4th-octave temperaments: Difference between revisions
Move quad here. Remove "hunt 19-cycle" (it's simply 4et) |
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There are nonetheless other less common temperaments which divide the octave in four. | There are nonetheless other less common temperaments which divide the octave in four. | ||
Subgroup: 2. | == Quad == | ||
[[Subgroup]]: 2.3.5.7 | |||
Comma list: | [[Comma list]]: 9/8, 25/24 | ||
{{Mapping|legend= | {{Mapping|legend=1| 4 6 9 0 | 0 0 0 1 }} | ||
{{Multival|legend=1|0 0 4 0 6 9}} | |||
[[Optimal tuning]] ([[POTE]]): ~6/5 = 1\4, ~8/7 = 324.482 | |||
{{Optimal ET sequence|legend=1| 4 }} | |||
[[Badness]]: 0.045911 | |||
== Berylic == | == Berylic == | ||
Berylic temperament tempers out the [[1874161/1874048]] comma in the 2.11.37 subgroup, representing the fact that [[44/37]] is a [[wikipedia:continued fraction|continued fraction]] convergent to the fourth root of 2. | Berylic temperament tempers out the [[1874161/1874048]] comma in the 2.11.37 subgroup, representing the fact that [[44/37]] is a [[wikipedia:continued fraction|continued fraction]] convergent to the fourth root of 2. | ||
Revision as of 07:57, 23 January 2024
Template:Fractional-octave navigation
4edo is much less used as a scale, rather as a chord. In the Western theory, one step of 4edo is usually known as a minor third and the stacking of them is the diminished seventh chord.
Usage of the 6/5 minor third as one step of 4edo by tempering out 648/625, and therefore using 4edo as a diminished seventh chord produced by stacking three minor thirds is one of the features of standard Western music theory, and is supported by 12edo. See Dimipent family for a collection of such temperaments.
19/16, the 19th harmonic octave-reduced, is much closer to quarter-octave than 6/5, and while it's not a microtemperament, a lot of equal divisions support it.
An interval closer to 1\4 is 25/21, with the associated comma being the dimcomp comma. See Dimcomp family for a collection of rank-3 temperaments tempering it out.
There are nonetheless other less common temperaments which divide the octave in four.
Quad
Subgroup: 2.3.5.7
Comma list: 9/8, 25/24
Mapping: [⟨4 6 9 0], ⟨0 0 0 1]]
Wedgie: ⟨⟨ 0 0 4 0 6 9 ]]
Optimal tuning (POTE): ~6/5 = 1\4, ~8/7 = 324.482
Badness: 0.045911
Berylic
Berylic temperament tempers out the 1874161/1874048 comma in the 2.11.37 subgroup, representing the fact that 44/37 is a continued fraction convergent to the fourth root of 2.
Subgroup: 2.11.37
Comma list: 1874161/1874048
Sval Mapping: [⟨4 0 7], ⟨0 1 1]]
- sval mapping generators: ~44/37 = 1\4, ~11
Optimal tuning (CTE): ~11/8 = 551.326
Supporting ETs: 24, 28, 148, 296, 320, 592, 616, 764, ...
Darian calendar
Darian calendar is described as 24 & 668 temperament and is named after a certain calendar layout by the same name. The generator is close to the 36/35 quartertone, although it is not always mapped to this interval from regular perspective, 5 of them make 11/8, 8 of them make 3/2, and 6 of them make 32/19.
2.3.11.19 subgroup
The temperament is simplest in this subgroup, although there is a tradeoff of breaking up the simplicity of the 36/35 quartertone.
Subgroup: 2.3.11.19
Sval Mapping: [⟨4 5 13 18], ⟨0 8 5 -6]]
- sval mapping generators: ~6291456/5285401 = 1\4, 25289/24576 = 50.257
Optimal tuning (CTE): 25289/24576 = 50.257
Supporting ETs: 24, 596, 620, 644, 668, 692, 716, ...
2.36/35.3.11.19 subgroup
668edo does not map 36/35 consistently, with direct mapping being 27 steps and consistent mapping being 28 steps.
Subgroup: 2.36/35.3.11.19
Sval Mapping: [⟨4 0 5 13 18], ⟨0 1 8 5 -6]]
- sval mapping generators: ~2240/1881 = 1\4, 36/35 = 50.288
Optimal tuning (CTE): 36/35 = 50.288