17461edo: Difference between revisions
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{{Infobox ET|Consistency=45|Distinct consistency=45}} | |||
'''17461edo''' is a remarkable very high limit equal temperament, [[EDO|dividing the octave equally]] into 17461 parts of 0.0687246 [[cent]]s each. It is [[consistent]] through the [[45-odd-limit|45-limit]] distinctly, tempering out 33670/33669, 67425/67424, 81549/81548, 101270/101269, 115885/115884, 120745/120744, 127281/127280, 203320/203319, 355725/355718, 728365/728364, 730639/730620, 2942775/2942758, and 7172253/7172228 in the 43-limit. | '''17461edo''' is a remarkable very high limit equal temperament, [[EDO|dividing the octave equally]] into 17461 parts of 0.0687246 [[cent]]s each. It is [[consistent]] through the [[45-odd-limit|45-limit]] distinctly, tempering out 33670/33669, 67425/67424, 81549/81548, 101270/101269, 115885/115884, 120745/120744, 127281/127280, 203320/203319, 355725/355718, 728365/728364, 730639/730620, 2942775/2942758, and 7172253/7172228 in the 43-limit. | ||
[[Category:Equal divisions of the octave|#####]] <!-- 5-digit number --> | [[Category:Equal divisions of the octave|#####]] <!-- 5-digit number --> | ||
Revision as of 20:56, 4 October 2022
| ← 17460edo | 17461edo | 17462edo → |
17461edo is a remarkable very high limit equal temperament, dividing the octave equally into 17461 parts of 0.0687246 cents each. It is consistent through the 45-limit distinctly, tempering out 33670/33669, 67425/67424, 81549/81548, 101270/101269, 115885/115884, 120745/120744, 127281/127280, 203320/203319, 355725/355718, 728365/728364, 730639/730620, 2942775/2942758, and 7172253/7172228 in the 43-limit.