368edo: Difference between revisions

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'''368edo''' is the [[EDO|equal division of the octave]] into 368 parts of 3.26087 [[cent]]s each. It tempers out 1220703125/1207959552 (ditonma) and 205891132094649/204800000000000 in the 5-limit; 4375/4374, 16875/16807, and 33756345/33554432 in the 7-limit. Using the patent val, it tempers out 540/539, 1375/1372, and 4000/3993 in the 11-limit; 2205/2197, 4225/4224, and 10648/10647 in the 13-limit.
{{EDO intro|368}}


== Related regular temperaments ==
The equal temperament [[tempering out|tempers out]] 1220703125/1207959552 (ditonma) and 205891132094649/204800000000000 in the 5-limit; [[4375/4374]], [[16875/16807]], and 33756345/33554432 in the 7-limit. Using the [[patent val]], it tempers out 540/539, 1375/1372, and 4000/3993 in the 11-limit; 2205/2197, 4225/4224, and 10648/10647 in the 13-limit.
368edo [[support]]s the 11-limit [[Ragismic microtemperaments|octoid temperament]]. Alternative 368f val supports the 13-limit octoid, and 368fff val supports the octopus temperament.


368edo is very nearly the POTE tuning of [[23-limit]] [[Porwell temperaments|icositritonic]] temperament (46&161, named by [[User:Xenllium|Xenllium]]), which is supported by [[46edo]], [[115edo]], [[161edo]], [[207edo]], and the 368ci val.
368edo [[support]]s the 11-limit [[octoid]] temperament. The alternative 368f [[val]] supports the 13-limit octoid, and 368fff val supports the octopus temperament.


==Related scales==
368edo is very nearly the POTE tuning of [[23-limit]] [[Porwell temperaments|icositritonic]] temperament (46 & 161, named by [[User:Xenllium|Xenllium]]), which is supported by [[46edo]], [[115edo]], [[161edo]], [[207edo]], and the 368ci val.
Icositritonic scales
*[[Icositritonic69]]
*[[Icositritonic115]]
*[[Icositritonic161]]
*[[Icositritonic207]]


[[Category:Equal divisions of the octave|###]] <!-- 3-digit number -->
=== Odd harmonics ===
{{Harmonics in equal|368}}
 
=== Subsets and supersets ===
Since 368 factors into {{factorization|368}}, 368edo has subset edos {{EDOs| 2, 4, 8, 16, 23, 46, 92, and 184 }}.

Revision as of 14:59, 9 November 2023

← 367edo 368edo 369edo →
Prime factorization 24 × 23
Step size 3.26087 ¢ 
Fifth 215\368 (701.087 ¢)
Semitones (A1:m2) 33:29 (107.6 ¢ : 94.57 ¢)
Consistency limit 7
Distinct consistency limit 7

Template:EDO intro

The equal temperament tempers out 1220703125/1207959552 (ditonma) and 205891132094649/204800000000000 in the 5-limit; 4375/4374, 16875/16807, and 33756345/33554432 in the 7-limit. Using the patent val, it tempers out 540/539, 1375/1372, and 4000/3993 in the 11-limit; 2205/2197, 4225/4224, and 10648/10647 in the 13-limit.

368edo supports the 11-limit octoid temperament. The alternative 368f val supports the 13-limit octoid, and 368fff val supports the octopus temperament.

368edo is very nearly the POTE tuning of 23-limit icositritonic temperament (46 & 161, named by Xenllium), which is supported by 46edo, 115edo, 161edo, 207edo, and the 368ci val.

Odd harmonics

Approximation of odd harmonics in 368edo
Harmonic 3 5 7 9 11 13 15 17 19 21 23
Error Absolute (¢) -0.87 -1.53 -0.35 +1.52 -0.23 +0.78 +0.86 -0.61 -0.77 -1.22 +1.07
Relative (%) -26.6 -47.0 -10.7 +46.8 -7.1 +23.8 +26.4 -18.6 -23.7 -37.3 +32.9
Steps
(reduced) 		583
(215) 		854
(118) 		1033
(297) 		1167
(63) 		1273
(169) 		1362
(258) 		1438
(334) 		1504
(32) 		1563
(91) 		1616
(144) 		1665
(193)

Subsets and supersets

Since 368 factors into 24 × 23, 368edo has subset edos 2, 4, 8, 16, 23, 46, 92, and 184.

Retrieved from "https://en.xen.wiki/index.php?title=368edo&oldid=127209"