,266.66667,0,350.0,0,466.66667,0,583.33333,0,733.33333,0,850.0,0,933.33333,0,966.66667,0,1083.33333,0,2,1]},"elfmiracle7":{"title":"Miracle tempered [8/7, 11/9, 21/16, 32/21, 18/11, 15/8, 2], 72-tET tuning, 11-limit patent val elf","filename":"elfmiracle7.scl","rnbo":[7,233.33333,0,350.0,0,466.66667,0,733.33333,0,850.0,0,1083.33333,0,2,1]},"elfmyna7":{"title":"Myna tempered [8/7, 6/5, 7/5, 10/7, 5/3, 7/4, 2] in 58-tET tuning, 13-limit patent val elf","filename":"elfmyna7.scl","rnbo":[7,227.58621,0,310.34483,0,579.31034,0,620.68966,0,889.65517,0,972.41379,0,2,1]},"elfoctacot12f":{"title":"Octacot tempered [21/20, 10/9, 7/6, 11/9, 15/11, 7/5, 22/15, 14/9, 12/7, 9/5, 21/11, 2], 150-tET tuning, 13-limit 12f val","filename":"elfoctacot12f.scl","rnbo":[12,88.0,0,176.0,0,264.0,0,352.0,0,528.0,0,584.0,0,672.0,0,760.0,0,936.0,0,1024.0,0,1112.0,0,2,1]},"elfqilin10":{"title":"Qilin tempering of [26/25, 15/13, 6/5, 9/7, 13/9, 14/9, 5/3, 26/15, 25/13, 2], POTE tuning, 13-limit patent val elf","filename":"elfqilin10.scl","rnbo":[10,62.19704,0,248.78817,0,310.98521,0,435.37929,0,640.22663,0,764.62071,0,889.01479,0,951.21183,0,1137.80296,0,2,1]},"elfthrush10":{"title":"Thrush temperng of [21/20, 8/7, 5/4, 4/3, 7/5, 3/2, 8/5, 7/4, 21/11, 2], 89et tuning","filename":"elfthrush10.scl","rnbo":[10,80.898876,0,229.213483,0,391.011236,0,498.876404,0,579.775281,0,701.123596,0,808.988764,0,970.786517,0,1119.101124,0,2,1]},"elfthrush8d":{"title":"Thrush tempering of [21/20, 6/5, 5/4, 10/7, 3/2, 11/7, 21/11, 2], 89-tET tuning","filename":"elfthrush8d.scl","rnbo":[8,80.89888,0,310.11236,0,391.01124,0,620.22472,0,701.1236,0,782.02247,0,1119.10112,0,2,1]},"elfvalentine8d":{"title":"Valentine tempered [21/20, 6/5, 5/4, 21/16, 8/5, 5/3, 11/6, 2] in 77-tET tuning, 11-limit 8d elf","filename":"elfvalentine8d.scl","rnbo":[8,77.92208,0,311.68831,0,389.61039,0,467.53247,0,810.38961,0,888.31169,0,1044.15584,0,2,1]},"elfvalinorsmic10":{"title":"Valinorsmic tempering of [16/15, 11/10, 5/4, 4/3, 11/8, 3/2, 8/5, 20/11, 15/8, 2], 111-tET tuning","filename":"elfvalinorsmic10.scl","rnbo":[10,108.10811,0,162.16216,0,389.18919,0,497.2973,0,551.35135,0,702.7027,0,810.81081,0,1037.83784,0,1091.89189,0,2,1]},"elfvalinorsmic11":{"title":"Valinorsmic tempering of [11/10, 9/8, 5/4, 4/3, 15/11, 22/15, 3/2, 8/5, 16/9, 20/11, 2], 111-tET tuning","filename":"elfvalinorsmic11.scl","rnbo":[11,162.16216,0,205.40541,0,389.18919,0,497.2973,0,540.54054,0,659.45946,0,702.7027,0,810.81081,0,994.59459,0,1037.83784,0,2,1]},"elfzeus10":{"title":"Zeus tempering of [16/15, 11/10, 5/4, 4/3, 11/8, 3/2, 8/5, 7/4, 11/6, 2], 99-tET tuning","filename":"elfzeus10.scl","rnbo":[10,109.09091,0,157.57576,0,387.87879,0,496.9697,0,545.45455,0,703.0303,0,812.12121,0,969.69697,0,1042.42424,0,2,1]},"elfzeus12":{"title":"Zeus tempering of [16/15, 11/10, 6/5, 5/4, 4/3, 11/8, 3/2, 8/5, 5/3, 7/4, 11/6, 2], 99-tET tuning","filename":"elfzeus12.scl","rnbo":[12,109.09091,0,157.57576,0,315.15152,0,387.87879,0,496.9697,0,545.45455,0,703.0303,0,812.12121,0,884.84848,0,969.69697,0,1042.42424,0,2,1]},"ellis":{"title":"Alexander John Ellis' imitation equal temperament (1875)","filename":"ellis.scl","rnbo":[12,99.48477,0,199.49288,0,299.22463,0,399.46708,0,499.41938,0,599.87102,0,699.74785,0,799.35595,0,899.4811,0,999.323,0,1099.66996,0,2,1]},"ellis_24":{"title":"Ellis, from p. 421 of Helmholtz, 24 tones of JI for 1 manual harmonium","filename":"ellis_24.scl","rnbo":[24,81,80,25,24,135,128,9,8,729,640,75,64,1215,1024,5,4,81,64,4,3,27,20,45,32,729,512,3,2,243,160,25,16,405,256,5,3,27,16,225,128,3645,2048,15,8,243,128,2,1]},"ellis_eb":{"title":"Ellis's new equal beating temperament for pianofortes (1885)","filename":"ellis_eb.scl","rnbo":[12,100.20762,0,199.93511,0,300.36652,0,400.3042,0,499.94415,0,600.12513,0,699.74785,0,800.07968,0,899.92383,0,1000.46612,0,1100.50792,0,2,1]},"ellis_harm":{"title":"Ellis's Just Harmonium","filename":"ellis_harm.scl","rnbo":[12,16,15,9,8,6,5,5,4,4,3,27,20,3,2,8,5,5,3,9,5,15,8,2,1]},"ellis_mteb":{"title":"Ellis's equal beating meantone tuning (1885)","filename":"ellis_mteb.scl","rnbo":[12,75.7,0,192.2,0,310.7,0,385.8,0,504.75363,0,580.2,0,696.26231,0,772.6,0,889.1,0,1007.8133,0,1083.4,0,2,1]},"ellis_r":{"title":"Ellis's rational approximation of equal temperament","filename":"ellis_r.scl","rnbo":[12,89,84,449,400,44,37,63,50,303,227,140,99,433,289,100,63,37,22,98,55,168,89,2,1]},"enh14":{"title":"14/11 Enharmonic","filename":"enh14.scl","rnbo":[7,44,43,22,21,4,3,3,2,66,43,11,7,2,1]},"enh15":{"title":"Tonos-15 Enharmonic","filename":"enh15.scl","rnbo":[7,30,29,15,14,15,11,3,2,20,13,30,19,2,1]},"enh15_inv":{"title":"Inverted Enharmonic Tonos-15 Harmonia","filename":"enh15_inv.scl","rnbo":[7,19,15,13,10,4,3,22,15,28,15,29,15,2,1]},"enh15_inv2":{"title":"Inverted  harmonic form of the enharmonic Tonos-15","filename":"enh15_inv2.scl","rnbo":[7,31,30,16,15,4,3,22,15,3,2,23,15,2,1]},"enh17":{"title":"Tonos-17 Enharmonic","filename":"enh17.scl","rnbo":[7,34,33,17,16,17,12,17,11,68,43,34,21,2,1]},"enh17_con":{"title":"Conjunct 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Tone 24 alternates with 23 as MESE or A","filename":"enh31.scl","rnbo":[8,31,30,31,29,31,24,31,23,31,22,62,43,31,21,2,1]},"enh31_con":{"title":"Conjunct Tonos-31 Enharmonic","filename":"enh31_con.scl","rnbo":[8,31,30,31,29,31,24,31,23,62,45,31,22,31,18,2,1]},"enh33":{"title":"Tonos-33 Enharmonic","filename":"enh33.scl","rnbo":[7,33,32,33,31,11,8,3,2,66,43,11,7,2,1]},"enh33_con":{"title":"Conjunct Tonos-33 Enharmonic","filename":"enh33_con.scl","rnbo":[7,33,32,33,31,11,8,66,47,33,23,11,6,2,1]},"enh_invcon":{"title":"Inverted Enharmonic Conjunct Phrygian Harmonia","filename":"enh_invcon.scl","rnbo":[7,13,12,17,12,35,24,3,2,23,12,47,24,2,1]},"enh_mod":{"title":"Enharmonic After Wilson's Purvi Modulations, See page 111","filename":"enh_mod.scl","rnbo":[7,9,8,7,6,4,3,3,2,14,9,8,5,2,1]},"enh_perm":{"title":"Permuted Enharmonic, After Wilson's Marwa Permutations, See page 110.","filename":"enh_perm.scl","rnbo":[7,28,27,16,15,4,3,3,2,14,9,16,9,2,1]},"enlil19_13":{"title":"Enlil[19] hobbit 13 limit minimax, commas 15625/15552, 385/384 and 325/324","filename":"enlil19_13.scl","rnbo":[19,68.28318,0,152.64336,0,180.50443,0,248.78761,0,317.0708,0,385.35398,0,469.71415,0,497.57523,0,565.85841,0,634.14159,0,702.42477,0,730.28585,0,814.64602,0,882.9292,0,951.21239,0,1019.49557,0,1047.35664,0,1131.71682,0,2,1]},"ennea45":{"title":"Ennealimmal-45, in a 7-limit least-squares tuning, g=48.999, G.W. 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Intense Chromatic","filename":"eratos_chrom.scl","rnbo":[7,20,19,10,9,4,3,3,2,30,19,5,3,2,1]},"eratos_diat":{"title":"Dorian mode of Eratosthenes's Diatonic, Pythagorean. 7-tone Kurdi","filename":"eratos_diat.scl","rnbo":[7,256,243,32,27,4,3,3,2,128,81,16,9,2,1]},"eratos_enh":{"title":"Dorian mode of Eratosthenes's Enharmonic","filename":"eratos_enh.scl","rnbo":[7,40,39,20,19,4,3,3,2,20,13,30,19,2,1]},"erlangen":{"title":"Anonymus: Pro clavichordiis faciendis, Erlangen 15th century","filename":"erlangen.scl","rnbo":[12,256,243,4096,3645,32,27,5,4,4,3,1024,729,3,2,128,81,2048,1215,16,9,15,8,2,1]},"erlangen2":{"title":"Revised Erlangen","filename":"erlangen2.scl","rnbo":[12,135,128,9,8,32,27,5,4,4,3,45,32,3,2,405,256,27,16,16,9,15,8,2,1]},"erlich1":{"title":"Asymmetrical Major decatonic mode of 22-tET, Paul Erlich","filename":"erlich1.scl","rnbo":[10,109.091,0,218.182,0,381.818,0,490.909,0,600.0,0,709.091,0,872.727,0,981.818,0,1090.909,0,2,1]},"erlich10":{"title":"Canonical JI interpretation of the Pentachordal decatonic mode of 22-tET","filename":"erlich10.scl","rnbo":[10,21,20,8,7,6,5,4,3,7,5,3,2,8,5,12,7,9,5,2,1]},"erlich10a":{"title":"erlich10 in 50/49 (-1,5) tuning","filename":"erlich10a.scl","rnbo":[10,108.3371,0,217.52687,0,325.86396,0,491.6629,0,600.0,0,708.3371,0,817.52687,0,925.86396,0,1034.20106,0,2,1]},"erlich10coh":{"title":"Differential coherent version of erlich10 with subharmonic 40","filename":"erlich10coh.scl","rnbo":[10,21,20,23,20,6,5,53,40,7,5,3,2,8,5,69,40,9,5,2,1]},"erlich10s1":{"title":"Superparticular version of erlich10 using 50/49 decatonic comma","filename":"erlich10s1.scl","rnbo":[10,15,14,8,7,6,5,4,3,7,5,3,2,8,5,12,7,9,5,2,1]},"erlich10s2":{"title":"Other superparticular version of erlich10 using 50/49 decatonic comma","filename":"erlich10s2.scl","rnbo":[10,21,20,28,25,6,5,4,3,7,5,3,2,8,5,12,7,9,5,2,1]},"erlich11":{"title":"Canonical JI interpretation of the Symmetrical decatonic mode of 22-tET","filename":"erlich11.scl","rnbo":[10,15,14,7,6,5,4,4,3,10,7,3,2,5,3,7,4,15,8,2,1]},"erlich11s1":{"title":"Superparticular version of erlich11 using 50/49 decatonic comma","filename":"erlich11s1.scl","rnbo":[10,21,20,7,6,5,4,4,3,10,7,3,2,5,3,7,4,15,8,2,1]},"erlich11s2":{"title":"Other superparticular version of erlich11 using 50/49 decatonic comma","filename":"erlich11s2.scl","rnbo":[10,15,14,7,6,25,21,4,3,10,7,3,2,5,3,7,4,15,8,2,1]},"erlich12":{"title":"Two 9-tET scales 3/2 shifted, Paul Erlich, TL 5-12-2001","filename":"erlich12.scl","rnbo":[18,35.28833,0,133.33333,0,168.62167,0,266.66667,0,301.955,0,400.0,0,435.28833,0,533.33333,0,568.62167,0,666.66667,0,3,2,800.0,0,835.28833,0,933.33333,0,968.62167,0,1066.66667,0,1101.955,0,2,1]},"erlich13":{"title":"Just 7-limit scale by Paul Erlich","filename":"erlich13.scl","rnbo":[12,15,14,8,7,5,4,9,7,10,7,3,2,45,28,12,7,7,4,25,14,15,8,2,1]},"erlich2":{"title":"Asymmetrical Minor decatonic mode of 22-tET, Paul Erlich","filename":"erlich2.scl","rnbo":[10,109.091,0,218.182,0,327.273,0,490.909,0,600.0,0,709.091,0,818.182,0,927.273,0,1036.364,0,2,1]},"erlich3":{"title":"Symmetrical Major decatonic mode of 22-tET, Paul Erlich","filename":"erlich3.scl","rnbo":[10,109.091,0,218.182,0,381.818,0,490.909,0,600.0,0,709.091,0,818.182,0,981.818,0,1090.909,0,2,1]},"erlich4":{"title":"Symmetrical Minor decatonic mode of 22-tET, Paul Erlich","filename":"erlich4.scl","rnbo":[10,109.091,0,218.182,0,327.273,0,490.909,0,600.0,0,709.091,0,818.182,0,927.273,0,1090.909,0,2,1]},"erlich5":{"title":"Unequal 22-note compromise between decatonic & Indian srutis, Paul Erlich","filename":"erlich5.scl","rnbo":[22,50.25,0,105.75,0,161.25,0,211.5,0,272.25,0,322.5,0,383.25,0,428.25,0,494.25,0,539.25,0,594.75,0,650.25,0,705.75,0,761.25,0,816.75,0,872.25,0,917.25,0,983.25,0,1028.25,0,1089.0,0,1139.25,0,2,1]},"erlich6":{"title":"Scale of consonant tones against 1/1-3/2 drone. TL 23-9-1998","filename":"erlich6.scl","rnbo":[22,21,20,15,14,12,11,9,8,8,7,7,6,6,5,5,4,9,7,21,16,4,3,11,8,7,5,10,7,3,2,8,5,5,3,12,7,7,4,9,5,15,8,2,1]},"erlich7":{"title":"Meantone-like circle of sinuoidally varying fifths, TL 08-12-99","filename":"erlich7.scl","rnbo":[26,71.4,0,105.0,0,128.9,0,193.0,0,257.1,0,281.0,0,314.6,0,386.0,0,438.6,0,458.0,0,504.1,0,577.1,0,616.8,0,637.7,0,696.4,0,764.8,0,793.0,0,821.2,0,889.6,0,948.3,0,969.2,0,1008.9,0,1081.9,0,1128.0,0,1147.4,0,2,1]},"erlich8":{"title":"Two 12-tET scales 15 cents shifted, Paul Erlich","filename":"erlich8.scl","rnbo":[24,15.0,0,100.0,0,115.0,0,200.0,0,215.0,0,300.0,0,315.0,0,400.0,0,415.0,0,500.0,0,515.0,0,600.0,0,615.0,0,700.0,0,715.0,0,800.0,0,815.0,0,900.0,0,915.0,0,1000.0,0,1015.0,0,1100.0,0,1115.0,0,2,1]},"erlich9":{"title":"Just scale by Paul Erlich (2002)","filename":"erlich9.scl","rnbo":[10,33,32,9,8,5,4,21,16,11,8,3,2,27,16,7,4,15,8,2,1]},"erlich_bpf":{"title":"Erlich's 39-tone Triple Bohlen-Pierce 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scale","filename":"fokker_sra.scl","rnbo":[22,53.06891,0,109.74715,0,162.81606,0,215.88498,0,268.95389,0,322.0228,0,378.70104,0,435.37928,0,488.44819,0,541.5171,0,594.58602,0,651.26425,0,704.33317,0,761.0114,0,817.68964,0,874.36787,0,927.43679,0,980.5057,0,1033.57461,0,1086.64353,0,1143.32176,0,2,1]},"fokker_uv":{"title":"Table of Unison Vectors, Microsons and Minisons, from article KNAW, 1969","filename":"fokker_uv.scl","rnbo":[70,4375,4374,2401,2400,420175,419904,2460375,2458624,32805,32768,65625,65536,2100875,2097152,102760448,102515625,6144,6125,3136,3125,10976,10935,225,224,15625,15552,321489,320000,1029,1024,2109375,2097152,2097152,2083725,1728,1715,4000,3969,126,125,245,243,413343,409600,33075,32768,65536,64827,110592,109375,2048,2025,2430,2401,81,80,875,864,531441,524288,1063125,1048576,34034175,33554432,4194304,4134375,2097152,2066715,31104,30625,64,63,686,675,3125,3072,300125,294912,131072,128625,327680,321489,100352,98415,50,49,49,48,234375,229376,535815,524288,1071875,1048576,12288,12005,128,125,2240,2187,5625,5488,525,512,16807,16384,786432,765625,131072,127575,36,35,12005,11664,540225,524288,16128,15625,6272,6075,405,392,1323,1280,42875,41472,648,625,28,27,25,24,21,20,135,128,3584,3375,625,588]},"foote":{"title":"Ed Foote, piano temperament. TL 9 Jun 1999, almost equal to Coleman","filename":"foote.scl","rnbo":[12,97.0,0,197.0,0,297.0,0,394.0,0,501.0,0,595.0,0,699.0,0,797.0,0,896.0,0,999.0,0,1094.0,0,2,1]},"foote2":{"title":"Ed Foote´s temperament with 1/6, 1/8 and 1/12 Pyth comma fractions","filename":"foote2.scl","rnbo":[12,98.045,0,197.0675,0,298.045,0,394.135,0,501.955,0,596.09,0,699.0225,0,798.045,0,896.09,0,1000.0,0,1094.135,0,2,1]},"forster":{"title":"Cris Forster's Chrysalis tuning, XH 7+8","filename":"forster.scl","rnbo":[32,16,15,13,12,11,10,8,7,13,11,11,9,5,4,9,7,13,10,21,16,27,20,11,8,7,5,10,7,13,9,16,11,40,27,3,2,32,21,20,13,14,9,8,5,18,11,27,16,22,13,12,7,7,4,16,9,24,13,15,8,64,33,2,1]},"fortuna11":{"title":"11-limit scale from Clem Fortuna","filename":"fortuna11.scl","rnbo":[12,21,20,8,7,7,6,14,11,21,16,10,7,32,21,11,7,12,7,7,4,40,21,2,1]},"fortuna_a1":{"title":"Clem Fortuna, Arabic mode of 24-tET, try C or G major, superset of Basandida, trivalent","filename":"fortuna_a1.scl","rnbo":[12,100.0,0,200.0,0,300.0,0,350.0,0,500.0,0,600.0,0,700.0,0,800.0,0,900.0,0,1000.0,0,1050.0,0,2,1]},"fortuna_a2":{"title":"Clem Fortuna, Arabic mode of 24-tET, try C or F minor","filename":"fortuna_a2.scl","rnbo":[12,100.0,0,150.0,0,300.0,0,400.0,0,500.0,0,600.0,0,700.0,0,18,11,900.0,0,1000.0,0,1100.0,0,2,1]},"fortuna_bag":{"title":"Bagpipe tuning from Fortuna, try key of G with F natural","filename":"fortuna_bag.scl","rnbo":[12,117,115,146,131,196,169,89,73,141,106,81,59,150,101,125,82,139,84,205,116,11,6,2,1]},"fortuna_eth":{"title":"Ethiopian Tunings from Fortuna","filename":"fortuna_eth.scl","rnbo":[12,15,14,32,29,97,83,26,21,41,31,55,39,53,36,19,12,21,13,70,39,37,20,2,1]},"fortuna_sheng":{"title":"Sheng scale on naturals starting on d, from Fortuna","filename":"fortuna_sheng.scl","rnbo":[12,141,134,34,31,55,46,71,58,4,3,80,57,117,80,107,67,63,38,59,33,63,34,2,1]},"francis_924-1":{"title":"J. Charles Francis, Bach temperament for BWV 924 version 1 (2005)","filename":"francis_924-1.scl","rnbo":[12,92.18,0,9,8,296.09,0,400.65167,0,500.0,0,590.225,0,3,2,794.135,0,27,16,998.045,0,1095.43833,0,2,1]},"francis_924-2":{"title":"J. Charles Francis, Bach temperament for BWV 924 version 2 (2005)","filename":"francis_924-2.scl","rnbo":[12,92.18,0,9,8,296.09,0,400.65167,0,500.0,0,590.225,0,3,2,801.30333,0,27,16,998.045,0,1095.43833,0,2,1]},"francis_924-3":{"title":"J. Charles Francis, Bach temperament for BWV 924 version 3 (2005)","filename":"francis_924-3.scl","rnbo":[12,99.34833,0,9,8,303.25833,0,400.65167,0,507.16834,0,597.39333,0,3,2,801.30333,0,27,16,1005.21334,0,1095.43833,0,2,1]},"francis_924-4":{"title":"J. Charles Francis, Bach temperament for BWV 924 version 4 (2005)","filename":"francis_924-4.scl","rnbo":[12,99.34833,0,9,8,303.25833,0,400.65167,0,507.16834,0,597.39333,0,3,2,808.47167,0,27,16,1005.21334,0,1095.43833,0,2,1]},"francis_r12-14p":{"title":"Bach WTC theoretical temperament, 1/14 Pyth. comma, Cornet-ton, same Maunder III","filename":"francis_r12-14p.scl","rnbo":[12,100.27929,0,197.20714,0,300.83786,0,394.41428,0,501.39643,0,598.32428,0,698.60357,0,800.55857,0,895.81071,0,1001.11714,0,1096.36928,0,2,1]},"francis_r12-2":{"title":"J. Charles Francis, Bach WTC temperament R12-2, fifths beat ratios 0, 1, 2. C=279.331 Cornet-ton","filename":"francis_r12-2.scl","rnbo":[12,100.62819,0,197.00984,0,301.28636,0,394.76319,0,501.14108,0,598.67319,0,697.8182,0,800.63282,0,895.27348,0,1001.50455,0,1096.71819,0,2,1]},"francis_r2-1":{"title":"J. Charles Francis, Bach WTC temperament R2-1, fifths beat ratios 0, 1, 2. C=249.072 Cammerton","filename":"francis_r2-1.scl","rnbo":[12,95.2136,0,198.49541,0,299.1236,0,395.50525,0,499.78177,0,593.2586,0,699.63654,0,797.1686,0,896.31362,0,999.12823,0,1093.76889,0,2,1]},"francis_r2-14p":{"title":"Bach WTC theoretical temperament, 1/14 Pyth. comma, Cammerton","filename":"francis_r2-14p.scl","rnbo":[12,95.25214,0,198.88286,0,299.16214,0,396.09,0,499.72071,0,593.29714,0,700.27929,0,797.20714,0,897.48643,0,999.44143,0,1094.69357,0,2,1]},"francis_seal":{"title":"J. Charles Francis, Bach tuning interpretion as beats/sec. from seal","filename":"francis_seal.scl","rnbo":[12,91.9662,0,196.15,0,295.876,0,391.05,0,499.786,0,590.011,0,697.303,0,793.921,0,891.872,0,997.831,0,1089.29,0,2,1]},"francis_suppig":{"title":"J. Charles Francis, Suppig Calculus musicus, 5ths beat ratios 0, 1, 2.","filename":"francis_suppig.scl","rnbo":[12,94.7,0,196.9,0,297.3,0,394.5,0,501.2,0,592.8,0,697.7,0,796.7,0,895.0,0,999.3,0,1093.1,0,2,1]},"freiberg":{"title":"Temperament of G. Silbermann organ (1735), St. Petri in Freiberg (1985), a=476.3","filename":"freiberg.scl","rnbo":[12,256,243,196.09,0,298.045,0,394.135,0,500.0,0,590.225,0,698.045,0,790.225,0,896.09,0,1000.0,0,1092.18,0,2,1]},"freivald-star":{"title":"Jake Freivald, starling scale, approximately 8, 15, 20, 25, 28, 32, 40, 45, 60, 65, 72, 77 steps of 77-tET","filename":"freivald-star.scl","rnbo":[12,123.54,0,232.173,0,311.102,0,390.031,0,434.641,0,498.663,0,622.203,0,701.132,0,933.304,0,1012.233,0,1120.866,0,2,1]},"freivald11":{"title":"Jake Freivald, scale derived mostly from elevens (2011)","filename":"freivald11.scl","rnbo":[17,33,32,12,11,25,22,33,28,11,9,14,11,4,3,7,5,16,11,3,2,11,7,18,11,56,33,16,9,11,6,21,11,2,1]},"freivald_canton":{"title":"Jake Freivald, a 2.3.11/7.13/7 subgroup scale","filename":"freivald_canton.scl","rnbo":[12,14,13,9,8,13,11,14,11,4,3,39,28,3,2,11,7,22,13,16,9,13,7,2,1]},"freivald_lucky":{"title":"Jake Freivald, Lucky sevens and elevens, two chords 3/2 apart, superparticular","filename":"freivald_lucky.scl","rnbo":[9,12,11,13,11,14,11,7,5,3,2,18,11,39,22,21,11,2,1]},"freivald_sub":{"title":"Jake Freivald, just scale in 5.11.31 subgroup. TL 30-5-2011","filename":"freivald_sub.scl","rnbo":[12,125,121,33275,29791,34375,29791,31,25,155,121,1331,961,1375,961,961,625,961,605,1331,775,55,31,29791,15625]},"freivald_sup":{"title":"Jake Freivald, 4/3 divided into 7 superparticulars, repeated at 3/2, and the 4/3-3/2 divide split into 25/24, 26/25, 27/26","filename":"freivald_sup.scl","rnbo":[17,22,21,23,21,8,7,25,21,26,21,9,7,4,3,25,18,13,9,3,2,11,7,23,14,12,7,25,14,13,7,27,14,2,1]},"freivaldthree":{"title":"JI tritave repeating scale, similar to ennon13. Mode of the 13-note tritave MOS of ennealimmal","filename":"freivaldthree.scl","rnbo":[13,27,25,729,625,19683,15625,3125,2187,125,81,5,3,9,5,243,125,6561,3125,15625,6561,625,243,25,9,3,1]},"fribourg":{"title":"Manderscheidt organ in Fribourg (1640), modified meantone","filename":"fribourg.scl","rnbo":[12,91.2025,0,195.1125,0,306.8425,0,387.29249,0,500.9775,0,589.2475,0,698.045,0,781.42749,0,892.18,0,1004.8875,0,1087.29249,0,2,1]},"frischknecht2":{"title":"Frischknecht II organ temperament, 1/8 P","filename":"frischknecht2.scl","rnbo":[12,96.09,0,198.045,0,300.0,0,396.09,0,500.9775,0,597.0675,0,699.0225,0,798.045,0,897.0675,0,1001.955,0,1095.1125,0,2,1]},"fusc4":{"title":"All rationals with fusc value <= 4","filename":"fusc4.scl","rnbo":[15,16,15,9,8,8,7,7,6,6,5,5,4,4,3,3,2,8,5,5,3,12,7,7,4,16,9,15,8,2,1]},"fusc5":{"title":"All rationals with fusc value <= 5","filename":"fusc5.scl","rnbo":[23,17,16,16,15,9,8,8,7,7,6,6,5,16,13,5,4,4,3,11,8,7,5,10,7,16,11,3,2,8,5,13,8,5,3,12,7,7,4,16,9,15,8,32,17,2,1]},"fusc6":{"title":"All rationals with fusc value <= 6","filename":"fusc6.scl","rnbo":[35,17,16,16,15,15,14,13,12,12,11,10,9,9,8,8,7,7,6,6,5,16,13,5,4,9,7,4,3,11,8,7,5,24,17,17,12,10,7,16,11,3,2,14,9,8,5,13,8,5,3,12,7,7,4,16,9,9,5,11,6,24,13,28,15,15,8,32,17,2,1]},"gabler":{"title":"In 1982 reconstructed temperament of organ in Weingarten by Joseph Gabler (1737-1750)","filename":"gabler.scl","rnbo":[12,85.43524,0,194.917,0,304.98525,0,390.90925,0,500.9775,0,588.17224,0,700.0,0,785.43524,0,892.91312,0,1002.98138,0,1088.17224,0,2,1]},"galilei":{"title":"Vincenzo Galilei's approximation","filename":"galilei.scl","rnbo":[12,103.0,0,198.0,0,301.0,0,396.0,0,495.0,0,594.0,0,693.0,0,792.0,0,891.0,0,990.0,0,1089.0,0,2,1]},"gamelan_udan":{"title":"Gamelan Udan Mas (approx) s6,p6,p7,s1,p1,s2,p2,p3,s3,p4,s5,p5","filename":"gamelan_udan.scl","rnbo":[12,1,1,10,9,7,6,32,25,47,35,32,23,3,2,20,13,16,9,16,9,23,12,2,1]},"ganassi":{"title":"Sylvestro Ganassi's temperament (1543)","filename":"ganassi.scl","rnbo":[12,20,19,10,9,20,17,5,4,4,3,24,17,3,2,30,19,5,3,30,17,15,8,2,1]},"gann_arcana":{"title":"Kyle Gann, scale for Arcana XVI","filename":"gann_arcana.scl","rnbo":[24,21,20,16,15,9,8,7,6,6,5,11,9,5,4,21,16,4,3,27,20,7,5,22,15,3,2,55,36,8,5,44,27,5,3,42,25,7,4,9,5,11,6,15,8,88,45,2,1]},"gann_charingcross":{"title":"Kyle Gann, scale for Charing Cross (2007)","filename":"gann_charingcross.scl","rnbo":[39,81,80,65,64,33,32,15,14,35,32,143,128,9,8,55,48,77,64,135,112,39,32,5,4,81,64,21,16,75,56,27,20,65,48,11,8,45,32,91,64,35,24,165,112,3,2,195,128,49,32,99,64,45,28,13,8,5,3,27,16,12,7,55,32,7,4,25,14,117,64,15,8,121,64,63,32,2,1]},"gann_cinderella":{"title":"Kyle Gann, scale for Cinderella's Bad Magic","filename":"gann_cinderella.scl","rnbo":[30,25,24,21,20,135,128,27,25,9,8,75,64,6,5,5,4,32,25,125,96,4,3,27,20,25,18,45,32,36,25,22,15,3,2,55,36,25,16,8,5,81,50,5,3,125,72,7,4,9,5,175,96,15,8,48,25,125,64,2,1]},"gann_custer":{"title":"Kyle Gann, scale from Custer's Ghost to Sitting Bull, 1/1=G","filename":"gann_custer.scl","rnbo":[31,33,32,21,20,16,15,11,10,10,9,9,8,8,7,7,6,6,5,11,9,5,4,9,7,21,16,4,3,27,20,11,8,7,5,16,11,3,2,14,9,8,5,18,11,5,3,12,7,7,4,16,9,9,5,11,6,15,8,64,33,2,1]},"gann_fractured":{"title":"Kyle Gann, scale from Fractured Paradise, 1/1=B","filename":"gann_fractured.scl","rnbo":[16,81,80,9,8,7,6,189,160,6,5,4,3,27,20,7,5,3,2,243,160,63,40,8,5,81,50,7,4,9,5,2,1]},"gann_fugitive":{"title":"Kyle Gann, scale for Fugitive Objects (2007)","filename":"gann_fugitive.scl","rnbo":[21,49,48,21,20,13,12,9,8,8,7,55,48,7,6,6,5,11,9,5,4,21,16,11,8,7,5,16,11,3,2,11,7,13,8,7,4,11,6,55,28,2,1]},"gann_ghost":{"title":"Kyle Gann, scale from Ghost Town, 1/1=E","filename":"gann_ghost.scl","rnbo":[8,9,8,7,6,21,16,4,3,3,2,14,9,7,4,2,1]},"gann_love":{"title":"Kyle Gann, scale for Love Scene","filename":"gann_love.scl","rnbo":[21,33,32,25,24,35,32,9,8,77,64,5,4,81,64,21,16,11,8,45,32,35,24,3,2,99,64,25,16,27,16,55,32,7,4,15,8,121,64,63,32,2,1]},"gann_new_aunts":{"title":"Kyle Gann, scale from New Aunts (2008), 1/1=A","filename":"gann_new_aunts.scl","rnbo":[27,33,32,11,10,10,9,9,8,7,6,6,5,5,4,81,64,9,7,35,27,4,3,11,8,45,32,81,56,35,24,3,2,14,9,8,5,45,28,5,3,27,16,7,4,15,8,27,14,35,18,63,32,2,1]},"gann_revisited":{"title":"Kyle Gann, scale for The Day Revisited (2005)","filename":"gann_revisited.scl","rnbo":[29,33,32,12,11,35,32,10,9,9,8,8,7,5,4,9,7,21,16,4,3,11,8,45,32,10,7,16,11,40,27,3,2,49,32,99,64,25,16,18,11,5,3,27,16,12,7,55,32,7,4,20,11,15,8,63,32,2,1]},"gann_sitting":{"title":"Kyle Gann, tuning for Sitting Bull (1998), 1/1=B","filename":"gann_sitting.scl","rnbo":[21,10,9,9,8,8,7,7,6,189,160,6,5,4,3,48,35,7,5,189,128,40,27,3,2,14,9,63,40,8,5,7,4,16,9,9,5,15,8,63,32,2,1]},"gann_solitaire":{"title":"Kyle Gann, scale from Solitaire (2009), 1/1=Eb","filename":"gann_solitaire.scl","rnbo":[36,65,64,33,32,15,14,35,32,10,9,9,8,8,7,55,48,6,5,77,64,39,32,5,4,9,7,165,128,21,16,4,3,11,8,91,64,10,7,35,24,3,2,99,64,13,8,105,64,5,3,27,16,12,7,55,32,7,4,9,5,117,64,15,8,40,21,495,256,63,32,2,1]},"gann_suntune":{"title":"Kyle Gann, tuning for Sun Dance / Battle of the Greasy Grass River, 1/1=F#","filename":"gann_suntune.scl","rnbo":[30,15,14,12,11,10,9,9,8,8,7,7,6,25,21,6,5,5,4,21,16,4,3,27,20,11,8,7,5,10,7,16,11,40,27,3,2,8,5,45,28,18,11,5,3,12,7,7,4,16,9,25,14,9,5,15,8,40,21,2,1]},"gann_super":{"title":"Kyle Gann, scale from Superparticular Woman (1992), 1/1=G","filename":"gann_super.scl","rnbo":[22,11,10,10,9,9,8,8,7,7,6,6,5,5,4,9,7,4,3,11,8,7,5,10,7,3,2,11,7,14,9,8,5,5,3,12,7,7,4,16,9,9,5,2,1]},"gann_things":{"title":"Kyle Gann, scale from How Miraculous Things Happen, 1/1=A","filename":"gann_things.scl","rnbo":[24,55,54,25,24,10,9,9,8,8,7,7,6,6,5,11,9,5,4,9,7,21,16,4,3,10,7,40,27,3,2,14,9,25,16,5,3,12,7,16,9,15,8,40,21,35,18,2,1]},"gann_wolfe":{"title":"Kyle Gann from Anatomy of an Octave, edited by Kristina Wolfe 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29-tone scale by José L. 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p.5","filename":"grady_14.scl","rnbo":[14,21,20,9,8,7,6,5,4,21,16,4,3,7,5,3,2,63,40,27,16,7,4,15,8,63,32,2,1]},"grady_centaur":{"title":"Kraig Grady's 7-limit Centaur scale (1987), Xenharmonikon 16","filename":"grady_centaur.scl","rnbo":[12,21,20,9,8,7,6,5,4,4,3,7,5,3,2,14,9,5,3,7,4,15,8,2,1]},"grady_centaur17":{"title":"17-tone extension of Centaur, Kraig Grady & Terumi Narushima (2012)","filename":"grady_centaur17.scl","rnbo":[17,21,20,15,14,9,8,7,6,49,40,5,4,4,3,7,5,10,7,3,2,14,9,49,30,5,3,7,4,147,80,15,8,2,1]},"grady_centaur19":{"title":"19-tone extension of Centaur, Kraig Grady & Terumi Narushima (2012). Optional 10/9, 63/40, 16/9, 35/18","filename":"grady_centaur19.scl","rnbo":[19,21,20,35,32,9,8,7,6,6,5,5,4,21,16,4,3,7,5,35,24,3,2,14,9,8,5,5,3,7,4,9,5,15,8,63,32,2,1]},"grady_centaurmarv":{"title":"1/4-kleismic marvel tempered centaur/meandin","filename":"grady_centaurmarv.scl","rnbo":[12,84.46719,0,200.05424,0,268.79879,0,384.38583,0,499.97288,0,584.44007,0,700.02712,0,768.77167,0,884.35871,0,968.82591,0,1084.41295,0,2,1]},"graf-sorge":{"title":"Gräf-Sorge organ temperament, 1/6 P","filename":"graf-sorge.scl","rnbo":[12,94.135,0,196.09,0,298.045,0,400.0,0,501.955,0,596.09,0,698.045,0,796.09,0,898.045,0,1000.0,0,1098.045,0,2,1]},"grammateus":{"title":"H. Grammateus (Heinrich Schreiber) (1518). B-F# and Bb-F 1/2 P. Also Marpurg nr.6 and Baron von Wiese and Maria Renold","filename":"grammateus.scl","rnbo":[12,101.955,0,9,8,305.865,0,81,64,4,3,600.0,0,3,2,803.91,0,27,16,1007.82,0,243,128,2,1]},"graupner":{"title":"Johann Gottlieb Graupner's temperament (1819)","filename":"graupner.scl","rnbo":[12,99.38085,0,199.56283,0,299.18649,0,399.59949,0,499.43999,0,600.05924,0,700.09326,0,799.57803,0,899.85889,0,999.57536,0,1100.07666,0,2,1]},"groenewald":{"title":"Jürgen Grönewald, new meantone temperament (2001)","filename":"groenewald.scl","rnbo":[12,101.955,0,193.15686,0,304.88814,0,396.09,0,4,3,600.0,0,3,2,803.91,0,895.11186,0,1006.84314,0,1098.045,0,2,1]},"groenewald_21":{"title":"Jürgen Grönewald, just tuning (2000)","filename":"groenewald_21.scl","rnbo":[21,135,128,16,15,10,9,9,8,32,27,6,5,5,4,512,405,4,3,45,32,64,45,3,2,405,256,8,5,5,3,27,16,16,9,9,5,15,8,256,135,2,1]},"groenewald_bach":{"title":"Jürgen Grönewald, simplified Bach temperament, Ars Organi vol.57 no.1, March 2009, p.39","filename":"groenewald_bach.scl","rnbo":[12,256,243,189.25008,0,32,27,386.60605,0,4,3,1024,729,693.17509,0,128,81,887.27506,0,16,9,1086.80812,0,2,1]},"groven":{"title":"Eivind Groven's 36-tone scale with 1/8-schisma temp. fifths and 5/4 (1948)","filename":"groven.scl","rnbo":[36,20.52943,0,70.91664,0,91.44607,0,111.9755,0,182.89214,0,203.42157,0,223.951,0,274.33821,0,294.86764,0,315.39707,0,5,4,406.84314,0,32,25,477.75979,0,498.28921,0,518.81864,0,569.20586,0,589.73529,0,610.26471,0,681.18136,0,701.71079,0,722.24021,0,25,16,793.15686,0,8,5,884.60293,0,905.13236,0,925.66179,0,976.049,0,996.57843,0,1017.10786,0,1067.49507,0,1088.0245,0,1108.55393,0,1179.47057,0,2,1]},"groven_ji":{"title":"Untempered version of Groven's 36-tone scale","filename":"groven_ji.scl","rnbo":[36,81,80,25,24,135,128,16,15,10,9,9,8,256,225,75,64,32,27,6,5,5,4,81,64,32,25,675,512,4,3,27,20,25,18,45,32,64,45,40,27,3,2,1024,675,25,16,405,256,8,5,5,3,27,16,128,75,225,128,16,9,9,5,50,27,15,8,256,135,2025,1024,2,1]},"guanyin22":{"title":"Guanyin[22] {176/175, 540/539} hobbit in 111-tET","filename":"guanyin22.scl","rnbo":[22,43.24324,0,108.10811,0,162.16216,0,227.02703,0,270.27027,0,313.51351,0,389.18919,0,432.43243,0,497.2973,0,540.54054,0,583.78378,0,659.45946,0,702.7027,0,767.56757,0,810.81081,0,886.48649,0,929.72973,0,972.97297,0,1037.83784,0,1091.89189,0,1156.75676,0,2,1]},"guanyintet5":{"title":"Guanyintet[5] 2.5.7/3.11/3 subgroup MOS in 70\\311 tuning","filename":"guanyintet5.scl","rnbo":[5,270.09646,0,540.19293,0,810.28939,0,1080.38585,0,2,1]},"guiron77":{"title":"Guiron[77] (118&159 temperament) in 159-tET","filename":"guiron77.scl","rnbo":[77,22.64151,0,30.18868,0,52.83019,0,60.37736,0,83.01887,0,90.56604,0,113.20755,0,120.75472,0,143.39623,0,150.9434,0,173.58491,0,181.13207,0,203.77359,0,211.32076,0,233.96226,0,256.60377,0,264.15094,0,286.79245,0,294.33962,0,316.98113,0,324.5283,0,347.16981,0,354.71698,0,377.35849,0,384.90566,0,407.54717,0,415.09434,0,437.73585,0,445.28302,0,467.92453,0,490.56604,0,498.11321,0,520.75472,0,528.30189,0,550.9434,0,558.49057,0,581.13207,0,588.67924,0,611.32075,0,618.86792,0,641.50943,0,649.0566,0,671.69811,0,679.24528,0,701.88679,0,709.43396,0,732.07547,0,754.71698,0,762.26415,0,784.90566,0,792.45283,0,815.09434,0,822.64151,0,845.28302,0,852.83019,0,875.4717,0,883.01887,0,905.66038,0,913.20755,0,935.84906,0,943.39623,0,966.03774,0,988.67924,0,996.22642,0,1018.86793,0,1026.41509,0,1049.0566,0,1056.60377,0,1079.24528,0,1086.79245,0,1109.43396,0,1116.98113,0,1139.62264,0,1147.16981,0,1169.81132,0,1177.35849,0,2,1]},"gunkali":{"title":"Indian mode Gunkali, see Daniélou: Intr. to the Stud. of Mus. Scales, p.175","filename":"gunkali.scl","rnbo":[7,135,128,27,25,4,3,3,2,25,16,8,5,2,1]},"gyaling":{"title":"Tibetan Buddhist Gyaling tones measured from CD \"The Diamond Path\", Ligon 2002","filename":"gyaling.scl","rnbo":[6,139.0,0,280.0,0,450.0,0,493.0,0,707.0,0,884.0,0]},"h10_27":{"title":"10-tET harmonic approximation, fundamental=27","filename":"h10_27.scl","rnbo":[10,29,27,31,27,11,9,4,3,38,27,41,27,44,27,47,27,50,27,2,1]},"h12_24":{"title":"12-tET harmonic approximation, fundamental=24","filename":"h12_24.scl","rnbo":[12,25,24,9,8,29,24,5,4,4,3,17,12,3,2,19,12,5,3,43,24,15,8,2,1]},"h14_27":{"title":"14-tET harmonic approximation, fundamental=27","filename":"h14_27.scl","rnbo":[14,28,27,10,9,31,27,11,9,35,27,4,3,38,27,40,27,14,9,44,27,47,27,49,27,17,9,2,1]},"h15_24":{"title":"15-tET harmonic approximation, fundamental=24","filename":"h15_24.scl","rnbo":[15,25,24,13,12,7,6,29,24,5,4,4,3,11,8,35,24,3,2,19,12,5,3,7,4,11,6,23,12,2,1]},"h17_32":{"title":"17-tET harmonic approximation, fundamental=32","filename":"h17_32.scl","rnbo":[17,33,32,35,32,9,8,19,16,39,32,41,32,43,32,11,8,23,16,3,2,25,16,13,8,27,16,57,32,59,32,61,32,2,1]},"hahn9":{"title":"Paul Hahn's just version of 9 out of 31 scale, TL 6-8-98","filename":"hahn9.scl","rnbo":[9,35,32,6,5,5,4,7,5,3,2,8,5,7,4,15,8,2,1]},"hahn_7":{"title":"Paul Hahn's scale with 32 consonant 7-limit dyads. TL '99, see also smithgw_hahn12.scl","filename":"hahn_7.scl","rnbo":[12,21,20,7,6,6,5,5,4,4,3,7,5,3,2,8,5,5,3,7,4,28,15,2,1]},"hahn_g":{"title":"Paul Hahn, fourth of sqrt(2)-1 octave \"recursive\" meantone (1999)","filename":"hahn_g.scl","rnbo":[12,120.60608,0,205.88745,0,291.16882,0,411.7749,0,497.05627,0,617.66235,0,702.94373,0,823.5498,0,908.83118,0,994.11255,0,1114.71863,0,2,1]},"hahnmaxr":{"title":"Paul Hahn's hahn_7.scl marvel projected to the 5-limit","filename":"hahnmaxr.scl","rnbo":[12,135,128,75,64,6,5,5,4,4,3,45,32,3,2,8,5,5,3,225,128,15,8,2,1]},"hamilton":{"title":"Elsie Hamilton's gamut, from article The Modes of Ancient Greek Music (1953)","filename":"hamilton.scl","rnbo":[12,22,21,11,10,22,19,11,9,22,17,11,8,22,15,11,7,44,27,22,13,11,6,2,1]},"hamilton_jc":{"title":"Chalmers' permutation of Hamilton's gamut. Diatonic notes on white","filename":"hamilton_jc.scl","rnbo":[12,22,21,11,10,22,19,11,9,11,8,22,17,11,7,22,15,22,13,44,27,11,6,2,1]},"hamilton_jc2":{"title":"EH gamut, diatonic notes on white and drops 17 for 25. JC Dorian Harmonia on C. Schlesinger's Solar scale","filename":"hamilton_jc2.scl","rnbo":[12,22,21,11,10,22,19,11,9,11,8,22,15,11,7,44,27,22,13,44,25,11,6,2,1]},"hammond":{"title":"Hammond organ pitch wheel ratios, 1/1=320 Hz. Do \"del 0\" to get 12-tone scale","filename":"hammond.scl","rnbo":[13,71,82,67,73,35,36,69,67,12,11,37,32,49,40,48,37,11,8,67,46,54,35,85,52,71,41]},"hammond12":{"title":"Hammond organ scale, 1/1=277.0731707 Hz, A=440, see hammond.scl for the ratios","filename":"hammond12.scl","rnbo":[12,5494,5183,1435,1278,5658,4757,984,781,1517,1136,2009,1420,3936,2627,451,284,2747,1633,4428,2485,3485,1846,2,1]},"handblue":{"title":"\"Handy Blues\" of Pitch Palette, 7-limit","filename":"handblue.scl","rnbo":[12,16,15,9,8,7,6,5,4,4,3,7,5,3,2,14,9,5,3,7,4,15,8,2,1]},"handel":{"title":"Well temperament according to Georg Friedrich Händel's rules (c. 1780)","filename":"handel.scl","rnbo":[12,93.0402,0,195.4644,0,296.9502,0,395.6208,0,498.9834,0,592.962,0,697.263,0,794.9952,0,895.5426,0,997.9668,0,1094.7606,0,2,1]},"handel2":{"title":"Another \"Händel\" temperament, C. di Veroli","filename":"handel2.scl","rnbo":[12,99.71167,0,199.92333,0,299.62167,0,399.83333,0,499.53167,0,599.75666,0,699.455,0,799.66667,0,899.87833,0,999.57667,0,1100.30166,0,2,1]},"hanfling-bumler":{"title":"The Hänfling/Bümler equal temperament from Mattheson, June 1722, corrected","filename":"hanfling-bumler.scl","rnbo":[12,8000,7551,10000,8909,200000,168179,10000,7937,20000,14983,200000,141421,50000,33371,25000,15749,400000,237841,100000,56123,100000,52973,2,1]},"hanson_19":{"title":"JI version of Hanson's 19 out of 53-tET scale","filename":"hanson_19.scl","rnbo":[19,25,24,27,25,9,8,125,108,6,5,5,4,125,96,4,3,25,18,36,25,3,2,25,16,8,5,5,3,125,72,9,5,15,8,48,25,2,1]},"harm-doreninv1":{"title":"1st Inverted Schlesinger's Enharmonic Dorian Harmonia","filename":"harm-doreninv1.scl","rnbo":[7,27,22,5,4,14,11,16,11,21,11,43,22,2,1]},"harm-dorinv1":{"title":"1st Inverted Schlesinger's Chromatic Dorian Harmonia","filename":"harm-dorinv1.scl","rnbo":[7,13,11,27,22,14,11,16,11,20,11,21,11,2,1]},"harm-lydchrinv1":{"title":"1st Inverted Schlesinger's Chromatic Lydian Harmonia","filename":"harm-lydchrinv1.scl","rnbo":[7,16,13,17,13,18,13,20,13,24,13,25,13,2,1]},"harm-lydeninv1":{"title":"1st Inverted Schlesinger's Enharmonic Lydian Harmonia","filename":"harm-lydeninv1.scl","rnbo":[7,17,13,35,26,18,13,20,13,25,13,51,26,2,1]},"harm-mixochrinv1":{"title":"1st Inverted Schlesinger's Chromatic Mixolydian Harmonia","filename":"harm-mixochrinv1.scl","rnbo":[7,9,7,19,14,10,7,11,7,13,7,27,14,2,1]},"harm-mixoeninv1":{"title":"1st Inverted Schlesinger's Enharmonic Mixolydian Harmonia","filename":"harm-mixoeninv1.scl","rnbo":[7,19,14,39,28,10,7,11,7,27,14,55,28,2,1]},"harm10":{"title":"Harmonics 10 to 20","filename":"harm10.scl","rnbo":[10,11,10,6,5,13,10,7,5,3,2,8,5,17,10,9,5,19,10,2,1]},"harm12":{"title":"Harmonics 12 to 24","filename":"harm12.scl","rnbo":[12,13,12,7,6,5,4,4,3,17,12,3,2,19,12,5,3,7,4,11,6,23,12,2,1]},"harm12_2":{"title":"Harmonics 12 to 24, mode 9","filename":"harm12_2.scl","rnbo":[12,17,16,9,8,19,16,5,4,21,16,11,8,23,16,3,2,13,8,7,4,15,8,2,1]},"harm12s":{"title":"Harmonics 1 to 12 and subharmonics mixed","filename":"harm12s.scl","rnbo":[11,9,8,8,7,5,4,4,3,11,8,16,11,3,2,8,5,7,4,16,9,2,1]},"harm14":{"title":"Harmonics 14 to 28, Tessaradecatonic Harmonium, José Pereira de Sampaio (1903)","filename":"harm14.scl","rnbo":[14,15,14,8,7,17,14,9,7,19,14,10,7,3,2,11,7,23,14,12,7,25,14,13,7,27,14,2,1]},"harm15":{"title":"Harmonics 15 to 30","filename":"harm15.scl","rnbo":[15,16,15,17,15,6,5,19,15,4,3,7,5,22,15,23,15,8,5,5,3,26,15,9,5,28,15,29,15,2,1]},"harm15a":{"title":"Twelve out of harmonics 15 to 30","filename":"harm15a.scl","rnbo":[12,16,15,17,15,6,5,19,15,4,3,7,5,22,15,8,5,5,3,26,15,28,15,2,1]},"harm16":{"title":"Harmonics 16 to 32, Tom Stone's Guitar Scale","filename":"harm16.scl","rnbo":[16,17,16,9,8,19,16,5,4,21,16,11,8,23,16,3,2,25,16,13,8,27,16,7,4,29,16,15,8,31,16,2,1]},"harm19":{"title":"Harmonics 19 to 38, odd harmonics until 37","filename":"harm19.scl","rnbo":[19,33,32,17,16,35,32,9,8,37,32,19,16,5,4,21,16,11,8,23,16,3,2,25,16,13,8,27,16,7,4,29,16,15,8,31,16,2,1]},"harm1c-hypod":{"title":"HarmC-Hypodorian","filename":"harm1c-hypod.scl","rnbo":[8,5,4,21,16,11,8,23,16,3,2,7,4,15,8,2,1]},"harm1c-hypol":{"title":"HarmC-Hypolydian","filename":"harm1c-hypol.scl","rnbo":[8,21,20,11,10,13,10,7,5,3,2,8,5,17,10,2,1]},"harm1c-lydian":{"title":"Harm1C-Lydian","filename":"harm1c-lydian.scl","rnbo":[8,27,26,14,13,18,13,19,13,20,13,21,13,22,13,2,1]},"harm1c-mix":{"title":"Harm1C-Con Mixolydian","filename":"harm1c-mix.scl","rnbo":[7,8,7,10,7,3,2,11,7,13,7,27,14,2,1]},"harm1c-mixolydian":{"title":"Harm1C-Mixolydian","filename":"harm1c-mixolydian.scl","rnbo":[7,15,14,8,7,10,7,11,7,23,14,12,7,2,1]},"harm20_12":{"title":"12-tone subset of harmonics 20 to 40","filename":"harm20_12.scl","rnbo":[12,21,20,11,10,6,5,5,4,13,10,7,5,3,2,8,5,17,10,9,5,19,10,2,1]},"harm24_12":{"title":"12-tone subset of harmonics 24 to 48","filename":"harm24_12.scl","rnbo":[12,13,12,9,8,7,6,5,4,4,3,11,8,3,2,13,8,5,3,7,4,15,8,2,1]},"harm24_8":{"title":"Modified Porcupine scale, Mike Sheiman (2011)","filename":"harm24_8.scl","rnbo":[8,13,12,7,6,5,4,11,8,3,2,5,3,11,6,2,1]},"harm256":{"title":"Harmonics 2 to 256, Johnny Reinhard","filename":"harm256.scl","rnbo":[128,129,128,65,64,131,128,33,32,133,128,67,64,135,128,17,16,137,128,69,64,139,128,35,32,141,128,71,64,143,128,9,8,145,128,73,64,147,128,37,32,149,128,75,64,151,128,19,16,153,128,77,64,155,128,39,32,157,128,79,64,159,128,5,4,161,128,81,64,163,128,41,32,165,128,83,64,167,128,21,16,169,128,85,64,171,128,43,32,173,128,87,64,175,128,11,8,177,128,89,64,179,128,45,32,181,128,91,64,183,128,23,16,185,128,93,64,187,128,47,32,189,128,95,64,191,128,3,2,193,128,97,64,195,128,49,32,197,128,99,64,199,128,25,16,201,128,101,64,203,128,51,32,205,128,103,64,207,128,13,8,209,128,105,64,211,128,53,32,213,128,107,64,215,128,27,16,217,128,109,64,219,128,55,32,221,128,111,64,223,128,7,4,225,128,113,64,227,128,57,32,229,128,115,64,231,128,29,16,233,128,117,64,235,128,59,32,237,128,119,64,239,128,15,8,241,128,121,64,243,128,61,32,245,128,123,64,247,128,31,16,249,128,125,64,251,128,63,32,253,128,127,64,255,128,2,1]},"harm28_8":{"title":"8-tone subset of harmonics 28 to 56, Mike Sheiman (2011)","filename":"harm28_8.scl","rnbo":[8,15,14,8,7,9,7,10,7,45,28,12,7,25,14,2,1]},"harm28_9":{"title":"9-tone subset of harmonics 28 to 56, Mike Sheiman (2011)","filename":"harm28_9.scl","rnbo":[9,15,14,5,4,9,7,10,7,3,2,45,28,12,7,25,14,2,1]},"harm30":{"title":"Harmonics 30 to 60","filename":"harm30.scl","rnbo":[30,31,30,16,15,11,10,17,15,7,6,6,5,37,30,19,15,13,10,4,3,41,30,7,5,43,30,22,15,3,2,23,15,47,30,8,5,49,30,5,3,17,10,26,15,53,30,9,5,11,6,28,15,19,10,29,15,59,30,2,1]},"harm32":{"title":"Harmonics 32 to 64","filename":"harm32.scl","rnbo":[32,33,32,17,16,35,32,9,8,37,32,19,16,39,32,5,4,41,32,21,16,43,32,11,8,45,32,23,16,47,32,3,2,49,32,25,16,51,32,13,8,53,32,27,16,55,32,7,4,57,32,29,16,59,32,15,8,61,32,31,16,63,32,2,1]},"harm6":{"title":"Harmonics 6 to 12","filename":"harm6.scl","rnbo":[6,9,8,5,4,11,8,3,2,7,4,2,1]},"harm7lim":{"title":"7-limit harmonics","filename":"harm7lim.scl","rnbo":[47,2,1,3,1,4,1,5,1,6,1,7,1,8,1,9,1,10,1,12,1,14,1,15,1,16,1,18,1,20,1,21,1,22,1,24,1,25,1,28,1,30,1,32,1,35,1,36,1,40,1,42,1,45,1,48,1,49,1,50,1,56,1,60,1,63,1,64,1,70,1,72,1,75,1,80,1,81,1,84,1,90,1,96,1,98,1,100,1,105,1,112,1,120,1]},"harm8":{"title":"Harmonics 8 to 16","filename":"harm8.scl","rnbo":[8,9,8,5,4,11,8,3,2,13,8,7,4,15,8,2,1]},"harm9":{"title":"Harmonics 9 to 18","filename":"harm9.scl","rnbo":[9,17,16,9,8,5,4,11,8,3,2,13,8,7,4,15,8,2,1]},"harm_bastard":{"title":"Schlesinger's \"Bastard\" Hypodorian Harmonia & inverse 1)7 from 1.3.5.7.9.11.13","filename":"harm_bastard.scl","rnbo":[7,8,7,16,13,4,3,16,11,8,5,16,9,2,1]},"harm_bastinv":{"title":"Inverse Schlesinger's \"Bastard\" Hypodorian Harmonia & 1)7 from 1.3.5.7.9.11.13","filename":"harm_bastinv.scl","rnbo":[7,9,8,5,4,11,8,3,2,13,8,7,4,2,1]},"harm_darreg":{"title":"Darreg Harmonics 4-15","filename":"harm_darreg.scl","rnbo":[24,4,1,5,1,6,1,7,1,8,1,9,1,10,1,11,1,12,1,13,1,14,1,15,1,16,1,20,1,24,1,28,1,32,1,36,1,40,1,44,1,48,1,52,1,56,1,60,1]},"harm_mean":{"title":"Harm. mean 9-tonic, 8/7 is HM of 1/1 and 4/3, etc.","filename":"harm_mean.scl","rnbo":[9,32,31,16,15,8,7,4,3,3,2,48,31,8,5,12,7,2,1]},"harm_pehrson":{"title":"Harm. 1/4-11/4 and subh. 4/1-4/11. Joseph Pehrson (1999)","filename":"harm_pehrson.scl","rnbo":[19,1,4,4,11,2,5,4,9,1,2,4,7,2,3,3,4,4,5,1,1,5,4,4,3,3,2,7,4,2,1,9,4,5,2,11,4,4,1]},"harm_perkis":{"title":"Harmonics 60 to 30 (Perkis)","filename":"harm_perkis.scl","rnbo":[12,15,14,10,9,6,5,5,4,4,3,10,7,3,2,30,19,5,3,12,7,15,8,2,1]},"harmc-hypop":{"title":"HarmC-Hypophrygian","filename":"harmc-hypop.scl","rnbo":[9,11,9,23,18,4,3,25,18,13,9,14,9,16,9,17,9,2,1]},"harmd-15":{"title":"HarmD-15-Harmonia","filename":"harmd-15.scl","rnbo":[7,16,15,6,5,4,3,22,15,8,5,26,15,2,1]},"harmd-conmix":{"title":"HarmD-ConMixolydian","filename":"harmd-conmix.scl","rnbo":[7,8,7,9,7,3,2,11,7,12,7,13,7,2,1]},"harmd-hypop":{"title":"HarmD-Hypophrygian","filename":"harmd-hypop.scl","rnbo":[9,10,9,11,9,4,3,25,18,13,9,14,9,5,3,16,9,2,1]},"harmd-lyd":{"title":"HarmD-Lydian","filename":"harmd-lyd.scl","rnbo":[9,14,13,15,13,16,13,18,13,19,13,20,13,22,13,24,13,2,1]},"harmd-mix":{"title":"HarmD-Mixolydian. Harmonics 7-14","filename":"harmd-mix.scl","rnbo":[7,8,7,9,7,10,7,11,7,12,7,13,7,2,1]},"harmd-phr":{"title":"HarmD-Phryg (with 5 extra tones)","filename":"harmd-phr.scl","rnbo":[12,25,24,13,12,9,8,7,6,4,3,5,4,3,2,19,12,5,3,7,4,11,6,2,1]},"harme-hypod":{"title":"HarmE-Hypodorian","filename":"harme-hypod.scl","rnbo":[8,21,16,43,32,11,8,23,16,3,2,15,8,31,16,2,1]},"harme-hypol":{"title":"HarmE-Hypolydian","filename":"harme-hypol.scl","rnbo":[8,43,40,21,20,13,10,7,5,3,2,31,20,8,5,2,1]},"harme-hypop":{"title":"HarmE-Hypophrygian","filename":"harme-hypop.scl","rnbo":[9,23,18,47,36,4,3,25,18,13,9,14,9,17,9,35,18,2,1]},"harmf10":{"title":"6/7/8/9/10 harmonics","filename":"harmf10.scl","rnbo":[13,35,32,9,8,5,4,81,64,21,16,45,32,3,2,49,32,25,16,27,16,7,4,63,32,2,1]},"harmf12":{"title":"First 12 harmonics of 6th through 12th harmonics. Also Arnold Dreyblatt's tuning system with 1/1=349.23 Hz","filename":"harmf12.scl","rnbo":[20,33,32,35,32,9,8,77,64,5,4,81,64,21,16,11,8,45,32,3,2,49,32,99,64,25,16,27,16,55,32,7,4,15,8,121,64,63,32,2,1]},"harmf16":{"title":"First 16 harmonics and subharmonics","filename":"harmf16.scl","rnbo":[30,2,1,3,1,4,1,5,1,6,1,7,1,8,1,9,1,10,1,11,1,12,1,13,1,14,1,15,1,16,1,8,1,16,3,4,1,16,5,8,3,16,7,2,1,16,9,8,5,16,11,4,3,16,13,8,7,16,15,1,1]},"harmf30":{"title":"First 30 harmonics and subharmonics","filename":"harmf30.scl","rnbo":[59,16,15,32,29,8,7,32,27,16,13,32,25,4,3,32,23,32,21,8,5,32,19,16,9,32,17,2,1,32,15,16,7,32,13,8,3,32,11,16,5,32,9,4,1,32,7,16,3,32,5,8,1,32,3,16,1,32,1,33,1,34,1,35,1,36,1,37,1,38,1,39,1,40,1,41,1,42,1,43,1,44,1,45,1,46,1,47,1,48,1,49,1,50,1,51,1,52,1,53,1,54,1,55,1,56,1,57,1,58,1,59,1,60,1,61,1,62,1]},"harmf9":{"title":"6/7/8/9 harmonics, First 9 overtones of 5th through 9th harmonics","filename":"harmf9.scl","rnbo":[10,9,8,7,6,5,4,4,3,49,36,3,2,14,9,7,4,16,9,2,1]},"harmjc-15":{"title":"Rationalized JC Sub-15 Harmonia on C. MD=15, No planetary assignment.","filename":"harmjc-15.scl","rnbo":[12,15,14,15,13,6,5,5,4,15,11,10,7,3,2,30,19,5,3,30,17,15,8,2,1]},"harmjc-17-2":{"title":"Rationalized JC Sub-17 Harmonia on C. MD=17, No planetary assignment.","filename":"harmjc-17-2.scl","rnbo":[12,17,16,17,15,17,14,17,13,17,12,34,23,17,11,34,21,17,10,34,19,17,9,2,1]},"harmjc-17":{"title":"Rationalized JC Sub-17 Harmonia on C. MD=17, No planetary assignment.","filename":"harmjc-17.scl","rnbo":[12,34,33,17,16,17,15,17,14,17,13,34,25,17,12,34,23,17,11,34,21,17,10,2,1]},"harmjc-19-2":{"title":"Rationalized JC Sub-19 Harmonia on C. MD=19, No planetary assignment.","filename":"harmjc-19-2.scl","rnbo":[12,19,18,19,17,19,16,19,15,19,14,38,27,19,13,38,25,19,12,38,23,19,11,2,1]},"harmjc-19":{"title":"Rationalized JC Sub-19 Harmonia on C. MD=19, No planetary assignment.","filename":"harmjc-19.scl","rnbo":[12,19,18,19,17,19,16,19,15,19,14,19,13,19,12,38,23,19,11,38,21,19,10,2,1]},"harmjc-21":{"title":"Rationalized JC Sub-21 Harmonia on C. MD=21, No planetary assignment.","filename":"harmjc-21.scl","rnbo":[12,42,41,21,20,21,19,7,6,21,16,7,5,3,2,14,9,21,13,42,25,7,4,2,1]},"harmjc-23-2":{"title":"Rationalized JC Sub-23 Harmonia on C. MD=23, No planetary assignment.","filename":"harmjc-23-2.scl","rnbo":[12,23,22,23,21,23,20,23,19,23,18,23,17,23,16,23,15,23,14,23,13,23,12,2,1]},"harmjc-23":{"title":"Rationalized JC Sub-23 Harmonia on C. MD=23, No planetary assignment.","filename":"harmjc-23.scl","rnbo":[12,23,22,23,20,23,19,23,18,23,16,23,15,23,14,46,27,23,13,46,25,23,12,2,1]},"harmjc-25":{"title":"Rationalized JC Sub-25 Harmonia on C. MD=25, No planetary assignment.","filename":"harmjc-25.scl","rnbo":[12,25,24,25,22,25,21,5,4,25,18,25,17,25,16,5,3,25,14,50,27,25,13,2,1]},"harmjc-27":{"title":"Rationalized JC Sub-27 Harmonia on C. MD=27, No planetary assignment.","filename":"harmjc-27.scl","rnbo":[12,27,26,9,8,27,23,27,22,27,20,27,19,3,2,27,17,27,16,9,5,27,14,2,1]},"harmjc-hypod16":{"title":"Rationalized JC Hypodorian Harmonia on C. Saturn Scale on C, MD=16. (Steiner)","filename":"harmjc-hypod16.scl","rnbo":[12,16,15,8,7,32,27,16,13,4,3,32,23,16,11,32,21,8,5,32,19,16,9,2,1]},"harmjc-hypol20":{"title":"Rationalized JC Hypolydian Harmonia on C. Mars scale on C., MD=20","filename":"harmjc-hypol20.scl","rnbo":[12,20,19,10,9,20,17,5,4,4,3,10,7,20,13,8,5,5,3,40,23,11,5,2,1]},"harmjc-hypop18":{"title":"Rationalized JC Hypophrygian Harmonia on C. Jupiter scale on C, MD =18","filename":"harmjc-hypop18.scl","rnbo":[12,18,17,9,8,6,5,9,7,18,13,36,25,3,2,36,23,18,11,12,7,9,5,2,1]},"harmjc-lydian13":{"title":"Rationalized JC Lydian Harmonia on Schlesinger's Mercury scale on C, MD = 26 or 13","filename":"harmjc-lydian13.scl","rnbo":[12,26,25,13,12,26,23,13,11,13,10,26,19,13,9,26,17,13,8,26,15,13,7,2,1]},"harmjc-mix14":{"title":"Rationalized JC Mixolydian Harmonia on Schlesinger's Moon Scale on C, MD = 14","filename":"harmjc-mix14.scl","rnbo":[12,28,27,14,13,28,25,7,6,14,11,4,3,7,5,28,19,14,9,28,17,7,4,2,1]},"harmjc-phryg12":{"title":"Rationalized JC Phrygian Harmonia on Schlesinger's Venus scale on C, MD = 24 or 12","filename":"harmjc-phryg12.scl","rnbo":[12,24,23,12,11,8,7,6,5,4,3,24,17,3,2,8,5,12,7,16,9,24,13,2,1]},"harmonical":{"title":"See pages 17 and 466-468 of Helmholtz. Lower 4 oct. instrument designed and tuned by Ellis","filename":"harmonical.scl","rnbo":[12,10,9,9,8,6,5,5,4,4,3,3,2,8,5,5,3,7,4,9,5,15,8,2,1]},"harmonical_up":{"title":"Upper 2 octaves of Ellis's Harmonical","filename":"harmonical_up.scl","rnbo":[12,17,16,9,8,19,16,5,4,11,8,7,4,3,2,25,16,13,8,29,16,15,8,2,1]},"harmsub16":{"title":"16 harmonics on 1/1 and 16 subharmonics on 15/8","filename":"harmsub16.scl","rnbo":[12,15,14,9,8,15,13,5,4,15,11,11,8,3,2,13,8,5,3,7,4,15,8,2,1]},"harrison_15":{"title":"15-tone scale found in Music Primer, Lou Harrison","filename":"harrison_15.scl","rnbo":[15,21,20,9,8,7,6,5,4,21,16,4,3,7,5,3,2,14,9,63,40,27,16,7,4,15,8,63,32,2,1]},"harrison_16":{"title":"Lou Harrison 16-tone superparticular \"Ptolemy Duple\", an aluminium bars instrument","filename":"harrison_16.scl","rnbo":[16,16,15,10,9,8,7,7,6,6,5,5,4,4,3,17,12,3,2,8,5,5,3,12,7,7,4,9,5,15,8,2,1]},"harrison_5":{"title":"From Lou Harrison, a pelog style pentatonic","filename":"harrison_5.scl","rnbo":[5,16,15,6,5,3,2,8,5,2,1]},"harrison_5_1":{"title":"From Lou Harrison, a pelog style pentatonic","filename":"harrison_5_1.scl","rnbo":[5,12,11,6,5,3,2,8,5,2,1]},"harrison_5_3":{"title":"From Lou Harrison, a pelog style pentatonic","filename":"harrison_5_3.scl","rnbo":[5,28,27,4,3,3,2,14,9,2,1]},"harrison_5_4":{"title":"From Lou Harrison, a pelog style pentatonic","filename":"harrison_5_4.scl","rnbo":[5,16,15,6,5,3,2,15,8,2,1]},"harrison_8":{"title":"Lou Harrison 8-tone tuning for \"Serenade for Guitar\"","filename":"harrison_8.scl","rnbo":[8,16,15,6,5,5,4,45,32,3,2,5,3,16,9,2,1]},"harrison_bill":{"title":"Lou Harrison, \"Music for Bill and Me\" (1966) for guitar","filename":"harrison_bill.scl","rnbo":[6,9,8,5,4,3,2,27,16,15,8,2,1]},"harrison_cinna":{"title":"Lou Harrison, \"Incidental Music for Corneille's Cinna\" (1955-56) 1/1=C","filename":"harrison_cinna.scl","rnbo":[12,25,24,9,8,6,5,5,4,21,16,45,32,3,2,8,5,5,3,7,4,15,8,2,1]},"harrison_diat":{"title":"From Lou Harrison, a soft diatonic","filename":"harrison_diat.scl","rnbo":[7,21,20,6,5,4,3,3,2,63,40,9,5,2,1]},"harrison_handel":{"title":"Lou Harrison, \"In Honor of the Divine Mr. Handel\" (1978-2002) for guitar","filename":"harrison_handel.scl","rnbo":[7,35,32,5,4,21,16,49,32,105,64,7,4,2,1]},"harrison_kyai":{"title":"Lou Harrison´s Kyai Udan Arum, pelog just gamelan tuning","filename":"harrison_kyai.scl","rnbo":[7,16,15,7,6,4,3,22,15,47,30,9,5,2,1]},"harrison_mid":{"title":"Lou Harrison mid mode","filename":"harrison_mid.scl","rnbo":[7,9,8,6,5,4,3,3,2,5,3,7,4,2,1]},"harrison_mid2":{"title":"Lou Harrison mid mode 2","filename":"harrison_mid2.scl","rnbo":[7,9,8,6,5,4,3,3,2,12,7,9,5,2,1]},"harrison_min":{"title":"Lou Harrison, symmetrical pentatonic with minor thirds. Per. block 16/15, 27/25","filename":"harrison_min.scl","rnbo":[5,6,5,4,3,3,2,5,3,2,1]},"harrison_mix1":{"title":"A \"mixed type\" pentatonic, Lou Harrison","filename":"harrison_mix1.scl","rnbo":[5,12,11,6,5,3,2,13,8,2,1]},"harrison_mix2":{"title":"A \"mixed type\" pentatonic, Lou Harrison","filename":"harrison_mix2.scl","rnbo":[5,6,5,4,3,3,2,15,8,2,1]},"harrison_mix3":{"title":"A \"mixed type\" pentatonic, Lou Harrison","filename":"harrison_mix3.scl","rnbo":[5,6,5,9,7,3,2,8,5,2,1]},"harrison_mix4":{"title":"A \"mixed type\" pentatonic, Lou Harrison","filename":"harrison_mix4.scl","rnbo":[5,15,14,5,4,3,2,12,7,2,1]},"harrison_slye":{"title":"11-limit scale by Lou Harrison and Bill Slye for National Reso-Phonic Just Intonation Guitar","filename":"harrison_slye.scl","rnbo":[12,28,27,9,8,7,6,5,4,4,3,11,8,3,2,14,9,5,3,7,4,11,6,2,1]},"harrison_songs":{"title":"Shared gamut of \"Four Strict Songs\" (1951-55), each pentatonic","filename":"harrison_songs.scl","rnbo":[12,28,27,9,8,32,27,5,4,4,3,45,32,3,2,14,9,27,16,16,9,15,8,2,1]},"harrisonj":{"title":"John Harrison's temperament (1775), almost 3/10-comma. Third = 1200/pi","filename":"harrisonj.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,381.97187,0,504.50703,0,572.9578,0,695.49297,0,763.94373,0,886.4789,0,1009.01407,0,1077.46483,0,2,1]},"harrisonm_rev":{"title":"Michael Harrison, piano tuning for \"Revelation\" (2001), 1/1=F","filename":"harrisonm_rev.scl","rnbo":[12,63,64,9,8,567,512,81,64,21,16,729,512,3,2,189,128,27,16,7,4,243,128,2,1]},"harry58":{"title":"Harry[58] 11-limit least squares optimized","filename":"harry58.scl","rnbo":[58,30.8796,0,48.2704,0,66.0033,0,83.4055,0,114.0944,0,131.4967,0,149.2296,0,166.6204,0,197.5,0,214.6587,0,232.2926,0,249.9761,0,280.663,0,297.9611,0,315.5137,0,333.112,0,363.8916,0,381.1737,0,398.75,0,416.3263,0,433.6084,0,464.388,0,481.9863,0,499.5389,0,516.837,0,547.5239,0,565.2074,0,582.8413,0,600.0,0,630.8796,0,648.2704,0,666.0033,0,683.4055,0,714.0944,0,731.4967,0,749.2296,0,766.6204,0,797.5,0,814.6587,0,832.2926,0,849.9761,0,880.663,0,897.9611,0,915.5137,0,933.112,0,963.8916,0,981.1737,0,998.75,0,1016.3263,0,1033.6084,0,1064.388,0,1081.9863,0,1099.5389,0,1116.837,0,1147.5239,0,1165.2074,0,1182.8413,0,2,1]},"haverstick13":{"title":"Neil Haverstick, scale in 34-tET, MMM 21-5-2006","filename":"haverstick13.scl","rnbo":[13,141.17647,0,247.05882,0,282.35294,0,352.94118,0,458.82353,0,564.70588,0,635.29412,0,741.17647,0,847.05882,0,917.64706,0,1058.82353,0,1129.41176,0,2,1]},"haverstick21":{"title":"Neil Haverstick, just guitar tuning, TL 19-07-2007","filename":"haverstick21.scl","rnbo":[21,25,24,17,16,10,9,9,8,19,16,6,5,5,4,21,16,4,3,11,8,23,16,3,2,25,16,13,8,5,3,27,16,7,4,29,16,15,8,31,16,2,1]},"hawkes":{"title":"William Hawkes' modified 1/5-comma meantone (1807)","filename":"hawkes.scl","rnbo":[12,83.5762,0,195.30749,0,295.11186,0,390.61497,0,502.34626,0,585.92246,0,697.65374,0,785.5312,0,892.96123,0,1004.69252,0,15,8,2,1]},"hawkes2":{"title":"Meantone with fifth tempered 1/6 of 53-tET step by William Hawkes (1808)","filename":"hawkes2.scl","rnbo":[12,87.26991,0,196.36283,0,305.45575,0,392.72566,0,501.81858,0,589.0885,0,698.18142,0,785.45133,0,894.54425,0,1003.63717,0,1090.90708,0,2,1]},"hawkes3":{"title":"William Hawkes' modified 1/5-comma meantone (1811)","filename":"hawkes3.scl","rnbo":[12,83.5762,0,195.30749,0,302.73751,0,390.61497,0,502.34626,0,585.92246,0,697.65374,0,785.5312,0,892.96123,0,1004.69251,0,15,8,2,1]},"helmholtz":{"title":"Helmholtz's Chromatic scale and Gipsy major from Slovakia","filename":"helmholtz.scl","rnbo":[7,16,15,5,4,4,3,3,2,8,5,15,8,2,1]},"helmholtz_24":{"title":"Simplified Helmholtz 24","filename":"helmholtz_24.scl","rnbo":[24,135,128,16,15,10,9,9,8,75,64,32,27,5,4,81,64,675,512,4,3,45,32,729,512,6075,4096,3,2,25,16,405,256,5,3,27,16,225,128,3645,2048,15,8,243,128,2025,1024,2,1]},"helmholtz_decad":{"title":"Helmholtz Harmonic Decad, major pentatonic modes mixed","filename":"helmholtz_decad.scl","rnbo":[9,9,8,6,5,5,4,4,3,3,2,8,5,5,3,9,5,2,1]},"helmholtz_pure":{"title":"Helmholtz's two-keyboard harmonium tuning untempered","filename":"helmholtz_pure.scl","rnbo":[24,135,128,16,15,10,9,9,8,75,64,32,27,5,4,512,405,675,512,4,3,45,32,64,45,40,27,3,2,25,16,128,81,5,3,27,16,225,128,16,9,15,8,256,135,160,81,2,1]},"helmholtz_temp":{"title":"Helmholtz's two-keyboard harmonium 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612-tET tuning (strictly proper)","filename":"hemienn82.scl","rnbo":[72,17.647059,0,31.372549,0,49.019608,0,66.666667,0,84.313725,0,98.039216,0,115.686275,0,133.333333,0,150.980392,0,164.705882,0,182.352941,0,200.0,0,217.647059,0,231.372549,0,249.019608,0,266.666667,0,284.313725,0,298.039216,0,315.686275,0,333.333333,0,350.980392,0,364.705882,0,382.352941,0,400.0,0,417.647059,0,431.372549,0,449.019608,0,466.666667,0,484.313725,0,498.039216,0,515.686275,0,533.333333,0,550.980392,0,564.705882,0,582.352941,0,600.0,0,617.647059,0,631.372549,0,649.019608,0,666.666667,0,684.313725,0,698.039216,0,715.686275,0,733.333333,0,750.980392,0,764.705882,0,782.352941,0,800.0,0,817.647059,0,831.372549,0,849.019608,0,866.666667,0,884.313725,0,898.039216,0,915.686275,0,933.333333,0,950.980392,0,964.705882,0,982.352941,0,1000.0,0,1017.647059,0,1031.372549,0,1049.019608,0,1066.666667,0,1084.313725,0,1098.039216,0,1115.686275,0,1133.333333,0,1150.980392,0,1164.705882,0,1182.352941,0,2,1]},"hemifamcyc":{"title":"Hemifamity cycle of 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transversal","filename":"hemiwuerschmidt31trans37.scl","rnbo":[31,49,48,2401,2304,884736,823543,18432,16807,384,343,8,7,7,6,117649,98304,7077888,5764801,147456,117649,3072,2401,64,49,343,256,16807,12288,823543,589824,1179648,823543,24576,16807,512,343,49,32,2401,1536,117649,73728,5764801,3538944,196608,117649,12,7,7,4,343,192,16807,9216,823543,442368,4608,2401,96,49,2,1]},"hemony":{"title":"Average tuning of 10 Hemony carillons, 1/4-comma meantone, Lehr, 1999","filename":"hemony.scl","rnbo":[12,75.5,0,193.0,0,310.5,0,386.0,0,503.5,0,580.0,0,696.5,0,772.0,0,889.5,0,1007.0,0,1082.5,0,2,1]},"hen12":{"title":"Adjusted Hahn12","filename":"hen12.scl","rnbo":[12,15,14,8,7,6,5,5,4,4,3,7,5,3,2,8,5,12,7,7,4,15,8,2,1]},"hen22":{"title":"Adjusted Hahn22","filename":"hen22.scl","rnbo":[22,25,24,15,14,10,9,8,7,7,6,6,5,5,4,9,7,4,3,25,18,7,5,35,24,3,2,100,63,8,5,5,3,12,7,7,4,50,27,15,8,35,18,2,1]},"hept_diamond":{"title":"Inverted-Prime Heptatonic Diamond based on Archytas's Enharmonic","filename":"hept_diamond.scl","rnbo":[25,36,35,28,27,16,15,9,8,7,6,6,5,98,81,56,45,5,4,32,25,9,7,4,3,3,2,14,9,25,16,8,5,45,28,81,49,5,3,12,7,16,9,15,8,27,14,35,18,2,1]},"hept_diamondi":{"title":"Prime-Inverted Heptatonic Diamond based on Archytas's Enharmonic","filename":"hept_diamondi.scl","rnbo":[25,36,35,28,27,16,15,784,729,448,405,9,8,256,225,5,4,9,7,4,3,112,81,45,32,64,45,81,56,3,2,14,9,8,5,225,128,16,9,405,224,729,392,15,8,27,14,35,18,2,1]},"hept_diamondp":{"title":"Heptatonic Diamond based on Archytas's Enharmonic, 27 tones","filename":"hept_diamondp.scl","rnbo":[27,36,35,28,27,16,15,9,8,7,6,6,5,5,4,9,7,35,27,4,3,48,35,112,81,45,32,64,45,81,56,35,24,3,2,54,35,14,9,8,5,5,3,12,7,16,9,15,8,27,14,35,18,2,1]},"herf_istrian":{"title":"Franz Richter Herf, Istrian scale used in \"Welle der Nacht\" op. 2","filename":"herf_istrian.scl","rnbo":[10,67,64,17,16,9,8,37,32,39,32,83,64,11,8,57,32,121,64,2,1]},"heun":{"title":"Well temperament for organ of Jan Heun (1805), 12 out of 55-tET (1/6-comma meantone)","filename":"heun.scl","rnbo":[12,87.27273,0,196.36364,0,305.45455,0,392.72727,0,501.81818,0,589.09091,0,698.18182,0,785.45455,0,894.54545,0,1003.63636,0,1090.90909,0,2,1]},"hexagonal13":{"title":"Star hexagonal 13-tone scale","filename":"hexagonal13.scl","rnbo":[13,25,24,16,15,10,9,6,5,5,4,4,3,3,2,8,5,5,3,9,5,15,8,48,25,2,1]},"hexagonal37":{"title":"Star hexagonal 37-tone scale","filename":"hexagonal37.scl","rnbo":[37,25,24,16,15,27,25,625,576,10,9,9,8,256,225,144,125,75,64,6,5,100,81,5,4,32,25,125,96,4,3,27,20,25,18,45,32,64,45,36,25,40,27,3,2,192,125,25,16,8,5,81,50,5,3,128,75,125,72,225,128,16,9,9,5,1152,625,50,27,15,8,48,25,2,1]},"hexany1":{"title":"Two out of 1 3 5 7 hexany on 1.3","filename":"hexany1.scl","rnbo":[6,7,6,5,4,35,24,5,3,7,4,2,1]},"hexany10":{"title":"1.3.5.9 Hexany and Lou Harrison's Joyous 6. Second key is Harrison's Solemn 6 (1962)","filename":"hexany10.scl","rnbo":[6,9,8,5,4,3,2,5,3,15,8,2,1]},"hexany11":{"title":"1.3.7.9 Hexany on 1.3","filename":"hexany11.scl","rnbo":[6,9,8,7,6,21,16,3,2,7,4,2,1]},"hexany12":{"title":"3.5.7.9 Hexany on 3.9","filename":"hexany12.scl","rnbo":[6,10,9,7,6,35,27,14,9,5,3,2,1]},"hexany13":{"title":"1.3.5.11 Hexany on 1.11","filename":"hexany13.scl","rnbo":[6,12,11,5,4,15,11,3,2,20,11,2,1]},"hexany14":{"title":"5.11.13.15 Hexany (5.15), used in The Giving, by Stephen J. Taylor","filename":"hexany14.scl","rnbo":[6,11,10,13,10,22,15,26,15,143,75,2,1]},"hexany15":{"title":"1.3.5.15  2)4 hexany (1.15 tonic) degenerate, symmetrical pentatonic","filename":"hexany15.scl","rnbo":[5,5,4,4,3,3,2,8,5,2,1]},"hexany16":{"title":"1.3.9.27 Hexany, a degenerate pentatonic form","filename":"hexany16.scl","rnbo":[5,9,8,4,3,3,2,16,9,2,1]},"hexany17":{"title":"1.5.25.125 Hexany, a degenerate pentatonic form","filename":"hexany17.scl","rnbo":[5,5,4,32,25,25,16,8,5,2,1]},"hexany18":{"title":"1.7.49.343 Hexany, a degenerate pentatonic form","filename":"hexany18.scl","rnbo":[5,8,7,64,49,49,32,7,4,2,1]},"hexany19":{"title":"1.5.7.35 Hexany, a degenerate pentatonic form","filename":"hexany19.scl","rnbo":[5,8,7,5,4,8,5,7,4,2,1]},"hexany2":{"title":"Hexany Cluster 2","filename":"hexany2.scl","rnbo":[12,25,24,9,8,6,5,5,4,125,96,4,3,25,18,3,2,25,16,5,3,15,8,2,1]},"hexany20":{"title":"3.5.7.105 Hexany","filename":"hexany20.scl","rnbo":[6,16,15,7,6,32,21,5,3,16,9,2,1]},"hexany21":{"title":"3.5.9.135 Hexany","filename":"hexany21.scl","rnbo":[6,16,15,32,27,3,2,5,3,16,9,2,1]},"hexany21a":{"title":"3.5.9.135 Hexany + 4/3. Is Didymos Diatonic tetrachord on 1/1 and inv. on 3/2","filename":"hexany21a.scl","rnbo":[7,16,15,32,27,4,3,3,2,5,3,16,9,2,1]},"hexany22":{"title":"1.11.121.1331 Hexany, a degenerate pentatonic form","filename":"hexany22.scl","rnbo":[5,128,121,11,8,16,11,121,64,2,1]},"hexany23":{"title":"1.3.11.33 Hexany, degenerate pentatonic form","filename":"hexany23.scl","rnbo":[5,4,3,11,8,16,11,3,2,2,1]},"hexany24":{"title":"1.5.11.55 Hexany, a degenerate pentatonic form","filename":"hexany24.scl","rnbo":[5,5,4,11,8,16,11,8,5,2,1]},"hexany25":{"title":"1.7.11.77 Hexany, a degenerate pentatonic form","filename":"hexany25.scl","rnbo":[5,8,7,11,8,16,11,7,4,2,1]},"hexany26":{"title":"1.9.11.99 Hexany, a degenerate pentatonic form","filename":"hexany26.scl","rnbo":[5,9,8,11,8,16,11,16,9,2,1]},"hexany3":{"title":"Hexany Cluster 3","filename":"hexany3.scl","rnbo":[12,25,24,10,9,6,5,5,4,4,3,3,2,8,5,5,3,9,5,15,8,48,25,2,1]},"hexany4":{"title":"Hexany Cluster 4","filename":"hexany4.scl","rnbo":[12,25,24,9,8,6,5,5,4,4,3,36,25,3,2,8,5,5,3,9,5,15,8,2,1]},"hexany49":{"title":"1.3.21.49  2)4 hexany (1.21 tonic)","filename":"hexany49.scl","rnbo":[6,8,7,7,6,3,2,49,32,7,4,2,1]},"hexany5":{"title":"Hexany Cluster 5","filename":"hexany5.scl","rnbo":[12,9,8,6,5,5,4,4,3,3,2,25,16,8,5,5,3,9,5,15,8,48,25,2,1]},"hexany6":{"title":"Hexany Cluster 6, periodicity block 125/108 and 135/128","filename":"hexany6.scl","rnbo":[12,25,24,10,9,9,8,6,5,5,4,4,3,3,2,25,16,8,5,5,3,15,8,2,1]},"hexany7":{"title":"Hexany Cluster 7","filename":"hexany7.scl","rnbo":[12,25,24,6,5,5,4,4,3,25,18,3,2,25,16,8,5,5,3,9,5,15,8,2,1]},"hexany8":{"title":"Hexany Cluster 8","filename":"hexany8.scl","rnbo":[12,25,24,6,5,5,4,125,96,4,3,3,2,25,16,8,5,5,3,15,8,48,25,2,1]},"hexany_1029":{"title":"Hexany gamelismic (1029/1024) 2.5.7 convex closure","filename":"hexany_1029.scl","rnbo":[10,2560,2401,8,7,5,4,64,49,10,7,512,343,80,49,4096,2401,640,343,2,1]},"hexany_1728":{"title":"Hexany orwellismic (1728/1715) 2.3.7 convex closure","filename":"hexany_1728.scl","rnbo":[7,2592,2401,432,343,3456,2401,72,49,3,2,12,7,2,1]},"hexany_245":{"title":"Hexany sensamagic (245/243) 2.3.7 convex closure","filename":"hexany_245.scl","rnbo":[10,729,686,54,49,243,196,9,7,486,343,3,2,81,49,12,7,27,14,2,1]},"hexany_4375":{"title":"Hexany ragismic (4375/4374) 5-limit convex closure","filename":"hexany_4375.scl","rnbo":[12,3125,2916,125,108,5,4,625,486,25,18,3125,2187,3,2,125,81,5,3,1250,729,50,27,2,1]},"hexany_5120":{"title":"Hexany hemifamity (5120/5103) 5-limit convex closure","filename":"hexany_5120.scl","rnbo":[10,2187,2048,9,8,5,4,81,64,729,512,3,2,27,16,2187,1280,243,128,2,1]},"hexany_6144":{"title":"Hexany porwell (6144/6125) 2.5.7 convex closure","filename":"hexany_6144.scl","rnbo":[8,4375,4096,5,4,175,128,10,7,6125,4096,25,16,875,512,2,1]},"hexany_65625":{"title":"Hexany porwell (65625/65536) 5-limit convex closure","filename":"hexany_65625.scl","rnbo":[11,140625,131072,9375,8192,75,64,5,4,46875,32768,375,256,3,2,28125,16384,1875,1024,15,8,2,1]},"hexany_875":{"title":"Hexany keema (875/864) 5-limit convex closure","filename":"hexany_875.scl","rnbo":[7,25,24,625,576,5,4,625,432,3,2,125,72,2,1]},"hexany_cl":{"title":"Hexany Cluster 1","filename":"hexany_cl.scl","rnbo":[12,9,8,144,125,6,5,5,4,4,3,27,20,36,25,3,2,8,5,9,5,48,25,2,1]},"hexany_cl2":{"title":"Composed of 1.3.5.45, 1.3.5.75, 1.3.5.9, and 1.3.5.25 hexanies","filename":"hexany_cl2.scl","rnbo":[11,16,15,9,8,6,5,5,4,4,3,3,2,25,16,8,5,15,8,48,25,2,1]},"hexany_tetr":{"title":"Complex 12 of p. 115, a hexany based on Archytas's Enharmonic","filename":"hexany_tetr.scl","rnbo":[6,36,35,16,15,9,7,4,3,48,35,2,1]},"hexany_trans":{"title":"Complex 1 of p. 115, a hexany based on Archytas's Enharmonic","filename":"hexany_trans.scl","rnbo":[6,28,27,16,15,35,27,4,3,112,81,2,1]},"hexany_trans2":{"title":"Complex 2 of p. 115, a hexany based on 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197-tET","filename":"hexymarv.scl","rnbo":[12,85.27919,0,201.01523,0,268.0203,0,383.75635,0,499.49239,0,584.77157,0,700.50761,0,816.24365,0,883.24873,0,968.52792,0,1084.26396,0,2,1]},"hi19marv":{"title":"inverted smithgw_hahn19 in 1/4 kleismic tempering","filename":"hi19marv.scl","rnbo":[19,46.8425,0,115.58705,0,184.33159,0,8,7,6,5,384.38583,0,431.22833,0,499.97288,0,584.44007,0,615.55993,0,700.02712,0,768.77167,0,815.61417,0,5,3,931.20121,0,999.94576,0,1084.41295,0,40,21,2,1]},"higgs":{"title":"From Greg Higgs announcement of the formation of an Internet Tuning list","filename":"higgs.scl","rnbo":[7,3,2,8,5,21,13,34,21,13,8,5,3,2,1]},"highschool1-rodan":{"title":"12highschool1 tempered in 13-limit POTE-tuned rodan","filename":"highschool1-rodan.scl","rnbo":[12,82.76793,0,206.89283,0,317.25007,0,386.19634,0,496.55359,0,579.32152,0,703.44641,0,813.80366,0,882.74993,0,965.51786,0,1089.64275,0,2,1]},"highschool1":{"title":"First 12-note Highschool 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Vietnam","filename":"ho_mai_nhi.scl","rnbo":[5,11,10,4,3,3,2,33,20,2,1]},"hochgartz":{"title":"Michael Hochgartz, modified 1/5-comma meantone temperament","filename":"hochgartz.scl","rnbo":[12,83.5762,0,195.30749,0,292.96123,0,390.61497,0,502.34626,0,585.92246,0,697.65374,0,788.26871,0,892.96123,0,997.65374,0,15,8,2,1]},"hofmann1":{"title":"Hofmann's Enharmonic #1, Dorian mode","filename":"hofmann1.scl","rnbo":[7,256,255,16,15,4,3,3,2,128,85,8,5,2,1]},"hofmann2":{"title":"Hofmann's Enharmonic #2, Dorian mode","filename":"hofmann2.scl","rnbo":[7,136,135,16,15,4,3,3,2,68,45,8,5,2,1]},"hofmann_chrom":{"title":"Hofmann's Chromatic","filename":"hofmann_chrom.scl","rnbo":[7,100,99,10,9,4,3,3,2,50,33,5,3,2,1]},"holder":{"title":"William Holder's equal beating meantone temperament (1694). 