43edt: Difference between revisions
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{{Infobox ET}} | {{Infobox ET}} | ||
{{ED intro}} | |||
43EDT is related to [[27edo|27 EDO]], but with the 3/1 rather than the 2/1 being just. It has octaves compressed by about 5.7492{{c}} compressed and is consistent to the [[9-odd-limit|10-integer-limit]]. | |||
However, in addition to its rich octave-based harmony, the 43EDT is also a fine tritave-based tuning: with a 7/3 of 1460 cents and such a near perfect 5/3, | == Properties == | ||
This tuning is related to 27EDO having 5.7{{c}} octave compression, a small but significant deviation. This is particularly relevant because the harmonics 27EDO approximates well—3, 5, 7, and 13—are all tuned sharp, so 43EDT improves those approximations. | |||
However, in addition to its rich octave-based harmony, the 43EDT is also a fine tritave-based tuning: with a 7/3 of 1460 cents and such a near perfect 5/3, Bohlen–Pierce harmony is very clear and hearty, as well as capable of extended enharmonic distinctions that [[13edt|13EDT]] is not. The {{sl|4L 5s}} MOS has {{nowrap|L {{=}} 7|s {{=}} 3}}. | |||
== Harmonics == | == Harmonics == | ||
| Line 24: | Line 26: | ||
== Intervals == | == Intervals == | ||
{ | {{Interval table}} | ||
=43EDT as a regular temperament= | = 43EDT as a regular temperament = | ||
43EDT tempers out a no-twos comma of |0 63 -43 | 43EDT tempers out a no-twos comma of {{vector|0 63 -43}}, leading the regular temperament supported by [[27edo|27]], [[190edo|190]], and [[217edo|217]] EDOs. | ||
==27&190 temperament== | == {{nowrap|27 & 190}} temperament == | ||
===5-limit=== | === 5-limit === | ||
Comma: |0 63 -43 | Comma: {{vector|0 63 -43}} | ||
POTE generator: ~|0 -41 28 | POTE generator: ~{{vector|0 -41 28}} = 44.2294 | ||
Mapping: [ | Mapping: [{{map|1 0 0}}, {{map|0 43 63}}] | ||
EDOs: {{EDOs|27, 190, 217, 407, 597, 624, 841}} | EDOs: {{EDOs|27, 190, 217, 407, 597, 624, 841}} | ||
===7-limit=== | === 7-limit === | ||
Commas: 4375/4374, 40353607/40000000 | Commas: 4375/4374, 40353607/40000000 | ||
POTE generator: ~1029/1000 = 44.2288 | POTE generator: ~1029/1000 = 44.2288 | ||
Mapping: [ | Mapping: [{{map|1 0 0 1}}, {{map|0 43 63 49}}] | ||
EDOs: {{EDOs|27, 190, 217}} | EDOs: {{EDOs|27, 190, 217}} | ||
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Badness: 0.1659 | Badness: 0.1659 | ||
==217&407 temperament== | == {{nowrap|217 & 407}} temperament == | ||
===7-limit=== | === 7-limit === | ||
Commas: 134217728/133984375, 512557306947/512000000000 | Commas: 134217728/133984375, 512557306947/512000000000 | ||
POTE generator: ~525/512 = 44.2320 | POTE generator: ~525/512 = 44.2320 | ||
Mapping: [ | Mapping: [{{map|1 0 0 9}}, {{map|0 43 63 -168}}] | ||
