31ed6: Difference between revisions

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{{Infobox ET}}
{{Infobox ET}}
'''[[Ed6|Division of the sixth harmonic]] into 31 equal parts''' (31ED6) is very nearly identical to [[12edo|12 EDO]], but with the [[6/1]] rather than the 2/1 being just. The octave is about 0.7568 [[cent]]s stretched and the step size is about 100.0631 cents.
{{ED intro}}


==Harmonics==
== Theory ==
{{Harmonics in equal|31|6|1|prec=2|columns=15}}
31ed6 is not a truly xenharmonic tuning; it is a slightly stretched version (with an octave of 1200.8 cents) of the normal [[12edo]], similar to [[19ed3]]. It is very nearly identical to [[12edo]], but with the [[6/1]] rather than the 2/1 being just.


== Division of 6/1 into 31 equal parts ==
=== Harmonics ===
Note: 31 equal divisions of the hexatave is not a "real" xenharmonic tuning; it is a slightly stretched version (with an octave of 1200.8 cents) of the normal [[12edo|12-tone scale]], similar to [[19ed3|19ED3]].
{{Harmonics in equal|31|6|1|columns=12}}
{{Harmonics in equal|31|6|1|columns=12|start=12|collapsed=true|title=Approximation of harmonics in 31ed6 (continued)}}


== See also ==
== See also ==
* [[7edf|7EDF]] – relative ED3/2
* [[7edf]] relative ed3/2
* [[12edo|12EDO]] – relative EDO
* [[12edo]] relative edo
* [[19ed3|19ED3]] – relative ED3
* [[19ed3]] relative ed3
* [[28ed5|28ED5]] – relative ED5
* [[28ed5]] relative ed5
* [[34ed7|34ED7]] – relative ED7
* [[34ed7]] relative ed7
* [[40ed10|40ED10]] – relative ED10
* [[40ed10]] relative ed10
* [[43ed12|43ED12]] – relative ED12
* [[43ed12]] relative edD12


[[Category:Ed6]]
[[Category:Edonoi]]
[[category:Macrotonal]]
[[category:Macrotonal]]

Revision as of 13:47, 15 January 2025

← 30ed6 31ed6 32ed6 →
Prime factorization 31 (prime)
Step size 100.063 ¢ 
Octave 12\31ed6 (1200.76 ¢)
(convergent)
Twelfth 19\31ed6 (1901.2 ¢)
(convergent)
Consistency limit 10
Distinct consistency limit 6

31 equal divisions of the 6th harmonic (abbreviated 31ed6) is a nonoctave tuning system that divides the interval of 6/1 into 31 equal parts of about 100 ¢ each. Each step represents a frequency ratio of 61/31, or the 31st root of 6.

Theory

31ed6 is not a truly xenharmonic tuning; it is a slightly stretched version (with an octave of 1200.8 cents) of the normal 12edo, similar to 19ed3. It is very nearly identical to 12edo, but with the 6/1 rather than the 2/1 being just.

Harmonics

Approximation of harmonics in 31ed6
Harmonic 2 3 4 5 6 7 8 9 10 11 12 13
Error Absolute (¢) +0.8 -0.8 +1.5 +15.5 +0.0 +33.3 +2.3 -1.5 +16.2 -48.7 +0.8 -37.8
Relative (%) +0.8 -0.8 +1.5 +15.4 +0.0 +33.3 +2.3 -1.5 +16.2 -48.7 +0.8 -37.7
Steps
(reduced) 		12
(12) 		19
(19) 		24
(24) 		28
(28) 		31
(0) 		34
(3) 		36
(5) 		38
(7) 		40
(9) 		41
(10) 		43
(12) 		44
(13)
Approximation of harmonics in 31ed6 (continued)
Harmonic 13 14 15 16 17 18 19 20 21 22 23 24
Error Absolute (¢) -37.8 +34.1 +14.7 +3.0 -1.9 -0.8 +5.7 +17.0 +32.6 -48.0 -24.9 +1.5
Relative (%) -37.7 +34.1 +14.7 +3.0 -1.9 -0.8 +5.7 +17.0 +32.5 -47.9 -24.9 +1.5
Steps
(reduced) 		44
(13) 		46
(15) 		47
(16) 		48
(17) 		49
(18) 		50
(19) 		51
(20) 		52
(21) 		53
(22) 		53
(22) 		54
(23) 		55
(24)

See also

Retrieved from "https://en.xen.wiki/index.php?title=31ed6&oldid=176096"