Ed5/4: Difference between revisions
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5/4 is particularly narrow as far as equivalences go and it is difficult to fit consonant chords in it, so we might consider using 5/4<sup>2</sup> = [[25/16]] as the equivalence instead. | 5/4 is particularly narrow as far as equivalences go and it is difficult to fit consonant chords in it, so we might consider using 5/4<sup>2</sup> = [[25/16]] as the equivalence instead. | ||
== Individual pages for ED5/4s == | |||
* 2 - [[2ed5/4|Square Root of 5/4]] | * 2 - [[2ed5/4|Square Root of 5/4]] | ||
* 3 - [[3ed5/4|Cube Root of 5/4]] | * 3 - [[3ed5/4|Cube Root of 5/4]] | ||
Revision as of 00:48, 5 March 2023
Ed5/4 means Division of the Just Major Third (5/4) into n equal parts.
Division of the just major third into n equal parts
Division of the 5:4 into equal parts can be conceived of as to directly use this interval as an equivalence, or not. The question of equivalence is still in its infancy. The utility of 5:4 as a base though, is apparent by providing a novel consonance after 3, and being the basis for 5-limit harmony. Many, if not all, of these scales have a perceptually important pseudo (false) octave, with various degrees of accuracy.
5/4 is particularly narrow as far as equivalences go and it is difficult to fit consonant chords in it, so we might consider using 5/42 = 25/16 as the equivalence instead.
Individual pages for ED5/4s
- 2 - Square Root of 5/4
- 3 - Cube Root of 5/4
- 4 - Fourth Root of 5/4
- 5 - Fifth Root of 5/4
- 6 - Sixth Root of 5/4
- 7 - Seventh Root of 5/4
- 17 - 17th Root of 5/4
- 19 - 19th Root of 5/4
- 36 - 36th Root of 5/4