Breedsmic temperaments
- This is a list showing technical temperament data. For an explanation of what information is shown here, you may look at the technical data guide for regular temperaments.
This page discusses miscellaneous rank-2 temperaments tempering out the breedsma (monzo: [-5 -1 -2 4⟩, ratio: 2401/2400). This is the amount by which two 49/40 intervals exceed 3/2, and by which two 60/49 intervals fall short. Either of these represent a neutral third interval which is highly characteristic of breedsmic tempering; any tuning system (12edo, for example) which does not possess a neutral third cannot be tempering out the breedsma.
The breedsma is also the amount by which four stacked 10/7 intervals exceed 25/6: (10000/2401)⋅(2401/2400) = 10000/2400 = 25/6, which is two octaves above the classic chromatic semitone, 25/24. We might note also that (49/40)⋅(10/7) = 7/4 and (49/40)⋅(10/7)2 = 5/2, relationships which will be significant in any breedsmic temperament. As a consequence of these facts, the 49/40~60/49 neutral third and the 7/5 and 10/7 intervals tend to have relatively low complexity in a breedsmic system.
Temperaments discussed elsewhere include:
- Beatles (+64/63) → Archytas clan
- Newt (+33554432/33480783) → Garischismic clan
- Decimal (+25/24, 49/48 or 50/49) → Dicot family
- Squares (+81/80) → Meantone family
- Sesquiquartififths (+32805/32768) → Schismatic family
- Miracle (+225/224) → Gamelismic clan
- Octacot (+245/243) → Tetracot family
- Quadrasruta (+2048/2025) → Diaschismic family
- Myna (+126/125) → Starling temperaments
- Harry (+19683/19600) → Gravity family
- Quasitemp (+875/864) → Keemic temperaments
- Hemiwürschmidt (+3136/3125 or 6144/6125) → Hemimean clan
- Eagle (+10485760000/10460353203) → Vulture family
- Ennealimmal (+4375/4374) → Septiennealimmal clan
- Quadrimage (+3125/3072) → Magic family
- Amicable (+1600000/1594323) → Amity family
- Decoid (+67108864/66976875) → Quintosec family
- Quadritikleismic (+15625/15552) → Kleismic family
- Neptune (+48828125/48771072) → Gammic family
- Tertiseptisix (+390625000/387420489) → Quartonic family
- Greenwood (+405/392 or 1323/1280) → Whitewood family
Considered below are tertiaseptal, emmthird, hemififths, osiris, quasiorwell, quinmite, septidiasemi, subneutral, maviloid, lockerbie, unthirds, neominor, catafourth, cotritone, fibo, quasimoha, mintone, gorgik, hemigoldis, and surmarvelpyth, in the order of increasing badness.
Tertiaseptal
Aside from the breedsma, tertiaseptal tempers out 65625/65536, the horwell comma, 703125/702464, the meter, and 2100875/2097152, the rainy comma. It can be described as the 31 & 171 temperament, and 256/245, 1029/1024 less than 21/20, serves as its generator. Three of these fall short of 8/7 by 2100875/2097152, and the generator can be taken as 1/3 of an 8/7 flattened by a fraction of a cent. The ploidacot for this temperament is 20-sheared 22-cot (or pentaseph due to a much simpler 2.5.7-subgroup structure).
171edo makes for an excellent tuning, although 140edo (= 171 - 31) also makes sense, and in very high limits 311edo (= 140 + 171) is especially notable. The 15- or 16-note mos can be used to explore no-threes harmony, and the 31-note mos gives plenty of room for those as well.
Subgroup: 2.3.5.7
Comma list: 2401/2400, 65625/65536
Mapping: [⟨1 -19 7 0], ⟨0 22 -5 3]]
- mapping generators: ~2, ~245/128
- WE: ~2 = 1200.1004 ¢, ~245/128 = 1122.9024 ¢ (~256/245 = 77.1979 ¢)
- error map: ⟨+0.100 -0.008 -0.123 -0.119]
- CWE: ~2 = 1200.0000 ¢, ~245/128 = 1122.8101 ¢ (~256/245 = 77.1899 ¢)
- error map: ⟨0.000 -0.133 -0.364 -0.396]
Optimal ET sequence: 31, 109, 140, 171
Badness (Sintel): 0.329
11-limit
Subgroup: 2.3.5.7.11
Comma list: 243/242, 441/440, 65625/65536
Mapping: [⟨1 -19 7 0 -48], ⟨0 22 -5 3 55]]
Optimal tunings:
- WE: ~2 = 1200.1034 ¢, ~245/128 = 1122.8694 ¢ (~256/245 = 77.2340 ¢)
- CWE: ~2 = 1200.0000 ¢, ~245/128 = 1122.7743 ¢ (~256/245 = 77.2257 ¢)
Optimal ET sequence: 31, 109e, 140e, 171, 202
Badness (Sintel): 1.18
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 243/242, 441/440, 625/624, 3584/3575
Mapping: [⟨1 -19 7 0 -48 43], ⟨0 22 -5 3 55 -42]]
Optimal tunings:
- WE: ~2 = 1199.8783 ¢, ~224/117 = 1122.6835 ¢ (~117/112 = 77.1948 ¢)
- CWE: ~2 = 1200.0000 ¢, ~224/117 = 1122.7968 ¢ (~117/112 = 77.2032 ¢)
Optimal ET sequence: 31, 140e, 171, 373ef
Badness (Sintel): 1.52
17-limit
Subgroup: 2.3.5.7.11.13.17
Comma list: 243/242, 375/374, 441/440, 625/624, 3584/3575
Mapping: [⟨1 -19 7 0 -48 43 49], ⟨0 22 -5 3 55 -42 -48]]
Optimal tunings:
- WE: ~2 = 1199.8677 ¢, ~65/34 = 1122.6748 ¢ (~68/65 = 77.1929 ¢)
- CWE: ~2 = 1200.0000 ¢, ~65/34 = 1122.7985 ¢ (~68/65 = 77.2015 ¢)
Optimal ET sequence: 31, 140e, 171
Badness (Sintel): 1.40
Tertia
Subgroup:2.3.5.7.11
Comma list: 385/384, 1331/1323, 1375/1372
Mapping: [⟨1 -19 7 0 -19], ⟨0 22 -5 3 24]]
Optimal tunings:
- WE: ~2 = 1200.2336 ¢, ~21/11 = 1123.0454 ¢ (~22/21 = 77.1882 ¢)
- CWE: ~2 = 1200.0000 ¢, ~21/11 = 1122.8311 ¢ (~22/21 = 77.1689 ¢)
Optimal ET sequence: 31, 109, 140, 171e, 311e
Badness (Sintel): 0.997
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 352/351, 385/384, 625/624, 1331/1323
Mapping: [⟨1 -19 7 0 -19 43], ⟨0 22 -5 3 24 -42]]
Optimal tunings:
- WE: ~2 = 1200.1395 ¢, ~21/11 = 1122.9727 ¢ (~22/21 = 77.1669 ¢)
- CWE: ~2 = 1200.0000 ¢, ~21/11 = 1122.8426 ¢ (~22/21 = 77.1574 ¢)
Optimal ET sequence: 31, 78f, 109, 140
Badness (Sintel): 1.17
17-limit
Subgroup: 2.3.5.7.11.13.17
Comma list: 352/351, 385/384, 561/560, 625/624, 715/714
Mapping: [⟨1 -19 7 0 -19 43 49], ⟨0 22 -5 3 24 -42 -48]]
Optimal tunings:
- WE: ~2 = 1200.1655 ¢, ~21/11 = 1122.9926 ¢ (~22/21 = 77.1729 ¢)
- CWE: ~2 = 1200.0000 ¢, ~21/11 = 1122.8376 ¢ (~22/21 = 77.1624 ¢)
Optimal ET sequence: 31, 78fg, 109g, 140
Badness (Sintel): 1.14
Tertiaseptia
This extension was considered by Gene Ward Smith as a 41-limit temperament[1]. It can be extended as such by tempering out 875/874, 714/713, 703/702 and 697/696, and mapping 19, 31, 37 and 41 to 94, 105, -81 and +10 steps, respectively.
