User:Moremajorthanmajor/8L 3s (perfect twelfth-equivalent): Difference between revisions

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Line 152: Line 152:
|7L+4s
|7L+4s
|-
|-
| colspan="8" style="text-align:center" |The chromatic 19-note MOS (either [[8L 11s (tritave equivalent)|8L 11s]], [[11L 8s (tritave equivalent)|11L 8s]], or [[19edt]]) also has the following intervals (from some root):
| colspan="8" style="text-align:center" |The chromatic 19-note MOS (either [[8L 11s (perfect twelfth equivalent)|8L 11s]], [[11L 8s (perfect twelfth equivalent)|11L 8s]], or [[19edt]]) also has the following intervals (from some root):
|-
|-
|12
|12
Line 238: Line 238:
|minor 2nd
|minor 2nd
|1\19, 100.00
|1\19, 100.00
|1\27, 70.59 (70.37)
|1\27, 70.59
|2\30, 126.32 (126.67)
|2\30, 126.32  
|Hf
|Hf
| -8
| -8
Line 245: Line 245:
|major 2nd
|major 2nd
|2\19, 200.00
|2\19, 200.00
|3\27, 211.765 (211.11)
|3\27, 211.765
|3\30, 189.47 (190.00)
|3\30, 189.47
|H
|H
|3
|3
Line 252: Line 252:
|minor 3rd
|minor 3rd
|3\19, 300.00
|3\19, 300.00
|4\27, 282.35 (281.48)
|4\27, 282.35
|5\30, 315.79 (316.67)
|5\30, 315.79
|Jf
|Jf
| -5
| -5
Line 259: Line 259:
|major 3rd
|major 3rd
|4\19, 400.00
|4\19, 400.00
|6\27, 423.53 (422.22)
|6\27, 423.53
|6\30, 378.95 (380.00)
|6\30, 378.95
|J
|J
|6
|6
Line 266: Line 266:
|natural 4th
|natural 4th
|5\19, 500.00
|5\19, 500.00
|7\27, 494.12 (493.59)
|7\27, 494.12
|8\30, 505,26 (506.67)
|8\30, 505,26
|K
|K
| -2
| -2
Line 273: Line 273:
|augmented 4th
|augmented 4th
| rowspan="2" |6\19, 600.00
| rowspan="2" |6\19, 600.00
|9\27, 635.29 (633.33)
|9\27, 635.29
|9\30, 568.42 (570.00)
|9\30, 568.42
|K#
|K#
|9
|9
|-
|-
|diminished 5th
|diminished 5th
|8\27, 564.71 (562.96)
|8\27, 564.71
|10\30, 631.58 (633.33)
|10\30, 631.58
|Lf
|Lf
| -10
| -10
Line 286: Line 286:
|perfect 5th
|perfect 5th
|7\19, 700.00
|7\19, 700.00
|10\27, 705.88 (703.70)
|10\27, 705.88
|11\30, 694.74 (696.67)
|11\30, 694.74
|L
|L
|1
|1
Line 293: Line 293:
|minor 6th
|minor 6th
|8\19, 800.00
|8\19, 800.00
|11\27, 776.47 (774.07)
|11\27, 776.47
|13\30, 821.05 (823.33)
|13\30, 821.05
|Af
|Af
| -7
| -7
Line 300: Line 300:
|major 6th
|major 6th
|9\19, 900.00
|9\19, 900.00
|13\27, 917.65 (914.81)
|13\27, 917.65
|14\30, 884.21 (886.67)
|14\30, 884.21
|A
|A
|4
|4
Line 307: Line 307:
|minor 7th
|minor 7th
|10\19, 1000.00
|10\19, 1000.00
|14\27, 988.235 (985.19)
|14\27, 988.235
|16\30, 1010.53 (1013.33)
|16\30, 1010.53
|Bf
|Bf
| -4
| -4
Line 314: Line 314:
|major 7th
|major 7th
|11\19, 1100.00
|11\19, 1100.00
|16\27, 1129.42 (1125.93)
|16\27, 1129.42
|17\30, 1073.68 (1076.67)
|17\30, 1073.68
|B
|B
|7
|7
Line 321: Line 321:
|perfect octave
|perfect octave
|12\19, 1200.00
|12\19, 1200.00
|17\27, 1200.00 (1196.30)
|17\27, 1200.00
|19\30, 1200.00 (1203.33)
|19\30, 1200.00
|C
|C
| -1
| -1
Line 328: Line 328:
|augmented octave
|augmented octave
| rowspan="2" |13\19, 1300.00
| rowspan="2" |13\19, 1300.00
|19\27, 1341.18 (1337.04)
|19\27, 1341.18
|20\30, 1263.16 (1266.67)
|20\30, 1263.16
|C#
|C#
|10
|10
|-
|-
|minor 9th
|minor 9th
|18\27, 1270.59 (1266.67)
|18\27, 1270.59
|21\30, 1326.32 (1330.00)
|21\30, 1326.32
|Df
|Df
| -9
| -9
Line 341: Line 341:
|major 9th
|major 9th
|14\19, 1400.00
|14\19, 1400.00
|20\27, 1411.765 (1406.07)
|20\27, 1411.765
|22\30, 1389.47 (1393.33)
|22\30, 1389.47
|D
|D
|2
|2
Line 348: Line 348:
|minor 10th
|minor 10th
|15\19, 1500.00
|15\19, 1500.00
|21\27, 1482.35 (1477.78)
|21\27, 1482.35
|24\30, 1515.79 (1520.00)
|24\30, 1515.79
|Ef
|Ef
| -6
| -6
Line 355: Line 355:
|major 10th
|major 10th
|16\19, 1600.00
|16\19, 1600.00
|23\27, 1623.53 (1618.52)
|23\27, 1623.53
|25\30, 1578.95 (1583.33)
|25\30, 1578.95
|E
|E
|5
|5
Line 362: Line 362:
|natural 11th
|natural 11th
|17\19, 1700.00
|17\19, 1700.00
|24\27, 1694.12 (1688.89)
|24\27, 1694.12
|27\30, 1705.26 (1710.00)
|27\30, 1705.26
|Ff
|Ff
| -3
| -3
Line 369: Line 369:
|augmented 11th
|augmented 11th
|18\19, 1800.00
|18\19, 1800.00
|26\27, 1835.29 (1829.63)
|26\27, 1835.29  
|28\30, 1768.42 (1773.33)
|28\30, 1768.42
|F
|F
|8
|8
Line 392: Line 392:
|generator (g)
|generator (g)
|7\19, 700.00
|7\19, 700.00
|10\27, 705.88 (703.70)
|10\27, 705.88
|17\46, 703.45 (702.17)
|17\46, 703.45
|-
|-
|L (3g - ~tritave)
|L (3g - ~tritave)
|2\19, 200.00
|2\19, 200.00
|3\27, 211.765 (211.11)
|3\27, 211.765
|5\46, 206.90 (206.52)
|5\46, 206.90
|-
|-
|s (-8g + 3 ~tritaves)
|s (-8g + 3 ~tritaves)
|1\19, 100.00
|1\19, 100.00
|1\27, 70.59 (70.37)
|1\27, 70.59
|2\46, 82.76 (82.61)
|2\46, 82.76
|}
|}
====Intervals====
====Intervals====
Line 425: Line 425:
|minor 2nd
|minor 2nd
|1\19, 100.00
|1\19, 100.00
|1\27, 70.59 (70.37)
|1\27, 70.59
|2\46, 82.76 (82.61)
|2\46, 82.76
|Hf
|Hf
| -8
| -8
Line 432: Line 432:
|major 2nd
|major 2nd
|2\19, 200.00
|2\19, 200.00
|3\27, 211.765 (211.11)
|3\27, 211.765
|5\46, 206.90 (206.52)
|5\46, 206.90
|H
|H
|3
|3
Line 439: Line 439:
|minor 3rd
|minor 3rd
|3\19, 300.00
|3\19, 300.00
|4\27, 282.35 (281.48)
|4\27, 282.35
|7\46, 289.655 (289.13)
|7\46, 289.655
|Jf
|Jf
| -5
| -5
Line 446: Line 446:
|major 3rd
|major 3rd
|4\19, 400.00
|4\19, 400.00
|6\27, 423.53 (422.22)
|6\27, 423.53
|10\46, 413.79 (413.04)
|10\46, 413.79
|J
|J
|6
|6
Line 453: Line 453:
|natural 4th
|natural 4th
|5\19, 500.00
|5\19, 500.00
|7\27, 494.12 (493.59)
|7\27, 494.12
|12\46, 496.55 (495.65)
|12\46, 496.55
|K
|K
| -2
| -2
Line 460: Line 460:
|augmented 4th
|augmented 4th
| rowspan="2" |6\19, 600.00
| rowspan="2" |6\19, 600.00
|9\27, 635.29 (633.33)
|9\27, 635.29
|15\46, 620.69 (619.565)
|15\46, 620.69
|K#
|K#
|9
|9
|-
|-
|diminished 5th
|diminished 5th
|8\27, 564.71 (562.96)
|8\27, 564.71
|14\46, 579.31 (578.26)
|14\46, 579.31
|Lf
|Lf
| -10
| -10
Line 473: Line 473:
|perfect 5th
|perfect 5th
|7\19, 700.00
|7\19, 700.00
|10\27, 705.88 (703.70)
|10\27, 705.88
|17\46, 703.45 (702.17)
|17\46, 703.45
|L
|L
|1
|1
Line 480: Line 480:
|minor 6th
|minor 6th
|8\19, 800.00
|8\19, 800.00
|11\27, 776.47 (774.07)
|11\27, 776.47
|19\46, 786.21 (784.78)
|19\46, 786.21
|Af
|Af
| -7
| -7
Line 487: Line 487:
|major 6th
|major 6th
|9\19, 900.00
|9\19, 900.00
|13\27, 917.65 (914.81)
|13\27, 917.65
|22\46, 910.345 (908.70)
|22\46, 910.345
|A
|A
|4
|4
Line 494: Line 494:
|minor 7th
|minor 7th
|10\19, 1000.00
|10\19, 1000.00
|14\27, 988.235 (985.19)
|14\27, 988.235
|24\46, 993.10 (991.30)
|24\46, 993.10
|Bf
|Bf
| -4
| -4
Line 501: Line 501:
|major 7th
|major 7th
|11\19, 1100.00
|11\19, 1100.00
|16\27, 1129.42 (1125.93)
|16\27, 1129.42
|27\46, 1117.24 (1115.22)
|27\46, 1117.24
|B
|B
|7
|7
Line 508: Line 508:
|perfect octave
|perfect octave
|12\19, 1200.00
|12\19, 1200.00
|17\27, 1200.00 (1196.30)
|17\27, 1200.00
|29\46, 1200.00 (1197.83)
|29\46, 1200.00
|C
|C
| -1
| -1
Line 515: Line 515:
|augmented octave
|augmented octave
| rowspan="2" |13\19, 1300.00
| rowspan="2" |13\19, 1300.00
|19\27, 1341.18 (1337.04)
