107edo: Difference between revisions
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Group the vals by similarity; note a notable superset; misc. cleanup |
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107edo is in[[consistent]] to the [[5-odd-limit]] and higher limits, with four [[mapping]]s possible for the 7-limit: {{val| 107 170 248 300 }} ([[patent val]]), {{val| 107 '''169''' 248 300 }} (107b), {{val| 107 170 '''249''' 300 }} (107c), and {{val| 107 170 '''249''' '''301''' }} (107cd). | 107edo is in[[consistent]] to the [[5-odd-limit]] and higher limits, with four [[mapping]]s possible for the 7-limit: {{val| 107 170 248 300 }} ([[patent val]]), {{val| 107 '''169''' 248 300 }} (107b), {{val| 107 170 '''249''' 300 }} (107c), and {{val| 107 170 '''249''' '''301''' }} (107cd). | ||
Using the patent val, it tempers out | Using the patent val, it tempers out 3125/3072 ([[magic comma]]) and {{monzo| 28 -22 3 }} in the 5-limit; [[1029/1024]], [[2240/2187]], and [[3125/3087]] in the 7-limit; [[100/99]], 1232/1215, and 1331/1323 in the 11-limit. | ||
Using the | Using the 107cd val, it tempers out [[1728/1715]], [[4000/3969]], and 28672/28125 in the 7-limit; [[121/120]], [[896/891]], [[1375/1372]], and 3168/3125 in the 11-limit. | ||
Using the 107c val, it tempers out 1638400/1594323 (immunity comma) and 1990656/1953125 (valentine comma) in the 5-limit; [[126/125]], | Using the 107c val, it tempers out 1638400/1594323 ([[immunity comma]]) and 1990656/1953125 ([[valentine comma]]) in the 5-limit; [[126/125]], 1029/1024, and 307328/295245 in the 7-limit; 121/120, [[176/175]], [[441/440]], and 184877/177147 in the 11-limit. | ||
Using the | Using the 107b val, it tempers out 81/80 ([[syntonic comma]]) and {{monzo| -61 -1 27 }}; in the 5-limit; [[2401/2400]], [[2430/2401]], and 234375/229376 in the 7-limit; [[385/384]], 1350/1331, 1375/1372, and 1944/1925 in the 11-limit. | ||
=== Odd harmonics === | === Odd harmonics === | ||
{{Harmonics in equal|107}} | {{Harmonics in equal|107}} | ||
=== Subsets and supersets === | |||
107edo is the 28th [[prime edo]]. [[214edo]], which doubles it, provides correction for the approximation to harmonics 3, 5, and 7. | |||
== Intervals == | == Intervals == | ||
| Line 35: | Line 35: | ||
| 2.9 | | 2.9 | ||
| {{monzo| 339 -107 }} | | {{monzo| 339 -107 }} | ||
| {{ | | {{mapping| 107 339 }} | ||
| +0.322 | | +0.322 | ||
| 0.322 | | 0.322 | ||
| Line 42: | Line 42: | ||
| 2.9.5 | | 2.9.5 | ||
| 9765625/9565938, {{monzo| -34 10 1 }} | | 9765625/9565938, {{monzo| -34 10 1 }} | ||
| {{ | | {{mapping| 107 339 248 }} | ||
| +0.933 | | +0.933 | ||
| 0.904 | | 0.904 | ||
| Line 49: | Line 49: | ||
| 2.9.5.7 | | 2.9.5.7 | ||
