89edo

Prime factorization

89 (prime)

Step size

13.4831¢

Fifth

52\89 (701.124¢)

Semitones (A1:m2)

8:7 (107.9¢ : 94.38¢)

Consistency limit

11

Distinct consistency limit

11

89 equal divisions of the octave (abbreviated 89edo or 89ed2), also called 89-tone equal temperament (89tet) or 89 equal temperament (89et) when viewed under a regular temperament perspective, is the tuning system that divides the octave into 89 equal parts of about 13.5 ¢ each. Each step represents a frequency ratio of 2^1/89, or the 89th root of 2.

Theory

89edo has a harmonic 3 less than a cent flat and a harmonic 5 less than five cents sharp, with a 7 two cents sharp and an 11 1.5 cents sharp. It thus delivers reasonably good 11-limit harmony and very good no-fives harmony along with the very useful approximations represented by its commas. On a related note, a notable characteristic of this edo is that it is the lowest in a series of four consecutive edos to temper out quartisma.

89et tempers out the commas 126/125, 1728/1715, 32805/32768, 2401/2400, 176/175, 243/242, 441/440 and 540/539. It is an especially good tuning for the myna temperament, both in the 7-limit, tempering out 126/125 and 1728/1715, and in the 11-limit, where 176/175 is tempered out also. It is likewise a good tuning for the rank-3 temperament thrush, tempering out 126/125 and 176/175.

Prime harmonics

Approximation of prime harmonics in 89edo
Harmonic		2	3	5	7	11	13	17	19	23	29	31
Error	absolute (¢)	+0.00	-0.83	+4.70	+1.96	+1.49	-4.57	+2.91	-0.88	+5.43	-4.86	+1.03
Error	relative (%)	+0	-6	+35	+15	+11	-34	+22	-7	+40	-36	+8
Steps (reduced)		89 (0)	141 (52)	207 (29)	250 (72)	308 (41)	329 (62)	364 (8)	378 (22)	403 (47)	432 (76)	441 (85)

Subsets and supersets

89edo is the 24th prime edo, and the 11th in the Fibonacci sequence, which means its 55th step approximates logarithmic φ (i.e. (φ - 1)×1200 cents) within a fraction of a cent.

