71zpi: Difference between revisions
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== Intervals == | == Intervals == | ||
{| class="wikitable" | {| class="wikitable center-all right-2 left-3" | ||
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!Step | !Step | ||
Revision as of 23:05, 20 April 2024
71 zeta peak index (abbreviated 71zpi), is the equal-step tuning system obtained from the 71st peak of the Riemann zeta function.
| Tuning | Strength | Closest EDO | Integer limit | ||||||
|---|---|---|---|---|---|---|---|---|---|
| ZPI | Steps per octave | Step size (cents) | Height | Integral | Gap | EDO | Octave (cents) | Consistent | Distinct |
| 71zpi | 20.2248393119540 | 59.3329806724710 | 3.531097 | 0.613581 | 12.986080 | 20edo | 1186.65961344942 | 6 | 6 |
Theory
71zpi marks the most prominent zeta peak index in the vicinity of 20edo. While 70zpi is the nearest peak to 20edo and closely competes with 71zpi in terms of strength, 71zpi remains superior across all measures of strength.
71zpi features a good 3:5:9:11:14:15:16:19:25:26:33 chord, which differs a lot from the harmonic characteristics of 20edo.
The nearest zeta peaks to 71zpi that surpass its strength are 65zpi and 75zpi.
Harmonic series
| Harmonic | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | 11 | 12 | 13 | 14 | 15 | 16 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Error | Absolute (¢) | -13.3 | -3.3 | -26.7 | +2.3 | -16.6 | +13.2 | +19.3 | -6.6 | -11.0 | +2.0 | +29.4 | +9.4 | -0.2 | -1.0 | +6.0 |
| Relative (%) | -22.5 | -5.6 | -45.0 | +3.9 | -28.0 | +22.2 | +32.5 | -11.1 | -18.5 | +3.4 | +49.5 | +15.9 | -0.3 | -1.6 | +10.1 | |
| Step | 20 | 32 | 40 | 47 | 52 | 57 | 61 | 64 | 67 | 70 | 73 | 75 | 77 | 79 | 81 | |
| Harmonic | 17 | 18 | 19 | 20 | 21 | 22 | 23 | 24 | 25 | 26 | 27 | 28 | 29 | 30 | 31 | 32 | 33 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Error | Absolute (¢) | +19.7 | -19.9 | +5.1 | -24.3 | +9.9 | -11.3 | -29.0 | +16.0 | +4.7 | -3.9 | -9.9 | -13.5 | -14.9 | -14.3 | -11.7 | -7.4 | -1.3 |
| Relative (%) | +33.2 | -33.6 | +8.6 | -41.0 | +16.6 | -19.1 | -48.8 | +27.0 | +7.9 | -6.6 | -16.7 | -22.8 | -25.2 | -24.1 | -19.8 | -12.4 | -2.2 | |
| Step | 83 | 84 | 86 | 87 | 89 | 90 | 91 | 93 | 94 | 95 | 96 | 97 | 98 | 99 | 100 | 101 | 102 | |
Intervals
| Step | Cents | Ratios |
|---|---|---|
| 0 | 0.000 | 1/1 |
| 1 | 59.333 | 30/29, 29/28 |
| 2 | 118.666 | 15/14 |
| 3 | 177.999 | 10/9 |
| 4 | 237.332 | 8/7 |
| 5 | 296.665 | 13/11, 19/16, 6/5 |
| 6 | 355.998 | 11/9, 27/22, 16/13 |
| 7 | 415.331 | 5/4, 14/11 |
| 8 | 474.664 | 25/19, 4/3 |
| 9 | 533.997 | 15/11 |
| 10 | 593.330 | 7/5, 31/22 |
| 11 | 652.663 | 16/11, 19/13 |
| 12 | 711.996 | 3/2 |
| 13 | 771.329 | 14/9, 25/16, 11/7 |
| 14 | 830.662 | 8/5, 21/13, 13/8 |
| 15 | 889.995 | 5/3 |
| 16 | 949.328 | 19/11, 26/15, 7/4 |
| 17 | 1008.661 | 9/5 |
| 18 | 1067.994 | 13/7 |
| 19 | 1127.327 | 23/12 |
| 20 | 1186.660 | 2/1 |
| 22 | 1305.326 | 17/8 |
| 23 | 1364.659 | 11/5 |
| 25 | 1483.325 | 7/3 |
| 27 | 1601.990 | 5/2 |
| 28 | 1661.323 | 13/5 |
| 29 | 1720.656 | 8/3, 27/10 |
| 30 | 1779.989 | 14/5 |
| 32 | 1898.655 | 3/1 |
| 33 | 1957.988 | 31/10 |
| 34 | 2017.321 | 16/5 |
| 35 | 2076.654 | 10/3 |
| 36 | 2135.987 | 24/7 |
| 37 | 2195.320 | 7/2, 32/9 |
| 38 | 2254.653 | 11/3 |
| 39 | 2313.986 | 19/5 |
| 40 | 2373.319 | 4/1 |
| 44 | 2610.651 | 9/2 |
| 45 | 2669.984 | 14/3 |
| 46 | 2729.317 | 29/6 |
| 47 | 2788.650 | 5/1 |
| 51 | 3025.982 | 23/4 |
| 52 | 3085.315 | 6/1 |
| 57 | 3381.980 | 7/1 |
| 61 | 3619.312 | 8/1 |
| 63 | 3737.978 | 26/3 |
| 64 | 3797.311 | 9/1 |
| 67 | 3975.310 | 10/1 |
| 70 | 4153.309 | 11/1 |
| 75 | 4449.974 | 13/1 |
| 77 | 4568.640 | 14/1 |
| 78 | 4627.972 | 29/2 |
| 79 | 4687.305 | 15/1 |
| 80 | 4746.638 | 31/2 |
| 81 | 4805.971 | 16/1 |
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