5th-octave temperaments: Difference between revisions
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m move exotemperament to the bottom. why would you want to map 7 independently while preserving the 5-limit? seriously? (for example 2.3.7 is a lot more accurate/plausible in 5 EDO than is 2.3.5) |
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* [[Trisedodge family|Trisedodge temperaments]] | * [[Trisedodge family|Trisedodge temperaments]] | ||
== Slendrismic == | == Slendrismic == | ||
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Supporting ETs: {{Optimal ET sequence|10, 50, 80, 120, 125, 270, 2000, 2460, 3125, 3395, 5585}} | Supporting ETs: {{Optimal ET sequence|10, 50, 80, 120, 125, 270, 2000, 2460, 3125, 3395, 5585}} | ||
== Quint == | |||
''Quint'' preserves the 5-limit mapping of 5edo, and the harmonic 7 is mapped to an independent generator. In what way is this useful is unexplained. | |||
[[Subgroup]]: 2.3.5.7 | |||
[[Comma list]]: 16/15, 27/25 | |||
{{Mapping|legend=1| 5 8 12 0 | 0 0 0 1 }} | |||
: Mapping generators: ~9/8, ~7 | |||
{{Multival|legend=1| 0 0 5 0 8 12 }} | |||
[[Optimal tuning]] ([[POTE]]): ~9/8 = 1\5, ~7/4 = 1017.903 | |||
{{Optimal ET sequence|legend=1| 5, 15ccd }} | |||
[[Badness]]: 0.048312 | |||
Revision as of 16:40, 26 May 2024
Template:Fractional-octave navigation 5edo is the smallest xenharmonic system, as 1edo, 2edo, 3edo and 4edo are all subsets of 12edo.
The most notable 5th-octave family is limmic temperaments – tempering out 256/243 and associates 3\5 to 3/2 as well as 1\5 to 9/8, producing temperaments like blackwood. Equally notable among small equal divisions are the cloudy temperaments – identifying 8/7 with one step of 5edo.
Other families of 5-limit 5th-octave commas are:
- Pental temperaments - tempers out the [-28 25 -5⟩ comma which improves the 3/2 mapping for 5edo, producing a temperament with 3/2 as a generator and 1\5 as a period.
- Quintosec temperaments
- Trisedodge temperaments
Slendrismic
- See also: No-fives subgroup temperaments #Slendrismic and Slendrisma
Subgroup: 2.3.7
Comma list: 68719476736/68641485507
Mapping: [⟨5 0 18], ⟨0 2 -1]]
- Mapping generators: ~147/128 = 1\5, ~262144/151263
Optimal tuning (CTE): ~8/7 = 230.9930 (or ~1029/1024 = 9.0080)
Optimal ET sequence: 130, 135, 265, 400, 1065, 1465, 1865
Badness: 0.013309
Pentonismic (rank-5)
Subgroup: 2.3.5.7.11.13
Comma list: 281974669312/281950621875
Mapping: [⟨5 0 0 0 0 24], ⟨0 1 0 0 0 -1], ⟨0 0 1 0 0 -1], ⟨0 0 0 1 0 1], ⟨0 0 0 0 1 0]]
- Mapping generators: ~224/195 = 1\5, ~3, ~5, ~7, ~11
Supporting ETs: 10, 50, 80, 120, 125, 270, 2000, 2460, 3125, 3395, 5585
Quint
Quint preserves the 5-limit mapping of 5edo, and the harmonic 7 is mapped to an independent generator. In what way is this useful is unexplained.
Subgroup: 2.3.5.7
Comma list: 16/15, 27/25
Mapping: [⟨5 8 12 0], ⟨0 0 0 1]]
- Mapping generators: ~9/8, ~7
Wedgie: ⟨⟨ 0 0 5 0 8 12 ]]
Optimal tuning (POTE): ~9/8 = 1\5, ~7/4 = 1017.903
Badness: 0.048312