Highly composite EDO: Difference between revisions

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Highly melodic EDOs are a set of superabundant EDOs and highly composite EDOs banded together. They are the equal division scales with a [[Wikipedia:Superabundant number|superabundant]] or a [[Wikipedia:Highly composite number|highly composite number]] of pitches in an octave. They can be seen as the opposite of [[Prime EDO]]~~<nowiki/>~~s.

Highly melodic EDOs are a set of superabundant EDOs and highly composite EDOs banded together. They are the equal division scales with a [[Wikipedia:Superabundant number|superabundant]] or a [[Wikipedia:Highly composite number|highly composite number]] of pitches in an octave. They can be seen as the opposite of [[Prime EDO]]s.

The difference between SA and HC is the following: the highly composite numbers count the amount of divisors, that is sub-EDOs, going to a record., while superabundant ~~edos~~ count the amount of note in those divisors if they were stretched end-to-end.

The difference between SA and HC is the following: the highly composite numbers count the amount of divisors, that is sub-EDOs, going to a record., while superabundant EDOs count the amount of note in those divisors if they were stretched end-to-end.

The first 19 superabundant and highly composite numbers are the same.

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== External links ==

* https://oeis.org/A004394 - superabundant numbers

* https://oeis.org/A002182 - highly composite numbers

[[Category:EDO]]

[[Category:Theory]]

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-Highly melodic EDOs are a set of superabundant EDOs and highly composite EDOs banded together. They are the equal division scales with a [[Wikipedia:Superabundant number|superabundant]] or a [[Wikipedia:Highly composite number|highly composite number]] of pitches in an octave. They can be seen as the opposite of [[Prime EDO]]<nowiki/>s.
+Highly melodic EDOs are a set of superabundant EDOs and highly composite EDOs banded together. They are the equal division scales with a [[Wikipedia:Superabundant number|superabundant]] or a [[Wikipedia:Highly composite number|highly composite number]] of pitches in an octave. They can be seen as the opposite of [[Prime EDO]]s.
-The difference between SA and HC is the following: the highly composite numbers count the amount of divisors, that is sub-EDOs, going to a record., while superabundant edos count the amount of note in those divisors if they were stretched end-to-end.
+The difference between SA and HC is the following: the highly composite numbers count the amount of divisors, that is sub-EDOs, going to a record., while superabundant EDOs count the amount of note in those divisors if they were stretched end-to-end.
 The first 19 superabundant and highly composite numbers are the same.
@@ Line 35: / Line 35: @@
 == External links ==
 * https://oeis.org/A004394 - superabundant numbers
 * https://oeis.org/A002182 - highly composite numbers
+[[Category:EDO]]
+[[Category:Theory]]