6edo: Difference between revisions

Line 5:

| ja = 6平均律

}}

'''6 equal divisions of the octave''' ('''6EDO''') is the [[tuning system]] derived by dividing the [[octave]] into 6 equal steps of 200 [[cent]]s each, or the sixth root of 2. It is also known as the "whole tone" scale. As a subset of [[12edo|12EDO]], it can be notated on a five-line staff with standard notation. It is the first EDO that is not a [[The_Riemann_zeta_function_and_tuning #Zeta_EDO_lists|zeta peak]], has lower [[Consistency_levels_of_small_EDOs|consistency]] than the one that precedes it, and the highest EDO that has no single period mode of symmetry scales other than using the single step as a generator. This means it is relatively poor for it's size at creating traditional tonal music, with 5EDO and 7EDO both having much better representations of the third harmonic, but has still seen more use than most EDOs other than 12, since it can be played on any 12 tone instrument.

'''6 equal divisions of the octave''' ('''6EDO''') is the [[tuning system]] derived by dividing the [[octave]] into 6 equal steps of 200 [[cent]]s each, or the sixth root of 2. It is also known as the '''whole tone scale'''. As a subset of [[12edo|12EDO]], it can be notated on a five-line staff with standard notation. It is the first EDO that is not a [[The_Riemann_zeta_function_and_tuning #Zeta_EDO_lists|zeta peak]], has lower [[Consistency_levels_of_small_EDOs|consistency]] than the one that precedes it, and the highest EDO that has no single period mode of symmetry scales other than using the single step as a generator. This means it is relatively poor for it's size at creating traditional tonal music, with 5EDO and 7EDO both having much better representations of the third harmonic, but has still seen more use than most EDOs other than 12, since it can be played on any 12 tone instrument.

== Theory ==

@@ Line 5: / Line 5: @@
 | ja = 6平均律
 }}
-'''6 equal divisions of the octave''' ('''6EDO''') is the [[tuning system]] derived by dividing the [[octave]] into 6 equal steps of 200 [[cent]]s each, or the sixth root of 2. It is also known as the "whole tone" scale. As a subset of [[12edo|12EDO]], it can be notated on a five-line staff with standard notation. It is the first EDO that is not a [[The_Riemann_zeta_function_and_tuning #Zeta_EDO_lists|zeta peak]], has lower [[Consistency_levels_of_small_EDOs|consistency]] than the one that precedes it, and the highest EDO that has no single period mode of symmetry scales other than using the single step as a generator. This means it is relatively poor for it's size at creating traditional tonal music, with 5EDO and 7EDO both having much better representations of the third harmonic, but has still seen more use than most EDOs other than 12, since it can be played on any 12 tone instrument.
+'''6 equal divisions of the octave''' ('''6EDO''') is the [[tuning system]] derived by dividing the [[octave]] into 6 equal steps of 200 [[cent]]s each, or the sixth root of 2. It is also known as the '''whole tone scale'''. As a subset of [[12edo|12EDO]], it can be notated on a five-line staff with standard notation. It is the first EDO that is not a [[The_Riemann_zeta_function_and_tuning #Zeta_EDO_lists|zeta peak]], has lower [[Consistency_levels_of_small_EDOs|consistency]] than the one that precedes it, and the highest EDO that has no single period mode of symmetry scales other than using the single step as a generator. This means it is relatively poor for it's size at creating traditional tonal music, with 5EDO and 7EDO both having much better representations of the third harmonic, but has still seen more use than most EDOs other than 12, since it can be played on any 12 tone instrument.
 == Theory ==