Subgroup: 2.3.5.7.11
Comma list: 2401/2400, 6250/6237, 65625/65536
Mapping: [⟨1 -19 7 0 112], ⟨0 22 -5 3 -116]]
Optimal tunings:
- WE: ~2 = 1200.0053 ¢, ~245/128 = 1122.8357 ¢ (~256/245 = 77.1696 ¢)
- CWE: ~2 = 1200.0000 ¢, ~245/128 = 1122.8308 ¢ (~256/245 = 77.1692 ¢)
Optimal ET sequence: 31e, 140, 171, 311
Badness (Sintel): 1.88
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 625/624, 2080/2079, 2200/2197, 2401/2400
Mapping: [⟨1 -19 7 0 112 43], ⟨0 22 -5 3 -116 -42]]
Optimal tunings:
- WE: ~2 = 1199.9823 ¢, ~224/117 = 1122.8150 ¢ (~117/112 = 77.1673 ¢)
- CWE: ~2 = 1200.0000 ¢, ~224/117 = 1122.8316 ¢ (~117/112 = 77.1684 ¢)
Optimal ET sequence: 31e, 140, 171, 311, 1073
Badness (Sintel): 1.14
17-limit
Subgroup: 2.3.5.7.11.13.17
Comma list: 595/594, 625/624, 833/832, 1156/1155, 2200/2197
Mapping: [⟨1 -19 7 0 112 43 49], ⟨0 22 -5 3 -116 -42 -48]]
Optimal tunings:
- WE: ~2 = 1200.0092 ¢, ~65/34 = 1122.8392 ¢ (~68/65 = 77.1700 ¢)
- CWE: ~2 = 1200.0000 ¢, ~65/34 = 1122.8305 ¢ (~68/65 = 77.1695 ¢)
Optimal ET sequence: 31e, 140, 171, 311
Badness (Sintel): 0.956
2.3.5.7.11.13.17.23 subgroup
Subgroup: 2.3.5.7.11.13.17.23
Comma list: 595/594, 625/624, 833/832, 1105/1104, 1156/1155, 2200/2197
Mapping: [⟨1 -19 7 0 112 43 49 114], ⟨0 22 -5 3 -116 -42 -48 -117]]
Optimal tunings:
- WE: ~2 = 1200.0047 ¢, ~44/23 = 1122.8363 ¢ (~23/22 = 77.1684 ¢)
- CWE: ~2 = 1200.0000 ¢, ~44/23 = 1122.8319 ¢ (~23/22 = 77.1681 ¢)
Optimal ET sequence: 31ei, 140, 171, 311
Badness (Sintel): 0.944
2.3.5.7.11.13.17.23.29 subgroup
Subgroup: 2.3.5.7.11.13.17.23.29
Comma list: 595/594, 625/624, 784/783, 833/832, 1015/1014, 1105/1104, 1156/1155
Mapping: [⟨1 -19 7 0 112 43 49 114 61], ⟨0 22 -5 3 -116 -42 -48 -117 -60]]
Optimal tunings:
- WE: ~2 = 1199.9945 ¢, ~44/23 = 1122.8270 ¢ (~23/22 = 77.1675 ¢)
- CWE: ~2 = 1200.0000 ¢, ~44/23 = 1122.8322 ¢ (~23/22 = 77.1678 ¢)
Optimal ET sequence: 31ei, 140, 311, 762g
Badness (Sintel): 0.858
Hemitert
Subgroup: 2.3.5.7.11
Comma list: 2401/2400, 3025/3024, 65625/65536
Mapping: [⟨1 -41 12 -3 -73], ⟨0 44 -10 6 79]]
- mapping generators: ~2, ~88/45
Optimal tunings:
- WE: ~2 = 1200.1008 ¢, ~88/45 = 1161.5020 ¢ (~45/44 = 38.5988 ¢)
- CWE: ~2 = 1200.0000 ¢, ~88/45 = 1161.4053 ¢ (~45/44 = 38.5947 ¢)
Optimal ET sequence: 31, …, 280, 311, 342, 2021cde, 2363cde, …, 3389ccddee, 3731ccddee
Badness (Sintel): 0.517
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 625/624, 1575/1573, 2401/2400, 4096/4095
Mapping: [⟨1 -41 12 -3 -73 85], ⟨0 44 -10 6 79 -84]]
Optimal tunings:
- WE: ~2 = 1199.9822 ¢, ~88/45 = 1161.3952 ¢ (~45/44 = 38.5871 ¢)
- CWE: ~2 = 1200.0000 ¢, ~88/45 = 1161.4123 ¢ (~45/44 = 38.5877 ¢)
Optimal ET sequence: 31, 280, 311
Badness (Sintel): 1.39
17-limit
Subgroup: 2.3.5.7.11.13.17
Comma list: 625/624, 833/832, 1225/1224, 1575/1573, 4096/4095
Mapping: [⟨1 -41 12 -3 -73 85 97], ⟨0 44 -10 6 79 -84 -96]]
Optimal tunings:
- WE: ~2 = 1200.0042 ¢, ~88/45 = 1161.4149 ¢ (~45/44 = 38.5893 ¢)
- CWE: ~2 = 1200.0000 ¢, ~88/45 = 1161.4109 ¢ (~45/44 = 38.5891 ¢)
Optimal ET sequence: 31, 280, 311, 653f
Badness (Sintel): 1.29
Semitert
Subgroup: 2.3.5.7.11
Comma list: 2401/2400, 9801/9800, 65625/65536
Mapping: [⟨2 -16 9 3 47], ⟨0 22 -5 3 -46]]
- mapping generators: ~99/70, ~693/512
Optimal tunings:
- WE: ~99/70 = 600.0548 ¢, ~693/512 = 522.8547 ¢ (~256/245 = 77.2002 ¢)
- CWE: ~99/70 = 600.0000 ¢, ~693/512 = 522.8069 ¢ (~256/245 = 77.1931 ¢)
Optimal ET sequence: 62e, 140, 202, 342
Badness (Sintel): 0.853
Emmthird
Emmthird tempers out the scheme comma and may be described as the 58 & 171 temperament. The generator for emmthird is flatter than 81/64 by a lee comma, 177147/175616, and sharper than 5/4 by the hemimage comma, 10976/10935. The ploidacot for this temperament is delta-14-cot.
