4973edo: Difference between revisions

Revision as of 22:19, 4 October 2022

Prime factorization

4973 (prime)

Step size

0.241303 ¢

Fifth

2909\4973 (701.951 ¢)

Semitones (A1:m2)

471:374 (113.7 ¢ : 90.25 ¢)

Consistency limit

11

Distinct consistency limit

11

4973edo divides the octave into 4973 parts that are approximately .241303...¢ each. It is a very strong 7-limit system: it tempers out an unnoticeable comma [1 -15 -18 23⟩ and supports a number of very high accuracy 7-limit rank-3 temperaments. In the 5-limit it supports whoosh, i.e. the 441&730 temperament.

Script error: No such module "primes_in_edo".

Revision as of 01:33, 4 July 2022 view source Fredg999 category edits (talk \| contribs) autopatrolled, Bots, emailconfirmed 4,330 edits m Sort key ← Older edit		Revision as of 22:19, 4 October 2022 view source Plumtree (talk \| contribs) autopatrolled, emailconfirmed 1,976 edits m Infobox ET added Newer edit →
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			{{Infobox ET}}
	'''4973edo''' divides the octave into 4973 parts that are approximately .241303...¢ each. It is a very strong [[7-limit]] system: it tempers out an [[unnoticeable comma]] {{monzo\|1 -15 -18 23}} and supports a number of [[very high accuracy temperaments\|very high accuracy 7-limit rank-3 temperaments]]. In the 5-limit it [[support]]s [[very high accuracy temperaments#Whoosh\|whoosh]], i.e. the [[441edo\|441]]&[[730edo\|730]] temperament.		'''4973edo''' divides the octave into 4973 parts that are approximately .241303...¢ each. It is a very strong [[7-limit]] system: it tempers out an [[unnoticeable comma]] {{monzo\|1 -15 -18 23}} and supports a number of [[very high accuracy temperaments\|very high accuracy 7-limit rank-3 temperaments]]. In the 5-limit it [[support]]s [[very high accuracy temperaments#Whoosh\|whoosh]], i.e. the [[441edo\|441]]&[[730edo\|730]] temperament.