3/2 beats 2.8 Hz","filename":"holder.scl","rnbo":[12,81.473,0,193.586,0,307.401,0,388.267,0,502.671,0,583.932,0,695.768,0,777.526,0,890.009,0,1004.177,0,1085.279,0,2,1]},"holder2":{"title":"Holder's irregular e.b. temperament with improved Eb and G#","filename":"holder2.scl","rnbo":[12,81.473,0,193.586,0,307.401,0,388.267,0,502.671,0,583.932,0,695.768,0,780.479,0,890.009,0,1004.813,0,1085.279,0,2,1]},"honkyoku":{"title":"Honkyoku tuning for shakuhachi","filename":"honkyoku.scl","rnbo":[9,75.0,0,400.0,0,500.0,0,575.0,0,700.0,0,775.0,0,1000.0,0,1075.0,0,2,1]},"horwell22":{"title":"Horwell[22] hobbit in 995-tET tuning","filename":"horwell22.scl","rnbo":[22,42.21106,0,112.1608,0,154.37186,0,231.55779,0,273.76884,0,343.71859,0,385.92965,0,428.1407,0,498.09045,0,540.30151,0,610.25126,0,659.69849,0,701.90955,0,771.8593,0,814.07035,0,884.0201,0,926.23116,0,975.67839,0,1045.62814,0,1087.8392,0,1157.78894,0,2,1]},"hppshq":{"title":"Hedgehog-pajarous-pajara-suprapyth-hedgepig-quasisoup superwakalix","filename":"hppshq.scl","rnbo":[22,56,55,15,14,10,9,9,8,7,6,60,49,5,4,9,7,4,3,135,98,10,7,16,11,3,2,14,9,45,28,5,3,12,7,7,4,90,49,40,21,27,14,2,1]},"hulen_33":{"title":"Peter Hulen's ratiotonic 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This genus is at the limit of usable tunings","filename":"hyper_enh.scl","rnbo":[7,80,79,40,39,4,3,3,2,120,79,20,13,2,1]},"hyper_enh2":{"title":"Hyperenharmonic genus from Kathleen Schlesinger's enharmonic Phrygian Harmonia","filename":"hyper_enh2.scl","rnbo":[7,48,47,24,23,4,3,3,2,72,47,36,23,2,1]},"hypo_chrom":{"title":"Hypolydian Chromatic Tonos","filename":"hypo_chrom.scl","rnbo":[12,20,19,40,37,10,9,4,3,10,7,40,27,20,13,8,5,80,49,5,3,40,23,2,1]},"hypo_diat":{"title":"Hypolydian Diatonic Tonos","filename":"hypo_diat.scl","rnbo":[12,10,9,20,17,5,4,4,3,10,7,40,27,20,13,5,3,40,23,20,11,40,21,2,1]},"hypo_enh":{"title":"Hypolydian Enharmonic Tonos","filename":"hypo_enh.scl","rnbo":[12,40,39,80,77,20,19,4,3,10,7,40,27,20,13,80,51,160,101,8,5,16,9,2,1]},"hypod_chrom":{"title":"Hypodorian Chromatic Tonos","filename":"hypod_chrom.scl","rnbo":[12,16,15,32,29,8,7,16,13,4,3,32,23,16,11,32,21,64,41,8,5,16,9,2,1]},"hypod_chrom2":{"title":"Schlesinger's Chromatic Hypodorian Harmonia","filename":"hypod_chrom2.scl","rnbo":[7,16,15,8,7,4,3,16,11,32,21,8,5,2,1]},"hypod_chrom2inv":{"title":"Inverted Schlesinger's Chromatic Hypodorian Harmonia","filename":"hypod_chrom2inv.scl","rnbo":[7,5,4,21,16,11,8,3,2,7,4,15,8,2,1]},"hypod_chromenh":{"title":"Schlesinger's Hypodorian Harmonia in a mixed chromatic-enharmonic genus","filename":"hypod_chromenh.scl","rnbo":[7,32,31,16,15,4,3,16,11,32,21,8,5,2,1]},"hypod_chrominv":{"title":"A harmonic form of Kathleen Schlesinger's Chromatic Hypodorian Inverted","filename":"hypod_chrominv.scl","rnbo":[7,17,16,9,8,11,8,3,2,25,16,13,8,2,1]},"hypod_diat":{"title":"Hypodorian Diatonic Tonos","filename":"hypod_diat.scl","rnbo":[12,16,15,8,7,16,13,32,25,4,3,32,23,16,11,8,5,32,19,16,9,32,17,2,1]},"hypod_diat2":{"title":"Schlesinger's Hypodorian Harmonia, a subharmonic series through 13 from 16","filename":"hypod_diat2.scl","rnbo":[8,16,15,16,13,4,3,32,23,16,11,8,5,16,9,2,1]},"hypod_diatcon":{"title":"A Hypodorian Diatonic with its own 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Hypolydian Diatonic with its own trite synemmenon replacing paramese","filename":"hypol_diatcon.scl","rnbo":[7,10,9,5,4,4,3,20,13,5,3,20,11,2,1]},"hypol_diatinv":{"title":"Inverted Schlesinger's Hypolydian Harmonia, a harmonic series from 10 from 20","filename":"hypol_diatinv.scl","rnbo":[8,11,10,6,5,13,10,7,5,3,2,8,5,9,5,2,1]},"hypol_enh":{"title":"Schlesinger's Hypolydian Harmonia in the enharmonic genus","filename":"hypol_enh.scl","rnbo":[8,40,39,20,19,4,3,10,7,20,13,8,5,5,3,2,1]},"hypol_enhinv":{"title":"Inverted Schlesinger's Enharmonic Hypolydian Harmonia","filename":"hypol_enhinv.scl","rnbo":[8,5,4,51,40,13,10,7,5,3,2,19,10,39,20,2,1]},"hypol_enhinv2":{"title":"A harmonic form of Schlesinger's Hypolydian enharmonic inverted","filename":"hypol_enhinv2.scl","rnbo":[7,41,40,21,20,13,10,7,5,29,20,3,2,2,1]},"hypol_enhinv3":{"title":"A harmonic form of Schlesinger's Hypolydian enharmonic 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ikosany.scl","filename":"ikosany7.scl","rnbo":[31,36,35,28,27,729,700,16,15,27,25,81,70,7,6,32,27,6,5,243,200,216,175,56,45,729,560,4,3,27,20,112,81,243,175,7,5,36,25,3,2,54,35,14,9,8,5,81,50,224,135,243,140,16,9,9,5,324,175,28,15,2,1]},"indian-ayyar":{"title":"Carnatic sruti system, C.Subrahmanya Ayyar, 1976. alt:21/20 25/16 63/40 40/21","filename":"indian-ayyar.scl","rnbo":[22,25,24,16,15,10,9,9,8,7,6,6,5,5,4,9,7,4,3,11,8,7,5,10,7,3,2,14,9,8,5,5,3,27,16,7,4,9,5,15,8,48,25,2,1]},"indian-dk":{"title":"Raga Darbari Kanada","filename":"indian-dk.scl","rnbo":[9,9,8,7,6,6,5,4,3,3,2,14,9,8,5,16,9,2,1]},"indian-ellis":{"title":"Ellis's Indian Chromatic, theoretical #74 of App.XX, p.517 of Helmholtz","filename":"indian-ellis.scl","rnbo":[22,36,35,18,17,12,11,9,8,36,31,6,5,36,29,9,7,4,3,26,19,52,37,13,9,52,35,26,17,52,33,13,8,52,31,26,15,52,29,13,7,52,27,2,1]},"indian-hahn":{"title":"Indian shrutis Paul Hahn proposal","filename":"indian-hahn.scl","rnbo":[22,25,24,16,15,10,9,9,8,75,64,6,5,5,4,32,25,4,3,27,20,45,32,36,25,3,2,25,16,8,5,5,3,27,16,16,9,9,5,15,8,48,25,2,1]},"indian-hrdaya1":{"title":"From Hrdayakautaka of Hrdaya Narayana (17th c) Bhatkande's interpretation","filename":"indian-hrdaya1.scl","rnbo":[12,27,25,9,8,6,5,54,43,4,3,162,113,3,2,18,11,27,16,9,5,81,43,2,1]},"indian-hrdaya2":{"title":"From Hrdayakautaka of Hrdaya Narayana (17th c) Levy's interpretation","filename":"indian-hrdaya2.scl","rnbo":[12,27,25,9,8,6,5,24,19,4,3,36,25,3,2,18,11,12,7,9,5,36,19,2,1]},"indian-invrot":{"title":"Inverted and rotated North Indian gamut","filename":"indian-invrot.scl","rnbo":[12,128,125,16,15,6,5,5,4,32,25,4,3,3,2,8,5,128,75,15,8,48,25,2,1]},"indian-magrama":{"title":"Indian mode Ma-grama (Sa Ri Ga Ma Pa Dha Ni Sa)","filename":"indian-magrama.scl","rnbo":[7,9,8,5,4,45,32,3,2,27,16,15,8,2,1]},"indian-mystical22":{"title":"Srinivasan Nambirajan, 11-limit shruti scale","filename":"indian-mystical22.scl","rnbo":[23,12,11,11,10,10,9,9,8,8,7,7,6,6,5,11,9,5,4,9,7,4,3,11,8,7,5,10,7,3,2,11,7,8,5,5,3,12,7,7,4,9,5,11,6,2,1]},"indian-newbengali":{"title":"Modern Bengali scale,S.M. Tagore: The mus. scales of the Hindus,Calcutta 1884","filename":"indian-newbengali.scl","rnbo":[22,49.0,0,99.0,0,151.0,0,9,8,259.0,0,6,5,374.0,0,435.0,0,4,3,543.0,0,45,32,637.0,0,685.0,0,736.0,0,787.0,0,841.0,0,896.0,0,952.0,0,1011.0,0,1070.0,0,1135.0,0,2,1]},"indian-old2ellis":{"title":"Ellis Old Indian Chrom2, Helmholtz, p. 517. This is a 4 cent appr. to #73","filename":"indian-old2ellis.scl","rnbo":[22,32,31,17,16,12,11,9,8,7,6,29,24,5,4,31,24,4,3,11,8,17,12,16,11,3,2,17,11,27,17,18,11,27,16,7,4,29,16,15,8,29,15,2,1]},"indian-oldellis":{"title":"Ellis Old Indian Chromatic, Helmholtz, p. 517. This is a 0.5 cent appr. to #73","filename":"indian-oldellis.scl","rnbo":[22,51.0,0,35,33,153.0,0,9,8,264.667,0,325.333,0,5,4,442.0,0,4,3,549.0,0,600.0,0,651.0,0,3,2,753.0,0,35,22,855.0,0,27,16,966.667,0,1027.333,0,15,8,1144.0,0,2,1]},"indian-raja":{"title":"A folk scale from Rajasthan, India","filename":"indian-raja.scl","rnbo":[6,9,8,5,4,4,3,3,2,15,8,2,1]},"indian-sagrama":{"title":"Indian mode Sa-grama (Sa Ri Ga Ma Pa Dha Ni Sa), inverse of Didymus' diatonic","filename":"indian-sagrama.scl","rnbo":[7,9,8,5,4,4,3,3,2,27,16,15,8,2,1]},"indian-sarana":{"title":"26 saranas (shrutis) by Acharekar and Acharya Brihaspati, 1/1=240 or 270 Hz","filename":"indian-sarana.scl","rnbo":[26,25,24,256,243,16,15,800,729,10,9,2560,2187,32,27,6,5,5,4,320,243,4,3,27,20,45,32,40,27,3,2,25,16,128,81,8,5,400,243,5,3,1280,729,16,9,9,5,15,8,160,81,2,1]},"indian-sarana2":{"title":"26 saranas by Vidhyadhar Oak, 1/1=240 Hz","filename":"indian-sarana2.scl","rnbo":[26,256,243,16,15,10,9,9,8,2560,2187,32,27,100,81,5,4,81,64,320,243,4,3,45,32,64,45,40,27,3,2,128,81,8,5,5,3,27,16,1280,729,16,9,50,27,15,8,243,128,160,81,2,1]},"indian-srutiharm":{"title":"B. Chaitanya Deva's sruti harmonium and S. Ramanathan's sruti vina, 1973. B.C. Deva, The Music of India, 1981, p. 109-110","filename":"indian-srutiharm.scl","rnbo":[22,86.57974,0,110.54184,0,191.88995,0,203.20525,0,296.51143,0,312.46762,0,390.11445,0,415.24165,0,512.25493,0,526.34918,0,599.63988,0,621.92119,0,708.28493,0,798.55929,0,826.32309,0,891.95186,0,907.03896,0,1005.57624,0,1026.73211,0,1098.80578,0,1118.85891,0,2,1]},"indian-srutivina":{"title":"Raja S.M. Tagore's sruti vina, measured by Ellis and Hipkins, 1886. 1/1=241.2","filename":"indian-srutivina.scl","rnbo":[22,45.338,0,111.193,0,169.436,0,222.63,0,267.486,0,316.0,0,389.182,0,436.121,0,505.565,0,544.256,0,583.127,0,640.588,0,712.45,0,749.156,0,806.854,0,855.262,0,916.783,0,953.997,0,1012.565,0,1076.939,0,1136.401,0,1219.981,0]},"indian-vina":{"title":"Observed South Indian tuning of a vina, Ellis","filename":"indian-vina.scl","rnbo":[12,97.0,0,195.0,0,312.0,0,397.0,0,515.0,0,596.0,0,692.0,0,782.0,0,883.0,0,997.0,0,1092.0,0,1207.0,0]},"indian-vina2":{"title":"Observed tuning of old vina in Tanjore Palace, Ellis and Hipkins. 1/1=210.7 Hz","filename":"indian-vina2.scl","rnbo":[24,99.0,0,195.0,0,288.0,0,382.0,0,478.0,0,571.0,0,675.0,0,774.0,0,869.0,0,959.0,0,1054.0,0,1148.0,0,1254.0,0,1353.0,0,1444.0,0,1543.0,0,1650.0,0,1741.0,0,1838.0,0,1934.0,0,2032.0,0,2121.0,0,2220.0,0,2324.0,0]},"indian-vina3":{"title":"Tuning of K.S. 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thirds","filename":"johnson_eb.scl","rnbo":[12,71,68,19,17,508,425,5,4,568,425,95,68,127,85,25,16,142,85,152,85,127,68,2,1]},"johnson_ratwell":{"title":"Aaron Johnson, rational well-temperament with five 24/19's","filename":"johnson_ratwell.scl","rnbo":[12,19,18,103,92,32,27,361,288,4,3,38,27,208,139,19,12,129,77,16,9,152,81,2,1]},"johnson_temp":{"title":"Aaron Johnson, temperament with just 5/4, 24/19 and 19/15","filename":"johnson_temp.scl","rnbo":[12,89.64491,0,193.1575,0,293.06616,0,5,4,497.68872,0,588.53494,0,696.57875,0,30,19,889.73625,0,995.37744,0,1087.42497,0,2,1]},"johnston":{"title":"Ben Johnston's combined otonal-utonal scale","filename":"johnston.scl","rnbo":[12,135,128,9,8,135,112,5,4,11,8,45,32,3,2,135,88,27,16,7,4,15,8,2,1]},"johnston_21":{"title":"Johnston 21-note just enharmonic scale","filename":"johnston_21.scl","rnbo":[21,25,24,27,25,9,8,75,64,6,5,5,4,32,25,125,96,4,3,25,18,36,25,3,2,25,16,8,5,5,3,125,72,9,5,15,8,48,25,125,64,2,1]},"johnston_22":{"title":"Johnston 22-note 7-limit scale from end of string quartet nr. 4","filename":"johnston_22.scl","rnbo":[22,28,27,16,15,10,9,8,7,7,6,6,5,5,4,9,7,21,16,27,20,45,32,81,56,3,2,14,9,8,5,5,3,12,7,7,4,9,5,15,8,27,14,2,1]},"johnston_25":{"title":"Johnston 25-note just enharmonic scale","filename":"johnston_25.scl","rnbo":[25,25,24,135,128,16,15,10,9,9,8,75,64,6,5,5,4,81,64,32,25,4,3,27,20,45,32,36,25,3,2,25,16,8,5,5,3,27,16,225,128,16,9,9,5,15,8,48,25,2,1]},"johnston_6-qt":{"title":"11-limit complete system from Ben Johnston's \"6th Quartet\"","filename":"johnston_6-qt.scl","rnbo":[61,225,224,55,54,45,44,28,27,25,24,35,33,15,14,88,81,10,9,9,8,25,22,55,48,225,196,7,6,75,64,32,27,25,21,98,81,40,33,11,9,100,81,5,4,225,176,35,27,55,42,4,3,75,56,110,81,15,11,112,81,25,18,45,32,10,7,35,24,225,154,40,27,121,81,3,2,50,33,55,36,14,9,25,16,128,81,45,28,44,27,5,3,75,44,140,81,225,128,16,9,25,14,20,11,11,6,50,27,225,121,15,8,154,81,40,21,35,18,160,81,2,1]},"johnston_6-qt_row":{"title":"11-limit 'prime row' from Ben Johnston's \"6th Quartet\"","filename":"johnston_6-qt_row.scl","rnbo":[12,25,24,10,9,75,64,5,4,75,56,25,18,55,36,25,16,5,3,75,44,15,8,35,18]},"johnston_81":{"title":"Johnston 81-note 5-limit scale of Sonata for Microtonal Piano","filename":"johnston_81.scl","rnbo":[81,81,80,128,125,250,243,648,625,25,24,256,243,135,128,16,15,2187,2048,27,25,2187,2000,800,729,1125,1024,10,9,9,8,729,640,144,125,125,108,729,625,75,64,32,27,1215,1024,6,5,243,200,625,512,100,81,5,4,81,64,32,25,162,125,125,96,320,243,4,3,27,20,512,375,2187,1600,864,625,25,18,1024,729,45,32,64,45,729,512,36,25,729,500,375,256,40,27,3,2,243,160,192,125,125,81,972,625,25,16,128,81,405,256,8,5,81,50,625,384,6561,4000,400,243,5,3,27,16,128,75,2187,1280,1250,729,216,125,125,72,1280,729,225,128,16,9,3645,2048,9,5,729,400,1875,1024,50,27,15,8,243,128,48,25,243,125,125,64,160,81,2,1]},"jonsson1":{"title":"Magnus Jonsson [1 3 5 7] x [1 3 5 9] cross set (2005)","filename":"jonsson1.scl","rnbo":[12,35,32,9,8,5,4,21,16,45,32,3,2,25,16,27,16,7,4,15,8,63,32,2,1]},"jonsson2":{"title":"Magnus Jonsson [1 3 5] x [1 3 5 7 11] cross set (2005)","filename":"jonsson2.scl","rnbo":[12,33,32,35,32,9,8,5,4,21,16,11,8,3,2,25,16,55,32,7,4,15,8,2,1]},"jorgensen":{"title":"Jorgensen's 5&7 temperament, mix of 7-tET and 5-tET shifted 120 cents","filename":"jorgensen.scl","rnbo":[12,51.42857,0,171.42857,0,291.42857,0,342.85714,0,514.28571,0,531.42857,0,685.71429,0,771.42857,0,857.14286,0,1011.42857,0,1028.57143,0,2,1]},"jousse":{"title":"Temperament of Jean Jousse (1832)","filename":"jousse.scl","rnbo":[12,98.24626,0,196.99609,0,302.15626,0,394.73713,0,500.26147,0,596.29125,0,698.99527,0,800.20126,0,896.30994,0,1001.62588,0,1094.33625,0,2,1]},"jousse2":{"title":"Jean Jousse's quasi-equal piano temperament, also Becket and Co. plan (1840)","filename":"jousse2.scl","rnbo":[12,100.18198,0,199.80564,0,300.21864,0,400.05913,0,500.67839,0,600.71241,0,700.19718,0,800.47804,0,900.19451,0,1000.6958,0,1100.61914,0,2,1]},"jove41":{"title":"Jove[41] 17-limit hobbit in 243-tET, commas 243/242, 441/440, 364/363, 595/594","filename":"jove41.scl","rnbo":[41,34.5679,0,64.19753,0,83.95062,0,118.51852,0,148.14815,0,182.71605,0,202.46914,0,232.09877,0,266.66667,0,286.41975,0,316.04938,0,350.61728,0,380.24691,0,414.81481,0,434.5679,0,469.1358,0,498.76543,0,533.33333,0,553.08642,0,582.71605,0,617.28395,0,646.91358,0,666.66667,0,701.23457,0,730.8642,0,765.4321,0,785.18519,0,819.75309,0,849.38272,0,883.95062,0,913.58025,0,933.33333,0,967.90123,0,997.53086,0,1017.28395,0,1051.85185,0,1081.48148,0,1116.04938,0,1135.80247,0,1165.4321,0,2,1]},"jubilismic10":{"title":"Jubilismic[10] (50/49) hobbit minimax tuning","filename":"jubilismic10.scl","rnbo":[10,101.955,0,222.43019,0,377.56981,0,498.045,0,600.0,0,701.955,0,822.43019,0,977.56981,0,1098.045,0,2,1]},"julius22":{"title":"Julius[22] hobbit (176/175&896/891) in POTE tuning","filename":"julius22.scl","rnbo":[22,59.00334,0,104.60191,0,163.60524,0,209.20382,0,286.19428,0,313.80572,0,390.79618,0,436.39476,0,495.39809,0,540.99666,0,600.0,0,659.00334,0,704.60191,0,763.60524,0,809.20382,0,886.19428,0,913.80572,0,990.79618,0,1036.39476,0,1095.39809,0,1140.99666,0,2,1]},"julius24":{"title":"Julius[24] hobbit (176/175&896/891) in POTE tuning","filename":"julius24.scl","rnbo":[24,59.00334,0,104.60191,0,163.60524,0,209.20382,0,268.20715,0,313.80572,0,331.79285,0,390.79618,0,436.39476,0,495.39809,0,540.99666,0,600.0,0,645.59857,0,704.60191,0,763.60524,0,809.20382,0,868.20715,0,913.80572,0,972.80906,0,990.79618,0,1036.39476,0,1095.39809,0,1140.99666,0,2,1]},"kacapi1":{"title":"kacapi indung tuning, Pelog by Uking Sukri, mean of 6 tunings, W. van Zanten, 1987","filename":"kacapi1.scl","rnbo":[5,412.0,0,510.0,0,717.0,0,1121.0,0,1218.0,0]},"kacapi10":{"title":"kacapi indung tuning, Mandalungan by Uking Sukri, mean of 4 tunings, W. van Zanten, 1987","filename":"kacapi10.scl","rnbo":[5,413.0,0,617.0,0,718.0,0,1122.0,0,1221.0,0]},"kacapi11":{"title":"kacapi indung tuning, Mandalungan by Bakang & others, mean of 2 tunings, W. van Zanten, 1987","filename":"kacapi11.scl","rnbo":[5,394.0,0,598.0,0,715.0,0,1119.0,0,1214.0,0]},"kacapi2":{"title":"kacapi indung tuning, Pelog by Bakang & others, mean of 8 tunings, W. van Zanten, 1987","filename":"kacapi2.scl","rnbo":[5,402.0,0,505.0,0,704.0,0,1115.0,0,1208.0,0]},"kacapi3":{"title":"kacapi indung tuning, Pelog by Sulaeman Danuwijaya, mean of 9 tunings, W. van Zanten, 1987","filename":"kacapi3.scl","rnbo":[5,400.0,0,513.0,0,706.0,0,1115.0,0,1207.0,0]},"kacapi4":{"title":"kacapi indung tuning, Sorog by Uking Sukri, mean of 4 tunings, W. van Zanten, 1987","filename":"kacapi4.scl","rnbo":[5,410.0,0,508.0,0,924.0,0,1120.0,0,1219.0,0]},"kacapi5":{"title":"kacapi indung tuning, Sorog by Bakang & others, mean of 6 tunings, W. van Zanten, 1987","filename":"kacapi5.scl","rnbo":[5,402.0,0,505.0,0,904.0,0,1110.0,0,1210.0,0]},"kacapi6":{"title":"kacapi indung tuning, Salendro by Uking Sukri, mean of 4 tunings, W. van Zanten, 1987","filename":"kacapi6.scl","rnbo":[5,260.0,0,498.0,0,734.0,0,984.0,0,1223.0,0]},"kacapi7":{"title":"kacapi indung tuning, Salendro by Bakang & others, mean of 4 tunings, W. van Zanten, 1987","filename":"kacapi7.scl","rnbo":[5,250.0,0,498.0,0,743.0,0,981.0,0,1206.0,0]},"kacapi8":{"title":"kacapi indung tuning, Mataraman by Uking Sukri, mean of 4 tunings, W. van Zanten, 1987","filename":"kacapi8.scl","rnbo":[5,408.0,0,509.0,0,927.0,0,1037.0,0,1223.0,0]},"kacapi9":{"title":"kacapi indung tuning, Mataraman by Bakang & others, mean of 4 tunings, W. van Zanten, 1987","filename":"kacapi9.scl","rnbo":[5,410.0,0,509.0,0,911.0,0,1004.0,0,1210.0,0]},"kai-metalbar-exp":{"title":"Kaiveran Lugheidh, ditave scale based on the spectrum of an ideal metal bar","filename":"kai-metalbar-exp.scl","rnbo":[7,190.39221,0,329.15908,0,519.55129,0,557.60192,0,870.84092,0,1161.94937,0,2,1]},"kai-metalbar":{"title":"K. Lugheidh, GOT \"tonality diamond\" of a metal bar, 1st overtone = IoE","filename":"kai-metalbar.scl","rnbo":[21,191.29936,0,204.18057,0,278.8611,0,387.03951,0,483.0417,0,578.33887,0,591.2201,0,694.96608,0,782.51944,0,870.0812,0,886.2652,0,973.82751,0,1061.38057,0,1165.12687,0,1178.00808,0,1273.30525,0,1369.30725,0,1477.48582,0,1552.16682,0,1565.04759,0,1756.34695,0]},"kanzelmeyer_11":{"title":"Bruce Kanzelmeyer, 11 harmonics from 16 to 32. Base 388.3614815 Hz","filename":"kanzelmeyer_11.scl","rnbo":[11,17,16,19,16,5,4,11,8,23,16,3,2,13,8,7,4,29,16,31,16,2,1]},"kanzelmeyer_18":{"title":"Bruce Kanzelmeyer, 18 harmonics from 32 to 64. Base 388.3614815 Hz","filename":"kanzelmeyer_18.scl","rnbo":[18,17,16,37,32,19,16,5,4,41,32,43,32,11,8,23,16,47,32,3,2,13,8,53,32,7,4,29,16,59,32,61,32,31,16,2,1]},"kayolonian":{"title":"19-tone 5-limit scale of the Kayenian Imperium on Kayolonia (reeks van Sjauriek)","filename":"kayolonian.scl","rnbo":[19,128,125,16,15,9,8,75,64,6,5,5,4,32,25,4,3,512,375,64,45,3,2,25,16,8,5,5,3,128,75,16,9,15,8,125,64,2,1]},"kayolonian_12":{"title":"See Barnard: De Keiaanse Muziek, p. 11. (uitgebreide reeks)","filename":"kayolonian_12.scl","rnbo":[12,16,15,9,8,6,5,5,4,4,3,3,2,25,16,8,5,5,3,16,9,15,8,2,1]},"kayolonian_40":{"title":"See Barnard: De Keiaanse Muziek","filename":"kayolonian_40.scl","rnbo":[40,128,125,25,24,135,128,16,15,10,9,9,8,256,225,75,64,32,27,6,5,625,512,5,4,81,64,32,25,125,96,4,3,27,20,512,375,25,18,45,32,64,45,36,25,375,256,40,27,3,2,192,125,25,16,128,81,8,5,5,3,27,16,128,75,225,128,16,9,9,5,15,8,256,135,48,25,125,64,2,1]},"kayolonian_f":{"title":"Kayolonian scale F and periodicity block (128/125, 16875/16384)","filename":"kayolonian_f.scl","rnbo":[9,16,15,75,64,5,4,4,3,3,2,8,5,128,75,15,8,2,1]},"kayolonian_p":{"title":"Kayolonian scale P","filename":"kayolonian_p.scl","rnbo":[9,16,15,75,64,5,4,4,3,3,2,8,5,225,128,15,8,2,1]},"kayolonian_s":{"title":"Kayolonian scale S","filename":"kayolonian_s.scl","rnbo":[9,1125,1024,75,64,5,4,5625,4096,3,2,8,5,225,128,15,8,2,1]},"kayolonian_t":{"title":"Kayolonian scale T","filename":"kayolonian_t.scl","rnbo":[9,16,15,256,225,4096,3375,4,3,8192,5625,8,5,128,75,2048,1125,2,1]},"kayolonian_z":{"title":"Kayolonian scale Z","filename":"kayolonian_z.scl","rnbo":[9,16,15,256,225,5,4,4,3,3,2,8,5,128,75,2048,1125,2,1]},"kayoloniana":{"title":"Amendment by Rasch of Kayolonian scale's note 9","filename":"kayoloniana.scl","rnbo":[19,128,125,16,15,9,8,75,64,6,5,5,4,32,25,4,3,45,32,64,45,3,2,25,16,8,5,5,3,128,75,16,9,15,8,125,64,2,1]},"kebyar-b":{"title":"Gamelan kebyar tuning begbeg, Andrew Toth, 1993","filename":"kebyar-b.scl","rnbo":[5,120.0,0,234.0,0,666.0,0,747.0,0,2,1]},"kebyar-s":{"title":"Gamelan kebyar tuning sedung, Andrew Toth, 1993","filename":"kebyar-s.scl","rnbo":[5,136.0,0,291.0,0,670.0,0,804.0,0,2,1]},"kebyar-t":{"title":"Gamelan kebyar tuning tirus, Andrew Toth, 1993","filename":"kebyar-t.scl","rnbo":[5,197.0,0,377.0,0,724.0,0,828.0,0,2,1]},"keemic15":{"title":"Keemic[15] hobbit in minimax tuning","filename":"keemic15.scl","rnbo":[15,59.7214,0,176.9282,0,236.6496,0,321.1168,0,380.8382,0,4,3,557.7664,0,642.2336,0,3,2,819.1618,0,878.8832,0,963.3504,0,1023.0718,0,1140.2786,0,2,1]},"keen1":{"title":"Keenanismic tempering of [5/4, 11/8, 3/2, 12/7, 2], 284-tET tuning","filename":"keen1.scl","rnbo":[5,384.50704,0,549.29577,0,701.40845,0,933.80282,0,2,1]},"keen2":{"title":"Keenanismic tempering of [8/7, 5/4, 11/8, 12/7, 2], 284-tET tuning","filename":"keen2.scl","rnbo":[5,232.39437,0,384.50704,0,549.29577,0,933.80282,0,2,1]},"keen3":{"title":"Keenanismic tempering of [6/5, 11/8, 3/2, 7/4, 2], 284-tET tuning","filename":"keen3.scl","rnbo":[5,316.90141,0,549.29577,0,701.40845,0,967.60563,0,2,1]},"keen4":{"title":"Keenanismic tempering of [12/11, 5/4, 3/2, 12/7, 2], 284-tET tuning","filename":"keen4.scl","rnbo":[5,152.11268,0,384.50704,0,701.40845,0,933.80282,0,2,1]},"keen5":{"title":"Keenanismic tempering of [6/5, 11/8, 3/2, 12/7, 2], 284-tET tuning","filename":"keen5.scl","rnbo":[5,316.90141,0,549.29577,0,701.40845,0,933.80282,0,2,1]},"keen6":{"title":"Keenanismic tempering of [12/11, 5/4, 3/2, 7/4, 2], 284-tET tuning","filename":"keen6.scl","rnbo":[5,152.11268,0,384.50704,0,701.40845,0,967.60563,0,2,1]},"keenan3":{"title":"Chain of 1/6 kleisma tempered 6/5s, 10 tetrads, Dave Keenan, TL 30-Jun-99","filename":"keenan3.scl","rnbo":[11,67.97,0,135.94,0,316.9925,0,384.9625,0,452.9325,0,633.985,0,3,2,769.925,0,950.9775,0,1018.9475,0,2,1]},"keenan3j":{"title":"Chain of 11 nearly just 19-tET minor thirds, Dave Keenan, 1-Jul-99","filename":"keenan3j.scl","rnbo":[11,189.47368,0,252.63158,0,315.78947,0,505.26316,0,568.42105,0,757.89474,0,821.05263,0,884.21053,0,1073.68421,0,1136.84211,0,2,1]},"keenan3rb":{"title":"Chain of 11 equal beating minor thirds, 6/5=3/2 same","filename":"keenan3rb.scl","rnbo":[11,70.67006,0,141.34012,0,317.66751,0,388.33757,0,459.00763,0,635.33503,0,706.00509,0,776.67515,0,953.00254,0,1023.6726,0,2,1]},"keenan3rb2":{"title":"Chain of 11 equal beating minor thirds, 6/5=3/2 opposite","filename":"keenan3rb2.scl","rnbo":[11,66.6179,0,133.23579,0,316.65447,0,383.27237,0,449.89027,0,633.30895,0,699.92685,0,766.54474,0,949.96342,0,1016.58132,0,2,1]},"keenan5":{"title":"11-limit, 31 tones, 9 hexads within 2.7c of just, Dave Keenan 27-Dec-99","filename":"keenan5.scl","rnbo":[31,36.19153216,0,85.39311378,0,115.8026469,0,151.994179,0,201.1957607,0,231.6052938,0,267.7968259,0,316.9984075,0,353.1899397,0,383.5994728,0,432.8010544,0,468.9925866,0,499.4021197,0,548.6037013,0,584.7952335,0,615.2047665,0,651.3962987,0,700.5978803,0,731.0074134,0,767.1989456,0,816.4005272,0,18,11,883.0015925,0,932.2031741,0,968.3947062,0,998.8042393,0,1048.005821,0,1084.197353,0,1114.606886,0,1169.590467,0,2,1]},"keenan6":{"title":"11-limit, 31 tones, 14 hexads within 3.2c of just, Dave Keenan 11-Jan-2000","filename":"keenan6.scl","rnbo":[31,115.9584761,0,151.2176916,0,166.5545447,0,181.3208835,0,201.8137603,0,231.9169522,0,267.1761677,0,317.7722363,0,347.8754282,0,383.1346438,0,418.3938594,0,433.7307124,0,499.0931199,0,549.6891885,0,584.9484041,0,615.0515959,0,650.3108115,0,700.9068801,0,766.2692876,0,781.6061406,0,816.8653562,0,852.1245718,0,882.2277637,0,932.8238323,0,968.0830478,0,998.1862397,0,1018.679116,0,1033.445455,0,1048.782308,0,1084.041524,0,2,1]},"keenan7":{"title":"Dave Keenan, 22 out of 72-tET periodicity block. TL 29-04-2001","filename":"keenan7.scl","rnbo":[22,50.0,0,116.66667,0,166.66667,0,216.66667,0,266.66667,0,316.66667,0,383.33333,0,433.33333,0,500.0,0,550.0,0,600.0,0,650.0,0,700.0,0,766.66667,0,816.66667,0,883.33333,0,933.33333,0,983.33333,0,1033.33333,0,1083.33333,0,1150.0,0,2,1]},"keenan_b19":{"title":"Dave Keenan, planar tempering of vitale3.scl, in 72-tET","filename":"keenan_b19.scl","rnbo":[19,83.33333,0,116.66667,0,200.0,0,266.66667,0,316.66667,0,383.33333,0,433.33333,0,500.0,0,583.33333,0,616.66667,0,700.0,0,783.33333,0,816.66667,0,900.0,0,966.66667,0,1016.66667,0,1083.33333,0,1133.33333,0,2,1]},"keenan_mt":{"title":"Dave Keenan 1/4-comma tempered version of keenan.scl with 6 7-limit tetrads","filename":"keenan_mt.scl","rnbo":[12,117.10786,0,193.15686,0,269.20586,0,5,4,503.42157,0,579.47057,0,696.57843,0,8,5,889.73529,0,965.78428,0,1082.89214,0,2,1]},"keenan_st":{"title":"Dave Keenan, 7-limit temperament, g=260.353, Superpelog","filename":"keenan_st.scl","rnbo":[23,44.94155,0,101.76484,0,158.58813,0,203.52968,0,260.35297,0,317.17626,0,362.11781,0,418.9411,0,463.88265,0,520.70594,0,577.52922,0,622.47078,0,679.29406,0,724.23562,0,781.0589,0,837.88219,0,882.82374,0,939.64703,0,984.58858,0,1041.41187,0,1098.23516,0,1143.17671,0,2,1]},"keenan_t9":{"title":"Dave Keenan strange 9-limit temperament TL 19-11-98","filename":"keenan_t9.scl","rnbo":[12,106.0,0,212.0,0,276.0,0,382.0,0,488.0,0,600.0,0,706.0,0,812.0,0,876.0,0,982.0,0,1088.0,0,2,1]},"keentet":{"title":"The five keenanismic tetrads, plus o- and u-tonal, in 284-tET","filename":"keentet.scl","rnbo":[8,152.11268,0,316.90141,0,384.50704,0,650.70423,0,701.40845,0,933.80282,0,967.60563,0,2,1]},"keesred12_5":{"title":"Kees reduced 5-limit 12-note scale = Hahn reduced","filename":"keesred12_5.scl","rnbo":[12,16,15,9,8,6,5,5,4,4,3,25,18,3,2,8,5,5,3,9,5,15,8,2,1]},"kelletat":{"title":"Herbert Kelletat's Bach-tuning (1966), Ein Beitrag zur musikalischen Temperatur p. 26-27.","filename":"kelletat.scl","rnbo":[12,256,243,196.09,0,32,27,388.26999,0,4,3,1024,729,700.0,0,128,81,892.18,0,16,9,4096,2187,2,1]},"kelletat1":{"title":"Herbert Kelletat's Bach-tuning (1960)","filename":"kelletat1.scl","rnbo":[12,92.18,0,192.18,0,296.09,0,386.31499,0,500.0,0,590.225,0,696.09,0,794.135,0,888.26999,0,998.045,0,1088.26999,0,2,1]},"kellner":{"title":"Herbert Anton Kellner's Bach tuning. 5 1/5 Pyth. comma and 7 pure fifths","filename":"kellner.scl","rnbo":[12,256,243,194.526,0,32,27,389.052,0,4,3,1024,729,697.263,0,128,81,891.789,0,16,9,1091.007,0,2,1]},"kellner_eb":{"title":"Equal beating variant of kellner.scl","filename":"kellner_eb.scl","rnbo":[12,90.225,0,193.30962,0,294.135,0,387.74226,0,498.045,0,588.26999,0,695.60256,0,792.18,0,889.58443,0,996.09,0,1089.69726,0,2,1]},"kellner_org":{"title":"Kellner's original Bach tuning. C-E & C-G beat at identical rates, so B-F# slightly wider than C-G-D-A-E, 7 pure fifths","filename":"kellner_org.scl","rnbo":[12,256,243,194.55682,0,32,27,389.11365,0,4,3,1024,729,697.27841,0,128,81,891.83524,0,16,9,1091.06865,0,2,1]},"kellners":{"title":"Kellner's temperament with 1/5 synt. comma instead of 1/5 Pyth. comma","filename":"kellners.scl","rnbo":[12,91.62051,0,195.30749,0,294.97231,0,390.61497,0,498.3241,0,589.94461,0,697.65374,0,793.29641,0,892.96123,0,996.6482,0,1092.29087,0,2,1]},"kepler1":{"title":"Kepler's Monochord no.1, Harmonices Mundi (1619)","filename":"kepler1.scl","rnbo":[12,135,128,9,8,6,5,5,4,4,3,45,32,3,2,405,256,27,16,9,5,15,8,2,1]},"kepler2":{"title":"Kepler's Monochord no.2","filename":"kepler2.scl","rnbo":[12,135,128,9,8,6,5,5,4,4,3,45,32,3,2,8,5,27,16,9,5,15,8,2,1]},"kepler3":{"title":"Kepler's choice system, Harmonices Mundi, Liber III (1619)","filename":"kepler3.scl","rnbo":[12,135,128,9,8,6,5,5,4,4,3,45,32,3,2,405,256,27,16,9,5,243,128,2,1]},"kilroy":{"title":"Kilroy","filename":"kilroy.scl","rnbo":[12,9,8,6,5,5,4,4,3,45,32,3,2,8,5,5,3,27,16,16,9,15,8,2,1]},"kimball":{"title":"Buzz Kimball 18-note just scale","filename":"kimball.scl","rnbo":[18,25,24,135,128,10,9,9,8,75,64,5,4,81,64,4,3,25,18,45,32,3,2,25,16,5,3,27,16,225,128,16,9,15,8,2,1]},"kimball_53":{"title":"Buzz Kimball 53-note just scale","filename":"kimball_53.scl","rnbo":[53,18,17,17,16,16,15,14,13,13,12,12,11,11,10,17,15,8,7,7,6,20,17,13,11,6,5,17,14,11,9,16,13,5,4,14,11,22,17,13,10,17,13,4,3,11,8,18,13,7,5,24,17,17,12,10,7,13,9,16,11,3,2,26,17,20,13,17,11,11,7,8,5,13,8,18,11,28,17,5,3,22,13,17,10,12,7,7,4,30,17,20,11,11,6,24,13,13,7,15,8,32,17,17,9,2,1]},"kirkwood":{"title":"Scale based on Kirkwood gaps of the asteroid belt","filename":"kirkwood.scl","rnbo":[8,9,8,7,6,5,4,4,3,3,2,5,3,7,4,2,1]},"kirn-stan":{"title":"Kirnberger temperament improved by Charles Earl Stanhope (1806)","filename":"kirn-stan.scl","rnbo":[12,93.60302,0,193.75611,0,297.51302,0,5,4,4,3,591.64802,0,3,2,795.55802,0,888.90861,0,16,9,15,8,2,1]},"kirnberger":{"title":"Kirnberger's well-temperament, also called Kirnberger III, letter to Forkel 1779","filename":"kirnberger.scl","rnbo":[12,256,243,193.15686,0,32,27,5,4,4,3,45,32,696.57843,0,128,81,889.73529,0,16,9,15,8,2,1]},"kirnberger1":{"title":"Kirnberger's temperament 1 (1766)","filename":"kirnberger1.scl","rnbo":[12,256,243,9,8,32,27,5,4,4,3,45,32,3,2,128,81,895.112,0,16,9,15,8,2,1]},"kirnberger2":{"title":"Kirnberger 2: 1/2 synt. comma. \"Die Kunst des reinen Satzes\" (1774)","filename":"kirnberger2.scl","rnbo":[12,135,128,9,8,32,27,5,4,4,3,45,32,3,2,405,256,270,161,16,9,15,8,2,1]},"kirnberger24":{"title":"Kirnberger, 24-tone 7-limit JI scale (ca. 1766)","filename":"kirnberger24.scl","rnbo":[24,28,27,256,243,35,32,9,8,7,6,32,27,315,256,5,4,21,16,4,3,112,81,45,32,35,24,3,2,14,9,128,81,105,64,5,3,7,4,16,9,448,243,15,8,63,32,2,1]},"kirnberger3":{"title":"Kirnberger 3: 1/4 synt. comma (1744)","filename":"kirnberger3.scl","rnbo":[12,135,128,193.15686,0,32,27,5,4,4,3,45,32,696.57843,0,405,256,889.73529,0,16,9,15,8,2,1]},"kirnberger3s":{"title":"Sparschuh's (2010) refined epimoric Kirnberger III variant","filename":"kirnberger3s.scl","rnbo":[12,256,243,161,144,32,27,5,4,4,3,1025,729,323,216,128,81,107,64,16,9,15,8,2,1]},"kirnberger3v":{"title":"Variant well-temperament like Kirnberger 3, Kenneth Scholz, MTO 4.4, 1998","filename":"kirnberger3v.scl","rnbo":[12,135,128,180,161,32,27,5,4,4,3,45,32,160,107,128,81,540,323,16,9,15,8,2,1]},"kirnberger48":{"title":"Kirnberger, 48-tone 7-limit JI scale (ca. 1769)","filename":"kirnberger48.scl","rnbo":[48,28,27,25,24,256,243,135,128,16,15,35,32,10,9,9,8,7,6,75,64,32,27,6,5,315,256,5,4,512,405,81,64,21,16,320,243,675,512,4,3,27,20,112,81,25,18,45,32,64,45,35,24,40,27,3,2,14,9,25,16,128,81,405,256,8,5,105,64,5,3,27,16,7,4,1280,729,225,128,16,9,9,5,448,243,50,27,15,8,256,135,63,32,160,81,2,1]},"kite33":{"title":"33 note 7-limit scale used by Kite Giedraitis to retune Liszt's \"Consolation #3\"","filename":"kite33.scl","rnbo":[33,64,63,200,189,15,14,49,45,10,9,9,8,8,7,25,21,6,5,5,4,80,63,21,16,250,189,4,3,10,7,125,84,3,2,32,21,25,16,100,63,8,5,5,3,320,189,12,7,7,4,1000,567,16,9,25,14,9,5,15,8,40,21,125,63,2,1]},"klais":{"title":"Johannes Klais, Bach temperament. Similar to Kelletat (1960)","filename":"klais.scl","rnbo":[12,256,243,196.09,0,32,27,387.29249,0,4,3,1024,729,700.0,0,128,81,892.18,0,16,9,4096,2187,2,1]},"kleismic34trans":{"title":"Kleismic[34] transversal (detempering)","filename":"kleismic34trans.scl","rnbo":[34,128,125,25,24,16,15,27,25,10,9,9,8,144,125,75,64,6,5,100,81,5,4,32,25,162,125,4,3,27,20,25,18,45,32,36,25,40,27,3,2,125,81,25,16,8,5,81,50,5,3,128,75,125,72,16,9,9,5,50,27,15,8,48,25,125,64,2,1]},"kleismic34transex":{"title":"Comma extended Kleismic[34] transversal","filename":"kleismic34transex.scl","rnbo":[102,15625,15552,1990656,1953125,128,125,250,243,648,625,25,24,390625,373248,82944,78125,16,15,3125,2916,419904,390625,27,25,625,576,3456,3125,10,9,78125,69984,17496,15625,9,8,15625,13824,2239488,1953125,144,125,125,108,729,625,75,64,390625,331776,93312,78125,6,5,3125,2592,768,625,100,81,390625,314928,3888,3125,5,4,78125,62208,497664,390625,32,25,625,486,2519424,1953125,162,125,125,96,20736,15625,4,3,15625,11664,104976,78125,27,20,3125,2304,864,625,25,18,390625,279936,4374,3125,45,32,78125,55296,559872,390625,36,25,625,432,4608,3125,40,27,78125,52488,23328,15625,3,2,15625,10368,192,125,125,81,1953125,1259712,972,625,25,16,390625,248832,124416,78125,8,5,3125,1944,629856,390625,81,50,625,384,5184,3125,5,3,78125,46656,663552,390625,128,75,1250,729,216,125,125,72,1953125,1119744,27648,15625,16,9,15625,8748,139968,78125,9,5,3125,1728,1152,625,50,27,390625,209952,5832,3125,15,8,78125,41472,746496,390625,48,25,625,324,243,125,125,64,1953125,995328,31104,15625,2,1]},"klonaris":{"title":"Johnny Klonaris, 19-limit harmonic scale","filename":"klonaris.scl","rnbo":[12,17,16,9,8,19,16,5,4,21,16,11,8,3,2,25,16,13,8,7,4,15,8,2,1]},"knot":{"title":"Smallest knot in cubic lattice, American Scientist, Nov-Dec '97 p. 506-510, trefoil knot of 24 units long","filename":"knot.scl","rnbo":[24,525,512,15,14,35,32,9,8,8,7,75,64,5,4,4,3,175,128,7,5,45,32,35,24,3,2,25,16,8,5,105,64,5,3,12,7,7,4,225,128,175,96,64,35,15,8,2,1]},"koepf_36":{"title":"Siegfried Koepf, 36-tone subset of 48-tone scale (1991)","filename":"koepf_36.scl","rnbo":[36,69.0,0,86.0,0,100.0,0,169.0,0,186.0,0,200.0,0,269.0,0,286.0,0,300.0,0,369.0,0,386.0,0,400.0,0,469.0,0,486.0,0,500.0,0,569.0,0,586.0,0,600.0,0,669.0,0,686.0,0,700.0,0,769.0,0,786.0,0,800.0,0,869.0,0,886.0,0,900.0,0,969.0,0,986.0,0,1000.0,0,1069.0,0,1086.0,0,1100.0,0,1169.0,0,1186.0,0,2,1]},"koepf_48":{"title":"Siegfried Koepf, 48-tone scale (1991)","filename":"koepf_48.scl","rnbo":[48,51.0,0,69.0,0,86.0,0,100.0,0,151.0,0,169.0,0,186.0,0,200.0,0,251.0,0,269.0,0,286.0,0,300.0,0,351.0,0,369.0,0,386.0,0,400.0,0,451.0,0,469.0,0,486.0,0,500.0,0,551.0,0,569.0,0,586.0,0,600.0,0,651.0,0,669.0,0,686.0,0,700.0,0,751.0,0,769.0,0,786.0,0,800.0,0,851.0,0,869.0,0,886.0,0,900.0,0,951.0,0,969.0,0,986.0,0,1000.0,0,1051.0,0,1069.0,0,1086.0,0,1100.0,0,1151.0,0,1169.0,0,1186.0,0,2,1]},"kolinski":{"title":"Mieczyslaw Kolinski's 7th root of 3/2 (1959), also invented by Augusto Novaro and Serge Cordier (1975)","filename":"kolinski.scl","rnbo":[12,100.27929,0,200.55857,0,300.83786,0,401.11714,0,501.39643,0,601.67572,0,3,2,802.23429,0,902.51357,0,1002.79286,0,1103.07214,0,1203.35143,0]},"konig":{"title":"In 1997 observed temperament of pipes in Niederehe/Eifel by Balthaser König (1715)","filename":"konig.scl","rnbo":[12,80.44999,0,197.654,0,307.82,0,388.66099,0,501.955,0,585.53299,0,700.391,0,782.40499,0,893.744,0,1003.91,0,1092.962,0,2,1]},"kora1":{"title":"Kora tuning Tomora Ba, also called Silaba, 1/1=F, R. King","filename":"kora1.scl","rnbo":[7,200.0,0,385.0,0,500.0,0,700.0,0,900.0,0,1085.0,0,2,1]},"kora2":{"title":"Kora tuning Tomora Mesengo, also called Tomora, 1/1=F, R. King","filename":"kora2.scl","rnbo":[7,230.0,0,325.0,0,500.0,0,700.0,0,930.0,0,1025.0,0,2,1]},"kora3":{"title":"Kora tuning Hardino, 1/1=F, R.King","filename":"kora3.scl","rnbo":[7,185.0,0,405.0,0,500.0,0,700.0,0,885.0,0,1105.0,0,2,1]},"kora4":{"title":"Kora tuning Sauta (Sawta), 1/1=F, R. King","filename":"kora4.scl","rnbo":[7,185.0,0,405.0,0,605.0,0,700.0,0,885.0,0,1105.0,0,2,1]},"korea_5":{"title":"Scale called \"the delightful\" in Korea. Lou Harrison, \"Avalokiteshvara\" (1965) for harp","filename":"korea_5.scl","rnbo":[5,9,8,4,3,3,2,9,5,2,1]},"kornerup":{"title":"Kornerup's regular temperament with fifth of (15 - sqrt 5) / 22 octaves, is golden meantone","filename":"kornerup.scl","rnbo":[19,73.50132,0,118.92763,0,192.42895,0,265.93027,0,311.35658,0,384.8579,0,458.35921,0,503.78553,0,577.28684,0,622.71316,0,696.21447,0,769.71579,0,815.1421,0,888.64342,0,962.14474,0,1007.57105,0,1081.07237,0,1154.57369,0,2,1]},"kornerup_11":{"title":"Kornerup's doric minor","filename":"kornerup_11.scl","rnbo":[11,16,15,10,9,6,5,5,4,4,3,3,2,8,5,5,3,9,5,15,8,2,1]},"koval":{"title":"Ron Koval Variable 1.0 (2002)","filename":"koval.scl","rnbo":[12,98.87,0,199.4,0,299.6,0,398.6,0,500.0,0,598.73,0,699.67,0,799.27,0,899.0,0,999.87,0,1098.5,0,2,1]},"koval2":{"title":"Ron Koval Variable Well 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22-11-2004","filename":"lemba8.scl","rnbo":[8,90.92429,0,139.95064,0,230.87493,0,279.90128,0,370.82557,0,461.74985,0,510.77621,0,601.70049,0]},"leusden":{"title":"Organ in Gereformeerde kerk De Koningshof, Henk van Eeken, 1984, a'=415, modif. 1/4 mean","filename":"leusden.scl","rnbo":[12,89.73529,0,193.15686,0,296.57843,0,5,4,503.42157,0,586.31371,0,696.57843,0,793.15686,0,889.73529,0,1000.0,0,1082.89214,0,2,1]},"levens":{"title":"Charles Levens' Monochord (1743)","filename":"levens.scl","rnbo":[12,16,15,8,7,6,5,24,19,4,3,24,17,3,2,8,5,12,7,16,9,48,25,2,1]},"levens2":{"title":"Levens' Monochord, altered form","filename":"levens2.scl","rnbo":[12,16,15,8,7,6,5,24,19,4,3,24,17,3,2,8,5,32,19,16,9,32,17,2,1]},"ligon":{"title":"Jacky Ligon, strictly proper all prime scale, TL 08-09-2000","filename":"ligon.scl","rnbo":[12,31,29,19,17,13,11,29,23,17,13,7,5,3,2,11,7,5,3,23,13,13,7,2,1]},"ligon10":{"title":"Jacky Ligon, scale from \"Symmetries\" (2011)","filename":"ligon10.scl","rnbo":[19,21,20,15,14,9,8,8,7,7,6,9,7,21,16,4,3,7,5,10,7,3,2,32,21,14,9,12,7,7,4,16,9,28,15,40,21,2,1]},"ligon11":{"title":"Jacky Ligon, 7 tone superparticular non-octave scale","filename":"ligon11.scl","rnbo":[7,20,19,25,19,500,361,10000,6859,200000,130321,250000,130321,5000000,2476099]},"ligon2":{"title":"Jacky Ligon, 19-limit symmetrical non-octave scale (2001)","filename":"ligon2.scl","rnbo":[12,19,18,19,17,19,16,19,15,19,14,19,13,266,169,285,169,304,169,323,169,342,169,361,169]},"ligon3":{"title":"Jacky Ligon, 23-limit non-octave scale (2001)","filename":"ligon3.scl","rnbo":[16,23,22,23,21,23,20,23,19,23,18,30,23,23,16,23,15,368,225,12167,6750,46,25,437,225,92,45,161,75,506,225,529,225]},"ligon4":{"title":"Jacky Ligon, 2/1 Phi Scale, TL 12-04-2001","filename":"ligon4.scl","rnbo":[21,108.204,0,175.078,0,283.282,0,350.155,0,458.359,0,566.563,0,674.767,0,741.641,0,849.845,0,916.718,0,1024.922,0,1091.796,0,2,1,1308.204,0,1416.408,0,1483.282,0,1550.155,0,1658.359,0,1766.563,0,1833.437,0,1941.641,0]},"ligon5":{"title":"Jacky Ligon, scale for \"Two Golden Flutes\" (2001)","filename":"ligon5.scl","rnbo":[16,75.12,0,121.546,0,196.666,0,318.212,0,393.332,0,439.758,0,514.878,0,636.424,0,711.544,0,757.971,0,833.09,0,954.637,0,1029.756,0,1076.183,0,1151.302,0,1272.849,0]},"ligon7":{"title":"Jacky Ligon, superparticular 7 tone 11-limit MOS, 27/22=generator, MMM 22-01-2002","filename":"ligon7.scl","rnbo":[7,9,8,27,22,243,176,729,484,6561,3872,19683,10648,59049,29282]},"ligon8":{"title":"Jacky Ligon, 5 tone superparticular non-octave scale","filename":"ligon8.scl","rnbo":[5,13,12,65,48,845,576,4225,2304,54925,27648]},"ligon9":{"title":"Jacky Ligon, 5 tone superparticular non-octave scale","filename":"ligon9.scl","rnbo":[5,6,5,84,65,504,325,7056,4225,42336,21125]},"lindley-ortgies1":{"title":"Lindley-Ortgies I Bach temperament (2006), Early Music 34/4, Nov. 2006","filename":"lindley-ortgies1.scl","rnbo":[12,96.09,0,198.045,0,298.045,0,396.09,0,500.9775,0,596.09,0,699.0225,0,797.0675,0,897.0675,0,999.0225,0,1096.09,0,2,1]},"lindley-ortgies2":{"title":"Lindley-Ortgies II Bach temperament (2006), Early Music 34/4, Nov. 2006","filename":"lindley-ortgies2.scl","rnbo":[12,94.135,0,196.09,0,296.09,0,392.18,0,496.09,0,592.18,0,698.045,0,796.09,0,894.135,0,16,9,1090.225,0,2,1]},"lindley1":{"title":"Mark Lindley I Bach temperament (1993)","filename":"lindley1.scl","rnbo":[12,93.73361,0,196.38818,0,296.49491,0,392.77635,0,500.53013,0,592.98992,0,698.19409,0,794.4773,0,894.58227,0,998.51252,0,1092.24622,0,2,1]},"lindley2":{"title":"Mark Lindley II Average Neidhardt temperaments (1993)","filename":"lindley2.scl","rnbo":[12,95.1125,0,196.09,0,297.0675,0,393.1575,0,499.0225,0,594.135,0,698.045,0,796.09,0,894.135,0,998.045,0,1094.135,0,2,1]},"lindley_ea":{"title":"Mark Lindley +J. de Boer +W. Drake (1991), for organ Grosvenor Chapel, London","filename":"lindley_ea.scl","rnbo":[12,256,243,196.09,0,32,27,392.18,0,501.955,0,590.225,0,698.045,0,128,81,894.135,0,998.045,0,1090.225,0,2,1]},"lindley_sf":{"title":"Lindley (1988) suggestion nr. 2 for Stanford Fisk organ","filename":"lindley_sf.scl","rnbo":[12,94.135,0,196.09,0,32,27,392.18,0,501.955,0,592.18,0,698.045,0,794.135,0,894.135,0,998.045,0,1090.225,0,2,1]},"line10":{"title":"[0, -2, 0], [0, -1, 0], [0, 0, 0], [0, 1, 0] line of tetrads","filename":"line10.scl","rnbo":[10,21,20,25,21,5,4,21,16,10,7,3,2,5,3,7,4,40,21,2,1]},"line40":{"title":"|11 -10 -10 10> tempered line scale in 2080-tET tuning","filename":"line40.scl","rnbo":[40,8.65385,0,26.53846,0,102.11538,0,120.0,0,128.65385,0,146.53846,0,222.11538,0,240.0,0,248.65385,0,266.53846,0,342.11538,0,360.0,0,368.65385,0,386.53846,0,462.11538,0,480.0,0,488.65385,0,506.53846,0,582.11538,0,600.0,0,608.65385,0,626.53846,0,702.11538,0,720.0,0,728.65385,0,746.53846,0,822.11538,0,840.0,0,848.65385,0,866.53846,0,942.11538,0,960.0,0,968.65385,0,986.53846,0,1062.11538,0,1080.0,0,1088.65385,0,1106.53846,0,1182.11538,0,2,1]},"linemarv12":{"title":"[0, 0, 0] to [0, 0, 5]","filename":"linemarv12.scl","rnbo":[12,115.587047,0,231.174094,0,346.76114,0,384.385833,0,499.97288,0,615.559927,0,700.02712,0,815.614167,0,931.201214,0,968.825906,0,1084.412953,0,2,1]},"liu_major":{"title":"Linus Liu's Major Scale, see his 1978 book, \"Intonation Theory\"","filename":"liu_major.scl","rnbo":[7,10,9,100,81,4,3,3,2,5,3,50,27,2,1]},"liu_mel":{"title":"Linus Liu's Melodic Minor, use 5 and 7 descending and 6 and 8 ascending","filename":"liu_mel.scl","rnbo":[9,10,9,6,5,4,3,3,2,81,50,5,3,9,5,50,27,2,1]},"liu_minor":{"title":"Linus Liu's Harmonic Minor","filename":"liu_minor.scl","rnbo":[7,10,9,6,5,4,3,40,27,8,5,50,27,2,1]},"liu_pent":{"title":"Linus Liu's \"pentatonic scale\"","filename":"liu_pent.scl","rnbo":[7,9,8,81,64,27,20,3,2,27,16,243,128,81,40]},"locomotive":{"title":"A 2.9.11.13 subgroup scale, Gene Ward Smith","filename":"locomotive.scl","rnbo":[12,88,81,9,8,11,9,16,13,11,8,13,9,16,11,13,8,18,11,16,9,81,44,2,1]},"london-baroque":{"title":"Well-temperament used by London Baroque, close to Young","filename":"london-baroque.scl","rnbo":[12,256,243,196.09,0,32,27,394.135,0,4,3,590.225,0,698.045,0,128,81,894.135,0,16,9,1092.18,0,2,1]},"lorenzi-m":{"title":"De Lorenzi's Metrofono (monochord) tuning (1870), Barbieri 2009","filename":"lorenzi-m.scl","rnbo":[12,17,16,37,33,19,16,63,50,295,221,17,12,127,85,65,41,121,72,73,41,32,17,2,1]},"lorenzi":{"title":"Giambattista de Lorenzi, Venetian temperament (c. 1830), Barbieri, 1986","filename":"lorenzi.scl","rnbo":[12,97.55529,0,198.53343,0,299.51156,0,397.06686,0,499.83718,0,597.39248,0,699.26671,0,798.53273,0,897.80014,0,999.67437,0,1097.22967,0,2,1]},"lorina":{"title":"Lorina","filename":"lorina.scl","rnbo":[12,28,27,28,25,7,6,6,5,4,3,4,3,28,19,14,9,7,4,7,4,16,9,2,1]},"lublin":{"title":"Johannes von Lublin (1540) interpr. by Franz Joseph Ratte, p. 255","filename":"lublin.scl","rnbo":[12,85.22372,0,196.955,0,301.09,0,400.865,0,505.0,0,604.77501,0,3,2,787.17872,0,898.91,0,1003.045,0,1102.82,0,2,1]},"lucktenberg":{"title":"George Lucktenberg, general purpose temperament, 1/8P, SEHKS Newsletter vol.26 no.1 (2005)","filename":"lucktenberg.scl","rnbo":[12,99.0225,0,198.045,0,300.0,0,396.09,0,500.9775,0,597.0675,0,699.0225,0,798.045,0,897.0675,0,999.0225,0,1095.1125,0,2,1]},"lucy01and07tuned0b5s":{"title":"0A440Lucy01&07Tuned 0b5s RootKeyA = CC#DD#EFF#GG#AA#B","filename":"lucy01and07tuned0b5s.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,381.97187,0,504.50703,0,572.9578,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1077.46483,0,2,1]},"lucy02and14tuned5b0s":{"title":"0A440Lucy02Tuned 5b0s RootKeyA = CDbDEbEFGbGAbABbB","filename":"lucy02and14tuned5b0s.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,940.56331,0,1009.01407,0,1131.54923,0,2,1]},"lucy03tuned4b1s":{"title":"0A440Lucy03Tuned 4b1s RootKeyA = CDbDEbEFF#GAbAB","filename":"lucy03tuned4b1s.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1131.54923,0,2,1]},"lucy04and21tuned3b2s":{"title":"0A440Lucy04Tuned 3b2s RootKeyA = CC#DEbEFF#GAbAB","filename":"lucy04and21tuned3b2s.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,381.97187,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1131.54923,0,2,1]},"lucy05tuned2b3s":{"title":"0A440Lucy05Tuned 2b3s RootKeyA = CC#DEbEFF#GG#ABbB","filename":"lucy05tuned2b3s.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,381.97187,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1077.46483,0,2,1]},"lucy06tuned1b4s":{"title":"0A440Lucy06Tuned 1b4s RootKeyA = CC#DD#EFF#GG#ABbB","filename":"lucy06tuned1b4s.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,381.97187,0,504.50703,0,572.9578,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1077.46483,0,2,1]},"lucy08tuned0b6s":{"title":"0A440Lucy08Tuned 0b6s RootKeyA = CC#DD#EE#F#GG#AA#B","filename":"lucy08tuned0b6s.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,381.97187,0,504.50703,0,572.9578,0,695.49297,0,763.94373,0,886.4789,0,1009.01407,0,1077.46483,0,2,1]},"lucy09tuned0b7s":{"title":"0A440Lucy09Tuned 0b7s RootKeyA = B#C#DD#EE#F#GG#AA#B","filename":"lucy09tuned0b7s.scl","rnbo":[12,68.45076,0,190.98593,0,259.43669,0,381.97187,0,504.50703,0,572.9578,0,695.49297,0,763.94373,0,886.4789,0,1009.01407,0,1077.46483,0,2,1]},"lucy10tuned0b8s":{"title":"0A440Lucy10Tuned 0b8s RootKeyA = B#C#DD#EE#F#FxG#AA#B","filename":"lucy10tuned0b8s.scl","rnbo":[12,68.45076,0,190.98593,0,259.43669,0,381.97187,0,504.50703,0,572.9578,0,695.49297,0,763.94373,0,886.4789,0,954.92965,0,1077.46483,0,2,1]},"lucy11tuned0b9s":{"title":"0A440Lucy11Tuned 0b9s RootKeyA = B#C#CxD#EE#F#FxG#AA#B","filename":"lucy11tuned0b9s.scl","rnbo":[12,68.45076,0,190.98593,0,259.43669,0,381.97187,0,450.42262,0,572.9578,0,695.49297,0,763.94373,0,886.4789,0,954.92965,0,1077.46483,0,2,1]},"lucy13Gxtuned0b11s":{"title":"0A440Lucy13Tuned 0b11s RootKeyA (resetAtoGx=-54.1) plays B#C#CxD#DxE#F#FxG#GxA#B","filename":"lucy13Gxtuned0b11s.scl","rnbo":[12,68.45076,0,190.98593,0,259.43669,0,381.97187,0,450.42262,0,572.9578,0,641.40855,0,763.94373,0,886.4789,0,954.92965,0,1077.46483,0,2,1]},"lucy15tuned6b0s":{"title":"0A440Lucy15Tuned 6b0s RootKeyA = CDbDEbEFGbGAbABbCb","filename":"lucy15tuned6b0s.scl","rnbo":[12,122.53517,0,245.07034,0,313.5211,0,436.05627,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,940.56331,0,1009.01407,0,1131.54923,0,2,1]},"lucy16tuned7b0s":{"title":"0A440Lucy16Tuned 7b0s RootKeyA = CDbDEbFbFGbGAbABbCb","filename":"lucy16tuned7b0s.scl","rnbo":[12,122.53517,0,245.07034,0,313.5211,0,436.05627,0,504.50703,0,627.0422,0,749.57737,0,818.02813,0,940.56331,0,1009.01407,0,1131.54923,0,2,1]},"lucy18Bbbtuned9b0s":{"title":"0A440Lucy18Tuned 9b0s RootKeyA (resetAtoBbb=+54.1) plays CDbEbbEbFbFGbGAbBbbCb","filename":"lucy18Bbbtuned9b0s.scl","rnbo":[12,122.53517,0,245.07034,0,313.5211,0,436.05627,0,558.59144,0,627.0422,0,749.57737,0,818.02813,0,940.56331,0,1009.01407,0,1131.54923,0,2,1]},"lucy19Bbbtuned10b0s":{"title":"0A440Lucy19Tuned 10b0s RootKeyA (resetAtoBbb=+54.1) plays CDbEbbEbFbFGbAbbAbBbbBbCb","filename":"lucy19Bbbtuned10b0s.scl","rnbo":[12,122.53517,0,245.07034,0,313.5211,0,436.05627,0,558.59144,0,627.0422,0,749.57737,0,818.02813,0,940.56331,0,1063.09848,0,1131.54923,0,2,1]},"lucy20Bbbtuned11b0s":{"title":"0A440Lucy20Tuned 11b0s RootKeyA (resetAtoBbb=+54.1) plays DbbDbEbbEbFbFGbAbbAbBbbCb","filename":"lucy20Bbbtuned11b0s.scl","rnbo":[12,122.53517,0,245.07034,0,367.60551,0,436.05627,0,558.59144,0,627.0422,0,749.57737,0,818.02813,0,940.56331,0,1063.09848,0,1131.54923,0,2,1]},"lucy22tuned4bGs":{"title":"0A440Lucy22Tuned 4bGs RootKeyA = CDbDEbEFGbGG#ABbB","filename":"lucy22tuned4bGs.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,940.56331,0,1009.01407,0,1077.46483,0,2,1]},"lucy23tuned4bDs":{"title":"0A440Lucy23Tuned 4bDs RootKeyA = CDbDD#EFGbGAbABbB","filename":"lucy23tuned4bDs.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,572.9578,0,695.49297,0,818.02813,0,940.56331,0,1009.01407,0,1131.54923,0,2,1]},"lucy24tuned4bCs":{"title":"0A440Lucy24Tuned 4bCs RootKeyA = CC#DEbEFGbGAbABbB","filename":"lucy24tuned4bCs.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,381.97186,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,940.56331,0,1009.01407,0,1131.54923,0,2,1]},"lucy25tunedAb4s":{"title":"0A440Lucy25Tuned Ab4s RootKeyA = CC#DD#EFF#GAbAA#B","filename":"lucy25tunedAb4s.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,381.97187,0,504.50703,0,572.9578,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1131.54923,0,2,1]},"lucy26tunedGb4s":{"title":"0A440Lucy26Tuned Gb4s RootKeyA = CC#DD#EFGbGG#AA#B","filename":"lucy26tunedGb4s.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,381.97187,0,504.50703,0,572.9578,0,695.49297,0,818.02813,0,940.5633,0,1009.01407,0,1077.46483,0,2,1]},"lucy27tunedEb5s":{"title":"0A440Lucy27Tuned Eb4s RootKeyA = CC#DEbEFF#GG#AA#B","filename":"lucy27tunedEb5s.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,381.97187,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1077.46483,0,2,1]},"lucy28tunedDb4s":{"title":"0A440Lucy28Tuned 0b5s RootKeyA = CDbDD#EFF#GG#AA#B","filename":"lucy28tunedDb4s.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,572.9578,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1077.46483,0,2,1]},"lucy29tunedBbAbGbCsDs":{"title":"0A440Lucy29TunedBbAbGbCsDs RootKeyA = CC#DD#EFGbGAbABbB","filename":"lucy29tunedBbAbGbCsDs.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,381.97187,0,504.50703,0,572.9578,0,695.49297,0,818.02813,0,940.56331,0,1009.01407,0,1131.54923,0,2,1]},"lucy30tunedBbEbGbCsGs":{"title":"0A440Lucy30TunedBbEbGbCsGs RootKeyA = CC#DEbEFGbGG#ABbB","filename":"lucy30tunedBbEbGbCsGs.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,381.97187,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,940.56331,0,1009.01407,0,1077.46483,0,2,1]},"lucy31tuned3b2sCsAs":{"title":"0A440Lucy31Tuned 3b2s RootKeyA = CC#DEbEFGbGAbAA#B","filename":"lucy31tuned3b2sCsAs.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,381.97187,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,940.56331,0,1009.01407,0,1131.54923,0,2,1]},"lucy32tuned3b2sDsFs":{"title":"0A440Lucy32Tuned 3b2s RootKeyA = CDbDD#EFF#GAbABbB","filename":"lucy32tuned3b2sDsFs.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,572.9578,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1131.54923,0,2,1]},"lucy33tuned3b2sDsGs":{"title":"0A440Lucy33Tuned 3b2s RootKeyA = CDbDD#EFGbGG#ABbB","filename":"lucy33tuned3b2sDsGs.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,572.9578,0,695.49297,0,818.02813,0,940.56331,0,1009.01407,0,1077.46483,0,2,1]},"lucy34tuned3b2sDsAs":{"title":"0A440Lucy34Tuned 3b2s RootKeyA = CDbDD#EFGbGAbAA#B","filename":"lucy34tuned3b2sDsAs.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,572.9578,0,695.49297,0,818.02813,0,940.56331,0,1009.01407,0,1131.54923,0,2,1]},"lucy35tuned3b2sFsGs":{"title":"0A440Lucy35Tuned 3b2s RootKeyA = CDbDEbEFF#GG#ABbB","filename":"lucy35tuned3b2sFsGs.