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The generator range is 240 to 342.9 cents, placing it on the [[6/5|diatonic minor third]], usually representing a minor third of some type (like [[6/5]]). The bright (chroma-positive) generator is, however, its minor sixth complement (480 to 514.3 cents). | The generator range is 240 to 342.9 cents, placing it on the [[6/5|diatonic minor third]], usually representing a minor third of some type (like [[6/5]]). The bright (chroma-positive) generator is, however, its minor sixth complement (480 to 514.3 cents). | ||
Because this diatonic is a minor sixth-repeating scale, each tone has | Because this diatonic is a minor sixth-repeating scale, each tone has a minor sixth above it. The scale has one major chord, one minor chord and three diminished chords. This diatonic also has two diminished 7th chords, making it a warped melodic minor scale. | ||
[[Basic]] diatonic is in [[8ed8/5]], which is a very good minor sixth-based equal tuning similar to [[12edo]]. | [[Basic]] diatonic is in [[8ed8/5]], which is a very good minor sixth-based equal tuning similar to [[12edo]]. | ||
==Notation== | ==Notation== | ||
There are 2 main ways to notate the diatonic scale. One method uses a simple sextave (minor sixth) repeating notation consisting of 5 naturals (La, Si, Do, Re, Mi). Given that 1-7/6-3/2 is minor sixth-equivalent to a tone cluster of 1-16/15-7/6, it may be more convenient to notate these diatonic scales as repeating at the double sextave (diminished eleventh~tenth), however it does make navigating the [[Generator|genchain]] harder. This way, 3/2 is its own pitch class, distinct from 16\15. Notating this way produces a tenth which is the Dorian mode of Annapolis[6L 4s] or Oriole[6L 4s]. Since there are exactly 10 naturals in double sextave notation, Greek numerals 1-10 may be used. | |||
There are 2 main ways to notate the diatonic scale. One method uses a simple sextave (minor sixth) repeating notation consisting of 5 naturals (La, Si, Do, Re, Mi; Mi, Fa, Sol, La, Si). Given that 1-7/6-3/2 is minor sixth-equivalent to a tone cluster of 1-16/15-7/6, it may be more convenient to notate these diatonic scales as repeating at the double sextave (diminished eleventh~tenth), however it does make navigating the [[Generator|genchain]] harder. This way, 3/2 is its own pitch class, distinct from 16\15. Notating this way produces a tenth which is the Dorian mode of Annapolis[6L 4s] or Oriole[6L 4s]. Since there are exactly 10 naturals in double sextave notation, Greek numerals 1-10 may be used. | |||
{| class="wikitable" | {| class="wikitable" | ||
|+ | |+ | ||
Normalized | Normalized | ||
! colspan=" | ! colspan="3" |Notation | ||
!Supersoft | !Supersoft | ||
!Soft | !Soft | ||
| Line 20: | Line 22: | ||
!Superhard | !Superhard | ||
|- | |- | ||
! | !Aeolian | ||
!Phrygian | |||
!Oriole, Annapolis | !Oriole, Annapolis | ||
