88edo: Difference between revisions
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m →Theory: ''It is recommended to read the page regular temperament first to understand this section.'' Tag: Reverted |
No need to remind readers of what a regular temperament is everywhere Tag: Undo |
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== Theory == | == Theory == | ||
Using two different approximations to the [[3/2|perfect fifth]] (one of 51 steps and one of 52 steps), 88edo is compatible with both [[meantone]] and the particular variety of [[superpyth]] supported by [[22edo|22 equal temperament]], respectively. The meantone fifth is 0.0384 cents flatter than that of [[Lucy Tuning]] and, thus, audibly indistinguishable from it. It also gives the [[optimal patent val]] for the 11-limit [[mothra]] and [[euterpe]] temperaments. | Using two different approximations to the [[3/2|perfect fifth]] (one of 51 steps and one of 52 steps), 88edo is compatible with both [[meantone]] and the particular variety of [[superpyth]] supported by [[22edo|22 equal temperament]], respectively. The meantone fifth is 0.0384 cents flatter than that of [[Lucy Tuning]] and, thus, audibly indistinguishable from it. It also gives the [[optimal patent val]] for the 11-limit [[mothra]] and [[euterpe]] temperaments. | ||
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=== Subsets and supersets === | === Subsets and supersets === | ||
Since 88 factors into {{factorization|88}}, 88edo has subset edos {{EDOs| 2, 4, 8, 11, 22, and 44 }}. [[176edo]], which doubles it, provides correction for the approximation to harmonic 3. | Since 88 factors into {{factorization|88}}, 88edo has subset edos {{EDOs| 2, 4, 8, 11, 22, and 44 }}. [[176edo]], which doubles it, provides correction for the approximation to harmonic 3. | ||
== Interval table == | == Interval table == | ||
Revision as of 10:58, 11 April 2025
| ← 87edo | 88edo | 89edo → |
88 equal divisions of the octave (abbreviated 88edo or 88ed2), also called 88-tone equal temperament (88tet) or 88 equal temperament (88et) when viewed under a regular temperament perspective, is the tuning system that divides the octave into 88 equal parts of about 13.6 ¢ each. Each step represents a frequency ratio of 21/88, or the 88th root of 2.
Instruments
Theory
Using two different approximations to the perfect fifth (one of 51 steps and one of 52 steps), 88edo is compatible with both meantone and the particular variety of superpyth supported by 22 equal temperament, respectively. The meantone fifth is 0.0384 cents flatter than that of Lucy Tuning and, thus, audibly indistinguishable from it. It also gives the optimal patent val for the 11-limit mothra and euterpe temperaments.
Odd harmonics
| Harmonic | 3 | 5 | 7 | 9 | 11 | 13 | 15 | 17 | 19 | 21 | 23 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Error | Absolute (¢) | -6.50 | -4.50 | -0.64 | +0.64 | -5.86 | +4.93 | +2.64 | +4.14 | +2.49 | +6.49 | -1.00 |
| Relative (%) | -47.7 | -33.0 | -4.7 | +4.7 | -43.0 | +36.1 | +19.4 | +30.3 | +18.2 | +47.6 | -7.3 | |
| Steps (reduced) |
139 (51) |
204 (28) |
247 (71) |
279 (15) |
304 (40) |
326 (62) |
344 (80) |
360 (8) |
374 (22) |
387 (35) |
398 (46) | |
Subsets and supersets
Since 88 factors into 23 × 11, 88edo has subset edos 2, 4, 8, 11, 22, and 44. 176edo, which doubles it, provides correction for the approximation to harmonic 3.
