20567edo

Prime factorization

131 × 157

Step size

0.0583459 ¢

Fifth

12031\20567 (701.959 ¢)

Semitones (A1:m2)

1949:1546 (113.7 ¢ : 90.2 ¢)

Consistency limit

57

Distinct consistency limit

57

Template:EDO intro

20567edo is a remarkable very high-limit system, distinctly consistent through the 57-odd-limit, with a lower relative error than any previous equal temperaments in the 43-limit. It tempers out 33814/33813, 35344/35343, 37180/37179, 42484/42483, 42688/42687, 47125/47124, 48504/48503, 67915/67914, 70500/70499, 91885/91884, 126225/126224, 156520/156519, 194580/194579, 206800/206793, and 561925/561924 in the 53-limit.

Prime harmonics

Approximation of prime harmonics in 20567edo
Harmonic		2	3	5	7	11	13	17	19	23	29	31	37
Error	Absolute (¢)	+0.0000	+0.0044	-0.0056	+0.0077	-0.0076	+0.0033	+0.0089	-0.0073	-0.0058	-0.0056	+0.0026	+0.0101
Error	Relative (%)	+0.0	+7.6	-9.5	+13.1	-13.0	+5.6	+15.2	-12.5	-9.9	-9.5	+4.4	+17.3
Steps (reduced)		20567 (0)	32598 (12031)	47755 (6621)	57739 (16605)	71150 (9449)	76107 (14406)	84067 (1799)	87367 (5099)	93036 (10768)	99914 (17646)	101893 (19625)	107143 (4308)

Approximation of prime harmonics in 20567edo (continued)
Harmonic		41	43	47	53	59	61	67	71	73	79	83	89
Error	Absolute (¢)	+0.0133	+0.0007	-0.0134	-0.0082	-0.0186	-0.0277	-0.0150	+0.0088	-0.0071	+0.0082	-0.0254	-0.0239
Error	Relative (%)	+22.8	+1.3	-22.9	-14.0	-32.0	-47.5	-25.6	+15.1	-12.2	+14.1	-43.6	-40.9
Steps (reduced)		110189 (7354)	111602 (8767)	114241 (11406)	117806 (14971)	120988 (18153)	121977 (19142)	124761 (1359)	126482 (3080)	127306 (3904)	129650 (6248)	131115 (7713)	133186 (9784)