52edf: Difference between revisions

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'''[[EDF|Division of the just perfect fifth]] into 52 equal parts''' (52EDF) is related to [[89edo~~|89 edo~~]], but with the 3/2 rather than the 2/1 being just. The octave is about 1.4230 cents stretched and the step size is about 13.4991 cents. Unlike 89edo, it is only consistent up to the [[~~3-odd-limit|4-~~integer-limit]], with discrepancy for the 5th harmonic.

'''[[EDF|Division of the just perfect fifth]] into 52 equal parts''' (52EDF) is related to [[89edo]], but with the [[3/2]] rather than the [[2/1]] being [[just]]. The octave is about 1.4230 [[cents]] stretched and the step size is about 13.4991 cents.

Unlike 89edo, it is only [[consistent]] up to the 4-[[integer-limit]], with discrepancy for the 5th harmonic.

Lookalikes: [[89edo]], [[141edt]]

~~[[Category:Edf]]~~

== Harmonics ==

~~[[Category:Edonoi]]~~

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-'''[[EDF|Division of the just perfect fifth]] into 52 equal parts''' (52EDF) is related to [[89edo|89 edo]], but with the 3/2 rather than the 2/1 being just. The octave is about 1.4230 cents stretched and the step size is about 13.4991 cents. Unlike 89edo, it is only consistent up to the [[3-odd-limit|4-integer-limit]], with discrepancy for the 5th harmonic.
+{{Infobox ET}}
+'''[[EDF|Division of the just perfect fifth]] into 52 equal parts''' (52EDF) is related to [[89edo]], but with the [[3/2]] rather than the [[2/1]] being [[just]]. The octave is about 1.4230 [[cents]] stretched and the step size is about 13.4991 cents.
+Unlike 89edo, it is only [[consistent]] up to the 4-[[integer-limit]], with discrepancy for the 5th harmonic.
 Lookalikes: [[89edo]], [[141edt]]
-[[Category:Edf]]
+== Harmonics ==
-[[Category:Edonoi]]
+{{Harmonics in equal|52|3|2|intervals=prime}}
+{{todo|expand}}