Interval table
| Steps | Cents | Approximate ratios | Ups and downs notation (Dual flat fifth 51\88) |
Ups and downs notation (Dual sharp fifth 52\88) |
|---|---|---|---|---|
| 0 | 0 | 1/1 | D | D |
| 1 | 13.6 | ^D, ^^E♭♭♭ | ^D, v3E♭ | |
| 2 | 27.3 | ^^D, vvE♭♭ | ^^D, vvE♭ | |
| 3 | 40.9 | 41/40, 42/41 | vvD♯, vE♭♭ | ^3D, vE♭ |
| 4 | 54.5 | 32/31 | vD♯, E♭♭ | ^4D, E♭ |
| 5 | 68.2 | 25/24 | D♯, ^E♭♭ | ^5D, ^E♭ |
| 6 | 81.8 | 21/20, 22/21 | ^D♯, ^^E♭♭ | ^6D, ^^E♭ |
| 7 | 95.5 | 37/35 | ^^D♯, vvE♭ | v5D♯, ^3E♭ |
| 8 | 109.1 | vvD𝄪, vE♭ | v4D♯, ^4E♭ | |
| 9 | 122.7 | vD𝄪, E♭ | v3D♯, ^5E♭ | |
| 10 | 136.4 | 40/37 | D𝄪, ^E♭ | vvD♯, v6E |
| 11 | 150 | 12/11 | ^D𝄪, ^^E♭ | vD♯, v5E |
| 12 | 163.6 | 11/10 | ^^D𝄪, vvE | D♯, v4E |
| 13 | 177.3 | 31/28, 41/37 | vvD♯𝄪, vE | ^D♯, v3E |
| 14 | 190.9 | 19/17, 29/26 | E | ^^D♯, vvE |
| 15 | 204.5 | ^E, ^^F♭♭ | ^3D♯, vE | |
| 16 | 218.2 | 42/37 | ^^E, vvF♭ | E |
| 17 | 231.8 | 8/7 | vvE♯, vF♭ | ^E, v3F |
| 18 | 245.5 | vE♯, F♭ | ^^E, vvF | |
| 19 | 259.1 | E♯, ^F♭ | ^3E, vF | |
| 20 | 272.7 | 34/29, 41/35 | ^E♯, ^^F♭ | F |
| 21 | 286.4 | ^^E♯, vvF | ^F, v3G♭ | |
| 22 | 300 | 19/16, 25/21 | vvE𝄪, vF | ^^F, vvG♭ |
| 23 | 313.6 | 6/5 | F | ^3F, vG♭ |
| 24 | 327.3 | ^F, ^^G♭♭♭ | ^4F, G♭ | |
| 25 | 340.9 | 28/23, 39/32 | ^^F, vvG♭♭ | ^5F, ^G♭ |
| 26 | 354.5 | 38/31 | vvF♯, vG♭♭ | ^6F, ^^G♭ |
| 27 | 368.2 | vF♯, G♭♭ | v5F♯, ^3G♭ | |
| 28 | 381.8 | F♯, ^G♭♭ | v4F♯, ^4G♭ | |
| 29 | 395.5 | 39/31 | ^F♯, ^^G♭♭ | v3F♯, ^5G♭ |
| 30 | 409.1 | ^^F♯, vvG♭ | vvF♯, v6G | |
| 31 | 422.7 | vvF𝄪, vG♭ | vF♯, v5G | |
| 32 | 436.4 | vF𝄪, G♭ | F♯, v4G | |
| 33 | 450 | F𝄪, ^G♭ | ^F♯, v3G | |
| 34 | 463.6 | 17/13 | ^F𝄪, ^^G♭ | ^^F♯, vvG |
| 35 | 477.3 | ^^F𝄪, vvG | ^3F♯, vG | |
| 36 | 490.9 | vvF♯𝄪, vG | G | |
| 37 | 504.5 | G | ^G, v3A♭ | |
| 38 | 518.2 | 31/23 | ^G, ^^A♭♭♭ | ^^G, vvA♭ |
| 39 | 531.8 | ^^G, vvA♭♭ | ^3G, vA♭ | |
| 40 | 545.5 | 26/19 | vvG♯, vA♭♭ | ^4G, A♭ |
| 41 | 559.1 | vG♯, A♭♭ | ^5G, ^A♭ | |
| 42 | 572.7 | 32/23, 39/28 | G♯, ^A♭♭ | ^6G, ^^A♭ |
