260edo: Difference between revisions

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{{Infobox ET

~~| Prime factorization~~ = ~~2<sup>2</sup> × 5 × 13~~

| ~~Step size = 4~~.~~61538¢~~

| ~~Fifth = 152\260 (701~~.~~54¢) (→~~ [[~~65edo~~|~~38\65~~]])

== Theory ==

~~| Major 2nd~~ = ~~44\130 (203.08¢)~~

260edo is [[enfactoring|enfactored]] in the [[7-limit]], with the same tuning as [[65edo]] in the 5-limit, and the same as [[130edo]] in the 7-limit. The mappings for [[harmonic]]s [[11/1|11]] and [[17/1|17]] differ, but 260edo's are hardly an improvement over 130edo's. [[29/1|29]] is the first harmonic that is offered as a sizeable improvement over 130edo. In the 2.3.5.7.29 subgroup, 260edo tempers out 841/840, 16820/16807, and 47096/46875.

}}

=== Prime harmonics ===

== Scales ==

* Kartvelian Tetradecatonic: 18 18 18 18 18 18 19 19 19 19 19 19 19 19

@@ Line 1: / Line 1: @@
-{{Infobox ET
+{{Infobox ET}}
-| Prime factorization = 2<sup>2</sup> × 5 × 13
+{{ED intro}}
-| Step size = 4.61538¢
-| Fifth = 152\260 (701.54¢) (→ [[65edo|38\65]])
+== Theory ==
-| Major 2nd = 44\130 (203.08¢)
+edo is [[enfactoring|enfactored]] in the [[7-limit]], with the same tuning as [[65edo]] in the 5-limit, and the same as [[130edo]] in the 7-limit. The mappings for [[harmonic]]s [[11/1|11]] and [[17/1|17]] differ, but 260edo's are hardly an improvement over 130edo's. [[29/1|29]] is the first harmonic that is offered as a sizeable improvement over 130edo. In the 2.3.5.7.29 subgroup, 260edo tempers out 841/840, 16820/16807, and 47096/46875.
-}}
-{{EDO intro|260}}
+=== Prime harmonics ===
+{{Harmonics in equal|260}}
+== Scales ==
+* Kartvelian Tetradecatonic: 18 18 18 18 18 18 19 19 19 19 19 19 19 19