The 11-limit version, which tempers out 243/242 and 441/440, has much lower accuracy and is supported by much fewer equal temperaments.
Subgroup: 2.3.5.7
Comma list: 2401/2400, 14348907/14336000
Mapping: [⟨1 -3 -17 -8], ⟨0 14 59 33]]
- mapping generators: ~2, ~2744/2187
- WE: ~2 = 1200.0435 ¢, ~2744/2187 = 393.0021 ¢
- error map: ⟨+0.043 -0.057 +0.069 -0.106]
- CWE: ~2 = 1200.0000 ¢, ~2744/2187 = 392.9887 ¢
- error map: ⟨0.000 -0.113 +0.022 -0.197]
Optimal ET sequence: 58, 113, 171, 742, 913, 1084, 1255, 2681d, 3936d
Badness (Sintel): 0.424
11-limit
Subgroup: 2.3.5.7.11
Comma list: 243/242, 441/440, 1792000/1771561
Mapping: [⟨1 -3 -17 -8 -8], ⟨0 14 59 33 35]]
Optimal tunings:
- WE: ~2 = 1199.8090 ¢, ~1372/1089 = 392.9286 ¢
- CWE: ~2 = 1200.0000 ¢, ~1372/1089 = 392.9870 ¢
Optimal ET sequence: 58, 113, 171
Badness (Sintel): 1.73
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 243/242, 364/363, 441/440, 2200/2197
Mapping: [⟨1 -3 -17 -8 -8 -13], ⟨0 14 59 33 35 51]]
Optimal tunings:
- WE: ~2 = 1199.7756 ¢, ~180/143 = 392.9154 ¢
- CWE: ~2 = 1200.0000 ¢, ~180/143 = 392.9840 ¢
Optimal ET sequence: 58, 113, 171
Badness (Sintel): 1.11
17-limit
Subgroup: 2.3.5.7.11.13.17
Comma list: 243/242, 364/363, 441/440, 595/594, 2200/2197
Mapping: [⟨1 -3 -17 -8 -8 -13 9], ⟨0 14 59 33 35 51 -15]]
Optimal tunings:
- WE: ~2 = 1199.8396 ¢, ~64/51 = 392.9322 ¢
- CWE: ~2 = 1200.0000 ¢, ~64/51 = 392.9826 ¢
Optimal ET sequence: 58, 113, 171
Badness (Sintel): 1.18
Hemififths
Hemififths may be described as the 41 & 58 temperament, tempering out 5120/5103, the hemifamity comma, and 10976/10935, hemimage. It has a neutral third as a generator; its ploidacot is dicot. 99edo and 140edo provides good tunings, and 239edo an even better one; and other possible tunings are 160(1/25), giving just 5's, the 7- and 9-odd-limit minimax tuning, or 14(1/13), giving just 7's. It requires 25 generator steps to get to the class for the harmonic 5, whereas the 7 is half as complex, and hence hemififths makes for a good no-fives temperament, to which the 17- and 24-note mos are suited. The full force of this highly accurate temperament can be found using the 41-note mos or even the 34-note 2mos[clarification needed].
By adding 243/242 (which also means 441/440, 540/539 and 896/891) to the commas, hemififths extends to a less accurate 11-limit version, but one where 11/4 is only five generator steps. 99edo is an excellent tuning; one which loses little of the accuracy of the 7-limit but improves the 11-limit a bit. Now adding 144/143 brings in the 13-limit with less accuracy yet, but with very low complexity, as the generator can be taken to be 16/13. 99 remains a good tuning choice.
Subgroup: 2.3.5.7
Comma list: 2401/2400, 5120/5103
Mapping: [⟨1 1 -5 -1], ⟨0 2 25 13]]
- mapping generators: ~2, ~49/40
- WE: ~2 = 1199.7412 ¢, ~49/40 = 351.4016 ¢
- error map: ⟨-0.259 +0.590 +0.021 -0.346]
- CWE: ~2 = 1200.0000 ¢, ~49/40 = 351.4671 ¢
- error map: ⟨0.000 +0.979 +0.364 +0.246]
- 7- and 9-odd-limit minimax: ~49/40 = [1/5 0 1/25⟩
- [[1 0 0 0⟩, [7/5 0 2/25 0⟩, [0 0 1 0⟩, [8/5 0 13/25 0⟩]
- unchanged-interval (eigenmonzo) basis: 2.5
Algebraic generator: (2 + sqrt(2))/2
Optimal ET sequence: 17c, 41, 58, 99, 239, 338
Badness (Sintel): 0.563
11-limit
Subgroup: 2.3.5.7.11
Comma list: 243/242, 441/440, 896/891
Mapping: [⟨1 1 -5 -1 2], ⟨0 2 25 13 5]]
Optimal tunings:
- WE: ~2 = 1199.2845 ¢, ~11/9 = 351.3110 ¢
- CWE: ~2 = 1200.0000 ¢, ~11/9 = 351.4956 ¢
Optimal ET sequence: 17c, 41, 58, 99e
Badness (Sintel): 0.777
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 144/143, 196/195, 243/242, 364/363
Mapping: [⟨1 1 -5 -1 2 4], ⟨0 2 25 13 5 -1]]
Optimal tunings:
- WE: ~2 = 1198.8875 ¢, ~11/9 = 351.2475 ¢
- CWE: ~2 = 1200.0000 ¢, ~11/9 = 351.5438 ¢
Optimal ET sequence: 17c, 41, 58, 99ef, 157eff
Badness (Sintel): 0.789
Semihemi
Subgroup: 2.3.5.7.11
Comma list: 2401/2400, 3388/3375, 5120/5103
Mapping: [⟨2 0 -35 -15 -47], ⟨0 2 25 13 34]]
- mapping generators: ~99/70, ~400/231
Optimal tunings:
- WE: ~99/70 = 599.8556 ¢, ~400/231 = 951.2757 ¢
- CWE: ~99/70 = 600.0000 ¢, ~400/231 = 951.4939 ¢
Optimal ET sequence: 58, 140, 198
Badness (Sintel): 1.40
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 352/351, 676/675, 847/845, 1716/1715
Mapping: [⟨2 0 -35 -15 -47 -37], ⟨0 2 25 13 34 28]]
Optimal tunings:
- WE: ~99/70 = 599.8513 ¢, ~26/15 = 951.2662 ¢
- CWE: ~99/70 = 600.0000 ¢, ~26/15 = 951.4905 ¢
Optimal ET sequence: 58, 140, 198, 536f
Badness (Sintel): 0.876
Quadrafifths
This has been catalogued as semihemififths in Graham Breed's temperament finder, but quadrafifths arguably makes more sense because it straight-up splits the fifth in four.