| 43 | 586.4 | ^G♯, ^^A♭♭ | v5G♯, ^3A♭ | |
| 44 | 600 | ^^G♯, vvA♭ | v4G♯, ^4A♭ | |
| 45 | 613.6 | vvG𝄪, vA♭ | v3G♯, ^5A♭ | |
| 46 | 627.3 | 23/16 | vG𝄪, A♭ | vvG♯, v6A |
| 47 | 640.9 | G𝄪, ^A♭ | vG♯, v5A | |
| 48 | 654.5 | 19/13, 35/24 | ^G𝄪, ^^A♭ | G♯, v4A |
| 49 | 668.2 | ^^G𝄪, vvA | ^G♯, v3A | |
| 50 | 681.8 | vvG♯𝄪, vA | ^^G♯, vvA | |
| 51 | 695.5 | A | ^3G♯, vA | |
| 52 | 709.1 | ^A, ^^B♭♭♭ | A | |
| 53 | 722.7 | ^^A, vvB♭♭ | ^A, v3B♭ | |
| 54 | 736.4 | 26/17 | vvA♯, vB♭♭ | ^^A, vvB♭ |
| 55 | 750 | 37/24 | vA♯, B♭♭ | ^3A, vB♭ |
| 56 | 763.6 | A♯, ^B♭♭ | ^4A, B♭ | |
| 57 | 777.3 | ^A♯, ^^B♭♭ | ^5A, ^B♭ | |
| 58 | 790.9 | ^^A♯, vvB♭ | ^6A, ^^B♭ | |
| 59 | 804.5 | 35/22 | vvA𝄪, vB♭ | v5A♯, ^3B♭ |
| 60 | 818.2 | vA𝄪, B♭ | v4A♯, ^4B♭ | |
| 61 | 831.8 | A𝄪, ^B♭ | v3A♯, ^5B♭ | |
| 62 | 845.5 | 31/19 | ^A𝄪, ^^B♭ | vvA♯, v6B |
| 63 | 859.1 | 23/14, 41/25 | ^^A𝄪, vvB | vA♯, v5B |
| 64 | 872.7 | vvA♯𝄪, vB | A♯, v4B | |
| 65 | 886.4 | 5/3 | B | ^A♯, v3B |
| 66 | 900 | 32/19, 37/22, 42/25 | ^B, ^^C♭♭ | ^^A♯, vvB |
| 67 | 913.6 | 39/23 | ^^B, vvC♭ | ^3A♯, vB |
| 68 | 927.3 | 29/17, 41/24 | vvB♯, vC♭ | B |
| 69 | 940.9 | vB♯, C♭ | ^B, v3C | |
| 70 | 954.5 | B♯, ^C♭ | ^^B, vvC | |
| 71 | 968.2 | 7/4 | ^B♯, ^^C♭ | ^3B, vC |
| 72 | 981.8 | 37/21 | ^^B♯, vvC | C |
| 73 | 995.5 | vvB𝄪, vC | ^C, v3D♭ | |
| 74 | 1009.1 | 34/19 | C | ^^C, vvD♭ |
| 75 | 1022.7 | ^C, ^^D♭♭♭ | ^3C, vD♭ | |
| 76 | 1036.4 | 20/11 | ^^C, vvD♭♭ | ^4C, D♭ |
| 77 | 1050 | 11/6 | vvC♯, vD♭♭ | ^5C, ^D♭ |
| 78 | 1063.6 | 37/20 | vC♯, D♭♭ | ^6C, ^^D♭ |
| 79 | 1077.3 | 41/22 | C♯, ^D♭♭ | v5C♯, ^3D♭ |
| 80 | 1090.9 | ^C♯, ^^D♭♭ | v4C♯, ^4D♭ | |
| 81 | 1104.5 | ^^C♯, vvD♭ | v3C♯, ^5D♭ | |
| 82 | 1118.2 | 21/11, 40/21 | vvC𝄪, vD♭ | vvC♯, v6D |
| 83 | 1131.8 | vC𝄪, D♭ | vC♯, v5D | |
| 84 | 1145.5 | 31/16 | C𝄪, ^D♭ | C♯, v4D |
| 85 | 1159.1 | 41/21 | ^C𝄪, ^^D♭ | ^C♯, v3D |
| 86 | 1172.7 | ^^C𝄪, vvD | ^^C♯, vvD | |
| 87 | 1186.4 | vvC♯𝄪, vD | ^3C♯, vD | |
| 88 | 1200 | 2/1 | D | D |