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1077.46483,0,2,1]},"lucy36tuned3b2sFsAs":{"title":"0A440Lucy36Tuned 3b2s RootKeyA = CDbDEbEFF#GAbAA#B","filename":"lucy36tuned3b2sFsAs.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1131.54923,0,2,1]},"lucy37tuned3b2sGsAs":{"title":"0A440Lucy37Tuned 3b2s RootKeyA = CDbDEbEFGbGG#AA#B","filename":"lucy37tuned3b2sGsAs.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,940.56331,0,1009.01407,0,1077.46483,0,2,1]},"lucy38tuned2b3sDbEb":{"title":"0A440Lucy38Tuned 2b3s RootKeyA = CDbDEbEFF#GG#AA#B","filename":"lucy38tuned2b3sDbEb.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1077.46483,0,2,1]},"lucy39tuned2b3sDbGb":{"title":"0A440Lucy39Tuned 2b3s RootKeyA = CDbDD#EFGbGG#AA#B","filename":"lucy39tuned2b3sDbGb.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,572.9578,0,695.49297,0,818.02813,0,940.5633,0,1009.01407,0,1077.46483,0,2,1]},"lucy40tuned2b3sDbAb":{"title":"0A440Lucy40Tuned 2b3s RootKeyA = CDbDD#EFF#GAbAA#B","filename":"lucy40tuned2b3sDbAb.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,572.9578,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1131.54923,0,2,1]},"lucy41tuned2b3sDbBb":{"title":"0A440Lucy41Tuned 2b3s RootKeyA = CDbDD#EFF#GG#ABbB","filename":"lucy41tuned2b3sDbBb.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,572.9578,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1077.46483,0,2,1]},"lucy42tuned2b3sEbGb":{"title":"0A440Lucy42Tuned 2b3s RootKeyA = CC#DEbEFGbGG#AA#B","filename":"lucy42tuned2b3sEbGb.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,381.97187,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,940.5633,0,1009.01407,0,1077.46483,0,2,1]},"lucy43tuned2b3sEbAb":{"title":"0A440Lucy43Tuned 2b3s RootKeyA = CC#DEbEFF#GAbAA#B","filename":"lucy43tuned2b3sEbAb.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,381.97187,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1131.54923,0,2,1]},"lucy44tuned2b3sGbAb":{"title":"0A440Lucy44Tuned 2b3s RootKeyA = CC#DD#EFGbGAbAA#B","filename":"lucy44tuned2b3sGbAb.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,381.97187,0,504.50703,0,572.9578,0,695.49297,0,818.02813,0,940.5633,0,1009.01407,0,1131.54923,0,2,1]},"lucy45tuned2b3sGbBb":{"title":"0A440Lucy45Tuned 2b3s RootKeyA = CC#DD#EFGbGG#ABbB","filename":"lucy45tuned2b3sGbBb.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,381.97187,0,504.50703,0,572.9578,0,695.49297,0,818.02813,0,940.5633,0,1009.01407,0,1077.46483,0,2,1]},"lucy46tuned2b3sAbBb":{"title":"0A440Lucy46Tuned 2b3s RootKeyA = CC#DD#EFF#GAbABbB","filename":"lucy46tuned2b3sAbBb.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,381.97187,0,504.50703,0,572.9578,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1131.54923,0,2,1]},"lucy50Bbbtuned6b1sFs":{"title":"0A440Lucy50Tuned 6b1s RootKeyA (resetAtoBbb=+54.1) plays CDbDEbEFF#GAbABbCb","filename":"lucy50Bbbtuned6b1sFs.scl","rnbo":[12,122.53517,0,245.07034,0,313.5211,0,436.05627,0,504.50703,0,627.0422,0,749.57737,0,818.02813,0,886.4789,0,1009.01407,0,1131.54923,0,2,1]},"lucy51Bbbtuned3b3sBbEbDbBbbFsGsFx":{"title":"0A440Lucy51Tuned 3b3s RootKeyA (resetAtoBbb=+54.1) plays CDbDEbEFF#FxG#BbbBbB","filename":"lucy51Bbbtuned3b3sBbEbDbBbbFsGsFx.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,886.4789,0,954.92965,0,1077.46483,0,2,1]},"lucy52tuned4b1sAs":{"title":"0A440Lucy52Tuned 4b1s RootKeyA = CDbDEbEFGbGAbAA#B","filename":"lucy52tuned4b1sAs.scl","rnbo":[12,68.45076,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,940.56331,0,1009.01407,0,1131.54923,0,2,1]},"lucy53tuned4b2sCsFCb":{"title":"0A440Lucy53Tuned 4b2s RootKeyA = CC#DEbEFF#GAbABbCb","filename":"lucy53tuned4b2sCsFCb.scl","rnbo":[12,122.53517,0,245.07034,0,313.5211,0,381.97186,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1131.54923,0,2,1]},"lucy55tuned3b3sCxFb":{"title":"0A440Lucy55Tuned 3b3s RootKeyA = CC#CxEbFbFF#GAbABbB","filename":"lucy55tuned3b3sCxFb.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,381.97186,0,450.42262,0,627.0422,0,749.57738,0,818.02813,0,886.4789,0,1009.01407,0,1131.54924,0,2,1]},"lucy56tuned4b3sEs":{"title":"0A440Lucy56Tuned 4b3s RootKeyA = CC#DEbEE#F#GAbABbCb","filename":"lucy56tuned4b3sEs.scl","rnbo":[12,122.53517,0,245.07034,0,313.5211,0,381.97186,0,504.50703,0,627.0422,0,695.49297,0,763.94372,0,886.4789,0,1009.01407,0,1131.54924,0,2,1]},"lucy57tuned7b0sAbbGbb":{"title":"0A440Lucy57Tuned 7b BbEbAbDbGbAbbGbb RootKeyA = CDbDEbEGbbGbAbbAbABbCb","filename":"lucy57tuned7b0sAbbGbb.scl","rnbo":[12,122.53517,0,190.98593,0,313.5211,0,436.05627,0,504.50703,0,627.0422,0,695.49297,0,872.11255,0,940.56331,0,1063.09848,0,1131.54924,0,2,1]},"lucy58tuned5b2sEs":{"title":"0A440Lucy58Tuned 5b2s RootKeyA = CDbDEbEE#F#GAbABbCb","filename":"lucy58tuned5b2sEs.scl","rnbo":[12,122.53517,0,245.07034,0,313.5211,0,436.05627,0,504.50703,0,627.0422,0,695.49297,0,763.94372,0,886.4789,0,1009.01407,0,1131.54924,0,2,1]},"lucy59Bbbtuned9b0sE":{"title":"0A440Lucy59Tuned 9b0s RootKeyA (resetAtoBbb=+54.1) plays CDbEbbEbEFGbAbbAbBbbBbCb","filename":"lucy59Bbbtuned9b0sE.scl","rnbo":[12,122.53517,0,245.07034,0,313.5211,0,436.05627,0,558.59144,0,627.0422,0,695.49297,0,818.02813,0,940.56331,0,1063.09848,0,1131.54923,0,2,1]},"lucy60tuned3b4sEs":{"title":"0A440Lucy60Tuned 3b4s RootKeyA = CDbDEbEE#F#GG#AA#Cb","filename":"lucy60tuned3b4sEs.scl","rnbo":[12,68.45076,0,245.07034,0,313.5211,0,436.05627,0,504.50703,0,627.0422,0,695.49297,0,763.94372,0,886.4789,0,1009.01407,0,1077.46483,0,2,1]},"lucy61Bbbtuned8b1s":{"title":"0A440Lucy61Tuned 8b1s RootKeyA (resetAtoBbb=+54.1) plays CDbEbbEbFbFGbGAbBbbCb","filename":"lucy61Bbbtuned8b1s.scl","rnbo":[12,122.53517,0,245.07034,0,313.5211,0,436.05627,0,558.59144,0,627.0422,0,749.57737,0,818.02814,0,886.4789,0,1009.01407,0,1131.54923,0,2,1]},"lucy62tuned4b3sBbbEs":{"title":"0A440Lucy62Tuned 4b3s RootKeyA = CC#DEbEE#F#GAbABbbCb","filename":"lucy62tuned4b3sBbbEs.scl","rnbo":[12,54.08441,0,245.07034,0,313.5211,0,381.97186,0,504.50703,0,627.0422,0,695.49297,0,763.94372,0,886.4789,0,1009.01407,0,1131.54924,0,2,1]},"lucy63tuned5b0s":{"title":"0A440Lucy63Tuned 5b0s RootKeyA = CDbDEbEFGbGGxABbAx","filename":"lucy63tuned5b0s.scl","rnbo":[12,122.53517,0,136.90152,0,313.5211,0,436.05627,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,940.56331,0,1009.01407,0,1145.91559,0,2,1]},"lucy64tuned7b0snoF":{"title":"0A440Lucy64Tuned 7b0s no F RootKeyA = CDbDEbEFbGbGAbABbCb","filename":"lucy64tuned7b0snoF.scl","rnbo":[12,122.53517,0,245.07034,0,313.5211,0,436.05627,0,504.50703,0,627.0422,0,695.49297,0,749.57738,0,940.56331,0,1009.01407,0,1131.54923,0,2,1]},"lucy65tuned2b3s":{"title":"0A440Lucy65Tuned 2b4s RootKeyA = CC#DEbEFF#GG#ABbA#","filename":"lucy65tuned2b3s.scl","rnbo":[12,68.45076,0,122.53517,0,313.5211,0,381.97187,0,504.50703,0,627.0422,0,695.49297,0,818.02813,0,886.4789,0,1009.01407,0,1077.46483,0,2,1]},"lucy_19":{"title":"Lucy's 19-tone scale","filename":"lucy_19.scl","rnbo":[19,68.451,0,122.535,0,190.986,0,245.07,0,313.521,0,381.972,0,436.056,0,504.507,0,572.958,0,627.042,0,695.493,0,763.944,0,818.028,0,886.479,0,940.563,0,1009.014,0,1077.465,0,1131.549,0,2,1]},"lucy_24":{"title":"Lucy/Harrison, meantone tuning from Bbb to Cx, third=1200.0/pi, 1/1=A","filename":"lucy_24.scl","rnbo":[24,54.08441,0,68.45076,0,122.53517,0,190.98593,0,245.07034,0,259.43669,0,313.5211,0,381.97186,0,436.05627,0,450.42262,0,504.50703,0,572.9578,0,627.0422,0,695.49297,0,749.57738,0,763.94373,0,818.02814,0,886.4789,0,940.56331,0,954.92966,0,1009.01407,0,1077.46483,0,1131.54924,0,2,1]},"lucy_31":{"title":"Lucy/Harrison's meantone tuning, 1/1=A","filename":"lucy_31.scl","rnbo":[31,54.08441,0,68.45076,0,122.53517,0,136.90152,0,190.98593,0,245.07034,0,259.43669,0,313.5211,0,367.60551,0,381.97186,0,436.05627,0,450.42262,0,504.50703,0,558.59144,0,572.9578,0,627.0422,0,641.40856,0,695.49297,0,749.57738,0,763.94373,0,818.02814,0,872.11255,0,886.4789,0,940.56331,0,954.92966,0,1009.01407,0,1063.09848,0,1077.46483,0,1131.54924,0,1145.91559,0,2,1]},"lucy_7":{"title":"Diatonic Lucy's scale","filename":"lucy_7.scl","rnbo":[7,190.986,0,381.972,0,504.507,0,695.493,0,886.479,0,1077.465,0,2,1]},"lumma5":{"title":"Carl Lumma's 5-limit version of lumma7, also Fokker 12-tone just.","filename":"lumma5.scl","rnbo":[12,16,15,9,8,75,64,5,4,4,3,45,32,3,2,8,5,5,3,225,128,15,8,2,1]},"lumma_10":{"title":"Carl Lumma's 10-tone 125 cent Pyth. scale, TL 29-12-1999","filename":"lumma_10.scl","rnbo":[10,125.0,0,250.0,0,375.0,0,500.0,0,625.0,0,700.0,0,825.0,0,950.0,0,1075.0,0,2,1]},"lumma_12_fun":{"title":"Rational well temperament based on 577/289, 3/2, and 19/16","filename":"lumma_12_fun.scl","rnbo":[12,19,18,18464,16473,19,16,361,288,1154,867,361,256,73856,49419,10963,6936,9232,5491,4616,2601,208297,110976,577,289]},"lumma_12_moh-ha-ha":{"title":"Rational well temperament","filename":"lumma_12_moh-ha-ha.scl","rnbo":[12,19,18,323,288,19,16,323,256,171,128,361,256,551,368,19,12,323,192,57,32,513,272,2,1]},"lumma_12_strangeion":{"title":"19-limit \"dodekaphonic\" scale","filename":"lumma_12_strangeion.scl","rnbo":[12,17,16,19,17,19,16,323,256,8192,6137,361,256,6137,4096,512,323,32,19,34,19,32,17,2,1]},"lumma_12p5":{"title":"Well-temperament 1/5Pyth. comma C-G-D A-E-B G#-Eb","filename":"lumma_12p5.scl","rnbo":[12,94.917,0,194.526,0,32,27,393.744,0,4,3,592.962,0,697.263,0,796.872,0,896.481,0,16,9,1091.007,0,2,1]},"lumma_12p6":{"title":"Well-temperament 1/6Pyth. comma C-G-D-A-E-B G#-Eb","filename":"lumma_12p6.scl","rnbo":[12,94.135,0,196.09,0,32,27,392.18,0,4,3,592.18,0,698.045,0,796.09,0,894.135,0,16,9,1090.225,0,2,1]},"lumma_12p7":{"title":"Well-temperament 1/7Pyth. comma F-C-G-D-A-E F#-C#-G#","filename":"lumma_12p7.scl","rnbo":[12,96.92786,0,197.20714,0,297.48643,0,394.41428,0,501.39643,0,598.32428,0,698.60357,0,795.53143,0,895.81071,0,999.44143,0,1096.36928,0,2,1]},"lumma_17":{"title":"Carl Lumma, intervals of attraction, minus inversions, trial and error (1999)","filename":"lumma_17.scl","rnbo":[17,11,10,9,8,7,6,11,9,5,4,9,7,11,8,7,5,3,2,11,7,13,8,5,3,7,4,9,5,11,6,15,8,2,1]},"lumma_22":{"title":"Carl Lumma, intervals of attraction by trial and error (1999)","filename":"lumma_22.scl","rnbo":[22,11,10,9,8,8,7,7,6,6,5,11,9,5,4,9,7,4,3,11,8,7,5,3,2,11,7,8,5,13,8,5,3,12,7,7,4,9,5,11,6,15,8,2,1]},"lumma_5151":{"title":"Carl Lumma's 5151 temperament III (1197/709.5/696), June 2003","filename":"lumma_5151.scl","rnbo":[12,97.5,0,195.0,0,292.5,0,390.0,0,487.5,0,598.5,0,696.0,0,793.5,0,891.0,0,988.5,0,1086.0,0,1197.0,0]},"lumma_al1":{"title":"Alaska I (1197/709.5/696), Carl Lumma, 6 June 2003.","filename":"lumma_al1.scl","rnbo":[12,84.0,0,195.0,0,292.5,0,390.0,0,487.5,0,585.0,0,696.0,0,793.5,0,891.0,0,988.5,0,1086.0,0,1197.0,0]},"lumma_al2":{"title":"Alaska II (1197/707/696.5), Carl Lumma, 6 June 2003.","filename":"lumma_al2.scl","rnbo":[12,87.5,0,196.0,0,294.0,0,392.0,0,490.0,0,588.0,0,696.5,0,794.5,0,892.5,0,990.5,0,1088.5,0,1197.0,0]},"lumma_al3":{"title":"Alaska III (1197/707/696.5), Carl Lumma, 6 June 2003.","filename":"lumma_al3.scl","rnbo":[12,87.5,0,196.0,0,294.0,0,392.0,0,500.5,0,588.0,0,696.5,0,794.5,0,892.5,0,990.5,0,1088.5,0,1197.0,0]},"lumma_al4":{"title":"Alaska IV (1196/701/697), Carl Lumma, 6 June 2003.","filename":"lumma_al4.scl","rnbo":[12,95.0,0,198.0,0,293.0,0,396.0,0,499.0,0,594.0,0,697.0,0,792.0,0,895.0,0,994.0,0,1093.0,0,1196.0,0]},"lumma_al5":{"title":"Alaska V (1197/702/696.375), Carl Lumma, 6 June 2003.","filename":"lumma_al5.scl","rnbo":[12,97.875,0,201.375,0,299.25,0,397.125,0,500.625,0,598.5,0,696.375,0,799.875,0,897.75,0,995.625,0,1099.125,0,1197.0,0]},"lumma_al6":{"title":"Alaska VI (1196/701/696), Carl Lumma, 6 June 2003.","filename":"lumma_al6.scl","rnbo":[12,98.0,0,201.0,0,299.0,0,397.0,0,500.0,0,598.0,0,696.0,0,799.0,0,897.0,0,995.0,0,1098.0,0,1196.0,0]},"lumma_al7":{"title":"Alaska VII, Carl Lumma, 27 Jan 2004","filename":"lumma_al7.scl","rnbo":[12,93.33,0,197.66,0,294.66,0,395.33,0,496.0,0,592.99,0,697.33,0,794.33,0,894.99,0,995.66,0,1092.66,0,1197.0,0]},"lumma_dec1":{"title":"Carl Lumma, two 5-tone 7/4-chains, 5/4 apart in 31-tET, TL 9-2-2000","filename":"lumma_dec1.scl","rnbo":[10,154.83871,0,232.25806,0,387.09677,0,464.51613,0,619.35484,0,696.77419,0,851.6129,0,967.74194,0,1083.87097,0,2,1]},"lumma_dec2":{"title":"Carl Lumma, two 5-tone 3/2-chains, 7/4 apart in 31-tET, TL 9-2-2000","filename":"lumma_dec2.scl","rnbo":[10,154.83871,0,193.54839,0,387.09677,0,464.51613,0,658.06452,0,696.77419,0,890.32258,0,967.74194,0,1161.29032,0,2,1]},"lumma_magic":{"title":"Magic chord test, Carl Lumma, TL 24-06-99","filename":"lumma_magic.scl","rnbo":[12,28,25,8,7,6,5,5,4,4,3,7,5,10,7,8,5,5,3,7,4,25,14,2,1]},"lumma_prism":{"title":"Carl Lumma's 7-limit 12-tone scale, a.k.a GW Smith's Prism. TL 21-11-98","filename":"lumma_prism.scl","rnbo":[12,16,15,28,25,7,6,5,4,4,3,7,5,112,75,8,5,5,3,7,4,28,15,2,1]},"lumma_prismkeen":{"title":"Dave Keenan's adaptation of Prism scale to include 6:8:11, TL 17-04-99","filename":"lumma_prismkeen.scl","rnbo":[12,117.2049,0,198.4364,0,266.3719,0,383.5769,0,500.7818,0,582.0132,0,699.2182,0,816.4231,0,5,3,965.5901,0,1082.795,0,2,1]},"lumma_prismt":{"title":"Tempered Prism scale, 6 tetrads + 4 triads within 2c of Just, TL 19-2-99","filename":"lumma_prismt.scl","rnbo":[12,115.587,0,200.0542,0,268.7988,0,384.3858,0,499.9729,0,584.4401,0,700.0271,0,815.6142,0,5,3,7,4,1084.413,0,2,1]},"lumma_stelhex":{"title":"12-out-of [4 5 6 7] stellated hexany","filename":"lumma_stelhex.scl","rnbo":[12,21,20,7,6,6,5,5,4,21,16,7,5,3,2,8,5,42,25,7,4,9,5,2,1]},"lumma_synchtrines+2":{"title":"The 12-tone equal temperament with 2:3:4 brats of +2","filename":"lumma_synchtrines+2.scl","rnbo":[12,99.78287,0,199.56575,0,299.34862,0,399.1315,0,498.91437,0,598.69725,0,698.48012,0,798.263,0,898.04587,0,997.82875,0,1097.61162,0,1197.3945,0]},"lumma_wt19":{"title":"Carl Lumma, {2 3 17 19} well temperament, TL 13-09-2008","filename":"lumma_wt19.scl","rnbo":[12,1024,969,272,243,384,323,64,51,4,3,24,17,256,171,512,323,256,153,16,9,32,17,2,1]},"luyten":{"title":"Carl Luyten, harpsichord tuning. 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Mersenne/Ban without D#","filename":"majmin.scl","rnbo":[17,25,24,16,15,10,9,9,8,6,5,5,4,4,3,25,18,45,32,3,2,25,16,8,5,5,3,16,9,9,5,15,8,2,1]},"major_clus":{"title":"Chalmers' Major Mode Cluster","filename":"major_clus.scl","rnbo":[12,135,128,10,9,9,8,5,4,4,3,45,32,3,2,5,3,27,16,16,9,15,8,2,1]},"major_wing":{"title":"Chalmers' Major Wing with 7 major and 6 minor triads","filename":"major_wing.scl","rnbo":[12,25,24,9,8,6,5,5,4,4,3,3,2,25,16,8,5,5,3,9,5,15,8,2,1]},"major_wing_lesfip":{"title":"Lesfip version of Chalmers' Major Wing, 7-limit, 15 cents","filename":"major_wing_lesfip.scl","rnbo":[12,75.75851,0,196.98024,0,310.53362,0,387.55657,0,501.78842,0,697.53427,0,774.55722,0,814.47652,0,888.1106,0,1009.33233,0,1085.09084,0,2,1]},"makoyan":{"title":"Makoyan's temperament (1999)","filename":"makoyan.scl","rnbo":[12,93.0,0,196.0,0,293.0,0,391.0,0,500.0,0,594.0,0,699.0,0,789.0,0,891.0,0,996.0,0,1090.0,0,2,1]},"malawi_bangwe":{"title":"Average of 9 observed bangwe tunings, Wim van Zanten, The equidistant heptatonic scale of the asena in Malawi, 1980","filename":"malawi_bangwe.scl","rnbo":[7,173.0,0,348.0,0,522.0,0,696.0,0,873.0,0,1048.0,0,1222.0,0]},"malawi_bangwe1":{"title":"Bangwe Medisoni, 1/1=212 Hz","filename":"malawi_bangwe1.scl","rnbo":[11,61,53,66,53,73,53,82,53,91,53,101,53,112,53,122,53,132,53,144,53,160,53]},"malawi_bangwe2":{"title":"Bangwe Manyindu, 1/1=174 Hz","filename":"malawi_bangwe2.scl","rnbo":[12,63,58,104,87,38,29,253,174,281,174,103,58,172,87,188,87,208,87,76,29,84,29,280,87]},"malawi_bangwe3":{"title":"Bangwe Luwizi A, 1/1=164 Hz","filename":"malawi_bangwe3.scl","rnbo":[10,45,41,207,164,56,41,64,41,69,41,79,41,85,41,377,164,103,41,114,41]},"malawi_bangwe4":{"title":"Bangwe Luwizi B, 1/1=170 Hz","filename":"malawi_bangwe4.scl","rnbo":[10,96,85,106,85,118,85,128,85,142,85,158,85,178,85,196,85,216,85,236,85]},"malawi_bangwe5":{"title":"Bangwe Gasitoni A, 1/1=158 Hz","filename":"malawi_bangwe5.scl","rnbo":[11,82,79,94,79,104,79,114,79,126,79,138,79,152,79,168,79,190,79,212,79,232,79]},"malawi_bangwe6":{"title":"Bangwe Gasitoni B, 1/1=186 Hz","filename":"malawi_bangwe6.scl","rnbo":[12,106,93,115,93,42,31,136,93,154,93,56,31,194,93,72,31,232,93,260,93,284,93,104,31]},"malawi_bangwe7":{"title":"Bangwe Botomani, 1/1=146 Hz","filename":"malawi_bangwe7.scl","rnbo":[8,79,73,88,73,98,73,106,73,118,73,132,73,2,1,162,73]},"malawi_bangwe8":{"title":"Bangwe Topiyasi, 1/1=210 Hz","filename":"malawi_bangwe8.scl","rnbo":[8,116,105,263,210,48,35,158,105,58,35,28,15,72,35,236,105]},"malawi_bangwe9":{"title":"Bangwe Jester, 1/1=202 Hz","filename":"malawi_bangwe9.scl","rnbo":[7,109,101,124,101,138,101,152,101,170,101,186,101,204,101]},"malawi_malimba5":{"title":"Malimba Semba, mano a mbuzi, 1/1=110 Hz, Wim van Zanten, The equidistant heptatonic scale of the asena in Malawi, 1980","filename":"malawi_malimba5.scl","rnbo":[15,179.25315,0,536.95077,0,691.43075,0,852.59206,0,1000.02016,0,1215.66738,0,1379.25315,0,1580.00684,0,1725.37057,0,1901.955,0,2071.72191,0,2243.63037,0,2400.0,0,2579.25315,0,2767.32375,0]},"malawi_valimba":{"title":"Average of 17 observed valimba tunings, Wim van Zanten, The equidistant heptatonic scale of the asena in Malawi, 1980","filename":"malawi_valimba.scl","rnbo":[7,171.0,0,343.0,0,517.0,0,690.0,0,864.0,0,1039.0,0,1213.0,0]},"malco":{"title":"malcolm tempered in malcolm temperament, 94-tET tuning","filename":"malco.scl","rnbo":[12,114.89362,0,204.25532,0,319.14894,0,382.97872,0,497.87234,0,587.23404,0,702.12766,0,817.02128,0,880.85106,0,995.74468,0,1085.10638,0,2,1]},"malcolm":{"title":"Alexander Malcolm's Monochord (1721), and C major in Yamaha synths, Wilkinson: Tuning In","filename":"malcolm.scl","rnbo":[12,16,15,9,8,6,5,5,4,4,3,45,32,3,2,8,5,5,3,16,9,15,8,2,1]},"malcolm2":{"title":"Malcolm 2, differentially coherent","filename":"malcolm2.scl","rnbo":[12,17,16,9,8,19,16,5,4,4,3,17,12,3,2,19,12,5,3,85,48,15,8,2,1]},"malcolm_ap":{"title":"Best approximations in mix of all ETs from 12-23 to Malcolm's Monochord","filename":"malcolm_ap.scl","rnbo":[12,114.286,0,200.0,0,315.789,0,381.818,0,500.0,0,600.0,0,700.0,0,818.182,0,884.211,0,1000.0,0,1085.714,0,2,1]},"malcolm_me":{"title":"Malcolm's Mid-East","filename":"malcolm_me.scl","rnbo":[7,9,8,5,4,11,8,3,2,7,4,15,8,2,1]},"malcolme":{"title":"Most equal interval permutation of Malcolm's Monochord","filename":"malcolme.scl","rnbo":[12,16,15,9,8,6,5,5,4,4,3,64,45,3,2,8,5,5,3,16,9,256,135,2,1]},"malcolme2":{"title":"Inverse most equal interval permutation of Malcolm's Monochord","filename":"malcolme2.scl","rnbo":[12,135,128,9,8,6,5,5,4,4,3,45,32,3,2,8,5,5,3,16,9,15,8,2,1]},"malcolms":{"title":"Symmetrical version of Malcolm's Monochord and Riley's Albion scale. Also proposed by Hindemith in Unterweisung im Tonsatz","filename":"malcolms.scl","rnbo":[12,16,15,9,8,6,5,5,4,4,3,600.0,0,3,2,8,5,5,3,16,9,15,8,2,1]},"malerbi":{"title":"Luigi Malerbi's well-temperament nr.1 (1794) (nr.2 = Young). Also Sievers","filename":"malerbi.scl","rnbo":[12,256,243,194.526,0,32,27,389.052,0,4,3,1024,729,697.263,0,128,81,891.789,0,16,9,4096,2187,2,1]},"malgache":{"title":"tuning from Madagascar","filename":"malgache.scl","rnbo":[12,135,128,9,8,75,64,5,4,27,20,45,32,3,2,405,256,27,16,225,128,15,8,2,1]},"malgache1":{"title":"tuning from Madagascar","filename":"malgache1.scl","rnbo":[12,16,15,9,8,32,27,5,4,27,20,36,25,3,2,8,5,27,16,16,9,15,8,2,1]},"malgache2":{"title":"tuning from Madagascar","filename":"malgache2.scl","rnbo":[12,135,128,9,8,6,5,5,4,27,20,45,32,3,2,25,16,27,16,9,5,15,8,2,1]},"malkauns":{"title":"Raga Malkauns, inverse of prime_5.scl","filename":"malkauns.scl","rnbo":[5,6,5,4,3,8,5,16,9,2,1]},"mambuti":{"title":"African Mambuti Flutes (aerophone; vertical wooden; one note each)","filename":"mambuti.scl","rnbo":[8,204.0,0,411.0,0,710.0,0,1000.0,0,1206.0,0,1409.0,0,1918.0,0,2321.001,0]},"mandela":{"title":"One of the 195 other denizens of the dome of mandala, <14 23 36 40| weakly epimorphic","filename":"mandela.scl","rnbo":[14,25,24,15,14,9,8,8,7,6,5,5,4,9,7,10,7,3,2,5,3,12,7,7,4,15,8,2,1]},"mandelbaum5":{"title":"Mandelbaum's 5-limit 19-tone scale, kleismic detempered circle of minor thirds. Per.bl. 81/80 & 15625/15552","filename":"mandelbaum5.scl","rnbo":[19,25,24,27,25,10,9,125,108,6,5,5,4,125,96,4,3,25,18,36,25,3,2,125,81,8,5,5,3,125,72,9,5,50,27,48,25,2,1]},"mandelbaum7":{"title":"Mandelbaum's 7-limit 19-tone scale","filename":"mandelbaum7.scl","rnbo":[19,25,24,15,14,9,8,7,6,6,5,5,4,9,7,4,3,7,5,36,25,3,2,14,9,8,5,5,3,7,4,9,5,15,8,27,14,2,1]},"mandelbaum7keemun":{"title":"Keemun Fokkerization of mandelbaum7.scl, Gene Ward Smith, TL 8-3-2012","filename":"mandelbaum7keemun.scl","rnbo":[19,25,24,15,14,9,8,7,6,6,5,5,4,9,7,4,3,7,5,36,25,3,2,25,16,8,5,5,3,7,4,9,5,15,8,48,25,2,1]},"mander":{"title":"John Pike Mander's Adlington-Hall organ tuning compiled by A.Sparschuh","filename":"mander.scl","rnbo":[12,78.9165,0,193.15686,0,32,27,5,4,4,3,581.26276,0,696.57843,0,777.28712,0,889.73529,0,16,9,1082.89214,0,2,1]},"marimba1":{"title":"Marimba of the Bakwese, SW Belgian Congo (Zaire). 1/1=140.5 Hz","filename":"marimba1.scl","rnbo":[17,145.0,0,346.0,0,468.0,0,609.0,0,785.0,0,966.0,0,1123.0,0,1279.0,0,1474.0,0,1580.0,0,1772.0,0,1952.0,0,2146.0,0,2344.0,0,2438.0,0,2674.0,0,2780.0,0]},"marimba2":{"title":"Marimba of the Bakubu, S. Belgian Congo (Zaire). 1/1=141.5 Hz","filename":"marimba2.scl","rnbo":[17,112.0,0,338.0,0,469.0,0,646.0,0,826.0,0,972.0,0,1187.0,0,1352.0,0,1476.0,0,1691.0,0,1849.0,0,2033.0,0,2239.0,0,2405.0,0,2557.0,0,2737.0,0,2891.0,0]},"marimba3":{"title":"Marimba from the Yakoma tribe, Zaire. 1/1=185.5 Hz","filename":"marimba3.scl","rnbo":[10,218.0,0,495.0,0,820.0,0,1038.0,0,1185.0,0,1447.0,0,1695.0,0,2020.0,0,2238.0,0,2385.0,0]},"marion":{"title":"scale with two different ET step sizes","filename":"marion.scl","rnbo":[19,53.996,0,107.993,0,161.99,0,215.986,0,269.983,0,323.979,0,377.976,0,431.972,0,485.969,0,539.965,0,593.962,0,647.959,0,3,2,784.963,0,867.97,0,950.978,0,1033.985,0,1116.993,0,2,1]},"marion1":{"title":"Marion's 7-limit Scale # 1","filename":"marion1.scl","rnbo":[24,225,224,25,24,15,14,35,32,9,8,7,6,25,21,5,4,9,7,21,16,75,56,45,32,10,7,35,24,3,2,25,16,45,28,5,3,7,4,25,14,175,96,15,8,63,32,2,1]},"marion10":{"title":"Marion's 7-limit Scale # 10","filename":"marion10.scl","rnbo":[25,49,48,25,24,35,32,10,9,245,216,7,6,175,144,5,4,35,27,49,36,25,18,1225,864,35,24,49,32,14,9,25,16,175,108,5,3,245,144,7,4,49,27,175,96,50,27,35,18,2,1]},"marion15":{"title":"Marion's 7-limit Scale # 15","filename":"marion15.scl","rnbo":[24,36,35,15,14,54,49,8,7,6,5,60,49,5,4,9,7,27,20,48,35,135,98,10,7,72,49,3,2,54,35,8,5,45,28,80,49,12,7,432,245,9,5,90,49,27,14,2,1]},"marissing":{"title":"Peter van Marissing, just scale, Mens en Melodie, 1979","filename":"marissing.scl","rnbo":[12,10,9,9,8,6,5,5,4,4,3,45,32,3,2,5,3,27,16,16,9,15,8,2,1]},"marpurg-1":{"title":"Other temperament by Marpurg, 3 fifths 1/3 Pyth. comma flat","filename":"marpurg-1.scl","rnbo":[12,98.045,0,9,8,301.955,0,400.0,0,4,3,603.91,0,3,2,800.0,0,898.045,0,1003.91,0,1101.955,0,2,1]},"marpurg-a":{"title":"Marpurg's temperament A, 1/12 and 1/6 Pyth. comma","filename":"marpurg-a.scl","rnbo":[12,101.955,0,200.0,0,300.0,0,401.955,0,500.0,0,601.955,0,700.0,0,801.955,0,901.955,0,1000.0,0,1101.955,0,2,1]},"marpurg-b":{"title":"Marpurg's temperament B, 1/12 and 1/6 Pyth. comma","filename":"marpurg-b.scl","rnbo":[12,98.045,0,198.045,0,298.045,0,400.0,0,500.0,0,600.0,0,698.045,0,798.045,0,898.045,0,1000.0,0,1100.0,0,2,1]},"marpurg-c":{"title":"Marpurg's temperament C, 1/12 and 1/6 Pyth. comma","filename":"marpurg-c.scl","rnbo":[12,98.045,0,200.0,0,300.0,0,400.0,0,4,3,600.0,0,700.0,0,800.0,0,898.045,0,1000.0,0,1100.0,0,2,1]},"marpurg-d":{"title":"Marpurg's temperament D, 1/12 and 1/6 Pyth. comma","filename":"marpurg-d.scl","rnbo":[12,98.045,0,198.045,0,300.0,0,398.045,0,4,3,600.0,0,698.045,0,798.045,0,900.0,0,998.045,0,1098.045,0,2,1]},"marpurg-e":{"title":"Marpurg's temperament E, 1/12 and 1/6 Pyth. comma","filename":"marpurg-e.scl","rnbo":[12,100.0,0,201.955,0,301.955,0,401.955,0,501.955,0,601.955,0,700.0,0,800.0,0,900.0,0,1000.0,0,1100.0,0,2,1]},"marpurg-g":{"title":"Marpurg's temperament G, 1/5 Pyth. comma","filename":"marpurg-g.scl","rnbo":[12,99.609,0,199.218,0,298.827,0,398.436,0,4,3,602.346,0,3,2,801.564,0,901.173,0,1000.782,0,1100.391,0,2,1]},"marpurg-t1":{"title":"Marpurg's temperament nr.1, Kirnbergersche Temperatur (1766). Also 12 Indian shrutis","filename":"marpurg-t1.scl","rnbo":[12,256,243,9,8,32,27,5,4,4,3,45,32,3,2,128,81,5,3,16,9,15,8,2,1]},"marpurg-t11":{"title":"Marpurg's temperament nr.11, 6 tempered fifths","filename":"marpurg-t11.scl","rnbo":[12,105.865,0,9,8,301.955,0,81,64,4,3,607.82,0,3,2,803.91,0,27,16,1000.0,0,243,128,2,1]},"marpurg-t12":{"title":"Marpurg's temperament nr.12, 4 tempered fifths","filename":"marpurg-t12.scl","rnbo":[12,16,15,205.865,0,1215,1024,512,405,10935,8192,64,45,703.91,0,8,5,907.82,0,998.045,0,256,135,2,1]},"marpurg-t1a":{"title":"Marpurg's temperament no. 1, 1/12 and 1/6 Pyth. comma","filename":"marpurg-t1a.scl","rnbo":[12,101.955,0,201.955,0,303.91,0,400.0,0,501.955,0,601.955,0,703.91,0,800.0,0,901.955,0,1001.955,0,1103.91,0,2,1]},"marpurg-t2":{"title":"Marpurg's temperament nr.2, 2 tempered fifths, Neue Methode (1790)","filename":"marpurg-t2.scl","rnbo":[12,109.775,0,9,8,313.685,0,81,64,4,3,607.82,0,3,2,811.73,0,27,16,1015.64,0,1105.865,0,2,1]},"marpurg-t2a":{"title":"Marpurg's temperament no. 2, 1/12 and 5/24 Pyth. comma","filename":"marpurg-t2a.scl","rnbo":[12,96.09,0,194.135,0,297.0675,0,400.0,0,496.09,0,594.135,0,697.0675,0,800.0,0,896.09,0,994.135,0,1097.0675,0,2,1]},"marpurg-t3":{"title":"Marpurg's temperament nr.3, 2 tempered fifths","filename":"marpurg-t3.scl","rnbo":[12,96.09,0,9,8,300.0,0,81,64,4,3,594.135,0,3,2,798.045,0,27,16,16,9,1092.18,0,2,1]},"marpurg-t4":{"title":"Marpurg's temperament nr.4, 2 tempered fifths","filename":"marpurg-t4.scl","rnbo":[12,98.045,0,9,8,32,27,81,64,4,3,596.09,0,3,2,800.0,0,905.865,0,996.09,0,1094.135,0,2,1]},"marpurg-t5":{"title":"Marpurg's temperament nr.5, 2 tempered fifths","filename":"marpurg-t5.scl","rnbo":[12,103.91,0,9,8,307.82,0,81,64,4,3,601.955,0,3,2,805.865,0,27,16,1009.775,0,1100.0,0,2,1]},"marpurg-t7":{"title":"Marpurg's temperament nr.7, 3 tempered fifths","filename":"marpurg-t7.scl","rnbo":[12,98.045,0,196.09,0,32,27,400.0,0,498.045,0,596.09,0,694.135,0,800.0,0,898.045,0,996.09,0,1094.135,0,2,1]},"marpurg-t8":{"title":"Marpurg's temperament nr.8, 4 tempered fifths","filename":"marpurg-t8.scl","rnbo":[12,101.955,0,198.045,0,300.0,0,401.955,0,4,3,600.0,0,696.09,0,798.045,0,900.0,0,1001.955,0,1098.045,0,2,1]},"marpurg-t9":{"title":"Marpurg's temperament nr.9, 4 tempered fifths","filename":"marpurg-t9.scl","rnbo":[12,101.955,0,9,8,305.865,0,81,64,503.91,0,605.865,0,3,2,803.91,0,27,16,1007.82,0,243,128,2,1]},"marpurg":{"title":"Marpurg, Versuch über die musikalische Temperatur (1776), p. 153","filename":"marpurg.scl","rnbo":[12,101.955,0,200.9775,0,300.0,0,401.955,0,500.9775,0,600.0,0,3,2,800.9775,0,900.0,0,1001.955,0,1100.9775,0,2,1]},"marpurg1":{"title":"Marpurg's Monochord no.1 (1776)","filename":"marpurg1.scl","rnbo":[12,25,24,9,8,6,5,5,4,4,3,45,32,3,2,25,16,5,3,9,5,15,8,2,1]},"marpurg3":{"title":"Marpurg 3","filename":"marpurg3.scl","rnbo":[12,25,24,9,8,6,5,5,4,4,3,45,32,3,2,25,16,27,16,16,9,15,8,2,1]},"marsh":{"title":"John Marsh's meantone temperament (1809)","filename":"marsh.scl","rnbo":[12,89.5,0,197.0,0,304.5,0,394.0,0,501.5,0,591.0,0,698.5,0,788.0,0,895.5,0,1003.0,0,1092.5,0,2,1]},"marvbiz":{"title":"1/4 kleismic tempered marvel \"byzantine\" scale","filename":"marvbiz.scl","rnbo":[19,21,20,115.58705,0,200.05424,0,268.79879,0,6,5,384.38583,0,431.22833,0,499.97288,0,584.44007,0,615.55993,0,700.02712,0,768.77167,0,815.61417,0,5,3,931.20121,0,999.94576,0,1084.41295,0,40,21,2,1]},"marvel10":{"title":"Marvel[10] hobbit in 197-tET","filename":"marvel10.scl","rnbo":[10,115.73604,0,201.01523,0,383.75635,0,499.49239,0,584.77157,0,700.50761,0,816.24365,0,968.52792,0,1084.26396,0,2,1]},"marvel11":{"title":"Marvel[11] hobbit in 197-tET","filename":"marvel11.scl","rnbo":[11,115.73604,0,231.47208,0,268.0203,0,383.75635,0,499.49239,0,700.50761,0,816.24365,0,931.9797,0,968.52792,0,1084.26396,0,2,1]},"marvel12":{"title":"Marvel[12] hobbit in 197-tET","filename":"marvel12.scl","rnbo":[12,115.73604,0,201.01523,0,316.75127,0,383.75635,0,499.49239,0,584.77157,0,700.50761,0,816.24365,0,931.9797,0,968.52792,0,1084.26396,0,2,1]},"marvel19":{"title":"Marvel[19] hobbit in 197-tET","filename":"marvel19.scl","rnbo":[19,85.27919,0,115.73604,0,201.01523,0,268.0203,0,316.75127,0,383.75635,0,432.48731,0,499.49239,0,584.77157,0,615.22843,0,700.50761,0,767.51269,0,816.24365,0,883.24873,0,931.9797,0,998.98477,0,1084.26396,0,1114.72081,0,2,1]},"marvel19woo":{"title":"Woo tuning of 7-limit 19 note marvel hobbit","filename":"marvel19woo.scl","rnbo":[19,84.46719,0,116.23027,0,200.69746,0,267.51234,0,316.92773,0,383.74261,0,433.158,0,499.97288,0,584.44007,0,616.20315,0,700.67034,0,767.48522,0,816.90061,0,883.71549,0,933.13088,0,999.94576,0,1084.41295,0,1116.17603,0,1200.64322,0]},"marvel22":{"title":"Marvel[22] hobbit in 197-tET","filename":"marvel22.scl","rnbo":[22,48.73096,0,115.73604,0,152.28426,0,201.01523,0,268.0203,0,316.75127,0,383.75635,0,432.48731,0,499.49239,0,548.22335,0,584.77157,0,651.77665,0,700.50761,0,767.51269,0,816.24365,0,883.24873,0,931.9797,0,968.52792,0,1017.25888,0,1084.26396,0,1132.99492,0,2,1]},"marvel22_11":{"title":"Unidecimal Marvel[22] hobbit, minimax tuning, commas 225/224, 385/384, 540/539","filename":"marvel22_11.scl","rnbo":[22,49.20158,0,115.80265,0,151.99418,0,231.60529,0,267.79683,0,316.99841,0,383.59947,0,432.80105,0,499.40212,0,548.6037,0,615.20477,0,651.3963,0,700.59788,0,767.19895,0,816.40053,0,883.00159,0,932.20317,0,998.80424,0,1048.00582,0,1084.19735,0,1163.80847,0,2,1]},"marvel6":{"title":"11-limit marvel tempering of [7/6, 9/7, 10/7, 8/5, 11/6, 2], 166-tET tuning","filename":"marvel6.scl","rnbo":[6,267.46988,0,433.73494,0,614.45783,0,816.86747,0,1048.19277,0,2,1]},"marvel9":{"title":"Marvel[9] hobbit in 197-tET","filename":"marvel9.scl","rnbo":[9,115.73604,0,268.0203,0,383.75635,0,499.49239,0,700.50761,0,816.24365,0,931.9797,0,1084.26396,0,2,1]},"marveldene":{"title":"BlueJI in 197-tET (= Duodene, etc, in 197-tET)","filename":"marveldene.scl","rnbo":[12,115.73604,0,201.01523,0,316.75127,0,383.75635,0,499.49239,0,584.77157,0,700.50761,0,816.24365,0,883.24873,0,1017.25888,0,1084.26396,0,2,1]},"maunder1":{"title":"Richard Maunder Bach temperament I (2005), also Daniel Jencka","filename":"maunder1.scl","rnbo":[12,98.045,0,196.09,0,299.34833,0,392.18,0,501.955,0,596.09,0,698.045,0,798.69667,0,894.135,0,1000.0,0,1094.135,0,2,1]},"maunder2":{"title":"Richard Maunder Bach temperament II (2005)","filename":"maunder2.scl","rnbo":[12,98.045,0,196.09,0,300.0,0,392.18,0,501.955,0,596.09,0,698.045,0,799.0225,0,894.135,0,1000.9775,0,1094.135,0,2,1]},"mavila12":{"title":"A 12-note mavila scale (for warping meantone-based music), 5-limit TOP","filename":"mavila12.scl","rnbo":[12,-30.99719,0,163.5077,0,358.01258,0,327.0154,0,521.52028,0,490.5231,0,685.02798,0,654.0308,0,848.53568,0,1043.04057,0,1012.04338,0,1206.54826,0]},"mavila9":{"title":"Mavila-9 in 5-limit TOP tuning","filename":"mavila9.scl","rnbo":[9,163.5077,0,327.0154,0,358.01258,0,521.52028,0,685.02798,0,848.53568,0,879.53287,0,1043.04057,0,1206.54826,0]},"mavlim1":{"title":"First 27/25&135/128 scale","filename":"mavlim1.scl","rnbo":[9,9,8,6,5,5,4,4,3,3,2,8,5,5,3,16,9,2,1]},"mavsynch16":{"title":"Mavila[16] in meta (brat=-1) tuning, fifth satisfies f^4 + f^3 - 8 = 0","filename":"mavsynch16.scl","rnbo":[16,65.63992,0,152.67431,0,218.31423,0,305.34861,0,370.98854,0,458.02292,0,523.66285,0,610.69723,0,676.33715,0,741.97708,0,829.01146,0,894.65139,0,981.68577,0,1047.32569,0,1134.36007,0,2,1]},"mavsynch7":{"title":"Mavila[7] in meta (brat=-1) tuning, fifth satisfies f^4 + f^3 - 8 = 0","filename":"mavsynch7.scl","rnbo":[7,152.67431,0,370.98854,0,523.66285,0,676.33715,0,829.01146,0,1047.32569,0,2,1]},"max7amarvwoo":{"title":"Marvel woo tempering of [9/8, 5/4, 32/25, 3/2, 8/5, 15/8, 2]","filename":"max7amarvwoo.scl","rnbo":[7,200.69746,0,383.74261,0,433.158,0,700.67034,0,816.90061,0,1084.41295,0,1200.64322,0]},"mbira_banda":{"title":"Mubayiwa Bandambira's tuning of keys R2-R9 from Berliner: The soul of mbira.","filename":"mbira_banda.scl","rnbo":[7,185.0,0,389.0,0,593.0,0,756.0,0,914.0,0,1051.0,0,1302.0,0]},"mbira_banda2":{"title":"Mubayiwa Bandambira's Mbira DzaVadzimu tuning B1=114 Hz","filename":"mbira_banda2.scl","rnbo":[21,355.0,0,554.0,0,650.0,0,829.0,0,982.0,0,1400.0,0,1169.0,0,1850.0,0,1732.0,0,2038.0,0,2207.0,0,2400.001,0,1531.0,0,2415.001,0,2600.001,0,2804.001,0,3008.001,0,3171.001,0,3329.001,0,3466.001,0,3717.001,0]},"mbira_budongo":{"title":"Mbira budongo from Soga. 1/1=328 Hz, Tracey TR-140 A-6","filename":"mbira_budongo.scl","rnbo":[5,199.0,0,477.0,0,717.0,0,926.0,0,2,1]},"mbira_budongo2":{"title":"Mbira budongo from Soga. 1/1=260 Hz, Tracey TR-141 A-1,2","filename":"mbira_budongo2.scl","rnbo":[5,271.0,0,525.0,0,746.0,0,1003.0,0,2,1]},"mbira_chilimba":{"title":"Mbira chilimba from Bemba. 1/1=228 Hz, Tracey TR-182 B-7","filename":"mbira_chilimba.scl","rnbo":[7,173.0,0,355.0,0,520.0,0,692.0,0,866.0,0,1074.0,0,2,1]},"mbira_chisanzhi":{"title":"Mbira chisanzhi from Luchazi. 1/1=256 Hz, Tracey TR-184 B-4,5","filename":"mbira_chisanzhi.scl","rnbo":[6,69,64,5,4,87,64,97,64,53,32,2,1]},"mbira_chisanzhi2":{"title":"Mbira chisanzhi from Lunda. 1/1=212 Hz, Tracey TR-179 B-5,6","filename":"mbira_chisanzhi2.scl","rnbo":[7,58,53,133,106,70,53,76,53,86,53,95,53,2,1]},"mbira_chisanzhi3":{"title":"Mbira chisanzhi from Luba. 1/1=134 Hz, Tracey TR-40 A-4,5,6","filename":"mbira_chisanzhi3.scl","rnbo":[6,195.0,0,491.0,0,794.0,0,889.0,0,1008.0,0,2,1]},"mbira_chisanzhi4":{"title":"Mbira chisanzhi (likembe) from Luba. 1/1=324 Hz, Tracey TR-177 B-3,4","filename":"mbira_chisanzhi4.scl","rnbo":[5,330.0,0,466.0,0,738.0,0,910.0,0,2,1]},"mbira_deza":{"title":"Mbira deza from Valley Tonga. 1/1=192 Hz, Tracey TR-41 A-3","filename":"mbira_deza.scl","rnbo":[7,139.0,0,328.0,0,498.0,0,702.0,0,862.0,0,1050.0,0,2,1]},"mbira_ekembe":{"title":"Mbira ekembe from Binza. 1/1=212 Hz, Tracey TR-128 A-5,6,7,8","filename":"mbira_ekembe.scl","rnbo":[6,185.0,0,506.0,0,734.0,0,858.0,0,973.0,0,2,1]},"mbira_ekembe2":{"title":"Mbira ekembe from Zande/Bandiya. 1/1=220 Hz, Tracey TR-122 B-4,5,6","filename":"mbira_ekembe2.scl","rnbo":[5,179.0,0,490.0,0,670.0,0,852.0,0,2,1]},"mbira_gondo":{"title":"John Gondo's Mbira DzaVadzimu tuning B1=122 Hz","filename":"mbira_gondo.scl","rnbo":[21,323.0,0,480.0,0,644.0,0,830.0,0,981.0,0,1330.0,0,1179.0,0,1888.0,0,1697.0,0,2025.0,0,2189.0,0,2371.001,0,1517.0,0,2390.001,0,2569.001,0,2787.001,0,2923.001,0,3105.001,0,3256.001,0,3417.001,0,3609.001,0]},"mbira_ikembe":{"title":"Mbira ikembe from Rundi/Hangaza. 1/1=300 Hz, Tracey TR-147 B-1,2","filename":"mbira_ikembe.scl","rnbo":[5,353.0,0,480.0,0,755.0,0,978.0,0,2,1]},"mbira_ilimba":{"title":"Mbira ilimba from Gogo. 1/1=268 Hz, Tracey TR-154 B-4-5","filename":"mbira_ilimba.scl","rnbo":[5,195.0,0,370.0,0,710.0,0,950.0,0,2,1]},"mbira_isanzo":{"title":"Mbira isanzo from Zande. 1/1=268 Hz, Tracey TR-121 B-7,8,9,10","filename":"mbira_isanzo.scl","rnbo":[5,148.0,0,349.0,0,658.0,0,889.0,0,2,1]},"mbira_kalimba":{"title":"Mbira kalimba from Tumbuka/Henga. 1/1=182 Hz, Tracey TR-90 B-3","filename":"mbira_kalimba.scl","rnbo":[5,146.0,0,479.0,0,721.0,0,1020.0,0,2,1]},"mbira_kalimba2":{"title":"Mbira kalimba from Nyanja/Chewa. 1/1=296 Hz, Tracey TR-191 B-2,3,4","filename":"mbira_kalimba2.scl","rnbo":[6,338.0,0,503.0,0,748.0,0,822.0,0,1028.0,0,2,1]},"mbira_kalimba3":{"title":"Mbira kalimba from Sena/Nyungwe. 1/1=220 Hz, Tracey TR-91 A-4,5","filename":"mbira_kalimba3.scl","rnbo":[6,208.0,0,392.0,0,691.0,0,890.0,0,1069.0,0,2,1]},"mbira_kangombio":{"title":"Mbira kangombio from Lozi. 1/1=138 Hz, Tracey TR-67 B-4,5","filename":"mbira_kangombio.scl","rnbo":[7,190.0,0,402.0,0,508.0,0,727.0,0,839.0,0,1070.0,0,2,1]},"mbira_kangombio2":{"title":"Mbira kangombio from Lozi. 1/1=226 Hz, Tracey TR-80 A-2,3","filename":"mbira_kangombio2.scl","rnbo":[7,190.0,0,402.0,0,536.0,0,727.0,0,839.0,0,1070.0,0,2,1]},"mbira_kankowela":{"title":"Mbira kankowela from Valley Tonga. 1/1=240 Hz, Tracey TR-41 B-6","filename":"mbira_kankowela.scl","rnbo":[7,11,10,37,30,4,3,89,60,5,3,9,5,2,1]},"mbira_kankowela2":{"title":"Mbira kankowela from Valley Tonga. 1/1=264 Hz, Tracey TR-41 B-7","filename":"mbira_kankowela2.scl","rnbo":[7,73,66,41,33,89,66,3,2,18,11,59,33,2,1]},"mbira_kankowela3":{"title":"Mbira kankowela from Valley Tonga. 1/1=264 Hz, Tracey TR-42 B-2","filename":"mbira_kankowela3.scl","rnbo":[7,37,33,40,33,89,66,50,33,18,11,20,11,2,1]},"mbira_kankowele":{"title":"Mbira kankowele from Lala. 1/1=252 Hz, Tracey TR-14 A-6,7,8,9","filename":"mbira_kankowele.scl","rnbo":[7,182.0,0,391.0,0,456.0,0,674.0,0,851.0,0,965.0,0,2,1]},"mbira_katima":{"title":"Mbira katima. 1/1=364 Hz, Tracey TR-127 B-10","filename":"mbira_katima.scl","rnbo":[5,264.0,0,507.0,0,670.0,0,865.0,0,2,1]},"mbira_kiliyo":{"title":"Mbira kiliyo. 1/1=364 Hz, Tracey TR-127 B=11,12,13","filename":"mbira_kiliyo.scl","rnbo":[5,197.0,0,590.0,0,670.0,0,954.0,0,2,1]},"mbira_kombi":{"title":"Mbira kombi from Yogo. 1/1=224 Hz, Tracey TR-118 B-6,7","filename":"mbira_kombi.scl","rnbo":[5,258.0,0,506.0,0,743.0,0,933.0,0,2,1]},"mbira_kunaka":{"title":"John Kunaka's mbira tuning of keys R2-R9","filename":"mbira_kunaka.scl","rnbo":[7,196.0,0,377.0,0,506.0,0,676.0,0,877.0,0,1050.0,0,1148.0,0]},"mbira_kunaka2":{"title":"John Kunaka's Mbira DzaVadzimu tuning B1=113 Hz","filename":"mbira_kunaka2.scl","rnbo":[21,455.0,0,547.0,0,757.0,0,935.0,0,1089.0,0,1501.0,0,1260.0,0,1972.0,0,1763.0,0,2153.0,0,2317.001,0,2478.001,0,1638.0,0,2464.001,0,2660.001,0,2841.001,0,2970.001,0,3140.001,0,3341.001,0,3514.001,0,3612.001,0]},"mbira_limba":{"title":"Mbira limba from Nyakyusa. 1/1=224 Hz, Tracey TR-158 A-5","filename":"mbira_limba.scl","rnbo":[5,336.0,0,617.0,0,859.0,0,1021.0,0,2,1]},"mbira_malimba":{"title":"Mbira malimba from Nyamwezi. 1/1=244 Hz, Tracey TR-148 A-1,2","filename":"mbira_malimba.scl","rnbo":[7,263.0,0,469.0,0,554.0,0,730.0,0,924.0,0,1052.0,0,2,1]},"mbira_mang_baru":{"title":"Mbira mang 'baru (likembe) from Nande. 1/1=364 Hz, Tracey TR-127 B-9","filename":"mbira_mang_baru.scl","rnbo":[5,264.0,0,507.0,0,670.0,0,818.0,0,2,1]},"mbira_marimbe":{"title":"Mbira marimbe from Zinza. 1/1=166 Hz, Tracey TR-147 A-3,4,5,6","filename":"mbira_marimbe.scl","rnbo":[7,178.0,0,357.0,0,550.0,0,723.0,0,905.0,0,1070.0,0,2,1]},"mbira_mbele_ko_fuku":{"title":"Mbira mbele ko fuku from Yogo. 1/1=280 Hz, Tracey TR-119 A-11,12","filename":"mbira_mbele_ko_fuku.scl","rnbo":[5,274.0,0,529.0,0,719.0,0,904.0,0,2,1]},"mbira_mbira":{"title":"Mbira mbira from Karanga/Duma. 1/1=212 Hz, Tracey TR-80 A-2,3","filename":"mbira_mbira.scl","rnbo":[6,353.0,0,530.0,0,690.0,0,818.0,0,1010.0,0,2,1]},"mbira_muchapata":{"title":"Mbira muchapata from Luvale/Lwena. 1/1=244 Hz, Tracey TR-36 B-1,2","filename":"mbira_muchapata.scl","rnbo":[6,163.0,0,426.0,0,554.0,0,749.0,0,924.0,0,2,1]},"mbira_mude":{"title":"Hakurotwi Mude's Mbira DzaVadzimu tuning B1=132 Hz","filename":"mbira_mude.scl","rnbo":[21,174.0,0,289.0,0,575.0,0,612.0,0,770.0,0,1146.0,0,976.0,0,1678.0,0,1467.0,0,1848.0,0,1987.0,0,2115.0,0,1326.0,0,2117.0,0,2348.001,0,2528.001,0,2646.001,0,2860.001,0,3032.001,0,3205.001,0,3465.001,0]},"mbira_mujuru":{"title":"Ephat Mujuru's Mbira DzaVadzimu tuning, B1=106 Hz","filename":"mbira_mujuru.scl","rnbo":[21,126.0,0,243.0,0,399.0,0,713.0,0,818.0,0,1232.0,0,1082.0,0,1706.0,0,1443.0,0,1858.0,0,1955.0,0,2219.0,0,1371.0,0,2210.0,0,2400.001,0,2556.001,0,2699.001,0,2918.001,0,3069.001,0,3197.001,0,3437.001,0]},"mbira_mumamba":{"title":"Mbira mumamba from Bemba. 1/1=140 Hz, Tracey TR-24 A-1","filename":"mbira_mumamba.scl","rnbo":[7,165.0,0,337.0,0,529.0,0,702.0,0,875.0,0,1018.0,0,2,1]},"mbira_natine":{"title":"Mbira natine and minu from Alur. 1/1=268 Hz, Tracey TR-124 A-5,6","filename":"mbira_natine.scl","rnbo":[5,263.0,0,530.0,0,794.0,0,979.0,0,2,1]},"mbira_neikembe":{"title":"Mbira neikembe from Medje. 1/1=320 Hz, Tracey TR-120 B-1,2","filename":"mbira_neikembe.scl","rnbo":[7,204.0,0,369.0,0,520.0,0,702.0,0,867.0,0,1066.0,0,2,1]},"mbira_sansi":{"title":"Mbira sansi from Nyanja/Chewa. 1/1=202 Hz, Tracey TR-78 A-1","filename":"mbira_sansi.scl","rnbo":[5,240.0,0,463.0,0,730.0,0,922.0,0,2,1]},"mbira_sansi2":{"title":"Mbira sansi from Nyanja/Chewa. 1/1=176 Hz, Tracey TR-191 A-10,11,12","filename":"mbira_sansi2.scl","rnbo":[5,150.0,0,417.0,0,675.0,0,876.0,0,2,1]},"mbira_zimb":{"title":"Shona mbira scale","filename":"mbira_zimb.scl","rnbo":[7,98.0,0,271.0,0,472.0,0,642.0,0,771.0,0,952.0,0,1148.0,0]},"mboko_bow":{"title":"African Mboko Mouth Bow (chordophone, single string, plucked)","filename":"mboko_bow.scl","rnbo":[2,492.0,0,625.0,0]},"mboko_zither":{"title":"African Mboko Zither (chordophone; idiochordic palm fibre, plucked)","filename":"mboko_zither.scl","rnbo":[7,206.0,0,345.0,0,528.0,0,720.0,0,814.0,0,1024.0,0,1166.0,0]},"mcclain":{"title":"McClain's 12-tone scale, see page 119 of The Myth of Invariance","filename":"mcclain.scl","rnbo":[12,135,128,9,8,75,64,5,4,81,64,45,32,3,2,25,16,27,16,15,8,125,64,2,1]},"mcclain_18":{"title":"McClain's 18-tone scale, see page 143 of The Myth of Invariance","filename":"mcclain_18.scl","rnbo":[18,135,128,9,8,75,64,625,512,5,4,81,64,675,512,45,32,375,256,3,2,25,16,405,256,27,16,225,128,15,8,243,128,125,64,2,1]},"mcclain_8":{"title":"McClain's 8-tone scale, see page 51 of The Myth of Invariance","filename":"mcclain_8.scl","rnbo":[8,9,8,5,4,45,32,3,2,25,16,27,16,15,8,2,1]},"mccoskey_22":{"title":"31-limit rational interpretation of 22-tET, Marion McCoskey","filename":"mccoskey_22.scl","rnbo":[22,32,31,16,15,11,10,8,7,7,6,6,5,5,4,9,7,4,3,11,8,7,5,19,13,3,2,14,9,8,5,5,3,12,7,7,4,9,5,15,8,31,16,2,1]},"mcgoogy_phi":{"title":"Brink McGoogy's Phinocchio tuning, mix of 5th (black keys) and 7th (white keys) root of phi","filename":"mcgoogy_phi.scl","rnbo":[18,36.61806,0,119.0129,0,203.23612,0,238.0258,0,357.0387,0,369.85418,0,476.0516,0,536.47224,0,595.0645,0,703.0903,0,714.0774,0,833.0903,0,869.70836,0,952.1032,0,1036.32642,0,1071.1161,0,1190.12899,0,1202.94447,0]},"mcgoogy_phi2":{"title":"Brink McGoogy's Phinocchio tuning with symmetrical \"brinko\"","filename":"mcgoogy_phi2.scl","rnbo":[18,35.70387,0,119.0129,0,202.32193,0,238.0258,0,357.0387,0,368.93999,0,476.0516,0,535.55805,0,595.0645,0,702.17611,0,714.0774,0,833.0903,0,868.79417,0,952.1032,0,1035.41223,0,1071.1161,0,1190.12899,0,1202.03028,0]},"mclaren_bar":{"title":"Metal bar scale. see McLaren, Xenharmonicon 15, pp.31-33","filename":"mclaren_bar.scl","rnbo":[13,128.442,0,191.007,0,264.247,0,378.214,0,394.918,0,520.84,0,555.813,0,642.342,0,724.75,0,759.727,0,885.821,0,1039.735,0,1193.099,0]},"mclaren_cps":{"title":"2)12 [1,2,3,4,5,6,8,9,10,12,14,15] a degenerate CPS","filename":"mclaren_cps.scl","rnbo":[15,135,128,35,32,9,8,75,64,5,4,21,16,45,32,3,2,25,16,105,64,27,16,7,4,15,8,63,32,2,1]},"mclaren_harm":{"title":"from \"Wilson part 9\", claimed to be Schlesingers Dorian Enharmonic, prov. unkn","filename":"mclaren_harm.scl","rnbo":[11,16,15,8,7,64,55,128,109,4,3,16,11,64,43,128,85,32,21,16,9,2,1]},"mclaren_rath1":{"title":"McLaren Rat H1","filename":"mclaren_rath1.scl","rnbo":[12,16,15,8,7,32,25,64,49,4,3,64,45,16,11,64,43,32,21,32,17,64,33,2,1]},"mclaren_rath2":{"title":"McLaren Rat H2","filename":"mclaren_rath2.scl","rnbo":[12,16,15,8,7,32,25,64,49,4,3,16,11,64,43,32,21,32,19,64,37,16,9,2,1]},"mean10":{"title":"3/10-comma meantone scale","filename":"mean10.scl","rnbo":[12,68.5218,0,191.00623,0,313.49066,0,382.01246,0,504.49689,0,573.01868,0,695.50311,0,764.02491,0,886.50934,0,1008.99377,0,1077.51557,0,2,1]},"mean11":{"title":"3/11-comma meantone scale. A.J. Ellis no. 10","filename":"mean11.scl","rnbo":[12,72.62754,0,192.1793,0,311.73105,0,384.3586,0,503.91035,0,576.53789,0,696.08965,0,768.71719,0,888.26895,0,1007.8207,0,1080.44825,0,2,1]},"mean11ls_19":{"title":"Least squares appr. to 3/2, 5/4, 7/6, 15/14 and 11/8, Petr Parízek","filename":"mean11ls_19.scl","rnbo":[19,73.26337,0,119.09759,0,192.36096,0,265.62434,0,311.45855,0,384.72193,0,457.9853,0,503.81952,0,577.08289,0,622.91711,0,696.18048,0,769.44386,0,815.27807,0,888.54145,0,961.80482,0,1007.63904,0,1080.90241,0,1154.16578,0,2,1]},"mean13":{"title":"3/13-comma meantone scale","filename":"mean13.scl","rnbo":[12,78.94408,0,193.98402,0,309.02397,0,387.96804,0,503.00799,0,581.95207,0,696.99201,0,775.93609,0,890.97603,0,1006.01598,0,1084.96005,0,2,1]},"mean14":{"title":"3/14-comma meantone scale (Giordano Riccati, 1762)","filename":"mean14.scl","rnbo":[12,81.42557,0,194.69302,0,307.96047,0,389.38604,0,502.65349,0,584.07906,0,697.34651,0,778.77208,0,892.03953,0,1005.30698,0,1086.73255,0,2,1]},"mean14_15":{"title":"15 of 3/14-comma meantone scale","filename":"mean14_15.scl","rnbo":[15,81.42557,0,113.26745,0,194.69302,0,276.11859,0,307.96047,0,389.38604,0,502.65349,0,584.07906,0,697.34651,0,778.77208,0,810.61396,0,892.03953,0,1005.30698,0,1086.73255,0,2,1]},"mean14_19":{"title":"19 of 3/14-comma meantone scale","filename":"mean14_19.scl","rnbo":[19,81.42557,0,113.26745,0,194.69302,0,276.11859,0,307.96047,0,389.38604,0,470.81161,0,502.65349,0,584.07906,0,615.92094,0,697.34651,0,778.77208,0,810.61396,0,892.03953,0,973.4651,0,1005.30698,0,1086.73255,0,1168.15812,0,2,1]},"mean14_7":{"title":"Least squares appr. of 5L+2S to Ptolemy's Intense Diatonic scale","filename":"mean14_7.scl","rnbo":[7,194.69302,0,389.38604,0,502.65349,0,697.34651,0,892.03953,0,1086.73255,0,2,1]},"mean14a":{"title":"fifth of sqrt(5/2)-1 octave \"recursive\" meantone, Paul Hahn","filename":"mean14a.scl","rnbo":[12,81.5662,0,194.7332,0,307.9002,0,389.4664,0,502.6334,0,584.1996,0,697.3666,0,778.9328,0,892.0998,0,1005.2668,0,1086.833,0,2,1]},"mean16":{"title":"3/16-comma meantone scale","filename":"mean16.scl","rnbo":[12,85.458,0,195.84514,0,306.23229,0,391.69029,0,502.07743,0,587.53543,0,697.92257,0,783.38057,0,893.76771,0,1004.15486,0,1089.61286,0,2,1]},"mean17":{"title":"4/17-comma meantone scale, least squares error of 5/4 and 3/2","filename":"mean17.scl","rnbo":[12,78.26288,0,193.78939,0,309.31591,0,387.57879,0,503.1053,0,581.36818,0,696.8947,0,775.15758,0,890.68409,0,1006.21061,0,1084.47349,0,2,1]},"mean17_17":{"title":"4/17-comma meantone scale with split C#/Db, D#/Eb, F#/Gb, G#/Ab and A#/Bb","filename":"mean17_17.scl","rnbo":[17,78.26288,0,115.52651,0,193.78939,0,272.05228,0,309.31591,0,387.57879,0,503.1053,0,581.36818,0,618.63182,0,696.8947,0,775.15758,0,812.42121,0,890.68409,0,968.94697,0,1006.21061,0,1084.47349,0,2,1]},"mean17_19":{"title":"4/17-comma meantone scale, least squares error of 5/4 and 3/2","filename":"mean17_19.scl","rnbo":[19,78.26288,0,115.52651,0,193.78939,0,272.05228,0,309.31591,0,387.57879,0,465.84167,0,503.1053,0,581.36818,0,618.63182,0,696.8947,0,775.15758,0,812.42121,0,890.68409,0,968.94697,0,1006.21061,0,1084.47349,0,1162.73637,0,2,1]},"mean18":{"title":"5/18-comma meantone scale (Smith). 3/2 and 5/3 eq. beat. A.J. Ellis no. 9","filename":"mean18.scl","rnbo":[12,71.86722,0,191.96206,0,312.05691,0,383.92413,0,504.01897,0,575.88619,0,695.98103,0,767.84825,0,887.94309,0,1008.03794,0,1079.90516,0,2,1]},"mean19":{"title":"5/19-comma meantone scale, fifths beats three times third. A.J. Ellis no. 11","filename":"mean19.scl","rnbo":[12,74.06816,0,192.5909,0,311.11365,0,385.1818,0,503.70455,0,577.77271,0,696.29545,0,770.36361,0,888.88635,0,1007.4091,0,1081.47725,0,2,1]},"mean19r":{"title":"Approximate 5/19-comma meantone with 19/17 tone, Petr Parizek (2002)","filename":"mean19r.scl","rnbo":[12,73.95162,0,19,17,311.16359,0,361,289,503.7212,0,6859,4913,696.2788,0,130321,83521,888.83641,0,34,19,1081.39402,0,2,1]},"mean19t":{"title":"Approximate 5/19-comma meantone with three 7/6 minor thirds","filename":"mean19t.scl","rnbo":[12,74.23293,0,192.63798,0,311.04303,0,385.27596,0,503.68101,0,577.91394,0,696.31899,0,770.55192,0,888.95697,0,1007.36202,0,1081.59495,0,2,1]},"mean23":{"title":"5/23-comma meantone scale, A.J. Ellis no. 4","filename":"mean23.scl","rnbo":[12,80.95804,0,194.55944,0,308.16084,0,389.11888,0,502.72028,0,583.67832,0,697.27972,0,778.23776,0,891.83916,0,1005.44056,0,1086.3986,0,2,1]},"mean23six":{"title":"6/23-comma meantone scale","filename":"mean23six.scl","rnbo":[12,74.41265,0,192.68933,0,310.96601,0,385.37866,0,503.65534,0,578.06799,0,696.34466,0,770.75732,0,889.03399,0,1007.31067,0,1081.72332,0,2,1]},"mean24rat":{"title":"Meantone[24] in a rational tuning with brats of 4","filename":"mean24rat.scl","rnbo":[24,3287219,3225600,1121,1050,449272979,412876800,3527,3150,459763,403200,1882,1575,62841811,51609600,64307,50400,2863099537,2202009600,421,315,585917,430080,257,180,133478939,91750400,2356,1575,245879,161280,2516,1575,168032819,103219200,527,315,171923,100800,2816,1575,23501171,12902400,8017,4200,458892629,235929600,2,1]},"mean25":{"title":"7/25-comma meantone scale, least square weights 3/2:0 5/4:1 6/5:1","filename":"mean25.scl","rnbo":[12,71.53268,0,191.86648,0,312.20028,0,383.73296,0,504.06676,0,575.59944,0,695.93324,0,767.46592,0,887.79972,0,1008.13352,0,1079.6662,0,2,1]},"mean26":{"title":"7/26-comma meantone scale (Woolhouse 1835). Almost equal to meaneb742.scl","filename":"mean26.scl","rnbo":[12,73.15392,0,192.32969,0,311.50546,0,384.65938,0,503.83515,0,576.98908,0,696.16485,0,769.31877,0,888.49454,0,1007.67031,0,1080.82423,0,2,1]},"mean26_21":{"title":"21 of 7/26-comma meantone scale (Woolhouse 1835)","filename":"mean26_21.scl","rnbo":[21,73.15395,0,119.17575,0,192.3297,0,265.48365,0,311.50545,0,384.6594,0,430.6812,0,457.81335,0,503.83515,0,576.9891,0,623.0109,0,696.16485,0,769.3188,0,815.3406,0,888.49455,0,961.6485,0,1007.6703,0,1080.82425,0,1126.84605,0,1153.9782,0,2,1]},"mean27":{"title":"7/27-comma meantone scale, least square weights 3/2:2 5/4:1 6/5:1","filename":"mean27.scl","rnbo":[12,74.65507,0,192.75859,0,310.86211,0,385.51718,0,503.6207,0,578.27578,0,696.3793,0,771.03437,0,889.13789,0,1007.24141,0,1081.89648,0,2,1]},"mean29":{"title":"7/29-comma meantone scale, least square weights 3/2:4 5/4:1 6/5:1","filename":"mean29.scl","rnbo":[12,77.34679,0,193.52766,0,309.70852,0,387.05531,0,503.23617,0,580.58297,0,696.76383,0,774.11062,0,890.29148,0,1006.47234,0,1083.81914,0,2,1]},"mean2nine":{"title":"2/9-comma meantone scale, Lemme Rossi, Sistema musico (1666)","filename":"mean2nine.scl","rnbo":[12,80.231,0,194.352,0,75,64,388.703,0,502.824,0,583.055,0,697.176,0,777.407,0,891.528,0,1005.648,0,1085.879,0,2,1]},"mean2nine_15":{"title":"15 of 2/9-comma meantone scale","filename":"mean2nine_15.scl","rnbo":[15,80.231,0,114.121,0,194.352,0,75,64,308.473,0,388.703,0,502.824,0,583.055,0,697.176,0,777.407,0,811.297,0,891.528,0,1005.648,0,1085.879,0,2,1]},"mean2nine_19":{"title":"19 of 2/9-comma meantone scale","filename":"mean2nine_19.scl","rnbo":[19,80.231,0,114.121,0,194.352,0,75,64,308.473,0,388.703,0,468.934,0,502.824,0,583.055,0,616.945,0,697.176,0,777.407,0,811.297,0,891.528,0,971.758,0,1005.648,0,1085.879,0,1166.11,0,2,1]},"mean2nine_31":{"title":"31 of 2/9-comma meantone scale","filename":"mean2nine_31.scl","rnbo":[31,46.341,0,80.231,0,114.121,0,160.462,0,194.352,0,228.242,0,75,64,308.473,0,354.813,0,388.703,0,422.593,0,468.934,0,502.824,0,5625,4096,583.055,0,616.945,0,663.286,0,697.176,0,743.517,0,777.407,0,811.297,0,857.637,0,891.527,0,128,75,971.758,0,1005.648,0,1051.989,0,1085.879,0,1119.769,0,1166.11,0,2,1]},"mean2sev":{"title":"2/7-comma meantone scale. Zarlino's temperament (1558). See also meaneb371","filename":"mean2sev.scl","rnbo":[12,25,24,191.62069,0,312.56896,0,383.24139,0,504.18965,0,574.86208,0,695.81035,0,766.48277,0,887.43104,0,1008.37931,0,1079.05173,0,2,1]},"mean2sev10":{"title":"2/17-comma meantone scale","filename":"mean2sev10.scl","rnbo":[12,95.97394,0,198.8497,0,301.72545,0,397.6994,0,500.57515,0,596.54909,0,699.42485,0,795.39879,0,898.27455,0,1001.1503,0,1097.12425,0,2,1]},"mean2sev_15":{"title":"15 of 2/7-comma meantone scale","filename":"mean2sev_15.scl","rnbo":[15,25,24,120.948,0,191.621,0,262.293,0,312.569,0,383.241,0,504.19,0,574.862,0,695.81,0,766.483,0,816.759,0,887.431,0,1008.379,0,1079.052,0,2,1]},"mean2sev_19":{"title":"19 of 2/7-comma meantone scale","filename":"mean2sev_19.scl","rnbo":[19,25,24,120.948,0,191.621,0,262.293,0,312.569,0,383.241,0,453.914,0,504.19,0,574.862,0,625.138,0,695.81,0,766.483,0,816.759,0,887.431,0,958.103,0,1008.379,0,1079.052,0,1149.724,0,2,1]},"mean2sev_31":{"title":"31 of 2/7-comma meantone scale","filename":"mean2sev_31.scl","rnbo":[31,20.397,0,25,24,120.948,0,625,576,191.621,0,241.897,0,262.293,0,312.569,0,332.966,0,383.241,0,433.517,0,453.914,0,504.19,0,524.586,0,574.862,0,625.138,0,645.535,0,695.81,0,716.207,0,766.483,0,816.759,0,837.155,0,887.431,0,937.707,0,958.103,0,1008.379,0,1028.776,0,1079.052,0,48,25,1149.724,0,2,1]},"mean2seveb":{"title":"\"2/7-comma\" meantone with equal beating fifths. A.J. Ellis no. 8","filename":"mean2seveb.scl","rnbo":[12,81.69618,0,193.65683,0,307.31057,0,388.40164,0,502.63919,0,584.12387,0,695.81039,0,777.79027,0,890.11854,0,1004.12185,0,1085.44863,0,2,1]},"mean2sevr":{"title":"Rational approximation to 2/7-comma meantone, 1/1 = 262.9333","filename":"mean2sevr.scl","rnbo":[12,25,24,19825,17748,11811,9860,19685,15776,1979,1479,49475,35496,5895,3944,49125,31552,6585,3944,35307,19720,58845,31552,2,1]},"mean4nine":{"title":"4/9-comma meantone scale","filename":"mean4nine.scl","rnbo":[12,46.77655,0,184.7933,0,322.81005,0,369.5866,0,507.60335,0,554.3799,0,692.39665,0,739.1732,0,877.18995,0,1015.2067,0,1061.98325,0,2,1]},"meanbrat32":{"title":"Beating of 5/4 = 1.5 times 3/2 same. Almost 1/3-comma","filename":"meanbrat32.scl","rnbo":[12,65.12524,0,190.03578,0,314.94633,0,380.07157,0,504.98211,0,570.10735,0,695.01789,0,760.14313,0,885.05367,0,1009.96422,0,1075.08946,0,2,1]},"meanbrat32a":{"title":"Beating of 5/4 = 1.5 times 3/2 opposite. Almost 3/16 Pyth. comma","filename":"meanbrat32a.scl","rnbo":[12,82.94816,0,195.12805,0,307.30793,0,390.25609,0,502.43598,0,585.38414,0,697.56402,0,780.51219,0,892.69207,0,1004.87195,0,1087.82012,0,2,1]},"meanbratm32":{"title":"Beating of 6/5 = 1.5 times 3/2 same. Almost 4/15-comma","filename":"meanbratm32.scl","rnbo":[12,73.53661,0,192.43903,0,311.34145,0,384.87806,0,503.78048,0,577.31709,0,696.21952,0,769.75612,0,888.65855,0,1007.56097,0,1081.09758,0,2,1]},"meandia":{"title":"Detempered Meantone[21]; contains 7-limit diamond","filename":"meandia.scl","rnbo":[21,21,20,15,14,9,8,8,7,7,6,6,5,5,4,9,7,4,3,7,5,10,7,3,2,14,9,8,5,5,3,12,7,7,4,9,5,15,8,27,14,2,1]},"meaneb1071":{"title":"Equal beating 7/4 = 3/2 same.","filename":"meaneb1071.scl","rnbo":[12,76.589,0,193.311,0,269.901,0,386.623,0,503.344,0,579.934,0,696.656,0,773.245,0,889.967,0,966.556,0,1083.278,0,2,1]},"meaneb1071a":{"title":"Equal beating 7/4 = 3/2 opposite.","filename":"meaneb1071a.scl","rnbo":[12,79.635,0,194.181,0,273.816,0,388.363,0,502.909,0,582.544,0,697.091,0,776.725,0,891.272,0,970.906,0,1085.453,0,2,1]},"meaneb341":{"title":"Equal beating 6/5 = 5/4 same. Almost 4/15 Pyth. comma","filename":"meaneb341.scl","rnbo":[12,70.106,0,191.459,0,312.812,0,382.918,0,504.271,0,574.377,0,695.729,0,765.835,0,887.188,0,1008.541,0,1078.647,0,2,1]},"meaneb371":{"title":"Equal beating 6/5 = 3/2 same. Practically 2/7-comma (Zarlino)","filename":"meaneb371.scl","rnbo":[12,70.66697,0,191.61914,0,312.5713,0,383.23827,0,504.19043,0,574.85741,0,695.80957,0,766.47654,0,887.4287,0,1008.38086,0,1079.04784,0,2,1]},"meaneb371a":{"title":"Equal beating 6/5 = 3/2 opposite. Almost 2/5-comma","filename":"meaneb371a.scl","rnbo":[12,53.512,0,186.718,0,319.924,0,373.435,0,506.641,0,560.153,0,693.359,0,826.565,0,880.076,0,1013.282,0,1066.794,0,2,1]},"meaneb381":{"title":"Equal beating 6/5 = 8/5 same. Almost 1/7-comma","filename":"meaneb381.scl","rnbo":[12,92.146,0,197.756,0,303.366,0,395.512,0,501.122,0,593.268,0,698.878,0,804.488,0,896.634,0,1002.244,0,1094.39,0,2,1]},"meaneb451":{"title":"Equal beating 5/4 = 4/3 same, 5/24 comma meantone. A.J. Ellis no. 6","filename":"meaneb451.scl","rnbo":[12,82.32302,0,194.94943,0,307.57585,0,389.89887,0,502.52528,0,584.8483,0,697.47472,0,779.79774,0,892.42415,0,1005.05057,0,1087.37359,0,2,1]},"meaneb471":{"title":"Equal beating 5/4 = 3/2 same. Almost 5/17-comma. Erv Wilson's 'metameantone'","filename":"meaneb471.scl","rnbo":[12,69.41306,0,191.26087,0,313.10869,0,382.52175,0,504.36956,0,573.78262,0,695.63044,0,765.0435,0,886.89131,0,1008.73913,0,1078.15219,0,2,1]},"meaneb471a":{"title":"Equal beating 5/4 = 3/2 opposite. Almost 1/5 Pyth. Gottfried Keller (1707)","filename":"meaneb471a.scl","rnbo":[12,80.94883,0,194.55681,0,308.16479,0,389.11362,0,502.7216,0,583.67043,0,697.2784,0,778.22724,0,891.83521,0,1005.44319,0,1086.39202,0,2,1]},"meaneb471b":{"title":"21/109-comma meantone with 9/7 major thirds, almost equal beating 5/4 and 3/2","filename":"meaneb471b.scl","rnbo":[12,69.30142,0,191.22898,0,313.15654,0,382.45795,0,504.38551,0,573.68693,0,695.61449,0,14,9,886.84346,0,1008.77102,0,1078.07244,0,2,1]},"meaneb472":{"title":"Beating of 5/4 = twice 3/2 same. Almost 5/14-comma","filename":"meaneb472.scl","rnbo":[12,59.90903,0,188.54544,0,317.18184,0,377.09088,0,505.72728,0,565.63631,0,694.27272,0,754.18175,0,882.81816,0,1011.45456,0,1071.3636,0,2,1]},"meaneb472_19":{"title":"Beating of 5/4 = twice 3/2 same, 19 tones","filename":"meaneb472_19.scl","rnbo":[19,59.911,0,128.635,0,188.546,0,248.457,0,317.181,0,377.092,0,437.003,0,505.727,0,565.638,0,634.362,0,694.273,0,754.184,0,822.908,0,882.819,0,942.73,0,1011.454,0,1071.365,0,1131.276,0,2,1]},"meaneb472a":{"title":"Beating of 5/4 = twice 3/2 opposite. Almost 3/17-comma","filename":"meaneb472a.scl","rnbo":[12,84.717,0,195.633,0,306.55,0,391.267,0,502.183,0,586.9,0,697.817,0,782.533,0,893.45,0,1004.367,0,1089.083,0,2,1]},"meaneb591":{"title":"Equal beating 4/3 = 5/3 same.","filename":"meaneb591.scl","rnbo":[12,74.071,0,192.592,0,311.112,0,385.183,0,503.704,0,577.775,0,696.296,0,814.817,0,888.888,0,1007.408,0,1081.479,0,2,1]},"meaneb732":{"title":"Beating of 3/2 = twice 6/5 same. Almost 4/13-comma","filename":"meaneb732.scl","rnbo":[12,67.35866,0,190.6739,0,313.98914,0,381.34781,0,504.66305,0,572.02171,0,695.33695,0,762.69561,0,886.01086,0,1009.3261,0,1076.68476,0,2,1]},"meaneb732_19":{"title":"Beating of 3/2 = twice 6/5 same, 19 tones","filename":"meaneb732_19.scl","rnbo":[19,67.359,0,123.315,0,190.674,0,258.033,0,313.989,0,381.348,0,448.707,0,504.663,0,572.022,0,627.978,0,695.337,0,762.696,0,818.652,0,886.011,0,953.37,0,1009.326,0,1076.685,0,1144.044,0,2,1]},"meaneb732a":{"title":"Beating of 3/2 = twice 6/5 opposite. Almost 1/3 Pyth. comma","filename":"meaneb732a.scl","rnbo":[12,58.956,0,188.273,0,317.59,0,376.546,0,505.863,0,564.819,0,694.137,0,753.092,0,882.41,0,1011.727,0,1070.683,0,2,1]},"meaneb742":{"title":"Beating of 3/2 = twice 5/4 same.","filename":"meaneb742.scl","rnbo":[12,73.001,0,192.286,0,311.571,0,384.572,0,503.857,0,576.858,0,696.143,0,769.144,0,888.429,0,1007.714,0,1080.715,0,2,1]},"meaneb742a":{"title":"Beating of 3/2 = twice 5/4 opposite. Almost 3/13-comma, 3/14 Pyth. comma","filename":"meaneb742a.scl","rnbo":[12,78.67,0,193.906,0,309.141,0,387.812,0,503.047,0,581.717,0,696.953,0,775.623,0,890.859,0,1006.094,0,1084.765,0,2,1]},"meaneb781":{"title":"Equal beating 3/2 = 8/5 same.","filename":"meaneb781.scl","rnbo":[12,79.272,0,194.078,0,308.883,0,388.156,0,502.961,0,582.233,0,697.039,0,811.844,0,891.117,0,1005.922,0,1085.194,0,2,1]},"meaneb891":{"title":"Equal beating 8/5 = 5/3 same. Almost 5/18-comma","filename":"meaneb891.scl","rnbo":[12,72.044,0,192.013,0,311.981,0,384.025,0,503.994,0,576.038,0,696.006,0,815.975,0,888.019,0,1007.987,0,1080.032,0,2,1]},"meaneight":{"title":"1/8-comma meantone scale","filename":"meaneight.scl","rnbo":[12,94.867,0,198.53343,0,302.19986,0,397.06686,0,500.73329,0,595.60029,0,699.26671,0,405,256,897.80014,0,1001.46657,0,1096.33357,0,2,1]},"meaneightp":{"title":"1/8 Pyth. comma meantone scale","filename":"meaneightp.scl","rnbo":[12,93.1575,0,198.045,0,302.9325,0,396.09,0,500.9775,0,594.135,0,699.0225,0,128,81,897.0675,0,1001.955,0,1095.1125,0,2,1]},"meanfifth":{"title":"1/5-comma meantone scale (Verheijen)","filename":"meanfifth.scl","rnbo":[12,83.5762,0,195.30749,0,307.03877,0,390.61497,0,502.34626,0,585.92246,0,697.65374,0,781.22994,0,892.96123,0,1004.69251,0,15,8,2,1]},"meanfifth2":{"title":"1/5-comma meantone by John Holden (1770)","filename":"meanfifth2.scl","rnbo":[12,16,15,195.30749,0,307.03877,0,390.61497,0,502.34626,0,585.92246,0,697.65374,0,809.38503,0,892.96123,0,1004.69251,0,15,8,2,1]},"meanfifth_19":{"title":"19 of 1/5-comma meantone scale","filename":"meanfifth_19.scl","rnbo":[19,83.576,0,16,15,195.307,0,278.884,0,307.039,0,390.615,0,474.191,0,502.346,0,585.922,0,614.078,0,697.654,0,781.23,0,809.385,0,892.961,0,225,128,1004.693,0,15,8,1171.845,0,2,1]},"meanfifth_43":{"title":"Complete 1/5-comma meantone scale","filename":"meanfifth_43.scl","rnbo":[43,28.155,0,55.421,0,83.576,0,16,15,138.997,0,167.152,0,195.307,0,256,225,250.729,0,278.884,0,307.039,0,334.305,0,362.46,0,390.615,0,418.77,0,446.036,0,474.191,0,502.346,0,530.501,0,557.767,0,585.922,0,614.078,0,759375,524288,669.499,0,697.654,0,725.809,0,50625,32768,781.23,0,809.385,0,836.651,0,3375,2048,892.961,0,921.116,0,948.382,0,225,128,1004.693,0,1032.848,0,1060.114,0,15,8,1116.424,0,1143.69,0,1171.845,0,2,1]},"meanfifth_french":{"title":"Homogeneous French temperament, 1/5-comma, C. di Veroli","filename":"meanfifth_french.scl","rnbo":[12,87.87746,0,195.30749,0,291.78746,0,390.61497,0,4,3,585.92246,0,697.65374,0,789.83246,0,892.96123,0,994.91623,0,15,8,2,1]},"meanfiftheb":{"title":"\"1/5-comma\" meantone with equal beating fifths","filename":"meanfiftheb.scl","rnbo":[12,91.34419,0,196.73569,0,303.37286,0,394.24347,0,501.26376,0,592.44267,0,697.65398,0,789.21948,0,894.8522,0,1001.71892,0,1092.77425,0,2,1]},"meangolden":{"title":"Meantone scale with Blackwood's R = phi, and diat./chrom. semitone = phi, Kornerup. Almost 4/15-comma","filename":"meangolden.scl","rnbo":[12,73.50132,0,192.42895,0,311.35658,0,384.8579,0,503.78553,0,577.28684,0,696.21447,0,769.71579,0,888.64342,0,1007.57105,0,1081.07237,0,2,1]},"meangolden_top":{"title":"Meantone scale with Blackwood's R = phi, TOP tuning","filename":"meangolden_top.scl","rnbo":[12,73.61241,0,192.71978,0,311.82716,0,385.43957,0,504.54694,0,578.15935,0,697.26673,0,816.3741,0,889.98651,0,1009.09389,0,1082.7063,0,1201.81367,0]},"meanhalf":{"title":"1/2-comma meantone scale","filename":"meanhalf.scl","rnbo":[12,38.41299,0,10,9,326.39443,0,100,81,508.79814,0,1000,729,691.20186,0,10000,6561,873.60557,0,9,5,1056.00928,0,2,1]},"meanhar2":{"title":"1/9-Harrison's comma meantone scale","filename":"meanhar2.scl","rnbo":[12,74.23293,0,192.63798,0,7,6,385.27596,0,503.68101,0,577.91394,0,696.31899,0,770.55192,0,888.95697,0,963.1899,0,1081.59495,0,2,1]},"meanhar3":{"title":"1/11-Harrison's comma meantone scale","filename":"meanhar3.scl","rnbo":[12,81.40603,0,194.68744,0,276.09347,0,389.37488,0,21,16,584.06231,0,697.34372,0,778.74975,0,892.03116,0,973.43719,0,1086.71859,0,2,1]},"meanharris":{"title":"1/10-Harrison's comma meantone scale","filename":"meanharris.scl","rnbo":[12,78.17813,0,193.76518,0,271.94332,0,387.53036,0,503.11741,0,581.29554,0,696.88259,0,775.06073,0,890.64777,0,7,4,1084.41295,0,2,1]},"meanhsev":{"title":"1/14-septimal schisma tempered meantone scale","filename":"meanhsev.scl","rnbo":[41,26.72065,0,62.14574,0,88.8664,0,115.58705,0,142.3077,0,177.73279,0,204.45344,0,8,7,266.59919,0,293.31984,0,320.04049,0,355.46558,0,382.18623,0,408.90688,0,435.62754,0,471.05263,0,497.77328,0,524.49393,0,559.91902,0,586.63967,0,613.36033,0,640.08098,0,675.50607,0,702.22672,0,728.94737,0,764.37246,0,791.09312,0,817.81377,0,844.53442,0,879.95951,0,906.68016,0,933.40081,0,7,4,995.54656,0,1022.26721,0,1057.6923,0,1084.41295,0,1111.1336,0,1137.85426,0,1173.27935,0,2,1]},"meanhskl":{"title":"Half septimal kleisma meantone","filename":"meanhskl.scl","rnbo":[12,86.69468,0,28,25,305.70228,0,784,625,501.90076,0,21952,15625,698.09924,0,614656,390625,894.29772,0,25,14,1090.4962,0,2,1]},"meanlst357_19":{"title":"19 of mean-tone scale, least square error in 3/2, 5/4 and 7/4","filename":"meanlst357_19.scl","rnbo":[19,78.19,0,115.578,0,193.769,0,271.959,0,309.347,0,387.537,0,465.728,0,503.116,0,581.306,0,618.694,0,696.884,0,775.075,0,812.463,0,890.653,0,968.844,0,1006.231,0,1084.422,0,1162.612,0,2,1]},"meanmalc":{"title":"Meantone approximation to Malcolm's Monochord, 3/16 Pyth. comma","filename":"meanmalc.scl","rnbo":[12,112.3205,0,195.0718,0,307.3923,0,390.1436,0,502.4641,0,585.2154,0,697.5359,0,809.8564,0,892.6077,0,1004.9282,0,1087.6795,0,2,1]},"meannine":{"title":"1/9-comma meantone scale, Jean-Baptiste Romieu","filename":"meannine.scl","rnbo":[12,96.95789,0,199.13083,0,301.30376,0,398.26165,0,500.43459,0,597.39248,0,699.56541,0,796.52331,0,898.69624,0,1000.86917,0,1097.82707,0,2,1]},"meannkleis":{"title":"1/5 kleisma tempered meantone scale","filename":"meannkleis.scl","rnbo":[12,102.33482,0,200.66698,0,303.00191,0,401.33381,0,503.669,0,602.00056,0,700.33355,0,802.66836,0,901.00064,0,1003.33545,0,59049,31250,2,1]},"meanpi":{"title":"Pi-based meantone with Harrison's major third by Erv Wilson","filename":"meanpi.scl","rnbo":[12,88.733,0,204.507,0,293.24,0,381.972,0,497.747,0,586.479,0,702.254,0,790.986,0,879.718,0,995.493,0,1084.225,0,2,1]},"meanpi2":{"title":"Pi-based meantone by Erv Wilson analogous to 22-tET","filename":"meanpi2.scl","rnbo":[12,163.756,0,218.216,0,381.972,0,436.432,0,600.188,0,654.648,0,709.108,0,872.864,0,927.324,0,1091.08,0,1145.54,0,2,1]},"meanpkleis":{"title":"1/5 kleisma positive temperament","filename":"meanpkleis.scl","rnbo":[12,16384,15625,207.15291,0,289.27063,0,371.38835,0,496.42354,0,578.54126,0,703.57646,0,785.69417,0,910.72937,0,992.84709,0,1074.9648,0,2,1]},"meanquar":{"title":"1/4-comma meantone scale. Pietro Aaron's temp. (1523). 