Subgroup: 2.3.5.7.11
Comma list: 2401/2400, 3025/3024, 5120/5103
Mapping: [⟨1 1 -5 -1 8], ⟨0 4 50 26 -31]]
- mapping generators: ~2, ~243/220
Optimal tunings:
- WE: ~2 = 1199.7520 ¢, ~243/220 = 175.7015 ¢
- CWE: ~2 = 1200.0000 ¢, ~243/220 = 175.7360 ¢
Optimal ET sequence: 41, 157, 198, 239, 676b, 915be
Badness (Sintel): 1.33
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 352/351, 847/845, 2401/2400, 3025/3024
Mapping: [⟨1 1 -5 -1 8 10], ⟨0 4 50 26 -31 -43]]
Optimal tunings:
- WE: ~2 = 1199.6502 ¢, ~72/65 = 175.6957 ¢
- CWE: ~2 = 1200.0000 ¢, ~72/65 = 175.7461 ¢
Optimal ET sequence: 41, 157, 198, 437f, 635bcff
Badness (Sintel): 1.29
Cutefourths
This extension splits the neutral third plus an octave in three, with a ploidacot signature of beta-hexacot. The generator is an acute fourth in size (but not representing 27/20), hence the name.
Subgroup: 2.3.5.7.11
Comma list: 2401/2400, 4000/3993, 5120/5103
Mapping: [⟨1 -1 -30 -14 -28], ⟨0 6 75 39 73]]
- mapping generators: ~2, ~66/49
Optimal tunings:
- WE: ~2 = 1199.7345 ¢, ~66/49 = 517.0436 ¢
- CWE: ~2 = 1200.0000 ¢, ~66/49 = 517.1543 ¢
Optimal ET sequence: 58, 181, 239, 1014bcee
Badness (Sintel): 1.71
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 352/351, 847/845, 1575/1573, 2401/2400
Mapping: [⟨1 -1 -30 -14 -28 -20], ⟨0 6 75 39 73 55]]
Optimal tunings:
- WE: ~2 = 1199.6427 ¢, ~66/49 = 517.0035 ¢
- CWE: ~2 = 1200.0000 ¢, ~66/49 = 517.1524 ¢
Optimal ET sequence: 58, 181, 239f
Badness (Sintel): 1.45
Osiris
Subgroup: 2.3.5.7
Comma list: 2401/2400, 31381059609/31360000000
Mapping: [⟨1 13 33 21], ⟨0 32 86 51]]
- mapping generators: ~2, ~2187/1400
- WE: ~2 = 1200.0285 ¢, ~2187/1400 = 771.9522 ¢
- error map: ⟨+0.028 -0.025 +0.068 -0.117]
- CWE: ~2 = 1200.0000 ¢, ~2187/1400 = 771.9343 ¢
- error map: ⟨0.000 -0.056 +0.039 -0.175]
Optimal ET sequence: 157, 171, 1012, 1183, 1354, 1525, 1696
Badness (Sintel): 0.716
Quasiorwell
In addition to 2401/2400, quasiorwell tempers out the quasiorwellisma, 29360128/29296875 ([22 -1 -10 1⟩). It has a generator 1024/875, which is 6144/6125 more than 7/6. It may be described as the 31 & 270 temperament, and its ploidacot is eta-38-cot (or omega-triseph due to a much simpler 2.5.7-subgroup structure). As one might expect, 61\270 makes for an excellent tuning choice. Other possibilities are (7/2)1/8, giving just 7's, or 3841/38, giving pure fifths.
Adding 3025/3024 extends to the 11-limit and as expected, 270 remains an excellent tuning.
Subgroup: 2.3.5.7
Comma list: 2401/2400, 29360128/29296875
Mapping: [⟨1 -7 3 1], ⟨0 38 -3 8]]
- mapping generators: ~2, ~1024/875
- WE: ~2 = 1199.9403 ¢, ~1024/875 = 271.0935 ¢
- error map: ⟨-0.060 +0.018 +0.226 -0.137]
- CWE: ~2 = 1200.0000 ¢, ~1024/875 = 271.1064 ¢
- error map: ⟨0.000 +0.087 +0.367 +0.025]
Optimal ET sequence: 31, …, 177, 208, 239, 270, 571, 841, 1111
Badness (Sintel): 0.907
11-limit
Subgroup: 2.3.5.7.11
Comma list: 2401/2400, 3025/3024, 5632/5625
Mapping: [⟨1 -7 3 1 -11], ⟨0 38 -3 8 64]]
Optimal tunings:
- WE: ~2 = 1199.9484 ¢, ~90/77 = 271.0989 ¢
- CWE: ~2 = 1200.0000 ¢, ~90/77 = 271.1099 ¢
Optimal ET sequence: 31, …, 177e, 208, 239, 270
Badness (Sintel): 0.580
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 1001/1000, 1716/1715, 3025/3024, 4096/4095
Mapping: [⟨1 -7 3 1 -11 22], ⟨0 38 -3 8 64 -81]]
Optimal tunings:
- WE: ~2 = 1199.9916 ¢, ~90/77 = 271.1051 ¢
- CWE: ~2 = 1200.0000 ¢, ~90/77 = 271.1070 ¢
Optimal ET sequence: 31, 239, 270, 571, 841, 1111
Badness (Sintel): 0.741
Quinmite
Quinmite may be described as the 99 & 103 temperament. The generator for quinmite is the quasi-tempered minor third 25/21, sharper than 32/27 by the marvel comma, 225/224. It is also generated by 1/5 of the minor tenth 12/5, and its name is a play on the words "quintans" (Latin for "one fifth") and "minor tenth", given by Petr Pařízek in 2011[2][3]. Its ploidacot is eta-34-cot.
Subgroup: 2.3.5.7
Comma list: 2401/2400, 1959552/1953125
Mapping: [⟨1 -7 -5 -3], ⟨0 34 29 23]]
- mapping generators: ~2, ~25/21
- WE: ~2 = 1199.9361 ¢, ~25/21 = 302.9808 ¢
- error map: ⟨-0.064 -0.162 +0.448 -0.077]
- CWE: ~2 = 1200.0000 ¢, ~25/21 = 302.9953 ¢
- error map: ⟨0.000 -0.116 +0.549 +0.065]
Optimal ET sequence: 99, 202, 301, 400, 701, 1101c, 1802c
Badness (Sintel): 0.945
Septidiasemi
Aside from 2401/2400, septidiasemi tempers out 2152828125/2147483648 in the 7-limit, and may be described as the 10 & 171 temperament. It is so named because the generator is a "septimal diatonic semitone" (0.15 cents flat of 15/14), with a ploidacot of beta-26-cot. It is an excellent temperament for 2.3.5.7.13 and 2.3.5.7.13.17 subgroups rather than full 13- and 17-limit.
