| Rod Poole's 17-note tuning (lattice by Kraig Grady) 0: 1/1 0.000 unison, perfect prime 1: 33/32 53.273 undecimal comma, al-Farabi's 1/4-tone 2: 13/12 138.573 tridecimal 2/3-tone 3: 9/8 203.910 major whole tone 4: 7/6 266.871 septimal minor third 5: 11/9 347.408 undecimal neutral third 6: 14/11 417.508 undecimal diminished fourth or major third 7: 4/3 498.045 perfect fourth 8: 11/8 551.318 undecimal semi-augmented fourth 9: 13/9 636.618 tridecimal diminished fifth 10: 3/2 701.955 perfect fifth 11: 14/9 764.916 septimal minor sixth 12: 44/27 845.453 neutral sixth 13: 27/16 905.865 Pythagorean major sixth 14: 7/4 968.826 harmonic seventh 15: 11/6 1049.363 21/4-tone, undecimal neutral seventh 16: 21/11 1119.463 undecimal major seventh 17: 2/1 1200.000 octave | 17-note set with minor septimal intervals 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: 345.703 cents 345.703 6: 414.844 cents 414.844 7: 495.703 cents 495.703 8: 553.125 cents 553.125 9: 633.984 cents 633.984 10: 703.125 cents 703.125 11: 760.547 cents 760.547 12: 841.406 cents 841.406 13: 910.547 cents 910.547 14: 967.969 cents 967.969 15: 1048.828 cents 1048.828 16: 1119.141 cents 1119.141 17: 2/1 1200.000 octave | Rod Poole's 17-note tuning (lattice by Kraig Grady) 1/1 : 33/32 13/12 9/8 7/6 11/9 14/11 4/3 11/8 13/9 3/2 14/9 44/27 27/16 7/4 11/6 21/11 2/1 33/32: 104/99 12/11 112/99 32/27 448/363 128/99 4/3 416/297 16/11 448/297 128/81 18/11 56/33 16/9 224/121 64/33 2/1 13/12: 27/26 14/13 44/39 168/143 16/13 33/26 4/3 18/13 56/39 176/117 81/52 21/13 22/13 252/143 24/13 99/52 2/1 9/8 : 28/27 88/81 112/99 32/27 11/9 104/81 4/3 112/81 352/243 3/2 14/9 44/27 56/33 16/9 11/6 52/27 2/1 7/6 : 22/21 12/11 8/7 33/28 26/21 9/7 4/3 88/63 81/56 3/2 11/7 18/11 12/7 99/56 13/7 27/14 2/1 11/9 : 126/121 12/11 9/8 13/11 27/22 14/11 4/3 243/176 63/44 3/2 189/121 18/11 27/16 39/22 81/44 21/11 2/1 14/11: 22/21 121/112 143/126 33/28 11/9 242/189 297/224 11/8 121/84 3/2 11/7 363/224 143/84 99/56 11/6 121/63 2/1 4/3 : 33/32 13/12 9/8 7/6 11/9 81/64 21/16 11/8 63/44 3/2 99/64 13/8 27/16 7/4 11/6 21/11 2/1 11/8 : 104/99 12/11 112/99 32/27 27/22 14/11 4/3 168/121 16/11 3/2 52/33 18/11 56/33 16/9 224/121 64/33 2/1 13/9 : 27/26 14/13 44/39 243/208 63/52 33/26 189/143 18/13 297/208 3/2 81/52 21/13 22/13 252/143 24/13 99/52 2/1 3/2 : 28/27 88/81 9/8 7/6 11/9 14/11 4/3 11/8 13/9 3/2 14/9 44/27 56/33 16/9 11/6 52/27 2/1 14/9 : 22/21 243/224 9/8 33/28 27/22 9/7 297/224 39/28 81/56 3/2 11/7 18/11 12/7 99/56 13/7 27/14 2/1 44/27: 729/704 189/176 9/8 567/484 27/22 81/64 117/88 243/176 63/44 3/2 189/121 18/11 27/16 39/22 81/44 21/11 2/1 27/16: 28/27 88/81 112/99 32/27 11/9 104/81 4/3 112/81 352/243 448/297 128/81 44/27 416/243 16/9 448/243 1408/729 2/1 7/4 : 22/21 12/11 8/7 33/28 26/21 9/7 4/3 88/63 16/11 32/21 11/7 104/63 12/7 16/9 352/189 27/14 2/1 11/6 : 126/121 12/11 9/8 13/11 27/22 14/11 4/3 168/121 16/11 3/2 52/33 18/11 56/33 16/9 81/44 21/11 2/1 21/11: 22/21 121/112 143/126 33/28 11/9 242/189 4/3 88/63 121/84 286/189 11/7 44/27 968/567 99/56 11/6 121/63 2/1 2/1 | Rod Poole's 17-note tuning (lattice by Kraig Grady) 0.0 : 53.3 138.6 203.9 266.9 347.4 417.5 498.0 551.3 636.6 702.0 764.9 845.5 905.9 968.8 1049.4 1119.5 1200.0 53.3 : 85.3 150.6 213.6 294.1 364.2 444.8 498.0 583.3 648.7 711.6 792.2 852.6 915.6 996.1 1066.2 1146.7 1200.0 138.6 : 65.3 128.3 208.8 278.9 359.5 412.7 498.0 563.4 626.3 706.9 767.3 830.3 910.8 980.9 1061.4 1114.7 1200.0 203.9 : 63.0 143.5 213.6 294.1 347.4 432.7 