| 12 from a 17-notes cycle, equal-beating extended fifths (705.5685 c.) sequence 0: 1/1 0.000 unison, perfect prime 1: 29435/28352 64.899 2: 959/886 137.069 3: 15995/14176 209.005 4: 33253/28352 276.041 5: 8345/7088 282.640 6: 8667/7088 348.185 7: 2259/1772 420.367 8: 37727/28352 494.576 9: 39165/28352 559.337 10: 638/443 631.500 11: 5319/3544 702.932 12: 44245/28352 770.477 13: 2883/1772 842.631 14: 1503/886 914.960 15: 12443/7088 974.261 16: 99967/56704 981.602 17: 52111/28352 1053.765 18: 6791/3544 1125.895 19: 2/1 1200.000 octave | O3 "17+2" set somewhat like Dudon's Soria 17_2b 0: 1/1 0.000 unison, perfect prime 1: 57.422 cents 57.422 2: 138.281 cents 138.281 3: 207.422 cents 207.422 4: 264.844 cents 264.844 5: 288.281 cents 288.281 6: 345.703 cents 345.703 7: 416.016 cents 416.016 8: 496.875 cents 496.875 9: 554.297 cents 554.297 10: 635.156 cents 635.156 11: 704.297 cents 704.297 12: 761.719 cents 761.719 13: 842.578 cents 842.578 14: 911.719 cents 911.719 15: 969.141 cents 969.141 16: 992.578 cents 992.578 17: 1050.000 cents 1050.000 18: 1130.859 cents 1130.859 19: 2/1 1200.000 octave | 12 from a 17-notes cycle, equal-beating extended fifths (705.5685 c.) sequence 0.0 : 64.9 137.1 209.0 276.0 282.6 348.2 420.4 494.6 559.3 631.5 702.9 770.5 842.6 915.0 974.3 981.6 1053.8 1125.9 1200.0 64.9 : 72.2 144.1 211.1 217.7 283.3 355.5 429.7 494.4 566.6 638.0 705.6 777.7 850.1 909.4 916.7 988.9 1061.0 1135.1 1200.0 137.1 : 71.9 139.0 145.6 211.1 283.3 357.5 422.3 494.4 565.9 633.4 705.6 777.9 837.2 844.5 916.7 988.8 1062.9 1127.8 1200.0 209.0 : 67.0 73.6 139.2 211.4 285.6 350.3 422.5 493.9 561.5 633.6 706.0 765.3 772.6 844.8 916.9 991.0 1055.9 1128.1 1200.0 276.0 : 6.6 72.1 144.3 218.5 283.3 355.5 426.9 494.4 566.6 638.9 698.2 705.6 777.7 849.9 924.0 988.9 1061.0 1133.0 1200.0 282.6 : 65.5 137.7 211.9 276.7 348.9 420.3 487.8 560.0 632.3 691.6 699.0 771.1 843.3 917.4 982.3 1054.4 1126.4 1193.4 1200.0 348.2 : 72.2 146.4 211.2 283.3 354.7 422.3 494.4 566.8 626.1 633.4 705.6 777.7 851.8 916.7 988.9 1060.8 1127.9 1134.5 1200.0 420.4 : 74.2 139.0 211.1 282.6 350.1 422.3 494.6 553.9 561.2 633.4 705.5 779.6 844.5 916.7 988.6 1055.7 1062.3 1127.8 1200.0 494.6 : 64.8 136.9 208.4 275.9 348.1 420.4 479.7 487.0 559.2 631.3 705.4 770.3 842.5 914.4 981.5 988.1 1053.6 1125.8 1200.0 559.3 : 72.2 143.6 211.1 283.3 355.6 414.9 422.3 494.4 566.6 640.7 705.6 777.7 849.7 916.7 923.3 988.8 1061.0 1135.2 1200.0 631.5 : 71.4 139.0 211.1 283.5 342.8 350.1 422.3 494.4 568.5 633.4 705.6 777.5 844.5 851.1 916.7 988.9 1063.1 1127.8 1200.0 702.9 : 67.5 139.7 212.0 271.3 278.7 350.8 423.0 497.1 562.0 634.1 706.1 773.1 779.7 845.3 917.4 991.6 1056.4 1128.6 1200.0 770.5 : 72.2 144.5 203.8 211.1 283.3 355.4 429.5 494.4 566.6 638.5 705.6 712.2 777.7 849.9 924.1 988.9 1061.0 1132.5 1200.0 842.6 : 72.3 131.6 139.0 211.1 283.3 357.4 422.3 494.4 566.4 633.4 640.0 705.6 777.7 851.9 916.7 988.9 1060.3 1127.8 1200.0 915.0 : 59.3 66.6 138.8 210.9 285.0 349.9 422.1 494.0 