!18eds | !18eds | ||
| Line 31: | Line 34: | ||
|- | |- | ||
|La# | |La# | ||
|Mi# | |||
|Α# | |Α# | ||
|1\18 | |1\18, 46.154 | ||
46.154 | |1\13, 63.158 | ||
|1\13 | |2\21, 77.419 | ||
63.158 | | rowspan="2" |1\8, 100 | ||
|2\21 | |3\19, 124.138 | ||
77.419 | |2\11, 141.176 | ||
| rowspan="2" |1\8 | |3\14, 163.636 | ||
100 | |||
|3\19 | |||
124.138 | |||
|2\11 | |||
|3\14 | |||
163. | |||
|- | |- | ||
|Sib | |Sib | ||
|Fa | |||
|Βb | |Βb | ||
|3\18 | |3\18, 138.462 | ||
138. | |2\13, 126.316 | ||
|2\13 | |3\21, 116.129 | ||
126.316 | |2\19, 82.759 | ||
|3\21 | |1\11, 70.588 | ||
116.129 | |1\14, 54.545 | ||
|2\19 | |||
82.759 | |||
|1\11 | |||
70.588 | |||
|1\14 | |||
54. | |||
|- | |- | ||
|Si | |Si | ||
|Fa# | |||
|Β | |Β | ||
|4\18 | |4\18, 184.615 | ||
184.615 | |3\13, 189.474 | ||
|3\13 | |5\21, 193.548 | ||
189.474 | |2\8, 200 | ||
|5\21 | |5\19, 206.897 | ||
193.548 | |3\11, 211.764 | ||
|2\8 | |4\14, 218.182 | ||
200 | |||
|5\19 | |||
206.897 | |||
|3\11 | |||
211.764 | |||
|4\14 | |||
218. | |||
|- | |- | ||
|Si# | |Si# | ||
|Fax | |||
|Β# | |Β# | ||
|5\18 | |5\18, 230.769 | ||
230.769 | | rowspan="2" |4\13, 252.632 | ||
| rowspan="2" |4\13 | |7\21, 270.968 | ||
252.632 | |3\8, 300 | ||
|7\21 | |8\19, 331.034 | ||
270.968 | |5\11 352.941 | ||
|3\8 | |7\14, 381.818 | ||
300 | |||
|8\19 | |||
331. | |||
|5\11 | |||
352.941 | |||
|7\14 | |||
381. | |||
|- | |- | ||
|Dob | |Dob | ||
|Solb | |||
|Γb | |Γb | ||
|6\18 | |6\18, 276.923 | ||
276.923 | |6\21, 232.258 | ||
|6\21 | |2\8, 200 | ||
232.258 | |4\19, 165.517 | ||
|2\8 | |2\11, 141.176 | ||
200 | |2\14, 109.091 | ||
|4\19 | |||
165.517 | |||
|2\11 | |||
141. | |||
|2\14 | |||
109. | |||
|- | |- | ||
|'''Do''' | |'''Do''' | ||
|'''Sol''' | |||
|'''Γ''' | |'''Γ''' | ||
|'''7\18''' | |'''7\18,''' '''323.076''' | ||
'''323.076''' | |'''5\13,''' '''315.789''' | ||
|'''5\13''' | |'''8\21,''' '''309.677''' | ||
'''315. | |'''3\8,''' '''300''' | ||
|'''8\21''' | |'''7\19,''' '''289.655''' | ||
'''309.677''' | |'''4\11.''' '''282.353''' | ||
|'''3\8''' | |'''5\14,''' '''272.727''' | ||
'''300''' | |||
|'''7\19''' | |||
'''289.655''' | |||
|'''4\11''' | |||
'''282.353''' | |||
|'''5\14''' | |||
'''272. | |||
|- | |- | ||
|Do# | |Do# | ||
|Sol# | |||
|Γ# | |Γ# | ||
|8\18 | |8\18, 369.231 | ||
369.231 | |6\13, 378.947 | ||
|6\13 | |10\21, 387.097 | ||
378.947 | | rowspan="2" |4\8, 400 | ||
|10\21 | |10\19, 413.793 | ||
387. | |6\11, 423.529 | ||
| rowspan="2" |4\8 | |8\14, 436.364 | ||
400 | |||
|10\19 | |||
413.793 | |||
|6\11 | |||
423.529 | |||
|8\14 | |||
436. | |||
|- | |- | ||
|Reb | |Reb | ||
|Lab | |||
|Δb | |Δb | ||
|10\18 | |10\18, 461.538 | ||
461. | |7\13, 442.105 | ||
|7\13 | |11\21, 425.806 | ||
442.105 | |9\19, 372.413 | ||
|11\21 | |5\11 352.941 | ||
425. | |6\14, 327.272 | ||
|9\19 | |||
372.413 | |||
|5\11 | |||
352.941 | |||
|6\14 | |||
327. | |||
|- | |- | ||
|'''Re''' | |'''Re''' | ||