|19\27, 1341.18
|32\46, 1324.14 (1321.74)
|32\46, 1324.14
|C#
|C#
|10
|10
|-
|-
|minor 9th
|minor 9th
|18\27, 1270.59 (1266.67)
|18\27, 1270.59
|31\46, 1282.76 (1280.435)
|31\46, 1282.76
|Df
|Df
| -9
| -9
Line 528: Line 528:
|major 9th
|major 9th
|14\19, 1400.00
|14\19, 1400.00
|20\27, 1411.765 (1406.07)
|20\27, 1411.765
|34\46, 1406.90 (1404.35)
|34\46, 1406.90
|D
|D
|2
|2
Line 535: Line 535:
|minor 10th
|minor 10th
|15\19, 1500.00
|15\19, 1500.00
|21\27, 1482.35 (1477.78)
|21\27, 1482.35
|36\46, 1489.655 (1486.96)
|36\46, 1489.655
|Ef
|Ef
| -6
| -6
Line 542: Line 542:
|major 10th
|major 10th
|16\19, 1600.00
|16\19, 1600.00
|23\27, 1623.53 (1618.52)
|23\27, 1623.53
|39\46, 1613.79 (1610.87)
|39\46, 1613.79
|E
|E
|5
|5
Line 549: Line 549:
|natural 11th
|natural 11th
|17\19, 1700.00
|17\19, 1700.00
|24\27, 1694.12 (1688.89)
|24\27, 1694.12
|41\46, 1696.55 (1693.48)
|41\46, 1696.55
|Ff
|Ff
| -3
| -3
Line 556: Line 556:
|augmented 11th
|augmented 11th
|18\19, 1800.00
|18\19, 1800.00
|26\27, 1835.29 (1829.63)
|26\27, 1835.29  
|44\46, 1820.69 (1817.39)
|44\46, 1820.69
|F
|F
|8
|8
Line 573: Line 573:
|-
|-
|generator (g)
|generator (g)
|11\30, 694.74 (696.67)
|11\30, 694.74
|18\49, 696.77 (697.96)
|18\49, 696.77
|-
|-
|L (3g - ~tritave)
|L (3g - ~tritave)
|3\30, 189.47 (190.00)
|3\30, 189.47
|5\49, 193.55 (193.87)
|5\49, 193.55  
|-
|-
|s (-8g + 3 ~tritaves)
|s (-8g + 3 ~tritaves)
|2\30, 126.32 (126.67)
|2\30, 126.32  
|3\49, 116.13 (116.33)
|3\49, 116.13
|}
|}
====Intervals====
====Intervals====
Line 603: Line 603:
|-
|-
|minor 2nd
|minor 2nd
|2\30, 126.32 (126.67)
|2\30, 126.32  
|3\49, 116.13 (116.33)
|3\49, 116.13
|Hf
|Hf
|16/15
|16/15
Line 610: Line 610:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|major 2nd
|major 2nd
|3\30, 189.47 (190.00)
|3\30, 189.47
|5\49, 193.55 (193.87)
|5\49, 193.55  
|H
|H
|10/9, 9/8
|10/9, 9/8
Line 617: Line 617:
|-
|-
|minor 3rd
|minor 3rd
|5\30, 315.79 (316.67)
|5\30, 315.79
|8\49, 309.68 (310.20)
|8\49, 309.68
|Jf
|Jf
|6/5
|6/5
Line 624: Line 624:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|major 3rd
|major 3rd
|6\30, 378.95 (380.00)
|6\30, 378.95
|10\49, 387.10 (387.755)
|10\49, 387.10
|J
|J
|5/4
|5/4
Line 631: Line 631:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|natural 4th
|natural 4th
|8\30, 505,26 (506.67)
|8\30, 505,26
|13\49, 503.23 (504.08)
|13\49, 503.23
|K
|K
|4/3
|4/3
Line 638: Line 638:
|-
|-
|augmented 4th
|augmented 4th
|9\30, 568.42 (570.00)
|9\30, 568.42
|15\49, 580.645 (581.63)
|15\49, 580.645
|K#
|K#
|7/5
|7/5
Line 645: Line 645:
|-
|-
|diminished 5th
|diminished 5th
|10\30, 631.58 (633.33)
|10\30, 631.58
|16\49, 619.355 (620.41)
|16\49, 619.355
|Lf
|Lf
|10/7
|10/7
Line 652: Line 652:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|perfect 5th
|perfect 5th
|11\30, 694.74 (696.67)
|11\30, 694.74
|18\49, 696.77 (697.96)
|18\49, 696.77
|L
|L
|3/2
|3/2
Line 659: Line 659:
|-
|-
|minor 6th
|minor 6th
|13\30, 821.05 (823.33)
|13\30, 821.05
|21\49, 812.90 (814.29)
|21\49, 812.90
|Af
|Af
|8/5
|8/5
Line 666: Line 666:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|major 6th
|major 6th
|14\30, 884.21 (886.67)
|14\30, 884.21
|23\49, 890.32 (891.84)
|23\49, 890.32
|A
|A
|5/3
|5/3
Line 673: Line 673:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|minor 7th
|minor 7th
|16\30, 1010.53 (1013.33)
|16\30, 1010.53
|26\49, 1006.45 (1008.16)
|26\49, 1006.45
|Bf
|Bf
|16/9, 9/5
|16/9, 9/5
Line 680: Line 680:
|-
|-
|major 7th
|major 7th
|17\30, 1073.68 (1076.67)
|17\30, 1073.68
|28\49, 1083.87 (1085.71)
|28\49, 1083.87
|B
|B
|15/8
|15/8
Line 687: Line 687:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|perfect octave
|perfect octave
|19\30, 1200.00 (1203.33)
|19\30, 1200.00
|31\49, 1200.00 (1202.04)
|31\49, 1200.00
|C
|C
|2/1
|2/1
Line 694: Line 694:
|-
|-
|augmented octave
|augmented octave
|20\30, 1263.16 (1266.67)
|20\30, 1263.16
|33\49, 1277.42 (1279.59)
|33\49, 1277.42
|C#
|C#
|25/24
|25/24
Line 701: Line 701:
|-
|-
|minor 9th
|minor 9th
|21\30, 1326.32 (1330.00)
|21\30, 1326.32
|34\49, 1316.13 (1318.37)
|34\49, 1316.13
|Df
|Df
|15/7
|15/7
Line 708: Line 708:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|major 9th
|major 9th
|22\30, 1389.47 (1393.33)
|22\30, 1389.47
|36\49, 1393.55 (1395.92)
|36\49, 1393.55
|D
|D
|20/9, 9/4
|20/9, 9/4
Line 715: Line 715:
|-
|-
|minor 10th
|minor 10th
|24\30, 1515.79 (1520.00)
|24\30, 1515.79
|39\49, 1508.68 (1512.245)
|39\49, 1508.68
|Ef
|Ef
|12/5
|12/5
Line 722: Line 722:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|major 10th
|major 10th
|25\30, 1578.95 (1583.33)
|25\30, 1578.95
|41\49, 1587.10 (1590.80)
|41\49, 1587.10
|E
|E
|5/2
|5/2
Line 729: Line 729:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|natural 11th
|natural 11th
|27\30, 1705.26 (1710.00)
|27\30, 1705.26
|44\49, 1703.23 (1706.13j
|44\49, 1703.23
|Ff
|Ff
|8/3
|8/3
Line 736: Line 736:
|-
|-
|augmented 11th
|augmented 11th
|28\30, 1768.42 (1773.33)
|28\30, 1768.42
|46\49, 1780.645 (1783.67)
|46\49, 1780.645
|F
|F
|14/5
|14/5
Line 753: Line 753:
|-
|-
|generator (g)
|generator (g)
|15\41, 692.31 (695.12)
|15\41, 692.31
|19\52, 690.91 (694.23)
|19\52, 690.91
|-
|-
|L (3g - ~tritave)
|L (3g - ~tritave)
|4\41, 184.615 (185.37)
|4\41, 184.615
|5\52, 181.81 (182.69)
|5\52, 181.81
|-
|-
|s (-8g + 3 ~tritaves)
|s (-8g + 3 ~tritaves)
|3\41, 138.46 (139.02)
|3\41, 138.46  
|4\52, 145.455 (146.15)
|4\52, 145.455
|}
|}
====Intervals====
====Intervals====
Line 781: Line 781:
|-
|-
|chroma
|chroma
|1\41, 46.15 (46.34)
|1\41, 46.15
|G#
|G#
|[[33/32]], [[49/48]], [[36/35]], [[25/24]]
|[[33/32]], [[49/48]], [[36/35]], [[25/24]]
Line 787: Line 787:
|-
|-
|diminished 2nd
|diminished 2nd
|2\41, 92.31 (92.68)
|2\41, 92.31
|Hff
|Hff
|[[21/20]], [[22/21]], [[26/25]]
|[[21/20]], [[22/21]], [[26/25]]
Line 793: Line 793:
|-
|-
|minor 2nd
|minor 2nd
|3\41, 138.46 (139.02)
|3\41, 138.46
|Hf
|Hf
|[[12/11]], [[13/12]], [[14/13]], [[16/15]]
|[[12/11]], [[13/12]], [[14/13]], [[16/15]]
Line 799: Line 799:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|major 2nd
|major 2nd
|4\41, 184.615 (185.37)
|4\41, 184.615
|H
|H
|[[9/8]], [[10/9]], [[11/10]]
|[[9/8]], [[10/9]], [[11/10]]
Line 805: Line 805:
|-
|-
|augmented 2nd
|augmented 2nd
|5\41, 230.77 (231.71)
|5\41, 230.77
|H#
|H#
|[[8/7]], [[15/13]]
|[[8/7]], [[15/13]]
Line 811: Line 811:
|-
|-
|diminished 3rd
|diminished 3rd
|6\41, 276.92 (278.05)
|6\41, 276.92
|Jff
|Jff
|[[7/6]], [[13/11]], [[33/28]]
|[[7/6]], [[13/11]], [[33/28]]
Line 817: Line 817:
|-
|-
|minor 3rd
|minor 3rd
|7\41, 323.08 (324.39)
|7\41, 323.08
|Jf
|Jf
|[[135/112]], [[6/5]]
|[[135/112]], [[6/5]]
Line 823: Line 823:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|major 3rd
|major 3rd
|8\41, 369.23 (370.73)
|8\41, 369.23
|J
|J
|[[5/4]], [[11/9]], [[16/13]]
|[[5/4]], [[11/9]], [[16/13]]
