Ed6/5: Difference between revisions
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Contribution (talk | contribs) Created page with "21ed6/5, 23ed6/5 and 44ed6/5 are to the division of the minor third what 17ed5/4, 19ed5/4 and 36ed5/4 are to the division of the major third, what 13..." |
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[[21ed6/5]], [[23ed6/5]] and [[44ed6/5]] are to the division of the minor third what [[17ed5/4]], [[19ed5/4]] and [[36ed5/4]] are to the division of the major third | The '''equal division of 6/5''' ('''ed6/5''') is a [[tuning]] obtained by dividing the [[6/5|classic minor third (6/5)]] in a certain number of [[equal]] steps. | ||
ED6/5 tuning systems that accurately represent the intervals 12/11 and 11/10 include: [[21ed6/5]] (0.33 cent error), [[23ed6/5]] (0.32 cent error), and [[44ed6/5]] (0.01 cent error). | |||
[[21ed6/5]], [[23ed6/5]], and [[44ed6/5]] are to the division of the minor third what: | |||
* [[17ed5/4]], [[19ed5/4]], and [[36ed5/4]] are to the division of the major third | |||
* what [[13ed4/3]], [[15ed4/3]], and [[28ed4/3]] are to the division of the fourth | |||
* what [[9ed3/2]], [[11ed3/2]], and [[20ed3/2]] are to the division of the fifth | |||
* and what [[5edo]], [[7edo]], and [[12edo]] are to the division of the octave. | |||
[[Category:Equal-step tuning]] | |||
{{todo|inline=1|explain edonoi|text=Most people do not think 6/5 sounds like an equivalence, so there must be some other reason why people are dividing it — some property ''other than'' equivalence that makes people want to divide it. Please add to this page an explanation of what that reason is.}} | |||
Latest revision as of 03:09, 22 May 2025
The equal division of 6/5 (ed6/5) is a tuning obtained by dividing the classic minor third (6/5) in a certain number of equal steps.
ED6/5 tuning systems that accurately represent the intervals 12/11 and 11/10 include: 21ed6/5 (0.33 cent error), 23ed6/5 (0.32 cent error), and 44ed6/5 (0.01 cent error).
21ed6/5, 23ed6/5, and 44ed6/5 are to the division of the minor third what:
- 17ed5/4, 19ed5/4, and 36ed5/4 are to the division of the major third
- what 13ed4/3, 15ed4/3, and 28ed4/3 are to the division of the fourth
- what 9ed3/2, 11ed3/2, and 20ed3/2 are to the division of the fifth
- and what 5edo, 7edo, and 12edo are to the division of the octave.
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Todo: explain edonoi
Most people do not think 6/5 sounds like an equivalence, so there must be some other reason why people are dividing it — some property other than equivalence that makes people want to divide it. Please add to this page an explanation of what that reason is. |