3476edo: Difference between revisions

3476edo is consistent to the 7-odd-limit, though it has large errors on harmonics 3 and 7. In the 7-limit, it tempers out the skeetsma. Aside from this, it is a strong 2.5.11.17.23 subgroup tuning.

Odd harmonics

Approximation of odd harmonics in 3476edo
Harmonic		3	5	7	9	11	13	15	17	19	21	23
Error	Absolute (¢)	-0.114	-0.008	-0.126	+0.118	+0.005	+0.094	-0.121	-0.007	+0.070	+0.105	+0.034
Error	Relative (%)	-33.0	-2.2	-36.6	+34.1	+1.6	+27.2	-35.2	-2.1	+20.4	+30.5	+9.9
Steps (reduced)		5509 (2033)	8071 (1119)	9758 (2806)	11019 (591)	12025 (1597)	12863 (2435)	13580 (3152)	14208 (304)	14766 (862)	15268 (1364)	15724 (1820)

Subsets and supersets

Since 3476 factors as 2² × 11 × 79, 3476edo has nontrivial subset edos 2, 4, 11, 22, 44, 79, 158, 316, 869, 1738.

10428edo, which divides the edostep in three, is consistent in the 21-odd-limit and corrects the harmonics 3 and 7.

@@ Line 2: / Line 2: @@
 {{EDO intro|3476}}
-edo is consistent to the [[7-odd-limit]], though it has large errors on harmonics 3 and 7. Aside from this, it is a strong 2.5.11.17.23 subgroup tuning.
+edo is consistent to the [[7-odd-limit]], though it has large errors on harmonics 3 and 7. In the 7-limit, it tempers out the [[skeetsma]]. Aside from this, it is a strong 2.5.11.17.23 subgroup tuning.
 === Odd harmonics ===
 {{harmonics in equal|3476}}
+=== Subsets and supersets ===
+Since 3476 factors as {{Factorization|3476}}, 3476edo has nontrivial subset edos {{EDOs|2, 4, 11, 22, 44, 79, 158, 316, 869, 1738}}.
+[[10428edo]], which divides the edostep in three, is consistent in the [[21-odd-limit]] and corrects the harmonics 3 and 7.

3476edo: Difference between revisions

Revision as of 19:22, 9 October 2024

Odd harmonics

Subsets and supersets

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