Subgroup: 2.3.5.7
Comma list: 2401/2400, 2152828125/2147483648
Mapping: [⟨1 -1 6 4], ⟨0 26 -37 -12]]
- mapping generators: ~2, ~15/14
- WE: ~2 = 1200.1043 ¢, ~15/14 = 119.3076 ¢
- error map: ⟨+0.104 -0.061 -0.070 -0.100]
- CWE: ~2 = 1200.0000 ¢, ~15/14 = 119.2971 ¢
- error map: ⟨0.000 -0.230 -0.307 -0.391]
Optimal ET sequence: 10, 151, 161, 171, 3581bcdd, 3752bcdd, …, 5633bbccddd, 5804bbccddd
Badness (Sintel): 1.12
Sedia
The sedia temperament (10 & 161) is an 11-limit extension of the septidiasemi, which tempers out 243/242 and 441/440.
Subgroup: 2.3.5.7.11
Comma list: 243/242, 441/440, 939524096/935859375
Mapping: [⟨1 -1 6 4 -3], ⟨0 26 -37 -12 65]]
Optimal tunings:
- WE: ~2 = 1199.9635 ¢, ~15/14 = 119.2755 ¢
- CWE: ~2 = 1200.0000 ¢, ~15/14 = 119.2791 ¢
Optimal ET sequence: 10, 151, 161, 171, 332
Badness (Sintel): 3.00
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 243/242, 441/440, 2200/2197, 3584/3575
Mapping: [⟨1 -1 6 4 -3 4], ⟨0 26 -37 -12 65 -3]]
Optimal tunings:
- WE: ~2 = 1199.8922 ¢, ~15/14 = 119.2700 ¢
- CWE: ~2 = 1200.0000 ¢, ~15/14 = 119.2804 ¢
Optimal ET sequence: 10, 151, 161, 171, 332
Badness (Sintel): 1.89
17-limit
Subgroup: 2.3.5.7.11.13.17
Comma list: 243/242, 441/440, 833/832, 2200/2197, 3584/3575
Mapping: [⟨1 -1 6 4 -3 4 2], ⟨0 26 -37 -12 65 -3 21]]
Optimal tunings:
- WE: ~2 = 1199.9088 ¢, ~15/14 = 119.2719 ¢
- CWE: ~2 = 1200.0000 ¢, ~15/14 = 119.2808 ¢
Optimal ET sequence: 10, 151, 161, 171, 332, 503ef
Badness (Sintel): 1.39
Subneutral
Subgroup: 2.3.5.7
Comma list: 2401/2400, 274877906944/274658203125
Mapping: [⟨1 -41 8 -5], ⟨0 60 -8 11]]
- mapping generators: ~2, ~46875/28672
- WE: ~2 = 1199.9998 ¢, ~46875/28672 = 851.6994 (~57344/46875 = 348.3005 ¢)
- error map: ⟨-0.000 +0.013 +0.090 -0.132]
- CWE: ~2 = 1200.0000 ¢, ~46875/28672 = 851.6995 ¢ (~57344/46875 = 348.3005 ¢)
- error map: ⟨0.000 +0.014 +0.090 -0.132]
Optimal ET sequence: 31, …, 348, 379, 410, 441, 1354, 1795, 2236
Badness (Sintel): 1.16
Maviloid
Subgroup: 2.3.5.7
Comma list: 2401/2400, 1224440064/1220703125
Mapping: [⟨1 -21 -22 -15], ⟨0 52 56 41]]
- mapping generators: ~2, ~875/648
- WE: ~2 = 1199.9863 ¢, ~875/648 = 521.1837 ¢
- error map: ⟨-0.014 -0.115 +0.274 -0.089]
- CWE: ~2 = 1200.0000 ¢, ~875/648 = 521.1894 ¢
- error map: ⟨0.000 -0.106 +0.293 -0.060]
Optimal ET sequence: 76, 99, 274, 373, 472, 571, 1043, 1614
Badness (Sintel): 1.46
Lockerbie
- For the 5-limit version, see Miscellaneous 5-limit temperaments #Lockerbie.
Lockerbie can be described as the 103 & 270 temperament. Its generator is ~77/60 from the 11-limit onwards, and 74 generator steps give the interval class of 3; its ploidacot is 26-sheared 74-cot. An obvious tuning is given by 270edo, but 373edo and especially 643edo work as well.
The temperament derives its name from the Scottish town, where a flight numbered 103 crashed with 270 casualties, and the temperament has a join 103 & 270, hence the name. The name was proposed in 2022 by Eliora, who favours it due to simplicity, ease of pronunciation and relation to numbers 103 and 270.
Lockerbie also has a unique extension that adds the 41st harmonic such that the generator is also on the same step in 103 or 270 as 41/32, which means that 616/615 is tempered out.
Subgroup: 2.3.5.7
Comma list: 2401/2400, [24 13 -18 -1⟩
Mapping: [⟨1 -25 -16 -13], ⟨0 74 51 44]]
- mapping generators: ~2, ~3828125/2985984
- WE: ~2 = 1199.9950 ¢, ~3828125/2985984 = 431.1055 ¢
- error map: ⟨-0.005 -0.024 +0.146 -0.120]
- CWE: ~2 = 1200.0000 ¢, ~3828125/2985984 = 431.1072 ¢
- error map: ⟨0.0000 -0.020 +0.155 -0.108]
Optimal ET sequence: 103, 167, 270, 643, 913, 1183
Badness (Sintel): 1.51
11-limit
Subgroup: 2.3.5.7.11
Comma list: 2401/2400, 3025/3024, 766656/765625
Mapping: [⟨1 -25 -16 -13 -26], ⟨0 74 51 44 82]]
Optimal tunings:
- WE: ~2 = 1200.0199 ¢, ~77/60 = 431.1147 ¢
- CWE: ~2 = 1200.0000 ¢, ~77/60 = 431.1078 ¢
Optimal ET sequence: 103, 167, 270, 643, 913, 1183e
Badness (Sintel): 0.865
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 1001/1000, 1716/1715, 3025/3024, 4225/4224
Mapping: [⟨1 -25 -16 -13 -26 -6], ⟨0 74 51 44 82 27]]
Optimal tunings:
- WE: ~2 = 1200.0707 ¢, ~77/60 = 431.1316 ¢
- CWE: ~2 = 1200.0000 ¢, ~77/60 = 431.1069 ¢
Optimal ET sequence: 103, 167, 270, 643, 913f
Badness (Sintel): 0.662
17-limit
Subgroup: 2.3.5.7.11.13.17
Comma list: 715/714, 936/935, 1001/1000, 1225/1224, 4225/4224
Mapping: [⟨1 -25 -16 -13 -26 -6 -11], ⟨0 74 51 44 82 27 42]]
Optimal tunings:
- WE: ~2 = 1199.9639 ¢, ~77/60 = 431.0957 ¢
- CWE: ~2 = 1200.0000 ¢, ~77/60 = 431.1083 ¢
Optimal ET sequence: 103, 167, 270
Badness (Sintel): 1.07
Unthirds
Despite the complexity of its mapping, unthirds is an important temperament to the structure of the 11-limit; this is hinted at by unthirds' representation as the 72 & 311 temperament, the join of two tuning systems well-known for their high accuracy. It is generated by the interval of 14/11 (undecimal major third, hence the name) tuned less than a cent flat, 42 of which octave reduced give the perfect fifth. Its ploidacot is 14-sheared 42-cot. The 23-note mos from the generator serves as a well temperament of, of all things, 23edo. The 49-note mos is needed to access the 3rd, 5th, 7th, and 11th harmonics.