| 225/224, 84035/82944, {{monzo| 14 -6 7 -4 }} | | 225/224, 84035/82944, {{monzo| 14 -6 7 -4 }} | ||
| {{ | | {{mapping| 107 339 248 300 }} | ||
| +1.087 | | +1.087 | ||
| 0.827 | | 0.827 | ||
| Line 56: | Line 56: | ||
| 2.9.5.7.11 | | 2.9.5.7.11 | ||
| 225/224, 441/440, 26411/26244, 161280/161051 | | 225/224, 441/440, 26411/26244, 161280/161051 | ||
| {{ | | {{mapping| 107 339 248 300 370 }} | ||
| +0.973 | | +0.973 | ||
| 0.774 | | 0.774 | ||
| Line 63: | Line 63: | ||
| 2.9.5.7.11.13 | | 2.9.5.7.11.13 | ||
| 225/224, 325/324, 441/440, 847/845, 24500/24167 | | 225/224, 325/324, 441/440, 847/845, 24500/24167 | ||
| {{ | | {{mapping| 107 339 248 300 370 396 }} | ||
| +0.783 | | +0.783 | ||
| 0.823 | | 0.823 | ||
| Line 70: | Line 70: | ||
| 2.9.5.7.11.13.17 | | 2.9.5.7.11.13.17 | ||
| 170/169, 225/224, 325/324, 441/440, 847/845, 2000/1989 | | 170/169, 225/224, 325/324, 441/440, 847/845, 2000/1989 | ||
| {{ | | {{mapping| 107 339 248 300 370 396 437 }} | ||
| +0.812 | | +0.812 | ||
| 0.765 | | 0.765 | ||
| 6.82 | | 6.82 | ||
|} | |} | ||
Revision as of 08:46, 8 June 2024
| ← 106edo | 107edo | 108edo → |
Theory
107edo is inconsistent to the 5-odd-limit and higher limits, with four mappings possible for the 7-limit: ⟨107 170 248 300] (patent val), ⟨107 169 248 300] (107b), ⟨107 170 249 300] (107c), and ⟨107 170 249 301] (107cd).
Using the patent val, it tempers out 3125/3072 (magic comma) and [28 -22 3⟩ in the 5-limit; 1029/1024, 2240/2187, and 3125/3087 in the 7-limit; 100/99, 1232/1215, and 1331/1323 in the 11-limit.
Using the 107cd val, it tempers out 1728/1715, 4000/3969, and 28672/28125 in the 7-limit; 121/120, 896/891, 1375/1372, and 3168/3125 in the 11-limit.
Using the 107c val, it tempers out 1638400/1594323 (immunity comma) and 1990656/1953125 (valentine comma) in the 5-limit; 126/125, 1029/1024, and 307328/295245 in the 7-limit; 121/120, 176/175, 441/440, and 184877/177147 in the 11-limit.
Using the 107b val, it tempers out 81/80 (syntonic comma) and [-61 -1 27⟩; in the 5-limit; 2401/2400, 2430/2401, and 234375/229376 in the 7-limit; 385/384, 1350/1331, 1375/1372, and 1944/1925 in the 11-limit.
Odd harmonics
| Harmonic | 3 | 5 | 7 | 9 | 11 | 13 | 15 | 17 | 19 | 21 | 23 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Error | Absolute (¢) | +4.59 | -5.01 | -4.34 | -2.04 | -1.79 | +0.59 | -0.42 | -4.02 | +5.29 | +0.25 | -0.24 |
| Relative (%) | +40.9 | -44.6 | -38.7 | -18.2 | -15.9 | +5.3 | -3.7 | -35.9 | +47.2 | +2.2 | -2.1 | |
| Steps (reduced) |
170 (63) |
248 (34) |
300 (86) |
339 (18) |
370 (49) |
396 (75) |
418 (97) |
437 (9) |
455 (27) |
470 (42) |
484 (56) | |
Subsets and supersets
107edo is the 28th prime edo. 214edo, which doubles it, provides correction for the approximation to harmonics 3, 5, and 7.