|'''La''' | |||
|'''Δ''' | |'''Δ''' | ||
|'''11\18''' | |'''11\18,''' '''507.692''' | ||
'''507.692''' | |'''8\13,''' '''505.263''' | ||
|'''8\13''' | |'''13\21,''' '''503.226''' | ||
'''505.263''' | |'''5\8,''' '''500''' | ||
|'''13\21''' | |'''12\19,''' '''496.551''' | ||
'''503.226''' | |'''7\11,''' '''494.118''' | ||
|'''5\8''' | |'''9\14,''' '''490.909''' | ||
'''500''' | |||
|'''12\19''' | |||
'''496.551''' | |||
|'''7\11''' | |||
'''494.118''' | |||
|'''9\14''' | |||
'''490. | |||
|- | |- | ||
|Re# | |Re# | ||
|La# | |||
|Δ# | |Δ# | ||
|12\18 | |12\18, 553.846 | ||
553.846 | |9\13, 568.421 | ||
|9\13 | |15\21, 580.645 | ||
568.421 | | rowspan="2" |6\8, 600 | ||
|15\21 | |15\19, 620.689 | ||
580.645 | |9\11, 635.294 | ||
| rowspan="2" |6\8 | |12\14, 654.545 | ||
600 | |||
|15\19 | |||
620.689 | |||
|9\11 | |||
635.294 | |||
|12\14 | |||
654. | |||
|- | |- | ||
|Mib | |Mib | ||
|Sib | |||
|Εb | |Εb | ||
|14\18 | |14\18, 646.154 | ||
646.154 | |10\13, 631.579 | ||
|10\13 | |16\21, 619.355 | ||
631.579 | |14\19, 579.310 | ||
|16\21 | |8\11, 564.706 | ||
619.355 | |10\14, 545.455 | ||
|14\19 | |||
579.310 | |||
|8\11 | |||
564.706 | |||
|10\14 | |||
545. | |||
|- | |- | ||
|Mi | |Mi | ||
|Si | |||
|Ε | |Ε | ||
|15\18 | |15\18, 692.308 | ||
692.308 | |11\13, 694.737 | ||
|11\13 | |18\21, 696.774 | ||
694.737 | |7\8, 700 | ||
|18\21 | |17\19, 703.448 | ||
696.774 | |10\11, 705.882 | ||
|7\8 | |13\14, 709.091 | ||
700 | |||
|17\19 | |||
703.448 | |||
|10\11 | |||
705. | |||
|13\14 | |||
709. | |||
|- | |- | ||
|Mi# | |Mi# | ||
|Si# | |||
|Ε# | |Ε# | ||
|16\18 | |16\18, 738.462 | ||
738. | | rowspan="2" |12\13, 757.895 | ||
| rowspan="2" |12\13 | | 20\21, 774.194 | ||
757.895 | |8\8, 800 | ||
|20\21 | |20\19, 827.586 | ||
774.194 | |12\11, 847.059 | ||
|8\8 | |16\14, 872.727 | ||
800 | |||
|20\19 | |||
827.586 | |||
|12\11 | |||
847.059 | |||
|16\14 | |||
872. | |||
|- | |- | ||
|Lab | |Lab | ||
|Mib | |||
|Ϛb/Ϝb | |Ϛb/Ϝb | ||
|17\18 | |17\18, 784.615 | ||
784.615 | |19\21, 735.484 | ||
|19\21 | |7\8, 700 | ||
735.484 | |16\19, 662.069 | ||
|7\8 | |9\11, 635.294 | ||
700 | |11\14, 600 | ||
|16\19 | |||
662.069 | |||
|9\11 | |||
635.294 | |||
|11\14 | |||
600 | |||
|- | |- | ||
!La | !La | ||
!Mi | |||
!Ϛ/Ϝ | !Ϛ/Ϝ | ||
!18\18 | !18\18, 830.769 | ||
830.769 | !13\13, 821.053 | ||
!13\13 | !21\21, 812.903 | ||
821.053 | !8\8, 800 | ||
!21\21 | !19\19, 786.207 | ||
812.903 | !11\11, 776.471 | ||
!8\8 | !14\14, 763.636 | ||
800 | |||
!19\19 | |||
786.207 | |||
!11\11 | |||
776.471 | |||
!14\14 | |||
763. | |||
|- | |- | ||
|La# | |La# | ||
|Mi# | |||
|Ϛ#/Ϝ# | |Ϛ#/Ϝ# | ||
|19\18 | |19\18, 876.923 | ||
876.923 | |14\13, 884.211 | ||
|14\13 | |23\21, 890.323 | ||
884. | | rowspan="2" |9\8, 900 | ||
|23\21 | |22\19, 910.345 | ||
890.323 | |13\11, 917.647 | ||
| rowspan="2" |9\8 | |17\14, 927.273 | ||
900 | |||
|22\19 | |||
910.345 | |||
|13\11 | |||
917.647 | |||
|17\14 | |||