Line 829: Line 829:
|-
|-
|augmented 3rd
|augmented 3rd
|9\41, 415.385 (417.07)
|9\41, 415.385
|J#
|J#
|[[9/7]], [[14/11]], [[33/26]]
|[[9/7]], [[14/11]], [[33/26]]
Line 835: Line 835:
|-
|-
|diminished 4th
|diminished 4th
|10\41, 461.54 (463.415)
|10\41, 461.54
|Kff
|Kff
|[[21/16]], [[13/10]]
|[[21/16]], [[13/10]]
Line 841: Line 841:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|natural 4th
|natural 4th
|11\41, 507.69 (509.76)
|11\41, 507.69
|Kf
|Kf
|[[75/56]], [[4/3]]
|[[75/56]], [[4/3]]
Line 847: Line 847:
|-
|-
|augmented 4th
|augmented 4th
|12\41, 553.85 (556.10)
|12\41, 553.85
|K
|K
|[[11/8]], [[18/13]]
|[[11/8]], [[18/13]]
Line 853: Line 853:
|-
|-
|doubly augmented 4th, doubly diminished 5th
|doubly augmented 4th, doubly diminished 5th
|13\41, 600.00 (602.44)
|13\41, 600.00
|K#, Lff
|K#, Lff
|[[7/5]], [[10/7]]
|[[7/5]], [[10/7]]
Line 859: Line 859:
|-
|-
|diminished 5th
|diminished 5th
|14\41, 646.15 (648.78)
|14\41, 646.15
|Lf
|Lf
|[[16/11]], [[13/9]]
|[[16/11]], [[13/9]]
Line 865: Line 865:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|perfect 5th
|perfect 5th
|15\41, 692.31 (695.12)
|15\41, 692.31
|L
|L
|[[112/75]], [[3/2]]
|[[112/75]], [[3/2]]
Line 871: Line 871:
|-
|-
|augmented 5th
|augmented 5th
|16\41, 738.46 (741.46)
|16\41, 738.46
|L#
|L#
|[[32/21]], [[20/13]]
|[[32/21]], [[20/13]]
Line 877: Line 877:
|-
|-
|diminished 6th
|diminished 6th
|17\41, 784.615 (787.805)
|17\41, 784.615
|Aff
|Aff
|[[11/7]], [[14/9]]
|[[11/7]], [[14/9]]
Line 883: Line 883:
|-
|-
|minor 6th
|minor 6th
|18\41, 830.77 (834.15)
|18\41, 830.77
|Af
|Af
|[[13/8]], [[8/5]]
|[[13/8]], [[8/5]]
Line 889: Line 889:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|major 6th
|major 6th
|19\41, 876.92 (880.49)
|19\41, 876.92
|A
|A
|[[5/3]], [[224/135]]
|[[5/3]], [[224/135]]
Line 895: Line 895:
|-
|-
|augmented 6th
|augmented 6th
|20\41, 923.08 (926.83)
|20\41, 923.08
|A#
|A#
|[[12/7]], [[22/13]]
|[[12/7]], [[22/13]]
Line 901: Line 901:
|-
|-
|diminished 7th
|diminished 7th
|21\41, 969.23 (973.17)
|21\41, 969.23
|Bff
|Bff
|[[7/4]], [[26/15]]
|[[7/4]], [[26/15]]
Line 907: Line 907:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|minor 7th
|minor 7th
|22\41, 1015.385 (1019.51)
|22\41, 1015.385
|Bf
|Bf
|[[9/5]], [[16/9]], [[20/11]]
|[[9/5]], [[16/9]], [[20/11]]
Line 913: Line 913:
|-
|-
|major 7th
|major 7th
|23\41, 1061.54 (1065.85)
|23\41, 1061.54
|B
|B
|[[11/6]], [[13/7]], [[15/8]], [[24/13]]
|[[11/6]], [[13/7]], [[15/8]], [[24/13]]
Line 919: Line 919:
|-
|-
|augmented 7th
|augmented 7th
|24\41, 1107.69 (1112.195)
|24\41, 1107.69
|B#
|B#
|[[21/11]], [[25/13]], [[40/21]]
|[[21/11]], [[25/13]], [[40/21]]
Line 925: Line 925:
|-
|-
|diminished octave
|diminished octave
|25\41, 1153.85 (1158.54)
|25\41, 1153.85
|Cf
|Cf
|[[64/33]], [[96/49]], [[35/18]], [[48/25]]
|[[64/33]], [[96/49]], [[35/18]], [[48/25]]
Line 931: Line 931:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|perfect octave
|perfect octave
|26\41, 1200.00 (1204.88)
|26\41, 1200.00
|C
|C
|2/1
|2/1
Line 937: Line 937:
|-
|-
|augmented octave
|augmented octave
|27\41, 1246.15 (1251.22)
|27\41, 1246.15
|C#
|C#
|33/16, 49/24, 72/35, 25/12
|33/16, 49/24, 72/35, 25/12
Line 943: Line 943:
|-
|-
|doubly augmented octave, diminished 9th
|doubly augmented octave, diminished 9th
|28\41, 1292.31 (1297.56)
|28\41, 1292.31
|Cx, Dff
|Cx, Dff
|21/10, 44/21, 52/25
|21/10, 44/21, 52/25
Line 949: Line 949:
|-
|-
|minor 9th
|minor 9th
|29\41, 1338.46 (1343.90)
|29\41, 1338.46
|Df
|Df
|24/11, 13/6, 28/13, 32/15
|24/11, 13/6, 28/13, 32/15
Line 955: Line 955:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|major 9th
|major 9th
|30\41, 1384.615 (1390.24)
|30\41, 1384.615
|D
|D
|9/4, 20/9, 11/5
|9/4, 20/9, 11/5
Line 961: Line 961:
|-
|-
|augmented 9th
|augmented 9th
|31\41, 1430.77 (1436.595)
|31\41, 1430.77
|D#
|D#
|16/7, 30/13
|16/7, 30/13
Line 967: Line 967:
|-
|-
|diminished 10th
|diminished 10th
|32\41, 1476.92 (1492.93)
|32\41, 1476.92
|Eff
|Eff
|7/3, 26/11, 33/14
|7/3, 26/11, 33/14
Line 973: Line 973:
|-
|-
|minor 10th
|minor 10th
|33\41, 1523.08 (1529.27)
|33\41, 1523.08
|Ef
|Ef
|135/56, 12/5
|135/56, 12/5
Line 979: Line 979:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|major 10th
|major 10th
|34\41, 1569.23 (1575.61)
|34\41, 1569.23
|E
|E
|5/2, 22/9, 32/13
|5/2, 22/9, 32/13
Line 985: Line 985:
|-
|-
|augmented 10th
|augmented 10th
|35\41, 1615.385 (1621.95)
|35\41, 1615.385
|E#
|E#
|18/7, 28/11, 33/13
|18/7, 28/11, 33/13
Line 991: Line 991:
|-
|-
|diminished 11th
|diminished 11th
|36\41, 1661.54 (1668.29)
|36\41, 1661.54
|Ff
|Ff
|21/8, 13/5
|21/8, 13/5
Line 997: Line 997:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|natural 11th
|natural 11th
|37\41, 1709.69 (1714.63)
|37\41, 1709.69
|F
|F
|75/28, 8/3
|75/28, 8/3
Line 1,003: Line 1,003:
|-
|-
|augmented 11th
|augmented 11th
|38\41, 1753.85 (1760.98)
|38\41, 1753.85
|F#
|F#
|11/4, 36/13
|11/4, 36/13
Line 1,009: Line 1,009:
|-
|-
|doubly augmented 11th, doubly diminished 12th
|doubly augmented 11th, doubly diminished 12th
|39\41, 1800.00 (1807.32)
|39\41, 1800.00
|Fx, Gff
|Fx, Gff
|14/5, 20/7
|14/5, 20/7
Line 1,015: Line 1,015:
|-
|-
|diminished 12th
|diminished 12th
|40\41, 1846.15 (1853.66)
|40\41, 1846.15
|Gf
|Gf
|32/11, 26/9
|32/11, 26/9
Line 1,039: Line 1,039:
|-
|-
|chroma
|chroma
|3\35, 163.64 (162.86)
|3\35, 163.64
|G#
|G#
|[[12/11]], [[11/10]], [[10/9]]
|[[12/11]], [[11/10]], [[10/9]]
Line 1,045: Line 1,045:
|-
|-
|minor 2nd
|minor 2nd
|1\35, 54.545 (54.29)
|1\35, 54.545
|Hf
|Hf
|[[36/35]], [[34/33]], [[33/32]], [[32/31]]
|[[36/35]], [[34/33]], [[33/32]], [[32/31]]
Line 1,051: Line 1,051:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|major 2nd
|major 2nd
|4\35, 218.18 (217.14)
|4\35, 218.18
|H
|H
|[[9/8]], [[17/15]], [[8/7]]
|[[9/8]], [[17/15]], [[8/7]]
Line 1,057: Line 1,057:
|-
|-
|augmented 2nd
|augmented 2nd
|7\35, 381.818 (380.00)
|7\35, 381.82
|H#
|H#
|[[5/4]], [[96/77]]
|[[5/4]], [[96/77]]
Line 1,063: Line 1,063:
|-
|-
|diminished 3rd
|diminished 3rd
|2\35, 109.09 (108.57)
|2\35, 109.09
|Jff
|Jff
|[[18/17]], [[17/16]], [[16/15]], [[15/14]]
|[[18/17]], [[17/16]], [[16/15]], [[15/14]]
Line 1,069: Line 1,069:
|-
|-
|minor 3rd
|minor 3rd
|5\35, 272.73 (271.43)
|5\35, 272.73
|Jf
|Jf
|[[20/17]], [[7/6]]
|[[20/17]], [[7/6]]
Line 1,075: Line 1,075:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|major 3rd
|major 3rd
|8\35, 436.36 (434.29)
|8\35, 436.36
|J
|J
|[[14/11]], [[9/7]], [[22/17]]
|[[14/11]], [[9/7]], [[22/17]]
Line 1,081: Line 1,081:
|-
|-
|augmented 3rd
|augmented 3rd
|11\35, 600.00 (542.86)
|11\35, 600.00
|J#
|J#
|[[7/5]], [[24/17]], [[17/12]], [[10/7]]
|[[7/5]], [[24/17]], [[17/12]], [[10/7]]
Line 1,087: Line 1,087:
|-
|-
|diminished 4th
|diminished 4th
|6\35, 327.27 (325.71)
|6\35, 327.27
|Kff
|Kff
|[[6/5]], [[17/14]], [[11/9]]
|[[6/5]], [[17/14]], [[11/9]]
