Huxley: Difference between revisions
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'''Huxley''' is name given by [[Deja Igliashon]] to the 4p&13p 2.3.11.13 subgroup temperament where 512/507 and 1352/1331 vanish. It is an extension of [[Lovecraft]] temperament, the 4p&13p 2.11.13 subgroup temperament, to include prime 3. It uses this mapping: | '''Huxley''' is name given by [[Deja Igliashon]] to the 4p&13p 2.3.11.13 subgroup temperament where [[512/507]] and [[1352/1331]] vanish. It is an extension of [[Lovecraft]] temperament, the 4p&13p 2.11.13 subgroup temperament, to include prime 3. It uses this mapping: | ||
{| class="wikitable" | {| class="wikitable" | ||
!2 | !2 | ||
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Its POTE generator is 282.4139 cents, almost exactly 4 steps of [[17edo]] (282.3529 cents). As such, 17edo may be considered the ideal equal temperament in which to use it. Other EDOs that support it are 4p, 13p, 21p, 30p, 34p, 38e, 47b, and 51e. | Its POTE generator is 282.4139 cents, almost exactly 4 steps of [[17edo]] (282.3529 cents). As such, 17edo may be considered the ideal equal temperament in which to use it. Other EDOs that support it are 4p, 13p, 21p, 30p, 34p, 38e, 47b, and 51e. | ||
It has moments of symmetry at 4, 9, 13, and 17 notes, and bears a tangential melodic relationship to [[Orwell]] temperament in that its 9-note MOS has 4 large and 5 small steps. | It has [[Moment of symmetry|moments of symmetry]] at 4, 9, 13, and 17 notes, and bears a tangential melodic relationship to [[Orwell]] temperament in that its 9-note MOS has 4 large and 5 small steps. | ||
Revision as of 03:31, 28 September 2024
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This page on a regular temperament, temperament collection, or aspect of regular temperament theory is being revised for clarity as part of WikiProject TempClean. |
Huxley is name given by Deja Igliashon to the 4p&13p 2.3.11.13 subgroup temperament where 512/507 and 1352/1331 vanish. It is an extension of Lovecraft temperament, the 4p&13p 2.11.13 subgroup temperament, to include prime 3. It uses this mapping:
| 2 | 3 | 11 | 13 |
|---|---|---|---|
| 1 | 3 | 3 | 3 |
| 0 | -6 | 2 | 3 |
Its POTE generator is 282.4139 cents, almost exactly 4 steps of 17edo (282.3529 cents). As such, 17edo may be considered the ideal equal temperament in which to use it. Other EDOs that support it are 4p, 13p, 21p, 30p, 34p, 38e, 47b, and 51e.
It has moments of symmetry at 4, 9, 13, and 17 notes, and bears a tangential melodic relationship to Orwell temperament in that its 9-note MOS has 4 large and 5 small steps.