97edo: Difference between revisions
subsectioning the approximation into theory, and as for the "worst" I've actually calculated this with a spreadsheet, maybe not up to 16/15 but I can say for 9/8, rewrite a bit |
→Divisors: thought this is worth mentioning |
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{{Harmonics in equal|97}} | {{Harmonics in equal|97}} | ||
=== | === Subsets and supersets === | ||
97edo is the 25th [[prime edo]]. | 97edo is the 25th [[prime edo]]. | ||
[[388edo]] and [[2619edo]], which contain 97edo as a subset, have very high consistency limits - 37 and 33 respectively. [[3395edo]], which divides the edostep in 35, is a [[The Riemann zeta function and tuning|zeta edo]]. The [[berkelium]] temperament realizes some relationships between them through a regular temperament perspective. | |||
=== JI approximation === | === JI approximation === | ||