Line 1,093: Line 1,093:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|natural 4th
|natural 4th
|9\35, 490.91 (488.57)
|9\35, 490.91
|Kf
|Kf
|[[4/3]]
|[[4/3]]
Line 1,099: Line 1,099:
|-
|-
|augmented 4th
|augmented 4th
|12\35, 654.545 (651.43)
|12\35, 654.545
|K
|K
|[[16/11]], [[22/15]]
|[[16/11]], [[22/15]]
Line 1,105: Line 1,105:
|-
|-
|diminished 5th
|diminished 5th
|10\35, 545.455 (542.86)
|10\35, 545.455
|Lf
|Lf
|[[15/11]], [[11/8]]
|[[15/11]], [[11/8]]
Line 1,111: Line 1,111:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|perfect 5th
|perfect 5th
|13\35, 709.09 (705.71)
|13\35, 709.09
|L
|L
|[[3/2]]
|[[3/2]]
Line 1,117: Line 1,117:
|-
|-
|augmented 5th
|augmented 5th
|16\35, 872.73 (868.57)
|16\35, 872.73
|L#
|L#
|[[18/11]], [[28/17]], [[5/3]]
|[[18/11]], [[28/17]], [[5/3]]
Line 1,123: Line 1,123:
|-
|-
|diminished 6th
|diminished 6th
|11\35, 600.00 (597.14)
|11\35, 600.00
|Aff
|Aff
|[[7/5]], [[24/17]], [[17/12]], [[10/7]]
|[[7/5]], [[24/17]], [[17/12]], [[10/7]]
Line 1,129: Line 1,129:
|-
|-
|minor 6th
|minor 6th
|14\35, 763.64 (760.00)
|14\35, 763.64
|Af
|Af
|[[17/11]], [[14/9]], [[11/7]]
|[[17/11]], [[14/9]], [[11/7]]
Line 1,135: Line 1,135:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|major 6th
|major 6th
|17\35, 927.27 (822.86)
|17\35, 927.27
|A
|A
|[[17/10]], [[12/7]]
|[[17/10]], [[12/7]]
Line 1,141: Line 1,141:
|-
|-
|augmented 6th
|augmented 6th
|20\35, 1090.909 (1085.71)
|20\35, 1090.91
|A#
|A#
|[[28/15]], [[15/8]], [[32/17]], [[17/9]]
|[[28/15]], [[15/8]], [[32/17]], [[17/9]]
Line 1,147: Line 1,147:
|-
|-
|diminished 7th
|diminished 7th
|15\35, 818.182 (814.29)
|15\35, 818.18
|Bff
|Bff
|[[8/5]], [[77/48]]
|[[8/5]], [[77/48]]
Line 1,153: Line 1,153:
|-
|-
|minor 7th
|minor 7th
|18/35, 981.82 (977.14)
|18/35, 981.82
|Bf
|Bf
|[[7/4]], [[30/17]], [[16/9]]
|[[7/4]], [[30/17]], [[16/9]]
Line 1,159: Line 1,159:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|major 7th
|major 7th
|21\35, 1145.455 (1140.00)
|21\35, 1145.455
|B
|B
|[[31/16]], [[64/33]], [[33/17]], [[35/18]]
|[[31/16]], [[64/33]], [[33/17]], [[35/18]]
Line 1,165: Line 1,165:
|-
|-
|augmented 7th
|augmented 7th
|24\35, 1309.09 (1302.86)
|24\35, 1309.09
|B#
|B#
|36/17, 17/8, 32/15, 15/7
|36/17, 17/8, 32/15, 15/7
Line 1,171: Line 1,171:
|-
|-
|diminished octave
|diminished octave
|19\22, 1036.36 (1031.43)
|19\22, 1036.36
|Cf
|Cf
|[[9/5]], [[11/6]], [[20/11]]
|[[9/5]], [[11/6]], [[20/11]]
Line 1,177: Line 1,177:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|perfect octave
|perfect octave
|22\35, 1200.00 (1194.29)
|22\35, 1200.00
|C
|C
|[[2/1]]
|[[2/1]]
Line 1,183: Line 1,183:
|-
|-
|augmented octave
|augmented octave
|25\35, 1363.64 (1357.14)
|25\35, 1363.64
|C#
|C#
|24/11, 11/5, 20/9
|24/11, 11/5, 20/9
Line 1,189: Line 1,189:
|-
|-
|minor 9th
|minor 9th
|23\35, 1254.55 (1248.57)
|23\35, 1254.545
|Df
|Df
|72/35, 68/33, 33/16, 64/31
|72/35, 68/33, 33/16, 64/31
Line 1,195: Line 1,195:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|major 9th
|major 9th
|26\35, 1418.18 (1411.43)
|26\35, 1418.18
|D
|D
|9/4, 34/15, 16/7
|9/4, 34/15, 16/7
Line 1,201: Line 1,201:
|-
|-
|augmented 9th
|augmented 9th
|29\35, 1581.81 (1574.29)
|29\35, 1581.81
|D#
|D#
|5/2, 192/77
|5/2, 192/77
Line 1,207: Line 1,207:
|-
|-
|diminished 10th
|diminished 10th
|24\35, 1309.09 (1302.86)
|24\35, 1309.09
|Eff
|Eff
|36/17, 17/8, 32/15, 15/7
|36/17, 17/8, 32/15, 15/7
Line 1,213: Line 1,213:
|-
|-
|minor 10th
|minor 10th
|27\35, 1472.72 (1465.71)
|27\35, 1472.72
|Ef
|Ef
|40/17, 7/3
|40/17, 7/3
Line 1,219: Line 1,219:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|major 10th
|major 10th
|30\35, 1636.36 (1628.57)
|30\35, 1636.36
|E
|E
|28/11, 18/7, 44/17
|28/11, 18/7, 44/17
Line 1,225: Line 1,225:
|-
|-
|augmented 10th
|augmented 10th
|33\35, 1800.00 (1791.43)
|33\35, 1800.00
|E#
|E#
|14/5, 48/17, 17/6, 20/7
|14/5, 48/17, 17/6, 20/7
Line 1,231: Line 1,231:
|-
|-
|diminished 11th
|diminished 11th
|28\35, 1527.27 (1520.00)
|28\35, 1527.27
|Ff
|Ff
|12/5, 17/7, 22/9
|12/5, 17/7, 22/9
Line 1,237: Line 1,237:
|- bgcolor="#eaeaff"
|- bgcolor="#eaeaff"
|natural 11th
|natural 11th
|31\35, 1690.91 (1682.86)
|31\35, 1690.91
|F
|F
|8/3
|8/3
Line 1,243: Line 1,243:
|-
|-
|augmented 11th
|augmented 11th
|34\35, 1854.545 (1845.71)
|34\35, 1854.545
|F#
|F#
|32/11, 44/15
|32/11, 44/15
Line 1,249: Line 1,249:
|-
|-
|diminished 12th
|diminished 12th
|32\35, 1745.455 (1737.14)
|32\35, 1745.455
|Gf
|Gf
|30/11, 11/4
|30/11, 11/4
Line 1,550: Line 1,550:
! colspan="2" |Generator
! colspan="2" |Generator
!Normalized
!Normalized
!''ed19\12''
|-
|-
|3\8
|3\8
|
|
|<u>720</u>
|<u>720</u>
|''712.5''
|-
|-
|19\51
|19\51
|
|
|<u>712.5</u>
|<u>712.5</u>
|''707.843''
|-
|-
|
|
|35\94
|35\94
|<u>711.864</u>
|<u>711.864</u>
|''707.447''
|-
|-
|16\43
|16\43
|
|
|<u>711.111</u>
|<u>711.111</u>
|''706.977''
|-
|-
|
|
|29\78
|29\78
|<u>710.204</u>
|<u>710.204</u>
|''706.41''
|-
|-
|13\35
|13\35
|
|
|<u>709.091</u>
|<u>709.091</u>
|''705.714''
|-
|-
|
|
|36\97
|36\97
|<u>708.197</u>
|<u>708.197</u>
|705.155
|-
|-
|
|
|23\62
|23\62
|<u>707.692</u>
|<u>707.692</u>
|''704.839''
|-
|-
|
|
|33\89
|33\89
|<u>707.143</u>
|<u>707.143</u>
|''704.494''
|-
|-
|
|
|43\116
|43\116
|<u>706.849</u>
|<u>706.849</u>
|''704.31''
|-
|-
|10\27
|10\27
|
|
|<u>705.882</u>
|<u>705.882</u>
|''703.704''
|-
|-
|
|
|27\73
|27\73
|<u>704.348</u>
|<u>704.348</u>
|''702.738''
|-
|-
|
|
|17\46
|17\46
|<u>703.448</u>
|<u>703.448</u>
|''702.174''
|-
|-
|
|
|24\65
|24\65
|<u>702.439</u>
|<u>702.439</u>
|''701.5385''
|-
|-
|
|
|31\84
|31\84
|<u>701.887</u>
|<u>701.887</u>
|701.1905
|-
|-
|7\19
|7\19
|
|
|<u>700</u>
|<u>700</u>
|''700''
|-
|-
|
|
|60\163
|60\163
|<u>699.029</u>
|<u>699.029</u>
|''699.3865''
|-
|-
|
|
|53\144
|53\144
|<u>698.901</u>
|<u>698.901</u>
|''699.306''
|-
|-
|
|
|46\125
|46\125
|<u>698.734</u>
|<u>698.734</u>
|''699.2''
|-
|-
|
|
|39\106
|39\106
|<u>698.5075</u>
|<u>698.5075</u>
|''699.057''
|-
|-
|
|
|32\87
|32\87
|<u>698.182</u>
|<u>698.182</u>
|698.852
|-
|-
|
|
|25\68
|25\68
|<u>697.674</u>
|<u>697.674</u>
|''698.529''
|-
|-
|
|
|18\49
|18\49
|<u>696.77</u>
|<u>696.77</u>
|''697.959''
|-
|-
|
|
|29\79
|29\79
|<u>696</u>
|<u>696</u>
|''697.468''
|-
|-
|
|
|40\109
|40\109
|<u>695.652</u>
|<u>695.652</u>
|''697.248''
|-
|-
|11\30
|11\30
|
|
|<u>694.737</u>
|<u>694.737</u>
|''696.667''
|-
|-
|
|
|26\71
|26\71
|<u>693.333</u>
|<u>693.333</u>
|''695.775''
|-
|-
|15\41
|15\41
|
|
|<u>692.308</u>
|<u>692.308</u>
|''695.122''
|-
|-
|
|
|34\93
|34\93
|<u>691.525</u>
|<u>691.525</u>
|''694.623''
|-
|-
|19\52
|19\52
|
|
|<u>690.909</u>
|<u>690.909</u>
|''694.231''
|-
|-
|
|
|42\115
|42\115
|<u>690.411</u>
|<u>690.411</u>
|''693.913''
|-
|-
|23\63
|23\63
|
|
|<u>690</u>
|<u>690</u>
|''693.651''
|-
|-
|4\11
|4\11
|
|
|<u>685.714</u>
|<u>685.714</u>
|''690.909''
|}
|}