927. | |||
|- | |- | ||
|Sib | |Sib | ||
|Fa | |||
|Ζb | |Ζb | ||
|21\18 | |21\18, 969.231 | ||
969.231 | |15\13, 947.368 | ||
|15\13 | |24\21, 929.032 | ||
947.368 | |21\19, 868.966 | ||
|24\21 | |12\11, 847.059 | ||
929.032 | |15\14, 818.182 | ||
|21\19 | |||
868. | |||
|12\11 | |||
847.059 | |||
|15\14 | |||
818. | |||
|- | |- | ||
|Si | |Si | ||
|Fa# | |||
|Ζ | |Ζ | ||
|22\18 | |22\18, 1015.385 | ||
1015.385 | |16\13, 1010.526 | ||
|16\13 | |26\21, 1006.452 | ||
1010.526 | |10\8, 1000 | ||
|26\21 | |24\19, 993.103 | ||
1006.452 | |14\11, 988.235 | ||
|10\8 | |18\14, 981.81 | ||
1000 | |||
|24\19 | |||
993. | |||
|14\11 | |||
988.235 | |||
|18\14 | |||
981. | |||
|- | |- | ||
|Si# | |Si# | ||
|Fax | |||
|Ζ# | |Ζ# | ||
|23\18 | |23\18, 1061.538 | ||
1061. | | rowspan="2" |17\13, 1071.684 | ||
| rowspan="2" |17\13 | |28\21, 1083.871 | ||
1071.684 | |11\8, 1100 | ||
|28\21 | |27\19, 1117.241 | ||
1083.871 | |16\11, 1129.412 | ||
|11\8 | |21\14, 1145.455 | ||
1100 | |||
|27\19 | |||
1117.241 | |||
|16\11 | |||
1129.412 | |||
|21\14 | |||
1145. | |||
|- | |- | ||
|Dob | |Dob | ||
|Solb | |||
|Ηb | |Ηb | ||
|24\18 | |24\18, 1107.692 | ||
1107.692 | |27\21, 1045.161 | ||
|27\21 | |10\8, 1000 | ||
1045.161 | |23\19, 951.724 | ||
|10\8 | |13\11, 917.647 | ||
1000 | |16\14, 872.727 | ||
|23\19 | |||
951.724 | |||
|13\11 | |||
917.647 | |||
|16\14 | |||
872. | |||
|- | |- | ||
|'''Do''' | |'''Do''' | ||
|'''Sol''' | |||
|'''Η''' | |'''Η''' | ||
|'''25\18''' | |'''25\18,''' '''1153.846''' | ||
'''1153.846''' | |'''18\13,''' '''1136.842''' | ||
|'''18\13''' | |'''29\21,''' '''1122.581''' | ||
'''1136.842''' | |'''11\8,''' '''1100''' | ||
|'''29\21''' | |'''26\19,''' '''1075.862''' | ||
'''1122.581''' | |'''15\11,''' '''1058.824''' | ||
|'''11\8''' | |'''19\14,''' '''1036.364''' | ||
'''1100''' | |||
|'''26\19''' | |||
'''1075.862''' | |||
|'''15\11''' | |||
''' | |||
|'''19\14''' | |||
'''1036. | |||
|- | |- | ||
|Do# | |Do# | ||
|Sol# | |||
|Η# | |Η# | ||
|26\18 | |26\18, 1200 | ||
1200 | |19\13, 1200 | ||
|19\13 | |31\21, 1200 | ||
1200 | | rowspan="2" |12\8, 1200 | ||
|31\21 | |29\19, 1200 | ||
1200 | |17\11, 1200 | ||
| rowspan="2" |12\8 | |22\14, 1200 | ||
1200 | |||
|29\19 | |||
1200 | |||
|17\11 | |||
1200 | |||
|22\14 | |||
1200 | |||
|- | |- | ||
|Reb | |Reb | ||
|Lab | |||
|Θb | |Θb | ||
|28\18 | |28\18, 1292.308 | ||
1292.308 | |20\13, 1263.158 | ||
|20\13 | |32\21, 1238.710 | ||
1263.158 | |28\19, 1158.621 | ||
|32\21 | |16\11, 1129.412 | ||
1238.710 | |20\14, 1090.909 | ||
|28\19 | |||
1158.621 | |||
|16\11 | |||
1129.412 | |||
|20\14 | |||
1090. | |||
|- | |- | ||
|'''Re''' | |'''Re''' | ||
|'''La''' | |||
|'''Θ''' | |'''Θ''' | ||
|'''29\18''' | |'''29\18,''' '''1338.462''' | ||
'''1338. | |'''21\13,''' '''1326.316''' | ||
|'''21\13''' | |'''34\21,''' '''1316.129''' | ||
'''1326.316''' | |'''13\8,''' '''1300''' | ||
|'''34\21''' | |'''31\19,''' '''1282.759''' | ||
