139ed5: Difference between revisions
Jump to navigation
Jump to search
m Subheading |
→Theory: expand a bit |
||
| (3 intermediate revisions by 2 users not shown) | |||
| Line 1: | Line 1: | ||
{{Infobox ET}} | {{Infobox ET}} | ||
{{ED intro}} | {{ED intro}} | ||
== Theory == | |||
139ed5 is similar to [[60edo]], but with the 5th harmonic being [[just]], instead of the [[2/1|octave]] being just. The octave is [[stretched and compressed tuning|stretched]] by about 2.73 cents. Like 60edo, 139ed5 is [[consistent]] to the [[integer limit|10-integer-limit]]. | |||
On the harmonics 2, [[3/1|3]], 5, [[7/1|7]], [[11/1|11]], 60edo has 0%, -10%, -32%, -44% and +43% relative error. On those same harmonics, 139ed5 has +14%, +12%, 0%, -6% and -10% relative error. This is a large improvement relative to the step size of the tuning if the focus is on the higher [[prime harmonic|primes]], and is the main reason why a composer might choose to use 139ed5. | |||
=== Harmonics === | |||
{{Harmonics in equal|139|5|1|intervals=integer|columns=11}} | |||
{{Harmonics in equal|139|5|1|intervals=integer|columns=12|start=12|collapsed=true|title=Approximation of harmonics in 139ed5 (continued)}} | |||
=== Subsets and supersets === | |||
139ed5 is the 34th [[prime equal division|prime ed5]]. It does not contain any nontrivial subset ed5's. | |||
== Intervals == | == Intervals == | ||
{{Interval table}} | {{Interval table}} | ||
==== | == See also == | ||
* [[35edf]] – relative edf | |||
* [[60edo]] – relative edo | |||
* [[95edt]] – relative edt | |||
* [[155edt]] – relative ed6 | |||
[[Category:60edo]] | |||
Latest revision as of 12:50, 28 May 2025
| ← 138ed5 | 139ed5 | 140ed5 → |
139 equal divisions of the 5th harmonic (abbreviated 139ed5) is a nonoctave tuning system that divides the interval of 5/1 into 139 equal parts of about 20 ¢ each. Each step represents a frequency ratio of 51/139, or the 139th root of 5.
Theory
139ed5 is similar to 60edo, but with the 5th harmonic being just, instead of the octave being just. The octave is stretched by about 2.73 cents. Like 60edo, 139ed5 is consistent to the 10-integer-limit.
On the harmonics 2, 3, 5, 7, 11, 60edo has 0%, -10%, -32%, -44% and +43% relative error. On those same harmonics, 139ed5 has +14%, +12%, 0%, -6% and -10% relative error. This is a large improvement relative to the step size of the tuning if the focus is on the higher primes, and is the main reason why a composer might choose to use 139ed5.
Harmonics
| Harmonic | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | 11 | 12 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Error | Absolute (¢) | +2.73 | +2.36 | +5.45 | +0.00 | +5.09 | -1.19 | +8.18 | +4.72 | +2.73 | -1.92 | +7.81 |
| Relative (%) | +13.6 | +11.8 | +27.2 | +0.0 | +25.4 | -6.0 | +40.8 | +23.5 | +13.6 | -9.6 | +39.0 | |
| Steps (reduced) |
60 (60) |
95 (95) |
120 (120) |
139 (0) |
155 (16) |
168 (29) |
180 (41) |
190 (51) |
199 (60) |
207 (68) |
215 (76) | |
| Harmonic | 13 | 14 | 15 | 16 | 17 | 18 | 19 | 20 | 21 | 22 | 23 | 24 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Error | Absolute (¢) | +9.56 | +1.53 | +2.36 | -9.14 | +6.17 | +7.45 | -5.98 | +5.45 | +1.17 | +0.81 | +4.04 | -9.51 |
| Relative (%) | +47.7 | +7.6 | +11.8 | -45.6 | +30.8 | +37.1 | -29.8 | +27.2 | +5.8 | +4.0 | +20.1 | -47.4 | |
| Steps (reduced) |
222 (83) |
228 (89) |
234 (95) |
239 (100) |
245 (106) |
250 (111) |
254 (115) |
259 (120) |
263 (124) |
267 (128) |
271 (132) |
274 (135) | |
Subsets and supersets
139ed5 is the 34th prime ed5. It does not contain any nontrivial subset ed5's.
