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'''181edo''' is the [[EDO|equal division of the octave]] into 181 parts of 6.6298 cents each. It tempers out 2109375/2097152 (semicomma) and 32000000000/31381059609 in the 5-limit; 2401/2400, 5120/5103, and 390625/387072 in the 7-limit (supporting the [[Breedsmic temperaments|hemififths]] and the [[Breedsmic temperaments|cotritone]]). Using the patent val, it tempers out 385/384, 1375/1372, 2200/2197, and 4000/3993 in the 11-limit; 325/324, 352/351, 847/845, and 1575/1573 in the 13-limit.
{{Infobox ET}}
{{ED intro}}


181edo is the 42nd [[prime EDO]].
== Theory ==
181edo is only [[consistent]] to the [[7-odd-limit]], though except for [[9/5]], [[23/20]] and their [[octave complement]]s, it is consistent to the [[23-odd-limit]]. Beyond that, it does well on [[prime interval|primes]] [[37/1|37]] and [[43/1|43]], and has unambiguous though not accurate approximations to [[29/1|29]], [[31/1|31]], and [[41/1|41]]. However, the composite harmonics [[25/1|25]], [[27/1|27]], [[35/1|35]], and [[39/1|39]] cause inconsistencies, with harmonic 25 itself being inconsistent.


[[Category:Equal divisions of the octave]]
As an equal temperament, 181et [[tempering out|tempers out]] 2109375/2097152 ([[semicomma]]) and {{monzo| 14 -22 9 }} in the [[5-limit]]; [[2401/2400]], [[5120/5103]], and 390625/387072 in the [[7-limit]] ([[support]]ing the [[hemififths]] and the [[cotritone]]). Using the patent val, it tempers out [[385/384]], 1375/1372, [[2200/2187]], and [[4000/3993]] in the [[11-limit]]; and [[325/324]], [[352/351]], [[847/845]], and [[1575/1573]] in the [[13-limit]]. It tempers out  [[375/374]], [[595/594]], and [[1275/1274]] in the [[17-limit]], [[400/399]] in the [[19-limit]], and [[300/299]] in the [[23-limit]].
[[Category:Prime EDO]]
 
Because its harmonic [[5/1|5]] causes some inconsistencies, and is less accurate than the other harmonics, 181edo can reasonably be treated as a no-5 system, where it is [[purely consistent]]{{idio}} (meaning all harmonics have under 25% [[relative error]]) up to the 23-odd-limit. It tempers out {{Monzo|15 -13 2}} and {{Monzo|-31 -7 15}} in the [[2.3.7 subgroup]]; 26411/26244, [[43923/43904]], and [[131072/130977]] in the [[2.3.7.11 subgroup]]; and [[352/351]], 20449/20412, [[31213/31104]], and 53361/53248 in the 2.3.7.11.13 subgroup. It tempers out [[833/832]] and [[1089/1088]] in the no-5 17-limit, [[343/342]], [[1729/1728]], and [[2432/2431]] in the no-5 19-limit, and [[392/391]] in the no-5 23-limit.
 
=== Prime harmonics ===
{{Harmonics in equal|181|columns=11}}
{{Harmonics in equal|181|columns=11|start=12|collapsed=true|title=Approximation of prime harmonics in 181edo (continued)}}
 
=== Subsets and supersets ===
181edo is the 42nd [[prime edo]].
 
