Magic: Difference between revisions
m Table formatting; unify precision |
Rewrite the part describing the small interval. And in case of the table, 27/14 is the simplest ratio |
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* The 3/2 approximation is 5 times as complex as the 5/4 approximation (the generator) so modulation by fifths is more constrained than you may be used to. | * The 3/2 approximation is 5 times as complex as the 5/4 approximation (the generator) so modulation by fifths is more constrained than you may be used to. | ||
Because the generator is so close to 1\3 of an octave, and the interval left over | Because the generator is so close to 1\3 of an octave, and the interval left over is accordingly so small, all small magic MOSes consist of three large intervals alternating with three groups of this small interval. Specifically, there are the following MOSes, where s always represents the characteristic small interval, which simultaneously represents [[128/125]], [[36/35]], [[28/27]], and [[25/24]]. | ||
* [[3L 4s]]: LsLsLss where L = 6/5 | * [[3L 4s]]: LsLsLss where L = 6/5 | ||
| Line 49: | Line 49: | ||
| 5/4 | | 5/4 | ||
| 14/9 | | 14/9 | ||
| | | 27/14 | ||
| 6/5 | | 6/5 | ||
| 3/2 | | 3/2 | ||