Hemipyth: Difference between revisions
List edo mappings up to 13b. |
Complete edo table up to 24. |
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Many temperaments naturally produce intervals that split ~3/2, ~2 or ~4/3 exactly in half and can thus be interpreted as neutral thirds, semioctaves or semifourths within the temperament. | Many temperaments naturally produce intervals that split ~3/2, ~2 or ~4/3 exactly in half and can thus be interpreted as neutral thirds, semioctaves or semifourths within the temperament. | ||
== Equal temperaments == | |||
An important property of edos > 1 is that they must by necessity include at least one of the notable hemipyth intervals: | An important property of edos > 1 is that they must by necessity include at least one of the notable hemipyth intervals: | ||
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|- | |- | ||
| 13b || no || no || yes | | 13b || no || no || yes | ||
|- | |||
| 14 || yes || yes || yes | |||
|- | |||
| 15 || no || no || yes | |||
|- | |||
| 16 || yes || no || no | |||
|- | |||
| 17 || no || yes || no | |||
|- | |||
| 18 || yes || no || no | |||
|- | |||
| 18b || yes || yes || yes | |||
|- | |||
| 19 || no || yes || no | |||
|- | |||
| 20* || yes || yes || yes | |||
|- | |||
| 20b || yes || no || no | |||
|- | |||
| 21 || no || yes || no | |||
|- | |||
| 22 || yes || no || no | |||
|- | |||
| 23 || no || no || yes | |||
|- | |||
| 24 || yes || yes || yes | |||
|} | |} | ||
<nowiki>*</nowiki>) Above the patent val of 20edo results in the same tuning as the patent val of 10edo, so it adds nothing new. | |||
Note how in hemipyth the patent val of 24edo is not tuned the same as 12edo's patent val. In fact 24edo is arguably the smallest edo where all of the important hemipyth intervals are tuned reasonably accurately. | |||
Revision as of 16:03, 4 July 2024
Hemipyth refers to the √2.√3 subgroup i.e. intervals that can be constructed by multiplying fractional powers of 2 and 3 where the exponents have a denominator at most 2.
Notable hemipyth intervals include the neutral third √(3/2) = √3/√2, semioctave √2 and the semifourth √(4/3) = (√2)²/√3.
Many temperaments naturally produce intervals that split ~3/2, ~2 or ~4/3 exactly in half and can thus be interpreted as neutral thirds, semioctaves or semifourths within the temperament.
Equal temperaments
An important property of edos > 1 is that they must by necessity include at least one of the notable hemipyth intervals:
- Either the edo is even and it features at least √2 (which is tuned "pure" when the octave is tuned pure).
- Or one of the following is true:
- The closest approximation to 3/2 spans an even number of edosteps (leading to an approximation to √(3/2))
- The closest approximation to 4/3 spans an even number of edosteps (leading to an approximation to √(4/3))
| Edo (warts) | Has √2 | Has √(3/2) | Has √(4/3) |
|---|---|---|---|
| 2 | yes | no | no |
| 3 | no | yes | no |
| 4 | yes | yes | yes |
| 5 | no | no | yes |
| 6 | yes | yes | yes |
| 7 | no | yes | no |
| 8 | yes | no | no |
| 9 | no | no | yes |
| 10 | yes | yes | yes |
| 11 | no | yes | no |
| 12 | yes | no | no |
| 13 | no | yes | no |
| 13b | no | no | yes |
| 14 | yes | yes | yes |
| 15 | no | no | yes |
| 16 | yes | no | no |
| 17 | no | yes | no |
| 18 | yes | no | no |
| 18b | yes | yes | yes |
| 19 | no | yes | no |
| 20* | yes | yes | yes |
| 20b | yes | no | no |
| 21 | no | yes | no |
| 22 | yes | no | no |
| 23 | no | no | yes |
| 24 | yes | yes | yes |
*) Above the patent val of 20edo results in the same tuning as the patent val of 10edo, so it adds nothing new.
Note how in hemipyth the patent val of 24edo is not tuned the same as 12edo's patent val. In fact 24edo is arguably the smallest edo where all of the important hemipyth intervals are tuned reasonably accurately.