498.0 561.0 641.5 702.0 764.9 845.5 915.6 996.1 1049.4 1134.7 1200.0 266.9 : 80.5 150.6 231.2 284.4 369.7 435.1 498.0 578.6 639.0 702.0 782.5 852.6 933.1 986.4 1071.7 1137.0 1200.0 347.4 : 70.1 150.6 203.9 289.2 354.5 417.5 498.0 558.5 621.4 702.0 772.1 852.6 905.9 991.2 1056.5 1119.5 1200.0 417.5 : 80.5 133.8 219.1 284.4 347.4 427.9 488.4 551.3 631.9 702.0 782.5 835.8 921.1 986.4 1049.4 1129.9 1200.0 498.0 : 53.3 138.6 203.9 266.9 347.4 407.8 470.8 551.3 621.4 702.0 755.2 840.5 905.9 968.8 1049.4 1119.5 1200.0 551.3 : 85.3 150.6 213.6 294.1 354.5 417.5 498.0 568.1 648.7 702.0 787.3 852.6 915.6 996.1 1066.2 1146.7 1200.0 636.6 : 65.3 128.3 208.8 269.2 332.2 412.7 482.8 563.4 616.7 702.0 767.3 830.3 910.8 980.9 1061.4 1114.7 1200.0 702.0 : 63.0 143.5 203.9 266.9 347.4 417.5 498.0 551.3 636.6 702.0 764.9 845.5 915.6 996.1 1049.4 1134.7 1200.0 764.9 : 80.5 140.9 203.9 284.4 354.5 435.1 488.4 573.7 639.0 702.0 782.5 852.6 933.1 986.4 1071.7 1137.0 1200.0 845.5 : 60.4 123.4 203.9 274.0 354.5 407.8 493.1 558.5 621.4 702.0 772.1 852.6 905.9 991.2 1056.5 1119.5 1200.0 905.9 : 63.0 143.5 213.6 294.1 347.4 432.7 498.0 561.0 641.5 711.6 792.2 845.5 930.8 996.1 1059.1 1139.6 1200.0 968.8 : 80.5 150.6 231.2 284.4 369.7 435.1 498.0 578.6 648.7 729.2 782.5 867.8 933.1 996.1 1076.6 1137.0 1200.0 1049.4: 70.1 150.6 203.9 289.2 354.5 417.5 498.0 568.1 648.7 702.0 787.3 852.6 915.6 996.1 1056.5 1119.5 1200.0 1119.5: 80.5 133.8 219.1 284.4 347.4 427.9 498.0 578.6 631.9 717.2 782.5 845.5 926.0 986.4 1049.4 1129.9 1200.0 1200.0 | 17-note set with minor septimal intervals 0.0 : 57.4 138.3 207.4 264.8 345.7 414.8 495.7 553.1 634.0 703.1 760.5 841.4 910.5 968.0 1048.8 1119.1 1200.0 57.4 : 80.9 150.0 207.4 288.3 357.4 438.3 495.7 576.6 645.7 703.1 784.0 853.1 910.5 991.4 1061.7 1142.6 1200.0 138.3 : 69.1 126.6 207.4 276.6 357.4 414.8 495.7 564.8 622.3 703.1 772.3 829.7 910.5 980.9 1061.7 1119.1 1200.0 207.4 : 57.4 138.3 207.4 288.3 345.7 426.6 495.7 553.1 634.0 703.1 760.5 841.4 911.7 992.6 1050.0 1130.9 1200.0 264.8 : 80.9 150.0 230.9 288.3 369.1 438.3 495.7 576.6 645.7 703.1 784.0 854.3 935.2 992.6 1073.4 1142.6 1200.0 345.7 : 69.1 150.0 207.4 288.3 357.4 414.8 495.7 564.8 622.3 703.1 773.4 854.3 911.7 992.6 1061.7 1119.1 1200.0 414.8 : 80.9 138.3 219.1 288.3 345.7 426.6 495.7 553.1 634.0 704.3 785.2 842.6 923.4 992.6 1050.0 1130.9 1200.0 495.7 : 57.4 138.3 207.4 264.8 345.7 414.8 472.3 553.1 623.4 704.3 761.7 842.6 911.7 969.1 1050.0 1119.1 1200.0 553.1 : 80.9 150.0 207.4 288.3 357.4 414.8 495.7 566.0 646.9 704.3 785.2 854.3 911.7 992.6 1061.7 1142.6 1200.0 634.0 : 69.1 126.6 207.4 276.6 334.0 414.8 485.2 566.0 623.4 704.3 773.4 830.9 911.7 980.9 1061.7 1119.1 1200.0 703.1 : 57.4 138.3 207.4 264.8 345.7 416.0 496.9 554.3 635.2 704.3 761.7 842.6 911.7 992.6 1050.0 1130.9 1200.0 760.5 : 80.9 150.0 207.4 288.3 358.6 439.5 496.9 577.7 646.9 704.3 785.2 854.3 935.2 992.6 1073.4 1142.6 1200.0 841.4 : 69.1 126.6 207.4 277.7 358.6 416.0 496.9 566.0 623.4 704.3 773.4 854.3 911.7 992.6 1061.7 1119.1 1200.0 910.5 : 57.4 138.3 208.6 289.5 346.9 427.7 496.9 554.3 635.2 704.3 785.2 842.6 923.4 992.6 1050.0 1130.9 1200.0 968.0 : 80.9 151.2 232.0 289.5 370.3 439.5 496.9 577.7 646.9 727.7 785.2 866.0 935.2 992.6 1073.4 1142.6 1200.0 1048.8: 70.3 151.2 208.6 289.5 358.6 416.0 496.9 566.0 646.9 704.3 785.2 854.3 911.7 992.6 1061.7 1119.1 1200.0 1119.1: 80.9 138.3 219.1 288.3 345.7 426.6 495.7 576.6 634.0 714.8 784.0 841.4 922.3 991.4 1048.8 1129.7 1200.0 1200.0