901edo: Difference between revisions

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~~'''901edo''' is the [[~~EDO|~~equal division of the octave]] into~~ 901 ~~parts of 1.33185 [[cent]]s each.~~

~~== Theory ==~~

901edo is [[consistent]] to the 15-odd-limit, tempering out {{monzo| -16 35 -17 }} (minortonic comma) and {{monzo| -68 18 17 }} (vavoom comma) in the 5-limit; [[4375/4374]], [[2100875/2097152]], and 12401793332096/12359619140625 in the 7-limit; [[41503/41472]], 160083/160000, 234375/234256, and 806736/805255 in the 11-limit; [[4225/4224]], 4459/4455, [[6656/6655]], 34398/34375, and 50421/50336 in the 13-limit, supporting [[mitonic]], [[vavoom]], and [[egads]].

It is [[consistent]] to the 15-odd-limit, tempering out {{monzo| -16 35 -17 }} (minortonic comma) and {{monzo| -68 18 17 }} (vavoom comma) in the 5-limit; [[4375/4374]], [[2100875/2097152]], and 12401793332096/12359619140625 in the 7-limit; [[41503/41472]], 160083/160000, 234375/234256, and 806736/805255 in the 11-limit; [[4225/4224]], 4459/4455, [[6656/6655]], 34398/34375, and 50421/50336 in the 13-limit, supporting [[mitonic]], [[vavoom]], and [[egads]].

~~901 is 17 × 53. In light of contaning 17edo and 53edo as subsets, it supports the [[chlorine]] temperament, which has period 17, and [[iodine]] temperament, which has period 53~~.

=== Prime harmonics ===

=== Divisors ===

901 is 17 × 53. In light of contaning 17edo and 53edo as subsets, it supports the [[chlorine]] temperament, which has period 17, and [[iodine]] temperament, which has period 53.

[[Category:Equal divisions of the octave|###]]

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 {{Infobox ET}}
-'''901edo''' is the [[EDO|equal division of the octave]] into 901 parts of 1.33185 [[cent]]s each.
+{{EDO intro|901}}
-== Theory ==
+edo is [[consistent]] to the 15-odd-limit, tempering out {{monzo| -16 35 -17 }} (minortonic comma) and {{monzo| -68 18 17 }} (vavoom comma) in the 5-limit; [[4375/4374]], [[2100875/2097152]], and 12401793332096/12359619140625 in the 7-limit; [[41503/41472]], 160083/160000, 234375/234256, and 806736/805255 in the 11-limit; [[4225/4224]], 4459/4455, [[6656/6655]], 34398/34375, and 50421/50336 in the 13-limit, supporting [[mitonic]], [[vavoom]], and [[egads]].
-It is [[consistent]] to the 15-odd-limit, tempering out {{monzo| -16 35 -17 }} (minortonic comma) and {{monzo| -68 18 17 }} (vavoom comma) in the 5-limit; [[4375/4374]], [[2100875/2097152]], and 12401793332096/12359619140625 in the 7-limit; [[41503/41472]], 160083/160000, 234375/234256, and 806736/805255 in the 11-limit; [[4225/4224]], 4459/4455, [[6656/6655]], 34398/34375, and 50421/50336 in the 13-limit, supporting [[mitonic]], [[vavoom]], and [[egads]].
-is 17 × 53. In light of contaning 17edo and 53edo as subsets, it supports the [[chlorine]] temperament, which has period 17, and [[iodine]] temperament, which has period 53.
 === Prime harmonics ===
 {{Harmonics in equal|901|columns=11}}
+=== Divisors ===
+is 17 × 53. In light of contaning 17edo and 53edo as subsets, it supports the [[chlorine]] temperament, which has period 17, and [[iodine]] temperament, which has period 53.
 [[Category:Equal divisions of the octave|###]]<!-- 3-digit number -->