31ed6: Difference between revisions

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'''[[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.

'''[[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.

== Division of 6/1 into 31 equal parts ==

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]].

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]].

== See also ==

* [[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

[[Category:Ed6]]

[[Category:~~edonoi~~]]

[[Category:Edonoi]]

[[category:~~macrotonal~~]]

[[category:Macrotonal]]

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-'''[[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.
+'''[[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.
 == Division of 6/1 into 31 equal parts ==
+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]].
-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]].
 == See also ==
+* [[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
 [[Category:Ed6]]
-[[Category:edonoi]]
+[[Category:Edonoi]]
-[[category:macrotonal]]
+[[category:Macrotonal]]