The commas it tempers out in the 11-limit include the lehmerisma (3025/3024), the pine comma (4000/3993), the unisquary comma (12005/11979), the argyria (41503/41472), and 42875/42768, all of which appear individually in various 11-limit systems. It is also notable that there is a restriction of the temperament to the 2.5/3.7/3.11/3 fractional subgroup that tempers out 3025/3024 and 12005/11979, which is of considerably less complexity, and which is shared with sqrtphi (whose generator is tuned flat of 72edo's).
Subgroup: 2.3.5.7
Comma list: 2401/2400, 68359375/68024448
Mapping: [⟨1 -13 -14 -9], ⟨0 42 47 34]]
- mapping generators: ~2, ~3969/3125
- WE: ~2 = 1200.0859 ¢, ~3969/3125 = 416.7465 ¢
- error map: ⟨+0.086 +0.281 -0.431 -0.218]
- CWE: ~2 = 1200.0000 ¢, ~3969/3125 = 416.7184 ¢
- error map: ⟨0.000 +0.220 -0.547 -0.399]
Optimal ET sequence: 72, 167, 239, 311, 694, 1005c
Badness (Sintel): 1.90
11-limit
Subgroup: 2.3.5.7.11
Comma list: 2401/2400, 3025/3024, 4000/3993
Mapping: [⟨1 -13 -14 -9 -8], ⟨0 42 47 34 33]]
Optimal tunings:
- WE: ~2 = 1200.0246 ¢, ~14/11 = 416.7270 ¢
- CWE: ~2 = 1200.0000 ¢, ~14/11 = 416.7190 ¢
Optimal ET sequence: 72, 167, 239, 311
Badness (Sintel): 0.758
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 625/624, 1575/1573, 2080/2079, 2401/2400
Mapping: [⟨1 -13 -14 -9 -8 -47], ⟨0 42 47 34 33 146]]
Optimal tunings:
- WE: ~2 = 1200.0536 ¢, ~14/11 = 416.7343 ¢
- CWE: ~2 = 1200.0000 ¢, ~14/11 = 416.7164 ¢
Optimal ET sequence: 72, 239f, 311, 694, 1005c
Badness (Sintel): 0.863
Neominor
Neominor tempers out 177147/175616 and may be described as the 72 & 89 temperament. The generator is a neogothic minor third, which represents 13/11~20/17, or its octave complement, which represents 17/10~22/13. The latter stacked six times octave reduced give the perfect fifth, and the temperament has a ploidacot of delta-hexacot. 72edo and 89edo can be used as tunings.
Subgroup: 2.3.5.7
Comma list: 2401/2400, 177147/175616
Mapping: [⟨1 -3 -29 -14], ⟨0 6 41 22]]
- mapping generators: ~2, ~320/189
- WE: ~2 = 1200.4276 ¢, ~320/189 = 917.0471 ¢
- error map: ⟨+0.428 -0.955 +0.216 +0.224]
- CWE: ~2 = 1200.0000 ¢, ~320/189 = 916.7320 ¢
- error map: ⟨0.000 -1.563 -0.301 -0.722]
Optimal ET sequence: 17c, 55c, 72, 161, 233, 305
Badness (Sintel): 2.23
11-limit
Subgroup: 2.3.5.7.11
Comma list: 243/242, 441/440, 35937/35840
Mapping: [⟨1 -3 -29 -14 -8], ⟨0 6 41 22 15]]
Optimal tunings:
- WE: ~2 = 1200.3466 ¢, ~56/33 = 916.9889 ¢
- CWE: ~2 = 1200.0000 ¢, ~56/33 = 916.7330 ¢
Optimal ET sequence: 17c, 55c, 72, 161, 233, 305
Badness (Sintel): 0.924
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 169/168, 243/242, 364/363, 441/440
Mapping: [⟨1 -3 -29 -14 -8 -7], ⟨0 6 41 22 15 14]]
Optimal tunings:
- WE: ~2 = 1200.6874 ¢, ~22/13 = 917.2313 ¢
- CWE: ~2 = 1200.0000 ¢, ~22/13 = 916.7228 ¢
Optimal ET sequence: 17c, 55cf, 72
Badness (Sintel): 1.11
17-limit
Subgroup: 2.3.5.7.11.13.17
Comma list: 169/168, 221/220, 243/242, 273/272, 364/363
Mapping: [⟨1 -3 -29 -14 -8 -7 -28], ⟨0 6 41 22 15 14 42]]
Optimal tunings:
- WE: ~2 = 1200.6905 ¢, ~17/10 = 917.2356 ¢
- CWE: ~2 = 1200.0000 ¢, ~17/10 = 916.7252 ¢
Optimal ET sequence: 17cg, 55cfg, 72
Badness (Sintel): 0.918
Catafourth
Subgroup: 2.3.5.7
Comma list: 2401/2400, 78732/78125
Mapping: [⟨1 -15 -19 -12], ⟨0 28 36 25]]
- mapping generators: ~2, ~189/125
- WE: ~2 = 1199.9278 ¢, ~189/125 = 710.7220 ¢
- error map: ⟨-0.072 -0.656 +1.050 +0.091]
- CWE: ~2 = 1200.0000 ¢, ~189/125 = 710.7626 ¢
- error map: ⟨0.000 -0.603 +1.139 +0.238]
Optimal ET sequence: 27, 76, 103, 130
Badness (Sintel): 2.01
11-limit
Subgroup: 2.3.5.7.11
Comma list: 243/242, 441/440, 78408/78125
Mapping: [⟨1 -15 -19 -12 -38], ⟨0 28 36 25 70]]
Optimal tunings:
- WE: ~2 = 1200.0219 ¢, ~189/125 = 710.7610 ¢
- CWE: ~2 = 1200.0000 ¢, ~189/125 = 710.7487 ¢
Optimal ET sequence: 27e, 76e, 103, 130, 233, 363, 493e
Badness (Sintel): 1.22
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 243/242, 351/350, 441/440, 10985/10976
Mapping: [⟨1 -15 -19 -12 -38 -4], ⟨0 28 36 25 70 13]]
Optimal tunings:
- WE: ~2 = 1200.1023 ¢, ~98/65 = 710.8043 ¢
- CWE: ~2 = 1200.0000 ¢, ~98/65 = 710.7459 ¢
Optimal ET sequence: 27e, 76e, 103, 130, 233, 363
Badness (Sintel): 0.896
Cotritone
Subgroup: 2.3.5.7
Comma list: 2401/2400, 390625/387072
Mapping: [⟨1 -13 -4 -4], ⟨0 30 13 14]]
- mappping generators: ~2, ~7/5
- WE: ~2 = 1199.9278 ¢, ~7/5 = 583.5994 ¢
- error map: ⟨+0.441 +0.289 -1.287 -0.200]
- CWE: ~2 = 1200.0000 ¢, ~7/5 = 583.3956 ¢
