113edo
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Prime factorization
113 (prime)
Step size
10.6195¢
Fifth
66\113 (700.885¢)
Semitones (A1:m2)
10:9 (106.2¢ : 95.58¢)
Consistency limit
13
Distinct consistency limit
13
| ← 112edo | 113edo | 114edo → |
113 equal divisions of the octave (abbreviated 113edo or 113ed2), also called 113-tone equal temperament (113tet) or 113 equal temperament (113et) when viewed under a regular temperament perspective, is the tuning system that divides the octave into 113 equal parts of about 10.6 ¢ each. Each step represents a frequency ratio of 21/113, or the 113th root of 2.
Theory
113edo is distinctly consistent in the 13-odd-limit with a flat tendency. As a temperament, it tempers out the amity comma and the ampersand in the 5-limit; 225/224, 1029/1024 and 1071875/1062882 in the 7-limit; 243/242, 385/384, 441/440 and 540/539 in the 11-limit; 325/324, 364/363, 729/728, and 1625/1617 in the 13-limit. It notably supports the 5-limit amity temperament, 7-limit amicable temperament, 7- and 11-limit miracle temperament, and 13-limit manna temperament.
Prime harmonics
| Harmonic | 2 | 3 | 5 | 7 | 11 | 13 | 17 | 19 | 23 | 29 | 31 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Error | absolute (¢) | +0.00 | -1.07 | -4.01 | -2.45 | +0.89 | -1.59 | +1.24 | -0.17 | -1.73 | +0.51 | +1.87 |
| relative (%) | +0 | -10 | -38 | -23 | +8 | -15 | +12 | -2 | -16 | +5 | +18 | |
| Steps (reduced) |
113 (0) |
179 (66) |
262 (36) |
317 (91) |
391 (52) |
418 (79) |
462 (10) |
480 (28) |
511 (59) |
549 (97) |
560 (108) | |
Subsets and supersets
113edo is the 30th prime edo.
Intervals
| Steps | Cents | Ups and downs notation | Approximate ratios |
|---|---|---|---|
| 0 | 0 | D | 1/1 |
| 1 | 10.6195 | ^D, v8E♭ | |
| 2 | 21.2389 | ^^D, v7E♭ | 78/77, 81/80 |
| 3 | 31.8584 | ^3D, v6E♭ | 49/48, 50/49, 55/54, 56/55 |
| 4 | 42.4779 | ^4D, v5E♭ | 40/39 |
| 5 | 53.0973 | ^5D, v4E♭ | 33/32, 65/63 |
| 6 | 63.7168 | ^6D, v3E♭ | 27/26, 28/27, 80/77 |
| 7 | 74.3363 | ^7D, vvE♭ | |
| 8 | 84.9558 | ^8D, vE♭ | 21/20, 81/77 |
| 9 | 95.5752 | ^9D, E♭ | 55/52 |
| 10 | 106.195 | D♯, v9E | 52/49 |
| 11 | 116.814 | ^D♯, v8E | 15/14, 77/72 |
| 12 | 127.434 | ^^D♯, v7E | 14/13 |
| 13 | 138.053 | ^3D♯, v6E | 13/12 |
| 14 | 148.673 | ^4D♯, v5E | 12/11, 49/45 |
| 15 | 159.292 | ^5D♯, v4E | |
| 16 | 169.912 | ^6D♯, v3E | 54/49 |
| 17 | 180.531 | ^7D♯, vvE | 10/9, 72/65 |
| 18 | 191.15 | ^8D♯, vE | 39/35 |
| 19 | 201.77 | E | 9/8, 55/49 |
