388edo: Difference between revisions
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{{Harmonics in equal|388|start=25|columns=12|collapsed=1}} | {{Harmonics in equal|388|start=25|columns=12|collapsed=1}} | ||
=== Approximation to JI | === Subsets and supersets === | ||
This | Since 388 factors into primes as {{nowrap| 2<sup>2</sup> × 97 }}, 388edo has subset edos {{EDOs| 2, 4, 97, and 194 }}. | ||
== Approximation to JI == | |||
This edo has a high consistency limit, although due to [[311edo]] having a higher consistency limit, among other things, it is mostly unexplored. However, it still makes for an interesting comparison. | |||
388edo has a consistency limit of 37 compared to 311edo's consistency limit of 41, so most people wishing to approximate higher-limit JI choose the latter. 311edo also approximates harmonics up to 42 with under 25% error, while 388edo fails as early as harmonic [[7/1|7]]. One thing to note is that 388edo's distinct consistency limit is 27 compared to 311edo's 23, so those who want distinct consistency in the 27-odd-limit may choose 388. | 388edo has a consistency limit of 37 compared to 311edo's consistency limit of 41, so most people wishing to approximate higher-limit JI choose the latter. 311edo also approximates harmonics up to 42 with under 25% error, while 388edo fails as early as harmonic [[7/1|7]]. One thing to note is that 388edo's distinct consistency limit is 27 compared to 311edo's 23, so those who want distinct consistency in the 27-odd-limit may choose 388. | ||
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{{Q-odd-limit intervals|388|limit=37}} | {{Q-odd-limit intervals|388|limit=37}} | ||
== Regular temperament properties == | == Regular temperament properties == | ||