Tetracot: Difference between revisions
Tetracot is not generated by 3/2. |
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| 165.004 | | 165.004 | ||
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|243/200 | |||
|168.574 | |||
|1/2-comma | |||
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| 1\7 | | 1\7 | ||
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| 171.429 | | 171.429 | ||
| Lower bound of 2.3.5.11 subgroup 11-odd-limit, <br />2.3.5.11.13 subgroup 13- and 15-odd-limit diamond monotone | | Lower bound of 2.3.5.11 subgroup 11-odd-limit, <br />2.3.5.11.13 subgroup 13- and 15-odd-limit diamond monotone | ||
|- | |||
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|27/20 | |||
|173.184 | |||
|1/3-comma | |||
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| 3/2 | | 3/2 | ||
| 175.489 | | 175.489 | ||
| | |1/4-comma | ||
|- | |- | ||
| 6\41 | | 6\41 | ||
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| 5/3 | | 5/3 | ||
| 176.872 | | 176.872 | ||
| | |1/5-comma | ||
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| 177.778 | | 177.778 | ||
| Upper bound of 2.3.5.11.13 subgroup 13- and 15-odd-limit diamond monotone | | Upper bound of 2.3.5.11.13 subgroup 13- and 15-odd-limit diamond monotone | ||
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|27/25 | |||
|177.794 | |||
|1/6-comma | |||
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|243/125 | |||
|178.452 | |||
|1/7-comma | |||
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Revision as of 01:10, 25 November 2025
Lua error in Module:Infobox_regtemp at line 138: attempt to perform arithmetic on local 'generator_size' (a nil value).
- This page is about the regular temperament. For the ploidacot signature, see Ploidacot/Tetracot.
Tetracot, in this article, is the rank-2 temperament in the 2.3.5.11.13 subgroup generated by a submajor second of about 174–178 ¢ which represents both 10/9 and 11/10. It is so named because the generator is a quarter of fifth: four such generators make a perfect fifth which approximates 3/2, which cannot occur in 12edo, resulting in 100/99, 144/143, and 243/242 being tempered out. This is in contrast to meantone, where 10/9 is tuned sharper than or equal to just in order to be equated with 9/8.
Tetracot has many extensions for the 7-, 11-, and 13-limit. See Tetracot extensions. Equal temperaments that support tetracot include 27, 34, and 41.
See Tetracot family for more technical data.
Interval chain
Tetracot is considered as a cluster temperament with seven clusters of notes in an octave. The chroma interval between adjacent notes in each cluster represents 40/39, 45/44, 55/54, 65/64, 66/65, 81/80, and 121/120 all at once. In the following table, odd harmonics and subharmonics 1–15 are in bold.
| # | Cents* | Approximate ratios |
|---|---|---|
| 0 | 0.0 | 1/1 |
| 1 | 175.8 | 11/10, 10/9 |
| 2 | 350.6 | 11/9, 16/13 |
| 3 | 527.4 | 15/11 |
| 4 | 703.3 | 3/2 |
| 5 | 879.1 | 5/3 |
| 6 | 1054.9 | 11/6, 24/13 |
| 7 | 30.7 | 55/54, 45/44, 40/39 |
| 8 | 206.5 | 9/8 |
| 9 | 382.3 | 5/4 |
| 10 | 558.2 | 11/8, 18/13 |
| 11 | 734.0 | 20/13 |
| 12 | 909.8 | 22/13 |
| 13 | 1085.6 | 15/8 |
| 14 | 61.4 | 33/32, 27/26, 25/24 |
| 15 | 237.2 | 15/13 |
* In 2.3.5.11.13 subgroup CTE tuning
Scales
- Tetracot7 – 6L 1s scale
- Tetracot13 – improper 7L 6s
- Tetracot20 – improper 7L 13s
Tunings
Tuning spectrum
| Edo generator |
Eigenmonzo (unchanged-interval)* |
Generator (¢) | Comments |
|---|---|---|---|
| 11/10 | 165.004 | ||
| 243/200 | 168.574 | 1/2-comma | |
| 1\7 | 171.429 | Lower bound of 2.3.5.11 subgroup 11-odd-limit, 2.3.5.11.13 subgroup 13- and 15-odd-limit diamond monotone | |
| 27/20 | 173.184 | 1/3-comma | |
| 11/9 | 173.704 | ||
| 11/6 | 174.894 | ||
| 7\48 | 175.000 | ||
| 11/8 | 175.132 | 2.3.5.11 subgroup 11-odd-limit minimax | |
| 3/2 | 175.489 | 1/4-comma | |
| 6\41 | 175.610 | ||
| 13/11 | 175.899 | 2.3.5.11.13 subgroup 13- and 15-odd-limit minimax | |
| 15/8 | 176.021 | ||
| 5/4 | 176.257 | 5-odd-limit and 5-limit 9-odd-limit minimax | |
| 13/9 | 176.338 | ||
| 5\34 | 176.471 | ||
| 15/13 | 176.516 | ||
| 5/3 | 176.872 | 1/5-comma | |
| 13/10 | 176.890 | ||
| 13/12 | 176.905 | ||
| 4\27 | 177.778 | Upper bound of 2.3.5.11.13 subgroup 13- and 15-odd-limit diamond monotone | |
| 27/25 | 177.794 | 1/6-comma | |
| 243/125 | 178.452 | 1/7-comma | |
| 15/11 | 178.984 | ||
| 13/8 | 179.736 | ||
| 3\20 | 180.000 | Upper bound of 2.3.5.11 subgroup 11-odd-limit diamond monotone | |
| 9/5 | 182.404 |
* Besides the octave
Music
- "October Dieting Plan" from TOTMC Suite Vol. 1 (2023) – in modus, 34edo tuning
- Modal Studies in Tetracot (2021) – in 34edo tuning