232edo: Difference between revisions

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~~The ''232 equal division'' divides the octave into~~ 232 equal parts of 5.172 cents each. It provides the [[Optimal_patent_val|optimal patent val]] for [[13-limit|13-limit]] [[Hemifamity_temperaments#Mystery|mystery temperament]], the rank three [[Hemifamity_family#Pele|pele temperament]] and the rank three [[Trimyna_family#Trimyna-13-limit|trimyna temperament]] and other temperaments tempering out 196/195, for which it gives the optimal patent val for the corresponding rank five temperament.

~~Aside from its~~ patent val, the ~~232d val is worth considering. Both temper~~ out ~~the wuerschmidt comma, 393216~~/~~390625~~, in the 5~~-limit~~.

232edo [[support]]s and provides the [[optimal patent val]] for the [[13-limit]] [[mystery]] temperament, the rank-3 [[pele]] temperament and the rank-3 [[trimyna]] temperament and other temperaments tempering out [[196/195]], for which it gives the optimal patent val for the corresponding rank-5 temperament.

In the 7-limit, the patent val tempers out hemifamity, 5120/5103 and the trimyna comma, 50421/50000; and 232d 3125/~~3097~~ and 245/243, ~~[[support|~~supporting]] [[~~Sensamagic_clan#Bohpier|~~bohpier ~~temperament~~]]. In the 11-limit, the patent val tempers out 441/440 and 896/891, and 232d 540/539, 1375/1372 and 4000/3993, supporting octoid. In the 13-limit, the patent val tempers out 196/195, 352/351, 364/363, ~~441~~/~~440~~ and ~~676~~/~~675~~, which leads to 13-limit mystery, for which it provides the optimal patent val. 232d also tempers out 352/351 and 676/675, which supports ~~variants~~ of octoid.

Aside from its [[patent val]], the 232d val {{val| 232 368 539 '''652''' 803 859 }} is worth considering. Both temper out the [[würschmidt comma]], 393216/390625, in the 5-limit. In the 7-limit, the patent val tempers out hemifamity, [[5120/5103]] and the trimyna comma, 50421/50000; and 232d [[3125/3087]] and [[245/243]], supporting [[bohpier]]. In the 11-limit, the patent val tempers out [[441/440]] and [[896/891]], and 232d [[540/539]], 1375/1372 and [[4000/3993]], supporting [[octoid]]. In the 13-limit, the patent val tempers out 196/195, [[352/351]], [[364/363]], [[676/675]], and [[847/845]], which leads to 13-limit mystery, for which it provides the optimal patent val. 232d also tempers out 352/351 and 676/675, which supports a variant of octoid.

Considering the 232edo patent val, 13-limit mystery and 13-limit pele, we note that because it tempers out 441/440 it allows [[~~werckismic_chords|~~werckismic chords]], because it tempers out 196/195 it allows [[~~mynucumic_chords|~~mynucumic chords]], because it tempers out 352/351 it allows [[~~minthmic_chords|~~minthmic chords]], and because it tempers out 364/363 it allows [[~~gentle_chords|~~gentle chords]], and because it tempers out 847/845 it allows the [[~~cuthbert_triad|~~cuthbert ~~triad~~]], making it a very flexible harmonic system.

Considering the 232edo patent val, 13-limit mystery and 13-limit pele, we note that because it tempers out 441/440 it allows [[werckismic chords]], because it tempers out 196/195 it allows [[mynucumic chords]], because it tempers out 352/351 it allows [[minthmic chords]], and because it tempers out 364/363 it allows [[gentle chords]], and because it tempers out 847/845 it allows the [[cuthbert chords]], making it a very flexible harmonic system.

=== Odd harmonics ===

[[Category:~~Equal divisions of the octave|###~~]] ~~~~

=== Subsets and supersets ===

Since 232 factors into 2<sup>3</sup> × 29, 232edo has subset edos {{EDOs| 2, 4, 8, 29, 58, and 116 }}.