'''1316.129''' | |'''18\11,''' '''1270.588''' | ||
|'''13\8''' | |'''23\14,''' '''1254.545''' | ||
'''1300''' | |||
|'''31\19''' | |||
'''1282.759''' | |||
|'''18\11''' | |||
'''1270.588''' | |||
|'''23\14''' | |||
'''1254. | |||
|- | |- | ||
|Re# | |Re# | ||
|La# | |||
|Θ# | |Θ# | ||
|30\18 | |30\18, 1384.615 | ||
1384.615 | |22\13, 1389.474 | ||
|22\13 | |36\21, 1393.548 | ||
1389.474 | | rowspan="2" |14\8, 1400 | ||
|36\21 | |34\19, 1406.897 | ||
1393.548 | |20\11, 1411.765 | ||
| rowspan="2" |14\8 | |26\14, 1418.182 | ||
1400 | |||
|34\19 | |||
1406.897 | |||
|20\11 | |||
1411.765 | |||
|26\14 | |||
1418. | |||
|- | |- | ||
|Mib | |Mib | ||
|Sib | |||
|Ιb | |Ιb | ||
|32\18 | |32\18, 1476.923 | ||
1476.923 | |23\13, 1452.632 | ||
|23\13 | |37\21, 1432.258 | ||
1452.632 | |33\19, 1365.517 | ||
|37\21 | |19\11, 1341.176 | ||
1432.258 | |24\14, 1309.091 | ||
|33\19 | |||
1365.517 | |||
|19\11 | |||
1341. | |||
|24\14 | |||
1309. | |||
|- | |- | ||
|Mi | |Mi | ||
|Si | |||
|Ι | |Ι | ||
|33\18 | |33\18, 1523.077 | ||
1523.077 | |24\13, 1515.789 | ||
|24\13 | |39\21, 1509.677 | ||
1515. | |15\8, 1500 | ||
|39\21 | |36\19, 1489.655 | ||
1509.677 | |21\11, 1482.352 | ||
|15\8 | |27\14, 1472.727 | ||
1500 | |||
|36\19 | |||
1489.655 | |||
|21\11 | |||
1482.352 | |||
|27\14 | |||
1472. | |||
|- | |- | ||
|Mi# | |Mi# | ||
|Si# | |||
|Ι# | |Ι# | ||
|34\18 | |34\18, 1569.231 | ||
1569.231 | | rowspan="2" |25\13, 1578.947 | ||
| rowspan="2" |25\13 | |41\21, 1587.097 | ||
1578.947 | |16\8, 1600 | ||
|41\21 | |39\19, 1613.793 | ||
1587.097 | |23\11, 1623.529 | ||
|16\8 | |30\14, 1636.364 | ||
1600 | |||
|39\19 | |||
1613.793 | |||
|23\11 | |||
1623.529 | |||
|30\14 | |||
1636. | |||
|- | |- | ||
|Lab | |Lab | ||
|Mib | |Mib | ||
|Αb | |Αb | ||
| | |35\18, 1615.385 | ||
|40\21, 1548.387 | |||
| | |15\8, 1500 | ||
|35\19, 1448.286 | |||
| | |20\11, 1411.765 | ||
|25\14, 1363.636 | |||
| | |||
| | |||
| | |||
|- | |- | ||
!La | !La | ||
!Mi | |||
!Α | !Α | ||
! | !36\18, 1661.538 | ||
!26\13, 1642.105 | |||
!42\21, 1625.806 | |||
!16\8, 1600 | |||
!38\19, 1572.414 | |||
!22\11, 1552.941 | |||
!28\14, 1527.273 | |||
|} | |} | ||
==Intervals== | ==Intervals== | ||
| Line 1,014: | Line 360: | ||
!Sextave notation | !Sextave notation | ||
!Interval category name | !Interval category name | ||
!Generators | ! Generators | ||
!Notation of sixth inverse | !Notation of sixth inverse | ||
!Interval category name | ! Interval category name | ||
|- | |- | ||
| colspan="6" |The 5-note MOS has the following intervals (from some root): | | colspan="6" |The 5-note MOS has the following intervals (from some root): | ||
|- | |- | ||
|0 | |0 | ||
|La | |La, Mi | ||
|sextave (minor sixth) | |sextave (minor sixth) | ||
|0 | | 0 | ||
|La | |La, Mi | ||
|perfect unison | | perfect unison | ||
|- | |- | ||
|1 | |1 | ||
|Re | |Re, La | ||
|perfect fourth | |perfect fourth | ||
