Prime EDO: Difference between revisions

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~~A '''prime edo''' is an [[edo]] with a [[prime number]] of different pitches per [[octave]].~~

#REDIRECT [[Prime equal division]]

~~== Prime numbers in edos ==~~

~~Whether or not a number ''n'' is prime has important consequences for the properties of the corresponding ''n''-[[edo]], especially for lower values of ''n''. In these instances:~~

* There is ''no fully symmetric chord'' (such as the diminished seventh chord in [[12edo]])

* Excepting the scale comprising all notes of the edo, there is ''no absolutely uniform, octave-repeating scale'' (such as the whole tone scale in 12edo)

* There are no [[Wikipedia: Modes of limited transposition|modes of limited transposition]], such as used by the composer Olivier Messiaen

* There is no support for rank-2 temperaments whose period is a fraction of the octave (all such temperaments are ''linear'' temperaments)

* Making a chain of any interval of the ''n''-edo, one can reach every tone in ''n'' steps. (For composite edos, this works with intervals that are co-prime to ''n'', for example, 5 degrees of 12edo)

~~For these or similar reasons, some musicians do not like prime edos (e.g. the makers of [http://www.armodue.com/risorse.htm Armodue]) and others love them.~~

Primality may be desirable if you want, for example, a whole tone scale that is ''not'' absolutely uniform. In this case you might like [[19edo]] (with whole tone scale 3 3 3 3 3 4, [[mos scale]] of type [[1L 5s]]) or [[17edo]] (with whole tone scale 3 3 3 3 3 2, MOS scale of type [[5L 1s]]). In general, making a chain of any interval of a prime ''n''-edo, thus treating the interval as the generator of a mos scale, one can reach every tone in ''n'' steps. For composite edos, this will only work with intervals that are co-prime to the edo, for example 5 degrees of [[12edo]] (which generates the diatonic scale and a cycle of fifths that closes at 12 tones) but not 4 out of 12 (which generates a much smaller cycle of [[3edo]]).

A prime edo is useful for avoiding intervals and patterns that are familiar-sounding due to their occurrence in 12edo. Since 12 is 2 × 2 × 3, it contains [[2edo]], 3edo, [[4edo]] and [[6edo]]. All edos with a 2, 3, 4, or 6 in their factorization will share at least one interval with 12edo, if not a whole chord or subset scale. Of course, if the goal is simply to avoid intervals of 12, then non-prime edos which don't have a 2, 3, 4, or 6 in their factorization, such as [[35edo]], will work just as well for this purpose.

If you like a certain edo for its intervals or other reasons, but do not like its primality or non-primality, choosing another equivalence interval, such as the [[EDT|tritave (3/1)]] instead of the octave, can be an option. For example, [[27edt]] is a non-prime system very similar to 17edo, while [[19edt|19edt (Stopper tuning)]] is a prime system very similar to the ubiquitous 12edo. (See [[EDT #~~EDT-EDO correspondence|edt-edo correspondence]] for more of these.) Anyway, for every prime edo system there is a non-prime [[ed4]] system with identical step sizes.~~

~~The larger ''n'' is, the less these points matter, since the difference between an ''absolutely'' uniform scale and an approximated, ''nearly'' uniform scale eventually become inaudible.~~

~~The opposite of a prime EDO is a [[highly melodic EDO]].~~

~~== The first 46 prime edos ==~~

Multiples of an edo, including multiples of a prime edo, can inherit properties from that edo, in particular a tuning for certain intervals. A multiple however is by definition more complex; a prime edo is always the least complex edo divisible by that prime, and these are listed below:

~~[[2edo|2]], [[3edo|3]], [[5edo|5]], [[7edo|7]], [[11edo|11]], [[13edo|13]], [[17edo|17]], [[19edo|19]], ~~

~~[[23edo|23]], [[29edo|29]], [[31edo|31]], [[37edo|37]], [[41edo|41]], [[43edo|43]], [[47edo|47]], [[53edo|53]], ~~

~~[[59edo|59]], [[61edo|61]], [[67edo|67]], [[71edo|71]], [[73edo|73]], [[79edo|79]], [[83edo|83]], [[89edo|89]], ~~

~~[[97edo|97]], [[101edo|101]], [[103edo|103]], [[107edo|107]], [[109edo|109]], [[113edo|113]], [[127edo|127]], [[131edo|131]], ~~

~~[[137edo|137]], [[139edo|139]], [[149edo|149]], [[151edo|151]], [[157edo|157]], [[163edo|163]], [[167edo|167]], [[173edo|173]], ~~

~~[[179edo|179]], [[181edo|181]], [[191edo|191]], [[193edo|193]], [[197edo|197]], [[199edo|199]].~~

~~[[Category:EDO theory pages]]~~

~~[[Category:Prime EDO| ]] ~~

[[~~Category:~~Prime]]