[[Category:Mystery]]

[[Category:Pele]]

[[Category:Trimyna]]

[[Category:Mynucumic]]

[[Category:Bohpier]]

~~[[Category:Mystery]]~~

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 {{Infobox ET}}
-The ''232 equal division'' divides the octave into 232 equal parts of 5.172 cents each. It provides the [[Optimal_patent_val|optimal patent val]] for [[13-limit|13-limit]] [[Hemifamity_temperaments#Mystery|mystery temperament]], the rank three [[Hemifamity_family#Pele|pele temperament]] and the rank three [[Trimyna_family#Trimyna-13-limit|trimyna temperament]] and other temperaments tempering out 196/195, for which it gives the optimal patent val for the corresponding rank five temperament.
+{{EDO intro|232}}
-Aside from its patent val, the 232d val is worth considering. Both temper out the wuerschmidt comma, 393216/390625, in the 5-limit.
+edo [[support]]s and provides the [[optimal patent val]] for the [[13-limit]] [[mystery]] temperament, the rank-3 [[pele]] temperament and the rank-3 [[trimyna]] temperament and other temperaments tempering out [[196/195]], for which it gives the optimal patent val for the corresponding rank-5 temperament.
-In the 7-limit, the patent val tempers out hemifamity, 5120/5103 and the trimyna comma, 50421/50000; and 232d 3125/3097 and 245/243, [[support|supporting]] [[Sensamagic_clan#Bohpier|bohpier temperament]]. In the 11-limit, the patent val tempers out 441/440 and 896/891, and 232d 540/539, 1375/1372 and 4000/3993, supporting octoid. In the 13-limit, the patent val tempers out 196/195, 352/351, 364/363, 441/440 and 676/675, which leads to 13-limit mystery, for which it provides the optimal patent val. 232d also tempers out 352/351 and 676/675, which supports variants of octoid.
+Aside from its [[patent val]], the 232d val {{val| 232 368 539 '''652''' 803 859 }} is worth considering. Both temper out the [[würschmidt comma]], 393216/390625, in the 5-limit. In the 7-limit, the patent val tempers out hemifamity, [[5120/5103]] and the trimyna comma, 50421/50000; and 232d [[3125/3087]] and [[245/243]], supporting [[bohpier]]. In the 11-limit, the patent val tempers out [[441/440]] and [[896/891]], and 232d [[540/539]], 1375/1372 and [[4000/3993]], supporting [[octoid]]. In the 13-limit, the patent val tempers out 196/195, [[352/351]], [[364/363]], [[676/675]], and [[847/845]], which leads to 13-limit mystery, for which it provides the optimal patent val. 232d also tempers out 352/351 and 676/675, which supports a variant of octoid.
-Considering the 232edo patent val, 13-limit mystery and 13-limit pele, we note that because it tempers out 441/440 it allows [[werckismic_chords|werckismic chords]], because it tempers out 196/195 it allows [[mynucumic_chords|mynucumic chords]], because it tempers out 352/351 it allows [[minthmic_chords|minthmic chords]], and because it tempers out 364/363 it allows [[gentle_chords|gentle chords]], and because it tempers out 847/845 it allows the [[cuthbert_triad|cuthbert triad]], making it a very flexible harmonic system.
+Considering the 232edo patent val, 13-limit mystery and 13-limit pele, we note that because it tempers out 441/440 it allows [[werckismic chords]], because it tempers out 196/195 it allows [[mynucumic chords]], because it tempers out 352/351 it allows [[minthmic chords]], and because it tempers out 364/363 it allows [[gentle chords]], and because it tempers out 847/845 it allows the [[cuthbert chords]], making it a very flexible harmonic system.
+=== Odd harmonics ===
 {{Harmonics in equal|232}}
-[[Category:Equal divisions of the octave|###]] <!-- 3-digit number -->
+=== Subsets and supersets ===
+Since 232 factors into 2<sup>3</sup> × 29, 232edo has subset edos {{EDOs| 2, 4, 8, 29, 58, and 116 }}.
+[[Category:Mystery]]
+[[Category:Pele]]
+[[Category:Trimyna]]
+[[Category:Mynucumic]]
 [[Category:Bohpier]]
-[[Category:Mystery]]