6/5 beats twice 3/2","filename":"meanquar.scl","rnbo":[12,76.049,0,193.15686,0,310.26471,0,5,4,503.42157,0,579.47057,0,696.57843,0,25,16,889.73529,0,1006.84314,0,1082.89214,0,2,1]},"meanquar_14":{"title":"1/4-comma meantone scale with split D#/Eb and G#/Ab, Otto Gibelius (1666)","filename":"meanquar_14.scl","rnbo":[14,76.049,0,193.15686,0,269.20586,0,310.26471,0,5,4,503.42157,0,579.47057,0,696.57843,0,25,16,8,5,889.73529,0,1006.84314,0,1082.89214,0,2,1]},"meanquar_15":{"title":"1/4-comma meantone scale with split C#/Db, D#/Eb and G#/Ab","filename":"meanquar_15.scl","rnbo":[15,76.049,0,117.10786,0,193.15686,0,269.20586,0,310.26471,0,5,4,503.42157,0,579.47057,0,696.57843,0,25,16,8,5,889.73529,0,1006.84314,0,1082.89214,0,2,1]},"meanquar_16":{"title":"1/4-comma meantone scale with split C#/Db, D#/Eb, G#/Ab and A#/Bb","filename":"meanquar_16.scl","rnbo":[16,76.049,0,117.109,0,193.157,0,269.206,0,310.265,0,5,4,503.422,0,579.471,0,696.578,0,25,16,8,5,889.735,0,965.784,0,1006.843,0,1082.892,0,2,1]},"meanquar_17":{"title":"1/4-comma meantone scale with split C#/Db, D#/Eb, F#/Gb, G#/Ab and A#/Bb","filename":"meanquar_17.scl","rnbo":[17,76.049,0,117.10786,0,193.15686,0,269.20585,0,310.26471,0,5,4,503.42157,0,579.47057,0,620.52943,0,696.57843,0,25,16,8,5,889.73528,0,965.78428,0,1006.84314,0,1082.89214,0,2,1]},"meanquar_19":{"title":"19 of 1/4-comma meantone scale","filename":"meanquar_19.scl","rnbo":[19,76.049,0,117.10786,0,193.15686,0,269.20586,0,310.26471,0,5,4,462.36271,0,503.42157,0,579.47057,0,620.52943,0,696.57843,0,25,16,8,5,889.73529,0,965.78428,0,1006.84314,0,1082.89214,0,125,64,2,1]},"meanquar_27":{"title":"27 of 1/4-comma meantone scale","filename":"meanquar_27.scl","rnbo":[27,76.049,0,117.10786,0,152.098,0,193.15686,0,234.21572,0,269.20586,0,310.26471,0,5,4,32,25,462.36271,0,503.42157,0,579.47057,0,620.52943,0,655.51957,0,696.57843,0,737.63729,0,25,16,8,5,848.67643,0,889.73529,0,930.79414,0,965.78428,0,1006.84314,0,1082.89214,0,1123.951,0,125,64,2,1]},"meanquar_31":{"title":"31 of 1/4-comma meantone scale","filename":"meanquar_31.scl","rnbo":[31,128,125,76.049,0,117.10786,0,152.098,0,193.15686,0,234.21572,0,269.20586,0,310.26471,0,351.32357,0,5,4,32,25,462.36271,0,503.42157,0,544.48043,0,579.47057,0,620.52943,0,655.51957,0,696.57843,0,737.63729,0,25,16,8,5,848.67643,0,889.73529,0,930.79414,0,965.78428,0,1006.84314,0,1047.902,0,1082.89214,0,1123.951,0,125,64,2,1]},"meanquareb":{"title":"Variation on 1/4-comma meantone with equal beating fifths","filename":"meanquareb.scl","rnbo":[12,85.7203,0,194.93958,0,305.67193,0,390.83667,0,502.06657,0,587.59282,0,696.57833,0,782.55876,0,892.09129,0,1003.12163,0,1088.50291,0,2,1]},"meanquarm23":{"title":"1/4-comma meantone approximation with minimal order 23 beatings","filename":"meanquarm23.scl","rnbo":[12,23,22,19,17,6,5,5,4,4,3,7,5,3,2,25,16,5,3,34,19,43,23,2,1]},"meanquarn":{"title":"Non-octave quarter-comma meantone, fifth period, also known as Angel","filename":"meanquarn.scl","rnbo":[44,128,125,117.10786,0,193.15686,0,234.21572,0,310.26471,0,5,4,32,25,503.42157,0,579.47057,0,620.52943,0,696.57843,0,737.63729,0,8,5,889.73529,0,930.79414,0,1006.84314,0,1082.89214,0,1123.951,0,2,1,1276.049,0,1317.10786,0,1393.15686,0,1434.21572,0,1510.26471,0,1586.31371,0,1627.37257,0,1703.42157,0,1779.47057,0,1820.52943,0,1896.57843,0,1972.62743,0,2013.68629,0,2089.73529,0,2130.79414,0,2206.84314,0,2282.89214,0,2323.951,0,4,1,2476.049,0,2517.10786,0,2593.15686,0,2669.20586,0,2710.26471,0,5,1]},"meanquarr":{"title":"Rational approximation to 1/4-comma meantone, Kenneth Scholz, MTO 4.4, 1998","filename":"meanquarr.scl","rnbo":[12,675,646,180,161,323,270,5,4,107,80,225,161,160,107,25,16,540,323,161,90,200,107,2,1]},"meanquarw2":{"title":"1/4-comma meantone with 1/2 wolf, used in England in 19th c. (Ellis)","filename":"meanquarw2.scl","rnbo":[12,76.049,0,193.15686,0,289.73529,0,5,4,503.42157,0,579.47057,0,696.57843,0,25,16,889.73529,0,1006.84314,0,1082.89214,0,2,1]},"meanquarw3":{"title":"1/4-comma meantone with 3 superpythagorean fifths, C. di Veroli & S. Leidemann (1985), also called Rainbow","filename":"meanquarw3.scl","rnbo":[12,76.049,0,193.15686,0,296.57843,0,5,4,503.42157,0,579.47057,0,696.57843,0,786.31371,0,889.73529,0,1006.84314,0,1082.89214,0,2,1]},"meanreverse":{"title":"Reverse meantone 1/4 82/81-comma tempered","filename":"meanreverse.scl","rnbo":[12,150.85921,0,214.5312,0,278.2032,0,41,32,492.7344,0,643.59361,0,707.2656,0,1681,1024,921.7968,0,985.4688,0,1136.32801,0,2,1]},"meansabat":{"title":"1/9-schisma meantone scale of Eduard Sábat-Garibaldi","filename":"meansabat.scl","rnbo":[12,112.16545,0,203.47584,0,6,5,406.95168,0,498.26208,0,610.42752,0,701.73792,0,813.90337,0,905.21376,0,1017.37921,0,1108.6896,0,2,1]},"meansabat_53":{"title":"53-tone 1/9-schisma meantone 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meantone 1: C-G-D-A-E 1/4, others 1/6","filename":"meanvar1.scl","rnbo":[12,81.42557,0,193.15686,0,304.88814,0,5,4,501.62938,0,583.05495,0,696.57843,0,779.79619,0,889.73529,0,1003.25876,0,1084.68433,0,2,1]},"meanvar2":{"title":"Variable meantone 2: C..E 1/4, 1/5-1/6-1/7-1/8 outward both directions","filename":"meanvar2.scl","rnbo":[12,81.22075,0,193.15686,0,305.09296,0,5,4,502.34626,0,582.33808,0,696.57843,0,780.48746,0,889.73529,0,1003.97564,0,1083.96746,0,2,1]},"meanvar3":{"title":"Variable meantone 3: C..E 1/4, 1/6 next, then Pyth.","filename":"meanvar3.scl","rnbo":[12,88.59433,0,193.15686,0,297.71938,0,5,4,501.62938,0,586.63933,0,696.57843,0,790.54934,0,889.73529,0,999.67438,0,1084.68433,0,2,1]},"meanvar4":{"title":"Variable meantone 4: naturals 1/4-comma, accidentals Pyth.","filename":"meanvar4.scl","rnbo":[12,86.80214,0,193.15686,0,299.51157,0,5,4,503.42157,0,584.84714,0,696.57843,0,788.75714,0,889.73529,0,1001.46657,0,1082.89214,0,2,1]},"meister-p12":{"title":"Temperament with 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Merrick's melodically tuned equal temperament (1811)","filename":"merrick.scl","rnbo":[12,108.96352,0,209.54567,0,310.11018,0,401.52867,0,500.35485,0,607.6232,0,708.89382,0,805.39624,0,895.93891,0,1006.89577,0,1099.12288,0,2,1]},"mersen-ban":{"title":"For keyboard designs of Mersenne (1635) & Ban (1639), 10 black and extra D. 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76|","filename":"minerva22.scl","rnbo":[22,36,35,15,14,11,10,8,7,7,6,40,33,5,4,9,7,4,3,48,35,10,7,22,15,3,2,11,7,8,5,5,3,12,7,7,4,64,35,15,8,64,33,2,1]},"minerva22x":{"title":"Minerva[22] (176/175, 99/98) hobbit irregular","filename":"minerva22x.scl","rnbo":[22,41.29245,0,114.02626,0,157.58935,0,226.41621,0,271.94758,0,341.846,0,388.44892,0,426.82016,0,501.32157,0,540.56861,0,612.07439,0,657.60575,0,701.95134,0,773.43642,0,810.46345,0,887.70868,0,925.67505,0,972.97491,0,1041.90541,0,1088.25561,0,1156.39821,0,2,1]},"minor_5":{"title":"A minor pentatonic, subharmonics 6 to 10","filename":"minor_5.scl","rnbo":[5,8,7,4,3,8,5,16,9,2,1]},"minor_clus":{"title":"Chalmers' Minor Mode Cluster, Genus [333335]","filename":"minor_clus.scl","rnbo":[12,16,15,9,8,6,5,4,3,27,20,64,45,3,2,8,5,27,16,16,9,9,5,2,1]},"minor_wing":{"title":"Chalmers' Minor Wing with 7 minor and 6 major 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5-limit","filename":"minortone.scl","rnbo":[46,21.38094,0,49.32178,0,77.26262,0,98.64356,0,126.5844,0,154.52525,0,182.46609,0,203.84703,0,231.78787,0,259.72871,0,281.10965,0,309.05049,0,336.99134,0,364.93218,0,386.31312,0,414.25396,0,442.1948,0,463.57574,0,491.51658,0,519.45742,0,547.39827,0,568.7792,0,596.72005,0,624.66089,0,646.04183,0,673.98267,0,701.92351,0,729.86436,0,751.24529,0,779.18614,0,807.12698,0,828.50792,0,856.44876,0,884.3896,0,912.33045,0,933.71138,0,961.65223,0,989.59307,0,1010.97401,0,1038.91485,0,1066.85569,0,1094.79653,0,1116.17747,0,1144.11831,0,1172.05916,0,2,1]},"miracle1":{"title":"21 out of 72-tET Pyth. scale \"Miracle/Blackjack\", Keenan & Erlich, TL 2-5-2001","filename":"miracle1.scl","rnbo":[21,33.33333,0,116.66667,0,150.0,0,233.33333,0,266.66667,0,350.0,0,383.33333,0,466.66667,0,500.0,0,583.33333,0,616.66667,0,700.0,0,733.33333,0,816.66667,0,850.0,0,933.33333,0,966.66667,0,1050.0,0,1083.33333,0,1166.66667,0,2,1]},"miracle1a":{"title":"Version of Blackjack 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(2001)","filename":"miracle3.scl","rnbo":[41,33.33333,0,66.66667,0,83.33333,0,116.66667,0,150.0,0,183.33333,0,200.0,0,233.33333,0,266.66667,0,300.0,0,316.66667,0,350.0,0,383.33333,0,416.66667,0,433.33333,0,466.66667,0,500.0,0,533.33333,0,550.0,0,583.33333,0,616.66667,0,650.0,0,666.66667,0,700.0,0,733.33333,0,766.66667,0,783.33333,0,816.66667,0,850.0,0,883.33333,0,900.0,0,933.33333,0,966.66667,0,1000.0,0,1016.66667,0,1050.0,0,1083.33333,0,1116.66667,0,1133.33333,0,1166.66667,0,2,1]},"miracle31s":{"title":"Miracle-31 with Secor's minimax generator of 116.7155941 cents (5:9 exact). XH5, 1976","filename":"miracle31s.scl","rnbo":[31,32.84406,0,83.87154,0,116.71559,0,149.55965,0,200.58713,0,233.43119,0,266.27525,0,317.30272,0,350.14678,0,382.99084,0,434.01832,0,466.86238,0,499.70643,0,550.73391,0,583.57797,0,616.42203,0,649.26609,0,700.29357,0,733.13762,0,765.98168,0,817.00916,0,849.85322,0,882.69728,0,933.72475,0,966.56881,0,999.41287,0,1050.44035,0,1083.28441,0,1116.12847,0,1167.15594,0,2,1]},"miracle31trans":{"title":"Miracle-31 (Canasta) symmetric 5-limit transversal","filename":"miracle31trans.scl","rnbo":[31,2048,2025,135,128,16,15,1125,1024,9,8,256,225,75,64,6,5,4096,3375,5,4,32,25,675,512,4,3,512,375,45,32,64,45,375,256,3,2,1024,675,25,16,8,5,3375,2048,5,3,128,75,225,128,16,9,2048,1125,15,8,256,135,2025,1024,2,1]},"miracle31trans511":{"title":"Miracle-31 2.5.11 symmetric transversal","filename":"miracle31trans511.scl","rnbo":[31,4194304,4159375,536870912,519921875,275,256,16384,15125,2097152,1890625,75625,65536,64,55,8192,6875,20796875,16777216,5,4,32,25,134217728,103984375,1375,1024,11,8,524288,378125,378125,262144,16,11,2048,1375,103984375,67108864,25,16,8,5,33554432,20796875,6875,4096,55,32,131072,75625,1890625,1048576,15125,8192,512,275,519921875,268435456,4159375,2097152,2,1]},"miracle3a":{"title":"Version of Studloco with just 11/8 intervals","filename":"miracle3a.scl","rnbo":[41,32.45471,0,64.90941,0,84.29982,0,116.75453,0,149.20923,0,181.66394,0,201.05435,0,233.50906,0,265.96376,0,298.41847,0,317.80888,0,350.26359,0,382.71829,0,415.173,0,434.56341,0,467.01812,0,499.47282,0,531.92753,0,11,8,583.77265,0,616.22735,0,16,11,668.07247,0,700.52718,0,732.98188,0,765.43659,0,784.827,0,817.28171,0,849.73641,0,882.19112,0,901.58153,0,934.03624,0,966.49094,0,998.94565,0,1018.33606,0,1050.79077,0,1083.24547,0,1115.70018,0,1135.09059,0,1167.54529,0,2,1]},"miracle3p":{"title":"Least squares Pythagorean approximation to partch_43","filename":"miracle3p.scl","rnbo":[41,30.96288,0,54.97796,0,85.94084,0,116.90371,0,147.86659,0,178.82947,0,202.84455,0,233.80742,0,264.7703,0,295.73318,0,319.74826,0,350.71114,0,381.67401,0,412.63689,0,436.65197,0,467.61485,0,498.57773,0,529.5406,0,553.55569,0,584.51856,0,615.48144,0,646.44431,0,670.4594,0,701.42227,0,732.38515,0,763.34803,0,787.36311,0,818.32599,0,849.28886,0,880.25174,0,904.26682,0,935.2297,0,966.19258,0,997.15545,0,1021.17053,0,1052.13341,0,1083.09629,0,1114.05916,0,1138.07425,0,1169.03712,0,2,1]},"miracle41s":{"title":"Miracle-41 with Secor's minimax generator of 116.7155941 cents (5:9 exact). XH5, 1976","filename":"miracle41s.scl","rnbo":[41,32.84406,0,51.02748,0,83.87154,0,116.71559,0,149.55965,0,10,9,200.58713,0,233.43119,0,266.27525,0,299.11931,0,317.30272,0,350.14678,0,382.99084,0,415.8349,0,434.01832,0,466.86238,0,499.70643,0,532.55049,0,550.73391,0,583.57797,0,616.42203,0,649.26609,0,667.44951,0,700.29357,0,733.13762,0,765.98168,0,784.1651,0,817.00916,0,849.85322,0,882.69728,0,900.88069,0,933.72475,0,966.56881,0,999.41287,0,9,5,1050.44035,0,1083.28441,0,1116.12847,0,1134.31188,0,1167.15594,0,2,1]},"miracle_10":{"title":"A 10-tone subset of Blackjack, g=116.667","filename":"miracle_10.scl","rnbo":[10,116.66667,0,233.33333,0,350.0,0,466.66667,0,583.33333,0,700.0,0,816.66667,0,933.33333,0,1050.0,0,2,1]},"miracle_12":{"title":"A 12-tone subset of Blackjack with six 4-7-9-11 tetrads","filename":"miracle_12.scl","rnbo":[12,116.66667,0,233.33333,0,350.0,0,433.33333,0,466.66667,0,550.0,0,583.33333,0,666.66667,0,783.33333,0,900.0,0,1016.66667,0,2,1]},"miracle_12a":{"title":"A 12-tone chain of Miracle generators and subset of Blackjack","filename":"miracle_12a.scl","rnbo":[12,116.66667,0,233.33333,0,350.0,0,466.66667,0,583.33333,0,700.0,0,816.66667,0,933.33333,0,1049.99999,0,1083.33333,0,1166.66667,0,2,1]},"miracle_24hi":{"title":"24 note mapping for Erlich/Keenan Miracle scale","filename":"miracle_24hi.scl","rnbo":[24,33.33333,0,66.66667,0,150.0,0,183.33333,0,233.33333,0,266.66667,0,300.0,0,383.33333,0,416.66667,0,500.0,0,533.33333,0,583.33333,0,616.66667,0,650.0,0,733.33333,0,766.66667,0,816.66667,0,850.0,0,883.33333,0,966.66667,0,1000.0,0,1083.33333,0,1116.66667,0,2,1]},"miracle_24lo":{"title":"24 note mapping for Erlich/Keenan Miracle scale, low version, tuned to 72-equal","filename":"miracle_24lo.scl","rnbo":[24,33.333333333333336,0,116.66666666666667,0,150.0,0,183.33333333333334,0,233.33333333333334,0,266.6666666666667,0,350.0,0,383.3333333333333,0,466.6666666666667,0,500.0,0,533.3333333333334,0,583.3333333333334,0,616.6666666666666,0,700.0,0,733.3333333333334,0,766.6666666666666,0,816.6666666666666,0,850.0,0,933.3333333333334,0,966.6666666666666,0,1050.0,0,1083.3333333333333,0,1116.6666666666667,0,2,1]},"miracle_8":{"title":"tet3a.scl in 72-tET","filename":"miracle_8.scl","rnbo":[8,116.66667,0,316.66667,0,433.33333,0,583.33333,0,700.0,0,816.66667,0,933.33333,0,2,1]},"miring":{"title":"sorog miring, Sunda","filename":"miring.scl","rnbo":[5,420.0,0,540.0,0,930.0,0,1080.0,0,2,1]},"miring1":{"title":"Gamelan Miring from Serdang wetan, Tangerang. 1/1=309.5 Hz","filename":"miring1.scl","rnbo":[5,149.938,0,280.799,0,678.49,0,823.448,0,2,1]},"miring2":{"title":"Gamelan Miring (Melog gender) from Serdang wetan","filename":"miring2.scl","rnbo":[5,113.476,0,263.677,0,666.219,0,789.079,0,2,1]},"misca":{"title":"21/20 x 20/19 x 19/18=7/6 7/6 x 8/7=4/3","filename":"misca.scl","rnbo":[9,21,20,21,19,7,6,4,3,3,2,63,40,63,38,7,4,2,1]},"miscb":{"title":"33/32 x 32/31x 31/27=11/9 11/9 x 12/11=4/3","filename":"miscb.scl","rnbo":[9,33,32,33,31,11,9,4,3,3,2,99,64,99,62,11,6,2,1]},"miscc":{"title":"96/91 x 91/86 x 86/54=32/27. 32/27 x 9/8=4/3.","filename":"miscc.scl","rnbo":[9,96,91,48,43,32,27,4,3,3,2,144,91,72,43,16,9,2,1]},"miscd":{"title":"27/26 x 26/25 x 25/24=9/8. 9/8 x 32/27=4/3.","filename":"miscd.scl","rnbo":[9,27,26,27,25,9,8,4,3,3,2,81,52,81,50,27,16,2,1]},"misce":{"title":"15/14 x 14/13 x 13/12=5/4. 5/4 x 16/15= 4/3.","filename":"misce.scl","rnbo":[9,15,14,15,13,5,4,4,3,3,2,45,28,45,26,15,8,2,1]},"miscf":{"title":"SupraEnh 1","filename":"miscf.scl","rnbo":[9,28,27,16,15,4,3,81,56,3,2,14,9,8,5,27,14,2,1]},"miscg":{"title":"SupraEnh 2","filename":"miscg.scl","rnbo":[9,28,27,16,15,9,7,4,3,3,2,14,9,8,5,27,14,2,1]},"misch":{"title":"SupraEnh 3","filename":"misch.scl","rnbo":[9,28,27,16,15,9,7,4,3,3,2,14,9,15,8,27,14,2,1]},"misty":{"title":"Misty temperament, g=96.787939, p=400, 5-limit","filename":"misty.scl","rnbo":[63,45.39496,0,58.24321,0,71.09145,0,83.93969,0,96.78794,0,142.1829,0,155.03115,0,167.87939,0,180.72763,0,193.57588,0,238.97084,0,251.81908,0,264.66733,0,277.51557,0,290.36382,0,303.21206,0,348.60702,0,361.45527,0,374.30351,0,387.15176,0,400.0,0,445.39496,0,458.24321,0,471.09145,0,483.93969,0,496.78794,0,542.1829,0,555.03115,0,567.87939,0,580.72763,0,593.57588,0,638.97084,0,651.81908,0,664.66733,0,677.51557,0,690.36382,0,703.21206,0,748.60702,0,761.45527,0,774.30351,0,787.15176,0,800.0,0,845.39496,0,858.24321,0,871.09145,0,883.93969,0,896.78794,0,942.1829,0,955.03115,0,967.87939,0,980.72763,0,993.57588,0,1038.97084,0,1051.81908,0,1064.66733,0,1077.51557,0,1090.36382,0,1103.21206,0,1148.60702,0,1161.45527,0,1174.30351,0,1187.15176,0,2,1]},"mistyschism":{"title":"Mistyschism scale 32805/32768 and 67108864/66430125","filename":"mistyschism.scl","rnbo":[12,524288,492075,9,8,1215,1024,512,405,4,3,64,45,3,2,262144,164025,2048,1215,3645,2048,256,135,2,1]},"mitchell":{"title":"Geordan Mitchell, fractal Koch flake monochord scale. XH 18, 2006","filename":"mitchell.scl","rnbo":[10,57.19972,0,177.21778,0,306.18002,0,445.52767,0,597.08106,0,714.11625,0,839.64063,0,974.98272,0,1121.80959,0,2,1]},"mixed9_3":{"title":"A mixture of the hemiolic chromatic and diatonic genera, 75 + 75 + 150 + 200 c","filename":"mixed9_3.scl","rnbo":[9,75.0,0,150.0,0,300.0,0,500.0,0,700.0,0,775.0,0,850.0,0,1000.0,0,2,1]},"mixed9_4":{"title":"Mixed enneatonic 4, each \"tetrachord\" contains 67 + 67 + 133 + 233 cents.","filename":"mixed9_4.scl","rnbo":[9,66.66667,0,133.33333,0,266.66667,0,500.0,0,700.0,0,766.66667,0,833.33333,0,966.66667,0,2,1]},"mixed9_5":{"title":"A mixture of the intense chromatic genus and the permuted intense diatonic","filename":"mixed9_5.scl","rnbo":[9,100.0,0,200.0,0,400.0,0,500.0,0,700.0,0,800.0,0,900.0,0,1100.0,0,2,1]},"mixed9_6":{"title":"Mixed 9-tonic 6, Mixture of Chromatic and 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After Mih.a'il Mu^saqah, 1899, a Lebanese scholar","filename":"musaqa_24.scl","rnbo":[24,3456,3361,864,817,384,353,216,193,3456,3001,32,27,3456,2833,54,43,128,99,864,649,3456,2521,24,17,3456,2377,864,577,128,83,27,17,3456,2113,32,19,3456,1993,216,121,384,209,864,457,3456,1777,2,1]},"mustear pentachord 17-limit":{"title":"Mustear pentachord 42:48:51:56:63","filename":"mustear pentachord 17-limit.scl","rnbo":[4,8,7,17,14,4,3,3,2]},"mustear pentachord 5-limit":{"title":"Mustear pentachord 120:135:144:160:180","filename":"mustear pentachord 5-limit.scl","rnbo":[4,9,8,6,5,4,3,3,2]},"myna15br25":{"title":"Myna[15] with a brat of 5/2","filename":"myna15br25.scl","rnbo":[15,39.873439535587316,0,79.74687907117463,0,119.62031860676194,0,309.9683598838968,0,349.8417994194841,0,389.71523895507147,0,580.0632802322064,0,619.9367197677936,0,659.8101593033809,0,699.6835988389682,0,890.0316401161032,0,929.9050796516905,0,969.7785191872778,0,1009.6519587228652,0,2,1]},"myna15br3":{"title":"Myna[15] with a brat of 3","filename":"myna15br3.scl","rnbo":[15,39.634519805804146,0,79.26903961160829,0,118.90355941741244,0,309.908629951451,0,349.5431497572552,0,389.17766956305934,0,580.182740097098,0,619.817259902902,0,659.4517797087062,0,699.0862995145104,0,890.0913700485489,0,929.7258898543531,0,969.3604096601573,0,1008.9949294659614,0,2,1]},"myna19trans":{"title":"Myna[19] symmetric 5-limit transversal","filename":"myna19trans.scl","rnbo":[19,648,625,25,24,144,125,125,108,6,5,3888,3125,5,4,864,625,25,18,36,25,625,432,8,5,3125,1944,5,3,216,125,125,72,48,25,625,324,2,1]},"myna19trans37":{"title":"Myna[19] 2.3.7 transversal","filename":"myna19trans37.scl","rnbo":[19,49,48,2401,2304,2592,2401,7,6,343,288,16807,13824,432,343,9,7,2401,1728,3456,2401,72,49,3,2,16807,10368,576,343,12,7,7,4,343,192,96,49,2,1]},"myna23":{"title":"Myna[23] temperament, TOP tuning, g=309.892661 (Paul 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13-limit","filename":"mystery.scl","rnbo":[58,15.02161,0,41.37931,0,56.40092,0,82.75862,0,97.78023,0,124.13793,0,139.15954,0,165.51724,0,180.53885,0,206.89655,0,221.91816,0,248.27586,0,263.29747,0,289.65517,0,304.67678,0,331.03448,0,346.05609,0,372.41379,0,387.43541,0,413.7931,0,428.81472,0,455.17241,0,470.19403,0,496.55172,0,511.57334,0,537.93103,0,552.95265,0,579.31034,0,594.33196,0,620.68966,0,635.71127,0,662.06897,0,677.09058,0,703.44828,0,718.46989,0,744.82759,0,759.8492,0,786.2069,0,801.22851,0,827.58621,0,842.60782,0,868.96552,0,883.98713,0,910.34483,0,925.36644,0,951.72414,0,966.74575,0,993.10345,0,1008.12506,0,1034.48276,0,1049.50437,0,1075.86207,0,1090.88368,0,1117.24138,0,1132.26299,0,1158.62069,0,1173.6423,0,2,1]},"mystic-r":{"title":"Skriabin's mystic chord, op. 60 rationalised","filename":"mystic-r.scl","rnbo":[5,45,32,16,9,5,2,10,3,9,2]},"mystic":{"title":"Skriabin's mystic chord, op. 60","filename":"mystic.scl","rnbo":[5,600.0,0,1000.0,0,1600.0,0,2100.0,0,2600.0,0]},"nakika12":{"title":"Nakika[12] (100/99&245/242) hobbit, 41-tET tuning","filename":"nakika12.scl","rnbo":[12,87.80488,0,175.60976,0,321.95122,0,409.7561,0,497.56098,0,585.36585,0,702.43902,0,790.2439,0,878.04878,0,1024.39024,0,1112.19512,0,2,1]},"namo17":{"title":"Namo[17] 2.3.11.13 subgroup MOS in 128\\437 tuning","filename":"namo17.scl","rnbo":[17,60.4119,0,145.53776,0,205.94966,0,266.36156,0,351.48741,0,411.89931,0,497.02517,0,557.43707,0,642.56293,0,702.97483,0,763.38673,0,848.51259,0,908.92449,0,994.05034,0,1054.46224,0,1114.87414,0,2,1]},"narushima-vex":{"title":"To accommodate the 21 different spellings of notes in Satie’s 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5-limit","filename":"negri5_19.scl","rnbo":[19,62.96737,0,126.33696,0,189.30433,0,252.67392,0,315.64129,0,378.60866,0,441.97825,0,504.94562,0,568.31521,0,631.28257,0,694.65216,0,757.61953,0,820.98912,0,883.95649,0,947.32608,0,1010.29345,0,1073.66304,0,1136.63041,0,2,1]},"negri_19":{"title":"Negri temperament, 13-limit, g=124.831","filename":"negri_19.scl","rnbo":[19,48.30502,0,124.8305,0,173.13553,0,249.661,0,297.96603,0,374.49151,0,422.79653,0,499.32201,0,547.62703,0,624.15251,0,700.67799,0,748.98301,0,825.50849,0,873.81352,0,950.339,0,998.64402,0,1075.1695,0,1123.47452,0,2,1]},"neid-mar-morg":{"title":"Neidhardt-Marpurg-de Morgan temperament (1858)","filename":"neid-mar-morg.scl","rnbo":[12,101.955,0,201.955,0,300.0,0,401.955,0,501.955,0,600.0,0,3,2,801.955,0,900.0,0,1001.955,0,1101.955,0,2,1]},"neidhardm":{"title":"modified Neidhardt 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(1732)","filename":"neidhardt-f12.scl","rnbo":[12,100.0,0,198.045,0,300.0,0,396.09,0,4,3,600.0,0,700.0,0,798.045,0,900.0,0,16,9,1098.045,0,2,1]},"neidhardt-f2":{"title":"Neidhardt's fifth-circle no. 2, 1/6 Pyth. comma, 9- 3+","filename":"neidhardt-f2.scl","rnbo":[12,101.955,0,9,8,298.045,0,400.0,0,501.955,0,603.91,0,698.045,0,800.0,0,901.955,0,1003.91,0,1098.045,0,2,1]},"neidhardt-f3":{"title":"Neidhardt's fifth-circle no. 3, 1/6 Pyth. comma. Also Marpurg's temperament F","filename":"neidhardt-f3.scl","rnbo":[12,101.955,0,200.0,0,301.955,0,400.0,0,501.955,0,600.0,0,3,2,800.0,0,901.955,0,1000.0,0,1101.955,0,2,1]},"neidhardt-f4":{"title":"Neidhardt's fifth-circle no. 4, 1/4 Pyth. comma","filename":"neidhardt-f4.scl","rnbo":[12,96.09,0,198.045,0,300.0,0,396.09,0,4,3,600.0,0,696.09,0,798.045,0,900.0,0,16,9,1098.045,0,2,1]},"neidhardt-f5":{"title":"Neidhardt's fifth-circle no. 5, 1/12 and 1/6 Pyth. comma","filename":"neidhardt-f5.scl","rnbo":[12,100.0,0,200.0,0,298.045,0,401.955,0,501.955,0,600.0,0,700.0,0,800.0,0,898.045,0,1001.955,0,1101.955,0,2,1]},"neidhardt-f6":{"title":"Neidhardt's fifth-circle no. 6, 1/12 and 1/6 Pyth. comma","filename":"neidhardt-f6.scl","rnbo":[12,100.0,0,196.09,0,300.0,0,400.0,0,496.09,0,600.0,0,700.0,0,796.09,0,900.0,0,1000.0,0,1096.09,0,2,1]},"neidhardt-f7":{"title":"Neidhardt's fifth-circle no. 7, 1/6 and 1/4 Pyth. comma","filename":"neidhardt-f7.scl","rnbo":[12,94.135,0,194.135,0,298.045,0,400.0,0,494.135,0,596.09,0,696.09,0,800.0,0,892.18,0,16,9,1098.045,0,2,1]},"neidhardt-f9":{"title":"Neidhardt's fifth-circle no. 9, 1/12 and 1/6 Pyth. comma","filename":"neidhardt-f9.scl","rnbo":[12,98.045,0,196.09,0,300.0,0,400.0,0,4,3,596.09,0,700.0,0,800.0,0,898.045,0,16,9,1100.0,0,2,1]},"neidhardt-s1":{"title":"Neidhardt's sample temperament no. 1, 1/1, -1/1 Pyth. comma (1732)","filename":"neidhardt-s1.scl","rnbo":[12,256,243,9,8,19683,16384,8192,6561,177147,131072,1024,729,3,2,6561,4096,27,16,59049,32768,4096,2187,2,1]},"neidhardt-s2":{"title":"Neidhardt's sample temperament no. 2, 1/12, 1/6 and 1/4 Pyth. comma (1732)","filename":"neidhardt-s2.scl","rnbo":[12,256,243,194.135,0,32,27,386.31499,0,496.09,0,590.225,0,698.045,0,128,81,890.225,0,994.135,0,1088.26999,0,2,1]},"neidhardt-s3":{"title":"Neidhardt's sample temperament no. 3, 1/12, 1/6 and 1/4 Pyth. comma (1732)","filename":"neidhardt-s3.scl","rnbo":[12,92.18,0,196.09,0,296.09,0,388.26999,0,4,3,592.18,0,698.045,0,794.135,0,892.18,0,16,9,1090.225,0,2,1]},"neidhardt-t1":{"title":"Neidhardt's third-circle no. 1, 1/12, 1/6 and 1/4 Pyth. comma (1732) 'Für das Dorf'","filename":"neidhardt-t1.scl","rnbo":[12,94.135,0,194.135,0,298.045,0,392.18,0,500.0,0,594.135,0,698.045,0,796.09,0,890.225,0,998.045,0,1092.18,0,2,1]},"neidhardt-t2":{"title":"Neidhardt's third-circle no. 2, 1/12, 1/6 and 1/4 Pyth. comma (1732) 'kleine Stadt'","filename":"neidhardt-t2.scl","rnbo":[12,94.135,0,196.09,0,296.09,0,392.18,0,4,3,592.18,0,698.045,0,796.09,0,894.135,0,16,9,1092.18,0,2,1]},"neidhardt-t3":{"title":"Neidhardt's third-circle no. 3, 1/12 and 1/6 Pyth. comma","filename":"neidhardt-t3.scl","rnbo":[12,96.09,0,196.09,0,296.09,0,394.135,0,500.0,0,598.045,0,698.045,0,796.09,0,896.09,0,1001.955,0,1092.18,0,2,1]},"neidhardt-t4":{"title":"Neidhardt's third-circle no. 4, 1/12 and 1/6 Pyth. comma","filename":"neidhardt-t4.scl","rnbo":[12,96.09,0,196.09,0,296.09,0,396.09,0,4,3,596.09,0,698.045,0,796.09,0,894.135,0,1000.0,0,1094.135,0,2,1]},"neidhardt-t5":{"title":"Neidhardt's third-circle no. 5, 1/12 and 1/6 Pyth. comma","filename":"neidhardt-t5.scl","rnbo":[12,100.0,0,200.0,0,300.0,0,398.045,0,501.955,0,598.045,0,700.0,0,800.0,0,900.0,0,1000.0,0,1098.045,0,2,1]},"neidhardt1":{"title":"Neidhardt I temperament (1724)","filename":"neidhardt1.scl","rnbo":[12,94.135,0,196.09,0,296.09,0,392.18,0,4,3,592.18,0,698.045,0,796.09,0,894.135,0,16,9,1092.18,0,2,1]},"neidhardt2":{"title":"Neidhardt II temperament (1724)","filename":"neidhardt2.scl","rnbo":[12,96.09,0,196.09,0,298.045,0,394.135,0,500.0,0,596.09,0,698.045,0,796.09,0,894.135,0,1000.0,0,1096.09,0,2,1]},"neidhardt3":{"title":"Neidhardt III temperament (1724) 'große Stadt'","filename":"neidhardt3.scl","rnbo":[12,96.09,0,196.09,0,298.045,0,394.135,0,4,3,596.09,0,698.045,0,796.09,0,894.135,0,998.045,0,1096.09,0,2,1]},"neidhardt4":{"title":"Neidhardt IV temperament (1724), equal temperament","filename":"neidhardt4.scl","rnbo":[12,100.0,0,200.0,0,300.0,0,400.0,0,500.0,0,600.0,0,700.0,0,800.0,0,900.0,0,1000.0,0,1100.0,0,2,1]},"neidhardtn":{"title":"Johann Georg Neidhardt's temperament (1732), alt. 1/6 & 0 P. Also Marpurg nr. 10","filename":"neidhardtn.scl","rnbo":[12,98.045,0,200.0,0,298.045,0,400.0,0,4,3,600.0,0,698.045,0,800.0,0,898.045,0,1000.0,0,1098.045,0,2,1]},"nestoria17":{"title":"Nestoria[17], 2.3.5.19 subgroup scale in 171-tET tuning","filename":"nestoria17.scl","rnbo":[17,91.22807,0,112.2807,0,203.50877,0,294.73684,0,315.78947,0,407.01754,0,498.24561,0,589.47368,0,610.52632,0,701.75439,0,792.98246,0,814.03509,0,905.26316,0,996.49123,0,1017.54386,0,1108.77193,0,2,1]},"neutr_diat":{"title":"Neutral Diatonic, 9 + 9 + 12 parts, geometric mean of major and minor","filename":"neutr_diat.scl","rnbo":[7,9,8,350.0,0,4,3,3,2,850.0,0,1050.0,0,2,1]},"neutr_pent1":{"title":"Quasi-Neutral Pentatonic 1, 15/13 x 52/45 in each trichord, after Dudon","filename":"neutr_pent1.scl","rnbo":[5,52,45,4,3,3,2,26,15,2,1]},"neutr_pent2":{"title":"Quasi-Neutral Pentatonic 2, 15/13 x 52/45 in each trichord, after Dudon","filename":"neutr_pent2.scl","rnbo":[5,15,13,4,3,3,2,45,26,2,1]},"new_enh":{"title":"New Enharmonic","filename":"new_enh.scl","rnbo":[7,81,80,16,15,4,3,3,2,243,160,8,5,2,1]},"new_enh2":{"title":"New Enharmonic permuted","filename":"new_enh2.scl","rnbo":[7,5,4,81,64,4,3,3,2,15,8,243,128,2,1]},"newcastle":{"title":"Newcastle modified 1/3-comma meantone","filename":"newcastle.scl","rnbo":[12,77.84119,0,189.57248,0,308.47252,0,5,4,505.21376,0,583.05495,0,694.78624,0,779.79619,0,5,3,1003.25876,0,15,8,2,1]},"newton_15_out_of_53":{"title":"from drawing: Cambridge Univ.Lib.,Ms.Add.4000,fol.105v ; November 1665","filename":"newton_15_out_of_53.scl","rnbo":[15,10,9,9,8,32,27,5,4,4,3,45,32,40,27,3,2,128,81,5,3,27,16,16,9,15,8,160,81,2,1]},"newts":{"title":"11-limit scale with boatload of neutral thirds","filename":"newts.scl","rnbo":[41,32.91065,0,50.80017,0,83.50287,0,116.45974,0,149.89384,0,182.87269,0,199.6349,0,233.5407,0,266.22566,0,299.83415,0,316.84989,0,349.84324,0,383.1855,0,400.34913,0,449.39797,0,466.5616,0,499.90386,0,532.89721,0,549.91295,0,583.52144,0,616.2064,0,650.1122,0,666.87441,0,699.85326,0,733.28736,0,766.24423,0,798.94693,0,816.83645,0,849.7471,0,883.17168,0,899.88473,0,933.63277,0,966.38375,0,999.89157,0,1024.87355,0,1049.85553,0,1083.36335,0,1116.11433,0,1149.86237,0,1166.57542,0,2,1]},"niederbobritzsch":{"title":"Göthel organ, Niederbobritzsch, 19th cent. from Klaus Walter, 1988","filename":"niederbobritzsch.scl","rnbo":[12,98.045,0,202.44375,0,298.045,0,399.0225,0,503.42125,0,600.48875,0,699.0225,0,798.045,0,900.0,0,1001.46625,0,1094.135,0,2,1]},"nikriz pentachord 13-limit":{"title":"Nikriz pentachord 32:36:39:45:48","filename":"nikriz pentachord 13-limit.scl","rnbo":[4,9,8,39,32,45,32,3,2]},"nikriz pentachord 29-limit":{"title":"Nikriz pentachord 24:27:29:34:36","filename":"nikriz pentachord 29-limit.scl","rnbo":[4,9,8,29,24,17,12,3,2]},"nikriz pentachord 67-limit":{"title":"Nikriz pentachord 48:54:58:67:72","filename":"nikriz pentachord 67-limit.scl","rnbo":[4,9,8,29,24,67,48,3,2]},"nikriz pentachord 7-limit":{"title":"Nikriz pentachord 40:45:48:56:60","filename":"nikriz pentachord 7-limit.scl","rnbo":[4,9,8,6,5,7,5,3,2]},"norden":{"title":"Reconstructed Schnitger temperament, organ in Norden. Ortgies, 2002","filename":"norden.scl","rnbo":[12,85.53299,0,194.526,0,32,27,389.052,0,502.737,0,583.57799,0,697.263,0,787.48799,0,891.789,0,1000.782,0,4096,2187,2,1]},"notchedcube":{"title":"Otonal tetrads sharing a note with the root tetrad, a notched chord cube","filename":"notchedcube.scl","rnbo":[28,49,48,25,24,21,20,15,14,35,32,9,8,8,7,7,6,6,5,49,40,5,4,9,7,21,16,4,3,7,5,10,7,35,24,3,2,49,32,25,16,8,5,5,3,12,7,7,4,25,14,9,5,15,8,2,1]},"nova-lesfip":{"title":"9-limit lesfip version of Nova transversal, 14 to 21 cent tolerance","filename":"nova-lesfip.scl","rnbo":[8,124.04106,0,309.89347,0,389.76241,0,622.08606,0,3,2,887.8074,0,1011.84847,0,2,1]},"novadene":{"title":"Novadene, starling-tempered skew duodene in 185-tET tuning","filename":"novadene.scl","rnbo":[12,123.24324,0,188.10811,0,311.35135,0,389.18919,0,499.45946,0,622.7027,0,700.54054,0,810.81081,0,888.64865,0,1011.89189,0,1122.16216,0,2,1]},"novaro":{"title":"9-limit diamond with 21/20, 16/15, 15/8 and 40/21 added for evenness","filename":"novaro.scl","rnbo":[23,21,20,16,15,10,9,9,8,8,7,7,6,6,5,5,4,9,7,4,3,7,5,10,7,3,2,14,9,8,5,5,3,12,7,7,4,16,9,9,5,15,8,40,21,2,1]},"novaro15":{"title":"1-15 diamond, see Novaro, 1927, Sistema Natural base del Natural-Aproximado, p","filename":"novaro15.scl","rnbo":[49,16,15,15,14,14,13,13,12,12,11,11,10,10,9,9,8,8,7,15,13,7,6,13,11,6,5,11,9,16,13,5,4,14,11,9,7,13,10,4,3,15,11,11,8,18,13,7,5,10,7,13,9,16,11,22,15,3,2,20,13,14,9,11,7,8,5,13,8,18,11,5,3,22,13,12,7,26,15,7,4,16,9,9,5,20,11,11,6,24,13,13,7,28,15,15,8,2,1]},"novaro_eb":{"title":"Novaro (?) equal beating 4/3 with stretched octave, almost pure 3/2","filename":"novaro_eb.scl","rnbo":[12,100.59143,0,200.22381,0,301.21327,0,401.21763,0,502.56285,0,602.89958,0,702.29381,0,803.05544,0,902.8469,0,1003.98852,0,1104.13506,0,1203.35143,0]},"nufip15":{"title":"A 15-note lesfip mutant nusecond, target 11-limit diamond, error limit 12 cents","filename":"nufip15.scl","rnbo":[15,44.85398,0,156.27185,0,200.7703,0,312.16415,0,387.79495,0,466.95289,0,544.35733,0,621.76177,0,700.91971,0,776.55051,0,887.94437,0,932.44281,0,1043.86068,0,1088.71467,0,2,1]},"ochmohaporc":{"title":"Jade-mohajira-porcupine wakalix","filename":"ochmohaporc.scl","rnbo":[7,13,12,16,13,4,3,3,2,13,8,24,13,2,1]},"oconnell":{"title":"Walter O'Connell, Pythagorean scale of 25 octaves reduced by Phi, Xenharmonikon 15 (1993)","filename":"oconnell.scl","rnbo":[25,38.92318,0,69.09704,0,108.02022,0,138.19407,0,168.36793,0,207.29111,0,237.46496,0,267.63881,0,306.562,0,336.73585,0,366.9097,0,405.83289,0,436.00674,0,474.92992,0,505.10378,0,535.27763,0,574.20081,0,604.37467,0,634.54852,0,673.4717,0,703.64555,0,733.81941,0,772.74259,0,802.91644,0,833.0903,0]},"oconnell_11":{"title":"Walter O'Connell, 11-note mode of 25-tone scale","filename":"oconnell_11.scl","rnbo":[11,69.09704,0,168.36793,0,237.46496,0,306.562,0,366.9097,0,474.92992,0,535.27763,0,604.37467,0,673.4717,0,772.74259,0,833.0903,0]},"oconnell_14":{"title":"Walter O'Connell, 14-note mode of 25-tone scale","filename":"oconnell_14.scl","rnbo":[14,69.09704,0,138.19407,0,168.36793,0,237.46496,0,306.562,0,366.9097,0,436.00674,0,474.92992,0,535.27763,0,604.37467,0,673.4717,0,733.81941,0,772.74259,0,833.0903,0]},"oconnell_7":{"title":"Walter O'Connell, 7-note mode of 25-tone scale","filename":"oconnell_7.scl","rnbo":[7,138.19407,0,237.46496,0,366.9097,0,474.92992,0,604.37467,0,703.64555,0,833.0903,0]},"oconnell_9":{"title":"Walter O'Connell, 9-tone mode of 25-tone scale","filename":"oconnell_9.scl","rnbo":[9,108.02022,0,207.29111,0,267.63881,0,366.9097,0,474.92992,0,574.20081,0,634.54852,0,733.81941,0,833.0903,0]},"oconnell_9a":{"title":"Walter O'Connell, 7+2 major mode analogy for 25-tone scale","filename":"oconnell_9a.scl","rnbo":[9,69.09704,0,168.36793,0,267.63881,0,366.9097,0,474.92992,0,535.27763,0,634.54852,0,733.81941,0,833.0903,0]},"octasquare25":{"title":"5x5 generator square octagar tempered scale","filename":"octasquare25.scl","rnbo":[25,68.4275,0,88.957,0,157.3845,0,177.9139,0,208.3998,0,228.9292,0,297.3567,0,317.8862,0,386.3137,0,406.8431,0,475.2707,0,495.8001,0,564.2277,0,584.7571,0,615.2429,0,704.1999,0,793.1569,0,882.1138,0,971.0708,0,1001.5566,0,1022.0861,0,1090.5136,0,1111.043,0,1179.4706,0,2,1]},"octocoh":{"title":"Differential coherent octatonic with subharmonic 32","filename":"octocoh.scl","rnbo":[8,17,16,19,16,5,4,45,32,3,2,27,16,29,16,2,1]},"octoid72":{"title":"Octoid[72] in 224-tET tuning","filename":"octoid72.scl","rnbo":[72,16.07143,0,32.14286,0,48.21429,0,64.28571,0,85.71429,0,101.78571,0,117.85714,0,133.92857,0,150.0,0,166.07143,0,182.14286,0,198.21429,0,214.28571,0,235.71429,0,251.78571,0,267.85714,0,283.92857,0,300.0,0,316.07143,0,332.14286,0,348.21429,0,364.28571,0,385.71429,0,401.78571,0,417.85714,0,433.92857,0,450.0,0,466.07143,0,482.14286,0,498.21429,0,514.28571,0,535.71429,0,551.78571,0,567.85714,0,583.92857,0,600.0,0,616.07143,0,632.14286,0,648.21429,0,664.28571,0,685.71429,0,701.78571,0,717.85714,0,733.92857,0,750.0,0,766.07143,0,782.14286,0,798.21429,0,814.28571,0,835.71429,0,851.78571,0,867.85714,0,883.92857,0,900.0,0,916.07143,0,932.14286,0,948.21429,0,964.28571,0,985.71429,0,1001.78571,0,1017.85714,0,1033.92857,0,1050.0,0,1066.07143,0,1082.14286,0,1098.21429,0,1114.28571,0,1135.71429,0,1151.78571,0,1167.85714,0,1183.92857,0,2,1]},"octone":{"title":"octone around 60/49-7/4 interval","filename":"octone.scl","rnbo":[8,15,14,60,49,5,4,10,7,3,2,12,7,7,4,2,1]},"octony_min":{"title":"Octony on Harmonic Minor, from Palmer on an album of Turkish music","filename":"octony_min.scl","rnbo":[8,9,8,6,5,5,4,4,3,3,2,8,5,15,8,2,1]},"octony_rot":{"title":"Rotated Octony on Harmonic Minor","filename":"octony_rot.scl","rnbo":[8,5,4,4,3,3,2,25,16,8,5,5,3,15,8,2,1]},"octony_trans":{"title":"Complex 10 of p. 115, an Octony based on Archytas's Enharmonic","filename":"octony_trans.scl","rnbo":[8,28,27,16,15,5,4,4,3,25,16,45,28,5,3,2,1]},"octony_trans2":{"title":"Complex 6 of p. 115 based on Archytas's Enharmonic, an Octony","filename":"octony_trans2.scl","rnbo":[8,28,27,16,15,135,112,243,196,9,7,4,3,27,14,2,1]},"octony_trans3":{"title":"Complex 5 of p. 115 based on Archytas's Enharmonic, an Octony","filename":"octony_trans3.scl","rnbo":[8,28,27,16,15,75,64,135,112,5,4,4,3,15,8,2,1]},"octony_trans4":{"title":"Complex 11 of p. 115, an Octony based on Archytas's Enharmonic, 8 tones","filename":"octony_trans4.scl","rnbo":[8,28,27,16,15,9,7,4,3,45,28,81,49,12,7,2,1]},"octony_trans5":{"title":"Complex 15 of p. 115, an Octony based on Archytas's Enharmonic, 8 tones","filename":"octony_trans5.scl","rnbo":[8,28,27,16,15,175,144,5,4,35,27,4,3,35,18,2,1]},"octony_trans6":{"title":"Complex 14 of p. 115, an Octony based on Archytas's Enharmonic, 8 tones","filename":"octony_trans6.scl","rnbo":[8,36,35,28,27,16,15,9,7,324,245,4,3,48,35,2,1]},"octony_u":{"title":"7)8 octony from 1.3.5.7.9.11.13.15, 1.3.5.7.9.11.13 tonic (subharmonics 8-16)","filename":"octony_u.scl","rnbo":[8,15,14,15,13,5,4,15,11,3,2,5,3,15,8,2,1]},"odd1":{"title":"ODD-1","filename":"odd1.scl","rnbo":[12,25,24,6,5,5,4,36,25,3,2,25,16,8,5,5,3,9,5,15,8,48,25,2,1]},"odd2":{"title":"ODD-2","filename":"odd2.scl","rnbo":[12,10,9,9,8,75,64,6,5,5,4,4,3,25,18,3,2,5,3,9,5,15,8,2,1]},"odonnell":{"title":"John O'Donnell Bach temperament (2006), Early Music 34/4, Nov. 2006","filename":"odonnell.scl","rnbo":[12,96.09,0,196.09,0,296.09,0,396.09,0,4,3,596.09,0,698.045,0,796.09,0,894.135,0,16,9,1094.135,0,2,1]},"oettingen":{"title":"von Oettingen's Orthotonophonium tuning","filename":"oettingen.scl","rnbo":[53,81,80,128,125,25,24,135,128,16,15,27,25,1125,1024,10,9,9,8,729,640,144,125,75,64,1215,1024,6,5,243,200,10125,8192,5,4,81,64,32,25,162,125,675,512,4,3,27,20,512,375,25,18,45,32,729,512,36,25,375,256,6075,4096,3,2,243,160,192,125,25,16,405,256,8,5,81,50,3375,2048,5,3,27,16,128,75,216,125,225,128,16,9,9,5,729,400,30375,16384,15,8,243,128,48,25,125,64,2025,1024,2,1]},"oettingen2":{"title":"von Oettingen's Orthotonophonium tuning with central 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85","filename":"ogr11.scl","rnbo":[11,28.23529,0,84.70588,0,338.82353,0,409.41176,0,564.70588,0,607.05882,0,776.47059,0,960.0,0,1058.82353,0,1072.94118,0,2,1]},"ogr12":{"title":"Optimal Golomb Ruler of 12 segments, length 106","filename":"ogr12.scl","rnbo":[12,22.64151,0,56.60377,0,283.01887,0,418.86792,0,486.79245,0,667.92453,0,792.45283,0,962.26415,0,1007.54717,0,1109.43396,0,1120.75472,0,2,1]},"ogr2":{"title":"Optimal Golomb Ruler of 2 segments, length 3","filename":"ogr2.scl","rnbo":[2,400.0,0,2,1]},"ogr3":{"title":"Optimal Golomb Ruler of 3 segments, length 6","filename":"ogr3.scl","rnbo":[3,200.0,0,800.0,0,2,1]},"ogr4":{"title":"Optimal Golomb Ruler of 4 segments, length 11","filename":"ogr4.scl","rnbo":[4,109.09091,0,436.36364,0,981.81818,0,2,1]},"ogr4a":{"title":"2nd Optimal Golomb Ruler of 4 segments, length 11","filename":"ogr4a.scl","rnbo":[4,218.18182,0,763.63636,0,872.72727,0,2,1]},"ogr5":{"title":"Optimal Golomb Ruler of 5 segments, length 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5/4 10/7 3/2 12/7 7/4 2)","filename":"oktone.scl","rnbo":[8,118.81188,0,350.49505,0,386.13861,0,617.82178,0,700.9901,0,932.67327,0,968.31683,0,2,1]},"oldani":{"title":"5-limit JI scale by Norbert L. 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8 generator","filename":"orwell13eb.scl","rnbo":[13,43.573939095570594,0,157.541077275317,0,271.5082154550634,0,315.082154550634,0,429.0492927303804,0,543.0164309101268,0,586.5903700056974,0,700.5575081854438,0,814.5246463651902,0,858.0985854607608,0,972.0657236405071,0,1086.0328618202536,0,2,1]},"orwell13trans":{"title":"Orwell[13] 5-limit symmetric transversal","filename":"orwell13trans.scl","rnbo":[13,16,15,2048,1875,75,64,5,4,32,25,512,375,375,256,25,16,8,5,128,75,2048,1125,15,8,2,1]},"orwell13trans57":{"title":"Orwell[13] 2.5.7 symmetric transversal","filename":"orwell13trans57.scl","rnbo":[13,4375,4096,35,32,1024,875,5,4,32,25,175,128,256,175,25,16,8,5,875,512,64,35,8192,4375,2,1]},"orwell13trans57ex":{"title":"Orwell[13] extended 2.5.7 transversal","filename":"orwell13trans57ex.scl","rnbo":[39,134217728,133984375,586181640625,549755813888,4375,4096,32768,30625,4689453125,4294967296,35,32,4194304,3828125,153125,131072,1024,875,137438953472,117236328125,669921875,536870912,5,4,33554432,26796875,5359375,4194304,32,25,4294967296,3349609375,23447265625,17179869184,175,128,1048576,765625,765625,524288,256,175,34359738368,23447265625,3349609375,2147483648,25,16,8388608,5359375,26796875,16777216,8,5,1073741824,669921875,117236328125,68719476736,875,512,262144,153125,3828125,2097152,64,35,8589934592,4689453125,30625,16384,8192,4375,1099511627776,586181640625,133984375,67108864,2,1]},"orwell22":{"title":"Orwell[22] 7-limit 6 cents lesfip optimized","filename":"orwell22.scl","rnbo":[22,42.2392,0,114.6679,0,156.5802,0,198.8363,0,271.732,0,313.5924,0,385.989,0,428.0889,0,469.4472,0,542.8804,0,584.9577,0,657.2815,0,699.3588,0,772.792,0,814.1503,0,856.2502,0,928.6468,0,970.5072,0,1043.4029,0,1085.659,0,1127.5713,0,2,1]},"orwell22trans":{"title":"Orwell[22] 5-limit transversal","filename":"orwell22trans.scl","rnbo":[22,128,125,16,15,1125,1024,256,225,75,64,6,5,5,4,32,25,4,3,512,375,45,32,375,256,3,2,25,16,8,5,5,3,128,75,225,128,1875,1024,15,8,125,64,2,1]},"orwell22trans57":{"title":"Orwell[22] 2.5.7 transversal","filename":"orwell22trans57.scl","rnbo":[22,128,125,4375,4096,35,32,8,7,1024,875,1225,1024,5,4,32,25,8192,6125,175,128,7,5,256,175,6125,4096,25,16,8,5,2048,1225,875,512,7,4,64,35,8192,4375,125,64,2,1]},"orwell31trans":{"title":"Orwell[31] 5-limit transversal","filename":"orwell31trans.scl","rnbo":[31,128,125,25,24,16,15,1125,1024,9,8,256,225,75,64,6,5,625,512,5,4,32,25,675,512,4,3,512,375,45,32,64,45,375,256,3,2,1024,675,25,16,8,5,1024,625,5,3,128,75,225,128,16,9,2048,1125,15,8,48,25,125,64,2,1]},"orwell31trans57":{"title":"Orwell[31] 2.5.7 symmetric transversal","filename":"orwell31trans57.scl","rnbo":[31,128,125,256,245,4375,4096,35,32,28,25,8,7,1024,875,1225,1024,625,512,5,4,32,25,4096,3125,8192,6125,175,128,7,5,10,7,256,175,6125,4096,3125,2048,25,16,8,5,1024,625,2048,1225,875,512,7,4,25,14,64,35,8192,4375,245,128,125,64,2,1]},"orwell9-12":{"title":"Twelve notes of Orwell[9], POTE tuning. Useful to retune 12-tET To Orwell[9]","filename":"orwell9-12.scl","rnbo":[12,157.13063,0,157.13063,0,271.42613,0,428.55676,0,542.85225,0,542.85225,0,699.98289,0,814.27838,0,971.40901,0,971.40901,0,1085.70451,0,2,1]},"orwellismic22_11":{"title":"Unidecimal Orwellismic[22] {1728/1715, 540/539} hobbit in 111-tET","filename":"orwellismic22_11.scl","rnbo":[22,43.24324,0,108.10811,0,162.16216,0,227.02703,0,270.27027,0,313.51351,0,389.18919,0,432.43243,0,497.2973,0,540.54054,0,583.78378,0,659.45946,0,702.7027,0,767.56757,0,810.81081,0,886.48649,0,929.72973,0,972.97297,0,1037.83784,0,1081.08108,0,1156.75676,0,2,1]},"orwellismic9":{"title":"Orwellismic[9] 1728/1715 hobbit in 142-tET","filename":"orwellismic9.scl","rnbo":[9,160.56338,0,270.42254,0,430.98592,0,498.59155,0,701.40845,0,769.01408,0,929.57746,0,1039.43662,0,2,1]},"p4":{"title":"First 4 primes, for testing tempering","filename":"p4.scl","rnbo":[4,2,1,3,1,5,1,7,1]},"p5":{"title":"First 5 primes, for testing tempering","filename":"p5.scl","rnbo":[5,2,1,3,1,5,1,7,1,11,1]},"p5a":{"title":"First 5 primes plus superparticulars, for testing tempering","filename":"p5a.scl","rnbo":[9,2,1,3,1,5,1,7,1,11,1,3,2,5,4,7,6,11,10]},"p6":{"title":"First 6 primes, for testing tempering","filename":"p6.scl","rnbo":[6,2,1,3,1,5,1,7,1,11,1,13,1]},"p6a":{"title":"First 6 primes plus superparticulars, for testing tempering","filename":"p6a.scl","rnbo":[11,2,1,3,1,5,1,7,1,11,1,13,1,3,2,5,4,7,6,11,10,13,12]},"pagano_b":{"title":"Pat Pagano and David Beardsley, 17-limit scale, TL 27-2-2001","filename":"pagano_b.scl","rnbo":[12,17,16,425,384,153,128,51,40,1377,1024,17,12,119,80,51,32,17,10,85,48,119,64,2,1]},"pajara_mm":{"title":"Paul Erlich's Pajara or Twintone with minimax optimal generator and just octave","filename":"pajara_mm.scl","rnbo":[22,56.178,0,109.363,0,165.542,0,218.726,0,274.905,0,328.089,0,384.268,0,437.452,0,493.631,0,546.815,0,600.0,0,656.178,0,709.363,0,765.542,0,818.726,0,874.905,0,928.089,0,984.268,0,1037.452,0,1093.631,0,1146.815,0,2,1]},"pajara_rms":{"title":"Paul Erlich's Pajara or Twintone with RMS optimal generator and just octave","filename":"pajara_rms.scl","rnbo":[22,52.886,0,108.814,0,161.7,0,217.629,0,270.515,0,326.443,0,379.329,0,435.257,0,488.143,0,544.072,0,600.0,0,652.886,0,708.814,0,761.7,0,817.629,0,870.515,0,926.443,0,979.329,0,1035.257,0,1088.143,0,1144.072,0,2,1]},"pajara_top":{"title":"Paul Erlich's Pajara, TOP tuning","filename":"pajara_top.scl","rnbo":[22,40.95257,0,106.56655,0,172.18053,0,213.13309,0,278.74707,0,319.69964,0,385.31362,0,426.26618,0,491.88016,0,532.83273,0,598.44671,0,639.39928,0,705.01326,0,770.62724,0,811.5798,0,877.19378,0,918.14635,0,983.76033,0,1024.71289,0,1090.32688,0,1131.27944,0,1196.89342,0]},"pajhedgepythquas1":{"title":"Pajara-hedgehog-superpyth-quasisuper wakalix 1","filename":"pajhedgepythquas1.scl","rnbo":[22,36,35,21,20,54,49,8,7,7,6,6,5,49,40,9,7,4,3,27,20,7,5,72,49,3,2,54,35,8,5,49,30,12,7,7,4,9,5,28,15,27,14,2,1]},"pajhedgepythquas2":{"title":"Pajara-hedgehog-superpyth-quasisuper wakalix 2","filename":"pajhedgepythquas2.scl","rnbo":[22,36,35,21,20,54,49,9,8,7,6,6,5,49,40,9,7,4,3,27,20,7,5,72,49,3,2,54,35,63,40,49,30,12,7,7,4,9,5,28,15,27,14,2,1]},"pajmagorpor22":{"title":"Pajara-magic-orwell-porcupine Fokker block","filename":"pajmagorpor22.scl","rnbo":[22,33,32,16,15,11,10,9,8,75,64,6,5,5,4,165,128,33,25,11,8,45,32,35,24,3,2,99,64,8,5,33,20,12,7,7,4,231,128,15,8,77,40,2,1]},"pajmagorpor22_100":{"title":"Rank four 100/99 tempering of pajmagorpor22, POTE tuning","filename":"pajmagorpor22_100.scl","rnbo":[22,63.18177,0,110.97925,0,174.16103,0,209.90648,0,273.08826,0,320.88573,0,384.06751,0,447.24928,0,495.04676,0,558.22853,0,593.97399,0,649.9946,0,704.95324,0,768.13501,0,815.93249,0,879.11427,0,934.07291,0,970.88033,0,1034.06211,0,1089.02075,0,1145.04136,0,2,1]},"pajmagorpor22_176":{"title":"Rank four 176/175 tempering of pajmagorpor22, POTE tuning","filename":"pajmagorpor22_176.scl","rnbo":[22,54.68433,0,107.19102,0,161.87535,0,206.08981,0,282.57306,0,313.28083,0,389.76408,0,444.44841,0,475.15618,0,551.63943,0,595.85388,0,658.83045,0,703.0449,0,757.72924,0,810.23592,0,864.92026,0,930.93363,0,972.11128,0,1026.79561,0,1092.80898,0,1133.98663,0,2,1]},"pajmagorpor22_225":{"title":"Rank four 225/224 tempering of pajmagorpor22, POTE tuning","filename":"pajmagorpor22_225.scl","rnbo":[22,49.65828,0,115.95486,0,165.61314,0,200.81497,0,267.68278,0,316.76984,0,383.63765,0,433.29593,0,482.38298,0,549.25079,0,584.45262,0,651.32043,0,700.40749,0,750.06577,0,816.36235,0,866.02063,0,932.31722,0,968.09027,0,1017.74855,0,1084.04514,0,1133.70341,0,2,1]},"pajmagorpor22_385":{"title":"Rank four 385/384 tempering of pajmagorpor22, POTE tuning","filename":"pajmagorpor22_385.scl","rnbo":[22,50.64769,0,113.50393,0,164.15162,0,202.90337,0,271.54046,0,316.4073,0,385.04439,0,435.69208,0,480.55892,0,549.19601,0,587.94776,0,650.80399,0,701.45169,0,752.09938,0,814.95561,0,865.60331,0,934.24039,0,967.21129,0,1017.85899,0,1086.49607,0,1131.36291,0,2,1]},"pajmagorpor22apollo":{"title":"Apollo tempering of pajmagorpor22, POTE tuning","filename":"pajmagorpor22apollo.scl","rnbo":[22,59.72193,0,114.91209,0,174.63402,0,206.96926,0,266.69119,0,321.88135,0,381.60328,0,441.32521,0,496.51537,0,556.2373,0,588.57254,0,648.29447,0,703.48463,0,763.20656,0,818.39672,0,878.11865,0,933.30881,0,970.17582,0,1029.89775,0,1085.08791,0,1144.80984,0,2,1]},"pajmagorpor22ares":{"title":"Ares tempering of pajmagorpor22, POTE tuning","filename":"pajmagorpor22ares.scl","rnbo":[22,73.21461,0,98.86242,0,172.07703,0,219.3737,0,292.58832,0,318.23612,0,391.45073,0,464.66535,0,490.31315,0,563.52776,0,610.82443,0,662.39018,0,709.68685,0,782.90147,0,808.54927,0,881.76388,0,929.06055,0,980.6263,0,1053.84091,0,1101.13758,0,1152.70333,0,2,1]},"pajmagorpor22marvel":{"title":"Marvel tempering of pajmagorpor22, POTE tuning","filename":"pajmagorpor22marvel.scl","rnbo":[22,49.37898,0,116.07099,0,165.44997,0,200.77735,0,267.46935,0,316.84833,0,383.54034,0,432.91932,0,482.2983,0,548.99031,0,584.31769,0,651.00969,0,700.38867,0,749.76765,0,816.45966,0,865.83864,0,932.53065,0,967.85803,0,1017.23701,0,1083.92901,0,1133.30799,0,2,1]},"pajmagorpor22minerva":{"title":"Minerva tempering of pajmagorpor22, POTE tuning","filename":"pajmagorpor22minerva.scl","rnbo":[22,47.01032,0,113.1826,0,160.19292,0,200.51855,0,273.37552,0,313.70115,0,386.55812,0,433.56845,0,473.89407,0,546.75105,0,587.07667,0,659.93365,0,700.25927,0,747.2696,0,813.44188,0,860.4522,0,926.62448,0,973.6348,0,1020.64512,0,1086.8174,0,1133.82772,0,2,1]},"pajmagorpor22supermagic":{"title":"Supermagic tempering of pajmagorpor22, POTE tuning","filename":"pajmagorpor22supermagic.scl","rnbo":[22,58.88026,0,114.26208,0,173.14233,0,208.39706,0,267.27732,0,322.65914,0,381.53939,0,440.41965,0,495.80147,0,554.68173,0,589.93645,0,645.31827,0,704.19853,0,763.07879,0,818.46061,0,877.34086,0,936.22112,0,967.97741,0,1026.85767,0,1085.73792,0,1141.11974,0,2,1]},"palace":{"title":"Palace mode+","filename":"palace.scl","rnbo":[12,18,17,9,8,8,7,9,7,4,3,10,7,3,2,36,23,18,11,12,7,9,5,2,1]},"palace2":{"title":"Byzantine Palace mode, 17-limit","filename":"palace2.scl","rnbo":[7,18,17,9,7,4,3,3,2,18,11,9,5,2,1]},"panpipe1":{"title":"Palina panpipe of Solomon Islands, 1/1=f+45c, from Ocora CD Guadalcanal","filename":"panpipe1.scl","rnbo":[6,270.0,0,487.0,0,676.0,0,836.0,0,1035.0,0,2,1]},"panpipe2":{"title":"Lalave panpipe of Solomon Islands. 1/1=f'+47c.","filename":"panpipe2.scl","rnbo":[15,245.0,0,456.0,0,689.0,0,883.0,0,1056.0,0,1256.0,0,1457.0,0,1643.0,0,1822.0,0,1976.0,0,2169.0,0,2285.0,0,2444.0,0,2606.0,0,2854.0,0]},"panpipe3":{"title":"Tenaho panpipe of Solomon Islands. 