Schismic–commatic equivalence continuum: Difference between revisions
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* [[Quindromeda]] ({{nowrap| ''n'' {{=}} 5 }}) does not split the octave but splits the fourth in five, as 5 is coprime with 12. | * [[Quindromeda]] ({{nowrap| ''n'' {{=}} 5 }}) does not split the octave but splits the fourth in five, as 5 is coprime with 12. | ||
{| class="wikitable center-1" | |||
{| class="wikitable center-1 | |||
|+ style="font-size: 105%;" | Temperaments with integer ''n'' | |+ style="font-size: 105%;" | Temperaments with integer ''n'' | ||
|- | |- | ||
! rowspan="2" | ''n'' | ! rowspan="2" | ''n'' | ||
! rowspan="2" | Temperament | ! rowspan="2" | Temperament | ||
! colspan="2" | Comma | ! colspan="2" | Comma | ||
| Line 25: | Line 22: | ||
|- | |- | ||
| -3 | | -3 | ||
| [[Triscordial]] | | [[Triscordial]] | ||
| (40 digits) | | (40 digits) | ||
| Line 31: | Line 27: | ||
|- | |- | ||
| -2 | | -2 | ||
| [[Biscordial]] | | [[Biscordial]] | ||
| (30 digits) | | (30 digits) | ||
| Line 37: | Line 32: | ||
|- | |- | ||
| -1 | | -1 | ||
| [[Gracecordial]] | | [[Gracecordial]] | ||
| (22 digits) | | (22 digits) | ||
| Line 43: | Line 37: | ||
|- | |- | ||
| 0 | | 0 | ||
| [[Compton]] | | [[Compton]] | ||
| [[531441/524288]] | | [[531441/524288]] | ||
| Line 49: | Line 42: | ||
|- | |- | ||
| 1 | | 1 | ||
| [[Meantone]] | | [[Meantone]] | ||
| [[81/80]] | | [[81/80]] | ||
| Line 55: | Line 47: | ||
|- | |- | ||
| 2 | | 2 | ||
| [[Diaschismic]] | | [[Diaschismic]] | ||
| [[2048/2025]] | | [[2048/2025]] | ||
| Line 61: | Line 52: | ||
|- | |- | ||
| 3 | | 3 | ||
| [[Misty]] | | [[Misty]] | ||
| [[67108864/66430125]] | | [[67108864/66430125]] | ||
| Line 67: | Line 57: | ||
|- | |- | ||
| 4 | | 4 | ||
| [[Undim]] | | [[Undim]] | ||
| (26 digits) | | (26 digits) | ||
| Line 73: | Line 62: | ||
|- | |- | ||
| 5 | | 5 | ||
| [[Quindromeda]] | | [[Quindromeda]] | ||
| (34 digits) | | (34 digits) | ||
| Line 79: | Line 67: | ||
|- | |- | ||
| 6 | | 6 | ||
| [[Sextile]] | | [[Sextile]] | ||
| (44 digits) | | (44 digits) | ||
| Line 85: | Line 72: | ||
|- | |- | ||
| 7 | | 7 | ||
| [[Heptacot]] | | [[Heptacot]] | ||
| (52 digits) | | (52 digits) | ||
| Line 91: | Line 77: | ||
|- | |- | ||
| 8 | | 8 | ||
| [[World calendar]] restriction | | [[World calendar]] restriction | ||
| (62 digits) | | (62 digits) | ||
| Line 97: | Line 82: | ||
|- | |- | ||
| 9 | | 9 | ||
| Quinbisa-tritrigu (12 & 441) | | Quinbisa-tritrigu (12 & 441) | ||
| (70 digits) | | (70 digits) | ||
| Line 103: | Line 87: | ||
|- | |- | ||
| 10 | | 10 | ||
| Lesa-quinbigu (12 & 494) | | Lesa-quinbigu (12 & 494) | ||
| (80 digits) | | (80 digits) | ||
| Line 109: | Line 92: | ||
|- | |- | ||
| 11 | | 11 | ||
| Quadtrisa-legu (12 & 559) | | Quadtrisa-legu (12 & 559) | ||
| (88 digits) | | (88 digits) | ||
| Line 115: | Line 97: | ||
|- | |- | ||
| 12 | | 12 | ||
| [[Atomic]] | | [[Atomic]] | ||
| (98 digits) | | (98 digits) | ||
| Line 121: | Line 102: | ||
|- | |- | ||
| 13 | | 13 | ||
| Quintrila-theyo (12 & 677) | | Quintrila-theyo (12 & 677) | ||
| (106 digits) | | (106 digits) | ||
| {{Monzo| -176 92 13 }} | | {{Monzo| -176 92 13 }} | ||
|- | |- | ||
| … | | … | ||
| … | | … | ||
| Line 133: | Line 112: | ||
|- | |- | ||
| ∞ | | ∞ | ||
| [[Schismic]] | | [[Schismic]] | ||
| [[32805/32768]] | | [[32805/32768]] | ||
| Line 140: | Line 118: | ||
