22ed7/4: Difference between revisions
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It is a heavily [[Octave shrinking|octave-compressed]] version of [[27edo]]. | It is a heavily [[Octave shrinking|octave-compressed]] version of [[27edo]]. | ||
== Intervals == | |||
{{Interval table}} | |||
== Harmonics == | |||
Compared to 27edo: | Compared to 27edo: | ||
* [[Prime]]s 11 and 13 are much more accurate | * [[Prime]]s 11 and 13 are much more accurate | ||
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22ed7/4's mapping of prime 2 is very inconsistent. This might not necessarily be a bad thing, as it might allow for the perceived [[octave equivalence]] to fall on different scale degrees each octave or two. This could make each perceived octave sound different to the last, which may make the music more interesting to listen to in the hands of a skilled composer. | 22ed7/4's mapping of prime 2 is very inconsistent. This might not necessarily be a bad thing, as it might allow for the perceived [[octave equivalence]] to fall on different scale degrees each octave or two. This could make each perceived octave sound different to the last, which may make the music more interesting to listen to in the hands of a skilled composer. | ||
Possible [[JI subgroup]]s for interpreting 22ed7/4 could be: | |||
* 2.3.5.7/2.11.13 | |||
or | |||
* 2.3.5.14.11.13 | |||
Though other interpretations could be possible as well. | |||
{{Harmonics in equal | {{Harmonics in equal | ||
| steps = 22 | | steps = 22 | ||