== See also ==
== See also ==
[[8L 3s (3/1-equivalent)]]
[[8L 3s (3/1-equivalent)]]

Revision as of 23:56, 5 June 2023

Relationship to the Obikhod

The Obikhod (Обиход церковного пения) is a collection of polyphonic Russian Orthodox liturgical chants forming a major tradition of Russian liturgical music; it includes both liturgical texts and psalm settings.

The original Obikhod, the book of rites of the monastery of Volokolamsk, was composed about 1575. Among its subjects were traditional liturgical chants. The Obikhod was originally monodic but later developed polyphony. In 1772 the Obikhod was the first compilation of music printed in Russia, in Moscow. The common version was extensively revised and standardized by composer Nikolai Rimsky-Korsakov; this version was published as the 1909 edition of the Obikhod, the last before the Russian Revolution.

The Obikhod style, and the 1909 edition, was predominately used by the Russian Orthodox Church during the decades of Soviet Union rule in the 20th century, displacing both traditional Russian styles, such as the Ruthenian Prostopinije style, and also the chant traditions of Georgia, Armenia, and Carpatho-Russia.[1]

Pyotr Ilyich Tchaikovsky drew from the Obikhod style for his 1812 Overture, as did Nikolai Rimsky-Korsakov in his Russian Easter Festival Overture. Anatoly Lyadov also drew from them in his Ten Arrangements from Obikhod Op.61, as did Alexander Raskatov in his Obikhod (2002).

The pitch set used in these chants traditionally consists of four three-note groups. Each note within a group is separated by a whole tone, and each group is separated by a semitone. If starting from G, the result is: G, A, B / C, D, E / F, G, A / B♭, C, D. Theoretically, more groups can be added either above or below, which has been done by some 20th-century Russian composers. This pitch set also influenced Russian folk music: for example, the Livenka accordion contains the pitch set on its melody side. On a common Livenka accordion, the pitch set will not span a pure tritave.[2]

Standing assumptions

The tempered generalized Livenka accordion is used in this article to refer to tunings of the pitch set.

The TAMNAMS system is used in this article to refer to 8L 3s (perfect twelfth equivalent) step size ratios and step ratio ranges.