1/1=f'+67c.","filename":"panpipe3.scl","rnbo":[15,251.0,0,461.0,0,658.0,0,873.0,0,1061.0,0,1261.0,0,1443.0,0,1648.0,0,1835.0,0,1982.0,0,2151.0,0,2311.0,0,2435.0,0,2571.0,0,2776.0,0]},"parachrom":{"title":"Parachromatic, new genus 5 + 5 + 20 parts","filename":"parachrom.scl","rnbo":[7,83.33333,0,166.66667,0,500.0,0,700.0,0,783.33333,0,866.66667,0,2,1]},"parakleismic":{"title":"Parakleismic temperament, g=315.250913, 5-limit","filename":"parakleismic.scl","rnbo":[42,50.771,0,61.00365,0,111.77465,0,122.0073,0,132.23996,0,183.01096,0,193.24361,0,244.01461,0,254.24726,0,305.01826,0,315.25091,0,366.02191,0,376.25457,0,386.48722,0,437.25822,0,447.49087,0,498.26187,0,508.49452,0,559.26552,0,569.49817,0,620.26917,0,630.50183,0,681.27283,0,691.50548,0,701.73813,0,752.50913,0,762.74178,0,813.51278,0,823.74543,0,874.51643,0,884.74909,0,935.52009,0,945.75274,0,996.52374,0,1006.75639,0,1016.98904,0,1067.76004,0,1077.9927,0,1128.7637,0,1138.99635,0,1189.76735,0,2,1]},"parapyth12-7":{"title":"2.3.7 transversal of parapyth12","filename":"parapyth12-7.scl","rnbo":[12,28,27,9,8,7,6,81,64,21,16,112,81,3,2,14,9,27,16,7,4,243,128,2,1]},"parapyth12":{"title":"A triple Fokker block of the 2.3.7.11.13 temperament called Parapyth, TOP tuning","filename":"parapyth12.scl","rnbo":[12,58.23604,0,206.95866,0,265.19471,0,413.91733,0,472.15337,0,554.50965,0,703.23227,0,761.46832,0,910.19094,0,968.42698,0,1117.1496,0,1199.50588,0]},"parapyth12trans":{"title":"A JI transversal of parapyth17.scl for use in calculations. If you temper out 352/351 and 364/363 it becomes parapyth17","filename":"parapyth12trans.scl","rnbo":[12,28,27,9,8,7,6,14,11,21,16,11,8,3,2,14,9,22,13,7,4,21,11,2,1]},"parapyth17-7":{"title":"2.3.7 transversal of parapyth17","filename":"parapyth17-7.scl","rnbo":[17,28,27,2187,2048,9,8,7,6,896,729,81,64,21,16,112,81,729,512,3,2,14,9,3584,2187,27,16,7,4,448,243,243,128,2,1]},"parapyth17trans":{"title":"A JI transversal of parapyth17.scl for use in calculations. If you temper out 352/351 and 364/363 it becomes parapyth17","filename":"parapyth17trans.scl","rnbo":[17,28,27,14,13,9,8,7,6,11,9,14,11,21,16,11,8,56,39,3,2,14,9,13,8,22,13,7,4,11,6,21,11,2,1]},"parizek_13lqmt":{"title":"13-limit Quasi-meantone (darker)","filename":"parizek_13lqmt.scl","rnbo":[12,5488,5265,392,351,140,117,56,45,4,3,490,351,175,117,14,9,5,3,25,14,1960,1053,2,1]},"parizek_17lqmt":{"title":"17-limit Quasi-meantone","filename":"parizek_17lqmt.scl","rnbo":[12,25,24,125,112,325,272,5,4,75,56,2275,1632,1625,1088,25,16,5,3,25,14,8125,4352,2,1]},"parizek_7lmtd1":{"title":"7-limit Quasi-Meantone No. 1, 1/1=D","filename":"parizek_7lmtd1.scl","rnbo":[12,15,14,28,25,6,5,5,4,75,56,7,5,3,2,8,5,375,224,224,125,15,8,2,1]},"parizek_7lqmtd2":{"title":"7-limit Quasi-meantone no. 2 (1/1 is D)","filename":"parizek_7lqmtd2.scl","rnbo":[12,15,14,28,25,6,5,5,4,75,56,7,5,112,75,8,5,375,224,224,125,28,15,2,1]},"parizek_cirot":{"title":"Overtempered circular tuning (1/1 is F)","filename":"parizek_cirot.scl","rnbo":[12,78.49499,0,198.045,0,282.40499,0,388.26999,0,494.135,0,584.35999,0,703.91,0,776.53999,0,892.18,0,988.26999,0,1090.225,0,2,1]},"parizek_epi":{"title":"In The Epimoric World","filename":"parizek_epi.scl","rnbo":[12,13,12,7,6,6,5,5,4,4,3,7,5,3,2,8,5,5,3,7,4,11,6,2,1]},"parizek_epi2":{"title":"In the Epimoric World - extended (version for two keyboards)","filename":"parizek_epi2.scl","rnbo":[24,13,12,11,10,10,9,9,8,8,7,7,6,6,5,5,4,9,7,4,3,11,8,7,5,10,7,3,2,14,9,8,5,5,3,12,7,7,4,16,9,9,5,11,6,2,1,2,1]},"parizek_epi2a":{"title":"In the Epimoric World 2a (Almost the same as EPI2)","filename":"parizek_epi2a.scl","rnbo":[24,13,12,11,10,9,8,8,7,7,6,6,5,5,4,9,7,4,3,11,8,7,5,10,7,3,2,11,7,8,5,13,8,5,3,12,7,7,4,9,5,11,6,13,7,2,1,2,1]},"parizek_ji1":{"title":"Petr Parizek, 12-tone septimal tuning (2002). Dominant-diminished-pajara-injera-meantone wakalix","filename":"parizek_ji1.scl","rnbo":[12,21,20,9,8,7,6,5,4,21,16,7,5,3,2,63,40,5,3,7,4,15,8,2,1]},"parizek_jiweltmp":{"title":"19-limit Rational Well Temperament","filename":"parizek_jiweltmp.scl","rnbo":[12,17,16,9,8,19,16,34,27,4,3,17,12,3,2,51,32,32,19,16,9,17,9,2,1]},"parizek_jiwt2":{"title":"Rational Well Temperament 2 (1/1 is Db)","filename":"parizek_jiwt2.scl","rnbo":[12,17,16,9,8,19,16,81,64,4,3,64,45,3,2,1216,765,27,16,16,9,243,128,2,1]},"parizek_jiwt3":{"title":"Rational Well-temperament 3","filename":"parizek_jiwt3.scl","rnbo":[12,256,243,272,243,32,27,304,243,4,3,1024,729,256,171,128,81,256,153,16,9,4096,2187,2,1]},"parizek_llt7":{"title":"7-tone mode of Linear Level Tuning 2000 (= wilson_helix.scl)","filename":"parizek_llt7.scl","rnbo":[7,13,12,5,4,11,8,3,2,13,8,11,6,2,1]},"parizek_lt13":{"title":"Linear temperament, g=sqrt(11/8)","filename":"parizek_lt13.scl","rnbo":[13,80.93074,0,178.29486,0,275.65897,0,356.58971,0,453.95383,0,11,8,632.24868,0,729.6128,0,826.97691,0,907.90765,0,1005.27177,0,1102.63588,0,2,1]},"parizek_lt130":{"title":"Linear temperament, g=13th root of 130, with good 1:2:5:11:13. TL 23-03-2008","filename":"parizek_lt130.scl","rnbo":[13,96.43713,0,192.87427,0,289.3114,0,385.74854,0,482.18567,0,578.62281,0,648.21857,0,744.6557,0,841.09284,0,937.52997,0,1033.96711,0,1130.40424,0,2,1]},"parizek_meanqr":{"title":"Rational approx. of 1/4-comma meantone for beat-rate tuning, 1/1 = 257.2 Hz, TL 17-12-2005","filename":"parizek_meanqr.scl","rnbo":[12,5375,5144,6470,5787,3846,3215,5,4,860,643,16175,11574,1923,1286,25,16,1075,643,10352,5787,9615,5144,2,1]},"parizek_part7_12":{"title":"Partial 7-limit half-octave temperament","filename":"parizek_part7_12.scl","rnbo":[12,29.27333,0,130.55859,0,231.84384,0,314.97154,0,416.25679,0,600.0,0,629.27333,0,730.55859,0,831.84384,0,914.97154,0,1016.25679,0,2,1]},"parizek_qmeb1":{"title":"Equal beating quasi-meantone tuning no. 1 - F...A# (1/1 = 261.7Hz)(3/2 5/3 5/4 7/4 7/6)","filename":"parizek_qmeb1.scl","rnbo":[12,87555,83744,5863,5234,48855,41872,3270,2617,10513,7851,29305,20936,3923,2617,16345,10468,4380,2617,9157,5234,9775,5234,2,1]},"parizek_qmeb2":{"title":"Equal beating quasi-meantone tuning no. 2 - F...A# (1/1 = 262.7Hz)","filename":"parizek_qmeb2.scl","rnbo":[12,5505,5254,2946,2627,49195,42032,3285,2627,10553,7881,29445,21016,3933,2627,16445,10508,4400,2627,9187,5254,9835,5254,2,1]},"parizek_qmeb3":{"title":"Equal beating quasi-meantone tuning no. 3 - F...A#. 1/1 = 262Hz","filename":"parizek_qmeb3.scl","rnbo":[12,2197,2096,147,131,9819,8384,1311,1048,877,655,5877,4192,785,524,3281,2096,439,262,1833,1048,1963,1048,2,1]},"parizek_qmtp12":{"title":"12-tone quasi-meantone tuning with 1/9 Pyth. comma as basic tempering unit (F...A#)","filename":"parizek_qmtp12.scl","rnbo":[12,77.19166,0,196.09,0,268.06832,0,8192,6561,505.865,0,583.05666,0,699.34833,0,771.32665,0,890.225,0,967.41665,0,1083.70833,0,2,1]},"parizek_qmtp24":{"title":"24-tone quasi-meantone tuning with 1/9 Pyth. comma as basic tempering unit (Bbb...C##)","filename":"parizek_qmtp24.scl","rnbo":[24,74.58499,0,121.50501,0,151.77665,0,196.09,0,268.06832,0,314.98834,0,8192,6561,43046721,33554432,461.55165,0,505.865,0,580.44999,0,627.37001,0,652.42831,0,699.34833,0,67108864,43046721,6561,4096,890.225,0,934.53835,0,967.41665,0,1011.73001,0,1083.70833,0,1130.62835,0,1155.68665,0,2,1]},"parizek_ragipuq1":{"title":"17-step ragisma pump, symmetric (7/6, 5/1, 2/7)","filename":"parizek_ragipuq1.scl","rnbo":[17,7,6,1,3,5,3,35,18,5,9,35,54,175,54,25,27,175,162,25,81,125,81,875,486,125,243,875,1458,4375,1458,625,729,4375,4374]},"parizek_rphi":{"title":"The most difficult 10-tone quasi-linear normalized phi chain","filename":"parizek_rphi.scl","rnbo":[10,24157817,22811548,102334155,91246192,7049156,5702887,7465176,5702887,31622993,22811548,33489287,22811548,9227465,5702887,39088169,22811548,165580141,91246192,2,1]},"parizek_syndiat":{"title":"Petr Parizek, diatonic scale with syntonic alternatives","filename":"parizek_syndiat.scl","rnbo":[12,10,9,9,8,5,4,4,3,27,20,40,27,3,2,5,3,27,16,50,27,15,8,2,1]},"parizek_syntonal":{"title":"Petr Parizek, Syntonic corrections in JI tonality, Jan. 2004","filename":"parizek_syntonal.scl","rnbo":[12,25,24,10,9,9,8,5,4,4,3,45,32,3,2,25,16,5,3,27,16,15,8,2,1]},"parizek_temp":{"title":"Nice small scale, TL 10-12-2007","filename":"parizek_temp.scl","rnbo":[6,111.78823,0,162.73726,0,274.52549,0,325.47451,0,437.26274,0,600.0,0]},"parizek_temp19":{"title":"Petr Parizek, genus [3 3 19 19 19] well temperament","filename":"parizek_temp19.scl","rnbo":[12,1083,1024,9,8,19,16,20577,16384,171,128,361,256,3,2,3249,2048,6859,4096,57,32,61731,32768,2,1]},"parizek_triharmon":{"title":"The triharmonic scale","filename":"parizek_triharmon.scl","rnbo":[20,99.53378,0,257.54248,0,357.07625,0,456.61003,0,614.61873,0,714.15251,0,8,5,971.69498,0,1071.22876,0,1170.76254,0,1328.77124,0,1428.30502,0,5,2,1685.84749,0,1785.38127,0,1943.38997,0,2042.92375,0,2142.45752,0,2300.46622,0,4,1]},"parizek_well":{"title":"Well-temperament with 1/6-P fifths","filename":"parizek_well.scl","rnbo":[12,98.045,0,200.0,0,298.045,0,396.09,0,4,3,596.09,0,3,2,796.09,0,898.045,0,1000.0,0,1094.135,0,2,1]},"parizek_xid1":{"title":"Semisixth in two octaves","filename":"parizek_xid1.scl","rnbo":[16,73.18474,0,258.10077,0,443.01679,0,627.93282,0,701.11756,0,886.03359,0,1070.94962,0,1144.13436,0,1329.05038,0,1513.96641,0,1587.15115,0,1772.06718,0,1956.98321,0,2030.16795,0,2215.08397,0,4,1]},"parizek_xid2":{"title":"Semitenth in two octaves","filename":"parizek_xid2.scl","rnbo":[16,129.05038,0,258.10077,0,387.15115,0,627.93282,0,756.98321,0,886.03359,0,1015.08397,0,1144.13436,0,1384.91603,0,1513.96641,0,1643.01679,0,1772.06718,0,1901.11756,0,2141.89923,0,2270.94962,0,4,1]},"parizekhex":{"title":"Union of the parizek-miller wakalix hexagon, itself a 17c wakalix","filename":"parizekhex.scl","rnbo":[17,21,20,15,14,9,8,7,6,25,21,5,4,21,16,7,5,10,7,3,2,63,40,45,28,5,3,7,4,25,14,15,8,2,1]},"parrot":{"title":"jamesbond-bipelog-decimal-injera 14c wakalix","filename":"parrot.scl","rnbo":[14,21,20,9,8,7,6,5,4,21,16,4,3,7,5,3,2,63,40,5,3,7,4,28,15,15,8,2,1]},"part12":{"title":"9+3=12 partition scale <12 19 27| epimorphic","filename":"part12.scl","rnbo":[12,10,9,9,8,32,27,81,64,4,3,40,27,3,2,128,81,27,16,16,9,160,81,2,1]},"partch-barstow":{"title":"Guitar scale for Partch's Barstow (1941, 1968)","filename":"partch-barstow.scl","rnbo":[18,16,15,11,10,10,9,9,8,8,7,6,5,5,4,4,3,11,8,10,7,3,2,8,5,5,3,12,7,9,5,11,6,15,8,2,1]},"partch-greek":{"title":"Partch Greek scales from \"Two Studies on Ancient Greek Scales\" on black/white","filename":"partch-greek.scl","rnbo":[12,1,1,28,27,9,8,16,15,4,3,6,5,3,2,3,2,14,9,8,5,8,5,2,1]},"partch-grm":{"title":"Partch Greek scales from \"Two Studies on Ancient Greek Scales\" mixed","filename":"partch-grm.scl","rnbo":[9,28,27,16,15,9,8,6,5,4,3,3,2,14,9,8,5,2,1]},"partch-indian":{"title":"Partch's Indian Chromatic, Exposition of Monophony, 1933","filename":"partch-indian.scl","rnbo":[22,33,32,17,16,12,11,9,8,7,6,6,5,5,4,9,7,4,3,11,8,7,5,22,15,3,2,14,9,11,7,18,11,27,16,7,4,20,11,15,8,64,33,2,1]},"partch_29-av":{"title":"29-tone JI scale from Partch's Adapted Viola (1928-1930)","filename":"partch_29-av.scl","rnbo":[29,33,32,21,20,15,14,12,11,10,9,8,7,7,6,6,5,11,9,5,4,9,7,4,3,11,8,7,5,10,7,16,11,3,2,14,9,8,5,18,11,5,3,12,7,7,4,9,5,11,6,28,15,40,21,64,33,2,1]},"partch_29":{"title":"Partch/Ptolemy 11-limit Diamond","filename":"partch_29.scl","rnbo":[29,12,11,11,10,10,9,9,8,8,7,7,6,6,5,11,9,5,4,14,11,9,7,4,3,11,8,7,5,10,7,16,11,3,2,14,9,11,7,8,5,18,11,5,3,12,7,7,4,16,9,9,5,20,11,11,6,2,1]},"partch_37":{"title":"From \"Exposition on Monophony\" 1933, unp. see Ayers, 1/1 vol.9 no.2","filename":"partch_37.scl","rnbo":[37,49,48,33,32,22,21,16,15,12,11,11,10,10,9,9,8,8,7,7,6,6,5,11,9,5,4,14,11,9,7,4,3,11,8,7,5,10,7,16,11,3,2,14,9,11,7,8,5,18,11,5,3,12,7,7,4,16,9,9,5,20,11,11,6,15,8,21,11,64,33,96,49,2,1]},"partch_39":{"title":"Ur-Partch Keyboard 39 tones, published in Interval","filename":"partch_39.scl","rnbo":[39,49,48,33,32,22,21,16,15,12,11,10,9,9,8,8,7,7,6,6,5,11,9,5,4,14,11,9,7,21,16,4,3,15,11,11,8,7,5,10,7,16,11,22,15,3,2,32,21,14,9,11,7,8,5,18,11,5,3,12,7,7,4,16,9,9,5,11,6,15,8,21,11,64,33,96,49,2,1]},"partch_41":{"title":"13-limit Diamond after Partch, Genesis of a Music, p 454, 2nd edition","filename":"partch_41.scl","rnbo":[41,14,13,13,12,12,11,11,10,10,9,9,8,8,7,7,6,13,11,6,5,11,9,16,13,5,4,14,11,9,7,13,10,4,3,11,8,18,13,7,5,10,7,13,9,16,11,3,2,20,13,14,9,11,7,8,5,13,8,18,11,5,3,22,13,12,7,7,4,16,9,9,5,20,11,11,6,24,13,13,7,2,1]},"partch_41a":{"title":"From \"Exposition on Monophony\" 1933, unp. see Ayers, 1/1 vol.9 no.2","filename":"partch_41a.scl","rnbo":[41,49,48,33,32,22,21,16,15,12,11,11,10,10,9,9,8,8,7,7,6,6,5,11,9,5,4,14,11,9,7,21,16,4,3,15,11,11,8,7,5,10,7,16,11,22,15,3,2,32,21,14,9,11,7,8,5,18,11,5,3,12,7,7,4,16,9,9,5,20,11,11,6,15,8,21,11,64,33,96,49,2,1]},"partch_41comb":{"title":"41-tone JI combination from Partch's 29-tone and 37-tone scales","filename":"partch_41comb.scl","rnbo":[41,49,48,33,32,22,21,21,20,16,15,15,14,12,11,11,10,10,9,9,8,8,7,7,6,6,5,11,9,5,4,14,11,9,7,4,3,11,8,7,5,10,7,16,11,3,2,14,9,11,7,8,5,18,11,5,3,12,7,7,4,16,9,9,5,20,11,11,6,28,15,15,8,40,21,21,11,64,33,96,49,2,1]},"partch_43":{"title":"Harry Partch's 43-tone pure scale","filename":"partch_43.scl","rnbo":[43,81,80,33,32,21,20,16,15,12,11,11,10,10,9,9,8,8,7,7,6,32,27,6,5,11,9,5,4,14,11,9,7,21,16,4,3,27,20,11,8,7,5,10,7,16,11,40,27,3,2,32,21,14,9,11,7,8,5,18,11,5,3,27,16,12,7,7,4,16,9,9,5,20,11,11,6,15,8,40,21,64,33,160,81,2,1]},"partch_43a":{"title":"From \"Exposition on Monophony\" 1933, unp. see Ayers, 1/1 vol.9 no.2","filename":"partch_43a.scl","rnbo":[43,49,48,33,32,21,20,16,15,12,11,11,10,10,9,9,8,8,7,7,6,32,27,6,5,11,9,5,4,14,11,9,7,21,16,4,3,15,11,11,8,7,5,10,7,16,11,22,15,3,2,32,21,14,9,11,7,8,5,18,11,5,3,27,16,12,7,7,4,16,9,9,5,20,11,11,6,15,8,40,21,64,33,96,49,2,1]},"patala":{"title":"Observed patala tuning from Burma, Helmholtz/Ellis p. 518, nr.83","filename":"patala.scl","rnbo":[7,176.0,0,350.0,0,533.0,0,707.0,0,899.0,0,1053.0,0,1246.0,0]},"paulsmagic":{"title":"Circulating Magic[22] lesfip, 9-limit, 12 cent tolerance, from Paul Erlich erlich5.scl","filename":"paulsmagic.scl","rnbo":[22,59.24115,0,102.13353,0,145.0259,0,204.26705,0,262.58518,0,322.72878,0,379.53398,0,439.8781,0,496.63805,0,526.89129,0,584.58102,0,643.08125,0,702.13353,0,761.1858,0,819.68603,0,877.37576,0,907.629,0,964.38895,0,1024.73307,0,1081.53827,0,1141.68187,0,2,1]},"pel-pelog":{"title":"Pelog-like pelogic[7]","filename":"pel-pelog.scl","rnbo":[7,134.4149,0,268.82979,0,537.65958,0,672.07448,0,806.48937,0,940.90427,0,1209.73406,0]},"pelog1":{"title":"Gamelan Saih pitu from Ksatria, Den Pasar (South Bali). 1/1=312.5 Hz","filename":"pelog1.scl","rnbo":[7,153.0,0,315.0,0,552.0,0,706.0,0,848.0,0,1058.0,0,2,1]},"pelog10":{"title":"Balinese saih 7 scale, Krobokan. 1/1=275 Hz. McPhee, Music in Bali, 1966","filename":"pelog10.scl","rnbo":[7,179.25315,0,294.52841,0,466.27835,0,670.18835,0,813.68629,0,909.35892,0,2,1]},"pelog11":{"title":"Balinese saih pitu, gamelan luang, banjar Sèséh. 1/1=276 Hz. McPhee, 1966","filename":"pelog11.scl","rnbo":[7,172.96917,0,386.31371,0,516.76123,0,685.14677,0,906.79403,0,1045.93815,0,2,1]},"pelog12":{"title":"Balinese saih pitu, gamelan Semar Pegulingan, Tampak Gangsai, 1/1=310, McPhee","filename":"pelog12.scl","rnbo":[7,144.57645,0,282.7539,0,546.23355,0,671.91114,0,774.85984,0,1023.79033,0,2,1]},"pelog13":{"title":"Balinese saih pitu, gamelan Semar Pegulingan, Klungkung, 1/1=325. McPhee, 1966","filename":"pelog13.scl","rnbo":[7,177.06863,0,368.10694,0,512.63227,0,710.81044,0,954.30653,0,1101.35872,0,2,1]},"pelog14":{"title":"Balinese saih pitu, suling gambuh, Tabanan, 1/1=211 Hz, McPhee, 1966","filename":"pelog14.scl","rnbo":[7,164.25817,0,293.62212,0,489.82059,0,626.48975,0,747.83606,0,851.22404,0,2,1]},"pelog15":{"title":"Balinese saih pitu, suling gambuh, Batuan, 1/1=202 Hz. McPhee, 1966","filename":"pelog15.scl","rnbo":[7,147.77788,0,280.28666,0,476.48514,0,626.03713,0,769.19584,0,849.73288,0,2,1]},"pelog16":{"title":"Balinese 5-tone pelog, \"Tembung chenik\", 1/1=273 Hz, McPhee, 1966","filename":"pelog16.scl","rnbo":[5,134.1768,0,317.75384,0,10,7,798.55929,0,2,1]},"pelog17":{"title":"Balinese 5-tone pelog, \"Selisir Sunarèn\", 1/1=310 Hz, McPhee, 1966","filename":"pelog17.scl","rnbo":[5,185.19378,0,6,5,645.18814,0,792.61624,0,2,1]},"pelog18":{"title":"Balinese 5-tone pelog, \"Selisir pelègongan\", 1/1=305 Hz, McPhee, 1966","filename":"pelog18.scl","rnbo":[5,109.95657,0,287.0252,0,614.64739,0,748.62182,0,2,1]},"pelog19":{"title":"Balinese 5-tone pelog, \"Demung\", 1/1=362 Hz, McPhee, 1966","filename":"pelog19.scl","rnbo":[5,207.09535,0,314.04641,0,761.49652,0,854.45089,0,2,1]},"pelog2":{"title":"Bamboo gambang from Batu lulan (South Bali). 1/1=315 Hz","filename":"pelog2.scl","rnbo":[7,150.0,0,321.0,0,483.0,0,685.0,0,838.0,0,1003.0,0,2,1]},"pelog20":{"title":"Balinese 4-tone pelog, gamelan bebonang, Sayan village, 1/1=290 Hz, McPhee, 1966","filename":"pelog20.scl","rnbo":[4,197.26418,0,569.67233,0,669.8198,0,2,1]},"pelog3":{"title":"Gamelan Gong from Padangtegal, distr. Ubud (South Bali). 1/1=555 Hz","filename":"pelog3.scl","rnbo":[5,152.0,0,326.0,0,692.0,0,825.0,0,2,1]},"pelog4":{"title":"Hindu-Jav. demung, excavated in Banjarnegara. 1/1=427 Hz","filename":"pelog4.scl","rnbo":[7,184.0,0,334.0,0,518.0,0,669.0,0,880.0,0,1016.0,0,2,1]},"pelog5":{"title":"Gamelan Kyahi Munggang (Paku Alaman, Jogja). 1/1=199.5 Hz","filename":"pelog5.scl","rnbo":[7,146.0,0,299.0,0,544.0,0,695.0,0,850.0,0,1008.0,0,2,1]},"pelog6":{"title":"Gamelan Semar pegulingan, Ubud (S. Bali). 1/1=263.5 Hz","filename":"pelog6.scl","rnbo":[6,130.0,0,326.0,0,526.0,0,675.0,0,792.0,0,2,1]},"pelog7":{"title":"Gamelan Kantjilbelik (kraton Jogja). Measured by Surjodiningrat, 1972.","filename":"pelog7.scl","rnbo":[7,125.0,0,256.0,0,523.0,0,668.0,0,788.0,0,934.0,0,2,1]},"pelog8":{"title":"from William Malm: Music Cultures of the Pacific, the Near East and Asia.","filename":"pelog8.scl","rnbo":[14,125.0,0,266.0,0,563.0,0,676.0,0,800.0,0,965.0,0,1220.0,0,1360.0,0,1503.0,0,1778.0,0,1905.0,0,2021.0,0,2225.0,0,2447.0,0]},"pelog_24":{"title":"Subset of 24-tET (Sumatra?). Also Arabic Segah (Dudon) Two 4+3+3 tetrachords","filename":"pelog_24.scl","rnbo":[7,200.0,0,350.0,0,500.0,0,700.0,0,900.0,0,1050.0,0,2,1]},"pelog_9":{"title":"9-tET \"Pelog\"","filename":"pelog_9.scl","rnbo":[7,133.33333,0,266.66667,0,533.33333,0,666.66667,0,800.0,0,933.33333,0,2,1]},"pelog_a":{"title":"Pelog, average class A. Kunst 1949","filename":"pelog_a.scl","rnbo":[7,122.0,0,271.0,0,571.0,0,677.0,0,785.0,0,947.0,0,2,1]},"pelog_av":{"title":"\"Normalised Pelog\", Kunst, 1949. Average of 39 Javanese gamelans","filename":"pelog_av.scl","rnbo":[7,120.0,0,270.0,0,540.0,0,670.0,0,785.0,0,950.0,0,2,1]},"pelog_b":{"title":"Pelog, average class B. Kunst 1949","filename":"pelog_b.scl","rnbo":[7,118.0,0,253.0,0,525.0,0,659.0,0,772.0,0,945.0,0,2,1]},"pelog_c":{"title":"Pelog, average class C. Kunst 1949","filename":"pelog_c.scl","rnbo":[7,117.0,0,262.0,0,508.0,0,668.0,0,779.0,0,945.0,0,2,1]},"pelog_he":{"title":"Observed Javanese Pelog scale, Helmholtz/Ellis p. 518, nr.96","filename":"pelog_he.scl","rnbo":[7,137.0,0,446.0,0,575.0,0,687.0,0,820.0,0,1098.0,0,2,1]},"pelog_jc":{"title":"John Chalmers' Pelog, on keys C# E F# A B c#, like Olympos' Enharmonic on 4/3. Also hirajoshi2","filename":"pelog_jc.scl","rnbo":[5,9,8,6,5,3,2,8,5,2,1]},"pelog_laras":{"title":"Lou Harrison, gamelan \"Si Betty\"","filename":"pelog_laras.scl","rnbo":[7,13,12,7,6,17,12,3,2,19,12,7,4,2,1]},"pelog_mal":{"title":"Malaysian Pelog, Pierre Genest: Différentes gammes encore en usage","filename":"pelog_mal.scl","rnbo":[5,13,12,4,3,3,2,13,8,2,1]},"pelog_me1":{"title":"Gamelan Kyahi Kanyut Mesem pelog (Mangku Nagaran). 1/1=295 Hz","filename":"pelog_me1.scl","rnbo":[7,124.521,0,271.058,0,522.809,0,688.207,0,787.819,0,954.515,0,2,1]},"pelog_me2":{"title":"Gamelan Kyahi Bermara (kraton Jogja). 1/1=290 Hz","filename":"pelog_me2.scl","rnbo":[7,104.253,0,236.762,0,501.772,0,661.692,0,760.647,0,929.145,0,2,1]},"pelog_me3":{"title":"Gamelan Kyahi Pangasih (kraton Solo). 1/1=286 Hz","filename":"pelog_me3.scl","rnbo":[7,128.298,0,276.357,0,545.806,0,669.366,0,784.692,0,967.096,0,2,1]},"pelog_pa":{"title":"\"Blown fifth\" pelog, von Hornbostel, type a.","filename":"pelog_pa.scl","rnbo":[7,156.0,0,312.0,0,468.0,0,678.0,0,834.0,0,990.0,0,2,1]},"pelog_pa2":{"title":"New mixed gender Pelog","filename":"pelog_pa2.scl","rnbo":[7,156.0,0,312.0,0,522.0,0,678.0,0,834.0,0,990.0,0,2,1]},"pelog_pb":{"title":"\"Primitive\" Pelog, step of blown semi-fourths, von Hornbostel, type b.","filename":"pelog_pb.scl","rnbo":[7,105.0,0,261.0,0,522.0,0,678.0,0,783.0,0,939.0,0,2,1]},"pelog_pb2":{"title":"\"Primitive\" Pelog, Kunst: Music in Java, p. 28","filename":"pelog_pb2.scl","rnbo":[7,102.0,0,258.0,0,522.0,0,678.0,0,780.0,0,936.0,0,2,1]},"pelog_schmidt":{"title":"Modern Pelog designed by Dan Schmidt and used by Berkeley Gamelan","filename":"pelog_schmidt.scl","rnbo":[7,11,10,6,5,7,5,3,2,8,5,9,5,2,1]},"pelog_selun":{"title":"Gamelan selunding from Kengetan, South Bali (Pelog), 1/1=141 Hz","filename":"pelog_selun.scl","rnbo":[11,124.347,0,63,47,68,47,805.224,0,2,1,101,47,126,47,136,47,449,141,4,1,202,47]},"pelog_slen":{"title":"W.P. Malm, pelog+slendro, Musical Cultures Of The Pacific, The Near East, And Asia. P: 1,3,5,6,8,10; S: 2,4,7,9","filename":"pelog_slen.scl","rnbo":[11,175.0,0,275.0,0,425.0,0,475.0,0,525.0,0,675.0,0,725.0,0,925.0,0,975.0,0,1100.0,0,2,1]},"pelog_str":{"title":"JI Pelog with stretched 2/1 and extra tones between 2-3, 6-7. Wolf, XH 11, '87","filename":"pelog_str.scl","rnbo":[9,16807,15552,7,6,117649,93312,49,36,823543,559872,343,216,5764801,3359232,2401,1296,40353607,20155392]},"pelogic":{"title":"Pelogic temperament, g=521.089678, 5-limit","filename":"pelogic.scl","rnbo":[9,47.62775,0,205.44839,0,363.26903,0,521.08968,0,568.71742,0,726.53807,0,884.35871,0,1042.17936,0,2,1]},"pelogic2":{"title":"Pelogic temperament, g=677.137654 in cycle of fifths order","filename":"pelogic2.scl","rnbo":[12,-60.03642,0,154.27531,0,94.23889,0,308.55062,0,248.51419,0,462.82592,0,677.13765,0,617.10123,0,831.41296,0,771.37654,0,985.68827,0,2,1]},"penchgah pentachord 7-limit":{"title":"Penchgah pentachord 40:45:50:56:60","filename":"penchgah pentachord 7-limit.scl","rnbo":[4,9,8,5,4,7,5,3,2]},"penta1":{"title":"Pentagonal scale 9/8 3/2 16/15 4/3 5/3","filename":"penta1.scl","rnbo":[12,27,25,9,8,6,5,81,64,729,512,36,25,243,160,81,50,27,16,9,5,243,128,2,1]},"penta2":{"title":"Pentagonal scale 7/4 4/3 15/8 32/21 6/5","filename":"penta2.scl","rnbo":[12,49,48,35,32,7,6,1225,1024,245,192,49,36,25,18,49,32,5,3,7,4,175,96,2,1]},"penta_opt":{"title":"Optimally consonant major pentatonic, John deLaubenfels (2001)","filename":"penta_opt.scl","rnbo":[5,193.17,0,386.34,0,698.35,0,887.99,0,2,1]},"pentadekany":{"title":"2)6 1.3.5.7.11.13 Pentadekany (1.3 tonic)","filename":"pentadekany.scl","rnbo":[15,13,12,55,48,7,6,5,4,65,48,11,8,35,24,143,96,77,48,13,8,5,3,7,4,11,6,91,48,2,1]},"pentadekany2":{"title":"2)6 1.3.5.7.9.11 Pentadekany (1.3 tonic)","filename":"pentadekany2.scl","rnbo":[15,33,32,9,8,55,48,7,6,5,4,21,16,11,8,35,24,3,2,77,48,5,3,7,4,11,6,15,8,2,1]},"pentadekany3":{"title":"2)6 1.5.11.17.23.31 Pentadekany (1.5 tonic)","filename":"pentadekany3.scl","rnbo":[15,17,16,341,320,11,10,713,640,23,20,187,160,391,320,11,8,23,16,31,20,253,160,527,320,17,10,31,16,2,1]},"pentadekany4":{"title":"2)6 1.3.9.51.57.87 Pentadekany (1.3 tonic)","filename":"pentadekany4.scl","rnbo":[15,261,256,17,16,9,8,19,16,153,128,171,128,87,64,1479,1024,3,2,51,32,1653,1024,57,32,29,16,969,512,2,1]},"pentatetra1":{"title":"Penta-tetrachord 20/19 x 19/18 x 18/17 x 17/16 = 5/4. 5/4 x 16/15 = 4/3","filename":"pentatetra1.scl","rnbo":[9,20,19,10,9,5,4,4,3,3,2,30,19,5,3,15,8,2,1]},"pentatetra2":{"title":"Penta-tetrachord 20/19 x 19/18 x 18/17 x 17/16 = 5/4. 5/4 x 16/15 = 4/3","filename":"pentatetra2.scl","rnbo":[9,20,19,20,17,5,4,4,3,3,2,30,19,30,17,15,8,2,1]},"pentatetra3":{"title":"Penta-tetrachord 20/19 x 19/18 x 18/17 x 17/16 = 5/4. 5/4 x 16/15 = 4/3","filename":"pentatetra3.scl","rnbo":[9,10,9,20,17,5,4,4,3,3,2,5,3,30,17,15,8,2,1]},"pentatriad":{"title":"4:5:6 Pentatriadic scale","filename":"pentatriad.scl","rnbo":[11,10,9,9,8,5,4,4,3,45,32,3,2,5,3,27,16,16,9,15,8,2,1]},"pentatriad1":{"title":"3:5:9 Pentatriadic 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temperament","filename":"pepper_archytas7.scl","rnbo":[7,174.29045,0,392.3803,0,489.43842,0,707.52828,0,881.81873,0,978.87685,0,1196.96671,0]},"pepper_archytas8":{"title":"A 3-distributionally even scale in archytas (64/63 planar) temperament","filename":"pepper_archytas8.scl","rnbo":[8,121.03173,0,392.3803,0,489.43842,0,610.47016,0,707.52828,0,978.87685,0,1099.90858,0,1196.96671,0]},"pepper_didymus9":{"title":"A trivalent scale in didymus (81/80 planar) temperament","filename":"pepper_didymus9.scl","rnbo":[9,192.7,0,385.4,0,461.68,0,654.38,0,697.04,0,889.74,0,966.02,0,1158.72,0,1201.38,0]},"pepper_jubilee12":{"title":"A 3-distributionally even scale in jubilee (50/49 planar) temperament","filename":"pepper_jubilee12.scl","rnbo":[12,102.92,0,205.84,0,277.7,0,380.62,0,483.54,0,599.66,0,702.58,0,805.5,0,877.36,0,980.28,0,1083.2,0,1199.32,0]},"pepper_meantone-killer":{"title":"15 circulating notes of porcupine (sort of nusecond in the far 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List 22-9-'98","filename":"perry.scl","rnbo":[12,9,8,6,5,5,4,4,3,3,2,8,5,5,3,12,7,7,4,9,5,15,8,2,1]},"perry2":{"title":"Robin Perry, 7-limit scale, TL 22-10-2006","filename":"perry2.scl","rnbo":[12,21,20,10,9,7,6,5,4,4,3,10,7,3,2,100,63,5,3,7,4,40,21,2,1]},"perry3":{"title":"Robin Perry, symmetrical 3,5,17 scale, TL 22-10-2006","filename":"perry3.scl","rnbo":[13,17,16,9,8,20,17,5,4,4,3,24,17,17,12,3,2,8,5,17,10,16,9,32,17,2,1]},"perry4":{"title":"Robin Perry, Just About fretboard","filename":"perry4.scl","rnbo":[27,66.0,0,90.0,0,114.0,0,180.0,0,204.0,0,270.0,0,294.0,0,318.0,0,384.0,0,408.0,0,474.0,0,498.0,0,588.0,0,612.0,0,678.0,0,702.0,0,768.0,0,792.0,0,816.0,0,882.0,0,906.0,0,972.0,0,996.0,0,1086.0,0,1110.0,0,1176.0,0,1200.0,0]},"persian-far":{"title":"Hormoz Farhat, average of observed Persian tar and sehtar tunings (1966)","filename":"persian-far.scl","rnbo":[17,90.0,0,135.0,0,205.0,0,295.0,0,340.0,0,410.0,0,500.0,0,565.0,0,630.0,0,700.0,0,790.0,0,835.0,0,905.0,0,995.0,0,1040.0,0,1110.0,0,2,1]},"persian-far53":{"title":"Hormoz Farhat, pitches in The Dastgah Concept in Persian Music in 53-tET","filename":"persian-far53.scl","rnbo":[18,90.56604,0,135.84906,0,203.77358,0,294.33962,0,339.62264,0,407.54717,0,498.11321,0,566.03774,0,611.32075,0,633.96226,0,701.88679,0,792.45283,0,837.73585,0,905.66038,0,996.22642,0,1041.50943,0,1109.43396,0,2,1]},"persian-hr":{"title":"Hatami-Rankin Persian scale","filename":"persian-hr.scl","rnbo":[18,12,11,9,8,7,6,6,5,11,9,5,4,4,3,7,5,16,11,3,2,8,5,44,27,5,3,7,4,9,5,15,8,64,33,2,1]},"persian-vaz":{"title":"Vaziri's Persian tuning, using quartertones","filename":"persian-vaz.scl","rnbo":[17,100.0,0,150.0,0,200.0,0,300.0,0,350.0,0,400.0,0,500.0,0,550.0,0,650.0,0,700.0,0,800.0,0,850.0,0,900.0,0,1000.0,0,1050.0,0,1100.0,0,2,1]},"persian":{"title":"Persian Tar Scale, from Dariush Anooshfar, TL 2-10-94","filename":"persian.scl","rnbo":[17,256,243,27,25,9,8,32,27,243,200,81,64,4,3,25,18,36,25,3,2,128,81,81,50,27,16,16,9,729,400,243,128,2,1]},"persian2":{"title":"Traditional Persian scale, from Mark Rankin","filename":"persian2.scl","rnbo":[17,256,243,54,49,9,8,32,27,27,22,81,64,4,3,1024,729,72,49,3,2,128,81,18,11,27,16,16,9,4096,2187,96,49,2,1]},"phi1_13":{"title":"Pythagorean scale with (Phi + 1) / 2 as fifth","filename":"phi1_13.scl","rnbo":[13,69.097,0,198.542,0,267.639,0,397.084,0,466.181,0,535.278,0,664.722,0,733.819,0,802.916,0,932.361,0,1001.458,0,1130.903,0,2,1]},"phi_10":{"title":"Pythagorean scale with Phi as fifth","filename":"phi_10.scl","rnbo":[10,99.271,0,198.542,0,366.91,0,466.181,0,565.451,0,733.819,0,833.09,0,932.361,0,1100.729,0,2,1]},"phi_11":{"title":"Non-octave Phi-based scale, Aaron Hunt, TL 29-08-2007","filename":"phi_11.scl","rnbo":[11,99.27089,0,198.54178,0,297.81267,0,366.9097,0,466.18059,0,565.45148,0,664.72237,0,733.81941,0,833.0903,0,932.36119,0,1031.63207,0]},"phi_12":{"title":"Non-octave Pythagorean scale with Phi as fourth. Jacky Ligon TL 12-04-2001","filename":"phi_12.scl","rnbo":[12,121.546,0,243.092,0,318.212,0,439.758,0,514.878,0,636.424,0,757.97,0,833.09,0,954.636,0,1029.756,0,1151.302,0,1226.422,0]},"phi_13":{"title":"Pythagorean scale with Phi as fifth","filename":"phi_13.scl","rnbo":[13,99.271,0,198.542,0,267.639,0,366.91,0,466.181,0,565.451,0,634.549,0,733.819,0,833.09,0,932.361,0,1001.458,0,1100.729,0,2,1]},"phi_13a":{"title":"Non-octave Pythagorean scale with Phi as fifth, Jacky Ligon TL 12-04-2001","filename":"phi_13a.scl","rnbo":[13,121.546,0,196.666,0,318.212,0,393.332,0,514.878,0,636.424,0,711.544,0,833.09,0,908.21,0,1029.756,0,1151.302,0,1226.422,0,1347.968,0]},"phi_13b":{"title":"Non-octave Pythagorean scale with 12 3/2s, Jacky Ligon, TL 12-04-2001","filename":"phi_13b.scl","rnbo":[13,102.414,0,165.709,0,268.123,0,331.418,0,433.832,0,536.246,0,599.541,0,3,2,765.25,0,867.664,0,970.078,0,1033.373,0,1135.787,0]},"phi_7b":{"title":"Heinz Bohlen's Pythagorean scale with Phi as fifth (1999)","filename":"phi_7b.scl","rnbo":[7,99.271,0,235.77,0,366.91,0,466.181,0,597.32,0,733.819,0,833.09,0]},"phi_7be":{"title":"36-tET approximation of phi_7b","filename":"phi_7be.scl","rnbo":[7,100.0,0,233.33333,0,366.66667,0,466.66667,0,600.0,0,733.33333,0,833.33333,0]},"phi_8":{"title":"Non-octave Pythagorean scale with 4/3s, Jacky Ligon, TL 12-04-2001","filename":"phi_8.scl","rnbo":[8,117.572,0,190.236,0,307.809,0,380.473,0,4,3,615.617,0,688.281,0,805.854,0]},"phi_8a":{"title":"Non-octave Pythagorean scale with 5/4s, Jacky Ligon, TL 12-04-2001","filename":"phi_8a.scl","rnbo":[8,91.196,0,147.559,0,238.755,0,295.117,0,5,4,477.51,0,533.872,0,625.069,0]},"phi_inv_13":{"title":"Phi root of 2 generator, WF=Fibonacci series. Jacky Ligon/Aaron Johnson","filename":"phi_inv_13.scl","rnbo":[13,108.20393,0,216.40786,0,283.28157,0,391.48551,0,499.68944,0,566.56315,0,674.76708,0,741.64079,0,849.84472,0,958.04865,0,1024.92236,0,1133.12629,0,2,1]},"phi_inv_8":{"title":"Phi root of 2 generator, WF=Fibonacci series. Jacky Ligon/Aaron Johnson","filename":"phi_inv_8.scl","rnbo":[8,108.20393,0,283.28157,0,391.48551,0,566.56315,0,741.64079,0,849.84472,0,1024.92236,0,2,1]},"phi_mos2":{"title":"Period Phi, generator 2nd successive golden section of Phi, Cameron Bobro","filename":"phi_mos2.scl","rnbo":[9,69.097,0,168.3679,0,267.6388,0,366.9097,0,436.0067,0,535.2776,0,634.5485,0,733.8194,0,833.0903,0]},"phi_mos3":{"title":"Period Phi, generator 3rd successive golden section of Phi, Cameron Bobro","filename":"phi_mos3.scl","rnbo":[7,110.00734,0,235.77441,0,345.78175,0,471.54882,0,581.55616,0,707.32323,0,833.0903,0]},"phi_mos4":{"title":"Period Phi, generator 4th successive golden section of Phi, Cameron Bobro","filename":"phi_mos4.scl","rnbo":[11,63.69166,0,149.46366,0,213.15532,0,298.92732,0,362.61898,0,448.39098,0,512.08264,0,597.85464,0,661.5463,0,747.3183,0,833.0903,0]},"phillips_19":{"title":"Pauline Phillips, organ manual scale, TL 7-10-2002","filename":"phillips_19.scl","rnbo":[19,84.0,0,155.0,0,200.0,0,268.0,0,384.0,0,400.0,0,468.0,0,500.0,0,584.0,0,668.0,0,700.0,0,768.0,0,855.0,0,900.0,0,968.0,0,1084.0,0,1100.0,0,1168.0,0,2,1]},"phillips_19a":{"title":"Adaptation by Gene Ward Smith with more consonant chords, TL 25-10-2002","filename":"phillips_19a.scl","rnbo":[19,83.6767,0,152.13946,0,199.68304,0,268.1458,0,384.15214,0,399.36609,0,467.82884,0,500.15848,0,583.83518,0,652.29794,0,699.84152,0,768.30428,0,851.98098,0,899.52456,0,967.98732,0,1083.99366,0,1099.20761,0,1152.45642,0,2,1]},"phillips_22":{"title":"All-key 19-limit JI scale (2002), TL 21-10-2002","filename":"phillips_22.scl","rnbo":[22,135,128,35,32,9,8,76545,65536,75,64,5,4,81,64,21,16,10935,8192,45,32,3,2,399,256,25,16,51,32,105,64,27,16,7,4,225,128,15,8,243,128,63,32,2,1]},"phillips_ji":{"title":"Pauline Phillips, JI 0 #/b \"C\" scale (2002), TL 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Model for Optimal Tuning Systems, 2008","filename":"polansky_owt2.scl","rnbo":[12,93.1,0,203.1,0,296.3,0,397.4,0,498.5,0,591.7,0,701.6,0,794.8,0,903.4,0,997.4,0,1091.4,0,2,1]},"polansky_ps":{"title":"Three interlocking harmonic series on 1:5:3 by Larry Polansky in Psaltery","filename":"polansky_ps.scl","rnbo":[50,2,1,3,1,4,1,5,1,6,1,7,1,8,1,9,1,10,1,11,1,12,1,13,1,14,1,15,1,16,1,17,1,5,4,5,2,15,4,5,1,25,4,15,2,35,4,10,1,45,4,25,2,55,4,15,1,65,4,35,2,75,4,20,1,85,4,3,2,3,1,9,2,6,1,15,2,9,1,21,2,12,1,27,2,15,1,33,2,18,1,39,2,21,1,45,2,24,1,51,2]},"ponsford1":{"title":"David Ponsford Bach temperament I (2005)","filename":"ponsford1.scl","rnbo":[12,100.0,0,198.045,0,300.0,0,394.135,0,500.0,0,598.045,0,700.0,0,800.0,0,896.09,0,1000.0,0,1096.09,0,2,1]},"ponsford2":{"title":"David Ponsford Bach temperament II (2005)","filename":"ponsford2.scl","rnbo":[12,109.775,0,9,8,305.865,0,403.91,0,501.955,0,607.82,0,703.91,0,807.82,0,903.91,0,1003.91,0,1105.865,0,2,1]},"poole-rod":{"title":"Rod Poole's 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474","filename":"poole_100.scl","rnbo":[100,32805,32768,2240,2187,28,27,8505,8192,20480,19683,25,24,137781,131072,256,243,135,128,2187,2048,7168,6561,35,32,800,729,567,512,65536,59049,10,9,18225,16384,9,8,295245,262144,280,243,7,6,76545,65536,2560,2187,75,64,32,27,1215,1024,19683,16384,896,729,315,256,100,81,5103,4096,8192,6561,5,4,164025,131072,81,64,35,27,21,16,688905,524288,320,243,675,512,4,3,10935,8192,177147,131072,8960,6561,112,81,2835,2048,81920,59049,25,18,45927,32768,1024,729,45,32,729,512,28672,19683,35,24,3200,2187,189,128,40,27,6075,4096,3,2,98415,65536,1120,729,14,9,25515,16384,10240,6561,25,16,413343,262144,128,81,405,256,6561,4096,3584,2187,105,64,400,243,1701,1024,32768,19683,5,3,54675,32768,27,16,140,81,7,4,229635,131072,1280,729,225,128,16,9,3645,2048,59049,32768,35840,19683,448,243,945,512,50,27,15309,8192,4096,2187,15,8,492075,262144,243,128,35,18,12800,6561,63,32,160,81,2025,1024,2,1]},"porcupine":{"title":"Porcupine temperament, g=162.996, 7-limit","filename":"porcupine.scl","rnbo":[37,44.94039,0,89.88078,0,103.96821,0,148.9086,0,162.99603,0,207.93642,0,222.02384,0,266.96423,0,311.90462,0,325.99205,0,370.93244,0,385.01987,0,429.96026,0,474.90065,0,488.98808,0,533.92847,0,548.0159,0,592.95629,0,637.89668,0,651.9841,0,696.92449,0,711.01192,0,755.95231,0,800.8927,0,814.98013,0,859.92052,0,874.00795,0,918.94834,0,963.88873,0,977.97616,0,1022.91655,0,1037.00397,0,1081.94436,0,1126.88475,0,1140.97218,0,1185.91257,0,2,1]},"porcupine15cfip":{"title":"A circulating Porcupine[15] lesfip scale, 11-limit target, 15 cent tolerance","filename":"porcupine15cfip.scl","rnbo":[15,61.59759,0,161.50757,0,226.12741,0,319.176,0,388.13838,0,477.94924,0,549.5671,0,621.18496,0,710.99581,0,779.9582,0,873.00679,0,937.62663,0,1037.53661,0,1099.1342,0,2,1]},"porcupine15fip":{"title":"Lesfip version of Porcupine[15], 11-limit diamond target, 15 cent tolerance","filename":"porcupine15fip.scl","rnbo":[15,100.98886,0,162.4559,0,262.89824,0,325.04535,0,387.19246,0,487.6348,0,549.10184,0,650.0907,0,711.24951,0,812.69999,0,875.28995,0,974.80075,0,1037.39071,0,1138.84119,0,2,1]},"porcupine15lfip":{"title":"Porcupine-related lesfip scale","filename":"porcupine15lfip.scl","rnbo":[15,90.75957,0,162.69064,0,256.58844,0,318.16312,0,423.99014,0,479.55828,0,585.3853,0,646.95998,0,740.85778,0,812.78885,0,903.54842,0,971.39229,0,1051.77421,0,1132.15613,0,2,1]},"porcupinewoo15":{"title":"[8/5 12/7] eigenmonzo porcupine, -6 to 8 gamut","filename":"porcupinewoo15.scl","rnbo":[15,103.01585,0,162.73726,0,222.45866,0,325.47451,0,385.19592,0,488.21177,0,547.93318,0,650.94903,0,710.67043,0,813.68629,0,873.40769,0,976.42354,0,1036.14495,0,1139.1608,0,1198.8822,0]},"porcupinewoo22":{"title":"[8/5 12/7] eigenmonzo porcupine, -10 to 11 gamut","filename":"porcupinewoo22.scl","rnbo":[22,59.7214,0,103.01585,0,162.73726,0,222.45866,0,265.75311,0,325.47451,0,385.19592,0,428.49037,0,488.21177,0,547.93318,0,591.22762,0,650.94903,0,710.67043,0,770.39184,0,813.68629,0,873.40769,0,933.12909,0,976.42354,0,1036.14495,0,1095.86635,0,1139.1608,0,1198.8822,0]},"portbag1":{"title":"Portugese bagpipe tuning","filename":"portbag1.scl","rnbo":[7,14,13,81,68,32,25,36,25,128,81,7,4,2,1]},"portbag2":{"title":"Portugese bagpipe tuning 2","filename":"portbag2.scl","rnbo":[10,21,20,14,13,32,27,17,14,21,16,64,45,3,2,25,16,59,32,2,1]},"portent11tri":{"title":"Portent tempered scale with trivalence proprty, 190-tET tuning, abababababc","filename":"portent11tri.scl","rnbo":[11,151.57895,0,233.68421,0,385.26316,0,467.36842,0,618.94737,0,701.05263,0,852.63158,0,934.73684,0,966.31579,0,1117.89474,0,2,1]},"portent26":{"title":"Portent[26] hobbit minimax tuning","filename":"portent26.scl","rnbo":[26,32.08279,0,82.50211,0,151.08133,0,201.50065,0,233.58344,0,265.66623,0,316.08556,0,384.66477,0,416.74756,0,467.16688,0,499.24967,0,549.669,0,618.24821,0,650.331,0,700.75033,0,732.83312,0,783.25244,0,815.33523,0,883.91444,0,934.33377,0,966.41656,0,998.49935,0,1048.91867,0,1117.49789,0,1167.91721,0,2,1]},"portsmouth":{"title":"Portsmouth, a 2.3.7.11 subgroup scale","filename":"portsmouth.scl","rnbo":[12,22,21,8,7,7,6,9,7,4,3,11,8,3,2,11,7,12,7,7,4,11,6,2,1]},"pps7":{"title":"Merged transpositions of superparticular 8/7 7/6 6/5 5/4 4/3 3/2 2/1","filename":"pps7.scl","rnbo":[7,8,7,7,6,6,5,5,4,4,3,3,2,2,1]},"precata19":{"title":"Cata[19] transversal","filename":"precata19.scl","rnbo":[19,25,24,13,12,10,9,52,45,6,5,5,4,13,10,4,3,18,13,13,9,3,2,20,13,8,5,5,3,26,15,9,5,24,13,25,13,2,1]},"prelleur":{"title":"Peter Prelleur's well temperament (1731)","filename":"prelleur.scl","rnbo":[12,95.23981,0,197.2801,0,298.84336,0,395.27547,0,501.02019,0,594.84986,0,697.98011,0,796.88836,0,895.68875,0,1000.05579,0,1094.06772,0,2,1]},"preston":{"title":"Preston's equal beating temperament (1785)","filename":"preston.scl","rnbo":[12,94.1618,0,198.75561,0,300.7808,0,396.22975,0,500.35948,0,594.39883,0,698.86421,0,793.18976,0,897.95531,0,1000.13831,0,1095.72669,0,2,1]},"preston2":{"title":"Preston's theoretically correct well temperament","filename":"preston2.scl","rnbo":[12,94.04104,0,198.29744,0,302.55384,0,396.59488,0,500.85128,0,594.89232,0,699.14872,0,793.18976,0,897.44616,0,1001.70256,0,1095.7436,0,2,1]},"prime_10":{"title":"First 10 prime numbers reduced by 2/1","filename":"prime_10.scl","rnbo":[10,17,16,19,16,5,4,11,8,23,16,3,2,13,8,7,4,29,16,2,1]},"prime_12":{"title":"Prime dodecatonic scale","filename":"prime_12.scl","rnbo":[12,17,16,37,32,19,16,5,4,11,8,23,16,3,2,13,8,7,4,29,16,31,16,2,1]},"prime_5":{"title":"What Lou Harrison calls \"the Prime Pentatonic\", a widely used scale","filename":"prime_5.scl","rnbo":[5,9,8,5,4,3,2,5,3,2,1]},"prime_7":{"title":"Prime heptatonic scale","filename":"prime_7.scl","rnbo":[7,17,16,5,4,11,8,3,2,13,8,7,4,2,1]},"primewak15":{"title":"Blacksmith-augene-porcupine-progress-kumbaya-nuke 13-limit wakalix; all generators -7 to 7; patent epimorphic","filename":"primewak15.scl","rnbo":[15,33,32,13,12,8,7,16,13,5,4,4,3,11,8,16,11,3,2,8,5,13,8,7,4,24,13,64,33,2,1]},"prinz":{"title":"Prinz well-tempermament (1808)","filename":"prinz.scl","rnbo":[12,256,243,193.15686,0,32,27,5,4,4,3,1024,729,696.57843,0,128,81,889.73529,0,16,9,15,8,2,1]},"prinz2":{"title":"Prinz equal beating temperament (1808)","filename":"prinz2.scl","rnbo":[12,256,243,189.04953,0,32,27,5,4,4,3,1024,729,693.05403,0,128,81,887.0201,0,16,9,15,8,2,1]},"pris":{"title":"Optimized (15/14)^3 (16/15)^4 (21/20)^3 (25/24)^2 scale.","filename":"pris.scl","rnbo":[12,16,15,28,25,7,6,5,4,4,3,7,5,3,2,8,5,5,3,7,4,28,15,2,1]},"prisun":{"title":"Unimarv tempered pris/cv3, 166-tET","filename":"prisun.scl","rnbo":[12,115.66265,0,202.40964,0,267.46988,0,383.13253,0,498.79518,0,585.54217,0,701.20482,0,816.86747,0,881.92771,0,968.6747,0,1084.33735,0,2,1]},"prod13":{"title":"13-limit binary products [1 3 5 7 9 11 13]","filename":"prod13.scl","rnbo":[27,65,64,33,32,35,32,143,128,9,8,77,64,39,32,5,4,81,64,21,16,169,128,11,8,45,32,91,64,3,2,49,32,99,64,25,16,13,8,27,16,55,32,7,4,117,64,15,8,121,64,63,32,2,1]},"prod7d":{"title":"Double Cubic Corner 7-limit. Chalmers '96","filename":"prod7d.scl","rnbo":[39,64,63,128,125,256,245,16,15,35,32,9,8,8,7,147,128,75,64,32,27,128,105,5,4,32,25,64,49,21,16,4,3,343,256,175,128,45,32,64,45,256,175,512,343,3,2,32,21,49,32,25,16,8,5,105,64,27,16,128,75,256,147,7,4,16,9,64,35,15,8,245,128,125,64,63,32,2,1]},"prod7s":{"title":"Single Cubic Corner 7-limit = superstellated three out of 1 3 5 7 tetrany","filename":"prod7s.scl","rnbo":[20,35,32,9,8,147,128,75,64,5,4,21,16,343,256,175,128,45,32,3,2,49,32,25,16,105,64,27,16,7,4,15,8,245,128,125,64,63,32,2,1]},"prodigy11":{"title":"Prodigy[11] (225/224, 441/400) hobbit in 72-tET","filename":"prodigy11.scl","rnbo":[11,116.66667,0,233.33333,0,266.66667,0,383.33333,0,500.0,0,700.0,0,816.66667,0,933.33333,0,966.66667,0,1083.33333,0,2,1]},"prodigy12":{"title":"Prodigy[12] (225/224, 441/440) hobbit, 72-tET tuning. As a miracle scale, [-8, -7, -6, -2, -1, 0, 1, 2, 5, 6, 7, 8]","filename":"prodigy12.scl","rnbo":[12,116.66667,0,233.33333,0,266.66667,0,383.33333,0,500.0,0,583.33333,0,700.0,0,816.66667,0,933.33333,0,966.66667,0,1083.33333,0,2,1]},"prodigy29":{"title":"Prodigy[29] (225/224, 441/440) hobbit irregular tuning","filename":"prodigy29.scl","rnbo":[29,33.64857,0,83.71417,0,116.60518,0,150.45004,0,200.5612,0,233.54687,0,317.05141,0,350.24665,0,383.49044,0,433.73468,0,466.77798,0,500.29835,0,550.27449,0,583.60636,0,616.93823,0,666.91437,0,700.43474,0,733.47804,0,783.72228,0,816.96607,0,850.16131,0,933.66586,0,966.65152,0,1016.76269,0,1050.60754,0,1083.49856,0,1133.56415,0,1167.21272,0,2,1]},"prodq13":{"title":"13-limit Binary products&quotients. Chalmers '96","filename":"prodq13.scl","rnbo":[40,65,64,33,32,128,121,16,15,35,32,143,128,9,8,8,7,64,55,77,64,39,32,16,13,5,4,32,25,64,49,21,16,169,128,4,3,11,8,128,91,91,64,16,11,3,2,256,169,49,32,25,16,8,5,13,8,64,39,128,77,55,32,7,4,16,9,256,143,64,35,15,8,121,64,64,33,128,65,2,1]},"prog_ennea":{"title":"Progressive Enneatonic, 50+100+150+200 cents in each half (500 cents)","filename":"prog_ennea.scl","rnbo":[9,50.0,0,150.0,0,300.0,0,500.0,0,700.0,0,750.0,0,850.0,0,1000.0,0,2,1]},"prog_ennea1":{"title":"Progressive Enneatonic, appr. 50+100+150+200 cents in each half (500 cents)","filename":"prog_ennea1.scl","rnbo":[9,36,35,12,11,19,16,4,3,3,2,17,11,18,11,16,9,2,1]},"prog_ennea2":{"title":"Progressive Enneatonic, appr. 50+100+200+150 cents in each half (500 cents)","filename":"prog_ennea2.scl","rnbo":[9,34,33,12,11,27,22,4,3,3,2,17,11,18,11,81,44,2,1]},"prog_ennea3":{"title":"Progressive Enneatonic, appr. 50+100+150+200 cents in each half (500 cents)","filename":"prog_ennea3.scl","rnbo":[9,34,33,12,11,32,27,4,3,3,2,17,11,18,11,16,9,2,1]},"prooijen1":{"title":"Kees van Prooijen, major mode of Bohlen-Pierce","filename":"prooijen1.scl","rnbo":[7,35,27,7,5,5,3,9,5,7,3,25,9,3,1]},"prooijen2":{"title":"Kees van Prooijen, minor mode of Bohlen-Pierce","filename":"prooijen2.scl","rnbo":[7,25,21,9,7,5,3,9,5,15,7,25,9,3,1]},"prop10a":{"title":"10 note proper scale, 11-limit optimized","filename":"prop10a.scl","rnbo":[10,113.7978,0,267.9684,0,382.77576,0,498.91608,0,584.08562,0,700.22594,0,815.0333,0,969.2039,0,1083.0017,0,2,1]},"prop10b":{"title":"10 note proper scale, 11-limit optimized","filename":"prop10b.scl","rnbo":[10,80.63837,0,235.35431,0,312.21493,0,468.52335,0,583.44446,0,699.22557,0,855.23494,0,931.52953,0,1086.62695,0,2,1]},"prop10c":{"title":"10 note proper scale, 11-limit optimized","filename":"prop10c.scl","rnbo":[10,154.10841,0,268.38386,0,385.50832,0,499.62068,0,652.99688,0,701.11153,0,854.48773,0,968.6001,0,1085.72456,0,2,1]},"prop10d":{"title":"10 note proper scale, 11-limit optimized","filename":"prop10d.scl","rnbo":[10,154.56137,0,232.74817,0,348.72662,0,502.57118,0,618.54963,0,696.73643,0,851.2978,0,1006.11335,0,1045.18446,0,2,1]},"prop10e":{"title":"10 note proper scale, 13-limit optimized","filename":"prop10e.scl","rnbo":[10,128.41923,0,208.52619,0,391.06512,0,443.6117,0,626.15063,0,706.2576,0,834.67682,0,939.22103,0,1095.45579,0,2,1]},"prop10f":{"title":"10 note proper scale, 13-limit optimized","filename":"prop10f.scl","rnbo":[11,150.66493,0,202.82655,0,383.68061,0,435.84224,0,586.50716,0,700.10457,0,854.31597,0,932.19119,0,1086.4026,0,1200.0,0,2,1]},"prop10g":{"title":"10 note proper scale, 13-limit optimized","filename":"prop10g.scl","rnbo":[10,131.66915,0,262.44504,0,393.53216,0,524.49319,0,577.18189,0,708.14292,0,839.23005,0,970.00594,0,1101.67508,0,2,1]},"prop10h":{"title":"10 note proper scale, 11-limit optimized","filename":"prop10h.scl","rnbo":[10,117.72242,0,201.82325,0,385.10146,0,433.76818,0,617.04639,0,701.14721,0,818.86964,0,967.92462,0,1050.94502,0,2,1]},"prop10i":{"title":"10 note proper scale, 11-limit optimized","filename":"prop10i.scl","rnbo":[10,115.40464,0,266.95157,0,383.10215,0,499.33034,0,584.07307,0,700.30126,0,816.45184,0,967.99877,0,1083.40341,0,2,1]},"prop10j":{"title":"10 note proper scale, 11-limit optimized","filename":"prop10j.scl","rnbo":[10,116.92308,0,201.84525,0,384.10174,0,433.88934,0,585.61514,0,700.31525,0,818.02189,0,968.49858,0,1085.109,0,2,1]},"prop10k":{"title":"10 note proper scale, 11-limit optimized","filename":"prop10k.scl","rnbo":[10,117.70664,0,232.40676,0,384.13256,0,433.92015,0,616.17664,0,701.09882,0,818.02189,0,932.9129,0,1049.52331,0,2,1]},"prop10l":{"title":"10 note proper scale, 11-limit optimized","filename":"prop10l.scl","rnbo":[10,152.44018,0,266.66146,0,384.903,0,468.77883,0,651.27208,0,701.1681,0,883.66135,0,967.53718,0,1085.77872,0,2,1]},"prop7a":{"title":"7 note proper scale, 9-limit optimized","filename":"prop7a.scl","rnbo":[7,123.04144,0,389.79239,0,435.80382,0,702.55477,0,825.59622,0,1012.79811,0,2,1]},"prop7b":{"title":"7 note proper scale, 11-limit optimized","filename":"prop7b.scl","rnbo":[7,185.32998,0,387.57688,0,576.99429,0,766.41169,0,968.65859,0,1153.98857,0,2,1]},"prop7c":{"title":"7 note proper scale, 11-limit optimized","filename":"prop7c.scl","rnbo":[7,156.90577,0,387.90679,0,546.29025,0,704.67372,0,935.67473,0,1092.58051,0,2,1]},"prop7d":{"title":"7 note proper scale, 9-limit 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Pycnic[17]","filename":"pyclesfip17.scl","rnbo":[17,66.73123,0,130.9936,0,190.93224,0,261.57168,0,321.51031,0,385.77268,0,452.50392,0,571.99486,0,629.68133,0,695.4481,0,764.80077,0,826.25196,0,887.70314,0,957.05582,0,1022.82259,0,1080.50906,0,2,1]},"pygmie":{"title":"Pygmie scale","filename":"pygmie.scl","rnbo":[5,8,7,21,16,3,2,7,4,2,1]},"pykett_dorset":{"title":"Colin Pykett, a Dorset Temperament (2002)","filename":"pykett_dorset.scl","rnbo":[12,100.7,0,199.44,0,299.83,0,401.81,0,500.5,0,600.03,0,700.15,0,800.76,0,901.39,0,1001.8,0,1101.5,0,2,1]},"pyle":{"title":"Howard Willet Pyle quasi equal temperament","filename":"pyle.scl","rnbo":[12,100.05,0,199.89,0,300.17,0,400.22,0,500.05,0,599.99,0,699.73,0,799.9,0,899.86,0,1000.25,0,1100.4,0,2,1]},"pyramid":{"title":"This scale may also be called the \"Wedding Cake\"","filename":"pyramid.scl","rnbo":[12,9,8,75,64,5,4,4,3,45,32,3,2,25,16,5,3,27,16,16,9,15,8,2,1]},"pyramid_down":{"title":"Upside-Down Wedding Cake (divorce cake)","filename":"pyramid_down.scl","rnbo":[12,16,15,9,8,6,5,32,25,4,3,3,2,8,5,27,16,16,9,9,5,48,25,2,1]},"pyth_12":{"title":"12-tone Pythagorean scale","filename":"pyth_12.scl","rnbo":[12,2187,2048,9,8,32,27,81,64,4,3,729,512,3,2,6561,4096,27,16,16,9,243,128,2,1]},"pyth_12s":{"title":"Pythagorean with major thirds flat by a schisma","filename":"pyth_12s.scl","rnbo":[12,2187,2048,9,8,19683,16384,8192,6561,4,3,1024,729,3,2,6561,4096,32768,19683,59049,32768,4096,2187,2,1]},"pyth_17":{"title":"17-tone Pythagorean scale. Used in Persian music","filename":"pyth_17.scl","rnbo":[17,256,243,2187,2048,9,8,32,27,19683,16384,81,64,4,3,1024,729,729,512,3,2,128,81,6561,4096,27,16,16,9,59049,32768,243,128,2,1]},"pyth_17s":{"title":"Schismatically altered 17-tone Pythagorean scale","filename":"pyth_17s.scl","rnbo":[17,256,243,16,15,9,8,32,27,6,5,81,64,4,3,1024,729,64,45,3,2,128,81,8,5,27,16,16,9,9,5,243,128,2,1]},"pyth_22":{"title":"Pythagorean shrutis","filename":"pyth_22.scl","rnbo":[22,256,243,2187,2048,65536,59049,9,8,32,27,19683,16384,8192,6561,81,64,4,3,177147,131072,1024,729,729,512,3,2,128,81,6561,4096,32768,19683,27,16,16,9,59049,32768,4096,2187,243,128,2,1]},"pyth_27":{"title":"27-tone Pythagorean scale","filename":"pyth_27.scl","rnbo":[27,531441,524288,256,243,2187,2048,65536,59049,9,8,4782969,4194304,32,27,19683,16384,8192,6561,81,64,4,3,177147,131072,1024,729,729,512,262144,177147,3,2,1594323,1048576,128,81,6561,4096,32768,19683,27,16,14348907,8388608,16,9,59049,32768,4096,2187,243,128,2,1]},"pyth_31":{"title":"31-tone Pythagorean scale","filename":"pyth_31.scl","rnbo":[31,531441,524288,256,243,2187,2048,1162261467,1073741824,9,8,4782969,4194304,32,27,19683,16384,341.05502,0,8192,6561,81,64,43046721,33554432,4,3,177147,131072,1024,729,729,512,387420489,268435456,3,2,1594323,1048576,128,81,6561,4096,839.10002,0,27,16,14348907,8388608,16,9,59049,32768,1043.01002,0,4096,2187,243,128,129140163,67108864,2,1]},"pyth_7a":{"title":"Pythagorean 7-tone with whole tones divided arithmetically","filename":"pyth_7a.scl","rnbo":[12,17,16,9,8,153,128,81,64,4,3,17,12,3,2,51,32,27,16,459,256,243,128,2,1]},"pyth_chrom":{"title":"Dorian mode of the so-called Pythagorean chromatic, recorded by Gaudentius","filename":"pyth_chrom.scl","rnbo":[8,256,243,9,8,4,3,3,2,128,81,27,16,16,9,2,1]},"pyth_sev":{"title":"26-tone Pythagorean scale based on 7/4","filename":"pyth_sev.scl","rnbo":[26,16807,16384,282475249,268435456,132.3886,0,131072,117649,8,7,2401,2048,40353607,33554432,363.56269,0,1048576,823543,64,49,343,256,5764801,4194304,594.73678,0,8388608,5764801,512,343,49,32,823543,524288,825.91088,0,67108864,40353607,4096,2401,7,4,117649,65536,1977326743,1073741824,536870912,282475249,32768,16807,2,1]},"pyth_sev_16":{"title":"16-tone Pythagorean scale based on 7/4, \"Armodue\"","filename":"pyth_sev_16.scl","rnbo":[16,16807,16384,282475249,268435456,132.3886,0,2401,2048,40353607,33554432,363.56269,0,343,256,5764801,4194304,594.73678,0,49,32,823543,524288,825.91088,0,7,4,117649,65536,1977326743,1073741824,2,1]},"pyth_third":{"title":"Cycle of 5/4 thirds","filename":"pyth_third.scl","rnbo":[31,128,125,16384,15625,2097152,1953125,268435456,244140625,181.01942,0,1220703125,1073741824,9765625,8388608,78125,65536,625,512,5,4,32,25,4096,3125,524288,390625,67108864,48828125,567.33314,0,608.39199,0,48828125,33554432,390625,262144,3125,2048,25,16,8,5,1024,625,131072,78125,16777216,9765625,953.64685,0,994.70571,0,244140625,134217728,1953125,1048576,15625,8192,125,64,2,1]},"qadir":{"title":"Abd al-Qadir al-Maraghi fretting by (Hamed Sabet)","filename":"qadir.scl","rnbo":[16,65536,59049,9,8,32,27,8192,6561,81,64,4,3,1024,729,262144,177147,3,2,128,81,32768,19683,27,16,16,9,4096,2187,1048576,531441,2,1]},"quasi_9":{"title":"Quasi-Equal Enneatonic, Each \"tetrachord\" has 125 + 125 + 125 + 125 cents","filename":"quasi_9.scl","rnbo":[9,125.0,0,250.0,0,375.0,0,500.0,0,700.0,0,825.0,0,950.0,0,1075.0,0,2,1]},"quasic22":{"title":"A 22 note quasi-circulating scale in the major third","filename":"quasic22.scl","rnbo":[22,25,24,140625,131072,1125,1024,9,8,75,64,1265625,1048576,5,4,125,96,4,3,5625,4096,45,32,375,256,3,2,25,16,421875,262144,5,3,28125,16384,225,128,3796875,2097152,15,8,125,64,2,1]},"quint_chrom":{"title":"Aristides Quintilianus' Chromatic genus","filename":"quint_chrom.scl","rnbo":[7,18,17,9,8,4,3,3,2,27,17,27,16,2,1]},"qx1":{"title":"breed tempered |-15 0 -2 7> |-9 0 -7-9> Fokker block","filename":"qx1.scl","rnbo":[31,35.294118,0,84.313725,0,119.607843,0,154.901961,0,203.921569,0,239.215686,0,266.666667,0,315.686275,0,350.980392,0,386.27451,0,435.294118,0,470.588235,0,505.882353,0,554.901961,0,582.352941,0,617.647059,0,666.666667,0,701.960784,0,737.254902,0,786.27451,0,821.568627,0,849.019608,0,898.039216,0,933.333333,0,968.627451,0,1017.647059,0,1052.941176,0,1088.235294,0,1137.254902,0,1164.705882,0,2,1]},"qx2":{"title":"breed tempered |-15 0 -2 7> |-9 0 -7-9> Fokker block","filename":"qx2.scl","rnbo":[31,35.294118,0,84.313725,0,119.607843,0,147.058824,0,196.078431,0,231.372549,0,266.666667,0,315.686275,0,350.980392,0,386.27451,0,435.294118,0,462.745098,0,498.039216,0,547.058824,0,582.352941,0,617.647059,0,666.666667,0,701.960784,0,729.411765,0,764.705882,0,813.72549,0,849.019608,0,884.313725,0,933.333333,0,968.627451,0,1003.921569,0,1045.098039,0,1080.392157,0,1115.686275,0,1164.705882,0,2,1]},"ragib":{"title":"Idris Rag'ib Bey, vol.5 d'Erlanger, p. 40.","filename":"ragib.scl","rnbo":[24,1000,969,1000,931,167.0,0,9,8,257.0,0,25,21,369.0,0,432.0,0,200,153,4,3,500,363,605.0,0,500,343,3,2,767.0,0,808.0,0,2000,1209,940.0,0,970.0,0,16,9,1038.0,0,1000,537,25,13,2,1]},"ragib7":{"title":"7-limit version of Idris Rag'ib Bey scale","filename":"ragib7.scl","rnbo":[24,405,392,672,625,54,49,9,8,512,441,25,21,243,196,9,7,64,49,4,3,135,98,486,343,35,24,3,2,14,9,625,392,81,49,441,256,7,4,16,9,175,96,625,336,48,25,2,1]},"ragipu16":{"title":"16-step ragisma pump (1/3, 10/7, 7/2)","filename":"ragipu16.scl","rnbo":[16,1,3,7,6,7,18,5,9,5,27,35,54,35,162,245,324,175,162,175,486,1225,972,1225,2916,875,1458,875,4374,6125,8748,4375,4374]},"ragipu17":{"title":"17-step ragisma pump (7/6, 5/1, 2/7)","filename":"ragipu17.scl","rnbo":[17,7,6,1,3,5,3,35,18,5,9,35,54,5,27,25,27,175,162,25,81,125,81,875,486,125,243,875,1458,125,729,875,4374,4375,4374]},"ragismic19":{"title":"Ragismic[19] hobbit in 6279-tET","filename":"ragismic19.scl","rnbo":[19,48.92499,0,133.39704,0,182.32203,0,266.79408,0,315.71906,0,364.64405,0,449.1161,0,498.04109,0,568.56187,0,631.43813,0,701.95891,0,750.8839,0,835.35595,0,884.28094,0,933.20592,0,1017.67797,0,1066.60296,0,1151.07501,0,2,1]},"rain123":{"title":"Raintree scale tuned to 123-tET","filename":"rain123.scl","rnbo":[12,97.56098,0,204.87805,0,302.43902,0,400.0,0,497.56098,0,604.87805,0,702.43902,0,800.0,0,897.56098,0,995.12195,0,1102.43902,0,2,1]},"rain159":{"title":"Raintree scale tuned to 159-tET","filename":"rain159.scl","rnbo":[12,98.11321,0,203.77358,0,301.88679,0,400.0,0,498.11321,0,603.77358,0,701.88679,0,800.0,0,898.11321,0,996.22642,0,1101.88679,0,2,1]},"raintree":{"title":"Raintree Goldbach 12-tone 5-limit JI tuning, TL 14-3-2007","filename":"raintree.scl","rnbo":[12,135,128,9,8,1215,1024,512,405,4,3,64,45,3,2,405,256,2048,1215,16,9,256,135,2,1]},"raintree2":{"title":"Raintree Goldbach Celestial tuning, TL 15-10-2009","filename":"raintree2.scl","rnbo":[12,200,189,28,25,25,21,63,50,75,56,567,400,112,75,100,63,42,25,25,14,189,100,2,1]},"rameau-flat":{"title":"Rameau bemols, see Pierre-Yves Asselin in \"Musique et temperament\"","filename":"rameau-flat.scl","rnbo":[12,92.668,0,193.157,0,304.888,0,5,4,503.422,0,582.2,0,696.578,0,800.0,0,889.735,0,1006.843,0,1082.892,0,2,1]},"rameau-french":{"title":"Standard French temperament, Rameau version (1726), C. di Veroli, 2002","filename":"rameau-french.scl","rnbo":[12,88.33435,0,193.15686,0,297.97936,0,5,4,503.42157,0,584.84714,0,696.57843,0,793.15686,0,889.73529,0,1001.46657,0,1082.89214,0,2,1]},"rameau-gall":{"title":"Rameau's temperament, after Gallimard (1st solution)","filename":"rameau-gall.scl","rnbo":[12,84.11386,0,193.15686,0,296.50069,0,5,4,503.42157,0,582.15886,0,696.57843,0,788.75714,0,889.73529,0,1006.84314,0,1082.89214,0,2,1]},"rameau-gall2":{"title":"Rameau's temperament, after Gallimard (2nd solution)","filename":"rameau-gall2.scl","rnbo":[12,81.40742,0,193.15686,0,292.41449,0,5,4,503.42157,0,580.95786,0,696.57843,0,785.08292,0,889.73529,0,1006.84314,0,1082.89214,0,2,1]},"rameau-merc":{"title":"Rameau's temperament, after Mercadier","filename":"rameau-merc.scl","rnbo":[12,76.049,0,193.15686,0,286.6078,0,5,4,4,3,579.47057,0,696.57843,0,775.85337,0,889.73529,0,993.93937,0,1082.89214,0,2,1]},"rameau-minor":{"title":"Rameau's systeme diatonique mineur on E. Asc. 4-6-8-9, desc. 9-7-5-4","filename":"rameau-minor.scl","rnbo":[9,9,8,6,5,27,20,3,2,8,5,27,16,9,5,15,8,2,1]},"rameau-nouv":{"title":"Temperament by Rameau in Nouveau Systeme (1726)","filename":"rameau-nouv.scl","rnbo":[12,92.47254,0,193.15686,0,302.05294,0,5,4,503.42157,0,587.68234,0,696.57843,0,797.26274,0,889.73529,0,1006.84314,0,1082.89214,0,2,1]},"rameau-sharp":{"title":"Rameau dieses, see Pierre-Yves Asselin in \"Musique et temperament\"","filename":"rameau-sharp.scl","rnbo":[12,76.049,0,193.157,0,285.6,0,5,4,4,3,579.471,0,696.578,0,775.316,0,889.735,0,993.2,0,1082.892,0,2,1]},"rameau":{"title":"Rameau's modified meantone temperament (1725)","filename":"rameau.scl","rnbo":[12,86.80214,0,193.15686,0,297.80014,0,5,4,503.42157,0,584.84714,0,696.57843,0,788.75714,0,889.73529,0,1006.84314,0,1082.89214,0,2,1]},"ramis":{"title":"Monochord of Ramos de Pareja (Ramis de Pareia), Musica practica (1482). 