EDOs: {{EDOs|217, 407, 624, 841, 1058, 1465}} | EDOs: {{EDOs|217, 407, 624, 841, 1058, 1465}} | ||
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Badness: 0.3544 | Badness: 0.3544 | ||
===11-limit=== | === 11-limit === | ||
Commas: 46656/46585, 131072/130977, 234375/234256 | Commas: 46656/46585, 131072/130977, 234375/234256 | ||
POTE generator: ~525/512 = 44.2312 | POTE generator: ~525/512 = 44.2312 | ||
Mapping: [ | Mapping: [{{map|1 0 0 9 -1}}, {{map|0 43 63 -168 121}}] | ||
EDOs: {{EDOs|217, 407, 624}} | EDOs: {{EDOs|217, 407, 624}} | ||
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Badness: 0.1129 | Badness: 0.1129 | ||
===13-limit=== | === 13-limit === | ||
Commas: 2080/2079, 4096/4095, 39366/39325, 109512/109375 | Commas: 2080/2079, 4096/4095, 39366/39325, 109512/109375 | ||
POTE generator: ~40/39 = 44.2312 | POTE generator: ~40/39 = 44.2312 | ||
Mapping: [ | Mapping: [{{map|1 0 0 9 -1 3}}, {{map|0 43 63 -168 121 19}}] | ||
EDOs: {{EDOs|217, 407, 624}} | EDOs: {{EDOs|217, 407, 624}} | ||
Revision as of 14:56, 25 February 2025
| ← 42edt | 43edt | 44edt → |
43 equal divisions of the tritave, perfect twelfth, or 3rd harmonic (abbreviated 43edt or 43ed3), is a nonoctave tuning system that divides the interval of 3/1 into 43 equal parts of about 44.2 ¢ each. Each step represents a frequency ratio of 31/43, or the 43rd root of 3.
43EDT is related to 27 EDO, but with the 3/1 rather than the 2/1 being just. It has octaves compressed by about 5.7492 ¢ compressed and is consistent to the 10-integer-limit.
Properties
This tuning is related to 27EDO having 5.7 ¢ octave compression, a small but significant deviation. This is particularly relevant because the harmonics 27EDO approximates well—3, 5, 7, and 13—are all tuned sharp, so 43EDT improves those approximations.
However, in addition to its rich octave-based harmony, the 43EDT is also a fine tritave-based tuning: with a 7/3 of 1460 cents and such a near perfect 5/3, Bohlen–Pierce harmony is very clear and hearty, as well as capable of extended enharmonic distinctions that 13EDT is not. The Template:Sl MOS has L = 7, s = 3.
Harmonics
| Harmonic | 2 | 3 | 5 | 7 | 11 | 13 | 17 | 19 | 23 | 29 | 31 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Error | Absolute (¢) | -5.7 | +0.0 | +0.3 | -7.2 | +6.4 | -17.4 | +4.7 | -10.9 | +12.2 | +9.0 | -18.0 |
| Relative (%) | -13.0 | +0.0 | +0.6 | -16.3 | +14.6 | -39.3 | +10.7 | -24.6 | +27.6 | +20.3 | -40.7 | |
| Steps (reduced) |
27 (27) |
43 (0) |
63 (20) |
76 (33) |
94 (8) |
100 (14) |
111 (25) |
115 (29) |
123 (37) |
132 (3) |
134 (5) | |
| Harmonic | 37 | 41 | 43 | 47 | 53 | 59 | 61 | 67 | 71 | 73 | 79 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Error | Absolute (¢) | -14.7 | -15.5 | -9.5 | +13.5 | -17.6 | +17.9 | +4.4 | +18.9 | +7.0 | +3.1 | -0.9 |