@@ Line 1: / Line 1: @@
-A '''prime edo''' is an [[edo]] with a [[prime number]] of different pitches per [[octave]].
+#REDIRECT [[Prime equal division]]
-== Prime numbers in edos ==
-Whether or not a number ''n'' is prime has important consequences for the properties of the corresponding ''n''-[[edo]], especially for lower values of ''n''. In these instances:
-* There is ''no fully symmetric chord'' (such as the diminished seventh chord in [[12edo]])
-* Excepting the scale comprising all notes of the edo, there is ''no absolutely uniform, octave-repeating scale'' (such as the whole tone scale in 12edo)
-* There are no [[Wikipedia: Modes of limited transposition|modes of limited transposition]], such as used by the composer Olivier Messiaen
-* There is no support for rank-2 temperaments whose period is a fraction of the octave (all such temperaments are ''linear'' temperaments)
-* Making a chain of any interval of the ''n''-edo, one can reach every tone in ''n'' steps. (For composite edos, this works with intervals that are co-prime to ''n'', for example, 5 degrees of 12edo)
-For these or similar reasons, some musicians do not like prime edos (e.g. the makers of [http://www.armodue.com/risorse.htm Armodue]) and others love them.
-Primality may be desirable if you want, for example, a whole tone scale that is ''not'' absolutely uniform. In this case you might like [[19edo]] (with whole tone scale 3 3 3 3 3 4, [[mos scale]] of type [[1L 5s]]) or [[17edo]] (with whole tone scale 3 3 3 3 3 2, MOS scale of type [[5L 1s]]). In general, making a chain of any interval of a prime ''n''-edo, thus treating the interval as the generator of a mos scale, one can reach every tone in ''n'' steps. For composite edos, this will only work with intervals that are co-prime to the edo, for example 5 degrees of [[12edo]] (which generates the diatonic scale and a cycle of fifths that closes at 12 tones) but not 4 out of 12 (which generates a much smaller cycle of [[3edo]]).
-A prime edo is useful for avoiding intervals and patterns that are familiar-sounding due to their occurrence in 12edo. Since 12 is 2 × 2 × 3, it contains [[2edo]], 3edo, [[4edo]] and [[6edo]]. All edos with a 2, 3, 4, or 6 in their factorization will share at least one interval with 12edo, if not a whole chord or subset scale. Of course, if the goal is simply to avoid intervals of 12, then non-prime edos which don't have a 2, 3, 4, or 6 in their factorization, such as [[35edo]], will work just as well for this purpose.
-If you like a certain edo for its intervals or other reasons, but do not like its primality or non-primality, choosing another equivalence interval, such as the [[EDT|tritave (3/1)]] instead of the octave, can be an option. For example, [[27edt]] is a non-prime system very similar to 17edo, while [[19edt|19edt (Stopper tuning)]] is a prime system very similar to the ubiquitous 12edo. (See [[EDT #EDT-EDO correspondence|edt-edo correspondence]] for more of these.) Anyway, for every prime edo system there is a non-prime [[ed4]] system with identical step sizes.
-The larger ''n'' is, the less these points matter, since the difference between an ''absolutely'' uniform scale and an approximated, ''nearly'' uniform scale eventually become inaudible.
-The opposite of a prime EDO is a [[highly melodic EDO]].
-== The first 46 prime edos ==
-Multiples of an edo, including multiples of a prime edo, can inherit properties from that edo, in particular a tuning for certain intervals. A multiple however is by definition more complex; a prime edo is always the least complex edo divisible by that prime, and these are listed below:
-[[2edo|2]], [[3edo|3]], [[5edo|5]], [[7edo|7]], [[11edo|11]], [[13edo|13]], [[17edo|17]], [[19edo|19]], <br>
-[[23edo|23]], [[29edo|29]], [[31edo|31]], [[37edo|37]], [[41edo|41]], [[43edo|43]], [[47edo|47]], [[53edo|53]], <br>
-[[59edo|59]], [[61edo|61]], [[67edo|67]], [[71edo|71]], [[73edo|73]], [[79edo|79]], [[83edo|83]], [[89edo|89]], <br>
-[[97edo|97]], [[101edo|101]], [[103edo|103]], [[107edo|107]], [[109edo|109]], [[113edo|113]], [[127edo|127]], [[131edo|131]], <br>
-[[137edo|137]], [[139edo|139]], [[149edo|149]], [[151edo|151]], [[157edo|157]], [[163edo|163]], [[167edo|167]], [[173edo|173]], <br>
-[[179edo|179]], [[181edo|181]], [[191edo|191]], [[193edo|193]], [[197edo|197]], [[199edo|199]].
-[[Category:EDO theory pages]]
-[[Category:Prime EDO| ]] <!-- main article -->
-[[Category:Prime]]