Rainy–didacus equivalence continuum: Difference between revisions
No edit summary Tags: Mobile edit Mobile web edit |
clarify |
||
| Line 1: | Line 1: | ||
The '''rainy–didacus continuum''' is the [[equivalence continuum|continuum]] of [[2.5.7 subgroup]] temperaments which equate a number of [[rainy comma]]s with the [[didacus comma]] ([[3136/3125]]), and thus is the continuum of all 2.5.7 subgroup temperaments supported by [[31edo]], which tempers both and thus tempers all linear combinations of them. If one wants to use all of these simultaneously but wants more accurate tuning than [[31edo]], [[31st-octave temperaments]] extending [[birds]] may be interesting. | The '''rainy–didacus continuum''' is the [[equivalence continuum|continuum]] of [[2.5.7 subgroup]] temperaments which equate a number of [[rainy comma]]s with the [[didacus comma]] ([[3136/3125]]), and thus is the continuum of all 2.5.7 subgroup temperaments supported by [[31edo]], which tempers both and thus tempers all linear combinations of them. If one wants to use all of these simultaneously but wants more accurate tuning than [[31edo]] for the other primes, then [[31st-octave temperaments]] extending [[birds]] may be interesting. | ||
All temperaments in the continuum satisfy {{nowrap|([[2100875/2097152]])<sup>''n''</sup> ~ ([[3136/3125]])}} for some rational value of ''n''. The just value of ''n'' is approximately 1.981... so that {{nowrap|''n'' {{=}} 2}} is especially close to the [[JIP]]. | All temperaments in the continuum satisfy {{nowrap|([[2100875/2097152]])<sup>''n''</sup> ~ ([[3136/3125]])}} for some rational value of ''n''. The just value of ''n'' is approximately 1.981... so that {{nowrap|''n'' {{=}} 2}} is especially close to the [[JIP]]. | ||
Latest revision as of 23:05, 15 January 2026
The rainy–didacus continuum is the continuum of 2.5.7 subgroup temperaments which equate a number of rainy commas with the didacus comma (3136/3125), and thus is the continuum of all 2.5.7 subgroup temperaments supported by 31edo, which tempers both and thus tempers all linear combinations of them. If one wants to use all of these simultaneously but wants more accurate tuning than 31edo for the other primes, then 31st-octave temperaments extending birds may be interesting.
All temperaments in the continuum satisfy (2100875/2097152)n ~ (3136/3125) for some rational value of n. The just value of n is approximately 1.981... so that n = 2 is especially close to the JIP.
| n | Temperament | Comma | |
|---|---|---|---|
| Ratio | Monzo | ||
| −2 | 2.5.7 Mothra | 69206436005/68719476736 | [-36 0 1 12⟩ |
| −1 | Mercy (2.5.7 Miracle) | 823543/819200 | [-15 0 -2 7⟩ |
| −0.5 | 2.5.7 Myna | 40353607/40000000 | [-9 0 -7 9⟩ |
| 0 | Didacus | 3136/3125 | [6 0 -5 2⟩ |
| 0.5 | 2.5.7 Grendel | 8589934592/8544921875 | [33 0 -13 -1⟩ |
| 1 | Vorwell | 134217728/133984375 | [27 0 -8 -3⟩ |
| 1.5 | 31 & 494 | 37778931862957161709568/37714514598846435546875 | [75 0 -19 -11⟩ |
| 2 | Exodia (2.5.7 Mohajira) | 281484423828125/281474976710656 | [-48 0 11 8⟩ |
| 3 | 31 & 612 | 591363588909912109375/590295810358705651712 | [-69 0 14 13⟩ |
| … | … | … | … |
| ∞ | Rainy | 2100875/2097152 | [-21 0 3 5⟩ |
Temperaments
Exodia
Exodia is the 2.5.7 subgroup restriction of mohajira, but unlike mohajira, is a true microtemperament, supported among others by 789edo, 1957edo, and 5902edo, extremely strong systems in this subgroup.
Subgroup: 2.5.7
Comma list: 281484423828125/281474976710656
Mapping: [⟨1 0 6], ⟨0 8 -11]]
Optimal tuning (CWE): ~2 = 1\1, ~262144/214375 = 348.289
Optimal ET sequence: 31, 224, 255, 286, 317, 348, 379, 410, 789
Badness (Sintel): 0.0148