81/80 & 2048/2025. Switched on Bach","filename":"ramis.scl","rnbo":[12,135,128,10,9,32,27,5,4,4,3,45,32,3,2,128,81,5,3,16,9,15,8,2,1]},"rankfour46a":{"title":"Rank four hobbit 441/440, 364/363 in 393-tET","filename":"rankfour46a.scl","rnbo":[46,27.48092,0,54.96183,0,82.44275,0,109.92366,0,122.1374,0,149.61832,0,177.09924,0,204.58015,0,232.06107,0,259.54198,0,287.0229,0,314.50382,0,332.82443,0,369.46565,0,387.78626,0,415.26718,0,442.74809,0,470.22901,0,497.70992,0,525.19084,0,552.67176,0,580.15267,0,592.36641,0,619.84733,0,647.32824,0,674.80916,0,702.29008,0,729.77099,0,757.25191,0,784.73282,0,812.21374,0,839.69466,0,867.17557,0,885.49618,0,912.9771,0,934.35115,0,967.93893,0,989.31298,0,1016.79389,0,1035.1145,0,1062.59542,0,1090.07634,0,1117.55725,0,1145.03817,0,1172.51908,0,2,1]},"rankfour46b":{"title":"Rankfour46b hobbit minimax tuning, commas 385/384, 325/324","filename":"rankfour46b.scl","rnbo":[46,23.28465,0,51.91084,0,67.1157,0,113.50965,0,136.7943,0,151.99916,0,180.62535,0,203.91,0,232.53619,0,265.50881,0,288.79346,0,317.41965,0,332.62451,0,369.33049,0,384.53535,0,413.16154,0,436.4462,0,469.41881,0,498.045,0,521.32965,0,549.95584,0,565.1607,0,588.44535,0,634.8393,0,650.04416,0,678.67035,0,701.955,0,730.58119,0,753.86584,0,786.83846,0,815.46465,0,838.7493,0,853.95416,0,882.58035,0,905.865,0,934.49119,0,967.46381,0,996.09,0,1019.37465,0,1048.00084,0,1063.2057,0,1086.49035,0,1115.11654,0,1148.08916,0,1171.37381,0,2,1]},"rapoport_8":{"title":"Paul Rapoport, cycle of 14/9 close to 8 out of 11-tET, XH 13, 1991","filename":"rapoport_8.scl","rnbo":[8,67228,59049,98,81,9,7,9604,6561,14,9,81,49,1372,729,2,1]},"rast pentachord 11-limit":{"title":"Rast pentachord 72:81:88:96:108","filename":"rast pentachord 11-limit.scl","rnbo":[4,9,8,11,9,4,3,3,2]},"rast pentachord 31-limit":{"title":"Rast pentachord 600:675:744:800:900","filename":"rast pentachord 31-limit.scl","rnbo":[4,9,8,31,25,4,3,3,2]},"rast pentachord 5-limit":{"title":"Rast pentachord 600:675:744:800:900","filename":"rast pentachord 5-limit.scl","rnbo":[4,9,8,5,4,4,3,3,2]},"rast tetrachord 11-limit":{"title":"Rast tetrachord 72:81:88:96","filename":"rast tetrachord 11-limit.scl","rnbo":[3,9,8,11,9,4,3]},"rast tetrachord 31-limit":{"title":"Rast tetrachord 600:675:744:800","filename":"rast tetrachord 31-limit.scl","rnbo":[3,9,8,31,25,4,3]},"rast tetrachord 5-limit":{"title":"Rast tetrachord 24:27:30:32","filename":"rast tetrachord 5-limit.scl","rnbo":[3,9,8,5,4,4,3]},"rast_11-limit":{"title":"2.3.11 subgroup Rast","filename":"rast_11-limit.scl","rnbo":[7,9,8,27,22,4,3,3,2,27,16,81,44,2,1]},"rast_7-limit":{"title":"7-limit diatonic Rast scale","filename":"rast_7-limit.scl","rnbo":[7,28,25,56,45,75,56,112,75,3136,1875,6272,3375,2,1]},"rast_moha":{"title":"Rast + Mohajira (Dudon) 4 + 3 + 3 Rast and 3 + 4 + 3 Mohajira tetrachords","filename":"rast_moha.scl","rnbo":[7,200.0,0,350.0,0,500.0,0,700.0,0,850.0,0,1050.0,0,2,1]},"rastgross2":{"title":"rastmic-grossmic {243/242, 144/143} tempering of [11/10, 11/9, 11/8, 3/2, 22/13, 11/6, 2], POTE tuning","filename":"rastgross2.scl","rnbo":[7,168.46977,0,351.48761,0,557.43807,0,702.97523,0,908.92568,0,1054.46284,0,2,1]},"rastgross3":{"title":"rastmic-grossmic {243/242, 144/143} tempering of [9/8, 11/9, 11/8, 20/13, 22/13, 11/6, 2]","filename":"rastgross3.scl","rnbo":[7,205.95045,0,351.48761,0,557.43807,0,740.45591,0,908.92568,0,1054.46284,0,2,1]},"rat_dorenh":{"title":"Rationalized Schlesinger's Dorian Harmonia in the enharmonic genus","filename":"rat_dorenh.scl","rnbo":[7,44,43,22,21,11,8,11,7,8,5,44,27,2,1]},"rat_hypodenh":{"title":"1+1 rationalized enharmonic genus derived from K.S.'s 'Bastard' Hypodorian","filename":"rat_hypodenh.scl","rnbo":[7,32,31,16,15,4,3,16,11,64,43,32,21,2,1]},"rat_hypodenh2":{"title":"1+2 rationalized enharmonic genus derived from K.S.'s 'Bastard' Hypodorian","filename":"rat_hypodenh2.scl","rnbo":[7,32,31,32,29,4,3,16,11,64,43,64,41,2,1]},"rat_hypodenh3":{"title":"1+3 rationalized enharmonic genus derived from K.S.'s 'Bastard' Hypodorian","filename":"rat_hypodenh3.scl","rnbo":[7,32,31,8,7,4,3,16,11,64,43,8,5,2,1]},"rat_hypodhex":{"title":"1+1 rationalized hexachromatic/hexenharmonic genus derived from K.S.'Bastard'","filename":"rat_hypodhex.scl","rnbo":[7,48,47,24,23,4,3,16,11,96,65,3,2,2,1]},"rat_hypodhex2":{"title":"1+2 rat. hexachromatic/hexenharmonic genus derived from K.S.'s 'Bastard' Hypodo","filename":"rat_hypodhex2.scl","rnbo":[7,48,47,16,15,4,3,16,11,96,65,32,21,2,1]},"rat_hypodhex3":{"title":"1+3 rat. hexachromatic/hexenharmonic genus from K.S.'s 'Bastard' Hypodorian","filename":"rat_hypodhex3.scl","rnbo":[7,48,47,12,11,4,3,16,11,96,65,48,31,2,1]},"rat_hypodhex4":{"title":"1+4 rat. hexachromatic/hexenharmonic genus from K.S.'s 'Bastard' Hypodorian","filename":"rat_hypodhex4.scl","rnbo":[7,48,47,48,43,4,3,16,11,96,65,96,61,2,1]},"rat_hypodhex5":{"title":"1+5 rat. hexachromatic/hexenharmonic genus from K.S.'s 'Bastard' Hypodorian","filename":"rat_hypodhex5.scl","rnbo":[7,48,47,8,7,4,3,16,11,96,65,8,5,2,1]},"rat_hypodhex6":{"title":"2+3 rationalized hexachromatic/hexenharmonic genus from K.S.'s 'Bastard' hypod","filename":"rat_hypodhex6.scl","rnbo":[7,24,23,48,43,4,3,16,11,3,2,96,61,2,1]},"rat_hypodpen":{"title":"1+1 rationalized pentachromatic/pentenharmonic genus derived from K.S.'s 'Bastar","filename":"rat_hypodpen.scl","rnbo":[7,40,39,20,19,4,3,16,11,40,27,80,53,2,1]},"rat_hypodpen2":{"title":"1+2 rationalized pentachromatic/pentenharmonic genus from K.S.'s 'Bastard' hyp","filename":"rat_hypodpen2.scl","rnbo":[7,40,39,40,37,4,3,16,11,40,27,20,13,2,1]},"rat_hypodpen3":{"title":"1+3 rationalized pentachromatic/pentenharmonic genus from 'Bastard' Hypodorian","filename":"rat_hypodpen3.scl","rnbo":[7,40,39,10,9,4,3,16,11,40,27,80,51,2,1]},"rat_hypodpen4":{"title":"1+4 rationalized pentachromatic/pentenharmonic genus from 'Bastard' Hypodorian","filename":"rat_hypodpen4.scl","rnbo":[7,40,39,8,7,4,3,16,11,40,27,8,5,2,1]},"rat_hypodpen5":{"title":"2+3 rationalized pentachromatic/pentenharmonic genus from 'Bastard' Hypodorian","filename":"rat_hypodpen5.scl","rnbo":[7,20,19,10,9,4,3,16,11,80,53,80,51,2,1]},"rat_hypodpen6":{"title":"2+3 rationalized pentachromatic/pentenharmonic genus from 'Bastard' Hypodorian","filename":"rat_hypodpen6.scl","rnbo":[7,40,39,8,7,4,3,16,11,80,53,8,5,2,1]},"rat_hypodtri":{"title":"rationalized first (1+1) trichromatic genus derived from K.S.'s 'Bastard' hyp","filename":"rat_hypodtri.scl","rnbo":[7,24,23,12,11,4,3,16,11,3,2,48,31,2,1]},"rat_hypodtri2":{"title":"rationalized second (1+2) trichromatic genus derived from K.S.'s 'Bastard' hyp","filename":"rat_hypodtri2.scl","rnbo":[7,24,23,8,7,4,3,16,11,3,2,8,5,2,1]},"rat_hypolenh":{"title":"Rationalized Schlesinger's Hypolydian Harmonia in the enharmonic genus","filename":"rat_hypolenh.scl","rnbo":[8,40,39,20,19,4,3,10,7,20,13,80,51,8,5,2,1]},"rat_hypopchrom":{"title":"Rationalized Schlesinger's Hypophrygian Harmonia in the chromatic genus","filename":"rat_hypopchrom.scl","rnbo":[7,18,17,9,8,18,13,3,2,36,23,18,11,2,1]},"rat_hypopenh":{"title":"Rationalized Schlesinger's Hypophrygian Harmonia in the enharmonic genus","filename":"rat_hypopenh.scl","rnbo":[7,36,35,18,17,18,13,3,2,72,47,36,23,2,1]},"rat_hypoppen":{"title":"Rationalized Schlesinger's Hypophrygian Harmonia in the pentachromatic genus","filename":"rat_hypoppen.scl","rnbo":[7,45,43,9,8,18,13,3,2,45,29,18,11,2,1]},"rat_hypoptri":{"title":"Rationalized Schlesinger's Hypophrygian Harmonia in first trichromatic genus","filename":"rat_hypoptri.scl","rnbo":[7,27,26,27,25,18,13,3,2,54,35,27,17,2,1]},"rat_hypoptri2":{"title":"Rationalized Schlesinger's Hypophrygian Harmonia in second trichromatic genus","filename":"rat_hypoptri2.scl","rnbo":[7,27,26,9,8,18,13,3,2,54,35,18,11,2,1]},"rectsp10":{"title":"Rectangle minimal beats spectrum of order 10","filename":"rectsp10.scl","rnbo":[32,11,10,10,9,9,8,8,7,7,6,6,5,11,9,5,4,9,7,13,10,4,3,11,8,7,5,10,7,13,9,3,2,14,9,11,7,8,5,13,8,5,3,17,10,12,7,7,4,16,9,9,5,11,6,13,7,15,8,17,9,19,10,2,1]},"rectsp10a":{"title":"Rectangle minimal beats spectrum of order 10 union with inversion","filename":"rectsp10a.scl","rnbo":[45,20,19,18,17,16,15,14,13,12,11,11,10,10,9,9,8,8,7,7,6,20,17,6,5,11,9,16,13,5,4,14,11,9,7,13,10,4,3,11,8,18,13,7,5,10,7,13,9,16,11,3,2,20,13,14,9,11,7,8,5,13,8,18,11,5,3,17,10,12,7,7,4,16,9,9,5,20,11,11,6,13,7,15,8,17,9,19,10,2,1]},"rectsp11":{"title":"Rectangle minimal beats spectrum of order 11","filename":"rectsp11.scl","rnbo":[42,12,11,11,10,10,9,9,8,8,7,7,6,13,11,6,5,11,9,5,4,14,11,9,7,13,10,4,3,15,11,11,8,7,5,10,7,13,9,16,11,3,2,17,11,14,9,11,7,8,5,13,8,18,11,5,3,17,10,12,7,19,11,7,4,16,9,9,5,20,11,11,6,13,7,15,8,17,9,19,10,21,11,2,1]},"rectsp12":{"title":"Rectangle minimal beats spectrum of order 12","filename":"rectsp12.scl","rnbo":[46,13,12,12,11,11,10,10,9,9,8,8,7,7,6,13,11,6,5,11,9,5,4,14,11,9,7,13,10,4,3,15,11,11,8,7,5,17,12,10,7,13,9,16,11,3,2,17,11,14,9,11,7,19,12,8,5,13,8,18,11,5,3,17,10,12,7,19,11,7,4,16,9,9,5,20,11,11,6,13,7,15,8,17,9,19,10,21,11,23,12,2,1]},"rectsp6":{"title":"Rectangle minimal beats spectrum of order 6, also Songlines.DEM, Bill Thibault and Scott Gresham-Lancaster (1992)","filename":"rectsp6.scl","rnbo":[12,7,6,6,5,5,4,4,3,7,5,3,2,8,5,5,3,7,4,9,5,11,6,2,1]},"rectsp6a":{"title":"Rectangle minimal beats spectrum of order 6 union with inversion","filename":"rectsp6a.scl","rnbo":[17,12,11,10,9,8,7,7,6,6,5,5,4,4,3,7,5,10,7,3,2,8,5,5,3,12,7,7,4,9,5,11,6,2,1]},"rectsp6amarvwoo":{"title":"Marvel woo version of rectsp6a","filename":"rectsp6amarvwoo.scl","rnbo":[17,151.28207,0,183.04515,0,232.46054,0,267.51234,0,316.92773,0,383.74261,0,499.97288,0,584.44007,0,616.20315,0,700.67034,0,816.90061,0,883.71549,0,933.13088,0,968.18268,0,1017.59808,0,1049.36115,0,1200.64322,0]},"rectsp7":{"title":"Rectangle minimal beats spectrum of order 7","filename":"rectsp7.scl","rnbo":[18,8,7,7,6,6,5,5,4,9,7,4,3,7,5,10,7,3,2,11,7,8,5,5,3,12,7,7,4,9,5,11,6,13,7,2,1]},"rectsp7a":{"title":"Rectangle minimal beats spectrum of order 7 union with inversion","filename":"rectsp7a.scl","rnbo":[23,14,13,12,11,10,9,8,7,7,6,6,5,5,4,14,11,9,7,4,3,7,5,10,7,3,2,14,9,11,7,8,5,5,3,12,7,7,4,9,5,11,6,13,7,2,1]},"rectsp8":{"title":"Rectangle minimal beats spectrum of order 8","filename":"rectsp8.scl","rnbo":[22,9,8,8,7,7,6,6,5,5,4,9,7,4,3,11,8,7,5,10,7,3,2,11,7,8,5,13,8,5,3,12,7,7,4,9,5,11,6,13,7,15,8,2,1]},"rectsp8a":{"title":"Rectangle minimal beats spectrum of order 8 union with inversion","filename":"rectsp8a.scl","rnbo":[31,16,15,14,13,12,11,10,9,9,8,8,7,7,6,6,5,16,13,5,4,14,11,9,7,4,3,11,8,7,5,10,7,16,11,3,2,14,9,11,7,8,5,13,8,5,3,12,7,7,4,16,9,9,5,11,6,13,7,15,8,2,1]},"rectsp9":{"title":"Rectangle minimal beats spectrum of order 9","filename":"rectsp9.scl","rnbo":[28,10,9,9,8,8,7,7,6,6,5,11,9,5,4,9,7,4,3,11,8,7,5,10,7,13,9,3,2,14,9,11,7,8,5,13,8,5,3,12,7,7,4,16,9,9,5,11,6,13,7,15,8,17,9,2,1]},"rectsp9a":{"title":"Rectangle minimal beats spectrum of order 9 union with inversion","filename":"rectsp9a.scl","rnbo":[37,18,17,16,15,14,13,12,11,10,9,9,8,8,7,7,6,6,5,11,9,16,13,5,4,14,11,9,7,4,3,11,8,18,13,7,5,10,7,13,9,16,11,3,2,14,9,11,7,8,5,13,8,18,11,5,3,12,7,7,4,16,9,9,5,11,6,13,7,15,8,17,9,2,1]},"redfield":{"title":"John Redfield, New Diatonic Scale (1930), inverse of ptolemy_idiat.scl","filename":"redfield.scl","rnbo":[7,10,9,5,4,4,3,3,2,5,3,15,8,2,1]},"reinhard":{"title":"Andreas Reinhard's Monochord (1604) (variant of Ganassi's). Also Abraham Bartolus (1614)","filename":"reinhard.scl","rnbo":[12,18,17,9,8,45,38,5,4,4,3,24,17,3,2,30,19,5,3,30,17,15,8,2,1]},"reinhardj17":{"title":"Johnny Reinhard's Harmonic-17 tuning for \"Tresspass\" (1998)","filename":"reinhardj17.scl","rnbo":[17,18,17,17,16,34,31,19,17,17,15,20,17,17,14,22,17,17,13,24,17,26,17,17,11,28,17,17,10,31,17,32,17,2,1]},"renteng1":{"title":"Gamelan Renteng from Chileunyi (Tg. Sari). 1/1=330 Hz","filename":"renteng1.scl","rnbo":[5,12,11,311.264,0,698.454,0,846.168,0,2,1]},"renteng2":{"title":"Gamelan Renteng from Chikebo (Tg. Sari). 1/1=360 Hz","filename":"renteng2.scl","rnbo":[5,9,8,303.577,0,717.911,0,843.485,0,2,1]},"renteng3":{"title":"Gamelan Renteng from Lebakwangi (Pameungpeuk). 1/1=377 Hz","filename":"renteng3.scl","rnbo":[6,111.157,0,310.275,0,644.372,0,775.381,0,1008.388,0,2,1]},"renteng4":{"title":"Gamelan Renteng Bale` bandung from Kanoman (Cheribon). 1/1=338 Hz","filename":"renteng4.scl","rnbo":[5,216.385,0,304.508,0,722.323,0,836.583,0,2,1]},"riccati":{"title":"Giordano Riccati, Venetian temperament, Barbieri, 1986","filename":"riccati.scl","rnbo":[12,91.85286,0,196.74124,0,301.62959,0,393.48248,0,501.62935,0,591.85298,0,698.37062,0,791.85275,0,895.11186,0,1001.62947,0,1091.8531,0,2,1]},"riemann":{"title":"Imaginary part of zeroes of the Riemann Zeta function","filename":"riemann.scl","rnbo":[29,4585.40631,0,5272.5969,0,5573.37915,0,5912.61538,0,6049.86281,0,6278.55639,0,6425.62689,0,6524.63626,0,6702.14077,0,6764.77868,0,6872.53483,0,6982.56693,0,7069.32512,0,7112.10394,0,7229.83632,0,7281.36805,0,7343.88476,0,7405.52405,0,7490.77295,0,7523.39731,0,7571.91451,0,7648.17701,0,7685.87339,0,7739.97422,0,7767.16295,0,7837.50613,0,7877.4613,0,7899.62049,0,7952.27348,0]},"riley_albion":{"title":"Terry Riley's Harp of New Albion scale, inverse Malcolm's Monochord, 1/1 on C#","filename":"riley_albion.scl","rnbo":[12,16,15,9,8,6,5,5,4,4,3,64,45,3,2,8,5,5,3,16,9,15,8,2,1]},"riley_rosary":{"title":"Terry Riley, tuning for Cactus Rosary (1993)","filename":"riley_rosary.scl","rnbo":[12,49,48,9,8,7,6,5,4,21,16,11,8,3,2,49,32,13,8,7,4,15,8,2,1]},"robot_dead":{"title":"Dead Robot (see lattice)","filename":"robot_dead.scl","rnbo":[12,25,24,16,15,9,8,75,64,6,5,5,4,4,3,45,32,3,2,5,3,15,8,2,1]},"robot_live":{"title":"Live Robot","filename":"robot_live.scl","rnbo":[12,9,8,6,5,5,4,32,25,4,3,36,25,3,2,8,5,128,75,15,8,48,25,2,1]},"rodan26opt":{"title":"Rodan[26] 13-limit 5 cents lesfip optimized","filename":"rodan26opt.scl","rnbo":[26,29.06175,0,152.5121,0,180.5299,0,208.84186,0,233.75208,0,262.95258,0,386.79098,0,414.78377,0,444.47024,0,467.92065,0,497.60712,0,525.59991,0,649.43831,0,678.63882,0,703.54903,0,731.86099,0,759.87879,0,883.32914,0,912.39089,0,938.87987,0,966.05891,0,995.02774,0,1117.36315,0,1146.33198,0,1173.51102,0,2,1]},"rodan31opt":{"title":"Rodan[31] 13-limit 6 cents lesfip optimized","filename":"rodan31opt.scl","rnbo":[31,95.6695,0,124.038,0,150.9566,0,178.3229,0,205.8857,0,234.4243,0,329.9162,0,358.6095,0,385.5754,0,412.8647,0,440.047,0,468.8797,0,564.2187,0,593.0514,0,620.2337,0,647.523,0,674.4889,0,703.1822,0,798.6741,0,827.2127,0,854.7755,0,882.1418,0,909.0604,0,937.4289,0,1033.0984,0,1061.215,0,1089.4016,0,1116.5492,0,1143.6968,0,1171.8834,0,2,1]},"rodan41opt":{"title":"Rodan[41] 13-limit 6 cents optimized","filename":"rodan41opt.scl","rnbo":[41,27.9716,0,54.6867,0,82.9638,0,111.0214,0,151.4839,0,179.7677,0,206.4745,0,234.3959,0,262.4063,0,289.3892,0,317.0427,0,345.3074,0,385.4349,0,414.2972,0,441.2919,0,468.8057,0,496.8785,0,524.0155,0,551.2112,0,579.91,0,620.09,0,648.7888,0,675.9845,0,703.1215,0,731.1943,0,758.7081,0,785.7028,0,814.5651,0,854.6926,0,882.9573,0,910.6108,0,937.5937,0,965.6041,0,993.5255,0,1020.2323,0,1048.5161,0,1088.9786,0,1117.0362,0,1145.3133,0,1172.0284,0,2,1]},"rodgers_chevyshake":{"title":"Scale used in Prent Rodgers' The Stick Shift Chevy Shake","filename":"rodgers_chevyshake.scl","rnbo":[10,12,11,9,8,6,5,5,4,4,3,11,8,3,2,12,7,7,4,2,1]},"rogers_7":{"title":"Prent Rogers, scale of Serenade for Alto Flute nr.10","filename":"rogers_7.scl","rnbo":[7,8,7,9,7,10,7,3,2,12,7,27,14,2,1]},"rogers_wind":{"title":"Prent Rogers, scale for Dry Hole Canyon for Woodwind Quintet","filename":"rogers_wind.scl","rnbo":[12,14,13,6,5,16,13,5,4,18,13,7,5,3,2,20,13,8,5,7,4,24,13,2,1]},"romieu":{"title":"Romieu's Monochord, Mémoire théorique & pratique (1758)","filename":"romieu.scl","rnbo":[12,25,24,9,8,6,5,5,4,4,3,45,32,3,2,25,16,5,3,16,9,15,8,2,1]},"romieu_inv":{"title":"Romieu inverted, Pure (just) C minor in Wilkinson: Tuning In","filename":"romieu_inv.scl","rnbo":[12,25,24,10,9,6,5,5,4,4,3,45,32,3,2,8,5,5,3,16,9,15,8,2,1]},"rosati_21":{"title":"Dante Rosati, JI guitar tuning","filename":"rosati_21.scl","rnbo":[21,16,15,10,9,9,8,8,7,7,6,6,5,5,4,9,7,4,3,7,5,10,7,3,2,14,9,8,5,5,3,12,7,7,4,16,9,9,5,15,8,2,1]},"rosati_21a":{"title":"Alternative version of rosati_21 with more tetrads","filename":"rosati_21a.scl","rnbo":[21,15,14,10,9,9,8,8,7,7,6,6,5,5,4,9,7,4,3,7,5,10,7,3,2,14,9,8,5,5,3,12,7,7,4,16,9,9,5,28,15,2,1]},"rosati_21m":{"title":"1/4-kleismic marvel tempering of rosati_21.scl","filename":"rosati_21m.scl","rnbo":[21,115.58705,0,184.33159,0,200.05424,0,8,7,268.79879,0,6,5,384.38583,0,431.22833,0,499.97288,0,584.44007,0,615.55993,0,700.02712,0,768.77167,0,815.61417,0,5,3,931.20121,0,7,4,999.94576,0,1015.66841,0,1084.41295,0,2,1]},"rothert":{"title":"Thomas Rothert, Bayreuth temperament, 1/8 P consecutive","filename":"rothert.scl","rnbo":[12,96.09,0,198.045,0,300.0,0,396.09,0,500.9775,0,594.135,0,699.0225,0,798.045,0,897.0675,0,1001.955,0,1095.1125,0,2,1]},"roulette19":{"title":"Roulette[19] 2.5.7.11.13 subgroup scale in 37-tET tuning","filename":"roulette19.scl","rnbo":[19,32.43243,0,162.16216,0,194.59459,0,227.02703,0,356.75676,0,389.18919,0,421.62162,0,551.35135,0,583.78378,0,616.21622,0,745.94595,0,778.37838,0,810.81081,0,843.24324,0,972.97297,0,1005.40541,0,1037.83784,0,1167.56757,0,2,1]},"rousseau":{"title":"Rousseau's Monochord, Dictionnaire de musique (1768)","filename":"rousseau.scl","rnbo":[12,25,24,9,8,6,5,5,4,4,3,25,18,3,2,8,5,5,3,9,5,15,8,2,1]},"rousseau2":{"title":"Standard French temperament Rousseau-2, C. di Veroli","filename":"rousseau2.scl","rnbo":[12,81.42557,0,193.15686,0,287.58466,0,5,4,4,3,581.26276,0,696.57843,0,783.38057,0,889.73529,0,993.84092,0,1082.89214,0,2,1]},"rousseau3":{"title":"Standard French temperament Rousseau-3, C. di Veroli, 2002","filename":"rousseau3.scl","rnbo":[12,81.42557,0,193.15686,0,288.83919,0,5,4,4,3,579.47057,0,696.57843,0,783.38057,0,889.73529,0,994.29781,0,1082.89214,0,2,1]},"rousseau4":{"title":"Standard French temperament Rousseau-4, C. di Veroli","filename":"rousseau4.scl","rnbo":[12,81.42557,0,193.15686,0,287.58466,0,5,4,4,3,579.47057,0,696.57843,0,783.38057,0,889.73529,0,993.84092,0,1082.89214,0,2,1]},"rousseauk":{"title":"Kami Rousseau's 7-limit tri-blues 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strong form of Avicenna's 8/7 diatonic","filename":"safi_diat.scl","rnbo":[7,19,18,7,6,4,3,3,2,19,12,7,4,2,1]},"safi_diat2":{"title":"Safi al-Din's 2nd Diatonic, a 3/4 tone diatonic like Ptolemy's Equable Diatonic","filename":"safi_diat2.scl","rnbo":[7,64,59,32,27,4,3,3,2,96,59,16,9,2,1]},"safi_isfahan":{"title":"Isfahan genus by Safi al-Din Urmavi","filename":"safi_isfahan.scl","rnbo":[4,13,12,7,6,91,72,4,3]},"safi_isfahan2":{"title":"Alternative Isfahan genus by Safi al-Din Urmavi","filename":"safi_isfahan2.scl","rnbo":[4,13,12,7,6,5,4,4,3]},"safi_major":{"title":"Singular Major (DF #6), from Safi al-Din, strong 32/27 chromatic","filename":"safi_major.scl","rnbo":[6,14,13,16,13,4,3,56,39,3,2,2,1]},"safi_rahevi":{"title":"Rahevi genus by Safi al-Din Urmavi","filename":"safi_rahevi.scl","rnbo":[3,13,12,7,6,5,4]},"safi_unnamed1":{"title":"Unnamed genus by Safi al-Din Urmavi 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Traité (1697)","filename":"sauveur.scl","rnbo":[12,85.429,0,194.319,0,311.789,0,395.69,0,502.325,0,587.221,0,697.153,0,807.712,0,893.287,0,1009.919,0,1090.274,0,2,1]},"sauveur2":{"title":"Sauveur's Système Chromatique des Musiciens (Mémoires 1701), 12 out of 55.","filename":"sauveur2.scl","rnbo":[12,109.091,0,196.364,0,305.455,0,392.727,0,501.818,0,610.909,0,698.182,0,807.273,0,894.545,0,1003.636,0,1090.909,0,2,1]},"sauveur_17":{"title":"Sauveur's oriental system, aft. 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Scheffer (1748) modified 1/5-comma temperament, Sweden","filename":"scheffer.scl","rnbo":[12,83.576,0,195.307,0,292.96163,0,390.615,0,502.346,0,585.922,0,697.654,0,781.23,0,892.961,0,1004.693,0,15,8,2,1]},"schiassi":{"title":"Filippo Schiassi","filename":"schiassi.scl","rnbo":[12,135,128,9,8,1215,1024,5,4,4,3,45,32,3,2,405,256,5,3,16,9,15,8,2,1]},"schidlof":{"title":"Schidlof","filename":"schidlof.scl","rnbo":[21,81,80,21,20,15,14,9,8,7,6,135,112,100,81,5,4,4,3,27,20,7,5,10,7,3,2,14,9,45,28,5,3,7,4,25,14,50,27,15,8,2,1]},"schillinger":{"title":"Joseph Schillinger's double equal temperament, p.664 Mathematical Basis...","filename":"schillinger.scl","rnbo":[36,8.33333,0,91.66667,0,100.0,0,108.33333,0,191.66667,0,200.0,0,208.33333,0,291.66667,0,300.0,0,308.33333,0,391.66667,0,400.0,0,408.33333,0,491.66667,0,500.0,0,508.33333,0,591.66667,0,600.0,0,608.33333,0,691.66667,0,700.0,0,708.33333,0,791.66667,0,800.0,0,808.33333,0,891.66667,0,900.0,0,908.33333,0,991.66667,0,1000.0,0,1008.33333,0,1091.66667,0,1100.0,0,1108.33333,0,1191.66667,0,2,1]},"schis41":{"title":"Tenney reduced version of wilson_41","filename":"schis41.scl","rnbo":[41,50,49,25,24,81,77,15,14,12,11,10,9,9,8,8,7,7,6,25,21,6,5,27,22,5,4,63,50,9,7,21,16,4,3,200,147,25,18,7,5,10,7,16,11,40,27,3,2,32,21,14,9,100,63,8,5,18,11,5,3,27,16,12,7,7,4,16,9,9,5,50,27,15,8,154,81,27,14,49,25,2,1]},"schisynch17":{"title":"Schismatic[17] in synch (brat=-1) tuning","filename":"schisynch17.scl","rnbo":[17,91.360882,0,182.721764,0,203.455647,0,294.816529,0,386.177411,0,406.911294,0,498.272176,0,589.633058,0,680.99394,0,701.727824,0,793.088706,0,884.449587,0,905.183471,0,996.544353,0,1087.905235,0,1108.639118,0,2,1]},"schlesinger_jupiter":{"title":"Schlesinger's Jupiter scale","filename":"schlesinger_jupiter.scl","rnbo":[12,18,17,9,8,36,31,6,5,18,13,36,25,3,2,36,23,18,11,12,7,9,5,2,1]},"schlesinger_mars":{"title":"Schlesinger's Mars scale","filename":"schlesinger_mars.scl","rnbo":[12,20,19,10,9,20,17,5,4,10,7,40,27,20,13,8,5,5,3,40,23,20,11,2,1]},"schlesinger_saturn":{"title":"Schlesinger's Saturn scale","filename":"schlesinger_saturn.scl","rnbo":[12,32,31,16,15,8,7,16,13,4,3,32,23,16,11,32,21,8,5,32,19,16,9,2,1]},"schlick-barbour":{"title":"Reconstructed temp. A. Schlick, Spiegel d. Orgelmacher und Organisten (1511) by Barbour","filename":"schlick-barbour.scl","rnbo":[12,256,243,196.09,0,301.955,0,392.18,0,501.955,0,590.225,0,698.045,0,796.09,0,894.135,0,1001.955,0,1090.225,0,2,1]},"schlick-husmann":{"title":"Schlick's temperament reconstructed by Heinrich Husmann (1967)","filename":"schlick-husmann.scl","rnbo":[12,85.0,0,196.0,0,305.0,0,390.0,0,502.0,0,589.0,0,698.0,0,799.0,0,892.0,0,1003.0,0,1088.0,0,2,1]},"schlick-lange":{"title":"Reconstructed temp. Arnoldt Schlick (1511) by Helmut Lange, Ein Beitrag zur musikalischen Temperatur, 1968, p. 482","filename":"schlick-lange.scl","rnbo":[12,85.458,0,195.84514,0,306.23229,0,391.69029,0,502.07743,0,587.53543,0,697.92257,0,800.24486,0,893.76771,0,1004.15486,0,1089.61286,0,2,1]},"schlick-ratte":{"title":"Schlick's temperament reconstructed by F.J. Ratte (1991)","filename":"schlick-ratte.scl","rnbo":[12,88.26999,0,196.09,0,303.91,0,392.18,0,501.955,0,590.225,0,698.045,0,800.0,0,894.135,0,1001.955,0,1090.225,0,2,1]},"schlick-schugk":{"title":"Schlick's temperament reconstructed by Hans-Joachim Schugk (1980)","filename":"schlick-schugk.scl","rnbo":[12,80.84099,0,194.526,0,308.211,0,389.052,0,502.737,0,583.57799,0,697.263,0,778.10399,0,891.789,0,1005.474,0,4096,2187,2,1]},"schlick-tessmer":{"title":"Schlick's temperament reconstructed by Manfred Tessmer (1994)","filename":"schlick-tessmer.scl","rnbo":[12,87.78124,0,195.1125,0,302.44375,0,390.225,0,502.44375,0,587.78124,0,697.55625,0,798.53375,0,892.66875,0,1002.44375,0,1087.78124,0,2,1]},"schlick2":{"title":"Another reconstructed Schlick's modified meantone (Poletti?)","filename":"schlick2.scl","rnbo":[12,88.17405,0,196.08638,0,303.94955,0,392.1797,0,501.95216,0,589.22477,0,698.04492,0,800.22382,0,894.13477,0,1002.95316,0,1090.22462,0,2,1]},"schlick3":{"title":"Possible well-tempered interpretation of 1511 tuning, Margo Schulter","filename":"schlick3.scl","rnbo":[12,88.27,0,196.09,0,303.91,0,392.18,0,501.955,0,589.2475,0,698.045,0,799.0225,0,894.135,0,1002.9325,0,1090.225,0,2,1]},"schlick3a":{"title":"Variation on Schlick (1511), all 5ths within 7c of pure, Margo Schulter","filename":"schlick3a.scl","rnbo":[12,88.27,0,196.09,0,303.91,0,392.18,0,501.955,0,589.2475,0,698.045,0,797.0,0,894.135,0,1002.9325,0,1090.225,0,2,1]},"schneegass1":{"title":"Cyriacus Schneegaß (1590), meantone, 1st method: rational approximation","filename":"schneegass1.scl","rnbo":[12,75.87331,0,12800,11449,1225043,1024000,163840000,131079601,107,80,579.31998,0,160,107,772.42664,0,2048000,1225043,11449,6400,1082.76665,0,2,1]},"schneegass2":{"title":"Cyriacus Schneegaß (1590), meantone, 2nd method: geometric approximation","filename":"schneegass2.scl","rnbo":[12,79.00509,0,12800,11449,1225043,1024000,389.3451,0,107,80,582.45176,0,160,107,775.55842,0,2048000,1225043,11449,6400,1085.89843,0,2,1]},"schneegass3":{"title":"Cyriacus Schneegaß (1590), meantone, 3rd method: numeric approximation","filename":"schneegass3.scl","rnbo":[12,80.782,0,194.072,0,308.108,0,388.353,0,500.907,0,581.226,0,695.96,0,775.339,0,889.802,0,1005.458,0,1085.483,0,2,1]},"schneider_log":{"title":"Robert Schneider, scale of log(4) .. log(16), 1/1=264Hz","filename":"schneider_log.scl","rnbo":[12,258.38795,0,444.17202,0,587.05376,0,3,2,797.33845,0,878.42501,0,948.64203,0,1010.34963,0,1065.23606,0,1114.54688,0,1159.22503,0,2,1]},"scholz":{"title":"Simple Tune #1 Carter Scholz","filename":"scholz.scl","rnbo":[8,28,27,8,7,7,6,4,3,3,2,14,9,7,4,2,1]},"scholz_epi":{"title":"Carter Scholz, Epimore","filename":"scholz_epi.scl","rnbo":[40,4,1,5,1,6,1,7,1,8,1,9,1,10,1,11,1,12,1,13,1,14,1,15,1,16,1,18,1,20,1,21,1,22,1,24,1,25,1,26,1,27,1,28,1,32,1,33,1,35,1,36,1,39,1,40,1,42,1,44,1,45,1,48,1,49,1,50,1,54,1,55,1,56,1,63,1,64,1,65,1]},"schulter_10":{"title":"Margo Schulter, 13-limit tuning, TL 14-11-2007","filename":"schulter_10.scl","rnbo":[10,22,21,9,8,33,28,4,3,88,63,3,2,11,7,39,22,13,7,2,1]},"schulter_12":{"title":"Margo Schulter's 5-limit JI virt. ET, \"scintilla of Artusi\" tempered, TL 22-08-98","filename":"schulter_12.scl","rnbo":[12,100.00896,0,134217728,119574225,300.01152,0,400.00512,0,500.01408,0,600.00768,0,16384,10935,800.01024,0,900.00384,0,1000.0128,0,1100.0064,0,1200.01536,0]},"schulter_14_13-12":{"title":"Temperament with just 14/13 apotome, close to Pepper Noble Fifth","filename":"schulter_14_13-12.scl","rnbo":[12,14,13,208.08521,0,287.87218,0,416.17043,0,495.95739,0,624.25564,0,704.04261,0,832.34085,0,912.12782,0,991.91479,0,1120.21303,0,2,1]},"schulter_17":{"title":"Neo-Gothic well-temperament (14:11, 9:7 hypermeantone fifths) TL 04-09-2000","filename":"schulter_17.scl","rnbo":[17,126,121,130.639,0,208.754,0,286.869,0,343.787,0,14,11,495.623,0,561.329,0,626.262,0,704.377,0,778.871,0,196,121,913.131,0,991.246,0,1052.558,0,1121.885,0,2,1]},"schulter_24":{"title":"Rational intonation (RI) scale with some \"17-ish\" features (24 notes)","filename":"schulter_24.scl","rnbo":[24,32,31,243,224,243,217,26,23,7,6,20,17,17,14,23,18,368,279,11160261,8388608,11160261,8126464,13,9,416,279,16777216,11160261,26040609,16777216,31,19,32,19,17,10,561,320,23,13,736,403,48,25,119,60,2,1]},"schulter_24a":{"title":"M. Schulter, just/rational intonation system - with circulating 24-note set","filename":"schulter_24a.scl","rnbo":[24,36,35,18,17,12,11,9,8,15,13,19,16,11,9,29,23,13,10,4,3,11,8,17,12,16,11,3,2,20,13,46,29,18,11,32,19,26,15,16,9,11,6,17,9,35,18,2,1]},"schulter_34":{"title":"\"Carthesian tuning\" with two 17-tET chains 55.106 cents apart","filename":"schulter_34.scl","rnbo":[34,55.106,0,70.58824,0,125.69424,0,141.17647,0,196.28247,0,211.76471,0,7,6,282.35294,0,337.45894,0,352.94118,0,408.04718,0,423.52941,0,478.63541,0,494.11765,0,549.22365,0,564.70588,0,619.81188,0,635.29412,0,690.40012,0,705.88235,0,760.98835,0,776.47059,0,831.57659,0,847.05882,0,902.16482,0,917.64706,0,972.75306,0,988.23529,0,1043.34129,0,1058.82353,0,1113.92953,0,1129.41176,0,1184.51776,0,2,1]},"schulter_44_39-12":{"title":"12-note chromatic tuning with 352:351, 364:363 (G=1/1, 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modes","filename":"schulter_O3-zalzalian12_D.scl","rnbo":[12,138.28125,0,207.42187,0,264.84375,0,345.70312,0,472.26563,0,680.85937,0,704.29687,0,842.57813,0,969.14063,0,1049.99999,0,1176.56249,0,2,1]},"schulter_O3_24":{"title":"O3 or \"Ozone\" (24): just 22/21 limma, 7/4, 11/6, 1024-tET","filename":"schulter_O3_24.scl","rnbo":[24,57.42188,0,126.5625,0,183.98438,0,207.42188,0,264.84376,0,288.28125,0,345.70313,0,414.84375,0,472.26563,0,495.70312,0,553.125,0,622.26563,0,679.68751,0,703.125,0,760.54688,0,830.85937,0,888.28125,0,911.71875,0,969.14063,0,992.57813,0,1050.00001,0,1119.14063,0,1176.56251,0,2,1]},"schulter_bamm24b-pegasus12d":{"title":"Offshoot of Kraig Grady's Centaur: Rast/Penchgah plus Archytas-like modes on 1/1","filename":"schulter_bamm24b-pegasus12d.scl","rnbo":[12,531,512,9,8,4779,4096,59,48,4,3,177,128,3,2,1593,1024,27,16,14337,8192,59,32,2,1]},"schulter_biapotomic_septimal24":{"title":"Biapotomic: two apotomes = 7/6; virtually just 23/16","filename":"schulter_biapotomic_septimal24.scl","rnbo":[24,57.31792,0,76.11753,0,133.43545,0,209.55299,0,266.87091,0,285.67052,0,342.98844,0,419.10597,0,476.42389,0,495.22351,0,552.54143,0,571.34104,0,628.65896,0,704.77649,0,762.09441,0,780.89403,0,838.21195,0,914.32948,0,971.6474,0,990.44701,0,1047.76493,0,1123.88247,0,1181.20039,0,2,1]},"schulter_cantonpentalike34":{"title":"Variation on Gene Ward Smith Cantonpenta, 34-note superset in 271-tET","filename":"schulter_cantonpentalike34.scl","rnbo":[34,57.56458,0,79.7048,0,128.41328,0,137.26937,0,185.97786,0,208.11808,0,265.68266,0,287.82288,0,336.53137,0,345.38745,0,394.09594,0,416.23616,0,473.80074,0,495.94096,0,553.50554,0,575.64576,0,624.35424,0,633.21033,0,681.91882,0,704.05904,0,761.62362,0,783.76384,0,832.47232,0,841.32841,0,890.0369,0,912.17712,0,969.7417,0,991.88192,0,1040.59041,0,1049.44649,0,1098.15498,0,1120.2952,0,1177.85978,0,2,1]},"schulter_cantonpentamint58":{"title":"Rank-3 variant on Gene Ward Smith's Cantonpenta with just 12:13:14","filename":"schulter_cantonpentamint58.scl","rnbo":[58,27.51001,0,48.51128,0,58.7857,0,79.78697,0,107.29698,0,128.29824,0,138.57267,0,176.80952,0,187.08394,0,208.08521,0,235.59522,0,256.59649,0,266.87091,0,287.87218,0,315.38219,0,336.38346,0,346.65788,0,384.89473,0,395.16916,0,416.17043,0,443.68043,0,464.6817,0,474.95613,0,495.95739,0,523.4674,0,544.46867,0,554.74309,0,575.74436,0,603.25437,0,624.25564,0,634.53006,0,672.76691,0,683.04134,0,704.04261,0,731.55261,0,752.55388,0,762.82831,0,783.82957,0,811.33958,0,832.34085,0,842.61527,0,880.85213,0,891.12655,0,912.12782,0,939.63783,0,960.6391,0,970.91352,0,991.91479,0,1019.4248,0,1040.42606,0,1050.70049,0,1088.93734,0,1099.21176,0,1120.21303,0,1147.72304,0,1168.72431,0,1178.99873,0,2,1]},"schulter_christmas_eve24":{"title":"ChristmasEve or 12/24, just 14/11; 13 fourths up = ~128/99","filename":"schulter_christmas_eve24.scl","rnbo":[24,52.52389,0,130.63894,0,183.16283,0,208.75398,0,261.27787,0,286.86903,0,339.39292,0,417.50796,0,470.03186,0,495.62301,0,548.1469,0,626.26195,0,678.78584,0,704.37699,0,756.90088,0,835.01593,0,887.53982,0,913.13097,0,965.65487,0,991.24602,0,1043.76991,0,1121.88496,0,1174.40885,0,2,1]},"schulter_diat7":{"title":"Diatonic scale, symmetrical tetrachords based on 14/11 and 13/11 triads","filename":"schulter_diat7.scl","rnbo":[7,44,39,14,11,4,3,3,2,22,13,21,11,2,1]},"schulter_ham":{"title":"New rational tuning of \"Hammond organ type\", TL 01-03-2002","filename":"schulter_ham.scl","rnbo":[17,25,24,243,224,26,23,20,17,38,31,23,18,141,106,18,13,13,9,212,141,36,23,31,19,17,10,23,13,448,243,48,25,2,1]},"schulter_indigo12":{"title":"Expansion of 12:13:14:16:18:21:22:24 by Margo Schulter, TL 9-7-2010","filename":"schulter_indigo12.scl","rnbo":[12,28,27,13,12,7,6,11,9,4,3,13,9,3,2,14,9,13,8,7,4,11,6,2,1]},"schulter_jot17a":{"title":"Just octachord tuning 4:3-9:8-4:3 division, 17 steps (7 + 3 + 7), Bb-Bb","filename":"schulter_jot17a.scl","rnbo":[17,28,27,14,13,44,39,7,6,28,23,14,11,4,3,112,81,56,39,3,2,14,9,21,13,22,13,7,4,42,23,21,11,2,1]},"schulter_jot17bb":{"title":"Just octachord Tuning (Bb-Eb, F-Bb), 896:891 divided into 1792:1787:1782","filename":"schulter_jot17bb.scl","rnbo":[17,28,27,14,13,2016,1787,7,6,28,23,14,11,4,3,112,81,56,39,3,2,14,9,21,13,3024,1787,7,4,42,23,21,11,2,1]},"schulter_jwt17":{"title":"\"Just well-tuned 17\" circulating system","filename":"schulter_jwt17.scl","rnbo":[17,126,121,109,101,44,39,33,28,11,9,14,11,117,88,18,13,23,16,176,117,224,143,13,8,56,33,23,13,81,44,224,117,2,1]},"schulter_lin76-34":{"title":"Two 12-note chains, ~704.160 cents, 34 4ths apart (32 4ths = 7:6), TL 29-11-02","filename":"schulter_lin76-34.scl","rnbo":[24,58.55034,0,129.12199,0,187.67233,0,208.32057,0,7,6,287.51915,0,346.06949,0,416.64114,0,475.19148,0,495.83972,0,554.39006,0,624.96171,0,683.51205,0,704.16029,0,762.71062,0,833.28228,0,891.83261,0,912.48086,0,971.03119,0,991.67943,0,1050.22977,0,1120.80142,0,1179.35176,0,2,1]},"schulter_met12":{"title":"Milder Extended Temperament, 5ths average 703.711 cents","filename":"schulter_met12.scl","rnbo":[12,126.5625,0,207.42187,0,289.45313,0,414.84375,0,496.875,0,622.26563,0,704.29688,0,829.6875,0,911.71875,0,992.57813,0,1119.14063,0,2,1]},"schulter_met24-buzurg_al-erin10_cup":{"title":"Decatonic with septimal Buzurg & Rastlike modes","filename":"schulter_met24-buzurg_al-erin10_cup.scl","rnbo":[10,126.5625,0,232.03125,0,357.42187,0,496.875,0,622.26562,0,704.29687,0,829.6875,0,935.15625,0,1061.71875,0,2,1]},"schulter_met24-canonical":{"title":"Smoothed MET-24 in 2048-tET, generators (2/1, 703.711c, 57.422c)","filename":"schulter_met24-canonical.scl","rnbo":[24,57.42188,0,125.97656,0,183.39844,0,207.42188,0,264.84375,0,288.86719,0,346.28906,0,414.84375,0,472.26563,0,496.28906,0,553.71094,0,622.26563,0,679.6875,0,703.71094,0,761.13281,0,829.6875,0,887.10938,0,911.13281,0,968.55469,0,992.57812,0,1050.0,0,1118.55469,0,1175.97656,0,2,1]},"schulter_met24-ji1":{"title":"Possible JI interpretation of MET-24","filename":"schulter_met24-ji1.scl","rnbo":[24,91,88,14,13,10,9,9,8,7,6,13,11,11,9,14,11,21,16,4,3,11,8,63,44,189,128,3,2,14,9,21,13,5,3,22,13,7,4,39,22,11,6,21,11,63,32,2,1]},"schulter_met24-ji3_a":{"title":"JI interpretation of MET-24, 1/1 is A or 22/13 of C-C version","filename":"schulter_met24-ji3_a.scl","rnbo":[24,91,88,22,21,13,12,9,8,7,6,13,11,11,9,14,11,21,16,4,3,11,8,88,63,13,9,3,2,273,176,11,7,13,8,22,13,7,4,39,22,11,6,21,11,63,32,2,1]},"schulter_met24-semineutral17_F#":{"title":"17-CS semineutral sixth from two large major thirds (~63:81:104)","filename":"schulter_met24-semineutral17_F#.scl","rnbo":[17,57.42187,0,139.45313,0,207.42187,0,264.84375,0,370.3125,0,427.73437,0,496.875,0,577.73438,0,635.15625,0,704.29687,0,761.71875,0,867.1875,0,924.60937,0,992.57812,0,1074.60937,0,1132.03125,0,2,1]},"schulter_met24":{"title":"Milder Extended Temperament, 5ths avg. 703.658c, spaced 57.422c","filename":"schulter_met24.scl","rnbo":[24,57.42188,0,126.5625,0,183.98438,0,207.42187,0,264.84375,0,289.45313,0,346.875,0,414.84375,0,472.26563,0,496.875,0,554.29688,0,622.26563,0,679.6875,0,704.29688,0,761.71875,0,829.6875,0,887.10938,0,911.71875,0,969.14063,0,992.57813,0,1050.0,0,1119.14063,0,1176.5625,0,2,1]},"schulter_met24pote":{"title":"MET-24 parapyth temperament Fokker block in POTE tuning","filename":"schulter_met24pote.scl","rnbo":[24,58.33846,0,126.99416,0,185.33261,0,207.71262,0,266.05107,0,288.43108,0,346.76953,0,415.42523,0,473.76369,0,496.14369,0,554.48215,0,623.13785,0,681.47631,0,703.85631,0,762.19476,0,830.85047,0,889.18892,0,911.56892,0,969.90738,0,992.28738,0,1050.62584,0,1119.28154,0,1177.62,0,2,1]},"schulter_neogeb24":{"title":"Neo-Gothic e-based lineotuning (T/S or Blackwood's R=e, ~2.71828), 24 notes","filename":"schulter_neogeb24.scl","rnbo":[24,55.28289,0,132.24835,0,187.53125,0,209.21382,0,264.49671,0,286.17928,0,341.46217,0,418.42763,0,473.71052,0,495.39309,0,550.67598,0,627.64145,0,682.92434,0,704.60691,0,759.8898,0,836.85526,0,892.13815,0,913.82072,0,969.10362,0,990.78618,0,1046.06908,0,1123.03454,0,1178.31743,0,2,1]},"schulter_neogji12":{"title":"M. Schulter, neo-Gothic 12-note JI (prim. 2/3/7/11) 1/1=F with Eb key as D+1","filename":"schulter_neogji12.scl","rnbo":[12,392,363,9,8,147,121,14,11,4,3,63,44,3,2,196,121,27,16,56,33,21,11,2,1]},"schulter_neogp16a":{"title":"M. Schulter, scale from mainly prime-to-prime ratios and octave complements (Gb-D#)","filename":"schulter_neogp16a.scl","rnbo":[16,43,41,6439,5989,53,47,13,11,137,113,47,37,4,3,7,5,1781,1243,3,2,11,7,21,13,22,13,946,533,82,43,2,1]},"schulter_patheq58":{"title":"Aug2-plus-spacing and 21-fifths pathways to 5/4 equally (in)accurate","filename":"schulter_patheq58.scl","rnbo":[58,22.6489,0,46.134,0,57.29241,0,80.7775,0,103.4264,0,126.9115,0,138.06991,0,173.0455,0,184.2039,0,207.689,0,230.3379,0,253.823,0,264.98141,0,288.4665,0,311.1154,0,334.6005,0,345.75891,0,380.7345,0,391.8929,0,415.378,0,438.0269,0,461.512,0,472.67041,0,496.1555,0,518.8044,0,542.2895,0,553.44791,0,576.933,0,599.5819,0,623.067,0,634.22541,0,669.201,0,680.3594,0,703.8445,0,726.4934,0,749.9785,0,761.13691,0,784.622,0,807.2709,0,830.756,0,841.91441,0,876.89,0,888.0484,0,911.5335,0,934.1824,0,957.6675,0,968.82591,0,992.311,0,1014.9599,0,1038.445,0,1049.60341,0,1084.579,0,1095.7374,0,1119.2225,0,1141.8714,0,1165.3565,0,1176.5149,0,2,1]},"schulter_pel":{"title":"Just pelog-style Phrygian pentatonic","filename":"schulter_pel.scl","rnbo":[5,28,27,7,6,3,2,14,9,2,1]},"schulter_peppermint":{"title":"Peppermint 24: Wilson/Pepper apotome/limma=Phi, 2 chains spaced for pure 7:6","filename":"schulter_peppermint.scl","rnbo":[24,58.67969,0,128.66925,0,187.34894,0,208.19121,0,7,6,287.71318,0,346.39287,0,416.38243,0,475.06212,0,495.90439,0,554.58409,0,624.57364,0,683.25333,0,704.09561,0,762.7753,0,832.76485,0,891.44454,0,912.28682,0,970.96651,0,991.80879,0,1050.48848,0,1120.47803,0,1179.15772,0,2,1]},"schulter_piaguilike2":{"title":"Like Mario Pizarro's Piagui: steps of (9/8)^1/2 and (128/81)^1/8","filename":"schulter_piaguilike2.scl","rnbo":[12,99.0225,0,198.045,0,297.0675,0,396.09,0,4,3,600.0,0,699.0225,0,798.045,0,897.0675,0,16,9,1098.045,0,2,1]},"schulter_qcm62a":{"title":"1/4-comma meantone, two 31-notes at 1/4-comma (Vicentino-like system)","filename":"schulter_qcm62a.scl","rnbo":[62,5.37657,0,128,125,46.43543,0,76.049,0,81.42557,0,117.10786,0,122.48443,0,152.098,0,157.47457,0,193.15686,0,198.53343,0,234.21572,0,239.59229,0,269.20586,0,75,64,310.26471,0,6,5,350.63143,0,351.32357,0,5,4,391.69029,0,32,25,432.74914,0,462.36271,0,467.73928,0,503.42157,0,508.79814,0,544.48043,0,549.857,0,579.47057,0,584.84714,0,620.52943,0,625.906,0,655.51957,0,375,256,696.57843,0,3,2,737.63729,0,192,125,25,16,778.004,0,8,5,819.06286,0,848.67643,0,854.053,0,889.73529,0,895.11186,0,930.79414,0,936.17072,0,965.78428,0,971.16086,0,1006.84314,0,1012.21971,0,1047.902,0,1053.27857,0,1082.89214,0,15,8,1123.951,0,48,25,125,64,1164.31771,0,2,1]},"schulter_qcmlji24":{"title":"24-note adaptive JI (Eb-G#/F'-A#') for Lasso's Prologue to _Prophetiae_","filename":"schulter_qcmlji24.scl","rnbo":[24,5.37657,0,76.049,0,81.42557,0,193.15686,0,198.53343,0,75,64,310.26471,0,5,4,391.69029,0,503.42157,0,508.79814,0,579.47057,0,584.84714,0,696.57843,0,3,2,25,16,778.004,0,889.73529,0,895.11186,0,971.16086,0,1006.84314,0,1082.89214,0,15,8,2,1]},"schulter_qcmqd8_4":{"title":"F-C# in 1/4-comma meantone, other 5ths ~4.888 cents wide or (2048/2025)^(1/4)","filename":"schulter_qcmqd8_4.scl","rnbo":[12,76.049,0,193.15686,0,289.73529,0,5,4,503.42157,0,579.47057,0,696.57843,0,782.89214,0,889.73529,0,996.57843,0,1082.89214,0,2,1]},"schulter_rbuzurg-buzurg8_cup":{"title":"Buzurg pentachord plus 133-229-133 tetrachord at ~3/2","filename":"schulter_rbuzurg-buzurg8_cup.scl","rnbo":[8,133.35066,0,361.88496,0,495.23562,0,628.58628,0,704.76438,0,838.11504,0,1066.64934,0,2,1]},"schulter_rbuzurg-buzurg_hijaz_cup":{"title":"Qutb al-Din al-Shirazi's Buzurg plus upper Hijaz (JI 12:11-7:6-22:21)","filename":"schulter_rbuzurg-buzurg_hijaz_cup.scl","rnbo":[8,133.35066,0,361.88496,0,495.23562,0,628.58628,0,704.76438,0,857.12058,0,1123.8219,0,2,1]},"schulter_semineutral36":{"title":"Semineutral tuning in 36-tET, 0-433.33-866.67 cents","filename":"schulter_semineutral36.scl","rnbo":[17,66.66667,0,133.33333,0,200.0,0,266.66667,0,366.66666,0,433.33333,0,500.0,0,566.66667,0,633.33333,0,700.0,0,766.66667,0,866.66667,0,933.33333,0,1000.0,0,1066.66667,0,1133.33333,0,2,1]},"schulter_shur10":{"title":"Tuning set for \"Prelude in Shur for Erv Wilson\"","filename":"schulter_shur10.scl","rnbo":[10,138.28126,0,264.84376,0,472.26562,0,495.70313,0,633.98438,0,703.125,0,760.54688,0,841.40625,0,967.96876,0,2,1]},"schulter_shur17":{"title":"Peppermint 17-note thirdtone set for Persian dastgah-ha","filename":"schulter_shur17.scl","rnbo":[17,69.98955,0,128.66924,0,208.19121,0,287.71318,0,357.70273,0,416.38243,0,495.90439,0,565.89395,0,624.57364,0,704.09561,0,774.08516,0,832.76485,0,912.28682,0,991.80879,0,1061.79834,0,1120.47803,0,2,1]},"schulter_simplemint24":{"title":"Rank 3 temperament (2-3-7-9-11-13), 704c 5th, 58c spacing, 1200-tET","filename":"schulter_simplemint24.scl","rnbo":[24,58.0,0,128.0,0,186.0,0,208.0,0,266.0,0,288.0,0,346.0,0,416.0,0,474.0,0,496.0,0,554.0,0,624.0,0,682.0,0,704.0,0,762.0,0,832.0,0,890.0,0,912.0,0,970.0,0,992.0,0,1050.0,0,1120.0,0,1178.0,0,2,1]},"schulter_sq":{"title":"\"Sesquisexta\" tuning, two 12-tone Pyth. manuals a 7/6 apart. TL 16-5-2001","filename":"schulter_sq.scl","rnbo":[24,28,27,2187,2048,567,512,9,8,7,6,32,27,5103,4096,81,64,21,16,4,3,112,81,729,512,189,128,3,2,14,9,6561,4096,1701,1024,27,16,7,4,16,9,15309,8192,243,128,63,32,2,1]},"schulter_sunvar24-19_16":{"title":"Variation on Scott Dakota's Sun 19 (24): optimized for 16:19:24 (2/1, 701.350, 64.171)","filename":"schulter_sunvar24-19_16.scl","rnbo":[24,64.17091,0,93.25,0,157.42091,0,202.7,0,266.87091,0,295.95,0,360.12091,0,405.4,0,469.57091,0,498.65,0,562.82091,0,608.1,0,672.27091,0,701.35,0,765.52091,0,794.6,0,858.77091,0,904.05,0,968.22091,0,997.3,0,1061.47091,0,1106.75,0,1170.92091,0,2,1]},"schulter_sunvar24_dup":{"title":"Sunvar24, 1/1=D on upper chain of fifths","filename":"schulter_sunvar24_dup.scl","rnbo":[24,29.07909,0,93.25,0,138.52909,0,202.7,0,231.77909,0,295.95,0,341.22909,0,405.4,0,434.47909,0,498.65,0,543.92909,0,608.1,0,637.17909,0,701.35,0,730.42909,0,794.6,0,839.87909,0,904.05,0,933.12909,0,997.3,0,1042.57909,0,1106.75,0,1135.82909,0,2,1]},"schulter_tedorian":{"title":"Eb Dorian in temperament extraordinaire, neo-medieval style","filename":"schulter_tedorian.scl","rnbo":[7,213.68628,0,289.73528,0,493.15685,0,706.84314,0,910.26471,0,986.31371,0,2,1]},"schulter_turquoise17-104ed2":{"title":"Turquoise 17 in 104-tET, ~33:36:39:42:44 at steps 0 7 10","filename":"schulter_turquoise17-104ed2.scl","rnbo":[17,69.23077,0,150.0,0,207.69231,0,288.46154,0,357.69231,0,415.38462,0,496.15385,0,565.38462,0,646.15385,0,703.84616,0,784.61539,0,853.84616,0,911.53846,0,992.30769,0,1061.53846,0,1119.23077,0,2,1]},"schulter_turquoise17":{"title":"Turquoise 17 in 1024-tET, ~33:36:39:42:44 at steps 0 7 10","filename":"schulter_turquoise17.scl","rnbo":[17,70.31249,0,151.17187,0,208.59375,0,289.45313,0,358.59375,0,416.01563,0,496.875,0,566.01562,0,646.875,0,704.29688,0,785.15625,0,854.29687,0,911.71875,0,992.57812,0,1061.71875,0,1119.14063,0,2,1]},"schulter_wilsonistic":{"title":"Margo Schulter, Wilsonistic Pivot on C","filename":"schulter_wilsonistic.scl","rnbo":[12,91,88,44,39,7,6,14,11,4,3,11,8,3,2,273,176,22,13,7,4,21,11,2,1]},"schulter_xenoga24":{"title":"M. Schulter, 3+7 ratios Xeno-Gothic adaptive tuning (keyboards 64:63 apart)","filename":"schulter_xenoga24.scl","rnbo":[24,64,63,2187,2048,243,224,9,8,8,7,32,27,2048,1701,81,64,9,7,4,3,256,189,729,512,81,56,3,2,32,21,6561,4096,729,448,27,16,12,7,16,9,1024,567,243,128,27,14,2,1]},"schulter_xenogj24":{"title":"Neo-Gothic 3/17-flavor JI (keyboards 459:448 apart)","filename":"schulter_xenogj24.scl","rnbo":[24,459,448,2187,2048,1003833,917504,9,8,4131,3584,32,27,17,14,81,64,37179,28672,4,3,153,112,729,512,334611,229376,3,2,1377,896,6561,4096,3011499,1835008,27,16,12393,7168,16,9,51,28,243,128,111537,57344,2,1]},"schulter_zarte84":{"title":"Temperament extraordinaire, Zarlino's 2/7-comma meantone (F-C#)","filename":"schulter_zarte84.scl","rnbo":[12,25,24,191.62069,0,287.43104,0,383.24139,0,504.18965,0,574.86208,0,695.81035,0,779.05173,0,887.43104,0,995.81035,0,1079.05173,0,2,1]},"schulter_zarte84n":{"title":"Zarlino temperament extraordinaire, 1024-tET mapping","filename":"schulter_zarte84n.scl","rnbo":[12,70.3125,0,191.01562,0,287.10938,0,383.20313,0,503.90625,0,574.21875,0,696.09375,0,778.125,0,887.10938,0,996.09375,0,1079.29688,0,2,1]},"scotbag":{"title":"Scottish bagpipe tuning","filename":"scotbag.scl","rnbo":[7,10,9,5,4,15,11,40,27,5,3,11,6,2,1]},"scotbag2":{"title":"Scottish bagpipe tuning 2, symmmetrical","filename":"scotbag2.scl","rnbo":[7,10,9,11,9,4,3,3,2,18,11,9,5,2,1]},"scotbag3":{"title":"Scottish bagpipe tuning 3","filename":"scotbag3.scl","rnbo":[7,9,8,5,4,11,8,3,2,27,16,11,6,2,1]},"scotbag4":{"title":"Scottish Higland Bagpipe by Macdonald, Edinburgh. Helmholtz/Ellis p. 515, nr.52","filename":"scotbag4.scl","rnbo":[7,197.0,0,341.0,0,495.0,0,703.0,0,853.0,0,1009.0,0,2,1]},"scottd1":{"title":"Dale Scott's temperament 1, TL 9-6-1999","filename":"scottd1.scl","rnbo":[12,135,128,194.135,0,1215,1024,388.26999,0,10935,8192,45,32,698.045,0,405,256,890.225,0,998.045,0,15,8,2,1]},"scottd2":{"title":"Dale Scott's temperament 2, TL 9-6-1999","filename":"scottd2.scl","rnbo":[12,93.744,0,195.699,0,297.654,0,391.398,0,500.391,0,591.789,0,698.436,0,795.699,0,892.962,0,999.609,0,1091.007,0,2,1]},"scottd3":{"title":"Dale Scott's temperament 3, TL 9-6-1999","filename":"scottd3.scl","rnbo":[12,95.1125,0,197.0675,0,299.0225,0,394.135,0,499.9995,0,593.1575,0,699.0225,0,797.0675,0,895.1125,0,1000.9775,0,1093.1575,0,2,1]},"scottd4":{"title":"Dale Scott's temperament 4, TL 9-6-1999","filename":"scottd4.scl","rnbo":[12,96.38467,0,197.87743,0,299.19782,0,395.5734,0,500.72614,0,595.58477,0,699.27386,0,797.79827,0,896.48143,0,1000.02285,0,1095.26744,0,2,1]},"scottj":{"title":"Jeff Scott's \"seven and five\" tuning, fifth-repeating. TL 20-04-99","filename":"scottj.scl","rnbo":[4,9,8,9,7,4,3,3,2]},"scottj2":{"title":"Jeff Scott's \"just tritone/13\" tuning. TL 17-03-2001","filename":"scottj2.scl","rnbo":[19,10,9,8,7,7,6,6,5,4,3,7,5,14,9,8,5,18,11,5,3,13,7,2,1,13,6,20,9,16,7,7,3,13,5,11,4,3,1]},"scottr_ebvt":{"title":"Robert Scott Equal Beating Victorian Temperament (2001)","filename":"scottr_ebvt.scl","rnbo":[12,95.625,0,196.54999,0,296.715,0,393.83999,0,497.805,0,593.42999,0,699.195,0,797.22,0,894.74499,0,996.31,0,1095.23499,0,2,1]},"scottr_lab":{"title":"Robert Scott Tunelab EBVT (2002)","filename":"scottr_lab.scl","rnbo":[12,94.455,0,195.82,0,295.725,0,392.67,0,498.085,0,592.51,0,700.065,0,796.55,0,893.745,0,995.92,0,1094.765,0,2,1]},"secor12_1":{"title":"George Secor's 12-tone temperament ordinaire #1, proportional beating","filename":"secor12_1.scl","rnbo":[12,86.5333,0,194.5568,0,294.12876,0,389.11361,0,499.91792,0,585.54105,0,697.2784,0,789.37483,0,891.83521,0,997.96292,0,1086.39201,0,2,1]},"secor12_2":{"title":"George Secor's closed 12-tone well-temperament #2, with 7 just fifths","filename":"secor12_2.scl","rnbo":[12,256,243,194.86828,0,32,27,388.02514,0,4,3,1024,729,698.28985,0,128,81,891.44671,0,16,9,4096,2187,2,1]},"secor12_3":{"title":"George Secor's closed 12-tone temperament #3 with 5 meantone, 3 just, and 2 wide fifths","filename":"secor12_3.scl","rnbo":[12,83.137,0,193.15686,0,292.42357,0,5,4,501.71015,0,581.182,0,696.57843,0,785.092,0,889.73529,0,999.75514,0,1082.89214,0,2,1]},"secor17htt1":{"title":"George Secor's 17-tone high-tolerance temperament subset #1 on C (5/4 & 7/4 exact)","filename":"secor17htt1.scl","rnbo":[17,30.08878,0,140.19633,0,207.15739,0,265.24719,0,347.35372,0,5,4,496.42131,0,554.51111,0,612.60091,0,703.57869,0,733.66747,0,843.77502,0,882.73506,0,7,4,1050.93241,0,1089.89245,0,2,1]},"secor17htt2":{"title":"George Secor's 17-tone high-tolerance temperament subset #2 on Eo (5/4 & 7/4 exact)","filename":"secor17htt2.scl","rnbo":[17,30.08878,0,116.1796,0,207.15739,0,237.24617,0,347.35372,0,5,4,496.42131,0,554.51111,0,612.60091,0,703.57869,0,733.66747,0,843.77502,0,910.73608,0,7,4,1050.93241,0,1089.89245,0,2,1]},"secor17htt3":{"title":"George Secor's 17-tone high-tolerance temperament subset #3 on G (5/4 & 7/4 exact)","filename":"secor17htt3.scl","rnbo":[17,58.0898,0,116.1796,0,207.15739,0,237.24617,0,347.35372,0,5,4,472.40458,0,554.51111,0,593.47114,0,703.57869,0,733.66747,0,843.77502,0,910.73608,0,7,4,1050.93241,0,1089.89245,0,2,1]},"secor17htt4":{"title":"George Secor's 17-tone high-tolerance temperament subset #4 on Bo (5/4 & 7/4 exact)","filename":"secor17htt4.scl","rnbo":[17,58.0898,0,116.1796,0,207.15739,0,237.24617,0,347.35372,0,414.31478,0,472.40458,0,554.51111,0,593.47114,0,703.57869,0,733.66747,0,819.7583,0,910.73608,0,940.82486,0,1050.93241,0,1089.89245,0,2,1]},"secor17wt":{"title":"George Secor's well temperament with 5 pure 11/7 and 3 near just 11/6","filename":"secor17wt.scl","rnbo":[17,66.7412,0,144.85624,0,214.4409,0,278.33864,0,353.61023,0,428.88181,0,492.77955,0,562.36421,0,640.47925,0,707.22045,0,771.11819,0,849.23324,0,921.66136,0,985.5591,0,1057.98722,0,1136.10226,0,2,1]},"secor17zrt":{"title":"George Secor's 17-tone Zany Rational Temperament (2012)","filename":"secor17zrt.scl","rnbo":[17,555,536,289,268,75,67,157,134,163,134,2015,1608,802,603,369,268,5075,3618,401,268,835,536,869,536,1010,603,1064,603,981,536,15,8,2,1]},"secor19wt":{"title":"George Secor's 19-tone well temperament with ten 5/17-comma fifths","filename":"secor19wt.scl","rnbo":[19,69.40735,0,131.54493,0,191.25924,0,260.66659,0,317.95765,0,382.51849,0,451.92584,0,504.37038,0,573.77773,0,638.33856,0,695.62962,0,765.03697,0,824.57129,0,886.88886,0,956.29622,0,1011.16402,0,1078.14811,0,1145.1322,0,2,1]},"secor19wt1":{"title":"George Secor's 19-tone proportional-beating (5/17-comma) well temperament (v.1)","filename":"secor19wt1.scl","rnbo":[19,69.41306,0,131.21719,0,191.26088,0,260.67394,0,318.03803,0,382.52175,0,451.93481,0,504.36956,0,573.78263,0,638.12678,0,695.63044,0,765.0435,0,824.94573,0,886.89131,0,956.30438,0,1011.12652,0,1078.15219,0,1145.03265,0,2,1]},"secor19wt2":{"title":"George Secor's 19-tone proportional-beating (5/17-comma) well temperament (v.2)","filename":"secor19wt2.scl","rnbo":[19,69.41306,0,131.21719,0,191.26088,0,260.67394,0,317.43304,0,382.52175,0,451.93481,0,504.36956,0,573.78263,0,638.12678,0,695.63044,0,765.0435,0,824.40909,0,886.89131,0,956.30438,0,1010.632,0,1078.15219,0,1145.03265,0,2,1]},"secor1_4tx":{"title":"George Secor's rational 1/4-comma temperament extraordinaire","filename":"secor1_4tx.scl","rnbo":[12,4873,4644,481,430,61837,52245,484,387,7747,5805,8132,5805,193,129,1219,774,1942,1161,30988,17415,3621,1935,2,1]},"secor1_5tx":{"title":"George Secor's 1/5-comma temperament extraordinaire (ratios supplied by G. W. Smith)","filename":"secor1_5tx.scl","rnbo":[12,5075,4824,75,67,28591,24120,2015,1608,805,603,5075,3618,401,268,5075,3216,1010,603,3220,1809,15,8,2,1]},"secor22_17p5":{"title":"George Secor's 17-tone temperament plus 5 extra 5-limit intervals","filename":"secor22_17p5.scl","rnbo":[22,66.7412,0,144.85624,0,173.961,0,214.4409,0,278.33864,0,353.61023,0,5,4,428.88181,0,492.77955,0,562.36421,0,600.755,0,640.47925,0,707.22045,0,771.11819,0,849.23324,0,879.76,0,921.66136,0,985.5591,0,1057.98722,0,1093.534,0,1136.10226,0,2,1]},"secor22_19p3":{"title":"George Secor's 19+3 well temperament with ten ~5/17-comma (equal-beating) fifths and 3 pure 9:11. TL 28-6-2002,26-10-2006. 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W. 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After Alexandre ^Salfun (Chalfoun)","filename":"shalfun.scl","rnbo":[24,1000,971,10000,9429,2500,2289,9,8,125,108,25,21,1250,1021,500,397,5000,3859,4,3,2000,1457,400,283,10000,6869,3,2,1250,809,2000,1257,10000,6103,27,16,10000,5757,5000,2797,10000,5437,5000,2643,10000,5141,2,1]},"shansx":{"title":"Untempered Tanaka/Hanson harmonic system including the 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Sheiman's harmonic scale, TL 2-2-2009","filename":"sheiman.scl","rnbo":[14,17,16,9,8,19,16,5,4,21,16,11,8,23,16,3,2,25,16,27,16,7,4,29,16,31,16,2,1]},"sheiman_7":{"title":"Michael Sheiman's 7-tone 11-limit symmetrical just scale, TL 79656","filename":"sheiman_7.scl","rnbo":[7,12,11,6,5,4,3,3,2,5,3,11,6,2,1]},"sheiman_9":{"title":"Michael Sheiman's 9-tone JI scale, TL 27-03-2009","filename":"sheiman_9.scl","rnbo":[9,17,16,9,8,19,16,5,4,4,3,7,5,28,19,14,9,21,13]},"sheiman_michael-phi":{"title":"Michael Sheiman's Phi Section scale, from Tuning List","filename":"sheiman_michael-phi.scl","rnbo":[9,149.464,0,235.774,0,273.024,0,366.91,0,466.181,0,560.566,0,597.316,0,683.627,0,833.09,0]},"sheiman_phi_r":{"title":"Rational version of Michael Sheiman's Phi scale","filename":"sheiman_phi_r.scl","rnbo":[8,18,17,9,8,19,16,19,15,4,3,10,7,20,13,21,13]},"sheiman_phiter6":{"title":"Michael Sheiman's Phiter 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Smith","filename":"shrutar-shrutis.scl","rnbo":[22,52.17391,0,104.34783,0,156.52174,0,208.69565,0,260.86957,0,313.04348,0,365.21739,0,417.3913,0,469.56522,0,521.73913,0,600.0,0,652.17391,0,704.34783,0,756.52174,0,808.69565,0,860.86957,0,913.04348,0,965.21739,0,1017.3913,0,1069.56522,0,1121.73913,0,2,1]},"shrutar":{"title":"Paul Erlich's Shrutar tuning (from 9th fret) tempered with Dave Keenan","filename":"shrutar.scl","rnbo":[22,33,32,101.955,0,12,11,9,8,262.02693,0,6,5,5,4,9,7,4,3,11,8,595.11186,0,643.83808,0,3,2,760.07192,0,808.79814,0,18,11,27,16,7,4,9,5,15,8,1141.88308,0,2,1]},"shrutar_temp":{"title":"Shrutar temperament, 11-limit, g=52.474, 1/2 oct.","filename":"shrutar_temp.scl","rnbo":[22,52.47367,0,104.94734,0,157.42101,0,209.89468,0,262.36834,0,314.84201,0,390.10532,0,442.57899,0,495.05266,0,547.52633,0,600.0,0,652.47367,0,704.94734,0,757.42101,0,809.89468,0,862.36834,0,914.84201,0,990.10532,0,1042.57899,0,1095.05266,0,1147.52633,0,1200.0,0]},"shrutart":{"title":"Paul Erlich's 'Shrutar' tuning tempered by Dave Keenan, TL 29-12-2000","filename":"shrutart.scl","rnbo":[22,53.5,0,106.8,0,155.1,0,203.9,0,266.9,0,315.6,0,386.3,0,439.8,0,498.0,0,546.8,0,600.0,0,653.2,0,702.0,0,760.2,0,813.7,0,884.4,0,933.1,0,996.1,0,1044.9,0,1093.2,0,1146.5,0,2,1]},"siamese":{"title":"Siamese Tuning, after Clem Fortuna's Microtonal Guide","filename":"siamese.scl","rnbo":[12,49.8,0,172.0,0,215.0,0,344.0,0,515.0,0,564.8,0,685.8,0,735.8,0,857.8,0,914.8,0,1028.8,0,2,1]},"silbermann1":{"title":"Gottfried Silbermann's temperament nr. 1","filename":"silbermann1.scl","rnbo":[12,87.29249,0,200.0,0,307.82,0,390.225,0,502.9325,0,590.225,0,700.0,0,784.35999,0,895.1125,0,1005.865,0,1090.225,0,2,1]},"silbermann2":{"title":"Gottfried Silbermann's temperament nr. 2, 1/6 Pyth. comma meantone","filename":"silbermann2.scl","rnbo":[12,86.31499,0,196.09,0,305.865,0,392.18,0,501.955,0,1024,729,698.045,0,784.35999,0,894.135,0,1003.91,0,1090.225,0,2,1]},"silbermann2a":{"title":"Modified Silbermann's temperament nr. 2, also used by Hinsz in Midwolda","filename":"silbermann2a.scl","rnbo":[12,86.31499,0,196.09,0,298.045,0,392.18,0,501.955,0,1024,729,698.045,0,784.35999,0,894.135,0,1003.91,0,1090.225,0,2,1]},"silver":{"title":"Equal beating chromatic scale, A.L.Leigh Silver JASA 29/4, 476-481, 1957","filename":"silver.scl","rnbo":[12,100.03402,0,199.51879,0,299.79965,0,399.51612,0,500.01742,0,599.94076,0,699.32161,0,799.50359,0,899.12725,0,999.54025,0,1099.38074,0,2,1]},"silver_11":{"title":"Eleven-tone MOS from 1+sqr(2), 1525.864 cents","filename":"silver_11.scl","rnbo":[11,103.45586,0,206.91171,0,325.86396,0,429.31982,0,532.77567,0,651.72793,0,755.18378,0,858.63964,0,977.59189,0,1081.04775,0,2,1]},"silver_11a":{"title":"Eleven-tone MOS from 317.17 cents","filename":"silver_11a.scl","rnbo":[11,68.68,0,137.36,0,317.17,0,385.85,0,454.53,0,634.34,0,703.02,0,771.7,0,951.51,0,1020.19,0,2,1]},"silver_11b":{"title":"Eleven-tone MOS from 331.67 cents","filename":"silver_11b.scl","rnbo":[11,126.69,0,253.37,0,331.67,0,458.36,0,585.05,0,663.34,0,790.03,0,916.72,0,995.02,0,1121.7,0,2,1]},"silver_15":{"title":"Sqrt(2) + 1 equal division by 15, Brouncker (1653)","filename":"silver_15.scl","rnbo":[15,101.72426,0,203.44853,0,305.17279,0,406.89706,0,508.62132,0,610.34559,0,712.06985,0,813.79411,0,915.51838,0,1017.24264,0,1118.96691,0,1220.69117,0,1322.41544,0,1424.1397,0,1525.86396,0]},"silver_7":{"title":"Seven-tone MOS from 1+sqr(2), 1525.864 cents, Aksaka, Pell","filename":"silver_7.scl","rnbo":[7,103.45586,0,325.86396,0,429.31982,0,651.72793,0,755.18378,0,977.59189,0,2,1]},"silver_8":{"title":"Eight-tone MOS from 273.85 cents","filename":"silver_8.scl","rnbo":[8,169.25,0,273.85,0,443.1,0,547.7,0,716.95,0,821.55,0,1095.4,0,2,1]},"silver_9":{"title":"Nine-tone MOS from 280.61 cents","filename":"silver_9.scl","rnbo":[9,203.05,0,280.61,0,483.66,0,561.22,0,764.27,0,841.83,0,1044.88,0,1122.44,0,2,1]},"silvermean":{"title":"First 6 approximants to the Silver Mean, 1+sqr(2) reduced by 2/1","filename":"silvermean.scl","rnbo":[7,35,32,5,4,169,128,3,2,51,32,29,16,2,1]},"simonton":{"title":"Simonton Integral Ratio Scale, JASA 25/6 (1953): A new integral ratio scale","filename":"simonton.scl","rnbo":[12,17,16,9,8,19,16,5,4,4,3,17,12,3,2,19,12,5,3,16,9,17,9,2,1]},"simp12-amity":{"title":"simp12 tempered in amity, 99-tET tuning","filename":"simp12-amity.scl","rnbo":[12,206.06061,0,315.15152,0,387.87879,0,496.9697,0,581.81818,0,703.0303,0,812.12121,0,836.36364,0,884.84848,0,969.69697,0,1018.18182,0,2,1]},"simp12":{"title":"Stiltner-Vaisvil 12 note 2.3.5.7.13 scale","filename":"simp12.scl","rnbo":[12,9,8,6,5,5,4,4,3,7,5,3,2,8,5,13,8,5,3,7,4,9,5,2,1]},"sims":{"title":"Ezra Sims' 18-tone mode","filename":"sims.scl","rnbo":[18,25,24,13,12,9,8,7,6,29,24,5,4,21,16,11,8,23,16,3,2,25,16,13,8,27,16,7,4,29,16,15,8,31,16,2,1]},"sims2":{"title":"Sims II, harmonics 20 to 40","filename":"sims2.scl","rnbo":[20,33,32,17,16,35,32,9,8,37,32,19,16,39,32,5,4,21,16,11,8,23,16,3,2,25,16,13,8,27,16,7,4,29,16,15,8,31,16,2,1]},"sims_24":{"title":"Ezra Sims, Reflections on This and That, 1991, p.93-106","filename":"sims_24.scl","rnbo":[24,33,32,25,24,17,16,13,12,35,32,9,8,37,32,7,6,19,16,29,24,39,32,5,4,21,16,11,8,23,16,3,2,25,16,13,8,27,16,7,4,29,16,15,8,31,16,2,1]},"sims_herf":{"title":"Reflections on This and That, 1991. Used by Richter-Herf in Ekmelischer Gesang","filename":"sims_herf.scl","rnbo":[14,33,32,17,16,9,8,19,16,5,4,21,16,11,8,23,16,3,2,13,8,27,16,7,4,15,8,2,1]},"sin":{"title":"1/sin(2pi/n), n=4..25","filename":"sin.scl","rnbo":[21,86.87642,0,249.02244,0,426.08449,0,600.0,0,765.10317,0,919.96672,0,1064.70922,0,2,1,1326.66808,0,1445.54349,0,1557.39975,0,1662.93203,0,1762.75655,0,1857.41616,0,1947.3877,0,2033.0903,0,2114.893,0,2193.122,0,2268.066,0,2339.981,0,2409.0963,0]},"sinemod12":{"title":"Sine modulated F=12, A=-.08203754","filename":"sinemod12.scl","rnbo":[19,58.413,0,130.128,0,191.156,0,247.468,0,318.256,0,382.13,0,437.083,0,506.116,0,572.759,0,627.241,0,693.884,0,762.918,0,817.87,0,881.744,0,952.532,0,1008.844,0,1069.872,0,1141.587,0,2,1]},"sinemod8":{"title":"Sine modulated F=8, A=.11364155. Deviation minimal3/2, 4/3, 5/4, 6/5, 5/3, 8/5","filename":"sinemod8.scl","rnbo":[19,70.116,0,129.732,0,184.193,0,246.623,0,318.12,0,386.1,0,443.287,0,498.69,0,564.013,0,635.987,0,701.31,0,756.713,0,813.9,0,881.88,0,953.377,0,1015.807,0,1070.268,0,1129.884,0,2,1]},"singapore":{"title":"An observed xylophone tuning from Singapore","filename":"singapore.scl","rnbo":[7,187.0,0,356.0,0,526.0,0,672.0,0,856.0,0,985.0,0,2,1]},"singapore_coh":{"title":"Differentially coherent interpretation of xylophone tuning from Singapore","filename":"singapore_coh.scl","rnbo":[7,10,9,11,9,4,3,53,36,59,36,16,9,2,1]},"sintemp6":{"title":"Sine modulated fifths, A=1/6 Pyth, one cycle, f0=-90 degrees","filename":"sintemp6.scl","rnbo":[12,100.0,0,192.70384,0,305.34116,0,390.74884,0,503.38616,0,596.09,0,696.09,0,803.38616,0,890.74884,0,1005.34116,0,1092.70384,0,2,1]},"sintemp6a":{"title":"Sine modulated fifths, A=1/12 Pyth, one cycle, f0= D-A","filename":"sintemp6a.scl","rnbo":[12,93.68134,0,197.32942,0,297.32942,0,393.68134,0,500.0,0,592.70384,0,699.0225,0,795.37442,0,895.37442,0,999.0225,0,1092.70384,0,2,1]},"sintemp_19":{"title":"Sine modulated thirds, A=7.366 cents, one cycle over fifths, f0=90 degrees","filename":"sintemp_19.scl","rnbo":[19,72.81716,0,125.58714,0,193.15686,0,260.72658,0,313.49655,0,5,4,446.77544,0,503.9262,0,577.91731,0,632.40807,0,696.47293,0,767.06941,0,819.2443,0,889.84078,0,953.90565,0,1008.39641,0,1082.38751,0,1139.53827,0,2,1]},"sintemp_7":{"title":"Sine modulated fifths, A=8.12 cents, one cycle, f0=90 degrees","filename":"sintemp_7.scl","rnbo":[7,184.61189,0,346.91732,0,509.22275,0,693.83464,0,868.51923,0,1025.31542,0,2,1]},"skateboard11":{"title":"Skateboard[11] 2.5/3.7/3.11.13/9 subgroup MOS in 17\\65 tuning","filename":"skateboard11.scl","rnbo":[11,55.38462,0,110.76923,0,313.84615,0,369.23077,0,424.61538,0,627.69231,0,683.07692,0,738.46154,0,941.53846,0,996.92308,0,2,1]},"slen_pel":{"title":"Pelog white, Slendro black","filename":"slen_pel.scl","rnbo":[12,1,1,137.0,0,228.0,0,446.0,0,575.0,0,484.0,0,687.0,0,728.0,0,820.0,0,960.0,0,1098.0,0,2,1]},"slen_pel16":{"title":"16-tET Slendro and Pelog","filename":"slen_pel16.scl","rnbo":[12,1,1,150.0,0,150.0,0,225.0,0,300.0,0,450.0,0,675.0,0,675.0,0,750.0,0,825.0,0,900.0,0,2,1]},"slen_pel23":{"title":"23-tET Slendro and Pelog","filename":"slen_pel23.scl","rnbo":[12,1,1,208.69565,0,208.69565,0,156.52174,0,469.56522,0,313.04348,0,730.43478,0,730.43478,0,678.26087,0,939.13043,0,834.78261,0,2,1]},"slen_pel_jc":{"title":"Slendro (John Chalmers) plus Pelog S1c,P1c#,S2d,eb,P2e,S3f,P3f#,S4g,ab,P4a,S5bb,P5b","filename":"slen_pel_jc.scl","rnbo":[12,1,1,8,7,8,7,16,15,64,49,4,3,3,2,3,2,3,2,12,7,8,5,2,1]},"slen_pel_schmidt":{"title":"Dan Schmidt (Pelog white, Slendro black)","filename":"slen_pel_schmidt.scl","rnbo":[12,1,1,9,8,7,6,5,4,4,3,11,8,3,2,3,2,7,4,7,4,15,8,2,1]},"slendro":{"title":"Observed Javanese Slendro scale, Helmholtz/Ellis p. 518, nr.94","filename":"slendro.scl","rnbo":[5,228.0,0,484.0,0,728.0,0,960.0,0,2,1]},"slendro10":{"title":"Low gender from Singaraja (banjar Lod Peken), Bali, 1/1=172 Hz, McPhee, 1966","filename":"slendro10.scl","rnbo":[5,261.10972,0,465.01972,0,698.59664,0,991.68081,0,2,1]},"slendro11":{"title":"Low gender from Sawan, Bali, 1/1=167.5 Hz, McPhee, 1966","filename":"slendro11.scl","rnbo":[5,231.81996,0,472.01091,0,679.41483,0,950.27017,0,2,1]},"slendro12":{"title":"Saih angklung, 4-tone slendro from Mas village, 1/1=410 Hz, McPhee, 1966","filename":"slendro12.scl","rnbo":[4,232.75682,0,408.13275,0,715.97317,0,2,1]},"slendro13":{"title":"Saih angklung, 4-tone slendro from Kamassan village, 1/1=400 Hz, McPhee, 1966","filename":"slendro13.scl","rnbo":[4,9,8,368.91423,0,730.57109,0,2,1]},"slendro14":{"title":"Saih angklung, 4-tone slendro from Sayan village, 1/1=365 Hz, McPhee, 1966","filename":"slendro14.scl","rnbo":[4,242.99144,0,492.10594,0,753.35844,0,2,1]},"slendro15":{"title":"Saih angklung, 4-tone slendro from Tabanan, 1/1=326 Hz, McPhee, 1966","filename":"slendro15.scl","rnbo":[4,242.42236,0,471.2866,0,687.73534,0,2,1]},"slendro2":{"title":"Gamelan slendro from Ranchaiyuh, distr. Tanggerang, Batavia. 