| -1 | | -1 | ||
|Do | |Do, Sol | ||
|minor third | |minor third | ||
|- | |- | ||
|2 | |2 | ||
|Si | |Si, Fa# | ||
|major second | |major second | ||
| -2 | | -2 | ||
|Mib | |Mib, Sib | ||
|diminished fifth | |diminished fifth | ||
|- | |- | ||
|3 | |3 | ||
|Mi | |Mi, Si | ||
|perfect fifth | |perfect fifth | ||
| -3 | | -3 | ||
|Sib | |Sib, Fa | ||
|minor second | |minor second | ||
|- | |- | ||
|4 | |4 | ||
|Do# | |Do#, Sol# | ||
|major third | |major third | ||
| -4 | | -4 | ||
|Reb | |Reb, Lb | ||
|diminished fourth | |diminished fourth | ||
|- | |- | ||
| Line 1,058: | Line 404: | ||
|- | |- | ||
|5 | |5 | ||
|La# | |La#, Mi# | ||
|augmented unison (chroma) | |augmented unison (chroma) | ||
| -5 | | -5 | ||
|Lab | | Lab, Mib | ||
|diminished sextave | |diminished sextave | ||
|- | |- | ||
|6 | |6 | ||
|Re# | | Re#, La# | ||
|augmented fourth | |augmented fourth | ||
| -6 | | -6 | ||
|Dob | |Dob, Solb | ||
|diminished third | |diminished third | ||
|- | |- | ||
|7 | |7 | ||
|Si# | |Si#, Fax | ||
|augmented second | |augmented second | ||
| -7 | | -7 | ||
|Mibb | |Mibb, Sibb | ||
|doubly diminished fifth | |doubly diminished fifth | ||
|} | |} | ||
| Line 1,082: | Line 428: | ||
{| class="wikitable" | {| class="wikitable" | ||
|Sibb | |Sibb | ||
Fab | |||
|Mibb | |Mibb | ||
Sibb | |||
|Dob | |Dob | ||
Solb | |||
|Lab | |Lab | ||
Mib | |||
|Reb | |Reb | ||
Lab | |||
|Sib | |Sib | ||
Fa | |||
|Mib | |Mib | ||
Sib | |||
|Do | |Do | ||
Sol | |||
|La | |La | ||
Mi | |||
|Re | |Re | ||
La | |||
|Si | |Si | ||
Fa# | |||
|Mi | |Mi | ||
Si | |||
|Do# | |Do# | ||
Sol# | |||
|La# | |La# | ||
Mi# | |||
|Re# | |Re# | ||
La# | |||
|Si# | |Si# | ||
Fax | |||
|Mi# | |Mi# | ||
Si# | |||
|- | |- | ||
|d2 | |d2 | ||
| Line 1,126: | Line 489: | ||
|- | |- | ||
!name | !name | ||
!pattern | ! pattern | ||
!notation | !notation | ||
!2nd | !2nd | ||
| Line 1,181: | Line 544: | ||
[[Comma]] list: [[81/80]] | [[Comma]] list: [[81/80]] | ||
[[POL2]] generator: ~6/5 = 308. | [[POL2]] generator: ~6/5 = 308.3057¢ | ||
[[Mapping]]: [{{val|1 1 2}}, {{val|0 -1 -3}}] | [[Mapping]]: [{{val|1 1 2}}, {{val|0 -1 -3}}] | ||
[[Optimal ET sequence]]: 5ed8/5, 8ed8/5, 13ed8/5 | [[Optimal ET sequence]]: [[5ed8/5]], [[8ed8/5]], [[13ed8/5]] | ||
==='''Aeolianic-Superpyth'''=== | ==='''Aeolianic-Superpyth'''=== | ||
[[Subgroup]]: 14/9.4/3.3/2 | [[Subgroup]]: 14/9.4/3.3/2 | ||
| Line 1,191: | Line 554: | ||
[[Comma]] list: [[64/63]] | [[Comma]] list: [[64/63]] | ||
[[POL2]] generator: ~7/6 = 276. | [[POL2]] generator: ~7/6 = 276.0795¢ | ||
[[Mapping]]: [{{val|1 1 2}}, {{val|0 -1 -3}}] | [[Mapping]]: [{{val|1 1 2}}, {{val|0 -1 -3}}] | ||
[[Optimal ET sequence]]: 3ed14/9, 11ed14/9, 14ed14/9 | [[Optimal ET sequence]]: [[3ed14/9]], [[8ed14/9]], [[11ed14/9]], [[14ed14/9]] | ||
==Scale tree== | ==Scale tree== | ||
The spectrum looks like this: | The spectrum looks like this: | ||
{| class="wikitable" | {| class="wikitable" | ||