Intervals
| Steps | Cents | Approximate ratios | Ups and downs notation (Dual flat fifth 62\107) |
Ups and downs notation (Dual sharp fifth 63\107) |
|---|---|---|---|---|
| 0 | 0 | 1/1 | D | D |
| 1 | 11.2 | ^D, ^^E♭♭♭ | ^D, v5E♭ | |
| 2 | 22.4 | ^^D, v3E♭♭ | ^^D, v4E♭ | |
| 3 | 33.6 | ^3D, vvE♭♭ | ^3D, v3E♭ | |
| 4 | 44.9 | 39/38, 41/40 | vvD♯, vE♭♭ | ^4D, vvE♭ |
| 5 | 56.1 | 31/30, 32/31 | vD♯, E♭♭ | ^5D, vE♭ |
| 6 | 67.3 | D♯, ^E♭♭ | ^6D, E♭ | |
| 7 | 78.5 | 22/21, 23/22, 45/43 | ^D♯, ^^E♭♭ | v6D♯, ^E♭ |
| 8 | 89.7 | ^^D♯, v3E♭ | v5D♯, ^^E♭ | |
| 9 | 100.9 | ^3D♯, vvE♭ | v4D♯, ^3E♭ | |
| 10 | 112.1 | 16/15 | vvD𝄪, vE♭ | v3D♯, ^4E♭ |
| 11 | 123.4 | 44/41 | vD𝄪, E♭ | vvD♯, ^5E♭ |
| 12 | 134.6 | 40/37 | D𝄪, ^E♭ | vD♯, ^6E♭ |
| 13 | 145.8 | 37/34 | ^D𝄪, ^^E♭ | D♯, v6E |
| 14 | 157 | 23/21 | ^^D𝄪, v3E | ^D♯, v5E |
| 15 | 168.2 | 32/29, 43/39 | ^3D𝄪, vvE | ^^D♯, v4E |
| 16 | 179.4 | 41/37 | vvD♯𝄪, vE | ^3D♯, v3E |
| 17 | 190.7 | 29/26 | E | ^4D♯, vvE |
| 18 | 201.9 | ^E, ^^F♭♭ | ^5D♯, vE | |
| 19 | 213.1 | 26/23, 43/38 | ^^E, v3F♭ | E |
| 20 | 224.3 | 33/29 | ^3E, vvF♭ | ^E, v5F |
| 21 | 235.5 | vvE♯, vF♭ | ^^E, v4F | |
| 22 | 246.7 | 15/13 | vE♯, F♭ | ^3E, v3F |
| 23 | 257.9 | E♯, ^F♭ | ^4E, vvF | |
| 24 | 269.2 | ^E♯, ^^F♭ | ^5E, vF | |
| 25 | 280.4 | 20/17 | ^^E♯, v3F | F |
| 26 | 291.6 | 45/38 | ^3E♯, vvF | ^F, v5G♭ |
| 27 | 302.8 | 31/26 | vvE𝄪, vF | ^^F, v4G♭ |
| 28 | 314 | F | ^3F, v3G♭ | |
| 29 | 325.2 | 41/34 | ^F, ^^G♭♭♭ | ^4F, vvG♭ |
| 30 | 336.4 | 17/14 | ^^F, v3G♭♭ | ^5F, vG♭ |
| 31 | 347.7 | ^3F, vvG♭♭ | ^6F, G♭ | |
| 32 | 358.9 | 16/13 | vvF♯, vG♭♭ | v6F♯, ^G♭ |
| 33 | 370.1 | 26/21 | vF♯, G♭♭ | v5F♯, ^^G♭ |
| 34 | 381.3 | F♯, ^G♭♭ | v4F♯, ^3G♭ | |
| 35 | 392.5 | ^F♯, ^^G♭♭ | v3F♯, ^4G♭ | |
| 36 | 403.7 | 24/19 | ^^F♯, v3G♭ | vvF♯, ^5G♭ |
| 37 | 415 | 33/26 | ^3F♯, vvG♭ | vF♯, ^6G♭ |
| 38 | 426.2 | vvF𝄪, vG♭ | F♯, v6G | |