Intervals
| Steps | Cents | Approximate ratios |
|---|---|---|
| 0 | 0 | 1/1 |
| 1 | 20 | |
| 2 | 40.1 | 42/41, 43/42, 44/43, 45/44 |
| 3 | 60.1 | 29/28, 30/29 |
| 4 | 80.2 | 22/21, 45/43 |
| 5 | 100.2 | 18/17, 35/33 |
| 6 | 120.3 | 15/14 |
| 7 | 140.3 | 51/47 |
| 8 | 160.4 | 34/31, 45/41 |
| 9 | 180.4 | |
| 10 | 200.5 | 46/41 |
| 11 | 220.5 | 25/22, 42/37 |
| 12 | 240.5 | 23/20, 31/27, 54/47 |
| 13 | 260.6 | 43/37, 50/43 |
| 14 | 280.6 | 20/17, 47/40 |
| 15 | 300.7 | 25/21, 44/37 |
| 16 | 320.7 | |
| 17 | 340.8 | 28/23 |
| 18 | 360.8 | 16/13 |
| 19 | 380.9 | |
| 20 | 400.9 | 29/23 |
| 21 | 421 | 37/29, 51/40 |
| 22 | 441 | 40/31, 49/38 |
| 23 | 461 | 30/23, 47/36 |
| 24 | 481.1 | 33/25, 37/28 |
| 25 | 501.1 | |
| 26 | 521.2 | 27/20, 50/37 |
| 27 | 541.2 | 41/30 |
| 28 | 561.3 | 47/34 |
| 29 | 581.3 | 7/5 |
| 30 | 601.4 | 17/12 |
| 31 | 621.4 | |
| 32 | 641.5 | 42/29 |
| 33 | 661.5 | 22/15, 41/28 |
| 34 | 681.5 | 40/27, 43/29 |
| 35 | 701.6 | 3/2 |
| 36 | 721.6 | 41/27, 44/29, 47/31 |
| 37 | 741.7 | 23/15, 43/28 |
| 38 | 761.7 | 45/29 |
| 39 | 781.8 | 11/7 |
| 40 | 801.8 | 27/17 |
| 41 | 821.9 | 37/23, 45/28 |
| 42 | 841.9 | 13/8 |
| 43 | 862 | 51/31 |
| 44 | 882 | |
| 45 | 902 | |
| 46 | 922.1 | 46/27 |
| 47 | 942.1 | 31/18, 50/29 |
| 48 | 962.2 | 54/31 |
| 49 | 982.2 | 30/17, 37/21 |
| 50 | 1002.3 | 25/14, 41/23 |
| 51 | 1022.3 | |
| 52 | 1042.4 | 42/23 |
| 53 | 1062.4 | 24/13 |
| 54 | 1082.5 | 43/23 |
| 55 | 1102.5 | 17/9 |
| 56 | 1122.5 | 44/23 |
| 57 | 1142.6 | 29/15 |
| 58 | 1162.6 | 45/23, 47/24 |
| 59 | 1182.7 | |
| 60 | 1202.7 | |
| 61 | 1222.8 | |
| 62 | 1242.8 | 41/20 |
| 63 | 1262.9 | |
| 64 | 1282.9 | 21/10 |
| 65 | 1303 | |
| 66 | 1323 | |
| 67 | 1343 | 50/23 |
| 68 | 1363.1 | |
| 69 | 1383.1 | 20/9 |
| 70 | 1403.2 | 9/4 |
| 71 | 1423.2 | |
| 72 | 1443.3 | 23/10 |
| 73 | 1463.3 | |
| 74 | 1483.4 | 33/14 |
| 75 | 1503.4 | 31/13, 50/21 |
| 76 | 1523.5 | 41/17 |
| 77 | 1543.5 | 39/16 |
| 78 | 1563.5 | 37/15 |
| 79 | 1583.6 | |
| 80 | 1603.6 | |
| 81 | 1623.7 | 23/9 |
| 82 | 1643.7 | 31/12 |
| 83 | 1663.8 | 34/13 |
| 84 | 1683.8 | 37/14, 45/17 |
| 85 | 1703.9 | |
| 86 | 1723.9 | 46/17 |
| 87 | 1744 | |
| 88 | 1764 | 36/13 |
| 89 | 1784 | 14/5 |
| 90 | 1804.1 | 17/6 |
| 91 | 1824.1 | 43/15 |
| 92 | 1844.2 | 29/10 |
| 93 | 1864.2 | 44/15, 47/16 |
| 94 | 1884.3 | |
| 95 | 1904.3 | |
| 96 | 1924.4 | |
| 97 | 1944.4 | 40/13 |
| 98 | 1964.5 | 28/9 |
| 99 | 1984.5 | |
| 100 | 2004.5 | 35/11 |
| 101 | 2024.6 | 29/9 |
| 102 | 2044.6 | |
| 103 | 2064.7 | |
| 104 | 2084.7 | 10/3 |
| 105 | 2104.8 | 27/8 |
| 106 | 2124.8 | |
| 107 | 2144.9 | 38/11 |
| 108 | 2164.9 | |
| 109 | 2185 | |
| 110 | 2205 | 25/7 |
| 111 | 2225 | 47/13 |
| 112 | 2245.1 | |
| 113 | 2265.1 | 37/10 |
| 114 | 2285.2 | |
| 115 | 2305.2 | |
| 116 | 2325.3 | 23/6 |
| 117 | 2345.3 | 31/8 |
| 118 | 2365.4 | 51/13 |
| 119 | 2385.4 | |
| 120 | 2405.5 | |
| 121 | 2425.5 | |
| 122 | 2445.5 | |
| 123 | 2465.6 | 54/13 |
| 124 | 2485.6 | 21/5 |
| 125 | 2505.7 | 17/4 |
| 126 | 2525.7 | 43/10 |
| 127 | 2545.8 | |
| 128 | 2565.8 | 22/5 |
| 129 | 2585.9 | 49/11 |
| 130 | 2605.9 | |
| 131 | 2626 | 41/9 |
| 132 | 2646 | |
| 133 | 2666 | 14/3 |
| 134 | 2686.1 | 33/7 |
| 135 | 2706.1 | 43/9 |
| 136 | 2726.2 | 29/6 |
| 137 | 2746.2 | 44/9 |
| 138 | 2766.3 | |
| 139 | 2786.3 | 5/1 |