353edo: Difference between revisions
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{{Infobox ET | |||
| Prime factorization = 353 (is prime) | |||
| Step size = 3.3994 | |||
| Fifth = 206\353 (700.28¢) | |||
}} | |||
The '''353 equal divisions of the octave''' ('''353edo''') divides the [[octave]] into parts of 3.3994 [[cent]]s each. | The '''353 equal divisions of the octave''' ('''353edo''') divides the [[octave]] into parts of 3.3994 [[cent]]s each. | ||
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=== Specific chords and intervals === | === Specific chords and intervals === | ||
353bbbbb val offers the following resolution sequence: 7/4 D7 - 13/8 D4/3 - D53 - T53. This has a very pleasant sound, with 13/8 acting as a "doubled resolvant" or "resolution into resolution". In the patent val, 169/168 amounts to 3 steps, which is the L step of the full 93L 37s rectified Hebrew scale. | 353bbbbb val offers the following resolution sequence: 7/4 D7 - 13/8 D4/3 - D53 - T53. This has a very pleasant sound, with 13/8 acting as a "doubled resolvant" or "resolution into resolution". In the patent val, 169/168 amounts to 3 steps, which is the L step of the full 93L 37s rectified Hebrew scale. | ||
Just as a large amount of [[12edo]] music can be played consistently in 19edo, it can also be played consistently in the 18L 1s subset of Rectified Hebrew. | |||
== Table of intervals == | == Table of intervals == | ||