! | !Generator | ||
(bright) | (bright) | ||
! | !Normalised | ||
! | !L | ||
!s | |||
! | !L/s | ||
! | !Comments | ||
! | |||
|- | |- | ||
|3\5 | |3\5 | ||
|514.286 | |514.286 | ||
|1 | |1 | ||
|1 | |1 | ||
| Line 1,227: | Line 579: | ||
|- | |- | ||
|17\28 | |17\28 | ||
|510.000 | |||
|510 | |||
|6 | |6 | ||
|5 | |5 | ||
|1.200 | |1.200 | ||
| | | | ||
|- | |- | ||
|14\23 | |14\23 | ||
|509.091 | |||
|509. | |||
|5 | |5 | ||
|4 | |4 | ||
| Line 1,274: | Line 592: | ||
| | | | ||
|- | |- | ||
|25\41 | |25\41 | ||
|508.475 | |508.475 | ||
|9 | |9 | ||
|7 | |7 | ||
|1.286 | |1.286 | ||
| | | | ||
|- | |- | ||
|11\18 | |11\18 | ||
|507.692 | |507.692 | ||
|4 | |4 | ||
|3 | |3 | ||
| Line 1,322: | Line 606: | ||
| | | | ||
|- | |- | ||
|35\57 | |35\57 | ||
|506.024 | |506.024 | ||
|13 | |13 | ||
|9 | |9 | ||
|1.444 | |1.444 | ||
| | | | ||
|- | |- | ||
|8\13 | |8\13 | ||
|505.263 | |505.263 | ||
|3 | |3 | ||
|2 | |2 | ||
| Line 1,454: | Line 620: | ||
|Aeolianic-Meantone starts here | |Aeolianic-Meantone starts here | ||
|- | |- | ||
|21\34 | |21\34 | ||
|504.000 | |||
|504 | |||
|8 | |8 | ||
|5 | |5 | ||
| Line 1,502: | Line 627: | ||
| | | | ||
|- | |- | ||
|13\21 | |13\21 | ||
|503.226 | |503.226 | ||
|5 | |5 | ||
|3 | |3 | ||
| Line 1,538: | Line 634: | ||
| | | | ||
|- | |- | ||
|18\29 | |18\29 | ||
|502.326 | |502.326 | ||
|7 | |7 | ||
|4 | |4 | ||
| Line 1,574: | Line 641: | ||
| | | | ||
|- | |- | ||
|23\37 | |23\37 | ||
|501.818 | |||
|501. | |||
|9 | |9 | ||
|5 | |5 | ||
| Line 1,586: | Line 648: | ||
| | | | ||
|- | |- | ||
|28\45 | |28\45 | ||
|501.492 | |501.492 | ||
|11 | |11 | ||
|6 | |6 | ||
| Line 1,598: | Line 655: | ||
| | | | ||
|- | |- | ||
|33\53 | |33\53 | ||
|501.265 | |501.265 | ||
|13 | |13 | ||
|7 | |7 | ||
| Line 1,610: | Line 662: | ||
| | | | ||
|- | |- | ||
|38\61 | |38\61 | ||
|501.09 | |501.09 | ||
|15 | |15 | ||
|8 | |8 | ||
| Line 1,622: | Line 669: | ||
| | | | ||
|- | |- | ||
|43\69 | |43\69 | ||
|500.971 | |500.971 | ||
|17 | |17 | ||
|9 | |9 | ||
| Line 1,635: | Line 677: | ||
|- | |- | ||
|5\8 | |5\8 | ||
|500.000 | |||
|500 | |||
|2 | |2 | ||
|1 | |1 | ||
| Line 1,646: | Line 683: | ||
|Aeolianic-Meantone ends, Aeolianic-Pythagorean begins | |Aeolianic-Meantone ends, Aeolianic-Pythagorean begins | ||
|- | |- | ||
|42\67 | |42\67 | ||
|499.010 | |||
|499. | |||
|17 | |17 | ||
|8 | |8 | ||
| Line 1,658: | Line 690: | ||
| | | | ||
|- | |- | ||
|37\59 | |37\59 | ||
|498.876 | |498.876 | ||
|15 | |15 | ||
|7 | |7 | ||
| Line 1,670: | Line 697: | ||
| | | | ||
|- | |- | ||
|32\51 | |32\51 | ||
|498.701 | |498.701 | ||
|13 | |13 | ||
|6 | |6 | ||
| Line 1,682: | Line 704: | ||
| | | | ||
|- | |- | ||
|27\43 | |27\43 | ||
|498.461 | |498.461 | ||
|11 | |11 | ||
|5 | |5 | ||
| Line 1,694: | Line 711: | ||
| | | | ||
|- | |- | ||
|22\35 | |22\35 | ||
|498.113 | |498.113 | ||
|9 | |9 | ||
|4 | |4 | ||