1/1=282.5 Hz","filename":"slendro2.scl","rnbo":[5,231.94,0,471.802,0,717.208,0,939.247,0,2,1]},"slendro3":{"title":"Gamelan kodok ngorek. 1/1=270 Hz","filename":"slendro3.scl","rnbo":[5,227.96513,0,449.27462,0,697.67506,0,952.25895,0,1196.79104,0]},"slendro4":{"title":"Low gender in saih lima from Kuta, Bali. 1/1=183 Hz. McPhee, 1966","filename":"slendro4.scl","rnbo":[5,204.96083,0,476.6274,0,736.29981,0,1004.93638,0,2,1]},"slendro5_1":{"title":"A slendro type pentatonic which is based on intervals of 7; from Lou Harrison","filename":"slendro5_1.scl","rnbo":[5,8,7,9,7,3,2,12,7,2,1]},"slendro5_2":{"title":"A slendro type pentatonic which is based on intervals of 7, no. 2","filename":"slendro5_2.scl","rnbo":[5,7,6,4,3,3,2,7,4,2,1]},"slendro5_4":{"title":"A slendro type pentatonic which is based on intervals of 7, no. 4","filename":"slendro5_4.scl","rnbo":[5,9,8,4,3,3,2,12,7,2,1]},"slendro6":{"title":"Low gender from Klandis, Bali. 1/1=180 Hz. McPhee, 1966","filename":"slendro6.scl","rnbo":[5,208.17939,0,461.59662,0,727.41478,0,982.51162,0,2,1]},"slendro8":{"title":"Low gender from Tabanan, Bali, 1/1=179 Hz, McPhee, 1966","filename":"slendro8.scl","rnbo":[5,292.92561,0,507.68978,0,762.15035,0,1005.73478,0,2,1]},"slendro9":{"title":"Low gender from Singaraja (banjar Panataran), Bali. 1/1=175 Hz. McPhee, 1966. Ayers ICMC 1996","filename":"slendro9.scl","rnbo":[5,8,7,9,7,52,35,12,7,2,1]},"slendro_7_1":{"title":"Septimal Slendro 1, from HMSL Manual, also Lou Harrison, Jacques Dudon","filename":"slendro_7_1.scl","rnbo":[5,8,7,64,49,3,2,12,7,2,1]},"slendro_7_2":{"title":"Septimal Slendro 2, from Lou Harrison, Jacques Dudon's APTOS","filename":"slendro_7_2.scl","rnbo":[5,9,8,21,16,3,2,12,7,2,1]},"slendro_7_3":{"title":"Septimal Slendro 3, Harrison, Dudon, called \"MILLS\" after Mills Gamelan","filename":"slendro_7_3.scl","rnbo":[5,9,8,9,7,3,2,12,7,2,1]},"slendro_7_4":{"title":"Septimal Slendro 4, from Lou Harrison, Jacques Dudon, called \"NAT\"","filename":"slendro_7_4.scl","rnbo":[5,9,8,21,16,3,2,7,4,2,1]},"slendro_7_5":{"title":"Septimal Slendro 5, from Jacques Dudon","filename":"slendro_7_5.scl","rnbo":[5,7,6,21,16,49,32,343,192,2,1]},"slendro_7_6":{"title":"Septimal Slendro 6, from Robert Walker","filename":"slendro_7_6.scl","rnbo":[5,8,7,64,49,512,343,256,147,2,1]},"slendro_a1":{"title":"Dudon's Slendro A1, \"Seven-Limit Slendro Mutations\", 1/1 8:2 Jan 1994, hexany 1.3.7.21","filename":"slendro_a1.scl","rnbo":[5,8,7,4,3,3,2,7,4,2,1]},"slendro_ang":{"title":"Gamelan Angklung Sangsit, North Bali. 1/1=294 Hz","filename":"slendro_ang.scl","rnbo":[5,8,7,457.834,0,684.199,0,922.793,0,2,1]},"slendro_ang2":{"title":"Angklung from Banyuwangi. 1/1=298 Hz. J. Kunst, Music in Java, p.198","filename":"slendro_ang2.scl","rnbo":[5,278.45111,0,569.18212,0,740.2582,0,1041.95318,0,2,1]},"slendro_av":{"title":"Average of 30 measured slendro gamelans, W. Surjodiningrat et al., 1993.","filename":"slendro_av.scl","rnbo":[5,231.0,0,474.0,0,717.0,0,955.0,0,1208.0,0]},"slendro_av2":{"title":"Average of 28 measured slendro gamelans, Wim van Zanten, The equidistant heptatonic scale of the asena in Malawi, 1980","filename":"slendro_av2.scl","rnbo":[5,233.0,0,472.0,0,718.0,0,961.0,0,1213.0,0]},"slendro_dudon":{"title":"Dudon's Slendro from \"Fleurs de lumière\" (1995)","filename":"slendro_dudon.scl","rnbo":[5,7,6,4,3,55,36,7,4,2,1]},"slendro_gam1":{"title":"Slendro gambang Kyahi Madumurti, Wim van Zanten, The equidistant heptatonic scale of the asena in Malawi, 1980","filename":"slendro_gam1.scl","rnbo":[5,245.0,0,489.0,0,733.0,0,977.0,0,1219.0,0]},"slendro_gam2":{"title":"Slendro gambang Kyahi Kanjutmesem, Wim van Zanten, The equidistant heptatonic scale of the asena in Malawi, 1980","filename":"slendro_gam2.scl","rnbo":[5,247.0,0,490.0,0,735.0,0,981.0,0,1228.0,0]},"slendro_gum":{"title":"Gumbeng, bamboo idiochord from Banyumas. 1/1=440 Hz","filename":"slendro_gum.scl","rnbo":[5,265.746,0,496.077,0,712.416,0,9,5,1207.851,0]},"slendro_ky1":{"title":"Kyahi Kanyut Me`sem slendro, Mangku Nagaran, Solo. 1/1=291 Hz","filename":"slendro_ky1.scl","rnbo":[5,222.974,0,475.59,0,711.842,0,937.091,0,2,1]},"slendro_ky2":{"title":"Kyahi Pengawe' sari, Paku Alaman, Jogya. 1/1=295 Hz","filename":"slendro_ky2.scl","rnbo":[5,250.868,0,483.311,0,715.595,0,951.13,0,1200.0,0]},"slendro_laras":{"title":"Lou Harrison, gamelan \"Si Betty\"","filename":"slendro_laras.scl","rnbo":[7,8,7,4,3,3,2,12,7,2,1,16,7,8,3]},"slendro_m":{"title":"Dudon's Slendro M from \"Seven-Limit Slendro Mutations\", 1/1 8:2 Jan 1994. Also scale by Giovanni Marco Marci (17th cent.)","filename":"slendro_m.scl","rnbo":[5,8,7,4,3,3,2,12,7,2,1]},"slendro_madu":{"title":"Sultan's gamelan Madoe kentir, Jogjakarta, Jaap Kunst","filename":"slendro_madu.scl","rnbo":[5,240.0,0,482.0,0,711.0,0,931.0,0,1199.0,0]},"slendro_pa":{"title":"\"Blown fifth\" primitive slendro, von Hornbostel","filename":"slendro_pa.scl","rnbo":[5,261.0,0,522.0,0,783.0,0,1044.0,0,2,1]},"slendro_pas":{"title":"Gamelan slendro of regent of Pasoeroean, Jaap Kunst","filename":"slendro_pas.scl","rnbo":[5,239.0,0,469.0,0,705.0,0,941.0,0,1200.0,0]},"slendro_pb":{"title":"\"Blown fifth\" medium slendro, von Hornbostel","filename":"slendro_pb.scl","rnbo":[5,264.0,0,468.0,0,732.0,0,936.0,0,2,1]},"slendro_pc":{"title":"\"Blown fifth\" modern slendro, von Hornbostel","filename":"slendro_pc.scl","rnbo":[5,234.0,0,468.0,0,702.0,0,936.0,0,2,1]},"slendro_pliat":{"title":"Gender wayang from Pliatan, South Bali (Slendro), 1/1=305.5 Hz","filename":"slendro_pliat.scl","rnbo":[9,235.419,0,453.56,0,704.786,0,927.453,0,2,1,1435.419,0,1653.56,0,1904.786,0,2127.453,0]},"slendro_q13":{"title":"13-tET quasi slendro, Blackwood","filename":"slendro_q13.scl","rnbo":[5,276.92308,0,553.84615,0,738.46154,0,1015.38462,0,2,1]},"slendro_s1":{"title":"Dudon's Slendro S1 from \"Seven-Limit Slendro Mutations\", 1/1 8:2 Jan 1994","filename":"slendro_s1.scl","rnbo":[5,8,7,4,3,32,21,7,4,2,1]},"slendro_udan":{"title":"Slendro Udan Mas (approx)","filename":"slendro_udan.scl","rnbo":[5,7,6,47,35,20,13,16,9,2,1]},"slendro_wolf":{"title":"Daniel Wolf's slendro, TL 30-5-97","filename":"slendro_wolf.scl","rnbo":[5,226.46625,0,452.9325,0,713.23313,0,939.69938,0,2,1]},"slendrob1":{"title":"Gamelan miring of Musadikrama, desa Katur, Bajanegara. 1/1=434 Hz","filename":"slendrob1.scl","rnbo":[5,279.363,0,531.624,0,777.408,0,1039.179,0,2,1]},"slendrob2":{"title":"Gamelan miring from Bajanegara. 1/1=262 Hz","filename":"slendrob2.scl","rnbo":[5,280.036,0,486.443,0,728.186,0,936.43,0,2,1]},"slendrob3":{"title":"Gamelan miring from Ngumpak, Bajanegara. 1/1=266 Hz","filename":"slendrob3.scl","rnbo":[5,265.01,0,465.193,0,727.795,0,929.328,0,2,1]},"slendroc1":{"title":"Kyahi Kanyut mesem slendro (Mangku Nagaran Solo). 1/1=291 Hz","filename":"slendroc1.scl","rnbo":[5,223.0,0,476.0,0,712.0,0,937.0,0,2,1]},"slendroc2":{"title":"Kyahi Pengawe sari (Paku Alaman, Jogja). 1/1=295 Hz","filename":"slendroc2.scl","rnbo":[5,251.0,0,484.0,0,718.0,0,951.0,0,2,1]},"slendroc3":{"title":"Gamelan slendro of R.M. Jayadipura, Jogja. 1/1=231 Hz","filename":"slendroc3.scl","rnbo":[5,245.0,0,476.0,0,715.0,0,946.0,0,2,1]},"slendroc4":{"title":"Gamelan slendro, Rancha iyuh, Tanggerang, Batavia. 1/1=282.5 Hz","filename":"slendroc4.scl","rnbo":[5,232.0,0,473.0,0,718.0,0,940.0,0,2,1]},"slendroc5":{"title":"Gender wayang from Pliatan, South Bali. 1/1=611 Hz","filename":"slendroc5.scl","rnbo":[5,236.0,0,454.0,0,705.0,0,928.0,0,2,1]},"slendroc6":{"title":"from William Malm: Music Cultures of the Pacific, the Near East and Asia.","filename":"slendroc6.scl","rnbo":[10,218.0,0,473.0,0,721.0,0,954.0,0,1213.0,0,1458.0,0,1695.0,0,1929.0,0,2174.0,0,2441.0,0]},"slendrod1":{"title":"Gender wayang from Ubud (S. Bali). 1/1=347 Hz","filename":"slendrod1.scl","rnbo":[5,193.0,0,457.0,0,687.0,0,919.0,0,2,1]},"smith_eh":{"title":"Robert Smith's Equal Harmony temperament (1749)","filename":"smith_eh.scl","rnbo":[12,71.84801,0,191.95658,0,312.06514,0,383.91315,0,504.02171,0,575.86973,0,695.97829,0,767.8263,0,887.93486,0,1008.04342,0,1079.89144,0,2,1]},"smith_mq":{"title":"Robert Smith approximation of quarter comma meantone fifth","filename":"smith_mq.scl","rnbo":[12,76.04945,0,413449,369800,318028000,265847707,5,4,860,643,579.47096,0,643,430,25,16,265847707,159014000,739600,413449,1082.89247,0,2,1]},"smithgw46":{"title":"Gene Ward Smith 46-tET subset \"Star\"","filename":"smithgw46.scl","rnbo":[8,78.26087,0,313.04348,0,391.30435,0,573.91304,0,704.34783,0,886.95652,0,965.21739,0,2,1]},"smithgw46a":{"title":"46-tET version of \"Star\", alternative version","filename":"smithgw46a.scl","rnbo":[8,130.43478,0,313.04348,0,391.30435,0,626.08696,0,704.34783,0,886.95652,0,1017.3913,0,2,1]},"smithgw72a":{"title":"Gene Ward Smith trivalent 72-tET subset, TL 04-01-2002","filename":"smithgw72a.scl","rnbo":[11,150.0,0,233.33333,0,383.33333,0,466.66667,0,616.66667,0,700.0,0,850.0,0,883.33333,0,966.66667,0,1116.66667,0,2,1]},"smithgw72c":{"title":"Gene Ward Smith 72-tET subset, TL 04-01-2002","filename":"smithgw72c.scl","rnbo":[9,116.66667,0,266.66667,0,383.33333,0,500.0,0,700.0,0,816.66667,0,966.66667,0,1083.33333,0,2,1]},"smithgw72d":{"title":"Gene Ward Smith 72-tET subset, TL 04-01-2002","filename":"smithgw72d.scl","rnbo":[8,266.66667,0,383.33333,0,500.0,0,583.33333,0,700.0,0,816.66667,0,1083.33333,0,2,1]},"smithgw72e":{"title":"Gene Ward Smith 72-tET subset, TL 04-01-2002","filename":"smithgw72e.scl","rnbo":[8,116.66667,0,383.33333,0,500.0,0,583.33333,0,700.0,0,816.66667,0,1083.33333,0,2,1]},"smithgw72f":{"title":"Gene Ward Smith 72-tET subset, TL 04-01-2002","filename":"smithgw72f.scl","rnbo":[5,383.33333,0,500.0,0,883.33333,0,1000.0,0,2,1]},"smithgw72g":{"title":"Gene Ward Smith trrivalent 72-tET subset, TL 04-01-2002","filename":"smithgw72g.scl","rnbo":[5,383.33333,0,500.0,0,700.0,0,816.66667,0,2,1]},"smithgw72h":{"title":"Gene Ward Smith 72-tET subset, TL 09-01-2002","filename":"smithgw72h.scl","rnbo":[7,116.66667,0,316.66667,0,500.0,0,700.0,0,883.33333,0,1083.33333,0,2,1]},"smithgw72i":{"title":"Gene Ward Smith 72-tET subset version of Duodene, TL 02-06-2002","filename":"smithgw72i.scl","rnbo":[12,116.66667,0,200.0,0,316.66667,0,383.33333,0,500.0,0,583.33333,0,700.0,0,816.66667,0,883.33333,0,1016.66667,0,1083.33333,0,2,1]},"smithgw72j":{"title":"{225/224, 441/440} tempering of decad, 72-et version (2002)","filename":"smithgw72j.scl","rnbo":[10,83.33333,0,266.66667,0,383.33333,0,500.0,0,583.33333,0,700.0,0,883.33333,0,966.66667,0,1083.33333,0,2,1]},"smithgw_15highschool1":{"title":"First 15-note Highschool 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7-limit JI version of Blackjack, TL 10-5-2002","filename":"smithgw_21.scl","rnbo":[21,49,48,15,14,35,32,8,7,7,6,49,40,5,4,21,16,4,3,7,5,10,7,3,2,32,21,8,5,80,49,12,7,7,4,64,35,28,15,96,49,2,1]},"smithgw_22highschool":{"title":"22-note Highschool scale","filename":"smithgw_22highschool.scl","rnbo":[22,36,35,21,20,27,25,9,8,7,6,6,5,5,4,9,7,4,3,48,35,7,5,36,25,3,2,14,9,8,5,5,3,12,7,7,4,9,5,15,8,27,14,2,1]},"smithgw_45":{"title":"Gene Ward Smith large limma repeating 5-tone 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scale","filename":"smithgw_58.scl","rnbo":[58,81,80,45,44,33,32,21,20,16,15,27,25,12,11,11,10,10,9,9,8,8,7,121,105,7,6,32,27,6,5,40,33,11,9,99,80,5,4,14,11,9,7,315,242,21,16,4,3,27,20,15,11,11,8,7,5,99,70,10,7,16,11,22,15,40,27,3,2,32,21,484,315,14,9,11,7,8,5,81,50,18,11,33,20,5,3,27,16,12,7,121,70,7,4,16,9,9,5,20,11,11,6,50,27,15,8,40,21,64,33,88,45,160,81,2,1]},"smithgw_9":{"title":"Gene Ward Smith \"Miracle-Magic square\" tuning, genus chromaticum of ji_12a","filename":"smithgw_9.scl","rnbo":[9,16,15,7,6,5,4,4,3,3,2,8,5,12,7,15,8,2,1]},"smithgw_al-baked":{"title":"Baked alaska, with beat ratios of 2 and 3/2","filename":"smithgw_al-baked.scl","rnbo":[12,102.56522,0,201.13005,0,299.69489,0,402.26011,0,500.82494,0,599.38977,0,3,2,800.51983,0,899.08466,0,1001.64989,0,1100.21472,0,1198.77955,0]},"smithgw_al-fried":{"title":"Fried alaska, with octave-fifth brats of 1 and 2","filename":"smithgw_al-fried.scl","rnbo":[12,98.86779,0,197.73558,0,299.07437,0,397.94215,0,496.80994,0,598.14873,0,697.01652,0,795.88431,0,897.2231,0,996.09089,0,1094.95867,0,1196.29747,0]},"smithgw_asbru":{"title":"Modified bifrost (2003)","filename":"smithgw_asbru.scl","rnbo":[12,89.60192,0,200.0,0,310.39808,0,400.0,0,510.39808,0,589.60192,0,700.0,0,800.0,0,900.0,0,1010.39808,0,1089.60192,0,2,1]},"smithgw_ball":{"title":"Ball 2 around tetrad lattice hole","filename":"smithgw_ball.scl","rnbo":[38,49,48,25,24,21,20,15,14,35,32,9,8,147,128,7,6,75,64,6,5,49,40,5,4,245,192,9,7,21,16,75,56,175,128,7,5,45,32,10,7,35,24,3,2,49,32,25,16,63,40,45,28,105,64,5,3,12,7,7,4,25,14,9,5,175,96,147,80,15,8,245,128,63,32,2,1]},"smithgw_ball2":{"title":"7-limit crystal ball 2","filename":"smithgw_ball2.scl","rnbo":[55,50,49,49,48,36,35,25,24,21,20,16,15,15,14,35,32,10,9,28,25,9,8,8,7,7,6,25,21,6,5,60,49,49,40,5,4,32,25,9,7,64,49,21,16,4,3,49,36,48,35,25,18,7,5,10,7,36,25,35,24,72,49,3,2,32,21,49,32,14,9,25,16,8,5,80,49,49,30,5,3,42,25,12,7,7,4,16,9,25,14,9,5,64,35,28,15,15,8,40,21,48,25,35,18,96,49,49,25,2,1]},"smithgw_bifrost":{"title":"Six meantone fifths, four pure, two of sqrt(2048/2025 sqrt(5))","filename":"smithgw_bifrost.scl","rnbo":[12,86.80214,0,193.15686,0,299.51157,0,5,4,503.42157,0,584.84714,0,696.57843,0,793.15686,0,889.73528,0,1001.46657,0,1082.89214,0,2,1]},"smithgw_cauldron":{"title":"Circulating temperament with two pure 9/7 thirds","filename":"smithgw_cauldron.scl","rnbo":[12,86.50612,0,189.20489,0,308.09633,0,378.40979,0,505.39755,0,575.71101,0,694.60245,0,797.30123,0,883.80734,0,1010.79511,0,1073.01223,0,2,1]},"smithgw_choraled":{"title":"Scale used in \"choraled\" by Gene Ward Smith","filename":"smithgw_choraled.scl","rnbo":[26,70.870134,0,85.285706,0,95.735073,0,181.020779,0,205.885718,0,266.306484,0,301.620791,0,386.906496,0,411.771435,0,472.192202,0,497.057141,0,567.927275,0,592.792214,0,617.657153,0,653.212981,0,678.07792,0,702.942859,0,798.677932,0,883.963637,0,908.828577,0,969.249343,0,1089.849355,0,1114.714294,0,1150.270122,0,1175.135061,0,2,1]},"smithgw_circu":{"title":"Circulating temperament, brats of 1.5, 2.0, 4.0","filename":"smithgw_circu.scl","rnbo":[12,25250,23829,26684,23829,37875,31772,29840,23829,63769,47658,11190,7943,35636,23829,12625,7943,39940,23829,32737,18330,14920,7943,2,1]},"smithgw_ck":{"title":"Catakleismic temperament, g=316.745, 11-limit","filename":"smithgw_ck.scl","rnbo":[72,18.15906,0,36.31813,0,54.47719,0,66.98086,0,85.13992,0,103.29898,0,121.45805,0,133.96171,0,152.12078,0,170.27984,0,188.4389,0,200.94257,0,219.10163,0,237.2607,0,255.41976,0,267.92342,0,286.08249,0,304.24155,0,316.74521,0,334.90428,0,353.06334,0,371.22241,0,383.72607,0,401.88513,0,420.0442,0,438.20326,0,450.70693,0,468.86599,0,487.02505,0,505.18412,0,517.68778,0,535.84685,0,554.00591,0,572.16497,0,584.66864,0,602.8277,0,620.98677,0,633.49043,0,651.64949,0,669.80856,0,687.96762,0,700.47128,0,718.63035,0,736.78941,0,754.94848,0,767.45214,0,785.6112,0,803.77027,0,821.92933,0,834.43299,0,852.59206,0,870.75112,0,888.91019,0,901.41385,0,919.57292,0,937.73198,0,950.23564,0,968.39471,0,986.55377,0,1004.71284,0,1017.2165,0,1035.37556,0,1053.53463,0,1071.69369,0,1084.19735,0,1102.35642,0,1120.51548,0,1138.67455,0,1151.17821,0,1169.33727,0,1187.49634,0,2,1]},"smithgw_decab":{"title":"(10/9) <==> (16/15) transform of decaa","filename":"smithgw_decab.scl","rnbo":[10,21,20,28,25,6,5,4,3,7,5,3,2,8,5,42,25,28,15,2,1]},"smithgw_decac":{"title":"inversion of decaa","filename":"smithgw_decac.scl","rnbo":[10,15,14,8,7,6,5,4,3,10,7,3,2,8,5,12,7,40,21,2,1]},"smithgw_decad":{"title":"inversion of decab","filename":"smithgw_decad.scl","rnbo":[10,15,14,25,21,5,4,4,3,10,7,3,2,5,3,25,14,40,21,2,1]},"smithgw_dhexmarv":{"title":"Dualhex in 11-limit minimax Marvel ({225/224, 385/384}-planar)","filename":"smithgw_dhexmarv.scl","rnbo":[12,115.802647,0,151.994179,0,267.796826,0,383.599473,0,468.992587,0,535.593652,0,700.59788,0,767.198946,0,852.592059,0,968.394706,0,1084.197353,0,2,1]},"smithgw_diff13":{"title":"mod 13 perfect difference set, 7-limit","filename":"smithgw_diff13.scl","rnbo":[13,21,20,15,14,8,7,6,5,60,49,9,7,14,9,49,30,5,3,7,4,28,15,40,21,2,1]},"smithgw_duopors":{"title":"3-->10/3 5-->24/3 sorted rotated Duodene in 22-tET","filename":"smithgw_duopors.scl","rnbo":[12,54.54545,0,163.63636,0,327.27273,0,381.81818,0,490.90909,0,545.45454,0,709.09091,0,818.18182,0,872.72727,0,1036.36364,0,1036.36364,0,2,1]},"smithgw_dwarf6_7":{"title":"Dwarf(<6 10 14 17|)","filename":"smithgw_dwarf6_7.scl","rnbo":[6,8,7,5,4,10,7,3,2,12,7,2,1]},"smithgw_ennon13":{"title":"Nonoctave Ennealimmal, [3, 5/3] just tuning","filename":"smithgw_ennon13.scl","rnbo":[13,27,25,7,6,63,50,10,7,54,35,5,3,9,5,35,18,21,10,50,21,18,7,25,9,3,1]},"smithgw_ennon15":{"title":"Nonoctave Ennealimmal, [3, 5/3] just tuning","filename":"smithgw_ennon15.scl","rnbo":[15,27,25,7,6,63,50,250,189,10,7,54,35,5,3,9,5,35,18,21,10,245,108,50,21,18,7,25,9,3,1]},"smithgw_ennon28":{"title":"Nonoctave Ennealimmal, [3, 5/3] just tuning","filename":"smithgw_ennon28.scl","rnbo":[28,21,20,27,25,245,216,7,6,49,40,63,50,250,189,49,36,10,7,72,49,54,35,100,63,5,3,7,4,9,5,189,100,35,18,49,24,21,10,108,49,245,108,50,21,49,20,18,7,500,189,25,9,20,7,3,1]},"smithgw_ennon43":{"title":"Nonoctave Ennealimmal, [3, 5/3] just tuning","filename":"smithgw_ennon43.scl","rnbo":[43,36,35,21,20,27,25,10,9,245,216,7,6,6,5,49,40,63,50,35,27,250,189,49,36,25,18,10,7,72,49,3,2,54,35,100,63,81,50,5,3,12,7,7,4,9,5,50,27,189,100,35,18,2,1,49,24,21,10,54,25,108,49,245,108,81,35,50,21,49,20,5,2,18,7,500,189,27,10,25,9,20,7,35,12,3,1]},"smithgw_euclid3":{"title":"7-limit Euclid ball 3","filename":"smithgw_euclid3.scl","rnbo":[43,49,48,36,35,25,24,21,20,16,15,15,14,35,32,10,9,28,25,8,7,7,6,25,21,6,5,60,49,49,40,5,4,9,7,21,16,4,3,48,35,7,5,10,7,35,24,3,2,32,21,14,9,8,5,80,49,49,30,5,3,42,25,12,7,7,4,25,14,9,5,64,35,28,15,15,8,40,21,48,25,35,18,96,49,2,1]},"smithgw_exotic1":{"title":"Exotic temperament featuring four pure 14/11 thirds and two pure fifths","filename":"smithgw_exotic1.scl","rnbo":[12,86.06169,0,198.38534,0,310.70898,0,391.24602,0,503.56966,0,589.63136,0,3,2,11,7,894.81568,0,1007.13932,0,1093.20102,0,2,1]},"smithgw_fifaug":{"title":"Three circles of four (56/11)^(1/4) fifths with 11/7 as wolf","filename":"smithgw_fifaug.scl","rnbo":[15,95.623008,0,113.130973,0,208.753982,0,304.376991,0,400.0,0,495.623008,0,513.130973,0,608.753982,0,704.376991,0,800.0,0,895.623008,0,913.130973,0,1008.753982,0,1104.376991,0,2,1]},"smithgw_gamelion":{"title":"Gene Smith's 3136:3125 planar-tempered decatonic","filename":"smithgw_gamelion.scl","rnbo":[10,193.22,0,315.254,0,386.441,0,508.475,0,579.661,0,701.695,0,772.881,0,894.915,0,1088.136,0,2,1]},"smithgw_glamma":{"title":"Glamma = reca1c2, <12 19 27 34|-epimorphic","filename":"smithgw_glamma.scl","rnbo":[12,25,24,35,32,8,7,6,5,5,4,10,7,35,24,3,2,5,3,12,7,7,4,2,1]},"smithgw_glumma-hendec":{"title":"glumma tempered in 13-limit POTE-tuned hendec","filename":"smithgw_glumma-hendec.scl","rnbo":[12,50.40623,0,233.60415,0,315.98962,0,384.82283,0,549.59377,0,618.42698,0,700.81245,0,884.01038,0,934.4166,0,966.39585,0,1168.02076,0,2,1]},"smithgw_glumma":{"title":"Gene Smith's 7-limit Glumma scale (2002)","filename":"smithgw_glumma.scl","rnbo":[12,36,35,8,7,6,5,5,4,48,35,10,7,3,2,5,3,12,7,7,4,96,49,2,1]},"smithgw_gm":{"title":"Gene Ward Smith \"Genesis Minus\" periodicity block","filename":"smithgw_gm.scl","rnbo":[41,81,80,33,32,21,20,16,15,12,11,10,9,9,8,8,7,7,6,32,27,6,5,11,9,5,4,14,11,9,7,21,16,4,3,27,20,11,8,7,5,10,7,16,11,40,27,3,2,32,21,14,9,11,7,8,5,18,11,5,3,27,16,12,7,7,4,16,9,9,5,11,6,15,8,40,21,64,33,160,81,2,1]},"smithgw_grail":{"title":"Holy Grail circulating temperament with two 14/11 and one 9/7 major third","filename":"smithgw_grail.scl","rnbo":[12,86.869027,0,195.623009,0,304.376991,0,391.246018,0,504.376991,0,578.08096,0,695.623009,0,795.623009,0,895.623009,0,1013.165056,0,1086.869026,0,2,1]},"smithgw_graileq":{"title":"56% RMS grail + 44% JI grail","filename":"smithgw_graileq.scl","rnbo":[12,85.29319,0,196.24472,0,307.19625,0,392.48944,0,505.78483,0,579.66309,0,697.95321,0,796.24472,0,894.53624,0,1012.82635,0,1086.70462,0,2,1]},"smithgw_grailrms":{"title":"RMS optimized Holy Grail","filename":"smithgw_grailrms.scl","rnbo":[12,84.04825,0,196.73589,0,309.42352,0,393.47177,0,506.89705,0,580.91301,0,699.79411,0,796.73589,0,893.67766,0,1012.55876,0,1086.57473,0,2,1]},"smithgw_hahn12":{"title":"Hahn-reduced 12 note scale, Fokker block 225/224, 126/125, 64/63","filename":"smithgw_hahn12.scl","rnbo":[12,15,14,8,7,6,5,5,4,4,3,7,5,3,2,8,5,5,3,7,4,15,8,2,1]},"smithgw_hahn15":{"title":"Hahn-reduced 15 note scale","filename":"smithgw_hahn15.scl","rnbo":[15,16,15,10,9,7,6,6,5,5,4,4,3,7,5,10,7,3,2,8,5,5,3,7,4,9,5,15,8,2,1]},"smithgw_hahn16":{"title":"Hahn-reduced 16 note scale","filename":"smithgw_hahn16.scl","rnbo":[16,15,14,9,8,8,7,6,5,5,4,21,16,4,3,7,5,3,2,25,16,8,5,5,3,7,4,28,15,15,8,2,1]},"smithgw_hahn19":{"title":"Hahn-reduced 19 note scale","filename":"smithgw_hahn19.scl","rnbo":[19,21,20,15,14,9,8,7,6,6,5,5,4,9,7,4,3,7,5,10,7,3,2,14,9,8,5,5,3,7,4,9,5,15,8,35,18,2,1]},"smithgw_hahn22":{"title":"Hahn-reduced 22 note scale","filename":"smithgw_hahn22.scl","rnbo":[22,25,24,15,14,10,9,8,7,7,6,6,5,5,4,9,7,4,3,25,18,7,5,35,24,3,2,14,9,8,5,5,3,12,7,7,4,9,5,15,8,35,18,2,1]},"smithgw_hemw":{"title":"Hemiwürschmidt TOP tempering of 43 notes of septimal ball 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g=316.492","filename":"smithgw_klv.scl","rnbo":[15,65.96636,0,131.93272,0,197.89909,0,316.49159,0,382.45795,0,448.42431,0,514.39068,0,632.98318,0,698.94954,0,14,9,830.88227,0,949.47477,0,1015.44113,0,1081.4075,0,2,1]},"smithgw_majraj1":{"title":"Majraj 648/625 6561/6250 scale","filename":"smithgw_majraj1.scl","rnbo":[12,27,25,125,108,729,625,5,4,27,20,25,18,3,2,81,50,5,3,9,5,243,125,2,1]},"smithgw_majraj2":{"title":"Majraj 648/625 6561/6250 scale","filename":"smithgw_majraj2.scl","rnbo":[12,27,25,10,9,6,5,162,125,4,3,36,25,3,2,125,81,5,3,9,5,50,27,2,1]},"smithgw_majraj3":{"title":"Majraj 648/625 6561/6250 scale","filename":"smithgw_majraj3.scl","rnbo":[12,27,25,10,9,6,5,162,125,4,3,25,18,3,2,125,81,5,3,9,5,50,27,2,1]},"smithgw_majsyn1":{"title":"First Majsyn 648/625 81/80 scale","filename":"smithgw_majsyn1.scl","rnbo":[12,250,243,10,9,6,5,100,81,4,3,25,18,40,27,125,81,5,3,16,9,50,27,2,1]},"smithgw_majsyn2":{"title":"Second Majsyn 648/625 81/80 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10-6-2006","filename":"smithgw_meansp.scl","rnbo":[7,117.10786,0,5,4,32,25,696.57843,0,8,5,1006.84314,0,2,1]},"smithgw_meantune":{"title":"Meantune scale/temperament, Gene Ward Smith (2003)","filename":"smithgw_meantune.scl","rnbo":[16,77.18667,0,116.09974,0,193.48516,0,309.60699,0,386.9924,0,425.90548,0,503.09215,0,580.12326,0,620.00616,0,695.75115,0,812.87817,0,890.21397,0,1007.34099,0,1083.08598,0,1122.96889,0,2,1]},"smithgw_mir22":{"title":"11-limit Miracle[22]","filename":"smithgw_mir22.scl","rnbo":[22,45,44,21,20,15,14,12,11,8,7,7,6,11,9,5,4,21,16,4,3,7,5,10,7,3,2,32,21,8,5,18,11,12,7,7,4,11,6,15,8,49,25,2,1]},"smithgw_mmt":{"title":"Modified meantone with 5/4, 14/11 and 44/35 major thirds, TL 17-03-2003","filename":"smithgw_mmt.scl","rnbo":[12,76.049,0,193.15686,0,279.07046,0,5,4,503.42157,0,579.47057,0,696.57843,0,11,7,889.73529,0,975.64889,0,1082.89214,0,2,1]},"smithgw_modmos12a":{"title":"A 12-note modmos in 50-et meantone","filename":"smithgw_modmos12a.scl","rnbo":[12,24.0,0,192.0,0,264.0,0,384.0,0,456.0,0,576.0,0,696.0,0,768.0,0,840.0,0,960.0,0,1080.0,0,2,1]},"smithgw_monzoblock37":{"title":"Symmetrical 13-limit Fokker block containing all of the primes as scale degrees","filename":"smithgw_monzoblock37.scl","rnbo":[37,1024,1001,33,32,16,15,13,12,12,11,44,39,8,7,7,6,13,11,77,64,16,13,5,4,33,26,13,10,4,3,192,143,11,8,128,91,91,64,16,11,143,96,3,2,20,13,52,33,8,5,13,8,128,77,22,13,12,7,7,4,39,22,11,6,24,13,15,8,64,33,1001,512,2,1]},"smithgw_mush":{"title":"Mysterious mush scale. Gene Smith's meantone to TOP pelogic transformation","filename":"smithgw_mush.scl","rnbo":[12,-1175.55108,0,-163.507699,0,848.535681,0,-327.015398,0,685.027982,0,-490.52309,0,521.520283,0,-654.0308,0,358.012584,0,1370.055964,0,194.504885,0,1206.548265,0]},"smithgw_nova":{"title":"Nova scale of Valentine temperament in 185-tET","filename":"smithgw_nova.scl","rnbo":[8,123.24324,0,311.35135,0,389.18919,0,622.7027,0,700.54054,0,888.64865,0,1011.89189,0,2,1]},"smithgw_orw18r":{"title":"Rational version of two cycles of 9-tone \"Orwell\"","filename":"smithgw_orw18r.scl","rnbo":[18,36,35,15,14,35,32,8,7,7,6,5,4,9,7,4,3,48,35,35,24,3,2,14,9,8,5,12,7,7,4,49,27,15,8,2,1]},"smithgw_pel1":{"title":"125/108, 135/128 periodicity block no. 1","filename":"smithgw_pel1.scl","rnbo":[12,25,24,10,9,9,8,5,4,4,3,25,18,3,2,25,16,8,5,5,3,15,8,2,1]},"smithgw_pel3":{"title":"125/108, 135/128 periodicity block no. 3","filename":"smithgw_pel3.scl","rnbo":[12,10,9,9,8,6,5,5,4,4,3,3,2,25,16,8,5,5,3,9,5,15,8,2,1]},"smithgw_pk":{"title":"Parakleismic temperament, g=315.263, 5-limit","filename":"smithgw_pk.scl","rnbo":[15,61.05322,0,122.10645,0,183.15967,0,315.26331,0,376.31653,0,437.36976,0,498.42298,0,630.52661,0,691.57984,0,752.63306,0,8,5,945.78992,0,1006.84314,0,1067.89637,0,2,1]},"smithgw_pris":{"title":"optimized (15/14)^3 (16/15)^4 (21/20)^3 (25/24)^2 scale","filename":"smithgw_pris.scl","rnbo":[12,16,15,28,25,7,6,5,4,4,3,7,5,3,2,8,5,5,3,7,4,28,15,2,1]},"smithgw_prisa":{"title":"optimized (15/14)^3 (16/15)^4 (21/20)^3 (25/24)^2 scale","filename":"smithgw_prisa.scl","rnbo":[12,21,20,28,25,6,5,5,4,21,16,7,5,3,2,8,5,42,25,7,4,28,15,2,1]},"smithgw_propsep":{"title":"Proper septicyclic 1029/1024-tempered scale in 252-tET","filename":"smithgw_propsep.scl","rnbo":[11,38.09524,0,152.38095,0,304.7619,0,385.71429,0,538.09524,0,619.04762,0,700.0,0,852.38095,0,933.33333,0,1085.71429,0,2,1]},"smithgw_pum13marv":{"title":"pum13 marvel tempered and in epimorphic order","filename":"smithgw_pum13marv.scl","rnbo":[13,200.05424,0,268.79879,0,468.85303,0,384.38583,0,584.44007,0,499.97288,0,700.02712,0,768.77167,0,7,4,5,3,1084.41295,0,1284.46719,0,2,1]},"smithgw_qm3a":{"title":"Qm(3) 10-note quasi-miracle scale, mode A, 72-tET, TL 04-01-2002","filename":"smithgw_qm3a.scl","rnbo":[10,116.66667,0,266.66667,0,383.33333,0,500.0,0,583.33333,0,700.0,0,816.66667,0,966.66667,0,1083.33333,0,2,1]},"smithgw_qm3b":{"title":"Qm(3) 10-note quasi-miracle scale, mode B","filename":"smithgw_qm3b.scl","rnbo":[10,116.66667,0,233.33333,0,383.33333,0,500.0,0,616.66667,0,700.0,0,816.66667,0,933.33333,0,1083.33333,0,2,1]},"smithgw_ragasyn1":{"title":"Ragasyn 6561/6250 81/80 scale","filename":"smithgw_ragasyn1.scl","rnbo":[12,250,243,10,9,6,5,100,81,4,3,25,18,3,2,125,81,5,3,9,5,50,27,2,1]},"smithgw_ratwell":{"title":"7-limit rational well-temperament","filename":"smithgw_ratwell.scl","rnbo":[12,256,243,28,25,32,27,175616,140625,4,3,1024,729,3,2,128,81,3136,1875,16,9,4096,2187,2,1]},"smithgw_ratwolf":{"title":"Eleven fifths of (416/5)^(1/11) and one 20/13 wolf, G.W. Smith 2003","filename":"smithgw_ratwolf.scl","rnbo":[12,70.86342,0,191.67526,0,312.4871,0,383.35053,0,504.16237,0,575.02579,0,695.83763,0,766.70106,0,887.5129,0,1008.32474,0,1079.18816,0,2,1]},"smithgw_rectoo":{"title":"Hahn-reduced circle of fifths via <12 19 27 34| kernel","filename":"smithgw_rectoo.scl","rnbo":[12,10,9,8,7,6,5,5,4,4,3,3,2,25,16,8,5,5,3,7,4,9,5,2,1]},"smithgw_red72_11geo":{"title":"Geometric 11-limit reduced scale","filename":"smithgw_red72_11geo.scl","rnbo":[72,100,99,56,55,33,32,25,24,21,20,35,33,15,14,27,25,12,11,11,10,10,9,9,8,112,99,8,7,231,200,7,6,33,28,25,21,6,5,40,33,11,9,99,80,5,4,44,35,14,11,9,7,35,27,21,16,33,25,4,3,27,20,15,11,11,8,25,18,7,5,140,99,10,7,36,25,16,11,22,15,40,27,3,2,50,33,32,21,54,35,14,9,11,7,35,22,8,5,160,99,18,11,33,20,5,3,42,25,56,33,12,7,400,231,7,4,99,56,16,9,9,5,20,11,11,6,50,27,28,15,66,35,40,21,48,25,64,33,55,28,99,50,2,1]},"smithgw_red72_11pro":{"title":"Prooijen 11-limit reduced scale","filename":"smithgw_red72_11pro.scl","rnbo":[72,81,80,64,63,33,32,25,24,21,20,128,121,16,15,27,25,12,11,11,10,10,9,9,8,25,22,8,7,297,256,7,6,33,28,32,27,6,5,40,33,11,9,99,80,5,4,81,64,14,11,32,25,128,99,21,16,160,121,4,3,27,20,15,11,11,8,25,18,7,5,512,363,10,7,36,25,16,11,22,15,40,27,3,2,121,80,32,21,99,64,25,16,11,7,128,81,8,5,160,99,18,11,33,20,5,3,27,16,56,33,12,7,512,297,7,4,44,25,16,9,9,5,20,11,11,6,50,27,15,8,121,64,40,21,48,25,64,33,63,32,160,81,2,1]},"smithgw_sc19":{"title":"Fokker block from commas <81/80, 78732/78125>, Gene Ward Smith 2002","filename":"smithgw_sc19.scl","rnbo":[19,250,243,27,25,10,9,125,108,6,5,5,4,162,125,4,3,25,18,36,25,3,2,125,81,8,5,5,3,216,125,9,5,50,27,243,125,2,1]},"smithgw_sch13":{"title":"13-limit schismic temperament, g=704.3917, TL 31-10-2002","filename":"smithgw_sch13.scl","rnbo":[29,52.70053,0,105.40105,0,130.74197,0,183.4425,0,208.78342,0,261.48395,0,314.18447,0,339.52539,0,392.22592,0,417.56684,0,470.26737,0,522.96789,0,548.30882,0,601.00934,0,626.35026,0,679.05079,0,704.39171,0,757.09224,0,809.79276,0,835.13368,0,887.83421,0,913.17513,0,965.87566,0,1018.57618,0,1043.91711,0,1096.61763,0,1121.95855,0,1174.65908,0,2,1]},"smithgw_sch13a":{"title":"13-limit schismic temperament, g=702.660507, TL 31-10-2002","filename":"smithgw_sch13a.scl","rnbo":[29,31.92608,0,63.85217,0,118.62355,0,150.54963,0,205.32101,0,237.2471,0,269.17318,0,323.94456,0,355.87064,0,410.64203,0,442.56811,0,474.49419,0,529.26558,0,561.19166,0,615.96304,0,647.88912,0,702.66051,0,734.58659,0,766.51267,0,821.28406,0,853.21014,0,907.98152,0,939.9076,0,971.83369,0,1026.60507,0,1058.53115,0,1113.30253,0,1145.22862,0,2,1]},"smithgw_scj22a":{"title":"<3125/3072, 250/243> Fokker block","filename":"smithgw_scj22a.scl","rnbo":[22,25,24,16,15,10,9,9,8,144,125,6,5,5,4,32,25,4,3,864,625,25,18,36,25,3,2,25,16,8,5,5,3,125,72,16,9,9,5,15,8,48,25,2,1]},"smithgw_scj22b":{"title":"<2048/2025, 250/243> Fokker block","filename":"smithgw_scj22b.scl","rnbo":[22,25,24,16,15,10,9,9,8,32,27,6,5,5,4,32,25,4,3,27,20,64,45,40,27,3,2,25,16,8,5,5,3,27,16,16,9,9,5,15,8,48,25,2,1]},"smithgw_scj22c":{"title":"<2048/2025, 3125/3072> Fokker block","filename":"smithgw_scj22c.scl","rnbo":[22,25,24,16,15,10,9,9,8,75,64,6,5,5,4,32,25,4,3,512,375,45,32,375,256,3,2,25,16,8,5,5,3,128,75,16,9,9,5,15,8,48,25,2,1]},"smithgw_secab":{"title":"{126/125, 176/175} tempering of decab, 328-et version","filename":"smithgw_secab.scl","rnbo":[10,80.48780488,0,186.5853659,0,310.9756098,0,497.5609756,0,578.0487805,0,702.4390244,0,808.5365854,0,889.0243902,0,1075.609756,0,2,1]},"smithgw_secac":{"title":"{126/125, 176/175} tempering of decac, 328-et version","filename":"smithgw_secac.scl","rnbo":[10,124.3902439,0,230.4878049,0,310.9756098,0,497.5609756,0,621.9512195,0,702.4390244,0,808.5365854,0,932.9268293,0,1119.512195,0,2,1]},"smithgw_secad":{"title":"{126/125, 176/175} tempering of decad, 328-et version","filename":"smithgw_secad.scl","rnbo":[10,124.3902439,0,310.9756098,0,391.4634146,0,497.5609756,0,621.9512195,0,702.4390244,0,889.0243902,0,1013.414634,0,1119.512195,0,2,1]},"smithgw_sixtetwoo":{"title":"Six 7-limit tetrads marvel woo scale with 51 11-limit dyads","filename":"smithgw_sixtetwoo.scl","rnbo":[12,116.23027,0,267.51234,0,316.92773,0,383.74261,0,433.158,0,584.44007,0,700.67034,0,816.90061,0,933.13088,0,968.18268,0,1084.41295,0,1200.64322,0]},"smithgw_smalldi11":{"title":"Small diesic 11-note block, <10/9, 126/125, 1728/1715> commas","filename":"smithgw_smalldi11.scl","rnbo":[11,36,35,7,6,6,5,216,175,7,5,10,7,175,108,5,3,12,7,35,18,2,1]},"smithgw_smalldi19a":{"title":"Small diesic 19-note block, <16/15, 126/125, 1728/1715> commas","filename":"smithgw_smalldi19a.scl","rnbo":[19,36,35,25,24,8,7,7,6,6,5,175,144,5,4,48,35,7,5,10,7,35,24,8,5,288,175,5,3,12,7,7,4,48,25,35,18,2,1]},"smithgw_smalldi19b":{"title":"Small diesic 19-note block, <16/15, 126/125, 2401/2400> commas","filename":"smithgw_smalldi19b.scl","rnbo":[19,50,49,21,20,8,7,7,6,6,5,49,40,5,4,48,35,7,5,10,7,35,24,8,5,80,49,5,3,12,7,7,4,40,21,49,25,2,1]},"smithgw_smalldi19c":{"title":"Small diesic 19-note scale containing glumma","filename":"smithgw_smalldi19c.scl","rnbo":[19,49,48,21,20,15,14,35,32,6,5,49,40,5,4,9,7,21,16,10,7,35,24,3,2,49,32,5,3,12,7,7,4,9,5,35,18,2,1]},"smithgw_smalldiglum19":{"title":"Small diesic \"glumma\" variant of 19-note MOS, 31/120 version","filename":"smithgw_smalldiglum19.scl","rnbo":[19,40.0,0,80.0,0,120.0,0,160.0,0,310.0,0,350.0,0,390.0,0,430.0,0,470.0,0,620.0,0,660.0,0,700.0,0,740.0,0,890.0,0,930.0,0,970.0,0,1010.0,0,1160.0,0,2,1]},"smithgw_smalldimos11":{"title":"Small diesic 11-note MOS, 31/120 version","filename":"smithgw_smalldimos11.scl","rnbo":[11,40.0,0,270.0,0,310.0,0,350.0,0,580.0,0,620.0,0,850.0,0,890.0,0,930.0,0,1160.0,0,2,1]},"smithgw_smalldimos19":{"title":"Small diesic 19-note MOS, 31/120 version","filename":"smithgw_smalldimos19.scl","rnbo":[19,40.0,0,80.0,0,230.0,0,270.0,0,310.0,0,350.0,0,390.0,0,540.0,0,580.0,0,620.0,0,660.0,0,810.0,0,850.0,0,890.0,0,930.0,0,970.0,0,1120.0,0,1160.0,0,2,1]},"smithgw_sqoo":{"title":"3x3 chord square, 2401/2400 projection of tetrad lattice (612-et tuning)","filename":"smithgw_sqoo.scl","rnbo":[18,35.294118,0,84.313725,0,119.607843,0,266.666667,0,350.980392,0,386.27451,0,470.588235,0,582.352941,0,617.647059,0,701.960784,0,737.254902,0,849.019608,0,884.313726,0,933.333333,0,968.627451,0,1052.941176,0,1088.235294,0,2,1]},"smithgw_star":{"title":"Gene Ward Smith \"Star\" scale, untempered version, key of cluster8f.scl","filename":"smithgw_star.scl","rnbo":[8,25,24,6,5,5,4,36,25,3,2,5,3,9,5,2,1]},"smithgw_star2":{"title":"Gene Ward Smith \"Star\" scale, alternative untempered version","filename":"smithgw_star2.scl","rnbo":[8,27,25,6,5,5,4,36,25,3,2,5,3,9,5,2,1]},"smithgw_starra":{"title":"12 note {126/125, 176/175} scale, 328-tET version (inverse of smithgw_starrb.scl)","filename":"smithgw_starra.scl","rnbo":[12,80.48780488,0,204.8780488,0,310.9756098,0,391.4634146,0,471.9512195,0,621.9512195,0,702.4390244,0,782.9268293,0,889.0243902,0,969.5121951,0,1093.902439,0,2,1]},"smithgw_starrb":{"title":"12 note {126/125, 176/175} scale, 328-tET version (inverse of smithgw_starra.scl)","filename":"smithgw_starrb.scl","rnbo":[12,80.48780488,0,160.9756098,0,267.0731707,0,391.4634146,0,471.9512195,0,578.0487805,0,702.4390244,0,782.9268293,0,889.0243902,0,969.5121951,0,1050.0,0,2,1]},"smithgw_starrc":{"title":"12 note {126/125, 176/175} scale, 328-et version","filename":"smithgw_starrc.scl","rnbo":[12,80.48780488,0,160.9756098,0,310.9756098,0,391.4634146,0,471.9512195,0,578.0487805,0,702.4390244,0,782.9268293,0,889.0243902,0,969.5121951,0,1093.902439,0,2,1]},"smithgw_suzz":{"title":"{385/384, 441/440} suzz in 190-tET version","filename":"smithgw_suzz.scl","rnbo":[10,82.10526,0,233.68421,0,315.78947,0,467.36842,0,581.05263,0,732.63158,0,814.73684,0,966.31579,0,1048.42105,0,2,1]},"smithgw_syndia2":{"title":"Second 81/80 2048/2025 Fokker block","filename":"smithgw_syndia2.scl","rnbo":[12,16,15,256,225,6,5,32,25,4,3,64,45,3,2,8,5,128,75,9,5,256,135,2,1]},"smithgw_syndia3":{"title":"Third 81/80 2048/2025 Fokker block","filename":"smithgw_syndia3.scl","rnbo":[12,135,128,9,8,1215,1024,5,4,675,512,45,32,3,2,405,256,27,16,225,128,15,8,2,1]},"smithgw_syndia4":{"title":"Fourth 81/80 2048/2025 Fokker block","filename":"smithgw_syndia4.scl","rnbo":[12,135,128,9,8,6,5,5,4,4,3,45,32,3,2,8,5,27,16,16,9,15,8,2,1]},"smithgw_syndia6":{"title":"Sixth 81/80 2048/2025 Fokker block","filename":"smithgw_syndia6.scl","rnbo":[12,135,128,9,8,6,5,5,4,4,3,45,32,3,2,405,256,27,16,16,9,15,8,2,1]},"smithgw_tetra":{"title":"{225/224, 385/384} tempering of two-tetrachord 12-note scale","filename":"smithgw_tetra.scl","rnbo":[12,85.31468531,0,201.3986014,0,317.4825175,0,383.2167832,0,468.5314685,0,584.6153846,0,700.6993007,0,816.7832168,0,882.5174825,0,967.8321678,0,1083.916084,0,2,1]},"smithgw_tr31":{"title":"6/31 generator supermajor seconds tripentatonic scale","filename":"smithgw_tr31.scl","rnbo":[15,38.70968,0,193.54839,0,232.25806,0,270.96774,0,425.80645,0,464.51613,0,503.22581,0,696.77419,0,735.48387,0,774.19355,0,929.03226,0,967.74194,0,1006.45161,0,1161.29032,0,2,1]},"smithgw_tr7_13":{"title":"81/80 ==> 28561/28672","filename":"smithgw_tr7_13.scl","rnbo":[12,-610.538616,0,484.215446,0,-126.323169,0,968.430892,0,357.892277,0,1452.646339,0,842.107723,0,231.569108,0,1326.323169,0,715.784554,0,1810.538616,0,2,1]},"smithgw_tr7_13b":{"title":"reverse reduced 81/80 ==> 28561/28672","filename":"smithgw_tr7_13b.scl","rnbo":[12,610.538616,0,715.784554,0,126.323169,0,231.569108,0,842.107723,0,252.646339,0,357.892277,0,968.430892,0,1073.676831,0,484.215446,0,589.461384,0,2,1]},"smithgw_tr7_13r":{"title":"reduced 81/80 ==> 28561/28672","filename":"smithgw_tr7_13r.scl","rnbo":[12,589.461384,0,484.215446,0,1073.676831,0,968.430892,0,357.892277,0,252.646339,0,842.107723,0,231.569108,0,126.323169,0,715.784554,0,610.538616,0,2,1]},"smithgw_tra":{"title":"81/80 ==> 1029/512","filename":"smithgw_tra.scl","rnbo":[12,-1232.77779,0,733.111116,0,-499.666674,0,1466.222232,0,233.444442,0,2199.333348,0,966.555558,0,-266.222232,0,1699.666674,0,466.888884,0,2432.77779,0,2,1]},"smithgw_tre":{"title":"81/80 ==> 1029/512 ==> reduction","filename":"smithgw_tre.scl","rnbo":[12,-32.778,0,733.111,0,700.333,0,266.222,0,233.444,0,999.333,0,966.556,0,933.778,0,499.667,0,466.889,0,1232.778,0,2,1]},"smithgw_treb":{"title":"reversed 81/80 ==> 1029/512 ==> reduction","filename":"smithgw_treb.scl","rnbo":[12,32.778,0,466.889,0,499.667,0,933.778,0,966.556,0,999.333,0,233.444,0,266.222,0,700.333,0,733.111,0,1167.222,0,2,1]},"smithgw_trx":{"title":"reduced 3/2->7/6 5/4->11/6 scale","filename":"smithgw_trx.scl","rnbo":[12,1086.96392,0,525.214432,0,412.178352,0,1050.428864,0,937.392784,0,375.643295,0,262.607216,0,149.571136,0,787.821648,0,674.785568,0,113.03608,0,2,1]},"smithgw_trxb":{"title":"reversed reduced 3/2->7/6 5/4->11/6 scale","filename":"smithgw_trxb.scl","rnbo":[12,113.03608,0,674.785568,0,787.821648,0,149.571136,0,262.607216,0,375.643295,0,937.392784,0,1050.428864,0,412.178352,0,525.214432,0,1086.96392,0,2,1]},"smithgw_wa":{"title":"Wreckmeister A temperament, TL 2-6-2002","filename":"smithgw_wa.scl","rnbo":[12,77.77778,0,233.33333,0,311.11111,0,388.88889,0,500.0,0,622.22222,0,700.0,0,811.11111,0,888.88889,0,1011.11111,0,1122.22222,0,2,1]},"smithgw_wa120":{"title":"120-tET version of Wreckmeister A temperament","filename":"smithgw_wa120.scl","rnbo":[12,80.0,0,230.0,0,310.0,0,390.0,0,500.0,0,620.0,0,700.0,0,810.0,0,890.0,0,1010.0,0,1120.0,0,2,1]},"smithgw_wb":{"title":"Wreckmeister B temperament, TL 2-6-2002","filename":"smithgw_wb.scl","rnbo":[12,122.22222,0,188.88889,0,311.11111,0,388.88889,0,500.0,0,577.77778,0,700.0,0,811.11111,0,888.88889,0,1011.11111,0,1077.77778,0,2,1]},"smithgw_well1":{"title":"Well-temperament, Gene Ward Smith (2005)","filename":"smithgw_well1.scl","rnbo":[12,28800,27307,30574,27307,32400,27307,34185,27307,36450,27307,38400,27307,5841,3901,43200,27307,45715,27307,48600,27307,51200,27307,2,1]},"smithgw_whelp1":{"title":"Well-temperament with one pure third, Gene Ward Smith (2003)","filename":"smithgw_whelp1.scl","rnbo":[12,135,128,193.15686,0,32,27,5,4,494.15525,0,593.01126,0,693.17766,0,793.15686,0,893.13606,0,993.30246,0,1092.15846,0,2,1]},"smithgw_whelp2":{"title":"well-temperament with two pure thirds","filename":"smithgw_whelp2.scl","rnbo":[12,91.65659,0,192.7213,0,293.61178,0,5,4,493.76664,0,591.63723,0,699.09016,0,791.7921,0,892.68258,0,993.74728,0,1085.40388,0,2,1]},"smithgw_whelp3":{"title":"well-temperament with three pure thirds","filename":"smithgw_whelp3.scl","rnbo":[12,92.40143,0,193.15686,0,293.91228,0,5,4,501.15529,0,591.20167,0,698.84471,0,793.15686,0,887.469,0,995.11204,0,1085.15843,0,2,1]},"smithgw_wilcmarv11":{"title":"Wilson Class scale in 11-limit minimax Marvel","filename":"smithgw_wilcmarv11.scl","rnbo":[12,85.393114,0,151.994179,0,316.998408,0,383.599473,0,468.992587,0,584.795233,0,700.59788,0,767.198946,0,901.793641,0,968.394706,0,1084.197353,0,2,1]},"smithgw_wilcmarv7":{"title":"Wilson Class scale in 1/4-kleisma Marvel","filename":"smithgw_wilcmarv7.scl","rnbo":[12,21,20,153.21174,0,6,5,384.38583,0,468.85303,0,584.44007,0,700.02712,0,768.77167,0,900.08136,0,7,4,1084.41295,0,2,1]},"smithgw_wiz28":{"title":"11-limit Wizard[28]","filename":"smithgw_wiz28.scl","rnbo":[28,33,32,35,33,15,14,11,10,25,22,7,6,33,28,40,33,5,4,9,7,33,25,4,3,11,8,99,70,16,11,3,2,50,33,14,9,8,5,33,20,5,3,12,7,44,25,20,11,15,8,66,35,35,18,2,1]},"smithgw_wiz34":{"title":"11-limit Wizard[34]","filename":"smithgw_wiz34.scl","rnbo":[34,33,32,25,24,35,33,15,14,11,10,25,22,7,6,33,28,6,5,40,33,5,4,9,7,33,25,4,3,15,11,11,8,99,70,16,11,22,15,3,2,50,33,14,9,8,5,33,20,5,3,56,33,12,7,44,25,20,11,15,8,66,35,27,14,35,18,2,1]},"smithgw_wiz38":{"title":"11-limit Wizard[38]","filename":"smithgw_wiz38.scl","rnbo":[38,33,32,25,24,35,33,15,14,12,11,11,10,25,22,7,6,33,28,6,5,40,33,5,4,9,7,35,27,33,25,4,3,15,11,11,8,99,70,16,11,22,15,3,2,50,33,54,35,14,9,8,5,33,20,5,3,56,33,12,7,44,25,20,11,11,6,15,8,66,35,27,14,35,18,2,1]},"smithgw_wreckpop":{"title":"\"Wreckmeister\" 13-limit meanpop (50-et) tempered thirds","filename":"smithgw_wreckpop.scl","rnbo":[12,72.0,0,192.0,0,312.0,0,384.0,0,504.0,0,576.0,0,696.0,0,816.0,0,888.0,0,960.0,0,1128.0,0,2,1]},"smithgw_yarman12":{"title":"Gene Ward Smith's Circulating 12-tone Temperament in 159-tET inspired by Ozan Yarman","filename":"smithgw_yarman12.scl","rnbo":[12,98.11321,0,196.22642,0,316.98113,0,384.90566,0,505.66038,0,588.67925,0,694.33962,0,807.54717,0,890.56604,0,1011.32075,0,1079.24528,0,2,1]},"smithj12":{"title":"Jon Lyle Smith, 5-limit JI scale, MMM 21-3-2006","filename":"smithj12.scl","rnbo":[12,25,24,9,8,75,64,81,64,675,512,25,18,3,2,25,16,27,16,225,128,243,128,2,1]},"smithj17":{"title":"Jon Lyle Smith 17-tone well temperament, MMM 12-2006","filename":"smithj17.scl","rnbo":[17,71.0,0,137.0,0,208.0,0,288.0,0,345.0,0,416.0,0,496.0,0,567.0,0,633.0,0,704.0,0,784.0,0,841.0,0,912.0,0,992.0,0,1049.0,0,1120.0,0,2,1]},"smithj24":{"title":"Jon Lyle Smith 5-limit JI scale, TL 8-4-2006","filename":"smithj24.scl","rnbo":[24,81,80,256,243,16,15,10,9,9,8,32,27,6,5,5,4,81,64,4,3,27,20,45,32,64,45,40,27,3,2,128,81,8,5,5,3,27,16,16,9,9,5,15,8,243,128,2,1]},"smithrk_19":{"title":"19 out of 612-tET by Roger K. Smith (1978)","filename":"smithrk_19.scl","rnbo":[19,84.31373,0,154.90196,0,203.92157,0,266.66667,0,315.68627,0,386.27451,0,470.58824,0,498.03922,0,582.35294,0,652.94118,0,701.96078,0,764.70588,0,813.72549,0,884.31373,0,968.62745,0,1017.64706,0,1080.39216,0,1150.98039,0,2,1]},"smithrk_mult":{"title":"Roger K. 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C","filename":"sparschuh_septenarian29.scl","rnbo":[29,91,88,2227,2112,13,12,293,264,9,8,7,6,313,264,161,132,5,4,14,11,231,176,4,3,121,88,45,32,63,44,65,44,3,2,205,132,835,528,13,8,5,3,149,88,7,4,313,176,11,6,15,8,23,12,65,33,2,1]},"sparschuh_septenarian53":{"title":"Sparschuh's 53 generalization of Werckmeister's septenarius temperament","filename":"sparschuh_septenarian53.scl","rnbo":[53,2075,2048,525,512,136231,131072,69043,65536,2187,2048,1107,1024,4485,4096,36369,32768,9,8,1167,1024,4725,4096,153259,131072,77673,65536,615,512,1245,1024,40365,32768,40915,32768,81,64,2625,2048,42525,32768,1347,1024,174763,131072,2767,2048,175,128,90821,65536,46029,32768,729,512,23625,16384,95681,65536,12123,8192,3,2,389,256,1575,1024,102173,65536,25891,16384,205,128,415,256,13455,8192,109107,65536,27,16,875,512,14175,8192,449,256,116509,65536,1845,1024,1867,1024,121095,65536,15343,8192,243,128,7875,4096,127575,65536,4041,2048,2,1]},"sparschuh_wtc":{"title":"Andreas Sparschuh WTC temperament. 1/1=250 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catakleismic","filename":"stelhex-catakleismic.scl","rnbo":[12,84.96312,0,267.80043,0,316.73753,0,383.68764,0,468.65076,0,584.53796,0,700.42516,0,816.31236,0,901.27549,0,968.2256,0,1017.16269,0,2,1]},"stelhex1":{"title":"Stellated two out of 1 3 5 7 hexany <14 23 36 40| weakly epimorphic, also dekatesserany, tetradekany, Fokblock 288/245, 56/45, 63/50","filename":"stelhex1.scl","rnbo":[14,21,20,15,14,35,32,9,8,5,4,21,16,35,24,3,2,49,32,25,16,105,64,7,4,15,8,2,1]},"stelhex1star":{"title":"Starling (126/125) tempered dekatesserany, one major and minor triad extra","filename":"stelhex1star.scl","rnbo":[14,78.43056,0,123.39348,0,156.86113,0,201.82404,0,389.67129,0,468.10186,0,655.94911,0,700.91202,0,734.37967,0,779.34259,0,857.77315,0,967.18984,0,1090.58332,0,2,1]},"stelhex2":{"title":"Stellated two out of 1 3 5 9 hexany","filename":"stelhex2.scl","rnbo":[12,135,128,9,8,5,4,81,64,27,20,45,32,3,2,25,16,5,3,27,16,15,8,2,1]},"stelhex3":{"title":"Stellated Tetrachordal Hexany based on Archytas's Enharmonic","filename":"stelhex3.scl","rnbo":[14,28,27,16,15,784,729,448,405,256,225,35,27,4,3,48,35,112,81,64,45,1792,1215,224,135,16,9,2,1]},"stelhex4":{"title":"Stellated Tetrachordal Hexany based on the 1/1 35/36 16/15 4/3 tetrachord","filename":"stelhex4.scl","rnbo":[14,36,35,1296,1225,16,15,192,175,256,225,9,7,4,3,48,35,112,81,64,45,256,175,288,175,16,9,2,1]},"stelhex5":{"title":"Stellated two out of 1 3 7 9 hexany, stellation is degenerate","filename":"stelhex5.scl","rnbo":[12,9,8,7,6,81,64,21,16,189,128,3,2,49,32,27,16,7,4,27,14,63,32,2,1]},"stelhex6":{"title":"Stellated two out of 1 3 5 11 hexany, from The Giving, by Stephen J. Taylor","filename":"stelhex6.scl","rnbo":[14,33,32,9,8,55,48,5,4,165,128,15,11,11,8,3,2,25,16,33,20,55,32,15,8,121,64,2,1]},"stelhexplus":{"title":"13-limit 8 cents tolerance least squares","filename":"stelhexplus.scl","rnbo":[16,115.58159,0,231.81264,0,347.39422,0,434.1413,0,464.16965,0,498.9544,0,548.93933,0,615.05498,0,730.13984,0,817.25438,0,932.33924,0,998.4549,0,1048.43982,0,1083.22457,0,1113.25292,0,2,1]},"stellar":{"title":"stellar scale in 1/4 kleismic marvel tempering","filename":"stellar.scl","rnbo":[20,115.58705,0,153.21174,0,200.05424,0,8,7,268.79879,0,6,5,384.38583,0,468.85303,0,499.97288,0,584.44007,0,615.55993,0,700.02712,0,768.77167,0,815.61417,0,853.23886,0,5,3,931.20121,0,7,4,1084.41295,0,2,1]},"stellar5":{"title":"Marvel scale stellar in 5-limit detempering","filename":"stellar5.scl","rnbo":[20,16,15,1125,1024,9,8,256,225,75,64,6,5,5,4,675,512,4,3,45,32,64,45,3,2,25,16,8,5,3375,2048,5,3,128,75,225,128,15,8,2,1]},"stellarhex":{"title":"mandala/stelhex/cube(2) plus 7/6 and 7/5; convex in marvel tempering","filename":"stellarhex.scl","rnbo":[16,21,20,15,14,35,32,9,8,7,6,5,4,21,16,7,5,35,24,3,2,49,32,25,16,105,64,7,4,15,8,2,1]},"stellarhexmarvwoo":{"title":"stellarhex tempered in marvel, marvel woo tuning","filename":"stellarhexmarvwoo.scl","rnbo":[16,84.46719,0,116.23027,0,151.28207,0,200.69746,0,267.51234,0,383.74261,0,468.2098,0,584.44007,0,651.25495,0,700.67034,0,735.72214,0,767.48522,0,851.95241,0,968.18268,0,1084.41295,0,1200.64322,0]},"stellblock":{"title":"Weak Fokker block, <20 32 45 54| epimorphic; mutated from stella","filename":"stellblock.scl","rnbo":[20,15,14,10,9,8,7,7,6,25,21,6,5,5,4,9,7,4,3,10,7,40,27,3,2,54,35,5,3,12,7,16,9,50,27,40,21,35,18,2,1]},"stelpd1":{"title":"Stellated two out of 1 3 5 7 9 11 pentadekany","filename":"stelpd1.scl","rnbo":[71,385,384,45,44,33,32,21,20,135,128,77,72,15,14,189,176,693,640,35,32,495,448,9,8,55,48,297,256,7,6,33,28,189,160,105,88,77,64,135,112,27,22,315,256,99,80,5,4,81,64,165,128,21,16,297,224,385,288,27,20,693,512,15,11,11,8,45,32,63,44,231,160,35,24,165,112,189,128,3,2,385,256,55,36,49,32,135,88,99,64,25,16,63,40,35,22,77,48,45,28,105,64,33,20,5,3,27,16,55,32,7,4,99,56,315,176,231,128,11,6,297,160,15,8,121,64,21,11,77,40,27,14,495,256,35,18,55,28,63,32,2,1]},"stelpd1s":{"title":"Superstellated two out of 1 3 5 7 9 11 pentadekany","filename":"stelpd1s.scl","rnbo":[110,385,384,2079,2048,55,54,45,44,33,32,2079,2000,21,20,135,128,35,33,297,280,77,72,15,14,189,176,1485,1372,693,640,35,32,495,448,135,121,9,8,1155,1024,55,48,231,200,297,256,7,6,33,28,189,160,385,324,105,88,77,64,135,112,27,22,315,256,99,80,5,4,495,392,81,64,10395,8192,77,60,165,128,35,27,2079,1600,315,242,55,42,21,16,297,224,385,288,945,704,27,20,693,512,15,11,11,8,135,98,45,32,1890,1331,77,54,63,44,231,160,1485,1024,35,24,165,112,189,128,297,200,3,2,385,256,297,196,55,36,49,32,135,88,99,64,189,121,25,16,63,40,385,243,35,22,77,48,45,28,2079,1280,105,64,33,20,1485,896,5,3,165,98,27,16,3465,2048,189,110,55,32,693,400,210,121,7,4,135,77,99,56,385,216,315,176,231,128,11,6,945,512,297,160,15,8,189,100,121,64,1485,784,21,11,77,40,27,14,495,256,35,18,945,484,55,28,63,32,2,1]},"stelpent1":{"title":"Stellated one out of 1 3 5 7 9 pentany","filename":"stelpent1.scl","rnbo":[30,21,20,15,14,35,32,10,9,9,8,7,6,6,5,5,4,9,7,21,16,4,3,27,20,7,5,45,32,10,7,35,24,3,2,14,9,63,40,45,28,5,3,27,16,12,7,7,4,9,5,15,8,27,14,35,18,63,32,2,1]},"stelpent1s":{"title":"Superstellated one out of 1 3 5 7 9 pentany","filename":"stelpent1s.scl","rnbo":[55,28,27,21,20,135,128,15,14,27,25,35,32,54,49,10,9,9,8,280,243,7,6,189,160,6,5,135,112,60,49,315,256,5,4,63,50,9,7,35,27,21,16,4,3,27,20,135,98,7,5,45,32,10,7,35,24,189,128,40,27,3,2,189,125,54,35,14,9,540,343,63,40,45,28,105,64,5,3,42,25,27,16,12,7,140,81,7,4,9,5,90,49,945,512,28,15,15,8,189,100,40,21,27,14,35,18,63,32,2,1]},"steltet1":{"title":"Stellated one out of 1 3 5 7 tetrany","filename":"steltet1.scl","rnbo":[16,21,20,15,14,35,32,7,6,6,5,5,4,21,16,7,5,10,7,35,24,3,2,5,3,12,7,7,4,15,8,2,1]},"steltet1s":{"title":"Superstellated one out of 1 3 5 7 tetrany","filename":"steltet1s.scl","rnbo":[20,21,20,15,14,35,32,7,6,6,5,60,49,5,4,21,16,7,5,10,7,35,24,3,2,105,64,5,3,42,25,12,7,7,4,15,8,35,18,2,1]},"steltet2":{"title":"Stellated three out of 1 3 5 7 tetrany","filename":"steltet2.scl","rnbo":[16,49,48,25,24,35,32,7,6,5,4,245,192,21,16,35,24,3,2,49,32,25,16,5,3,7,4,175,96,15,8,2,1]},"steltri1":{"title":"Stellated one out of 1 3 5 triany","filename":"steltri1.scl","rnbo":[6,6,5,5,4,3,2,5,3,15,8,2,1]},"steltri2":{"title":"Stellated two out of 1 3 5 triany","filename":"steltri2.scl","rnbo":[6,9,8,5,4,3,2,25,16,15,8,2,1]},"sternbrocot4":{"title":"Level 4 of the Stern-Brocot tree","filename":"sternbrocot4.scl","rnbo":[16,6,5,5,4,9,7,4,3,11,8,7,5,10,7,3,2,11,7,8,5,13,8,5,3,12,7,7,4,9,5,2,1]},"stevin":{"title":"Simon Stevin, monochord division of 10000 parts for 12-tET (1585)","filename":"stevin.scl","rnbo":[12,5000,4719,10000,8909,10000,8409,625,496,10000,7491,10000,7071,5000,3337,5000,3149,1250,743,10000,5611,625,331,2,1]},"stopper":{"title":"Bernard Stopper, piano tuning with 19th root of 3 (1988)","filename":"stopper.scl","rnbo":[19,100.10289,0,200.20579,0,300.30868,0,400.41158,0,500.51447,0,600.61737,0,700.72026,0,800.82316,0,900.92605,0,1001.02895,0,1101.13184,0,1201.23474,0,1301.33763,0,1401.44053,0,1501.54342,0,1601.64632,0,1701.74921,0,1801.85211,0,3,1]},"storbeck":{"title":"Ulrich Storbeck 7-limit JI scale (2001)","filename":"storbeck.scl","rnbo":[21,10,9,9,8,8,7,7,6,6,5,5,4,35,27,4,3,27,20,48,35,35,24,40,27,3,2,54,35,8,5,5,3,12,7,7,4,16,9,9,5,2,1]},"strahle":{"title":"Daniel P. Stråhle's Geometrical scale (1743)","filename":"strahle.scl","rnbo":[12,211,199,109,97,25,21,29,23,239,179,41,29,253,169,65,41,89,53,137,77,281,149,2,1]},"studwacko":{"title":"Tweaked miracle41s.scl, Gene Ward Smith, 2010","filename":"studwacko.scl","rnbo":[41,33.60446,0,50.12246,0,83.22129,0,116.66878,0,150.11628,0,183.2151,0,199.73311,0,233.33756,0,266.53967,0,300.89382,0,316.92405,0,349.73617,0,383.66091,0,417.32974,0,432.94139,0,466.78427,0,500.17066,0,533.68151,0,549.3274,0,583.23392,0,616.58329,0,650.76422,0,666.40459,0,699.58485,0,733.75271,0,766.93297,0,782.57334,0,816.75427,0,850.10364,0,884.01016,0,899.65606,0,933.1669,0,966.55329,0,1000.39617,0,1016.00782,0,1049.67666,0,1083.60139,0,1116.41351,0,1132.44374,0,1166.7979,0,2,1]},"sub24-12":{"title":"Subharmonics 24-12. Phrygian Harmonia-Aliquot 24 (flute tuning)","filename":"sub24-12.scl","rnbo":[12,24,23,12,11,8,7,6,5,24,19,4,3,24,17,3,2,8,5,12,7,24,13,2,1]},"sub40":{"title":"Subharmonics 40-20","filename":"sub40.scl","rnbo":[12,20,19,10,9,20,17,5,4,4,3,10,7,20,13,8,5,5,3,20,11,40,21,2,1]},"sub50":{"title":"12 out of subharmonics 25-50","filename":"sub50.scl","rnbo":[12,25,24,10,9,25,21,5,4,25,19,10,7,25,17,25,16,5,3,25,14,50,27,2,1]},"sub8":{"title":"Subharmonics 16-8","filename":"sub8.scl","rnbo":[8,16,15,8,7,16,13,4,3,16,11,8,5,16,9,2,1]},"sullivan7":{"title":"John O'Sullivan, 7-limit just scale (2011)","filename":"sullivan7.scl","rnbo":[7,7,6,5,4,4,3,3,2,5,3,7,4,2,1]},"sullivan_blue":{"title":"John O'Sullivan, Blue Temperament (2010), many good intervals within 256/255","filename":"sullivan_blue.scl","rnbo":[12,121.56054,0,200.73393,0,313.52356,0,388.43145,0,501.22149,0,580.39508,0,3,2,816.86235,0,889.44038,0,1012.5144,0,1085.09234,0,2,1]},"sullivan_blueji":{"title":"John O'Sullivan, Blue JI, 7-limit Natural Pan Tuning (2007). 3/2 is also tonic","filename":"sullivan_blueji.scl","rnbo":[12,15,14,9,8,6,5,5,4,4,3,7,5,3,2,8,5,5,3,9,5,15,8,2,1]},"sullivan_cjv":{"title":"John O'Sullivan, 7-limit JI for Chris Vaisvil (2013)","filename":"sullivan_cjv.scl","rnbo":[22,16,15,15,14,10,9,9,8,8,7,7,6,6,5,5,4,9,7,4,3,7,5,10,7,3,2,14,9,8,5,5,3,12,7,7,4,16,9,9,5,15,8,2,1]},"sullivan_eagle":{"title":"John O'Sullivan, Eagle temperament (2016)","filename":"sullivan_eagle.scl","rnbo":[12,113.3313,0,9,8,6,5,5,4,4,3,584.1122,0,3,2,8,5,5,3,9,5,15,8,2,1]},"sullivan_raven":{"title":"John O'Sullivan, Raven temperament v2 (2012)","filename":"sullivan_raven.scl","rnbo":[12,113.8151,0,208.9919,0,6,5,5,4,4,3,577.4304,0,3,2,810.2984,0,425,256,967.132,0,32,17,2,1]},"sullivan_ravenji":{"title":"John O'Sullivan, Raven JI (2016)","filename":"sullivan_ravenji.scl","rnbo":[12,25,24,9,8,6,5,5,4,4,3,7,5,3,2,8,5,5,3,9,5,15,8,2,1]},"sullivan_sh":{"title":"John O'Sullivan, 7-limit Seventh Heaven scale (2011)","filename":"sullivan_sh.scl","rnbo":[12,15,14,8,7,7,6,9,7,21,16,7,5,10,7,14,9,12,7,7,4,27,14,2,1]},"sullivan_zen":{"title":"John O'Sullivan, 7-limit just Zen scale (2011)","filename":"sullivan_zen.scl","rnbo":[12,15,14,9,8,7,6,9,7,4,3,7,5,3,2,14,9,5,3,9,5,27,14,2,1]},"sullivan_zen2":{"title":"John O'Sullivan, Zen temperament (2011)","filename":"sullivan_zen2.scl","rnbo":[12,114.1,0,203.9,0,265.7,0,436.2,0,498.0,0,587.9,0,702.0,0,758.4,0,890.0,0,1011.9,0,1143.5,0,2,1]},"sumatra":{"title":"\"Archeological\" tuning of Pasirah Rus orch. in Muaralakitan, Sumatra. 