| Relative (%) | -33.2 | -35.0 | -21.4 | +30.4 | -39.8 | +40.4 | +9.9 | +42.7 | +15.7 | +7.0 | -2.1 | |
| Steps (reduced) |
141 (12) |
145 (16) |
147 (18) |
151 (22) |
155 (26) |
160 (31) |
161 (32) |
165 (36) |
167 (38) |
168 (39) |
171 (42) | |
Intervals
| Steps | Cents | Hekts | Approximate ratios |
|---|---|---|---|
| 0 | 0 | 0 | 1/1 |
| 1 | 44.2 | 30.2 | |
| 2 | 88.5 | 60.5 | 19/18, 20/19, 21/20 |
| 3 | 132.7 | 90.7 | 13/12, 14/13, 27/25 |
| 4 | 176.9 | 120.9 | 10/9, 21/19 |
| 5 | 221.2 | 151.2 | 17/15, 25/22 |
| 6 | 265.4 | 181.4 | 7/6 |
| 7 | 309.6 | 211.6 | 6/5 |
| 8 | 353.9 | 241.9 | 11/9, 16/13, 27/22 |
| 9 | 398.1 | 272.1 | 24/19, 29/23 |
| 10 | 442.3 | 302.3 | 22/17 |
| 11 | 486.5 | 332.6 | |
| 12 | 530.8 | 362.8 | 15/11, 19/14 |
| 13 | 575 | 393 | 25/18 |
| 14 | 619.2 | 423.3 | 10/7 |
| 15 | 663.5 | 453.5 | 19/13, 22/15, 25/17 |
| 16 | 707.7 | 483.7 | 3/2 |
| 17 | 751.9 | 514 | 17/11, 20/13 |
| 18 | 796.2 | 544.2 | 19/12, 27/17, 30/19 |
| 19 | 840.4 | 574.4 | 13/8 |
| 20 | 884.6 | 604.7 | 5/3 |
| 21 | 928.9 | 634.9 | 12/7, 29/17 |
| 22 | 973.1 | 665.1 | 7/4 |
| 23 | 1017.3 | 695.3 | 9/5 |
| 24 | 1061.6 | 725.6 | 24/13 |
| 25 | 1105.8 | 755.8 | 17/9, 19/10 |
| 26 | 1150 | 786 | |
| 27 | 1194.3 | 816.3 | 2/1 |
| 28 | 1238.5 | 846.5 | |
| 29 | 1282.7 | 876.7 | 21/10, 23/11 |
| 30 | 1326.9 | 907 | 28/13 |
| 31 | 1371.2 | 937.2 | 11/5 |
| 32 | 1415.4 | 967.4 | 25/11 |
| 33 | 1459.6 | 997.7 | |
| 34 | 1503.9 | 1027.9 | 19/8 |
| 35 | 1548.1 | 1058.1 | 22/9, 27/11 |
| 36 | 1592.3 | 1088.4 | 5/2 |
| 37 | 1636.6 | 1118.6 | 18/7 |
| 38 | 1680.8 | 1148.8 | 29/11 |
| 39 | 1725 | 1179.1 | 19/7, 27/10 |
| 40 | 1769.3 | 1209.3 | 25/9 |
| 41 | 1813.5 | 1239.5 | 20/7 |
| 42 | 1857.7 | 1269.8 | |
| 43 | 1902 | 1300 | 3/1 |
43EDT as a regular temperament
43EDT tempers out a no-twos comma of [0 63 -43⟩, leading the regular temperament supported by 27, 190, and 217 EDOs.
27 & 190 temperament
5-limit
Comma: [0 63 -43⟩
POTE generator: ~[0 -41 28⟩ = 44.2294
Mapping: [⟨1 0 0], ⟨0 43 63]]
EDOs: 27, 190, 217, 407, 597, 624, 841
7-limit
Commas: 4375/4374, 40353607/40000000
POTE generator: ~1029/1000 = 44.2288
Mapping: [⟨1 0 0 1], ⟨0 43 63 49]]
Badness: 0.1659
217 & 407 temperament
7-limit
Commas: 134217728/133984375, 512557306947/512000000000
POTE generator: ~525/512 = 44.2320
Mapping: [⟨1 0 0 9], ⟨0 43 63 -168]]
EDOs: 217, 407, 624, 841, 1058, 1465
Badness: 0.3544
11-limit
Commas: 46656/46585, 131072/130977, 234375/234256
POTE generator: ~525/512 = 44.2312
Mapping: [⟨1 0 0 9 -1], ⟨0 43 63 -168 121]]
Badness: 0.1129
13-limit
Commas: 2080/2079, 4096/4095, 39366/39325, 109512/109375
POTE generator: ~40/39 = 44.2312
Mapping: [⟨1 0 0 9 -1 3], ⟨0 43 63 -168 121 19]]
Badness: 0.0503