The notation used in this article is GHJKLABCDEFG = LLsLLLsLLLs (Ionian #11), #/f = up/down by chroma (mnemonic f = F molle in Latin).

Thus the 19edt gamut is as follows:

G/F# G#/Hf H H#/Jf J K K#/Lf L L#/Af A A#/Bf B C C#/Df D D#/Ef E E#/Ff F/Gf

The 27edt gamut is notated as follows:

G F#/Hf G# H Jf H#/Kf J K J#/Lf K# L Af L# A Bf A#/Cf B C B#/Df C# D Ef D# E Ff E#/Gf F

The 30edt gamut:

G Hf G# H Jf H# J J#/Kf K K# Lf L L# Af A A# Bf B B#/Cf C C# Df D D# Ef E E# Ff F F#/Gf

Intervals

The table of Obikhodic intervals below takes the fifth as the generator. Given the size of the fifth generator g, any Obikhodic interval can easily be found by noting what multiple of g it is, and multiplying the size by the number k of generators it takes to reach the interval and reducing mod 1900[3] if necessary (so you can use "k*g % 1900" for search engines, for plugged-in values of k and g). For example, since the major 3rd is reached by six fifth generators, 27edt's major 3rd is 6*703.7 mod 1900 = 4222.22 mod 1900 = 422.22r¢.

# generators up Notation (1/1 = G) name In L's and s's # generators up Notation of ~3/1 inverse name In L's and s's
The 11-note MOS has the following intervals (from some root):
0 G perfect unison 0 0 G perfect 12th 8L+3s
1 L perfect 5th 3L+1s -1 C perfect octave 5L+2s
2 D major 9th 6L+2s -2 K natural 4th 2L+1s
3 H major 2nd 1L -3 Ff natural 11th 7L+3s
4 A major 6th 4L+1s -4 Bf minor 7th 4L+2s
5 E major 10th 7L+2s -5 Jf minor 3rd 1L+1s
6 J major 3rd 2L -6 Ef minor 10th 6L+3s
7 B major 7th 5L+1s -7 Af minor 6th 3L+2s
8 F augmented 11th 8L+2s -8 Hf minor 2nd 1s
9 K# augmented 4th 3L -9 Df minor 2nd 5L+3s
10 C# augmented octave 6L+1s -10 Lf diminished 5th 2L+2s
11 G# augmented unison 1L-1s -11 Gf diminished unison 7L+4s
The chromatic 19-note MOS (either 8L 11s, 11L 8s, or 19edt) also has the following intervals (from some root):
12 L# augmented 5th 4L -12 Cf diminished octave 4L+3s
13 D# augmented 9th 7L+1s -13 Kf diminished 4th 1L+2s
14 H# augmented 2nd 2L-1s -14 Fff diminished 11th 6L+4s
15 A# augmented 6th 5L -15 Bff diminished 7th 3L+3s
16 E# augmented 10th 8L+1s -16 Jff diminished 3rd 2s
17 J# augmented 3rd 3L-1s -17 Eff diminished 10th 5L+4s
18 B# augmented 7th 6L -18 Aff diminished 6th 2L+3s

Tuning ranges

Simple tunings

Table of intervals in the simplest Obikhodic tunings:

Degree Size in ~19edt (basic) Size in ~27edt (hard) Size in ~30edt (soft) Note name on G #Gens up
unison 0\19, 0.00 0\27, 0.00 0\30, 0.00 G 0
minor 2nd 1\19, 100.00 1\27, 70.59 2\30, 126.32 Hf -8
major 2nd 2\19, 200.00 3\27, 211.765 3\30, 189.47 H 3
minor 3rd 3\19, 300.00 4\27, 282.35 5\30, 315.79 Jf -5
major 3rd 4\19, 400.00 6\27, 423.53 6\30, 378.95 J 6
natural 4th 5\19, 500.00 7\27, 494.12 8\30, 505,26 K -2
augmented 4th 6\19, 600.00 9\27, 635.29 9\30, 568.42 K# 9
diminished 5th 8\27, 564.71 10\30, 631.58 Lf -10
perfect 5th 7\19, 700.00 10\27, 705.88 11\30, 694.74 L 1
minor 6th 8\19, 800.00 11\27, 776.47 13\30, 821.05 Af -7
major 6th 9\19, 900.00 13\27, 917.65 14\30, 884.21 A 4
minor 7th 10\19, 1000.00 14\27, 988.235 16\30, 1010.53 Bf -4
major 7th 11\19, 1100.00 16\27, 1129.42 17\30, 1073.68 B 7
perfect octave 12\19, 1200.00 17\27, 1200.00 19\30, 1200.00 C -1
augmented octave 13\19, 1300.00 19\27, 1341.18 20\30, 1263.16 C# 10
minor 9th 18\27, 1270.59 21\30, 1326.32 Df -9
major 9th 14\19, 1400.00 20\27, 1411.765 22\30, 1389.47 D 2
minor 10th 15\19, 1500.00 21\27, 1482.35 24\30, 1515.79 Ef -6
major 10th 16\19, 1600.00 23\27, 1623.53 25\30, 1578.95 E 5
natural 11th 17\19, 1700.00 24\27, 1694.12 27\30, 1705.26 Ff -3
augmented 11th 18\19, 1800.00 26\27, 1835.29 28\30, 1768.42 F 8

Hypohard

Hypohard Obikhodic tunings (with generator between 7\19 and 10\27) have step ratios between 2/1 and 3/1.

Hypohard Obikhodic can be considered "superpythagorean Obikhodic". This is because these tunings share the following features with superpythagorean diatonic tunings:

  • The large step is near the Pythagorean 9/8 whole tone, somewhere between as in 12edo and as in 17edo.
  • The major 3rd (made of two large steps) is a near-Pythagorean to Neogothic major third.

~EDTs that are in the hypohard range include ~19edt, ~27edt, and ~46edt.

The sizes of the generator, large step and small step of Obikhodic are as follows in various hypohard Obikhod tunings.

~19edt (basic) ~27edt (hard) ~46edt (semihard)
generator (g) 7\19, 700.00 10\27, 705.88 17\46, 703.45
L (3g - ~tritave) 2\19, 200.00 3\27, 211.765 5\46, 206.90
s (-8g + 3 ~tritaves) 1\19, 100.00 1\27, 70.59 2\46, 82.76

Intervals

Sortable table of major and minor intervals in hypohard Obikhod tunings:

Degree Size in ~19edt (basic) Size in ~27edt (hard) Size in ~46edt (semihard) Note name on G #Gens up
unison 0\19, 0.00 0\27, 0.00 0\46, 0.00 G 0
minor 2nd 1\19, 100.00 1\27, 70.59 2\46, 82.76 Hf -8
major 2nd 2\19, 200.00 3\27, 211.765 5\46, 206.90 H 3
minor 3rd 3\19, 300.00 4\27, 282.35 7\46, 289.655 Jf -5
major 3rd 4\19, 400.00 6\27, 423.53 10\46, 413.79 J 6
natural 4th 5\19, 500.00 7\27, 494.12 12\46, 496.55 K -2
augmented 4th 6\19, 600.00 9\27, 635.29 15\46, 620.69 K# 9
diminished 5th 8\27, 564.71 14\46, 579.31 Lf -10
perfect 5th 7\19, 700.00 10\27, 705.88 17\46, 703.45 L 1
minor 6th 8\19, 800.00 11\27, 776.47 19\46, 786.21 Af -7
major 6th 9\19, 900.00 13\27, 917.65 22\46, 910.345 A 4
minor 7th 10\19, 1000.00 14\27, 988.235 24\46, 993.10 Bf -4
major 7th 11\19, 1100.00 16\27, 1129.42 27\46, 1117.24 B 7
perfect octave 12\19, 1200.00 17\27, 1200.00 29\46, 1200.00 C -1
augmented octave 13\19, 1300.00 19\27, 1341.18 32\46, 1324.14 C# 10
minor 9th 18\27, 1270.59 31\46, 1282.76 Df -9
major 9th 14\19, 1400.00 20\27, 1411.765 34\46, 1406.90 D 2
minor 10th 15\19, 1500.00 21\27, 1482.35 36\46, 1489.655 Ef -6
major 10th 16\19, 1600.00 23\27, 1623.53 39\46, 1613.79 E 5
natural 11th 17\19, 1700.00 24\27, 1694.12 41\46, 1696.55 Ff -3
augmented 11th 18\19, 1800.00 26\27, 1835.29 44\46, 1820.69 F 8

Hyposoft

Hyposoft Obikhodic tunings (with generator between 11\30 and 7\19) have step ratios between 3/2 and 2/1. The 11\30-to-7\19 range of Obikhodic tunings can be considered "meantone Obikhodic". This is because these tunings share the following features with meantone diatonic tunings:

  • The large step is between near the meantone and near the Pythagorean 9/8 whole tone, somewhere between as in 19edo and as in 12edo.
  • The major 3rd (made of two large steps) is a near-just to near-Pythagorean major third.

The sizes of the generator, large step and small step of oneirotonic are as follows in various hyposoft Obikhod tunings (~19edt not shown).

