92edo: Difference between revisions
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in my last comment I should have written 54\92 (see table), now for clarity added in the text as well |
m →Prime intervals: the same prec is now estimated by EDO magnitude |
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== Prime intervals == | == Prime intervals == | ||
{{primes in edo|92 | {{primes in edo|92}} | ||
[[Category:Equal divisions of the octave]] | [[Category:Equal divisions of the octave]] | ||
[[Category:Quartismic]] | [[Category:Quartismic]] | ||
Revision as of 12:00, 11 July 2021
The 92 divisions of 92edo measure 13.0435 cents each. 92 is contorted through the 17-limit, with the same tuning and commas as 46edo, and hence attracts little interest, the patent fifth (54\92) is about 2.4 cents sharp. The alternate 53\92 generator is a very flat flattone fifth, flatter even than 26edo. 92edo is the highest in a series of four consecutive EDOs to temper out the quartisma (117440512/117406179).
Prime intervals
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