561.1 567.7 633.2 705.4 779.6 844.4 916.5 988.0 1055.5 1127.7 1200.0 974.3 : 7.3 79.5 151.6 225.7 290.6 362.8 434.7 501.8 508.4 573.9 646.1 720.3 785.1 857.2 928.7 996.2 1068.4 1140.7 1200.0 981.6 : 72.2 144.3 218.4 283.3 355.5 427.4 494.4 501.0 566.6 638.8 713.0 777.7 849.9 921.3 988.9 1061.0 1133.4 1192.7 1200.0 1053.8: 72.1 146.2 211.1 283.3 355.2 422.3 428.9 494.4 566.6 640.8 705.6 777.7 849.2 916.7 988.9 1061.2 1120.5 1127.8 1200.0 1125.9: 74.1 139.0 211.2 283.1 350.1 356.7 422.3 494.5 568.7 633.4 705.6 777.0 844.6 916.7 989.1 1048.4 1055.7 1127.9 1200.0 1200.0 | O3 "17+2" set somewhat like Dudon's Soria 17_2b 0.0 : 57.4 138.3 207.4 264.8 288.3 345.7 416.0 496.9 554.3 635.2 704.3 761.7 842.6 911.7 969.1 992.6 1050.0 1130.9 1200.0 57.4 : 80.9 150.0 207.4 230.9 288.3 358.6 439.5 496.9 577.7 646.9 704.3 785.2 854.3 911.7 935.2 992.6 1073.4 1142.6 1200.0 138.3 : 69.1 126.6 150.0 207.4 277.7 358.6 416.0 496.9 566.0 623.4 704.3 773.4 830.9 854.3 911.7 992.6 1061.7 1119.1 1200.0 207.4 : 57.4 80.9 138.3 208.6 289.5 346.9 427.7 496.9 554.3 635.2 704.3 761.7 785.2 842.6 923.4 992.6 1050.0 1130.9 1200.0 264.8 : 23.4 80.9 151.2 232.0 289.5 370.3 439.5 496.9 577.7 646.9 704.3 727.7 785.2 866.0 935.2 992.6 1073.4 1142.6 1200.0 288.3 : 57.4 127.7 208.6 266.0 346.9 416.0 473.4 554.3 623.4 680.9 704.3 761.7 842.6 911.7 969.1 1050.0 1119.1 1176.6 1200.0 345.7 : 70.3 151.2 208.6 289.5 358.6 416.0 496.9 566.0 623.4 646.9 704.3 785.2 854.3 911.7 992.6 1061.7 1119.1 1142.6 1200.0 416.0 : 80.9 138.3 219.1 288.3 345.7 426.6 495.7 553.1 576.6 634.0 714.8 784.0 841.4 922.3 991.4 1048.8 1072.3 1129.7 1200.0 496.9 : 57.4 138.3 207.4 264.8 345.7 414.8 472.3 495.7 553.1 634.0 703.1 760.5 841.4 910.5 968.0 991.4 1048.8 1119.1 1200.0 554.3 : 80.9 150.0 207.4 288.3 357.4 414.8 438.3 495.7 576.6 645.7 703.1 784.0 853.1 910.5 934.0 991.4 1061.7 1142.6 1200.0 635.2 : 69.1 126.6 207.4 276.6 334.0 357.4 414.8 495.7 564.8 622.3 703.1 772.3 829.7 853.1 910.5 980.9 1061.7 1119.1 1200.0 704.3 : 57.4 138.3 207.4 264.8 288.3 345.7 426.6 495.7 553.1 634.0 703.1 760.5 784.0 841.4 911.7 992.6 1050.0 1130.9 1200.0 761.7 : 80.9 150.0 207.4 230.9 288.3 369.1 438.3 495.7 576.6 645.7 703.1 726.6 784.0 854.3 935.2 992.6 1073.4 1142.6 1200.0 842.6 : 69.1 126.6 150.0 207.4 288.3 357.4 414.8 495.7 564.8 622.3 645.7 703.1 773.4 854.3 911.7 992.6 1061.7 1119.1 1200.0 911.7 : 57.4 80.9 138.3 219.1 288.3 345.7 426.6 495.7 553.1 576.6 634.0 704.3 785.2 842.6 923.4 992.6 1050.0 1130.9 1200.0 969.1 : 23.4 80.9 161.7 230.9 288.3 369.1 438.3 495.7 519.1 576.6 646.9 727.7 785.2 866.0 935.2 992.6 1073.4 1142.6 1200.0 992.6 : 57.4 138.3 207.4 264.8 345.7 414.8 472.3 495.7 553.1 623.4 704.3 761.7 842.6 911.7 969.1 1050.0 1119.1 1176.6 1200.0 1050.0: 80.9 150.0 207.4 288.3 357.4 414.8 438.3 495.7 566.0 646.9 704.3 785.2 854.3 911.7 992.6 1061.7 1119.1 1142.6 1200.0 1130.9: 69.1 126.6 207.4 276.6 334.0 357.4 414.8 485.2 566.0 623.4 704.3 773.4 830.9 911.7 980.9 1038.3 1061.7 1119.1 1200.0 1200.0