We may invert the continuum by setting ''m'' such that {{nowrap| 1/''m'' + 1/''n'' {{=}} 1 }}. This may be called the ''syntonic–commatic equivalence continuum'', which is essentially the same thing. The just value of ''m'' is 1.0908441588…. The [[syntonic comma]] is way larger but much simpler than the schisma. As such, this continuum does not contain as many [[microtemperament]]s, but has more useful lower-complexity temperaments. | We may invert the continuum by setting ''m'' such that {{nowrap| 1/''m'' + 1/''n'' {{=}} 1 }}. This may be called the ''syntonic–commatic equivalence continuum'', which is essentially the same thing. The just value of ''m'' is 1.0908441588…. The [[syntonic comma]] is way larger but much simpler than the schisma. As such, this continuum does not contain as many [[microtemperament]]s, but has more useful lower-complexity temperaments. | ||
Alternatively, because the the 5-limit otonal detemperament of 12edo is a 4×3 rectangle (known as the [[duodene]]), we may be interested in expressing the continuum in terms of the boundary commas of this detemper, that is, as {{nowrap| ([[81/80]])<sup>''k''</sup> ~ ([[128/125]]) }}. This corresponds to these commas' structural significance via 128/125 being entirely in the [[2.5 subgroup]] while 81/80 explains 5 in the simplest way relative to the 3-limit. This choice of coordinates is a flip of the ''m''-continuum such that microtemperaments converging to atomic are found as successive mediants towards the [[JIP]]. Specifically, its JIP is at 1.90915584…, which is approximated very closely by the microtemperament atomic at {{nowrap| 21/11 {{=}} 1.90909… }} so that the main ''n''-continuum can be seen as taking successive mediants towards 2/1 (schismic) starting from 1/1 (diaschismic). It is noted for its nontrivial relation to the other better-motivated (in terms of mapping) coordinates discussed. | |||
{| class="wikitable center-1 center-2" | {| class="wikitable center-1 center-2" | ||
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== Sextile (5-limit) == | == Sextile (5-limit) == | ||
{{See also| | {{See also| Garischismic clan #Sextile }} | ||
The 5-limit version of sextile reaches the [[interval class]] of [[5/1|5]] by −6 [[3/2|perfect fifths]] (i.e. a diminished fifth) minus a period of 1/6-octave. It corresponds to {{nowrap| ''n'' {{=}} 6 }}, meaning the Pythagorean comma is equated with a stack of six schismas. | The 5-limit version of sextile reaches the [[interval class]] of [[5/1|5]] by −6 [[3/2|perfect fifths]] (i.e. a diminished fifth) minus a period of 1/6-octave. It corresponds to {{nowrap| ''n'' {{=}} 6 }}, meaning the Pythagorean comma is equated with a stack of six schismas. | ||
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[[Badness]] (Sintel): 8.02 | [[Badness]] (Sintel): 8.02 | ||
== Heptacot == | == Heptacot (5-limit) == | ||
Heptacot tempers out the [[heptacot comma]] and divides the [[3/2|perfect fifth]] into seven equal parts, the most notable example being [[12edo]] (7\12). It corresponds to {{nowrap| ''n'' {{=}} 7 }}, meaning the Pythagorean comma is equated with a stack of seven schismas. It was named by [[ | : ''For extensions, see [[Garischismic clan #Heptacot]].'' | ||
The 5-limit version of heptacot tempers out the [[heptacot comma]] and divides the [[3/2|perfect fifth]] into seven equal parts, the most notable example being [[12edo]] (7\12). It corresponds to {{nowrap| ''n'' {{=}} 7 }}, meaning the Pythagorean comma is equated with a stack of seven schismas. It was named by [[Tristan Bay]] in 2024, for it splits the perfect fifth into seven. | |||
[[Subgroup]]: 2.3.5 | [[Subgroup]]: 2.3.5 | ||