31edo: Difference between revisions
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* 31edo's 9\31 neutral third generator generates [[Step ratio|ultrasoft]] [[3L 4s|mosh]] and [[Step ratio|superhard]] [[7L 3s|dicoid]] MOSes. | * 31edo's 9\31 neutral third generator generates [[Step ratio|ultrasoft]] [[3L 4s|mosh]] and [[Step ratio|superhard]] [[7L 3s|dicoid]] MOSes. | ||
* Its 12\31 generator generates a [[Step ratio|semihard]] [[oneirotonic]] scale, similar to the 5L 3s scale in [[13edo]] but with the 9/8, 5/4 and 7/6 better in tune. | * Its 12\31 generator generates a [[Step ratio|semihard]] [[oneirotonic]] scale, similar to the 5L 3s scale in [[13edo]] but with the 9/8, 5/4 and 7/6 better in tune. | ||
* A chain of 5\31 whole tones is exceptionally rich in 4:5:7 chords. | * A chain of 5\31 whole tones is exceptionally rich in 4:5:7 chords, which are approximated very well in 31edo. | ||
* If you're fond of orwell tetrads (which are also found in 31edo's oneirotonic), you will like the 7\31 (271.0¢) subminor third generator. The [[Step ratio|ultrasoft]] 9-tone orwelloid ([[4L 5s]]) MOS could be treated as a 9-tone well temperament. | * If you're fond of orwell tetrads (which are also found in 31edo's oneirotonic), you will like the 7\31 (271.0¢) subminor third generator. The [[Step ratio|ultrasoft]] 9-tone orwelloid ([[4L 5s]]) MOS could be treated as a 9-tone well temperament. | ||
* It supports [[6edf]] (miracle) and [[9edf]] (Carlos alpha), fifth-equivalent equal temperaments that hit many good JI approximations. | * It supports [[6edf]] (miracle) and [[9edf]] (Carlos alpha), fifth-equivalent equal temperaments that hit many good JI approximations. | ||