682edo: Difference between revisions

682edo is consistent in the 9-odd-limit, with a sharp tendency for 3, 5, and 7. In the 7-limit, 682edo supports the septisemitonic temperament, described as the 128 & 142 temperament. It is a tuning for the major arcana temperament in the 7-limit. It also shares the mapping for 5 with 31edo, tempering out the [72 0 -31⟩ comma.

Beyond that, 682edo is a strong 2.3.19.23 subgroup tuning.

Odd harmonics

Approximation of odd harmonics in 682edo
Harmonic		3	5	7	9	11	13	15	17	19	21	23
Error	Absolute (¢)	+0.098	+0.783	+0.676	+0.196	-0.585	+0.528	-0.879	+0.616	-0.152	+0.773	-0.122
Error	Relative (%)	+5.6	+44.5	+38.4	+11.1	-33.2	+30.0	-49.9	+35.0	-8.7	+44.0	-6.9
Steps (reduced)		1081 (399)	1584 (220)	1915 (551)	2162 (116)	2359 (313)	2524 (478)	2664 (618)	2788 (60)	2897 (169)	2996 (268)	3085 (357)

Subsets and supersets

682edo factors as 2 × 11 × 31, so it notably contains 22edo and 31edo.

@@ Line 2: / Line 2: @@
 {{EDO intro|682}}
-edo is [[consistent]] in the [[9-odd-limit]]. In the 7-limit, 682edo [[support]]s the [[septisemitonic]] temperament, described as the 128 & 142 temperament. It is a tuning for the [[major arcana]] temperament in the 5-limit, dividing the octave into 22 parts, and supports an alternative 7-limit extension to it. It also shares the mapping for [[5/1|5]] with [[31edo]], tempering out the {{monzo|72 0 -31}} comma.
+edo is [[consistent]] in the [[9-odd-limit]], with a sharp tendency for [[3/1|3]], [[5/1|5]], and [[7/1|7]]. In the 7-limit, 682edo [[support]]s the [[septisemitonic]] temperament, described as the 128 & 142 temperament. It is a tuning for the [[major arcana]] temperament in the 7-limit. It also shares the mapping for [[5/1|5]] with [[31edo]], tempering out the {{monzo|72 0 -31}} comma.
 Beyond that, 682edo is a strong 2.3.19.23 subgroup tuning.

682edo: Difference between revisions

Revision as of 20:03, 8 November 2023

Odd harmonics

Subsets and supersets

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