Interval table

Steps	Cents	Ups and downs notation	Approximate ratios
0	0	D	1/1
1	13.4831	^D, v⁶E♭
2	26.9663	^^D, v⁵E♭	56/55, 64/63, 65/64, 66/65
3	40.4494	^³D, v⁴E♭	45/44, 49/48, 77/75
4	53.9326	^⁴D, v³E♭	33/32, 65/63
5	67.4157	^⁵D, vvE♭	27/26, 28/27, 80/77
6	80.8989	^⁶D, vE♭	21/20, 22/21
7	94.382	^⁷D, E♭
8	107.865	D♯, v⁷E	16/15
9	121.348	^D♯, v⁶E	15/14, 77/72
10	134.831	^^D♯, v⁵E	13/12
11	148.315	^³D♯, v⁴E	12/11, 49/45
12	161.798	^⁴D♯, v³E	11/10
13	175.281	^⁵D♯, vvE	72/65
14	188.764	^⁶D♯, vE	49/44
15	202.247	E	9/8, 55/49
16	215.73	^E, v⁶F
17	229.213	^^E, v⁵F	8/7
18	242.697	^³E, v⁴F
19	256.18	^⁴E, v³F	65/56
20	269.663	^⁵E, vvF	7/6
21	283.146	^⁶E, vF	33/28
22	296.629	F	32/27, 77/65
23	310.112	^F, v⁶G♭
24	323.596	^^F, v⁵G♭	65/54, 77/64
25	337.079	^³F, v⁴G♭	40/33, 63/52
26	350.562	^⁴F, v³G♭	11/9, 27/22, 49/40, 60/49
27	364.045	^⁵F, vvG♭	16/13
28	377.528	^⁶F, vG♭	56/45, 81/65
29	391.011	^⁷F, G♭	5/4, 44/35
30	404.494	F♯, v⁷G	81/64
31	417.978	^F♯, v⁶G	14/11, 33/26, 80/63
32	431.461	^^F♯, v⁵G	9/7, 77/60
33	444.944	^³F♯, v⁴G
34	458.427	^⁴F♯, v³G	64/49
35	471.91	^⁵F♯, vvG	21/16, 55/42
36	485.393	^⁶F♯, vG	65/49
37	498.876	G	4/3
38	512.36	^G, v⁶A♭	66/49
39	525.843	^^G, v⁵A♭	65/48
40	539.326	^³G, v⁴A♭	15/11
41	552.809	^⁴G, v³A♭	11/8
42	566.292	^⁵G, vvA♭	18/13
43	579.775	^⁶G, vA♭	7/5
44	593.258	^⁷G, A♭	45/32
45	606.742	G♯, v⁷A	64/45
46	620.225	^G♯, v⁶A	10/7, 63/44
47	633.708	^^G♯, v⁵A	13/9, 81/56
48	647.191	^³G♯, v⁴A	16/11
49	660.674	^⁴G♯, v³A	22/15
50	674.157	^⁵G♯, vvA	65/44
51	687.64	^⁶G♯, vA	49/33
52	701.124	A	3/2
53	714.607	^A, v⁶B♭
54	728.09	^^A, v⁵B♭	32/21
55	741.573	^³A, v⁴B♭	49/32, 75/49
56	755.056	^⁴A, v³B♭	65/42
57	768.539	^⁵A, vvB♭	14/9, 81/52
58	782.022	^⁶A, vB♭	11/7, 52/33, 63/40
59	795.506	^⁷A, B♭
60	808.989	A♯, v⁷B	8/5, 35/22
61	822.472	^A♯, v⁶B	45/28, 77/48
62	835.955	^^A♯, v⁵B	13/8
63	849.438	^³A♯, v⁴B	18/11, 44/27, 49/30, 80/49
64	862.921	^⁴A♯, v³B	33/20
65	876.404	^⁵A♯, vvB
66	889.888	^⁶A♯, vB
67	903.371	B	27/16
68	916.854	^B, v⁶C	56/33
69	930.337	^^B, v⁵C	12/7, 77/45
70	943.82	^³B, v⁴C
71	957.303	^⁴B, v³C
72	970.787	^⁵B, vvC	7/4
73	984.27	^⁶B, vC
74	997.753	C	16/9
75	1011.24	^C, v⁶D♭
76	1024.72	^^C, v⁵D♭	65/36
77	1038.2	^³C, v⁴D♭	20/11
78	1051.69	^⁴C, v³D♭	11/6, 81/44
79	1065.17	^⁵C, vvD♭	24/13
80	1078.65	^⁶C, vD♭	28/15
81	1092.13	^⁷C, D♭	15/8
82	1105.62	C♯, v⁷D
83	1119.1	^C♯, v⁶D	21/11, 40/21
84	1132.58	^^C♯, v⁵D	27/14, 52/27, 77/40
85	1146.07	^³C♯, v⁴D	64/33
86	1159.55	^⁴C♯, v³D
87	1173.03	^⁵C♯, vvD	55/28, 63/32, 65/33
88	1186.52	^⁶C♯, vD
89	1200	D	2/1

Regular temperament properties

Subgroup	Comma List	Mapping	Optimal 8ve Stretch (¢)	Tuning Error
Subgroup	Comma List	Mapping	Optimal 8ve Stretch (¢)	Absolute (¢)	Relative (%)
2.3	[-141 89⟩	[⟨89 141]]	+0.262	0.262	1.95
2.3.5	32805/32768, 10077696/9765625	[⟨89 141 207]]	-0.500	1.098	8.15
2.3.5.7	126/125, 1728/1715, 32805/32768	[⟨89 141 207 250]]	-0.550	0.955	7.08
2.3.5.7.11	126/125, 176/175, 243/242, 16384/16335	[⟨89 141 207 250 308]]	-0.526	0.855	6.35

Rank-2 temperaments

Table of rank-2 temperaments by generator
Periods per 8ve	Generator	Cents	Associated Ratio	Temperament
1	13\89	175.28	72/65	Sesquiquartififths / Sesquart
1	21\89	283.15	13/11	Neominor
1	23\89	310.11	6/5	Myna
1	29\89	391.01	5/4	Amigo
1	37\89	498.87	4/3	Grackle

Scales

Music

Francium

Singing Golden Myna (2022) – myna[11] in 89edo