~30edt (soft) ~49edt (semisoft)
generator (g) 11\30, 694.74 18\49, 696.77
L (3g - ~tritave) 3\30, 189.47 5\49, 193.55
s (-8g + 3 ~tritaves) 2\30, 126.32 3\49, 116.13

Intervals

Sortable table of major and minor intervals in hyposoft Obikhod tunings (~19edt not shown):

Degree Size in ~30edt (soft) ~49edt (semisoft) Note name on G Approximate ratios #Gens up
unison 0\30, 0.00 0\49, 0.00 G 1/1 0
minor 2nd 2\30, 126.32 3\49, 116.13 Hf 16/15 -8
major 2nd 3\30, 189.47 5\49, 193.55 H 10/9, 9/8 3
minor 3rd 5\30, 315.79 8\49, 309.68 Jf 6/5 -5
major 3rd 6\30, 378.95 10\49, 387.10 J 5/4 6
natural 4th 8\30, 505,26 13\49, 503.23 K 4/3 -2
augmented 4th 9\30, 568.42 15\49, 580.645 K# 7/5 9
diminished 5th 10\30, 631.58 16\49, 619.355 Lf 10/7 -10
perfect 5th 11\30, 694.74 18\49, 696.77 L 3/2 1
minor 6th 13\30, 821.05 21\49, 812.90 Af 8/5 -7
major 6th 14\30, 884.21 23\49, 890.32 A 5/3 4
minor 7th 16\30, 1010.53 26\49, 1006.45 Bf 16/9, 9/5 -4
major 7th 17\30, 1073.68 28\49, 1083.87 B 15/8 7
perfect octave 19\30, 1200.00 31\49, 1200.00 C 2/1 -1
augmented octave 20\30, 1263.16 33\49, 1277.42 C# 25/24 10
minor 9th 21\30, 1326.32 34\49, 1316.13 Df 15/7 -9
major 9th 22\30, 1389.47 36\49, 1393.55 D 20/9, 9/4 2
minor 10th 24\30, 1515.79 39\49, 1508.68 Ef 12/5 -6
major 10th 25\30, 1578.95 41\49, 1587.10 E 5/2 5
natural 11th 27\30, 1705.26 44\49, 1703.23 Ff 8/3 -3
augmented 11th 28\30, 1768.42 46\49, 1780.645 F 14/5 8

Parasoft to ultrasoft tunings

The range of Obikhodic tunings of step ratio between 6/5 and 3/2 (thus in the parasoft to ultrasoft range) may be of interest because it is closely related to flattone temperament.

The sizes of the generator, large step and small step of Obikhodic are as follows in various tunings in this range.

~41edt (supersoft) ~52edt
generator (g) 15\41, 692.31 19\52, 690.91
L (3g - ~tritave) 4\41, 184.615 5\52, 181.81
s (-8g + 3 ~tritaves) 3\41, 138.46 4\52, 145.455

Intervals

The intervals of the extended generator chain (-21 to +21 generators) are as follows in various softer-than-soft Obikhodic tunings.

Degree Size in ~41edt (supersoft) Note name on G Approximate ratios #Gens up
unison 0\41, 0.00 G 1/1 0
chroma 1\41, 46.15 G# 33/32, 49/48, 36/35, 25/24 11
diminished 2nd 2\41, 92.31 Hff 21/20, 22/21, 26/25 -19
minor 2nd 3\41, 138.46 Hf 12/11, 13/12, 14/13, 16/15 -8
major 2nd 4\41, 184.615 H 9/8, 10/9, 11/10 3
augmented 2nd 5\41, 230.77 H# 8/7, 15/13 14
diminished 3rd 6\41, 276.92 Jff 7/6, 13/11, 33/28 -16
minor 3rd 7\41, 323.08 Jf 135/112, 6/5 -5
major 3rd 8\41, 369.23 J 5/4, 11/9, 16/13 6
augmented 3rd 9\41, 415.385 J# 9/7, 14/11, 33/26 17
diminished 4th 10\41, 461.54 Kff 21/16, 13/10 -13
natural 4th 11\41, 507.69 Kf 75/56, 4/3 -2
augmented 4th 12\41, 553.85 K 11/8, 18/13 9
doubly augmented 4th, doubly diminished 5th 13\41, 600.00 K#, Lff 7/5, 10/7 20,-21
diminished 5th 14\41, 646.15 Lf 16/11, 13/9 -10
perfect 5th 15\41, 692.31 L 112/75, 3/2 1
augmented 5th 16\41, 738.46 L# 32/21, 20/13 12
diminished 6th 17\41, 784.615 Aff 11/7, 14/9 -18
minor 6th 18\41, 830.77 Af 13/8, 8/5 -7
major 6th 19\41, 876.92 A 5/3, 224/135 4
augmented 6th 20\41, 923.08 A# 12/7, 22/13 15
diminished 7th 21\41, 969.23 Bff 7/4, 26/15 -15
minor 7th 22\41, 1015.385 Bf 9/5, 16/9, 20/11 -4
major 7th 23\41, 1061.54 B 11/6, 13/7, 15/8, 24/13 7
augmented 7th 24\41, 1107.69 B# 21/11, 25/13, 40/21 18
diminished octave 25\41, 1153.85 Cf 64/33, 96/49, 35/18, 48/25 -12
perfect octave 26\41, 1200.00 C 2/1 -1
augmented octave 27\41, 1246.15 C# 33/16, 49/24, 72/35, 25/12 10
doubly augmented octave, diminished 9th 28\41, 1292.31 Cx, Dff 21/10, 44/21, 52/25 21,-20
minor 9th 29\41, 1338.46 Df 24/11, 13/6, 28/13, 32/15 -9
major 9th 30\41, 1384.615 D 9/4, 20/9, 11/5 2
augmented 9th 31\41, 1430.77 D# 16/7, 30/13 13
diminished 10th 32\41, 1476.92 Eff 7/3, 26/11, 33/14 -17
minor 10th 33\41, 1523.08 Ef 135/56, 12/5 -6
major 10th 34\41, 1569.23 E 5/2, 22/9, 32/13 5
augmented 10th 35\41, 1615.385 E# 18/7, 28/11, 33/13 16
diminished 11th 36\41, 1661.54 Ff 21/8, 13/5 -14
natural 11th 37\41, 1709.69 F 75/28, 8/3 -3
augmented 11th 38\41, 1753.85 F# 11/4, 36/13 8
doubly augmented 11th, doubly diminished 12th 39\41, 1800.00 Fx, Gff 14/5, 20/7 19
diminished 12th 40\41, 1846.15 Gf 32/11, 26/9 -11

Parahard

~35edt Obikhod combines the sound of the 9/4 major ninth and the sound of the 8/7 whole tone. This is because ~35edt Obikhodic has a large step of ~218.2¢, close to 22edo's superpythagorean major second, and is both a warped Pythagorean 9/8 whole tone and a warped 8/7 septimal whole tone.

Intervals

The intervals of the extended generator chain (-18 to +18 generators) are as follows in various Obikhodic tunings close to ~35edt.

Degree Size in ~35edt Note name on G Approximate Ratios* #Gens up
unison 0\35, 0.00 G 1/1 0
chroma 3\35, 163.64 G# 12/11, 11/10, 10/9 11
minor 2nd 1\35, 54.545 Hf 36/35, 34/33, 33/32, 32/31 -8
major 2nd 4\35, 218.18 H 9/8, 17/15, 8/7 3
augmented 2nd 7\35, 381.82 H# 5/4, 96/77 14
diminished 3rd 2\35, 109.09 Jff 18/17, 17/16, 16/15, 15/14 -16
minor 3rd 5\35, 272.73 Jf 20/17, 7/6 -5
major 3rd 8\35, 436.36 J 14/11, 9/7, 22/17 6
augmented 3rd 11\35, 600.00 J# 7/5, 24/17, 17/12, 10/7 17
diminished 4th 6\35, 327.27 Kff 6/5, 17/14, 11/9 -13
natural 4th 9\35, 490.91 Kf 4/3 -2
augmented 4th 12\35, 654.545 K 16/11, 22/15 9
diminished 5th 10\35, 545.455 Lf 15/11, 11/8 -10
perfect 5th 13\35, 709.09 L 3/2 1
augmented 5th 16\35, 872.73 L# 18/11, 28/17, 5/3 12
diminished 6th 11\35, 600.00 Aff 7/5, 24/17, 17/12, 10/7 -18
minor 6th 14\35, 763.64 Af 17/11, 14/9, 11/7 -7
major 6th 17\35, 927.27 A 17/10, 12/7 4
augmented 6th 20\35, 1090.91 A# 28/15, 15/8, 32/17, 17/9 15
diminished 7th 15\35, 818.18 Bff 8/5, 77/48 -15
minor 7th 18/35, 981.82 Bf 7/4, 30/17, 16/9 -4
major 7th 21\35, 1145.455 B 31/16, 64/33, 33/17, 35/18 7
augmented 7th 24\35, 1309.09 B# 36/17, 17/8, 32/15, 15/7 18
diminished octave 19\22, 1036.36 Cf 9/5, 11/6, 20/11 -12
perfect octave 22\35, 1200.00 C 2/1 -1
augmented octave 25\35, 1363.64 C# 24/11, 11/5, 20/9 10
minor 9th 23\35, 1254.545 Df 72/35, 68/33, 33/16, 64/31 -9
major 9th 26\35, 1418.18 D 9/4, 34/15, 16/7 2
augmented 9th 29\35, 1581.81 D# 5/2, 192/77 13
diminished 10th 24\35, 1309.09 Eff 36/17, 17/8, 32/15, 15/7 -17
minor 10th 27\35, 1472.72 Ef 40/17, 7/3 -6
major 10th 30\35, 1636.36 E 28/11, 18/7, 44/17 5
augmented 10th 33\35, 1800.00 E# 14/5, 48/17, 17/6, 20/7 16
diminished 11th 28\35, 1527.27 Ff 12/5, 17/7, 22/9 -14
natural 11th 31\35, 1690.91 F 8/3 -3
augmented 11th 34\35, 1854.545 F# 32/11, 44/15 8
diminished 12th 32\35, 1745.455 Gf 30/11, 11/4 -11

Ultrahard

Ultrapythagorean Obikhodic is a rank-2 temperament in the pseudopaucitonic range. It represents the harmonic entropy minimum of the Obikhodic spectrum where 7/4 is the minor seventh.

