23/12: Difference between revisions
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The '''large vicesimotertial major seventh''' is a [[23-limit]] interval that is reached by going a justly tuned perfect twelve ([[3/1]], the 3rd harmonic) down from the 23rd harmonic ([[23/1]]) and lifting the resulting ratio up to fit inside the octave. | The '''large vicesimotertial major seventh''' is a [[23-limit]] interval that is reached by going a justly tuned perfect twelve ([[3/1]], the 3rd harmonic) down from the 23rd harmonic ([[23/1]]) and lifting the resulting ratio up to fit inside the octave. | ||
== Approximation == | == Approximation == | ||
{{Interval edo approximation|23/12}} | |||
[[Category:Seventh]] | [[Category:Seventh]] | ||
Latest revision as of 13:16, 3 November 2025
| Interval information |
[sound info]
The large vicesimotertial major seventh is a 23-limit interval that is reached by going a justly tuned perfect twelve (3/1, the 3rd harmonic) down from the 23rd harmonic (23/1) and lifting the resulting ratio up to fit inside the octave.
Approximation
| Edo | Step size | Cents (¢) | Absolute error (¢) | Relative error (%) |
|---|---|---|---|---|
| 15 | 14\15 | 1120.00 | -6.32 | -7.90 |
| 16 | 15\16 | 1125.00 | -1.32 | -1.76 |
| 17 | 16\17 | 1129.41 | +3.09 | +4.38 |
| 31 | 29\31 | 1122.58 | -3.74 | -9.66 |
| 32 | 30\32 | 1125.00 | -1.32 | -3.52 |
| 33 | 31\33 | 1127.27 | +0.95 | +2.62 |
| 34 | 32\34 | 1129.41 | +3.09 | +8.76 |
| 48 | 45\48 | 1125.00 | -1.32 | -5.28 |
| 49 | 46\49 | 1126.53 | +0.21 | +0.86 |
| 50 | 47\50 | 1128.00 | +1.68 | +7.00 |
| 64 | 60\64 | 1125.00 | -1.32 | -7.04 |
| 65 | 61\65 | 1126.15 | -0.17 | -0.90 |
| 66 | 62\66 | 1127.27 | +0.95 | +5.24 |
| 80 | 75\80 | 1125.00 | -1.32 | -8.80 |