1/1=354 Hz","filename":"sumatra.scl","rnbo":[9,33.899,0,372.566,0,537.929,0,695.422,0,1030.589,0,1224.281,0,1546.741,0,1737.929,0,3,1]},"super_10":{"title":"A superparticular 10-tone scale","filename":"super_10.scl","rnbo":[10,13,12,7,6,5,4,4,3,17,12,3,2,13,8,7,4,15,8,2,1]},"super_11":{"title":"A superparticular 11-tone scale","filename":"super_11.scl","rnbo":[11,13,12,7,6,5,4,4,3,17,12,3,2,8,5,17,10,9,5,19,10,2,1]},"super_12":{"title":"A superparticular 12-tone scale","filename":"super_12.scl","rnbo":[12,15,14,8,7,17,14,9,7,19,14,10,7,3,2,45,28,12,7,38,21,40,21,2,1]},"super_13":{"title":"A superparticular 13-tone scale","filename":"super_13.scl","rnbo":[13,17,16,9,8,19,16,5,4,21,16,11,8,23,16,3,2,8,5,17,10,9,5,19,10,2,1]},"super_15":{"title":"A superparticular 15-tone scale","filename":"super_15.scl","rnbo":[15,19,18,10,9,7,6,11,9,23,18,4,3,25,18,35,24,55,36,115,72,5,3,7,4,11,6,23,12,2,1]},"super_19":{"title":"A superparticular 19-tone scale","filename":"super_19.scl","rnbo":[19,25,24,13,12,9,8,7,6,29,24,5,4,13,10,27,20,7,5,29,20,3,2,39,25,81,50,42,25,87,50,9,5,28,15,29,15,2,1]},"super_19a":{"title":"Another superparticular 19-tone scale","filename":"super_19a.scl","rnbo":[19,26,25,27,25,28,25,29,25,6,5,56,45,58,45,4,3,25,18,13,9,3,2,39,25,81,50,42,25,87,50,9,5,28,15,29,15,2,1]},"super_19b":{"title":"Another superparticular 19-tone scale","filename":"super_19b.scl","rnbo":[19,33,32,17,16,9,8,37,32,19,16,39,32,5,4,21,16,11,8,23,16,3,2,25,16,13,8,27,16,7,4,29,16,15,8,31,16,2,1]},"super_22":{"title":"A superparticular 22-tone scale","filename":"super_22.scl","rnbo":[22,29,28,15,14,31,28,8,7,33,28,17,14,5,4,31,24,4,3,11,8,17,12,35,24,3,2,87,56,45,28,93,56,12,7,62,35,64,35,66,35,68,35,2,1]},"super_22a":{"title":"Another superparticular 22-tone scale","filename":"super_22a.scl","rnbo":[22,26,25,27,25,28,25,29,25,6,5,87,70,9,7,93,70,48,35,99,70,51,35,3,2,31,20,8,5,33,20,17,10,7,4,9,5,37,20,19,10,39,20,2,1]},"super_24":{"title":"Superparticular 24-tone scale, inverse of Mans.ur 'Awad","filename":"super_24.scl","rnbo":[24,31,30,16,15,11,10,17,15,7,6,6,5,37,30,19,15,13,10,4,3,11,8,17,12,35,24,3,2,31,20,8,5,33,20,17,10,7,4,9,5,37,20,19,10,39,20,2,1]},"super_8":{"title":"A superparticular 8-tone scale","filename":"super_8.scl","rnbo":[8,11,10,6,5,13,10,7,5,3,2,5,3,11,6,2,1]},"super_9":{"title":"A superparticular 9-tone scale","filename":"super_9.scl","rnbo":[9,11,10,6,5,13,10,7,5,3,2,13,8,7,4,15,8,2,1]},"superclipgenus19":{"title":"Mode of Genus [333357] with 567/512 removed, <19 30 42 55| superwakalix","filename":"superclipgenus19.scl","rnbo":[19,21,20,16,15,9,8,7,6,6,5,56,45,21,16,4,3,7,5,64,45,3,2,14,9,8,5,7,4,16,9,9,5,28,15,63,32,2,1]},"superfif7a":{"title":"3/2 repeating 12-tET patent val. August-Dominant-Diminished-Pajara-Injera-Schism superduperwakalix","filename":"superfif7a.scl","rnbo":[7,15,14,10,9,7,6,5,4,4,3,10,7,3,2]},"superfif7b":{"title":"3/2 repeating 12-tET patent val August-Dominant-Diminished-Pajara-Injera-Meantone superduperwakalix","filename":"superfif7b.scl","rnbo":[7,15,14,8,7,6,5,9,7,4,3,10,7,3,2]},"supermagic15":{"title":"Supermagic[15] hobbit in 5-limit minimax tuning","filename":"supermagic15.scl","rnbo":[15,59.7214,0,176.9282,0,236.6496,0,321.1168,0,380.8382,0,4,3,557.7664,0,642.2336,0,3,2,819.1618,0,878.8832,0,963.3504,0,1023.0718,0,1140.2786,0,2,1]},"supertriskaideka":{"title":"13d superwakalix","filename":"supertriskaideka.scl","rnbo":[13,15,14,11,10,33,28,44,35,4,3,11,8,22,15,11,7,8,5,12,7,11,6,66,35,2,1]},"suppig":{"title":"Friedrich Suppig's 19-tone JI scale. Calculus Musicus, Berlin 1722","filename":"suppig.scl","rnbo":[19,25,24,16,15,9,8,75,64,6,5,5,4,125,96,4,3,45,32,36,25,3,2,25,16,8,5,5,3,225,128,9,5,15,8,48,25,2,1]},"surupan_7":{"title":"7-tone surupan (Sunda)","filename":"surupan_7.scl","rnbo":[7,120.0,0,390.0,0,510.0,0,660.0,0,780.0,0,1050.0,0,2,1]},"surupan_9":{"title":"Theoretical nine-tone surupan gamut","filename":"surupan_9.scl","rnbo":[9,120.0,0,270.0,0,390.0,0,510.0,0,660.0,0,780.0,0,930.0,0,1050.0,0,2,1]},"surupan_ajeng":{"title":"Surupan ajeng, West-Java","filename":"surupan_ajeng.scl","rnbo":[5,150.0,0,270.0,0,660.0,0,810.0,0,2,1]},"surupan_degung":{"title":"Surupan degung, Sunda","filename":"surupan_degung.scl","rnbo":[5,360.0,0,480.0,0,720.0,0,1080.0,0,2,1]},"surupan_madenda":{"title":"Surupan madenda","filename":"surupan_madenda.scl","rnbo":[5,360.0,0,480.0,0,840.0,0,1080.0,0,2,1]},"surupan_melog":{"title":"Surupan melog jawar, West-Java","filename":"surupan_melog.scl","rnbo":[5,120.0,0,270.0,0,660.0,0,780.0,0,2,1]},"surupan_miring":{"title":"Surupan miring, West-Java","filename":"surupan_miring.scl","rnbo":[5,150.0,0,270.0,0,690.0,0,810.0,0,2,1]},"surupan_x":{"title":"Surupan tone-gender X (= unmodified nyorog)","filename":"surupan_x.scl","rnbo":[5,120.0,0,270.0,0,660.0,0,810.0,0,2,1]},"surupan_y":{"title":"Surupan tone-gender Y (= mode on pamiring)","filename":"surupan_y.scl","rnbo":[5,120.0,0,240.0,0,660.0,0,780.0,0,2,1]},"sverige":{"title":"Scale on Swedish 50 crown banknote with Swedish fiddle","filename":"sverige.scl","rnbo":[24,200.0,0,400.0,0,500.0,0,700.0,0,900.0,0,1000.0,0,1100.0,0,2,1,1300.0,0,1400.0,0,1500.0,0,1600.0,0,1700.0,0,1800.0,0,1900.0,0,2000.0,0,2100.0,0,2200.0,0,2300.0,0,4,1,2600.0,0,2800.0,0,2900.0,0,3100.0,0]},"swet1":{"title":"Swetismic tempering of [7/6, 9/7, 3/2, 11/6, 2], 578-tET tuning","filename":"swet1.scl","rnbo":[5,267.82007,0,433.91003,0,701.7301,0,1050.51903,0,2,1]},"swet2":{"title":"Swetismic tempering of [7/6, 9/7, 3/2, 18/11, 2], 578-tET tuning","filename":"swet2.scl","rnbo":[5,267.82007,0,433.91003,0,701.7301,0,851.21107,0,2,1]},"swet3":{"title":"Swetismic tempering of [7/6, 10/7, 5/3, 11/6, 2], 578-tET tuning","filename":"swet3.scl","rnbo":[5,267.82007,0,616.609,0,884.42907,0,1050.51903,0,2,1]},"swet4":{"title":"Swetismic tempering of [7/6, 10/7, 5/3, 20/11, 2], 578-tET tuning","filename":"swet4.scl","rnbo":[5,267.82007,0,616.609,0,884.42907,0,1033.91003,0,2,1]},"swet5":{"title":"Swetismic tempering of [7/6, 9/7, 10/7, 11/6, 2], 578-tET tuning","filename":"swet5.scl","rnbo":[5,267.82007,0,433.91003,0,616.609,0,1050.51903,0,2,1]},"swet6":{"title":"Swetismic tempering of [9/7, 10/7, 11/7, 11/6, 2], 578-tET tuning","filename":"swet6.scl","rnbo":[5,433.91003,0,616.609,0,782.69896,0,1050.51903,0,2,1]},"syntonolydian":{"title":"Greek Syntonolydian, also genus duplicatum medium, or ditonum (Al-Farabi)","filename":"syntonolydian.scl","rnbo":[7,9,8,81,64,729,512,3,2,27,16,243,128,2,1]},"syrian":{"title":"d'Erlanger vol.5, p. 29. After ^Sayh.'Ali ad-Darwis^ (Shaykh Darvish)","filename":"syrian.scl","rnbo":[30,800,779,256,243,2187,2048,35073,32000,9,8,500,433,32,27,19683,16384,315657,256000,8192,6561,81,64,1299,1000,4,3,16000,11691,1024,729,729,512,11691,8000,3,2,2000,1299,128,81,6561,4096,105219,64000,27,16,433,250,16,9,64000,35073,4096,2187,243,128,3897,2000,2,1]},"t-side":{"title":"Tau-on-Side","filename":"t-side.scl","rnbo":[12,25,24,16,15,9,8,5,4,4,3,45,32,3,2,25,16,8,5,5,3,15,8,2,1]},"t-side2":{"title":"Tau-on-Side opposite","filename":"t-side2.scl","rnbo":[12,9,8,75,64,6,5,5,4,4,3,45,32,3,2,5,3,225,128,9,5,15,8,2,1]},"tagawa_55":{"title":"Rick Tagawa, 17-limit diamond subset with good 72-tET approximation (2003)","filename":"tagawa_55.scl","rnbo":[55,18,17,17,16,16,15,15,14,14,13,13,12,12,11,11,10,10,9,9,8,17,15,8,7,15,13,7,6,20,17,13,11,6,5,11,9,5,4,14,11,9,7,4,3,15,11,11,8,18,13,7,5,24,17,17,12,10,7,13,9,16,11,22,15,3,2,14,9,11,7,8,5,18,11,5,3,22,13,17,10,12,7,26,15,7,4,30,17,16,9,9,5,20,11,11,6,24,13,13,7,28,15,15,8,32,17,17,9,2,1]},"tamil":{"title":"Possible Tamil sruti scale. Alternative 11th sruti is 45/32 or 64/45","filename":"tamil.scl","rnbo":[22,256,243,16,15,10,9,9,8,32,27,6,5,5,4,81,64,4,3,27,20,729,512,40,27,3,2,128,81,8,5,5,3,27,16,16,9,9,5,15,8,243,128,2,1]},"tamil_vi":{"title":"Vilarippalai scale in Tamil music, Vidyasankar Sundaresan","filename":"tamil_vi.scl","rnbo":[12,256,243,10,9,32,27,5,4,4,3,45,32,40,27,128,81,5,3,16,9,15,8,2,1]},"tamil_vi2":{"title":"Vilarippalai scale with 1024/729 tritone","filename":"tamil_vi2.scl","rnbo":[12,256,243,10,9,32,27,5,4,4,3,1024,729,40,27,128,81,5,3,16,9,15,8,2,1]},"tanaka":{"title":"26-note choice system of Shohé Tanaka, Studien i.G.d. reinen Stimmung (1890)","filename":"tanaka.scl","rnbo":[26,25,24,135,128,16,15,10,9,9,8,75,64,6,5,5,4,81,64,675,512,4,3,27,20,25,18,45,32,64,45,40,27,3,2,25,16,8,5,5,3,27,16,225,128,16,9,9,5,15,8,2,1]},"tanbur":{"title":"Sub-40 tanbur scale","filename":"tanbur.scl","rnbo":[12,40,39,20,19,40,37,10,9,8,7,320,273,160,133,320,259,80,63,64,49,160,119,2,1]},"tansur":{"title":"William Tans'ur temperament from A New Musical Grammar (1746) p. 73","filename":"tansur.scl","rnbo":[12,90.79526,0,197.2063,0,32,27,392.56607,0,4,3,588.84026,0,699.08516,0,792.75026,0,894.03623,0,16,9,1089.94363,0,2,1]},"tapek-ribbon":{"title":"Eq-diff ribbon extension of Superpyth, made of two Tapek sequences","filename":"tapek-ribbon.scl","rnbo":[12,1777,1656,627,552,173,138,4273,3312,1465,1104,131,92,104,69,3673,2208,945,552,243,138,1043,552,2,1]},"tartini_7":{"title":"Tartini (1754) with 2 neochromatic tetrachords, 1/1=d, Minor Gipsy (Slovakia)","filename":"tartini_7.scl","rnbo":[7,9,8,6,5,45,32,3,2,8,5,15,8,2,1]},"taylor_g":{"title":"Gregory Taylor's Dutch train ride scale based on pelog_schmidt","filename":"taylor_g.scl","rnbo":[12,21,20,11,10,9,8,6,5,27,20,7,5,3,2,63,40,8,5,33,20,9,5,2,1]},"taylor_n":{"title":"Nigel Taylor's Circulating Balanced temperament (20th cent.)","filename":"taylor_n.scl","rnbo":[12,92.18,0,194.135,0,296.09,0,388.26999,0,4,3,590.225,0,697.0675,0,794.135,0,891.2025,0,998.045,0,1090.225,0,2,1]},"telemann":{"title":"G.Ph. Telemann (1767). 55-tET interpretation of Klang- und Intervallen-Tafel","filename":"telemann.scl","rnbo":[44,21.81818,0,65.45455,0,87.27273,0,109.09091,0,130.90909,0,174.54545,0,196.36364,0,218.18182,0,240.0,0,261.81818,0,283.63636,0,305.45455,0,327.27273,0,370.90909,0,392.72727,0,414.54545,0,436.36364,0,480.0,0,501.81818,0,523.63636,0,567.27273,0,589.09091,0,610.90909,0,632.72727,0,676.36364,0,698.18182,0,720.0,0,763.63636,0,785.45455,0,807.27273,0,829.09091,0,872.72727,0,894.54545,0,916.36364,0,938.18182,0,981.81818,0,1003.63636,0,1025.45455,0,1069.09091,0,1090.90909,0,1112.72727,0,1134.54545,0,1178.18182,0,2,1]},"telemann_28":{"title":"Telemann's tuning as described on Sorge's monochord, 1746, 1748, 1749","filename":"telemann_28.scl","rnbo":[28,21.81818,0,87.27273,0,109.09091,0,196.36364,0,218.18182,0,283.63636,0,305.45455,0,392.72727,0,414.54545,0,480.0,0,501.81818,0,523.63636,0,589.09091,0,610.90909,0,676.36364,0,698.18182,0,720.0,0,763.63636,0,785.45455,0,894.54545,0,916.36364,0,981.81818,0,1003.63636,0,1025.45455,0,1090.90909,0,1112.72727,0,1178.18182,0,2,1]},"temes-mix":{"title":"Temes' 5-tone Phi scale mixed with its octave inverse","filename":"temes-mix.scl","rnbo":[9,273.024,0,366.9097,0,466.181,0,560.067,0,639.934,0,733.82,0,833.0903,0,926.977,0,2,1]},"temes":{"title":"Lorne Temes' 5-tone phi scale (1970)","filename":"temes.scl","rnbo":[5,273.024,0,366.91,0,466.181,0,560.067,0,833.0903,0]},"temes2-mix":{"title":"Temes' 2 cycle Phi scale mixed with its 4/1 inverse","filename":"temes2-mix.scl","rnbo":[18,273.024,0,366.9097,0,466.181,0,560.067,0,733.82,0,833.0903,0,1006.844,0,1106.114,0,2,1,1293.887,0,1393.157,0,1566.9097,0,1666.18,0,1839.934,0,1933.82,0,2033.0903,0,2126.977,0,4,1]},"temes2":{"title":"Lorne Temes' 5-tone Phi scale / 2 cycle (1970)","filename":"temes2.scl","rnbo":[10,273.024,0,366.91,0,466.181,0,560.067,0,833.0903,0,1106.114,0,2,1,1299.271,0,1393.157,0,1666.18059,0]},"temp10ebss":{"title":"Cycle of 10 equal \"beating\" 15/14's","filename":"temp10ebss.scl","rnbo":[10,120.18917,0,240.3283,0,360.42075,0,480.46967,0,600.47799,0,720.44845,0,840.38358,0,960.28577,0,1080.15722,0,2,1]},"temp11ebst":{"title":"Cycle of 11 equal beating 9/7's","filename":"temp11ebst.scl","rnbo":[11,109.34585,0,218.44143,0,327.30253,0,436.8033,0,546.04397,0,655.04102,0,763.8098,0,873.22337,0,982.38238,0,1091.30292,0,2,1]},"temp12b2w":{"title":"The fifths on black keys beat twice the amount of fifths on white keys","filename":"temp12b2w.scl","rnbo":[12,102.71339,0,200.80173,0,300.76028,0,401.94413,0,499.4419,0,603.39032,0,700.09071,0,801.1529,0,901.0967,0,999.58015,0,1102.42126,0,2,1]},"temp12b2w19":{"title":"Just twelfth and fifths on black keys beat twice the amount of fifths on white keys, 3/1 period","filename":"temp12b2w19.scl","rnbo":[19,101.98326,0,200.95822,0,300.32321,0,402.24018,0,499.7904,0,603.31789,0,700.55742,0,801.30205,0,901.66886,0,999.92755,0,1103.08745,0,1200.69837,0,1303.29986,0,1401.58007,0,1501.49734,0,1602.79378,0,1700.31367,0,1804.30356,0,3,1]},"temp12b2ws":{"title":"Stretched octave and fifths on black keys beat twice the amount of fifths on white keys","filename":"temp12b2ws.scl","rnbo":[12,102.35052,0,200.7656,0,300.77112,0,401.82104,0,499.73281,0,603.13491,0,700.36828,0,801.31305,0,901.30769,0,1000.05795,0,1102.51811,0,1200.49907,0]},"temp12bf1":{"title":"Temperament with fifths beating 1.0 Hz at 1/1=256 Hz","filename":"temp12bf1.scl","rnbo":[12,101.99734,0,200.1489,0,298.98883,0,400.70883,0,499.73483,0,601.63553,0,699.69932,0,801.8258,0,900.09464,0,999.04612,0,1100.87447,0,2,1]},"temp12eb46o":{"title":"Equal temperament with equal beating 4/1 = 6/1 opposite","filename":"temp12eb46o.scl","rnbo":[12,100.04159,0,200.08318,0,300.12477,0,400.16636,0,500.20794,0,600.24953,0,700.29112,0,800.33271,0,900.3743,0,1000.41589,0,1100.45748,0,1200.49907,0]},"temp12eb46o2":{"title":"Equal temperament with equal beating 4/1 = 6/1 twice opposite. Almost equal to hinrichsen","filename":"temp12eb46o2.scl","rnbo":[12,100.05012,0,200.10025,0,300.15037,0,400.20049,0,500.25062,0,600.30074,0,700.35086,0,800.40099,0,900.45111,0,1000.50123,0,1100.55136,0,1200.60148,0]},"temp12ebf":{"title":"Equal beating temperament, Barthold Fritz (1756), The Best Factory Tuners (1840)","filename":"temp12ebf.scl","rnbo":[12,100.03402,0,199.51879,0,299.79965,0,399.516,0,500.01741,0,599.94075,0,699.32161,0,799.50359,0,899.12725,0,999.54025,0,1099.38074,0,2,1]},"temp12ebf4":{"title":"Eleven equal beating fifths and just fourth","filename":"temp12ebf4.scl","rnbo":[12,1522037,1437621,1612853,1437621,1707821,1437621,1809989,1437621,4,3,2031767,1437621,2152855,1437621,2279479,1437621,2415703,1437621,2558155,1437621,2711407,1437621,2,1]},"temp12ebfo":{"title":"Equal beating fifths and fifth beats equal octave opposite at C","filename":"temp12ebfo.scl","rnbo":[12,100.16688,0,200.08089,0,300.36118,0,400.38196,0,500.76339,0,600.87937,0,700.74546,0,800.98036,0,900.9584,0,1001.29935,0,1101.37723,0,1201.81274,0]},"temp12ebfo2o":{"title":"Equal beating fifths and fifth beats twice octave opposite at C","filename":"temp12ebfo2o.scl","rnbo":[12,100.12507,0,199.90373,0,300.18427,0,400.10916,0,500.52841,0,600.58372,0,700.29676,0,800.51506,0,900.3814,0,1000.74512,0,1100.74823,0,1201.24166,0]},"temp12ebfp":{"title":"All fifths except G#-Eb beat same as 700 c. C-G","filename":"temp12ebfp.scl","rnbo":[12,103.55897,0,200.65044,0,298.34297,0,401.65789,0,499.5098,0,602.98376,0,700.0,0,803.67255,0,900.86449,0,998.65259,0,1102.06287,0,2,1]},"temp12ebfr":{"title":"Exact values of equal beating temperament of Best Factory Tuners (1840)","filename":"temp12ebfr.scl","rnbo":[12,1662005,1568693,1760309,1568693,1865285,1568693,1975877,1568693,2093975,1568693,10223,7229,2349463,1568693,355633,224099,2636887,1568693,399193,224099,2960239,1568693,2,1]},"temp12ep":{"title":"Pythagorean comma distributed equally over octave and fifth: 1/19-Pyth comma","filename":"temp12ep.scl","rnbo":[12,100.10289,0,200.20579,0,300.30868,0,400.41158,0,500.51447,0,600.61737,0,700.72026,0,800.82316,0,900.92605,0,1001.02895,0,1101.13184,0,1201.23474,0]},"temp12fo1o":{"title":"Fifth beats equal octave opposite","filename":"temp12fo1o.scl","rnbo":[12,100.13028,0,200.26056,0,300.39084,0,400.52112,0,500.65141,0,600.78169,0,700.91197,0,801.04225,0,901.17253,0,1001.30281,0,1101.43309,0,1201.56337,0]},"temp12fo2o":{"title":"Fifth beats twice octave opposite","filename":"temp12fo2o.scl","rnbo":[12,100.08496,0,200.16992,0,300.25488,0,400.33984,0,500.4248,0,600.50976,0,700.59472,0,800.67968,0,900.76463,0,1000.84959,0,1100.93455,0,1201.01951,0]},"temp12k4":{"title":"Temperament with 4 1/4-comma fifths","filename":"temp12k4.scl","rnbo":[12,91.44607,0,193.15686,0,294.86764,0,5,4,498.28921,0,589.73529,0,696.57843,0,793.15686,0,889.73529,0,996.57843,0,1088.0245,0,2,1]},"temp12p10":{"title":"1/10-Pyth. comma well temperament","filename":"temp12p10.scl","rnbo":[12,99.609,0,199.218,0,298.827,0,398.436,0,500.391,0,597.654,0,699.609,0,799.218,0,898.827,0,998.436,0,1098.045,0,2,1]},"temp12p6":{"title":"Modified 1/6-Pyth. comma 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20","filename":"tenn41b.scl","rnbo":[41,55,54,25,24,81,77,15,14,27,25,10,9,9,8,8,7,7,6,25,21,6,5,27,22,5,4,63,50,9,7,21,16,4,3,27,20,25,18,7,5,10,7,36,25,40,27,3,2,32,21,14,9,100,63,8,5,44,27,5,3,27,16,12,7,7,4,16,9,9,5,50,27,15,8,154,81,27,14,49,25,2,1]},"tenn41c":{"title":"53&118 Tenney reduced fifths from -20 to 20","filename":"tenn41c.scl","rnbo":[41,81,80,25,24,256,243,2187,2048,27,25,10,9,9,8,729,640,88,75,32,27,19683,16384,100,81,8192,6561,81,64,32,25,33,25,4,3,27,20,25,18,1024,729,729,512,36,25,40,27,3,2,243,160,25,16,128,81,6561,4096,81,50,32768,19683,27,16,75,44,44,25,16,9,9,5,50,27,4096,2187,243,128,48,25,99,50,2,1]},"tenney_11":{"title":"Scale of James Tenney's \"Spectrum II\" (1995) for wind quintet","filename":"tenney_11.scl","rnbo":[11,17,16,9,8,19,16,5,4,21,16,11,8,3,2,25,16,13,8,7,4,2,1]},"tenney_8":{"title":"James Tenney, first eight primes octatonic","filename":"tenney_8.scl","rnbo":[8,17,16,19,16,5,4,11,8,3,2,13,8,7,4,2,1]},"terrain":{"title":"JI version of generated scale for 63/50 and 10/9 effectively 250047/250000 (landscape) tempering in 2.9/5.9/7 subgroup","filename":"terrain.scl","rnbo":[12,50,49,10,9,500,441,63,50,9,7,7,5,10,7,100,63,81,50,441,250,9,5,2,1]},"tertia78":{"title":"Tertiaseptal[78] in 140-tET 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2048/2025 and 262144/253125 scale","filename":"tertiadia.scl","rnbo":[12,16,15,256,225,75,64,5,4,4,3,64,45,3,2,8,5,3375,2048,225,128,15,8,2,1]},"tertiadie":{"title":"First Tertiadie 262144/253125 and 128/125 scale","filename":"tertiadie.scl","rnbo":[12,16,15,256,225,75,64,5,4,4,3,64,45,375,256,25,16,5,3,2048,1125,15,8,2,1]},"tet3a":{"title":"Eight notes, two major one minor tetrad","filename":"tet3a.scl","rnbo":[8,15,14,6,5,9,7,7,5,3,2,8,5,12,7,2,1]},"tetragam-di":{"title":"Tetragam Dia2","filename":"tetragam-di.scl","rnbo":[12,16,15,10,9,10,9,5,4,4,3,64,45,3,2,8,5,5,3,5,3,7,4,2,1]},"tetragam-enh":{"title":"Tetragam Enharm.","filename":"tetragam-enh.scl","rnbo":[12,28,27,16,15,16,15,5,4,4,3,7,5,3,2,14,9,8,5,8,5,7,4,2,1]},"tetragam-hex":{"title":"Tetragam/Hexgam","filename":"tetragam-hex.scl","rnbo":[12,28,27,9,8,7,6,5,4,21,16,35,24,3,2,14,9,5,3,7,4,15,8,2,1]},"tetragam-py":{"title":"Tetragam 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(13-tET)","filename":"tetragam13.scl","rnbo":[12,92.308,0,276.923,0,276.923,0,461.538,0,461.538,0,738.462,0,738.462,0,923.077,0,923.077,0,923.077,0,1107.692,0,2,1]},"tetragam5":{"title":"Tetragam (5-tET)","filename":"tetragam5.scl","rnbo":[12,240.0,0,240.0,0,240.0,0,240.0,0,480.0,0,480.0,0,720.0,0,960.0,0,960.0,0,960.0,0,960.0,0,2,1]},"tetragam7":{"title":"Tetragam (7-tET)","filename":"tetragam7.scl","rnbo":[12,171.429,0,171.429,0,171.429,0,342.857,0,514.286,0,514.286,0,685.714,0,857.143,0,857.143,0,857.143,0,1028.571,0,2,1]},"tetragam8":{"title":"Tetragam (8-tET)","filename":"tetragam8.scl","rnbo":[12,150.0,0,300.0,0,300.0,0,450.0,0,450.0,0,750.0,0,750.0,0,900.0,0,900.0,0,900.0,0,900.0,0,2,1]},"tetragam9a":{"title":"Tetragam (9-tET) A","filename":"tetragam9a.scl","rnbo":[12,133.333,0,266.667,0,266.667,0,400.0,0,533.333,0,800.0,0,800.0,0,933.333,0,933.333,0,933.333,0,1066.667,0,2,1]},"tetragam9b":{"title":"Tetragam (9-tET) B","filename":"tetragam9b.scl","rnbo":[12,133.333,0,133.333,0,133.333,0,266.667,0,266.667,0,666.667,0,666.667,0,800.0,0,800.0,0,800.0,0,933.333,0,2,1]},"tetraphonic_31":{"title":"31-tone Tetraphonic Cycle, conjunctive form on 5/4, 6/5, 7/6 and 8/7","filename":"tetraphonic_31.scl","rnbo":[31,50,49,25,24,50,47,25,23,10,9,25,22,50,43,25,21,50,41,5,4,60,47,30,23,4,3,15,11,60,43,10,7,60,41,3,2,49,32,147,94,147,92,49,30,147,88,147,86,7,4,84,47,42,23,28,15,21,11,84,43,2,1]},"tetratriad":{"title":"4:5:6 Tetratriadic scale","filename":"tetratriad.scl","rnbo":[9,9,8,5,4,4,3,45,32,3,2,5,3,27,16,15,8,2,1]},"tetratriad1":{"title":"3:5:9 Tetratriadic scale","filename":"tetratriad1.scl","rnbo":[9,10,9,9,8,5,4,4,3,3,2,5,3,27,16,15,8,2,1]},"tetratriad2":{"title":"3:5:7 Tetratriadic scale","filename":"tetratriad2.scl","rnbo":[9,245,216,7,6,49,36,10,7,343,216,5,3,12,7,35,18,2,1]},"thailand":{"title":"Observed ranat tuning from Thailand, Helmholtz/Ellis p. 518, nr.85","filename":"thailand.scl","rnbo":[7,129.0,0,277.0,0,508.0,0,726.0,0,771.0,0,1029.0,0,1254.0,0]},"thailand2":{"title":"Observed ranat t'hong tuning, Helmholtz/Ellis p. 518","filename":"thailand2.scl","rnbo":[7,200.0,0,340.0,0,537.0,0,699.0,0,881.0,0,1043.0,0,1207.0,0]},"thailand3":{"title":"Observed tak'hay tuning. Helmholtz, p. 518","filename":"thailand3.scl","rnbo":[7,198.0,0,362.0,0,528.0,0,720.0,0,890.0,0,1080.0,0,1250.0,0]},"thailand4":{"title":"Khong mon (bronze percussion vessels) tuning, Gemeentemuseum Den Haag. 1/1=465 Hz","filename":"thailand4.scl","rnbo":[15,129.09586,0,262.07745,0,415.1129,0,703.19558,0,804.35347,0,984.18181,0,2,1,1329.09586,0,1462.07745,0,1616.57694,0,1904.43528,0,2002.01238,0,2186.28921,0,4,1,2529.09586,0]},"thailand5":{"title":"Observed Siamese scale, C. Stumpf, Tonsystem und Musik der Siamesen, 1901, p.137. 1/1=423 Hz","filename":"thailand5.scl","rnbo":[7,182.40371,0,344.05608,0,522.42898,0,686.88282,0,864.60119,0,1037.04094,0,2,1]},"thailand6":{"title":"Theoretical equal tempered Thai scale","filename":"thailand6.scl","rnbo":[7,172.85714,0,345.71429,0,518.57143,0,691.42857,0,864.28571,0,1037.14286,0,1210.0,0]},"thirds":{"title":"Major and minor thirds parallellogram. Fokker block 81/80 128/125","filename":"thirds.scl","rnbo":[12,25,24,10,9,6,5,5,4,4,3,25,18,3,2,8,5,5,3,125,72,48,25,2,1]},"thirteendene":{"title":"Detempered 2.3.5.7.13 transversal of marveldene, hecate (225/224, 325/324, 385/384) version","filename":"thirteendene.scl","rnbo":[12,13,12,9,8,6,5,9,7,27,20,13,9,3,2,8,5,27,16,9,5,27,14,2,1]},"thirteenten":{"title":"Tarkan Grood's 2.3.13/5 scale","filename":"thirteenten.scl","rnbo":[9,40,39,15,13,13,10,4,3,3,2,20,13,45,26,39,20,2,1]},"thomas":{"title":"Tuning of the Thomas/Philpott organ, Gereformeerde Kerk, St. Jansklooster","filename":"thomas.scl","rnbo":[12,122.48,0,205.87,0,6,5,412.71,0,504.89,0,621.51,0,16384,10935,822.48,0,907.82,0,1009.76,0,1119.55,0,2,1]},"thrush12":{"title":"Thrush[12] (126/125, 176/175) hobbit in the POTE tuning","filename":"thrush12.scl","rnbo":[12,80.43583,0,230.31897,0,310.7548,0,391.19062,0,498.05458,0,578.49041,0,701.94542,0,808.80938,0,889.2452,0,969.68103,0,1119.56417,0,2,1]},"thrush15":{"title":"Thrush[15] hobbit 7&9 limit minimax tuning, commas 126/125, 176/175","filename":"thrush15.scl","rnbo":[15,79.86894,0,159.73788,0,8,7,311.04303,0,390.91197,0,4,3,577.91394,0,622.08606,0,3,2,809.08803,0,888.95697,0,7,4,1040.26212,0,1120.13106,0,2,1]},"thunor46":{"title":"Thunor[46] hobbit in 494-tET, commas 4375/4374, 3025/3024, 1716/1715","filename":"thunor46.scl","rnbo":[46,31.57895,0,48.583,0,80.16194,0,102.02429,0,133.60324,0,150.60729,0,182.18623,0,213.76518,0,235.62753,0,262.34818,0,284.21053,0,315.78947,0,332.79352,0,364.37247,0,395.95142,0,417.81377,0,449.39271,0,466.39676,0,497.97571,0,519.83806,0,546.5587,0,568.42105,0,600.0,0,631.57895,0,648.583,0,680.16194,0,702.02429,0,733.60324,0,750.60729,0,782.18623,0,813.76518,0,835.62753,0,862.34818,0,884.21053,0,915.78947,0,932.79352,0,964.37247,0,995.95142,0,1017.81377,0,1049.39271,0,1066.39676,0,1097.97571,0,1119.83806,0,1146.5587,0,1168.42105,0,2,1]},"tiby1":{"title":"Tiby's 1st Byzantine Liturgical genus, 12 + 13 + 3 parts","filename":"tiby1.scl","rnbo":[7,211.76471,0,441.17647,0,494.11765,0,705.88235,0,917.64706,0,1147.05882,0,2,1]},"tiby2":{"title":"Tiby's second Byzantine Liturgical genus, 12 + 5 + 11 parts","filename":"tiby2.scl","rnbo":[7,211.76471,0,300.0,0,494.11765,0,705.88235,0,917.64706,0,1005.88235,0,2,1]},"tiby3":{"title":"Tiby's third Byzantine Liturgical genus, 12 + 9 + 7 parts","filename":"tiby3.scl","rnbo":[7,211.76471,0,370.58824,0,494.11765,0,705.88235,0,917.64706,0,1076.47059,0,2,1]},"tiby4":{"title":"Tiby's fourth Byzantine Liturgical genus, 9 + 12 + 7 parts","filename":"tiby4.scl","rnbo":[7,158.82353,0,370.58824,0,494.11765,0,705.88235,0,864.70588,0,1076.47059,0,2,1]},"tickner_whirlwind":{"title":"Jack Tickner Scale","filename":"tickner_whirlwind.scl","rnbo":[22,33,32,77,72,12,11,8,7,7,6,77,64,96,77,9,7,4,3,11,8,108,77,16,11,3,2,14,9,77,48,128,77,12,7,7,4,11,6,144,77,64,33,2,1]},"timbila1":{"title":"Timbila from Chopi tuning. 1/1=248 Hz, Tracey TR-198 A-1,2","filename":"timbila1.scl","rnbo":[7,69,62,77,62,42,31,3,2,103,62,57,31,2,1]},"timbila2":{"title":"Timbila from Chopi tuning. 1/1=248 Hz, Tracey TR-200 B-3","filename":"timbila2.scl","rnbo":[7,34,31,75,62,42,31,3,2,103,62,56,31,2,1]},"timbila3":{"title":"Timbila from Chopi tuning. 1/1=248 Hz, Tracey TR-202 B-4","filename":"timbila3.scl","rnbo":[7,69,62,75,62,81,62,45,31,101,62,55,31,2,1]},"timbila4":{"title":"Timbila from Chopi tuning. 1/1=248 Hz, Tracey TR-206","filename":"timbila4.scl","rnbo":[7,75,62,83,62,46,31,101,62,56,31,61,31,2,1]},"timbila5":{"title":"Timbila from Chopi tuning. 1/1=268 Hz, Tracey TR-207 A-1,2,3","filename":"timbila5.scl","rnbo":[7,75,67,82,67,91,67,100,67,110,67,122,67,2,1]},"timbila6":{"title":"Timbila from Chopi tuning. 1/1=268 Hz, Tracey TR-207 A-4,5,6","filename":"timbila6.scl","rnbo":[7,76,67,84,67,90,67,100,67,110,67,122,67,2,1]},"timbila7":{"title":"Timbila from Chopi tuning. 1/1=248 Hz, Tracey TR-207 B-4,5","filename":"timbila7.scl","rnbo":[7,34,31,37,31,41,31,91,62,101,62,56,31,2,1]},"timbila8":{"title":"Timbila from Chopi tuning. 1/1=248 Hz, Tracey TR-208 B-2,3,4,5","filename":"timbila8.scl","rnbo":[7,34,31,75,62,41,31,91,62,101,62,56,31,2,1]},"todi_av":{"title":"Average of 8 interpretations of raga Todi, in B. 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J. Kunst, Music in Java, p. 584.","filename":"trawas.scl","rnbo":[5,306.15505,0,541.48577,0,711.38954,0,1039.53077,0,2,1]},"tri12-1":{"title":"12-tone Tritriadic of 7:9:11","filename":"tri12-1.scl","rnbo":[12,99,98,81,77,11,9,121,98,14,11,9,7,14,9,11,7,18,11,81,49,121,63,2,1]},"tri12-2":{"title":"12-tone Tritriadic of 6:7:9","filename":"tri12-2.scl","rnbo":[12,9,8,7,6,9,7,4,3,49,36,3,2,14,9,12,7,7,4,49,27,27,14,2,1]},"tri19-1":{"title":"3:5:7 Tritriadic 19-Tone Matrix","filename":"tri19-1.scl","rnbo":[19,50,49,36,35,7,6,25,21,6,5,60,49,49,36,25,18,7,5,10,7,36,25,72,49,49,30,5,3,42,25,12,7,35,18,49,25,2,1]},"tri19-2":{"title":"3:5:9 Tritriadic 19-Tone Matrix","filename":"tri19-2.scl","rnbo":[19,27,25,10,9,9,8,6,5,100,81,5,4,4,3,27,20,25,18,36,25,40,27,3,2,8,5,81,50,5,3,16,9,9,5,50,27,2,1]},"tri19-3":{"title":"4:5:6 Tritriadic 19-Tone 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Oz.","filename":"turko-arabic_rast_huseyni_uzzal-garip.scl","rnbo":[12,135,98,55,49,27,22,121,98,147,110,10,7,3,2,25,14,165,98,81,44,363,196,441,220]},"turko-arabic_rast_on_c":{"title":"Mixture of Turkish and Arabic general intonations of Rast by Dr. Oz.","filename":"turko-arabic_rast_on_c.scl","rnbo":[10,55,49,27,22,121,98,147,110,3,2,165,98,25,14,81,44,363,196,441,220]},"turko-arabic_saba_on_d":{"title":"Mixture of Turkish and Arabic intonations of Saba (also Koutchek) with perde dugah on D (and Muberka on E) by Dr. Oz.","filename":"turko-arabic_saba_on_d.scl","rnbo":[12,264,245,55,49,49,40,121,98,147,110,45,32,3,2,36,25,165,98,25,14,1060.0,0,441,220]},"turko-arabic_suznak-nawruz_on_c":{"title":"Mixture of Turkish and Arabic intonations of Suznak and Nawruz with perde rast on C by Dr. Oz.","filename":"turko-arabic_suznak-nawruz_on_c.scl","rnbo":[9,55,49,315,256,147,110,3,2,81,50,165,98,25,14,297,160,441,220]},"turko-arabic_ushshaq-bayati_and_huseyni_on_d":{"title":"Mixture of Turkish 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17]","filename":"unimarv19.scl","rnbo":[19,66.69201,0,116.07099,0,200.77735,0,267.46935,0,316.84833,0,383.54034,0,432.91932,0,499.61133,0,584.31769,0,615.68231,0,700.38867,0,767.08068,0,816.45966,0,883.15167,0,932.53065,0,999.22265,0,1083.92901,0,1133.30799,0,2,1]},"urania24":{"title":"Urania[24] hobbit (81/80, 121/120) in POTE tuning","filename":"urania24.scl","rnbo":[24,36.65667,0,119.06191,0,155.71857,0,192.37524,0,229.0319,0,311.43714,0,348.09381,0,384.75047,0,467.15572,0,503.81238,0,540.46905,0,584.48961,0,659.53095,0,696.18762,0,732.84428,0,815.24953,0,851.90619,0,888.56286,0,963.6042,0,1007.62476,0,1044.28143,0,1080.93809,0,1163.34333,0,2,1]},"urmawi":{"title":"al-Urmawi, one of twelve maqam rows. 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(2015)","filename":"werck3_mod2.scl","rnbo":[12,96.09,0,194.135,0,300.0,0,396.09,0,503.91,0,594.135,0,696.09,0,798.045,0,894.135,0,1001.955,0,1092.18,0,2,1]},"werck3_turck":{"title":"Daniel Gottlob Türck's 1806 Werckmeister III compiled by Andreas Sparschuh, TL 28-05-2010","filename":"werck3_turck.scl","rnbo":[12,256,243,272,243,32,27,304,243,4,3,1024,729,3280,2187,128,81,1216,729,16,9,152,81,2,1]},"werck4":{"title":"Andreas Werckmeister's temperament IV","filename":"werck4.scl","rnbo":[12,82.40499,0,196.09,0,32,27,392.18,0,4,3,1024,729,694.135,0,784.35999,0,890.225,0,1003.91,0,4096,2187,2,1]},"werck5":{"title":"Andreas Werckmeister's temperament V","filename":"werck5.scl","rnbo":[12,96.09,0,9,8,300.0,0,396.09,0,503.91,0,600.0,0,3,2,128,81,900.0,0,1001.955,0,1098.045,0,2,1]},"werck6":{"title":"Andreas Werckmeister's \"septenarius\" tuning VI, D is probably erroneous","filename":"werck6.scl","rnbo":[12,98,93,49,44,196,165,49,39,4,3,196,139,196,131,49,31,196,117,98,55,49,26,2,1]},"werck6_cor":{"title":"Corrected Septenarius with D string length=175 by Tom Dent (2006)","filename":"werck6_cor.scl","rnbo":[12,98,93,28,25,196,165,49,39,4,3,196,139,196,131,49,31,196,117,98,55,49,26,2,1]},"werck6_dup":{"title":"Andreas Werckmeister's VI in the interpretation by Dupont (1935)","filename":"werck6_dup.scl","rnbo":[12,256,243,187.153,0,297.486,0,394.414,0,4,3,594.973,0,698.604,0,792.18,0,892.459,0,999.441,0,1096.369,0,2,1]},"werck_cl5":{"title":"Werckmeister Clavier temperament (Nothw. Anm.) Poletti reconstr. 1/5-comma","filename":"werck_cl5.scl","rnbo":[12,83.5762,0,195.30749,0,293.59126,0,390.61497,0,502.34626,0,585.92246,0,697.65374,0,786.79126,0,892.96123,0,1000.39126,0,15,8,2,1]},"werck_cl6":{"title":"Werckmeister Clavier temperament (Nothw. Anm.) Poletti reconstr. 1/6-comma","filename":"werck_cl6.scl","rnbo":[12,88.59433,0,196.74124,0,295.67438,0,393.48248,0,501.62938,0,45,32,698.37062,0,791.67438,0,895.11186,0,999.67438,0,1091.8531,0,2,1]},"werck_puzzle":{"title":"From Hypomnemata Musica, 1697, p. 49, 1/1=192, fifths tempered superparticular","filename":"werck_puzzle.scl","rnbo":[12,25,24,107,96,75,64,5,4,85,64,67,48,143,96,25,16,5,3,113,64,15,8,2,1]},"werckmeisterIV_variant":{"title":"Werckmeister IV with 1/3 syntonic comma temperings","filename":"werckmeisterIV_variant.scl","rnbo":[12,85.00995,0,196.74124,0,32,27,393.48248,0,4,3,45,32,694.78624,0,785.01123,0,891.52748,0,1003.25876,0,15,8,2,1]},"werckmeisterIV_variant_c":{"title":"Werckmeister IV variation, 1/3-SC, all intervals in cents","filename":"werckmeisterIV_variant_c.scl","rnbo":[12,85.00995,0,196.74124,0,294.135,0,393.48248,0,498.045,0,590.22372,0,694.78624,0,785.01123,0,891.52748,0,1003.25876,0,1088.26871,0,2,1]},"white":{"title":"Justin White's 22-tone scale based on Al-Farabi's tetrachord","filename":"white.scl","rnbo":[22,135,128,567,512,9,8,7,6,1215,1024,5,4,81,64,21,16,4,3,45,32,189,128,3,2,14,9,405,256,5,3,27,16,7,4,16,9,15,8,243,128,63,32,2,1]},"whoosh":{"title":"Whoosh temperament, g=560.54697, 5-limit","filename":"whoosh.scl","rnbo":[441,3.13944,0,6.27888,0,8.20455,0,11.34399,0,14.48343,0,16.4091,0,19.54854,0,22.68798,0,24.61365,0,27.75309,0,30.89253,0,32.8182,0,35.95764,0,39.09708,0,41.02275,0,44.16219,0,47.30163,0,49.2273,0,52.36674,0,55.50618,0,57.43185,0,60.57129,0,62.49696,0,65.6364,0,68.77584,0,70.70151,0,73.84095,0,76.98039,0,78.90606,0,82.0455,0,85.18494,0,87.11061,0,90.25005,0,93.38949,0,95.31516,0,98.4546,0,101.59404,0,103.51971,0,106.65915,0,109.79859,0,111.72426,0,114.8637,0,118.00314,0,119.92881,0,123.06825,0,126.20769,0,128.13336,0,131.2728,0,134.41224,0,136.33791,0,139.47735,0,142.61679,0,144.54246,0,147.6819,0,149.60757,0,152.74701,0,155.88645,0,157.81212,0,160.95156,0,164.091,0,166.01667,0,169.15611,0,172.29555,0,174.22122,0,177.36066,0,180.5001,0,182.42577,0,185.56521,0,188.70465,0,190.63032,0,193.76976,0,196.9092,0,198.83487,0,201.97431,0,205.11375,0,207.03942,0,210.17886,0,213.3183,0,215.24397,0,218.38341,0,221.52285,0,223.44852,0,226.58796,0,228.51363,0,231.65307,0,234.79251,0,236.71818,0,239.85762,0,242.99706,0,244.92273,0,248.06217,0,251.20161,0,253.12728,0,256.26672,0,259.40616,0,261.33183,0,264.47127,0,267.61071,0,269.53638,0,272.67582,0,275.81526,0,277.74093,0,280.88037,0,284.01981,0,285.94548,0,289.08492,0,292.22436,0,294.15003,0,297.28947,0,300.42891,0,302.35458,0,305.49402,0,307.41969,0,310.55913,0,313.69857,0,315.62424,0,318.76368,0,321.90312,0,323.82879,0,326.96823,0,330.10767,0,332.03334,0,335.17278,0,338.31222,0,340.23789,0,343.37733,0,346.51677,0,348.44244,0,351.58188,0,354.72132,0,356.64699,0,359.78643,0,362.92587,0,364.85154,0,367.99098,0,371.13042,0,373.05609,0,376.19553,0,379.33497,0,381.26064,0,384.40008,0,386.32575,0,389.46519,0,392.60463,0,394.5303,0,397.66974,0,400.80918,0,402.73485,0,405.87429,0,409.01373,0,410.9394,0,414.07884,0,417.21828,0,419.14395,0,422.28339,0,425.42283,0,427.3485,0,430.48794,0,433.62738,0,435.55305,0,438.69249,0,441.83193,0,443.7576,0,446.89704,0,450.03648,0,451.96215,0,455.10159,0,458.24103,0,460.1667,0,463.30614,0,465.23181,0,468.37125,0,471.51069,0,473.43636,0,476.5758,0,479.71524,0,481.64091,0,484.78035,0,487.91979,0,489.84546,0,492.9849,0,496.12434,0,498.05001,0,501.18945,0,504.32889,0,506.25456,0,509.394,0,512.53344,0,514.45911,0,517.59855,0,520.73799,0,522.66366,0,525.8031,0,528.94254,0,530.86821,0,534.00765,0,537.14709,0,539.07276,0,542.2122,0,544.13787,0,547.27731,0,550.41675,0,552.34242,0,555.48186,0,558.6213,0,560.54697,0,563.68641,0,566.82585,0,568.75152,0,571.89096,0,575.0304,0,576.95607,0,580.09551,0,583.23495,0,585.16062,0,588.30006,0,591.4395,0,593.36517,0,596.50461,0,599.64405,0,601.56972,0,604.70916,0,607.8486,0,609.77427,0,612.91371,0,616.05315,0,617.97882,0,621.11826,0,623.04393,0,626.18337,0,629.32281,0,631.24848,0,634.38792,0,637.52736,0,639.45303,0,642.59247,0,645.73191,0,647.65758,0,650.79702,0,653.93646,0,655.86213,0,659.00157,0,662.14101,0,664.06668,0,667.20612,0,670.34556,0,672.27123,0,675.41067,0,678.55011,0,680.47578,0,683.61522,0,686.75466,0,688.68033,0,691.81977,0,694.95921,0,696.88488,0,700.02432,0,701.94999,0,705.08943,0,708.22887,0,710.15454,0,713.29398,0,716.43342,0,718.35909,0,721.49853,0,724.63797,0,726.56364,0,729.70308,0,732.84252,0,734.76819,0,737.90763,0,741.04707,0,742.97274,0,746.11218,0,749.25162,0,751.17729,0,754.31673,0,757.45617,0,759.38184,0,762.52128,0,765.66072,0,767.58639,0,770.72583,0,773.86527,0,775.79094,0,778.93038,0,782.06982,0,783.99549,0,787.13493,0,789.0606,0,792.20004,0,795.33948,0,797.26515,0,800.40459,0,803.54403,0,805.4697,0,808.60914,0,811.74858,0,813.67425,0,816.81369,0,819.95313,0,821.8788,0,825.01824,0,828.15768,0,830.08335,0,833.22279,0,836.36223,0,838.2879,0,841.42734,0,844.56678,0,846.49245,0,849.63189,0,852.77133,0,854.697,0,857.83644,0,860.97588,0,862.90155,0,866.04099,0,867.96666,0,871.1061,0,874.24554,0,876.17121,0,879.31065,0,882.45009,0,884.37576,0,887.5152,0,890.65464,0,892.58031,0,895.71975,0,898.85919,0,900.78486,0,903.9243,0,907.06374,0,908.98941,0,912.12885,0,915.26829,0,917.19396,0,920.3334,0,923.47284,0,925.39851,0,928.53795,0,931.67739,0,933.60306,0,936.7425,0,939.88194,0,941.80761,0,944.94705,0,946.87272,0,950.01216,0,953.1516,0,955.07727,0,958.21671,0,961.35615,0,963.28182,0,966.42126,0,969.5607,0,971.48637,0,974.62581,0,977.76525,0,979.69092,0,982.83036,0,985.9698,0,987.89547,0,991.03491,0,994.17435,0,996.10002,0,999.23946,0,1002.3789,0,1004.30457,0,1007.44401,0,1010.58345,0,1012.50912,0,1015.64856,0,1018.788,0,1020.71367,0,1023.85311,0,1025.77878,0,1028.91822,0,1032.05766,0,1033.98333,0,1037.12277,0,1040.26221,0,1042.18788,0,1045.32732,0,1048.46676,0,1050.39243,0,1053.53187,0,1056.67131,0,1058.59698,0,1061.73642,0,1064.87586,0,1066.80153,0,1069.94097,0,1073.08041,0,1075.00608,0,1078.14552,0,1081.28496,0,1083.21063,0,1086.35007,0,1089.48951,0,1091.41518,0,1094.55462,0,1097.69406,0,1099.61973,0,1102.75917,0,1104.68484,0,1107.82428,0,1110.96372,0,1112.88939,0,1116.02883,0,1119.16827,0,1121.09394,0,1124.23338,0,1127.37282,0,1129.29849,0,1132.43793,0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Wicks' equal beating temperament for organs (1887)","filename":"wicks_eb.scl","rnbo":[12,96.71564,0,198.75561,0,295.7517,0,398.07101,0,495.31776,0,597.88666,0,699.74789,0,796.58349,0,898.74299,0,995.84635,0,1098.27248,0,2,1]},"wiegleb-book":{"title":"Werkstattbuch Wiegleb, organ temperament, 2nd half 18th cent., from Ratte, p. 406","filename":"wiegleb-book.scl","rnbo":[12,92.18,0,196.09,0,296.09,0,394.135,0,500.0,0,590.225,0,698.045,0,794.135,0,894.135,0,998.045,0,1092.18,0,2,1]},"wiegleb":{"title":"Wiegleb's organ temperament (1790)","filename":"wiegleb.scl","rnbo":[12,91.2025,0,194.135,0,295.1125,0,391.2025,0,499.0225,0,589.2475,0,697.0675,0,793.1575,0,891.2025,0,997.0675,0,1090.225,0,2,1]},"wier_15":{"title":"Danny Wier, 11-limit JI scale, TL 27-07-2009","filename":"wier_15.scl","rnbo":[15,22,21,11,10,8,7,6,5,44,35,33,25,25,18,36,25,50,33,35,22,5,3,7,4,20,11,21,11,2,1]},"wier_53":{"title":"Danny Wier's schismatically-altered 53-Pythagorgean scale (2002)","filename":"wier_53.scl","rnbo":[53,64,63,36,35,28,27,135,128,16,15,243,224,35,32,10,9,9,8,8,7,81,70,7,6,32,27,6,5,128,105,315,256,5,4,81,64,9,7,35,27,21,16,4,3,27,20,48,35,112,81,45,32,64,45,81,56,35,24,40,27,3,2,32,21,54,35,14,9,128,81,8,5,512,315,105,64,5,3,27,16,12,7,140,81,7,4,16,9,9,5,64,35,448,243,15,8,256,135,27,14,35,18,63,32,2,1]},"wier_cl":{"title":"Danny Wier, ClownTone (2003)","filename":"wier_cl.scl","rnbo":[12,19,18,10,9,7,6,11,9,4,3,17,12,3,2,19,12,5,3,7,4,11,6,2,1]},"wier_j":{"title":"Danny Wier, 8 1/4P, 4 -1/4P temperament","filename":"wier_j.scl","rnbo":[12,72.63,0,192.18,0,276.54,0,384.36,0,492.18,0,576.54,0,696.09,0,768.72,0,888.27,0,984.36,0,1080.45,0,2,1]},"wiese1":{"title":"Christian Ludwig Gustav von Wiese's 1/2P-comma temperament no. 1 (1793)","filename":"wiese1.scl","rnbo":[12,256,243,9,8,32,27,81,64,4,3,5760,4073,3,2,128,81,27,16,16,9,243,128,2,1]},"wiese3":{"title":"Christian Ludwig Gustav von Wiese's 1/2P-comma temperament no. 3 (1793). Also Grammateus (1518) according to Ratte, p. 249","filename":"wiese3.scl","rnbo":[12,101.955,0,9,8,305.865,0,81,64,4,3,600.0,0,3,2,803.91,0,27,16,16,9,243,128,2,1]},"wilcent17":{"title":"Wilson 17-tone 11-limit scale","filename":"wilcent17.scl","rnbo":[17,22,21,11,10,9,8,7,6,11,9,5,4,4,3,11,8,22,15,3,2,11,7,44,27,5,3,7,4,11,6,15,8,2,1]},"wilson-rastbayyati24":{"title":"Erv Wilson scale from Rast/Bayyati matrix (27/22, 11/9)","filename":"wilson-rastbayyati24.scl","rnbo":[24,8192,8019,256,243,12,11,9,8,1024,891,32,27,27,22,8192,6561,128,99,4,3,243,176,1024,729,16,11,3,2,4096,2673,128,81,18,11,27,16,512,297,16,9,81,44,4096,2187,64,33,2,1]},"wilson1":{"title":"Erv Wilson 19-tone Scott scale (1976)","filename":"wilson1.scl","rnbo":[19,25,24,16,15,9,8,75,64,6,5,5,4,32,25,4,3,45,32,36,25,3,2,25,16,8,5,5,3,225,128,9,5,15,8,48,25,2,1]},"wilson11":{"title":"Wilson 11-limit 19-tone scale (1977)","filename":"wilson11.scl","rnbo":[19,28,27,35,33,49,44,7,6,105,88,56,45,14,11,4,3,7,5,63,44,3,2,14,9,35,22,147,88,7,4,315,176,28,15,21,11,2,1]},"wilson1t":{"title":"Wilson Scott scale, wilson1, in minimax minerva tempering","filename":"wilson1t.scl","rnbo":[19,75.87387,0,115.31791,0,195.66021,0,271.53407,0,310.97812,0,386.85198,0,426.29603,0,502.1699,0,7,5,621.95624,0,697.8301,0,773.70397,0,813.14801,0,889.02188,0,969.36418,0,1008.80822,0,1084.68209,0,1124.12613,0,2,1]},"wilson2":{"title":"Wilson 19-tone (1975)","filename":"wilson2.scl","rnbo":[19,28,27,16,15,9,8,7,6,6,5,5,4,35,27,4,3,112,81,64,45,3,2,14,9,8,5,27,16,7,4,9,5,15,8,35,18,2,1]},"wilson3":{"title":"Wilson 19-tone","filename":"wilson3.scl","rnbo":[19,21,20,35,32,9,8,7,6,6,5,5,4,21,16,4,3,7,5,35,24,3,2,63,40,105,64,27,16,7,4,9,5,15,8,63,32,2,1]},"wilson5":{"title":"Wilson's 22-tone 5-limit scale","filename":"wilson5.scl","rnbo":[22,25,24,16,15,10,9,9,8,75,64,6,5,5,4,32,25,4,3,27,20,45,32,36,25,3,2,25,16,8,5,5,3,27,16,225,128,9,5,15,8,48,25,2,1]},"wilson7":{"title":"Wilson's 22-tone 7-limit 'marimba' scale","filename":"wilson7.scl","rnbo":[22,28,27,16,15,10,9,9,8,7,6,6,5,5,4,35,27,4,3,27,20,45,32,35,24,3,2,14,9,8,5,5,3,27,16,7,4,9,5,15,8,35,18,2,1]},"wilson7_2":{"title":"Wilson 7-limit scale","filename":"wilson7_2.scl","rnbo":[22,126,125,21,20,35,32,9,8,7,6,6,5,5,4,63,50,21,16,27,20,7,5,36,25,3,2,25,16,63,40,5,3,42,25,7,4,9,5,15,8,189,100,2,1]},"wilson7_3":{"title":"Wilson 7-limit scale","filename":"wilson7_3.scl","rnbo":[22,128,125,16,15,10,9,9,8,32,27,6,5,5,4,32,25,4,3,27,20,64,45,36,25,3,2,25,16,8,5,5,3,128,75,16,9,9,5,15,8,48,25,2,1]},"wilson7_4":{"title":"Wilson 7-limit 22-tone scale XH 3, 1975","filename":"wilson7_4.scl","rnbo":[22,28,27,16,15,10,9,9,8,7,6,6,5,5,4,35,27,4,3,112,81,64,45,40,27,3,2,14,9,8,5,5,3,27,16,7,4,9,5,15,8,35,18,2,1]},"wilson_17":{"title":"Wilson 17-tone 5-limit scale","filename":"wilson_17.scl","rnbo":[17,135,128,10,9,9,8,1215,1024,5,4,81,64,4,3,45,32,729,512,3,2,405,256,5,3,27,16,16,9,15,8,243,128,2,1]},"wilson_31":{"title":"Wilson 11-limit 31-tone scale XH 3, 1975","filename":"wilson_31.scl","rnbo":[31,64,63,28,27,16,15,12,11,9,8,8,7,7,6,6,5,27,22,5,4,80,63,35,27,4,3,256,189,112,81,64,45,16,11,3,2,32,21,14,9,8,5,18,11,27,16,12,7,7,4,9,5,81,44,15,8,40,21,35,18,2,1]},"wilson_41":{"title":"Wilson 11-limit 41-tone scale XH 3, 1975","filename":"wilson_41.scl","rnbo":[41,64,63,28,27,256,243,16,15,12,11,10,9,9,8,8,7,7,6,32,27,6,5,27,22,5,4,81,64,9,7,21,16,4,3,256,189,112,81,1024,729,64,45,16,11,40,27,3,2,32,21,14,9,128,81,8,5,18,11,5,3,27,16,12,7,7,4,16,9,9,5,81,44,15,8,243,128,27,14,63,32,2,1]},"wilson_alessandro":{"title":"D'Alessandro, genus [3 3 3 5 7 11 11] plus 8 pigtails, XH 12, 1989","filename":"wilson_alessandro.scl","rnbo":[56,2079,2048,33,32,4235,4096,135,128,1089,1024,4455,4096,35,32,847,768,9,8,1155,1024,297,256,38115,32768,7,6,605,512,77,64,315,256,2541,2048,5,4,10395,8192,165,128,1331,1024,21,16,5445,4096,945,704,693,512,11,8,22869,16384,45,32,363,256,1485,1024,189,128,49005,32768,3,2,385,256,99,64,12705,8192,405,256,3267,2048,77,48,105,64,847,512,27,16,3465,2048,55,32,114345,65536,7,4,1815,1024,231,128,945,512,7623,4096,15,8,121,64,495,256,63,32,16335,8192,2,1]},"wilson_bag":{"title":"Erv's bagpipe, after Theodore Podnos (37-39), (March 1997)","filename":"wilson_bag.scl","rnbo":[7,9,8,39,32,171,128,3,2,13,8,57,32,2,1]},"wilson_class":{"title":"Wilson's Class Scale, 9 July 1967","filename":"wilson_class.scl","rnbo":[12,25,24,28,25,7,6,5,4,4,3,7,5,35,24,8,5,5,3,7,4,28,15,2,1]},"wilson_dia1":{"title":"Wilson Diaphonic cycles, tetrachordal form","filename":"wilson_dia1.scl","rnbo":[22,36,35,18,17,12,11,9,8,36,31,6,5,36,29,9,7,4,3,18,13,27,19,54,37,3,2,54,35,27,17,18,11,27,16,54,31,9,5,54,29,27,14,2,1]},"wilson_dia2":{"title":"Wilson Diaphonic cycle, conjunctive form","filename":"wilson_dia2.scl","rnbo":[22,39,38,39,37,13,12,39,35,39,34,13,11,39,32,39,31,13,10,39,29,39,28,13,9,52,35,26,17,52,33,13,8,52,31,26,15,52,29,13,7,52,27,2,1]},"wilson_dia3":{"title":"Wilson Diaphonic cycle on 3/2","filename":"wilson_dia3.scl","rnbo":[22,39,38,39,37,13,12,39,35,39,34,13,11,39,32,39,31,13,10,39,29,39,28,13,9,3,2,54,35,27,17,18,11,27,16,54,31,9,5,54,29,27,14,2,1]},"wilson_dia4":{"title":"Wilson Diaphonic cycle on 4/3","filename":"wilson_dia4.scl","rnbo":[22,36,35,18,17,12,11,9,8,36,31,6,5,36,29,9,7,4,3,26,19,13,9,54,37,52,35,26,17,52,33,13,8,52,31,26,15,52,29,13,7,52,27,2,1]},"wilson_duo":{"title":"Wilson 'duovigene'","filename":"wilson_duo.scl","rnbo":[22,28,27,16,15,35,32,9,8,7,6,6,5,5,4,35,27,4,3,112,81,45,32,35,24,3,2,14,9,8,5,5,3,27,16,7,4,9,5,15,8,35,18,2,1]},"wilson_enh":{"title":"Wilson's Enharmonic & 3rd new Enharmonic on Hofmann's list of superp. 4chords","filename":"wilson_enh.scl","rnbo":[7,96,95,16,15,4,3,3,2,144,95,8,5,2,1]},"wilson_enh2":{"title":"Wilson's 81/64 Enharmonic, a strong division of the 256/243 pyknon","filename":"wilson_enh2.scl","rnbo":[7,64,63,256,243,4,3,3,2,32,21,128,81,2,1]},"wilson_facet":{"title":"Wilson study in 'conjunct facets', Hexany based","filename":"wilson_facet.scl","rnbo":[22,28,27,21,20,10,9,9,8,7,6,6,5,5,4,35,27,4,3,27,20,7,5,40,27,3,2,14,9,63,40,5,3,140,81,7,4,9,5,28,15,35,18,2,1]},"wilson_gh1":{"title":"Golden Horagram nr.1: 1phi+0 / 7phi+1","filename":"wilson_gh1.scl","rnbo":[7,157.52096,0,315.04191,0,472.56287,0,727.43713,0,884.95809,0,1042.47904,0,2,1]},"wilson_gh11":{"title":"Golden Horagram nr.11: 1phi+0 / 3phi+1","filename":"wilson_gh11.scl","rnbo":[7,204.98447,0,331.67184,0,536.65631,0,663.34369,0,868.32816,0,995.01553,0,2,1]},"wilson_gh2":{"title":"Golden Horagram nr.2: 1phi+0 / 6phi+1","filename":"wilson_gh2.scl","rnbo":[7,181.32273,0,362.64546,0,543.96819,0,656.03181,0,837.35454,0,1018.67727,0,2,1]},"wilson_gh50":{"title":"Golden Horagram nr.50: 7phi+2 / 17phi+5","filename":"wilson_gh50.scl","rnbo":[12,59.7307,0,119.46141,0,275.83842,0,335.56913,0,491.94614,0,551.67685,0,611.40755,0,767.78456,0,827.51527,0,983.89228,0,1043.62299,0,2,1]},"wilson_hebdome1":{"title":"Wilson 1.3.5.7.9.11.13.15 hebdomekontany, 1.3.5.7 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scale","filename":"wilson_l2.scl","rnbo":[22,49,48,77,72,11,10,9,8,7,6,77,64,5,4,77,60,4,3,11,8,77,54,35,24,3,2,11,7,77,48,5,3,77,45,7,4,11,6,15,8,77,40,2,1]},"wilson_l3":{"title":"Wilson 11-limit scale","filename":"wilson_l3.scl","rnbo":[22,33,32,21,20,35,32,9,8,7,6,6,5,5,4,14,11,21,16,11,8,7,5,35,24,3,2,14,9,8,5,105,64,27,16,7,4,9,5,15,8,21,11,2,1]},"wilson_l4":{"title":"Wilson 11-limit scale","filename":"wilson_l4.scl","rnbo":[22,49,48,21,20,10,9,8,7,7,6,6,5,5,4,35,27,4,3,49,36,7,5,35,24,3,2,14,9,8,5,5,3,12,7,7,4,9,5,28,15,35,18,2,1]},"wilson_l5":{"title":"Wilson 11-limit scale","filename":"wilson_l5.scl","rnbo":[22,49,48,77,72,12,11,8,7,7,6,6,5,5,4,14,11,4,3,49,36,7,5,35,24,3,2,14,9,8,5,5,3,12,7,7,4,11,6,28,15,35,18,2,1]},"wilson_l6":{"title":"Wilson 1 3 7 9 11 15 eikosany plus 9/8 and tritone. Used Stearns: Jewel","filename":"wilson_l6.scl","rnbo":[22,45,44,35,33,12,11,9,8,7,6,105,88,5,4,14,11,4,3,15,11,140,99,35,24,3,2,14,9,35,22,5,3,56,33,7,4,20,11,15,8,21,11,2,1]},"wilson_pelog":{"title":"Wilson Stretched Pelog, generator close to 15/11. (c. 1993)","filename":"wilson_pelog.scl","rnbo":[7,141.36489,0,282.72978,0,536.81756,0,678.18244,0,819.54733,0,960.91222,0,1215.0,0]},"window":{"title":"Window lattice","filename":"window.scl","rnbo":[21,25,24,10,9,9,8,256,225,75,64,5,4,32,25,4,3,25,18,45,32,64,45,36,25,3,2,25,16,8,5,128,75,225,128,16,9,9,5,48,25,2,1]},"wizard22":{"title":"Wizard[22] 11-limit, 4 cents lesfip optimized","filename":"wizard22.scl","rnbo":[22,66.2766,0,116.3479,0,166.4192,0,232.6958,0,282.8753,0,333.2063,0,383.4809,0,449.2149,0,499.4895,0,549.8205,0,600.0,0,666.2766,0,716.3479,0,766.4192,0,832.6958,0,882.8753,0,933.2063,0,983.4809,0,1049.2149,0,1099.4895,0,1149.8205,0,2,1]},"wonder1":{"title":"Wonder Scale, gen=~233.54 cents, 8/7+1029/1024^7/25, LS 12:14:18:21, 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31","filename":"woz31.scl","rnbo":[31,49,48,21,20,15,14,49,45,28,25,8,7,7,6,6,5,49,40,5,4,9,7,64,49,4,3,48,35,7,5,10,7,35,24,3,2,49,32,14,9,8,5,49,30,5,3,12,7,7,4,25,14,90,49,28,15,40,21,49,25,2,1]},"wronski":{"title":"Wronski's scale, from Jocelyn Godwin, \"Music and the Occult\", p. 105.","filename":"wronski.scl","rnbo":[12,17,16,9,8,85,72,5,4,4,3,17,12,3,2,51,32,27,16,85,48,17,9,2,1]},"wurschmidt":{"title":"Würschmidt's normalised 12-tone system","filename":"wurschmidt.scl","rnbo":[12,135,128,9,8,6,5,81,64,27,20,45,32,3,2,405,256,27,16,9,5,15,8,2,1]},"wurschmidt1":{"title":"Würschmidt-1 19-tone scale","filename":"wurschmidt1.scl","rnbo":[19,25,24,16,15,9,8,75,64,6,5,5,4,32,25,4,3,25,18,36,25,3,2,25,16,8,5,5,3,128,75,16,9,15,8,48,25,2,1]},"wurschmidt2":{"title":"Würschmidt-2 19-tone scale","filename":"wurschmidt2.scl","rnbo":[19,25,24,27,25,9,8,75,64,6,5,5,4,32,25,4,3,25,18,36,25,3,2,25,16,8,5,5,3,128,75,16,9,50,27,48,25,2,1]},"wurschmidt_31":{"title":"Würschmidt's 31-tone 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Yarman","filename":"yarman_29etx2.scl","rnbo":[58,13.89992,0,41.37931,0,55.27923,0,82.75862,0,96.65854,0,124.13793,0,138.03785,0,165.51724,0,179.41716,0,206.89655,0,220.79647,0,248.27586,0,262.17578,0,289.65517,0,303.55509,0,331.03448,0,344.9344,0,372.41379,0,5,4,413.7931,0,427.69302,0,455.17241,0,469.07233,0,496.55172,0,510.45164,0,537.93103,0,551.83096,0,579.31034,0,593.21027,0,620.68966,0,634.58958,0,662.06897,0,675.96889,0,703.44828,0,717.3482,0,744.82759,0,758.72751,0,786.2069,0,800.10682,0,827.58621,0,841.48613,0,868.96552,0,882.86544,0,910.34483,0,924.24475,0,951.72414,0,965.62406,0,993.10345,0,1007.00337,0,1034.48276,0,1048.38268,0,1075.86207,0,1089.76199,0,1117.24138,0,1131.1413,0,1158.62069,0,1172.52061,0,2,1]},"yarman_buselik":{"title":"8-tone Buselik by Ozan Yarman","filename":"yarman_buselik.scl","rnbo":[8,9,8,32,27,4,3,3,2,128,81,16,9,15,8,2,1]},"yarman_hijaz":{"title":"8-tone Hijaz by Ozan 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P","filename":"young-sorge.scl","rnbo":[12,94.135,0,196.09,0,298.045,0,396.09,0,501.955,0,592.18,0,698.045,0,796.09,0,898.045,0,1000.0,0,1094.135,0,2,1]},"young-w10":{"title":"William Lyman Young 10 out of 24-tET (1961)","filename":"young-w10.scl","rnbo":[10,100.0,0,250.0,0,350.0,0,500.0,0,600.0,0,700.0,0,850.0,0,950.0,0,1100.0,0,2,1]},"young-w14":{"title":"William Lyman Young 14 out of 24-tET (1961)","filename":"young-w14.scl","rnbo":[14,100.0,0,200.0,0,250.0,0,350.0,0,450.0,0,550.0,0,600.0,0,700.0,0,800.0,0,850.0,0,950.0,0,1050.0,0,1150.0,0,2,1]},"young-wt":{"title":"William Lyman Young \"exquisite 3/4 tone Hellenic Lyre\" dorian","filename":"young-wt.scl","rnbo":[7,12,11,13,11,4,3,3,2,18,11,39,22,2,1]},"young":{"title":"Thomas Young well temperament (1807), also Luigi Malerbi nr.2 (1794)","filename":"young.scl","rnbo":[12,256,243,196.09,0,32,27,392.18,0,4,3,1024,729,698.045,0,128,81,894.135,0,16,9,1090.225,0,2,1]},"young1":{"title":"Thomas Young well temperament no.1 (1800), 1/12 and 3/16 synt. comma","filename":"young1.scl","rnbo":[12,100000,94723,12500,11163,100000,84197,12500,9969,100000,74921,100000,71041,50000,33411,25000,15787,25000,14919,100000,56131,12500,6653,2,1]},"young2":{"title":"Thomas Young well temperament no.2 (1799)","filename":"young2.scl","rnbo":[12,94.135,0,196.09,0,298.045,0,392.18,0,500.0,0,592.18,0,698.045,0,796.09,0,894.135,0,1000.0,0,1092.18,0,2,1]},"yugo_bagpipe":{"title":"Yugoslavian Bagpipe","filename":"yugo_bagpipe.scl","rnbo":[12,99.0,0,202.0,0,362.0,0,463.0,0,655.0,0,754.0,0,861.0,0,949.0,0,991.0,0,1047.0,0,1129.0,0,2,1]},"zalzal":{"title":"Tuning of popular flute by Al Farabi & Zalzal. First tetrachord is modern Rast","filename":"zalzal.scl","rnbo":[7,9,8,27,22,4,3,3,2,18,11,16,9,2,1]},"zalzal2":{"title":"Zalzal's Scale, a medieval Islamic with Ditone Diatonic & 10/9 x 13/12 x 72/65","filename":"zalzal2.scl","rnbo":[7,9,8,81,64,4,3,40,27,130,81,16,9,2,1]},"zapf-dent":{"title":"Thomas Dent, theoretical Zapf temperament, 1/13P (2005)","filename":"zapf-dent.scl","rnbo":[12,101.05269,0,196.69154,0,301.35346,0,396.99231,0,501.65423,0,600.90231,0,698.34577,0,801.20308,0,895.03731,0,1001.50385,0,1098.94731,0,2,1]},"zapf":{"title":"Michael Zapf Bach temperament (2001)","filename":"zapf.scl","rnbo":[12,132449,125000,28,25,148693,125000,1257,1000,166967,125000,353531,250000,187,125,24803,15625,419,250,222789,125000,29461,15625,2,1]},"zarlino2":{"title":"16-note choice system of Zarlino, Sopplimenti musicali (1588)","filename":"zarlino2.scl","rnbo":[16,25,24,10,9,9,8,32,27,6,5,5,4,4,3,25,18,45,32,3,2,25,16,5,3,16,9,9,5,15,8,2,1]},"zarlino24":{"title":"Possible 31-tET tuning for 24-note keyboard by Zarlino (1548)","filename":"zarlino24.scl","rnbo":[24,77.41935,0,116.12903,0,154.83871,0,193.54839,0,270.96774,0,309.67742,0,348.3871,0,387.09677,0,464.51613,0,503.22581,0,580.64516,0,619.35484,0,658.06452,0,696.77419,0,774.19355,0,812.90323,0,851.6129,0,890.32258,0,967.74194,0,1006.45161,0,1045.16129,0,1083.87097,0,1161.29032,0,2,1]},"zarte24-volans_b":{"title":"Equable heptatonic like volans.scl (reported African scale)","filename":"zarte24-volans_b.scl","rnbo":[7,171.22411,0,362.8448,0,504.18966,0,675.41376,0,867.03446,0,1058.65515,0,2,1]},"zartehijaz1":{"title":"Scale from Zarlino temperament extraordinaire, lower Hijaz tetrachord","filename":"zartehijaz1.scl","rnbo":[9,120.94826,0,433.51722,0,504.18965,0,625.13792,0,708.3793,0,925.13792,0,1008.3793,0,1129.32757,0,2,1]},"zesster_a":{"title":"Harmonic six-star, group A, from Fokker","filename":"zesster_a.scl","rnbo":[8,16,15,6,5,32,25,4,3,3,2,8,5,48,25,2,1]},"zesster_b":{"title":"Harmonic six-star, group B, from Fokker","filename":"zesster_b.scl","rnbo":[8,28,25,8,7,32,25,7,5,8,5,7,4,64,35,2,1]},"zesster_c":{"title":"Harmonic six-star, group C on Eb, from Fokker","filename":"zesster_c.scl","rnbo":[8,8,7,7,6,4,3,32,21,14,9,7,4,16,9,2,1]},"zesster_mix":{"title":"Harmonic six-star, groups A, B and C mixed, from Fokker","filename":"zesster_mix.scl","rnbo":[16,21,20,16,15,28,25,8,7,6,5,32,25,4,3,48,35,7,5,3,2,8,5,7,4,64,35,28,15,48,25,2,1]},"zest24-persian_Eb":{"title":"Version somewhat like Darius Anooshfar's persian.scl, Eb-Eb","filename":"zest24-persian_Eb.scl","rnbo":[17,95.81035,0,146.08618,0,216.75861,0,287.43104,0,337.70688,0,408.37931,0,491.62069,0,541.89653,0,650.27584,0,708.37931,0,791.62069,0,841.89653,0,912.56896,0,983.24139,0,1033.51722,0,1104.18965,0,2,1]},"zest24-supergoya17plus3_Db":{"title":"Goya-17 plus 484, 676, and 1180 cents","filename":"zest24-supergoya17plus3_Db.scl","rnbo":[20,50.39062,0,171.09375,0,216.79688,0,267.1875,0,363.28125,0,433.59375,0,483.98437,0,503.90625,0,554.29688,0,625.78125,0,676.17187,0,707.8125,0,758.20312,0,867.1875,0,925.78125,0,976.17188,0,1059.375,0,1129.6875,0,1180.07812,0,2,1]},"zest24":{"title":"Zarlino Extraordinaire Spectrum Temperament (two circles at ~50.28c apart)","filename":"zest24.scl","rnbo":[24,50.27584,0,25,24,120.94826,0,191.62069,0,241.89653,0,287.43104,0,337.70688,0,383.24139,0,433.51722,0,504.18965,0,554.46549,0,574.86208,0,625.13792,0,695.81035,0,746.08619,0,779.05173,0,829.32757,0,887.43104,0,937.70688,0,995.81035,0,1046.08619,0,1079.05173,0,48,25,2,1]},"zeta12":{"title":"Margo Schulter's Zeta Centauri tuning inspired by Kraig Grady's Centaur","filename":"zeta12.scl","rnbo":[12,13,12,9,8,7,6,11,9,4,3,13,9,3,2,14,9,13,8,7,4,11,6,2,1]},"zeus1":{"title":"Zeus tempering of [11/10, 5/4, 11/8, 3/2, 11/6, 2], 99-tET tuning","filename":"zeus1.scl","rnbo":[6,157.57576,0,387.87879,0,545.45455,0,703.0303,0,1042.42424,0,2,1]},"zeus22":{"title":"Zeus[22] hobbit (121/120&176/175) in POTE tuning","filename":"zeus22.scl","rnbo":[22,47.21796,0,109.8701,0,157.08806,0,230.88883,0,266.95816,0,314.17612,0,387.97689,0,424.04622,0,497.84699,0,545.06495,0,592.28291,0,654.93505,0,702.15301,0,775.95378,0,812.02311,0,885.82388,0,933.04184,0,969.11117,0,1042.91194,0,1090.1299,0,1152.78204,0,2,1]},"zeus24":{"title":"Zeus[24] hobbit (121/120&176/175) in POTE tuning","filename":"zeus24.scl","rnbo":[24,47.21796,0,109.8701,0,157.08806,0,204.30602,0,230.88883,0,314.17612,0,340.75893,0,387.97689,0,471.26418,0,497.84699,0,545.06495,0,592.28291,0,654.93505,0,702.15301,0,728.73582,0,812.02311,0,859.24107,0,885.82388,0,969.11117,0,995.69398,0,1042.91194,0,1090.1299,0,1152.78204,0,2,1]},"zeus7tri":{"title":"Trivalent scale in Zeus temperament; thirds are all {7/6, 6/5, 5/4}; 99-tET tuning; aabacab","filename":"zeus7tri.scl","rnbo":[7,157.57576,0,387.87879,0,545.45455,0,703.0303,0,933.33333,0,1090.90909,0,2,1]},"zeus8tri":{"title":"Zeus tempered scale with 3DE property, 99-tET tuning, mmmLmmms","filename":"zeus8tri.scl","rnbo":[8,157.57576,0,315.15152,0,472.72727,0,654.54545,0,812.12121,0,969.69697,0,1127.27273,0,2,1]},"zex46":{"title":"Irregularized Zeus[46]","filename":"zex46.scl","rnbo":[46,28.33875,0,41.16704,0,81.61141,0,111.37562,0,124.80835,0,165.36701,0,179.97913,0,206.77878,0,233.15439,0,262.33955,0,292.04377,0,317.08727,0,345.96268,0,358.95122,0,387.24885,0,413.66213,0,455.78605,0,468.92545,0,496.90806,0,524.83768,0,550.91313,0,579.9079,0,608.70773,0,619.92459,0,648.4803,0,676.93569,0,704.24523,0,730.4645,0,745.19773,0,784.12172,0,813.97384,0,842.91988,0,855.96307,0,882.81135,0,910.30462,0,937.7106,0,965.34598,0,994.93919,0,1007.69822,0,1047.7951,0,1061.86499,0,1090.28385,0,1115.07901,0,1144.26117,0,1172.81258,0,2,1]},"zir_bouzourk":{"title":"Zirafkend Bouzourk (IG #3, DF #9), from both Rouanet and Safi al-Din","filename":"zir_bouzourk.scl","rnbo":[6,14,13,7,6,6,5,27,20,3,2,2,1]},"zwolle":{"title":"Henri Arnaut De Zwolle. Pythagorean on G flat.","filename":"zwolle.scl","rnbo":[12,256,243,9,8,32,27,81,64,4,3,1024,729,3,2,128,81,27,16,16,9,243,128,2,1]},"zwolle2":{"title":"Henri Arnaut De Zwolle's modified meantone tuning (c. 1440)","filename":"zwolle2.scl","rnbo":[12,76.049,0,193.15686,0,303.09595,0,5,4,503.42157,0,579.47057,0,696.57843,0,25,16,889.73529,0,1003.25876,0,1082.89214,0,2,1]},"12-tet":{"title":"Twelve-tone equal temperament","filename":"12-tet.scl","rnbo":[12,100,0,200,0,300,0,400,0,500,0,600,0,700,0,800,0,900,0,1000,0,1100,0,2,1]}}}