| 20 | 212.389 | ^E, v8F | 44/39 |
| 21 | 223.009 | ^^E, v7F | |
| 22 | 233.628 | ^3E, v6F | 8/7, 55/48, 63/55 |
| 23 | 244.248 | ^4E, v5F | 15/13 |
| 24 | 254.867 | ^5E, v4F | 65/56, 81/70 |
| 25 | 265.487 | ^6E, v3F | 7/6, 64/55 |
| 26 | 276.106 | ^7E, vvF | |
| 27 | 286.726 | ^8E, vF | 13/11, 33/28 |
| 28 | 297.345 | F | 32/27, 77/65 |
| 29 | 307.965 | ^F, v8G♭ | |
| 30 | 318.584 | ^^F, v7G♭ | 6/5, 65/54, 77/64 |
| 31 | 329.204 | ^3F, v6G♭ | 40/33, 63/52 |
| 32 | 339.823 | ^4F, v5G♭ | 39/32 |
| 33 | 350.442 | ^5F, v4G♭ | 11/9, 27/22, 49/40, 60/49 |
| 34 | 361.062 | ^6F, v3G♭ | 16/13 |
| 35 | 371.681 | ^7F, vvG♭ | 26/21 |
| 36 | 382.301 | ^8F, vG♭ | 5/4, 56/45, 81/65 |
| 37 | 392.92 | ^9F, G♭ | 49/39 |
| 38 | 403.54 | F♯, v9G | 63/50 |
| 39 | 414.159 | ^F♯, v8G | 14/11, 33/26, 80/63 |
| 40 | 424.779 | ^^F♯, v7G | |
| 41 | 435.398 | ^3F♯, v6G | 9/7, 77/60 |
| 42 | 446.018 | ^4F♯, v5G | 35/27 |
| 43 | 456.637 | ^5F♯, v4G | 13/10 |
| 44 | 467.257 | ^6F♯, v3G | 21/16, 55/42, 72/55 |
| 45 | 477.876 | ^7F♯, vvG | |
| 46 | 488.496 | ^8F♯, vG | 65/49 |
| 47 | 499.115 | G | 4/3 |
| 48 | 509.735 | ^G, v8A♭ | |
| 49 | 520.354 | ^^G, v7A♭ | 27/20 |
| 50 | 530.973 | ^3G, v6A♭ | 49/36 |
| 51 | 541.593 | ^4G, v5A♭ | |
| 52 | 552.212 | ^5G, v4A♭ | 11/8 |
| 53 | 562.832 | ^6G, v3A♭ | 18/13 |
| 54 | 573.451 | ^7G, vvA♭ | 39/28 |
| 55 | 584.071 | ^8G, vA♭ | 7/5 |
| 56 | 594.69 | ^9G, A♭ | 55/39 |
| 57 | 605.31 | G♯, v9A | 78/55 |
| 58 | 615.929 | ^G♯, v8A | 10/7, 77/54 |
| 59 | 626.549 | ^^G♯, v7A | 56/39 |
| 60 | 637.168 | ^3G♯, v6A | 13/9, 81/56 |
| 61 | 647.788 | ^4G♯, v5A | 16/11 |
| 62 | 658.407 | ^5G♯, v4A | |
| 63 | 669.027 | ^6G♯, v3A | 72/49, 81/55 |
| 64 | 679.646 | ^7G♯, vvA | 40/27, 77/52 |
| 65 | 690.265 | ^8G♯, vA | |
| 66 | 700.885 | A | 3/2 |
| 67 | 711.504 | ^A, v8B♭ | |
| 68 | 722.124 | ^^A, v7B♭ | |
| 69 | 732.743 | ^3A, v6B♭ | 32/21, 55/36, 75/49 |
| 70 | 743.363 | ^4A, v5B♭ | 20/13 |
| 71 | 753.982 | ^5A, v4B♭ | 54/35, 65/42 |
| 72 | 764.602 | ^6A, v3B♭ | 14/9, 81/52 |
| 73 | 775.221 | ^7A, vvB♭ | |
| 74 | 785.841 | ^8A, vB♭ | 11/7, 52/33, 63/40 |
| 75 | 796.46 | ^9A, B♭ | |
| 76 | 807.08 | A♯, v9B | 78/49 |
| 77 | 817.699 | ^A♯, v8B | 8/5, 45/28, 77/48 |
| 78 | 828.319 | ^^A♯, v7B | 21/13 |
| 79 | 838.938 | ^3A♯, v6B | 13/8, 81/50 |
| 80 | 849.558 | ^4A♯, v5B | 18/11, 44/27, 49/30, 80/49 |
| 81 | 860.177 | ^5A♯, v4B | 64/39 |
| 82 | 870.796 | ^6A♯, v3B | 33/20, 81/49 |
| 83 | 881.416 | ^7A♯, vvB | 5/3 |
