99edo: Difference between revisions
→Regular temperament properties: Added 31-odd-limit interval mappings and 99efk val interval mapping Tags: Mobile edit Mobile web edit Advanced mobile edit |
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Being a [[zeta peak edo]], 99edo is also a very strong no-11 no-13 system, where it is consistent to the [[29-odd-limit]] with a sharp tendency. This favors the sharp mapping of 11 and 13, and allows these relatively weak approximations to somewhat blend with the rest for a full [[29-limit]] (or [[31-limit]], using the sharp-tending 99efk val) temperament. In fact, the 99efk val is the first to achieve [[diamond monotone]] in the [[31-odd-limit]], though it fails in the [[33-odd-limit]] due to mapping [[33/32]] to 5 steps, while [[32/31]] is mapped to 4 steps. | Being a [[zeta peak edo]], 99edo is also a very strong no-11 no-13 system, where it is consistent to the [[29-odd-limit]] with a sharp tendency. This favors the sharp mapping of 11 and 13, and allows these relatively weak approximations to somewhat blend with the rest for a full [[29-limit]] (or [[31-limit]], using the sharp-tending 99efk val) temperament. In fact, the 99efk val is the first to achieve [[diamond monotone]] in the [[31-odd-limit]], though it fails in the [[33-odd-limit]] due to mapping [[33/32]] to 5 steps, while [[32/31]] is mapped to 4 steps. | ||
One step of 99edo is close to [[144/143]], the grossma. Unfortunately, neither 99ef nor the patent val map it consistently, though [[198edo]] does. | |||
=== Prime harmonics === | === Prime harmonics === | ||
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== Notation == | == Notation == | ||
=== | [[Stein–Zimmermann–Gould notation]] uses sharps and flats combined with quartertone accidentals and arrows: | ||
99edo can be notated with [[Kite's ups and downs notation]]. Note that quip (quintuple-up) is the same as quudsharp (quadruple-down sharp) and that quid (quintuple-down) is the same as quupflat (quadruple-up flat): | {{Sharpness-sharp10-qt1-szg}} | ||
=== Kite's ups and downs notation === | |||
99edo can also be notated with [[Kite's ups and downs notation|Kite's ups and downs]]. Note that quip (quintuple-up) is the same as quudsharp (quadruple-down sharp) and that quid (quintuple-down) is the same as quupflat (quadruple-up flat): | |||
{{Ups and downs sharpness|99|true}} | {{Ups and downs sharpness|99|true}} | ||
== Approximation to JI == | == Approximation to JI == | ||
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</pre> | </pre> | ||
}} | }} | ||
=== Intervals made equidistant by 99edo === | |||
Runs of 7-prime-limited 45-odd-limit intervals separated by 1\99: | |||
# 36/35 ↔<sub>a</sub> 28/27 ↔<sub>b</sub> 25/24 ↔<sub>c</sub> 21/20 | |||
# 16/15 ↔<sub>b</sub> 15/14 ↔<sub>c</sub> 27/25 | |||
# 10/9 ↔<sub>c</sub> 28/25 ↔<sub>b</sub> 9/8 | |||
# 32/27 ↔<sub>b</sub> 25/21 ↔<sub>c</sub> 6/5 | |||
# 32/25 ↔<sub>b</sub> 9/7 ↔<sub>a</sub> 35/27 | |||
# 25/18 ↔<sub>c</sub> 7/5 ↔<sub>b</sub> 45/32 ↔<sub>d</sub> 64/45 ↔<sub>b</sub> 10/7 ↔<sub>c</sub> 36/25 | |||
The separating intervals (all equated): | |||
# ↔<sub>a</sub> = 245/243, the [[sensamagic]] comma | |||
# ↔<sub>b</sub> = 225/224, the [[marvel]] comma | |||
# ↔<sub>c</sub> = 126/125 | |||
# ↔<sub>d</sub> = 2048/2025, the [[Diaschismic|diaschisma]] | |||
Runs of intervals separated by 2\99: | |||
# 28/27 ↔<sub>e</sub> 21/20 ↔<sub>f</sub> 16/15 ↔<sub>e</sub> 27/25 ↔<sub>g</sub> 35/32 ↔<sub>f</sub> 10/9 ↔<sub>e</sub> 9/8 ↔<sub>f</sub> 8/7 | |||
# 7/6 ↔<sub>f</sub> 32/27 ↔<sub>e</sub> 6/5 | |||
# 32/25 ↔<sub>g</sub> 35/27 ↔<sub>e</sub> 21/16 ↔<sub>f</sub> 4/3 ↔<sub>e</sub> 27/20 ↔<sub>f</sub> 48/35 ↔<sub>g</sub> 25/18 ↔<sub>e</sub> 45/32 ↔<sub>f</sub> 10/7 | |||
The separating intervals (all equated): | |||
# ↔<sub>e</sub> = 81/80 | |||
# ↔<sub>f</sub> = 64/63 | |||
# ↔<sub>g</sub> = 875/864, the keema | |||
=== Interval mappings === | |||
{{Q-odd-limit intervals|99}} | |||
{{Q-odd-limit intervals|99.1|apx=val|header=none|tag=none|title=15-odd-limit intervals by 99ef val mapping}} | |||
== Regular temperament properties == | == Regular temperament properties == | ||
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| 339.394 | | 339.394 | ||
| 128/105 | | 128/105 | ||
| [[Amity]] (99ef) / hitchcock (99) | | [[Amity]] (99ef) / stalagmite (99ef) / hitchcock (99) | ||
|- | |- | ||
| 1 | | 1 | ||
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| 48.485 | | 48.485 | ||
| 36/35 | | 36/35 | ||
| [[Ennealimmal]] ( | | [[Ennealimmal]] / enneabiotic (99ef) / ennealympic (99) / <br>ennealimnic (99ef) / ennealim (99e) / ennealiminal (99) | ||
|- | |- | ||
| 11 | | 11 | ||
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|} | |} | ||
<nowiki/>* [[Normal forms #Equave-reduced-generator form|Octave-reduced form]], reduced to the first half-octave, and [[normal forms #Minimal-generator form|minimal form]] in parentheses if distinct | <nowiki/>* [[Normal forms #Equave-reduced-generator form|Octave-reduced form]], reduced to the first half-octave, and [[normal forms #Minimal-generator form|minimal form]] in parentheses if distinct | ||
== Octave stretch or compression == | == Octave stretch or compression == | ||