- error map: ⟨0.000 -0.086 -2.170 -1.287]
Optimal ET sequence: 35, 37, 72, 181, 253, 325c
Badness (Sintel): 2.49
11-limit
Subgroup: 2.3.5.7.11
Comma list: 385/384, 1375/1372, 4000/3993
Mapping: [⟨1 -13 -4 -4 2], ⟨0 30 13 14 3]]
Optimal tunings:
- WE: ~2 = 1200.4058 ¢, ~7/5 = 583.5845 ¢
- CWE: ~2 = 1200.0000 ¢, ~7/5 = 583.3950 ¢
Optimal ET sequence: 35, 37, 72, 181, 253, 325c
Badness (Sintel): 1.07
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 169/168, 364/363, 385/384, 625/624
Mapping: [⟨1 -13 -4 -4 2 -7], ⟨0 30 13 14 3 22]]
Optimal tunings:
- WE: ~2 = 1200.6111 ¢, ~7/5 = 583.6837 ¢
- CWE: ~2 = 1200.0000 ¢, ~7/5 = 583.3987 ¢
Optimal ET sequence: 35f, 37, 72, 181f, 253ff
Badness (Sintel): 1.19
Fibo
Subgroup: 2.3.5.7
Comma list: 2401/2400, 341796875/339738624
Mapping: [⟨1 -27 -7 -9], ⟨0 46 15 19]]
- mapping generators: ~2, ~192/125
- WE: ~2 = 1200.2050 ¢, ~192/125 = 745.8170 ¢
- error map: ⟨+0.205 +0.094 -0.493 -0.147]
- CWE: ~2 = 1200.0000 ¢, ~192/125 = 745.6927 ¢
- error map: ⟨0.000 -0.092 -0.924 -0.665]
Optimal ET sequence: 37, 66b, 103, 140, 243, 383, 1009cd, 1392ccd
Badness (Sintel): 2.54
11-limit
Subgroup: 2.3.5.7.11
Comma list: 385/384, 1375/1372, 43923/43750
Mapping: [⟨1 -27 -7 -9 -4], ⟨0 46 15 19 12]]
Optimal tunings:
- WE: ~2 = 1200.4064 ¢, ~77/50 = 745.9349 ¢
- CWE: ~2 = 1200.0000 ¢, ~77/50 = 745.6876 ¢
Optimal ET sequence: 37, 66b, 103, 140, 243e
Badness (Sintel): 1.87
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 385/384, 625/624, 847/845, 1375/1372
Mapping: [⟨1 -27 -7 -9 -4 -5], ⟨0 46 15 19 12 14]]
Optimal tunings:
- WE: ~2 = 1200.3728 ¢, ~20/13 = 745.9152 ¢
- CWE: ~2 = 1200.0000 ¢, ~20/13 = 745.6879 ¢
Optimal ET sequence: 37, 66b, 103, 140, 243e
Badness (Sintel): 1.13
Quasimoha
- For the 5-limit version, see Miscellaneous 5-limit temperaments #Quasimoha.
Subgroup: 2.3.5.7
Comma list: 2401/2400, 3645/3584
Mapping: [⟨1 1 9 6], ⟨0 2 -23 -11]]
- mapping generators: ~2, ~49/40
- WE: ~2 = 1201.5059 ¢, ~49/40 = 348.0409 ¢
- error map: ⟨+1.506 -2.367 -0.702 +0.759]
- CWE: ~2 = 1200.0000 ¢, ~49/40 = 348.5582 ¢
- error map: ⟨0.000 -4.839 -3.152 -2.966]
Optimal ET sequence: 24c, 31, 117c, 148bc, 179bcd
Badness (Sintel): 2.80
11-limit
Subgroup: 2.3.5.7.11
Comma list: 243/242, 441/440, 1815/1792
Mapping: [⟨1 1 9 6 2], ⟨0 2 -23 -11 5]]
Optimal tunings:
- WE: ~2 = 1201.7630 ¢, ~11/9 = 349.1510 ¢
- CWE: ~2 = 1200.0000 ¢, ~11/9 = 348.6050 ¢
Optimal ET sequence: 24c, 31, 86ce, 117ce, 148bce
Badness (Sintel): 1.53
Mintone
In addition to 2401/2400, mintone tempers out 177147/175000 ([-3 11 -5 -1⟩) in the 7-limit; 243/242, 441/440, and 43923/43750 in the 11-limit. It may be described as the 58 & 103 temperament. It has a generator of ~10/9, tuned to around 49/44. Note that in the data below, the generator is its octave complement, ~9/5, so that 22 of them octave reduced give the perfect fifth. Its ploidacot is 18-sheared 22-cot. As one might expect, 25\161 makes for an excellent tuning choice.
Subgroup: 2.3.5.7
Comma list: 2401/2400, 177147/175000
Mapping: [⟨1 -17 -34 -20], ⟨0 22 43 27]]
- mapping generators: ~2, ~9/5
- WE: ~2 = 1200.1458 ¢, ~9/5 = 1013.7798 ¢
- error map: ⟨+0.146 -1.277 +1.263 +0.314]
- CWE: ~2 = 1200.0000 ¢, ~9/5 = 1013.6611 ¢
- error map: ⟨0.000 -1.410 +1.116 +0.025]
Optimal ET sequence: 45, 58, 103, 161
Badness (Sintel): 3.18
11-limit
Subgroup: 2.3.5.7.11
Comma list: 243/242, 441/440, 43923/43750
Mapping: [⟨1 -17 -34 -20 -43], ⟨0 22 43 27 55]]
Optimal tunings:
- WE: ~2 = 1200.1491 ¢, ~9/5 = 1013.7809 ¢
- CWE: ~2 = 1200.0000 ¢, ~9/5 = 1013.6593 ¢
Optimal ET sequence: 45e, 58, 103, 161, 425b
Badness (Sintel): 1.32
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 243/242, 351/350, 441/440, 847/845
Mapping: [⟨1 -17 -34 -20 -43 -36], ⟨0 22 43 27 55 47]]
Optimal tunings:
- WE: ~2 = 1200.0928 ¢, ~9/5 = 1013.7311 ¢
- CWE: ~2 = 1200.0000 ¢, ~9/5 = 1013.6556 ¢
Optimal ET sequence: 45ef, 58, 103, 161
Badness (Sintel): 0.903
17-limit
Subgroup: 2.3.5.7.11.13.17
Comma list: 243/242, 351/350, 441/440, 561/560, 847/845
Mapping: [⟨1 -17 -34 -20 -43 -36 10], ⟨0 22 43 27 55 47 -7]]
Optimal tunings:
- WE: ~2 = 1200.1085 ¢, ~9/5 = 1013.7433 ¢
- CWE: ~2 = 1200.0000 ¢, ~9/5 = 1013.6537 ¢
Optimal ET sequence: 45ef, 58, 103, 161
Badness (Sintel): 1.03
Gorgik
Gorgik may be described as the 21 & 37 temperament, with a ploidacot of 14-sheared 18-cot (or alpha-heptaseph due to a much simpler 2.5.7-subgroup restriction). 58edo makes for a strong tuning for this temperament.
