496edo: Difference between revisions

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496edo

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Prime factorization

2⁴ × 31

Step size

2.41935 ¢

Fifth

290\496 (701.613 ¢) (→ 145\248)

Semitones (A1:m2)

46:38 (111.3 ¢ : 91.94 ¢)

Consistency limit

5

Distinct consistency limit

5

496 equal divisions of the octave (abbreviated 496edo or 496ed2), also called 496-tone equal temperament (496tet) or 496 equal temperament (496et) when viewed under a regular temperament perspective, is the tuning system that divides the octave into 496 equal parts of about 2.42 ¢ each. Each step represents a frequency ratio of 2^1/496, or the 496th root of 2.

496edo is enfactored in the 11-limit, with the same tuning as 248edo, but the patent vals differ on the mapping for 13. As such, in the 11-limit it supports a compound of two chains of 11-limit bischismic temperaments. In the 13-limit patent val, it tempers out 4225/4224.

496edo is good with the 2.3.11.19 subgroup. For higher limits, it has good approximations of 31, 37, and 47. In the 2.3.11.19 subgroup, it tempers out 131072/131043.

Odd harmonics

Approximation of odd harmonics in 496edo
Harmonic		3	5	7	9	11	13	15	17	19	21	23
Error	Absolute (¢)	-0.34	+0.78	-1.08	-0.68	+0.29	-1.01	+0.44	-0.92	+0.07	+0.99	+0.76
Error	Relative (%)	-14.1	+32.4	-44.8	-28.3	+12.2	-41.8	+18.2	-38.2	+2.8	+41.1	+31.3
Steps (reduced)		786 (290)	1152 (160)	1392 (400)	1572 (84)	1716 (228)	1835 (347)	1938 (450)	2027 (43)	2107 (123)	2179 (195)	2244 (260)

Subsets and supersets

496 is the 3rd perfect number, factoring into 2⁴ × 31. Its nontrivial divisors are 2, 4, 8, 16, 31, 62, 124, 248, the most notable being 31.

@@ Line 1: / Line 1: @@
 {{Infobox ET}}
-EDO divides the octave into steps of 2.42 cents each.
+{{ED intro}}
-==Theory==
+edo is [[enfactoring|enfactored]] in the 11-limit, with the same tuning as [[248edo]], but the [[patent val]]s differ on the mapping for 13. As such, in the 11-limit it [[support]]s a compound of two chains of 11-limit [[bischismic]] temperaments. In the 13-limit patent val, it tempers out [[4225/4224]].
-{{primes in edo|496|columns=15}}
-edo is good with the 2.3.11.19 subgroup, for low-complexity just intonation. Higher limits that it appreciates are 31, 37, and 47.
-In the 2.3.11.19 subgroup, 496edo tempers out 131072/131043.
+edo is good with the 2.3.11.19 [[subgroup]]. For higher limits, it has good approximations of [[31/1|31]], [[37/1|37]], and [[47/1|47]]. In the 2.3.11.19 subgroup, it tempers out 131072/131043.
-is the 3rd perfect number, and its divisors are {{EDOs|1, 2, 4, 8, 16, 31, 62, 124, 248}}, the most notable being 31.
+=== Odd harmonics ===
+{{Harmonics in equal|496}}
-edo is contorted order 2 up to the 11-limit, meaning it shares the mapping with 248edo. As such, in the 11-limit it is a compound of two chains of 11-limit bischismic temperaments.  In the 13-limit patent val, first step where 496edo is not contorted, it tempers out 4225/4224.
+=== Subsets and supersets ===
+is the 3rd {{w|perfect number}}, factoring into {{factorization|496}}. Its nontrivial divisors are {{EDOs| 2, 4, 8, 16, 31, 62, 124, 248 }}, the most notable being 31.
-[[Category:Equal divisions of the octave|###]] <!-- 3-digit number -->

496edo: Difference between revisions

Latest revision as of 22:58, 20 February 2025

Odd harmonics

Subsets and supersets

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