71edo

← 70edo

71edo

72edo →

Prime factorization

71 (prime)

Step size

16.9014 ¢

Fifth

42\71 (709.859 ¢)

Semitones (A1:m2)

10:3 (169 ¢ : 50.7 ¢)

Dual sharp fifth

42\71 (709.859 ¢)

Dual flat fifth

41\71 (692.958 ¢)

Dual major 2nd

12\71 (202.817 ¢)

Consistency limit

5

Distinct consistency limit

5

The 71 equal temperament or 71-EDO divides the octave into 71 equal parts of 16.901 cents each.

71edo is the 20th prime EDO.

71edo is, quite unusually for an EDO this large, a dual-fifth system, with the flat fifth (which is near 26edo's fifth) supporting flattone temperament, and the sharp fifth (which is near 22edo's fifth) supporting superpyth and archy.

Theory

Approximation of odd harmonics in 71edo
Harmonic		3	5	7	9	11	13	15	17	19	21	23
Error	Absolute (¢)	+7.90	+2.42	-5.45	-1.09	+6.43	+4.54	-6.58	-3.55	+6.71	+2.46	-2.92
Error	Relative (%)	+46.8	+14.3	-32.2	-6.5	+38.0	+26.9	-38.9	-21.0	+39.7	+14.5	-17.3
Steps (reduced)		113 (42)	165 (23)	199 (57)	225 (12)	246 (33)	263 (50)	277 (64)	290 (6)	302 (18)	312 (28)	321 (37)

It tempers out 20480/19683 and 393216/390625 in the 5-limit, 875/864, 4000/3969 and 1029/1024 in the 7-limit, 245/242 and 100/99 in the 11-limit, and 91/90 in the 13-limit. In the 13-limit it supplies the optimal patent val for the 29&71 and 34&37 temperaments.

Intervals

#	Cents	Diatonic interval category
0	0.0	perfect unison
1	16.9	superunison
2	33.8	superunison
3	50.7	subminor second
4	67.6	subminor second
5	84.5	minor second
6	101.4	minor second
7	118.3	minor second
8	135.2	supraminor second
9	152.1	neutral second
10	169.0	submajor second
11	185.9	major second
12	202.8	major second
13	219.7	major second
14	236.6	supermajor second
15	253.5	ultramajor second
16	270.4	subminor third
17	287.3	minor third
18	304.2	minor third
19	321.1	supraminor third
20	338.0	supraminor third
21	354.9	neutral third
22	371.8	submajor third
23	388.7	major third
24	405.6	major third
25	422.5	supermajor third
26	439.4	supermajor third
27	456.3	ultramajor third
28	473.2	subfourth
29	490.1	perfect fourth
30	507.0	perfect fourth
31	523.9	superfourth
32	540.8	superfourth
33	557.7	superfourth
34	574.6	low tritone
35	591.5	low tritone
36	608.5	high tritone
37	625.4	high tritone
38	642.3	subfifth
39	659.2	subfifth
40	676.1	subfifth
41	693.0	perfect fifth
42	709.9	perfect fifth
43	726.8	superfifth
44	743.7	ultrafifth
45	760.6	subminor sixth
46	777.5	subminor sixth
47	794.4	minor sixth
48	811.3	minor sixth
49	828.2	supraminor sixth
50	845.1	neutral sixth
51	862.0	submajor sixth
52	878.9	submajor sixth
53	895.8	major sixth
54	912.7	major sixth
55	929.6	supermajor sixth
56	946.5	ultramajor sixth
57	963.4	subminor seventh
58	980.3	minor seventh
59	997.2	minor seventh
60	1014.1	minor seventh
61	1031.0	supraminor seventh
62	1047.9	neutral seventh
63	1064.8	submajor seventh
64	1081.7	major seventh
65	1098.6	major seventh
66	1115.5	major seventh
67	1132.4	supermajor seventh
68	1149.3	ultramajor seventh
69	1166.2	suboctave
70	1183.1	suboctave
71	1200.0	perfect octave