Subgroup: 2.3.5.7
Comma list: 2401/2400, 28672/28125
Mapping: [⟨1 -13 8 2], ⟨0 18 -7 1]]
- mapping generators: ~2, ~7/4
- WE: ~2 = 1198.5503 ¢, ~7/4 = 971.3132 ¢ (~8/7 = 227.2371 ¢)
- error map: ⟨-1.450 +0.528 +2.896 -0.412]
- CWE: ~2 = 1200.0000 ¢, ~7/4 = 972.4675 ¢ (~8/7 = 227.5325 ¢)
- error map: ⟨0.000 +2.460 +6.414 +3.642]
Optimal ET sequence: 21, 37, 58, 153bc, 211bccd, 269bccd
Badness (Sintel): 4.01
11-limit
Subgroup: 2.3.5.7.11
Comma list: 176/175, 2401/2400, 2560/2541
Mapping: [⟨1 -13 8 2 14], ⟨0 18 -7 1 -13]]
Optimal tunings:
- WE: ~2 = 1198.4615 ¢, ~7/4 = 971.2535 ¢ (~8/7 = 227.2079 ¢)
- CWE: ~2 = 1200.0000 ¢, ~7/4 = 972.4918 ¢ (~8/7 = 227.5082 ¢)
Optimal ET sequence: 21, 37, 58, 153bce, 211bccdee, 269bccdee
Badness (Sintel): 1.96
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 176/175, 196/195, 364/363, 512/507
Mapping: [⟨1 -13 8 2 14 11], ⟨0 18 -7 1 -13 -9]]
Optimal tunings:
- WE: ~2 = 1198.4012 ¢, ~7/4 = 971.2110 ¢ (~8/7 = 227.1903 ¢)
- CWE: ~2 = 1200.0000 ¢, ~7/4 = 972.5030 ¢ (~8/7 = 227.4970 ¢)
Optimal ET sequence: 21, 37, 58, 153bcef, 211bccdeeff
Badness (Sintel): 1.33
Hemigoldis
Hemigoldis may be described as the 68 & 89 temperament. Though fairly complex in the 7-limit, it does a lot better in badness metrics than pure 5-limit goldis, and yet again has many possible extensions to higher primes. For example, two periods minus six generators yields a "tetracot second" which can be interpreted as ~21/19 to add prime 19 or perhaps more accurately ~31/28 to add prime 7, or even simply as ~32/29 to add prime 29, though the other two have the benefit of clearly connecting to the 7-limit representation. Note that again 89edo is a possible tuning for combining it with flat nestoria and not appearing in the optimal ET sequence.
Subgroup: 2.3.5.7
Comma list: 2401/2400, 549755813888/533935546875
Mapping: [⟨1 21 -9 2], ⟨0 24 -14 -1]]
- mapping generators: ~2, ~8/7
- WE: ~2 = 1199.2264 ¢, ~8/7 = 229.1679 ¢
- error map: ⟨-0.774 +0.394 +1.468 -0.314]
- CWE: ~2 = 1200.0000 ¢, ~8/7 = 229.3103 ¢
- error map: ⟨0.000 +1.491 +3.343 +1.864]
Optimal ET sequence: 21, 47b, 68, 157, 382bccd, 529bccd
Badness (Sintel): 4.40
Surmarvelpyth
Surmarvelpyth can be described as the 311 & 431 temperament, starting with the 7-limit to the 19-limit. Its ploidacot is 28-sheared 70-cot. It was named by Eliora in 2022 for the generator fifth, 675/448 being 225/224 (marvel comma) sharp of 3/2.
Subgroup: 2.3.5.7
Comma list: 2401/2400, [93 -32 -17 -1⟩
Mapping: [⟨1 -27 55 22], ⟨0 70 -129 -47]]
- mapping generators: ~2, ~896/675
- WE: ~2 = 1200.0051 ¢, ~896/675 = 490.0303 ¢
- error map: ⟨+0.005 +0.025 +0.063 -0.136]
- CWE: ~2 = 1200.0000 ¢, ~896/675 = 490.0282 ¢
- error map: ⟨0.000 +0.017 +0.052 -0.150]
Optimal ET sequence: 120, 191, 311, 742, 1053, 2848, 3901
Badness (Sintel): 5.12
11-limit
Subgroup: 2.3.5.7.11
Comma list: 2401/2400, 820125/819896, 2097152/2096325
Mapping: [⟨1 -27 55 22 -19], ⟨0 70 -129 -47 55]]
Optimal tunings:
- WE: ~2 = 1199.9901 ¢, ~896/675 = 490.0239 ¢
- CWE: ~2 = 1200.000 ¢, ~896/675 = 490.0279 ¢
Optimal ET sequence: 120, 191, 311, 742, 1053, 1795
Badness (Sintel): 1.73
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 2401/2400, 4096/4095, 6656/6655, 24192/24167
Mapping: [⟨1 -27 55 22 -19 -11], ⟨0 70 -129 -47 55 36]]
Optimal tunings:
- WE: ~2 = 1199.9701 ¢, ~65/49 = 490.0155 ¢
- CWE: ~2 = 1200.0000 ¢, ~65/49 = 490.0277 ¢
Optimal ET sequence: 120, 191, 311, 742, 1053, 1795f
Badness (Sintel): 1.34
17-limit
Subgroup: 2.3.5.7.11.13.17
Comma list: 2401/2400, 2601/2600, 4096/4095, 6656/6655, 8624/8619
Mapping: [⟨1 -27 55 22 -19 -11 78], ⟨0 70 -129 -47 55 36 -181]]
Optimal tunings:
- WE: ~2 = 1199.9726 ¢, ~65/49 = 490.0164 ¢
- CWE: ~2 = 1200.0000 ¢, ~65/49 = 490.0276 ¢
Optimal ET sequence: 120g, 191g, 311, 431, 742, 1795f
Badness (Sintel): 1.07
19-limit
Subgroup: 2.3.5.7.11.13.17.19
Comma list: 2401/2400, 2601/2600, 2926/2925, 3136/3135, 3213/3211, 5985/5984
Mapping: [⟨1 -27 55 22 -19 -11 78 41], ⟨0 70 -129 -47 55 36 -181 -90]]
Optimal tunings:
- WE: ~2 = 1199.9756 ¢, ~65/49 = 490.0176 ¢
- CWE: ~2 = 1200.0000 ¢, ~65/49 = 490.0276 ¢
Optimal ET sequence: 120g, 191g, 311, 431, 742, 1795f
Badness (Sintel): 0.838