| 84 | 892.035 | ^8A♯, vB | |
| 85 | 902.655 | B | 27/16 |
| 86 | 913.274 | ^B, v8C | 22/13, 56/33 |
| 87 | 923.894 | ^^B, v7C | |
| 88 | 934.513 | ^3B, v6C | 12/7, 55/32 |
| 89 | 945.133 | ^4B, v5C | |
| 90 | 955.752 | ^5B, v4C | 26/15 |
| 91 | 966.372 | ^6B, v3C | 7/4 |
| 92 | 976.991 | ^7B, vvC | |
| 93 | 987.611 | ^8B, vC | 39/22 |
| 94 | 998.23 | C | 16/9 |
| 95 | 1008.85 | ^C, v8D♭ | 70/39 |
| 96 | 1019.47 | ^^C, v7D♭ | 9/5, 65/36 |
| 97 | 1030.09 | ^3C, v6D♭ | 49/27 |
| 98 | 1040.71 | ^4C, v5D♭ | |
| 99 | 1051.33 | ^5C, v4D♭ | 11/6 |
| 100 | 1061.95 | ^6C, v3D♭ | 24/13 |
| 101 | 1072.57 | ^7C, vvD♭ | 13/7 |
| 102 | 1083.19 | ^8C, vD♭ | 28/15 |
| 103 | 1093.81 | ^9C, D♭ | 49/26 |
| 104 | 1104.42 | C♯, v9D | |
| 105 | 1115.04 | ^C♯, v8D | 40/21 |
| 106 | 1125.66 | ^^C♯, v7D | |
| 107 | 1136.28 | ^3C♯, v6D | 27/14, 52/27, 77/40 |
| 108 | 1146.9 | ^4C♯, v5D | 64/33 |
| 109 | 1157.52 | ^5C♯, v4D | 39/20 |
| 110 | 1168.14 | ^6C♯, v3D | 49/25, 55/28 |
| 111 | 1178.76 | ^7C♯, vvD | 77/39 |
| 112 | 1189.38 | ^8C♯, vD | |
| 113 | 1200 | D | 2/1 |
Regular temperament properties
| Subgroup | Comma List | Mapping | Optimal 8ve Stretch (¢) |
Tuning Error | |
|---|---|---|---|---|---|
| Absolute (¢) | Relative (%) | ||||
| 2.3 | [-179 113⟩ | [⟨113 179]] | +0.338 | 0.338 | 3.18 |
| 2.3.5 | 1600000/1594323, 34171875/33554432 | [⟨113 179 262]] | +0.801 | 0.712 | 6.70 |
| 2.3.5.7 | 225/224, 1029/1024, 1071875/1062882 | [⟨113 179 262 317]] | +0.820 | 0.617 | 5.81 |
| 2.3.5.7.11 | 225/224, 243/242, 385/384, 980000/970299 | [⟨113 179 262 317 391]] | +0.604 | 0.700 | 6.59 |
| 2.3.5.7.11.13 | 225/224, 243/242, 325/324, 385/384, 1875/1859 | [⟨113 179 262 317 391 418]] | +0.575 | 0.643 | 6.05 |
Rank-2 temperaments
| Periods per 8ve |
Generator (Reduced) |
Cents (Reduced) |
Associated Ratio |
Temperaments |
|---|---|---|---|---|
| 1 | 4\113 | 42.48 | 40/39 | Humorous |
| 1 | 6\113 | 63.72 | 28/27 | Sycamore / betic |
| 1 | 8\113 | 84.96 | 21/20 | Amicable / pseudoamical / pseudoamorous |
| 1 | 11\113 | 116.81 | 15/14~16/15 | Miracle / manna |
| 1 | 13\113 | 138.05 | 27/25 | Quartemka |
| 1 | 22\113 | 233.63 | 8/7 | Slendric |
| 1 | 27\113 | 286.73 | 13/11 | Gamity |
| 1 | 29\113 | 307.96 | 3200/2673 | Familia |
| 1 | 32\113 | 339.82 | 243/200 | Houborizic |
| 1 | 34\113 | 360.06 | 16/13 | Phicordial |
| 1 | 37\113 | 392.92 | 2744/2187 | Emmthird |
| 1 | 47\113 | 499.12 | 4/3 | Gracecordial |
| 1 | 56\113 | 594.69 | 55/39 | Gaster |