49edf: Difference between revisions

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~~'''49EDF''' is the [[EDF|equal division of the just perfect fifth]] into 49 parts of 14.3256 [[cent|cents]] each, corresponding~~ to 83.7661 [[edo]] (similar to every fourth step of [[335edo]]).

49edf corresponds to 83.7661[[edo]], similar to every fourth step of [[335edo]]. It is related to the [[temperament]] which [[tempering out|tempers out]] {{monzo| 71 27 -49 }} in the [[5-limit]], which is supported by {{EDOs| 83-, 84-, 167-, 251-, 335-, 419-, 503-, and 586edo }}.

Lookalikes: [[84edo]], [[133edt]]

[[~~Category:Edf~~]]

=== Harmonics ===

[[~~Category:Edonoi~~]]

[[Subgroup]]s 49edf performs well on include the no-5s [[31-limit]], the [[Dual-n|dual-5]] 31-limit, and any subsets thereof.

{{Harmonics in equal|49|3|2|intervals=prime|columns=7|start=8|collapsed=true|title=Approximation of prime harmonics in 49edf (continued)}}

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-'''49EDF''' is the [[EDF|equal division of the just perfect fifth]] into 49 parts of 14.3256 [[cent|cents]] each, corresponding to 83.7661 [[edo]] (similar to every fourth step of [[335edo]]).
+{{Infobox ET}}
+{{ED intro}}
+edf corresponds to 83.7661[[edo]], similar to every fourth step of [[335edo]]. It is related to the [[temperament]] which [[tempering out|tempers out]] {{monzo| 71 27 -49 }} in the [[5-limit]], which is supported by {{EDOs| 83-, 84-, 167-, 251-, 335-, 419-, 503-, and 586edo }}.
 Lookalikes: [[84edo]], [[133edt]]
-[[Category:Edf]]
+=== Harmonics ===
-[[Category:Edonoi]]
+[[Subgroup]]s 49edf performs well on include the no-5s [[31-limit]], the [[Dual-n|dual-5]] 31-limit, and any subsets thereof.
+{{Harmonics in equal|49|3|2|intervals=prime|columns=7}}
+{{Harmonics in equal|49|3|2|intervals=prime|columns=7|start=8|collapsed=true|title=Approximation of prime harmonics in 49edf (continued)}}
+{{Todo|expand}}