10edo: Difference between revisions

Line 16:

== Theory ==

{| ~~class~~=~~"wikitable center-all"~~

~~! colspan="2" | ~~

~~! prime 2~~

~~! prime 3~~

~~! prime 5~~

~~! prime 7~~

~~! prime 11~~

~~! prime 13~~

~~! prime 17~~

|-

~~! rowspan="2" |Error~~

~~! absolute (¢)~~

~~| 0.0~~

~~| +18.0~~

~~| -26.3~~

~~| -8.8~~

~~| +48.7~~

~~| -0.5~~

~~| +12.5~~

|-

~~! [[Relative error|relative]] (%)~~

~~| 0~~

~~| +15~~

~~| -22~~

~~| -7~~

~~| +41~~

~~| -0~~

~~| +15~~

|-

~~! colspan="2" | [[nearest edomapping]]~~

| 10

~~| 6~~

~~| 3~~

~~| 8~~

~~| 5~~

~~| 7~~

~~| 1~~

|}

10edo can be thought of as two circles of [[5edo]] separated by 120 cents (or 5 circles of [[2edo]]). It adds to 5edo a small neutral second (or large minor 2nd) and its inversion a large neutral seventh (or small major 7th); an excellent approximation of [[13/8]] and its inversion [[16/13]]; and the happy 600-cent tritone that appears in every even-numbered EDO. Taking the the 360 cent large neutral third as a generator produces a heptatonic [[MOS scales|moment of symmetry scale]] of the form 1 2 1 2 1 2 1 ([[3L_4s|3L 4s - mosh]]). While not an integral or gap edo, it is a [[The_Riemann_Zeta_Function_and_Tuning#Zeta EDO lists|zeta peak edo]]. One way to interpret it in terms of a temperament of Just intonation is as a 2.7.13.15 subgroup, such that 105/104, 225/224, and 16807/16384 are tempered out. It can also be treated as a full 13-limit temperament, but it is a closer match to the aforementioned subgroup.

@@ Line 16: / Line 16: @@
 == Theory  ==
-{| class="wikitable center-all"
+{{Odd harmonics in edo|edo=10}}
-! colspan="2" | <!-- empty cell -->
-! prime 2
-! prime 3
-! prime 5
-! prime 7
-! prime 11
-! prime 13
-! prime 17
-|-
-! rowspan="2" |Error
-! absolute (¢)
-| 0.0
-| +18.0
-| -26.3
-| -8.8
-| +48.7
-| -0.5
-| +12.5
-|-
-! [[Relative error|relative]] (%)
-| 0
-| +15
-| -22
-| -7
-| +41
-| -0
-| +15
-|-
-! colspan="2" | [[nearest edomapping]]
-| 10
-| 6
-| 3
-| 8
-| 5
-| 7
-| 1
-|}
 edo can be thought of as two circles of [[5edo]] separated by 120 cents (or 5 circles of [[2edo]]). It adds to 5edo a small neutral second (or large minor 2nd) and its inversion a large neutral seventh (or small major 7th); an excellent approximation of [[13/8]] and its inversion [[16/13]]; and the happy 600-cent tritone that appears in every even-numbered EDO. Taking the the 360 cent large neutral third as a generator produces a heptatonic [[MOS scales|moment of symmetry scale]] of the form 1 2 1 2 1 2 1 ([[3L_4s|3L 4s - mosh]]). While not an integral or gap edo, it is a [[The_Riemann_Zeta_Function_and_Tuning#Zeta EDO lists|zeta peak edo]]. One way to interpret it in terms of a temperament of Just intonation is as a 2.7.13.15 subgroup, such that 105/104, 225/224, and 16807/16384 are tempered out. It can also be treated as a full 13-limit temperament, but it is a closer match to the aforementioned subgroup.