| 39 | 437.4 | vF𝄪, G♭ | ^F♯, v5G | |
| 40 | 448.6 | 22/17 | F𝄪, ^G♭ | ^^F♯, v4G |
| 41 | 459.8 | 30/23, 43/33 | ^F𝄪, ^^G♭ | ^3F♯, v3G |
| 42 | 471 | 21/16 | ^^F𝄪, v3G | ^4F♯, vvG |
| 43 | 482.2 | 37/28, 41/31 | ^3F𝄪, vvG | ^5F♯, vG |
| 44 | 493.5 | vvF♯𝄪, vG | G | |
| 45 | 504.7 | G | ^G, v5A♭ | |
| 46 | 515.9 | 31/23 | ^G, ^^A♭♭♭ | ^^G, v4A♭ |
| 47 | 527.1 | 42/31 | ^^G, v3A♭♭ | ^3G, v3A♭ |
| 48 | 538.3 | 15/11 | ^3G, vvA♭♭ | ^4G, vvA♭ |
| 49 | 549.5 | 11/8 | vvG♯, vA♭♭ | ^5G, vA♭ |
| 50 | 560.7 | 29/21 | vG♯, A♭♭ | ^6G, A♭ |
| 51 | 572 | 32/23 | G♯, ^A♭♭ | v6G♯, ^A♭ |
| 52 | 583.2 | 7/5 | ^G♯, ^^A♭♭ | v5G♯, ^^A♭ |
| 53 | 594.4 | 31/22 | ^^G♯, v3A♭ | v4G♯, ^3A♭ |
| 54 | 605.6 | 44/31 | ^3G♯, vvA♭ | v3G♯, ^4A♭ |
| 55 | 616.8 | 10/7 | vvG𝄪, vA♭ | vvG♯, ^5A♭ |
| 56 | 628 | 23/16 | vG𝄪, A♭ | vG♯, ^6A♭ |
| 57 | 639.3 | 42/29 | G𝄪, ^A♭ | G♯, v6A |
| 58 | 650.5 | 16/11 | ^G𝄪, ^^A♭ | ^G♯, v5A |
| 59 | 661.7 | 22/15, 41/28 | ^^G𝄪, v3A | ^^G♯, v4A |
| 60 | 672.9 | 31/21 | ^3G𝄪, vvA | ^3G♯, v3A |
| 61 | 684.1 | 43/29, 46/31 | vvG♯𝄪, vA | ^4G♯, vvA |
| 62 | 695.3 | A | ^5G♯, vA | |
| 63 | 706.5 | ^A, ^^B♭♭♭ | A | |
| 64 | 717.8 | ^^A, v3B♭♭ | ^A, v5B♭ | |
| 65 | 729 | 32/21 | ^3A, vvB♭♭ | ^^A, v4B♭ |
| 66 | 740.2 | 23/15 | vvA♯, vB♭♭ | ^3A, v3B♭ |
| 67 | 751.4 | 17/11 | vA♯, B♭♭ | ^4A, vvB♭ |
| 68 | 762.6 | 45/29 | A♯, ^B♭♭ | ^5A, vB♭ |
| 69 | 773.8 | ^A♯, ^^B♭♭ | ^6A, B♭ | |
| 70 | 785 | ^^A♯, v3B♭ | v6A♯, ^B♭ | |
| 71 | 796.3 | 19/12 | ^3A♯, vvB♭ | v5A♯, ^^B♭ |
| 72 | 807.5 | vvA𝄪, vB♭ | v4A♯, ^3B♭ | |
| 73 | 818.7 | vA𝄪, B♭ | v3A♯, ^4B♭ | |
| 74 | 829.9 | 21/13 | A𝄪, ^B♭ | vvA♯, ^5B♭ |
| 75 | 841.1 | 13/8 | ^A𝄪, ^^B♭ | vA♯, ^6B♭ |
| 76 | 852.3 | ^^A𝄪, v3B | A♯, v6B | |
| 77 | 863.6 | 28/17 | ^3A𝄪, vvB | ^A♯, v5B |
| 78 | 874.8 | vvA♯𝄪, vB | ^^A♯, v4B | |
| 79 | 886 | B | ^3A♯, v3B | |
| 80 | 897.2 | ^B, ^^C♭♭ | ^4A♯, vvB | |
| 81 | 908.4 | ^^B, v3C♭ | ^5A♯, vB | |
