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Created page with "'''666 EDO''' divides the octave into steps of 1.<span style="text-decoration: overline">801</span> cents each. == Theory == {{primes in edo|666|columns=14}} 666edo is approp..." |
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666edo is appropriate for use with the 2.11.19.41.43 subgroup, a choice with very large prime harmonics. If significant errors are allowed, 666edo can be used with 2.7.11.17.19.23. The alternations between approxmation make 666edo a good choice for "no-number" subgroups which skip particular harmonics. | 666edo is appropriate for use with the 2.11.19.41.43 subgroup, a choice with very large prime harmonics. If significant errors are allowed, 666edo can be used with 2.7.11.17.19.23. The alternations between approxmation make 666edo a good choice for "no-number" subgroups which skip particular harmonics. | ||
666edo provides good approximations for: [[15/11]], [[16/11]], [[16/15]], [[13/3|13/12]], [[13/10]], [[22/15]], [[23/14]]. | |||
666 is divisible by {{EDOs|9, 18, 37, 74, 111, 222, and 333}}. | 666 is divisible by {{EDOs|9, 18, 37, 74, 111, 222, and 333}}. | ||
Revision as of 19:30, 23 October 2021
666 EDO divides the octave into steps of 1.801 cents each.
Theory
Script error: No such module "primes_in_edo".
666edo is appropriate for use with the 2.11.19.41.43 subgroup, a choice with very large prime harmonics. If significant errors are allowed, 666edo can be used with 2.7.11.17.19.23. The alternations between approxmation make 666edo a good choice for "no-number" subgroups which skip particular harmonics.
666edo provides good approximations for: 15/11, 16/11, 16/15, 13/12, 13/10, 22/15, 23/14.