In the broad sense, Ultrapyth can be viewed as any tuning that divides a 16/7 into 2 equal parts. ~35edt and ~43edt can nominally be viewed as supporting it, but are still very flat and in an ambiguous zone between ~27edt and true Ultrapyth in terms of harmonies. ~51edt & ~59edt are good compromises between melodic utility and harmonic accuracy, as the small step is still large enough to be obvious to the untrained ear, but ~67edt is where it really comes into its own in terms of harmonies, providing not only an excellent 6/5, but also 7:8:9 melodies, as by shifting one whole tone done a comma, it shifts from archipelago to septimal harmonies.

Beyond that, it's a question of which intervals you want to favor. ~75edt has an essentially perfect 9/8, either ~83edt or ~91edt has an essentially perfect 7/4 and multiple chains of essentially perfect meantone, and while ~99edt does not have an essentially perfect 7/4, it has a double chain of essentially perfect quarter-comma meantone. You could in theory go up to ~131edt if you want to favor the 3/2 above everything else, but beyond that, general accuracy drops off rapidly and you might as well be playing equal pentatonic.

The sizes of the generator, large step and small step of Obikhodic are as follows in various ultrapyth tunings.

~59edt ~83edt ~91edt ~99edt Optimal (PHTE) Ultrapyth tuning JI intervals represented (2.3.5.7.13 subgroup)
generator (g) 22\59, 713.51 31\83, 715.385 34\91, 715.79 37\99, 716.13 712.61 3/2
L (3g - ~tritave) 7\39, 227.03 10\83, 230.77 11\91, 231.58 12\99, 232.26 230.55 8/7
s (-8g + 3 ~tritaves) 1\59, 32.43 1\83, 23.08 1\91, 21.05 1/99, 19.355 20.96 50/49 81/80 91/90

Intervals

Sortable table of intervals in the Great Mixolydian mode and their Ultrapyth interpretations:

Degree Size in ~59edt Size in ~83edt Size in ~91edt Size in ~99edt Size in PHTE tuning Note name on D Approximate ratios #Gens up
1 0\59, 0.00 0\83, 0.00 0\91, 0.00 0\99, 0.00 0.00 D 1/1 0
2 7\59, 227.03 10\83, 230.77 11\91, 231.58 12\99, 232.26 230.55 E 8/7 +3
3 14\59, 454.05 20\83, 461.54 22\91, 463.16 24\99, 464.52 461.10 F 13/10, 9/7 +6
4 15\59, 486.49 21\83, 484.615 23\91, 484.21 25\99, 483.87 482.06 G 4/3 -2
5 22\59, 713.51 31\83, 715.385 34\91, 715.79 37\99, 716.13 712.61 H 3/2 +1
6 29\59, 940.54 41\83, 946.15 45\91, 947.36 49\99, 948.39 943.16 J 12/7, 26/15 +4
7 30\38, 972.97 42\83, 969.23 46\91, 968.42 50\99, 967.74 964.12 K 7/4 -4
8 37\59, 1200.00 52\83, 1200.00 57\91, 1200.00 62\99, 1200.00 1194.67 L 2/1 -1
9 44\59, 1427.03 62\83, 1430.77 68\91, 1430.58 74\99, 1432.26 1425.22 A 16/7 +2
10 51\59, 1654.05 72\83, 1661.54 79\91, 1663.16 86\99, 1664.52 1655.77 B 13/5, 18/7 +5
11 52\59, 1686.49 73\83,

1684.615

80\91,

1684.21

87\99, 1683.87 1676.32 C 4/3 -3

Modes

Obikhodic modes are named after the Church modes, but with a “Great” prefix.

Mode UDP Name
LLLsLLLsLLs 10|0 (Great) Lydian #8 (Tanagran)
LLLsLLsLLLs 9|1 (Great) Lydian
LLsLLLsLLLs 8|2 (Great) Lydian b4, Ionian #11 (Distomian)
LLsLLLsLLsL 7|3 (Great) Ionian
LLsLLsLLLsL 6|4 (Great) Mixolydian
LsLLLsLLLsL 5|5 (Great) Mixolydian b3, Dorian #10 (Livadeian)
LsLLLsLLsLL 4|6 (Great) Dorian
LsLLsLLLsLL 3|7 (Great) Aeolian
sLLLsLLLsLL 2|8 (Great) Aeolian b2, Phrygian #9 (Theban)
sLLLsLLsLLL 1|9 (Great) Phrygian
sLLsLLLsLLL 0|10 (Great) Locrian

Cyclic Permutation order

Spelling Mode UDP Name
GHJKLABCDEFG LLsLLLsLLLs 8|2 (Great) Distomian
HJKLABCDEFGH LsLLLsLLLsL 5|5 (Great) Livadeian
JKLABCDEFGHJ sLLLsLLLsLL 2|8 (Great) Theban
KLABCDEFGHJK LLLsLLLsLLs 10|0 (Great) Tanagran
LABCDEFGHJKL LLsLLLsLLsL 7|3 (Great) Ionian
ABCDEFGHJKLA LsLLLsLLsLL 4|6 (Great) Dorian
BCDEFGHJKLAB sLLLsLLsLLL 1|9 (Great) Phrygian
CDEFGHJKLABC LLLsLLsLLLs 9|1 (Great) Lydian
DEFGHJKLABCD LLsLLsLLLsL 6|4 (Great) Mixolydian
EFGHJKLABCDE LsLLsLLLsLL 3|7 (Great) Aeolian
FGHJKLABCDEF sLLsLLLsLLL 0|10 (Great) Locrian

Notes on Naming

The modes of the Obikhodic scale are named after the existing modes, but contain the "Great" prefix (e.g. Great Ionian, Great Aeolian, etc.). The "Great" prefixes can be left in to explicitly distinguish which MOS's modes you're talking about, or can be omitted for convention.

Each Obikhodic mode contains its corresponding mode in the diatonic scale. This leads to a pattern: LLsLLLsLLLs and LLsLLLsLLsL both contain the meantone LLsLLLs Ionian mode. Additionally, sLLsLLLsLLL contains the diatonic sLLsLLL Locrian mode.

Since there are only seven diatonic modes, four of the superdiatonic modes need additional names and cannot reference any mode of the diatonic scale. These four modes present themselves as "altered" modes, which have an accidental the mode below them lacks, or vice versa. These are the only four modes to exhibit this behavior. They're interspersed on the ranking above and below Lydian, between Dorian and Mixolydian and between Aeolian and Phrygian and on the rotational continuum between Locrian and Ionian.

As were the original modes named after regions of ancient Greece, so are these new Obikhodic extensions. They are called after regions of Boeotia, set up so that the Locrian -> Distomian -> Livadeian -> Theban -> Tanagran -> Ionian cyclic sequence will resemble the geography of ancient Greece.

Scale tree

Generator Normalized
3\8 720
19\51 712.5
35\94 711.864
16\43 711.111
29\78 710.204
13\35 709.091
36\97 708.197
23\62 707.692
33\89 707.143
43\116 706.849
10\27 705.882
27\73 704.348
17\46 703.448
24\65 702.439
31\84 701.887
7\19 700
60\163 699.029
53\144 698.901
46\125 698.734
39\106 698.5075
32\87 698.182
25\68 697.674
18\49 696.77
29\79 696
40\109 695.652
11\30 694.737
26\71 693.333
15\41 692.308
34\93 691.525
19\52 690.909
42\115 690.411
23\63 690
4\11 685.714

See also

8L 3s (3/1-equivalent)

  1. John Anthony McGuckin, The Encyclopedia of Eastern Orthodox Christianity, 2010, p406. Quote: "During the Soviet period, Russian obikhod-style choral polyphony all but eradicated the received chant traditions of Georgia, Armenia, and Carpatho-Russia, but currently there is a trend to revive the Znamenny, Iberian, and Ruthenian chant ..."
  2. Obikhod - Wikipedia. en.wikipedia.org. Retrieved July 28, 2021.
  3. For relative cents
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