| 82 | 919.6 | 17/10 | ^3B, vvC♭ | B |
| 83 | 930.8 | vvB♯, vC♭ | ^B, v5C | |
| 84 | 942.1 | vB♯, C♭ | ^^B, v4C | |
| 85 | 953.3 | 26/15 | B♯, ^C♭ | ^3B, v3C |
| 86 | 964.5 | ^B♯, ^^C♭ | ^4B, vvC | |
| 87 | 975.7 | ^^B♯, v3C | ^5B, vC | |
| 88 | 986.9 | 23/13 | ^3B♯, vvC | C |
| 89 | 998.1 | vvB𝄪, vC | ^C, v5D♭ | |
| 90 | 1009.3 | 43/24 | C | ^^C, v4D♭ |
| 91 | 1020.6 | ^C, ^^D♭♭♭ | ^3C, v3D♭ | |
| 92 | 1031.8 | 29/16 | ^^C, v3D♭♭ | ^4C, vvD♭ |
| 93 | 1043 | 42/23 | ^3C, vvD♭♭ | ^5C, vD♭ |
| 94 | 1054.2 | vvC♯, vD♭♭ | ^6C, D♭ | |
| 95 | 1065.4 | 37/20 | vC♯, D♭♭ | v6C♯, ^D♭ |
| 96 | 1076.6 | 41/22 | C♯, ^D♭♭ | v5C♯, ^^D♭ |
| 97 | 1087.9 | 15/8 | ^C♯, ^^D♭♭ | v4C♯, ^3D♭ |
| 98 | 1099.1 | ^^C♯, v3D♭ | v3C♯, ^4D♭ | |
| 99 | 1110.3 | ^3C♯, vvD♭ | vvC♯, ^5D♭ | |
| 100 | 1121.5 | 21/11, 44/23 | vvC𝄪, vD♭ | vC♯, ^6D♭ |
| 101 | 1132.7 | vC𝄪, D♭ | C♯, v6D | |
| 102 | 1143.9 | 31/16 | C𝄪, ^D♭ | ^C♯, v5D |
| 103 | 1155.1 | ^C𝄪, ^^D♭ | ^^C♯, v4D | |
| 104 | 1166.4 | ^^C𝄪, v3D | ^3C♯, v3D | |
| 105 | 1177.6 | ^3C𝄪, vvD | ^4C♯, vvD | |
| 106 | 1188.8 | vvC♯𝄪, vD | ^5C♯, vD | |
| 107 | 1200 | 2/1 | D | D |
Regular temperament properties
| Subgroup | Comma List | Mapping | Optimal 8ve Stretch (¢) |
Tuning Error | |
|---|---|---|---|---|---|
| Absolute (¢) | Relative (%) | ||||
| 2.9 | [339 -107⟩ | [⟨107 339]] | +0.322 | 0.322 | 2.87 |
| 2.9.5 | 9765625/9565938, [-34 10 1⟩ | [⟨107 339 248]] | +0.933 | 0.904 | 8.06 |
| 2.9.5.7 | 225/224, 84035/82944, [14 -6 7 -4⟩ | [⟨107 339 248 300]] | +1.087 | 0.827 | 7.37 |
| 2.9.5.7.11 | 225/224, 441/440, 26411/26244, 161280/161051 | [⟨107 339 248 300 370]] | +0.973 | 0.774 | 6.90 |
| 2.9.5.7.11.13 | 225/224, 325/324, 441/440, 847/845, 24500/24167 | [⟨107 339 248 300 370 396]] | +0.783 | 0.823 | 7.33 |
| 2.9.5.7.11.13.17 | 170/169, 225/224, 325/324, 441/440, 847/845, 2000/1989 | [⟨107 339 248 300 370 396 437]] | +0.812 | 0.765 | 6.82 |