| Line 1,706: | Line 718: | ||
| | | | ||
|- | |- | ||
|17\27 | |17\27 | ||
|497.561 | |497.561 | ||
|7 | |7 | ||
|3 | |3 | ||
| Line 1,730: | Line 725: | ||
| | | | ||
|- | |- | ||
|12\19 | |12\19 | ||
|496.552 | |496.552 | ||
|5 | |5 | ||
|2 | |2 | ||
| Line 1,766: | Line 732: | ||
| | | | ||
|- | |- | ||
|19\30 | |19\30 | ||
|495.652 | |495.652 | ||
|8 | |8 | ||
|3 | |3 | ||
| Line 1,802: | Line 739: | ||
| | | | ||
|- | |- | ||
|26\41 | |26\41 | ||
|495.238 | |495.238 | ||
|11 | |11 | ||
|4 | |4 | ||
| Line 1,814: | Line 746: | ||
| | | | ||
|- | |- | ||
|33\52 | |33\52 | ||
|495.000 | |||
|495 | |||
|14 | |14 | ||
|5 | |5 | ||
|2.800 | |2.800 | ||
| | | | ||
|- | |- | ||
|7\11 | |7\11 | ||
|494.118 | |494.118 | ||
|3 | |3 | ||
|1 | |1 | ||
| Line 1,886: | Line 760: | ||
|Aeolianic-Pythagorean ends, Aeolianic-Superpyth begins | |Aeolianic-Pythagorean ends, Aeolianic-Superpyth begins | ||
|- | |- | ||
|30\47 | |30\47 | ||
|493.151 | |493.151 | ||
|13 | |13 | ||
|4 | |4 | ||
| Line 1,958: | Line 767: | ||
| | | | ||
|- | |- | ||
|23\36 | |23\36 | ||
|492.857 | |492.857 | ||
|10 | |10 | ||
|3 | |3 | ||
| Line 1,970: | Line 774: | ||
| | | | ||
|- | |- | ||
|16\25 | |16\25 | ||
|492.308 | |492.308 | ||
|7 | |7 | ||
|2 | |2 | ||
| Line 1,982: | Line 781: | ||
| | | | ||
|- | |- | ||
|25\39 | |25\39 | ||
|491.803 | |491.803 | ||
|11 | |11 | ||
|3 | |3 | ||
|3.667 | |3.667 | ||
| | | | ||
|- | |- | ||
|9\14 | |9\14 | ||
|490.909 | |||
|490. | |||
|4 | |4 | ||
|1 | |1 | ||
| Line 2,054: | Line 795: | ||
| | | | ||
|- | |- | ||
|20\31 | |20\31 | ||
|489.795 | |489.795 | ||
|9 | |9 | ||
|2 | |2 | ||
|4.500 | |4.500 | ||
| | | | ||
|- | |- | ||
|11\17 | |11\17 | ||
|488.889 | |||
|488. | |||
|5 | |5 | ||
|1 | |1 | ||
|5.000 | |5.000 | ||
|Aeolianic-Superpyth ends | |Aeolianic-Superpyth ends | ||
|- | |- | ||
|13\20 | |13\20 | ||
|487.500 | |||
|487. | |||
|6 | |6 | ||
|1 | |1 | ||
| Line 2,187: | Line 817: | ||
|- | |- | ||
|2\3 | |2\3 | ||
|480.000 | |||
|480 | |||
|1 | |1 | ||
|0 | |0 | ||
| Line 2,198: | Line 823: | ||
|Paucitonic | |Paucitonic | ||
|} | |} | ||
==See also== | ==See also== | ||
[[3L 2s (13/8-equivalent)]] and [[3L 2s (φ-equivalent)|3L 2s ([math]φ[/math]-equivalent)]] - Harmonic and Golden tuning | |||
[[3L 2s (14/9-equivalent)]] - idealized Archytas tuning | [[3L 2s (14/9-equivalent)]] - idealized Archytas tuning | ||
[[3L 2s (11/7-equivalent)]] and [[3L 2s (π/2-equivalent)|3L 2s ([math]π[/math]/2-equivalent)]] - Neogothic tuning | |||
[[3L 2s (128/81-equivalent)]] - Pythagorean tuning | |||
[[3L 2s (8/5-equivalent)]] - idealized Meantone tuning | [[3L 2s (8/5-equivalent)]] - idealized Meantone tuning | ||
[[6L 4s (5/2-equivalent)]] - Annapolis Meantone tuning | |||
[[6L 4s (81/32-equivalent)]] - Annapolis Pythagorean tuning | |||
[[6L 4s (28/11-equivalent)]] - Annapolis Neogothic tuning | |||
[[6L 4s (18/7-equivalent)]] - Annapolis Archytas tuning | |||