== Intervals ==
 
{{Todo|complete table|inline=1}}
 
{| class="wikitable center-1 right-2 mw-collapsible mw-collapsed"
|-
! Steps
! Cents
! Approximate ratios*
|-
| 0
| 0
| [[1/1]]
|-
| 1
| 6.63
|
|-
| 2
| 13.26
|
|-
| 3
| 19.89
|
|-
| 4
| 26.52
| [[64/63]], [[65/64]], [[66/65]]
|-
| 5
| 33.15
| [[49/48]], [[50/49]], [[52/51]]
|-
| 6
| 39.78
| [[45/44]], ''[[51/50]]''
|-
| 7
| 46.41
| ''[[35/34]]''
|-
| 8
| 53.04
| [[33/32]], [[34/33]], ''[[36/35]]''
|-
| 9
| 59.67
|
|-
| 10
| 66.3
| ''[[25/24]],'' [[27/26]]
|-
| 11
| 72.93
| [[24/23]], ''[[26/25]]''
|-
| 12
| 79.56
| [[22/21]], [[23/22]]
|-
| 13
| 86.19
| [[20/19]], [[21/20]]
|-
| 14
| 92.82
| [[19/18]]
|-
| 15
| 99.45
| [[18/17]]
|-
| 16
| 106.08
| [[17/16]]
|-
| 17
| 112.71
| [[16/15]]
|-
| 18
| 119.34
| [[15/14]]
|-
| 19
| 125.97
| [[14/13]]
|-
| 20
| 132.6
|
|-
| 21
| 139.23
| [[13/12]], ''[[25/23]]'', ''[[27/25]]''
|-
| 22
| 145.86
|
|-
| 23
| 152.49
| [[12/11]]
|-
| 24
| 159.12
| [[23/21]]
|-
| 25
| 165.75
| [[11/10]]
|-
| 26
| 172.38
| [[21/19]]
|-
| 27
| 179.01
| ''[[10/9]],'' [[51/46]]
|-
| 28
| 185.64
| [[49/44]]
|-
| 29
| 192.27
| [[19/17]]
|-
| 30
| 198.9
| [[55/49]]
|-
| 31
| 205.52
| [[9/8]]
|-
| 32
| 212.15
| [[26/23]]
|-
| 33
| 218.78
| [[17/15]]
|-
| 34
| 225.41
|
|-
| 35
| 232.04
| [[8/7]]
|-
| 36
| 238.67
| [[39/34]]
|-
| 37
| 245.3
| [[15/13]], ''[[23/20]]'', [[38/33]]
|-
| 38
| 251.93
|
|-
| 39
| 258.56
| [[65/56]]
|-
| 40
| 265.19
|
|-
| 41
| 271.82
|
|-
| 42
| 278.45
| [[27/23]]
|-
| 43
| 285.08
| [[33/28]], [[46/39]]
|-
| 44
| 291.71
| [[45/38]]
|-
| 45
| 298.34
| [[19/16]]
|-
| 46
| 304.97
|
|-
| 47
| 311.6
|
|-
| 48
| 318.23
| [[6/5]]
|-
| 49
| 324.86
|
|-
| 50
| 331.49
| [[23/19]], [[63/52]]
|-
| 51
| 338.12
| [[62/51]]
|-
| 52
| 344.75
|
|-
| 53
| 351.38
| [[49/40]], [[60/49]]
|-
| 54
| 358.01
|
|-
| 55
| 364.64
| [[21/17]]
|-
| 56
| 371.27
| [[57/46]]
|-
| 57
| 377.9
| [[56/45]]
|-
| 58
| 384.53
| [[5/4]]
|-
| 59
| 391.16
|
|-
| 60
| 397.79
|
|-
| 61
| 404.42
| [[24/19]]
|-
| 62
| 411.05
|
|-
| 63
| 417.68
| [[14/11]]
|-
| 64
| 424.31
| [[23/18]]
|-
| 65
| 430.94
|
|-
| 66
| 437.57
|
|-
| 67
| 444.2
|
|-
| 68
| 450.83
|
|-
| 69
| 457.46
|
|-
| 70
| 464.09
| [[17/13]]
|-
| 71
| 470.72
| [[21/16]]
|-
| 72
| 477.35
|
|-
| 73
| 483.98
|
|-
| 74
| 490.61
|
|-
| 75
| 497.24
| [[4/3]]
|-
| 76
| 503.87
|
|-
| 77
| 510.5
| [[51/38]]
|-
| 78
| 517.13
|
|-
| 79
| 523.76
| [[23/17]], [[65/48]]
|-
| 80
| 530.39
|
|-
| 81
| 537.02
| [[15/11]]
|-
| 82
| 543.65
| [[26/19]], [[63/46]]
|-
| 83
| 550.28
| [[11/8]]
|-
| 84
| 556.91
|
|-
| 85
| 563.54
| [[18/13]]
|-
| 86
| 570.17
|
|-
| 87
| 576.8
|
|-
| 88
| 583.43
| [[7/5]]
|-
| 89
| 590.06
| [[45/32]]
|-
| 90
| 596.69
| [[24/17]]
|-
| 91
| 603.31
| [[17/12]]
|-
| 92
| 609.94
| [[64/45]]
|-
| 93
| 616.57
| [[10/7]]
|-
| 94
| 623.2
|
|-
| 95
| 629.83
|
|-
| 96
| 636.46
| [[13/9]]
|-
| 97
| 643.09
|
|-
| 98
| 649.72
| [[16/11]]
|-
| 99
| 656.35
| [[19/13]]
|-
| 100
| 662.98
| [[22/15]]
|-
| 101
| 669.61
|
|-
| 102
| 676.24
| [[34/23]], [[65/44]]
|-
| 103
| 682.87
|
|-
| 104
| 689.5
|
|-
| 105
| 696.13
|
|-
| 106
| 702.76
| [[3/2]]
|-
| 107
| 709.39
|
|-
| 108
| 716.02
|
|-
| 109
| 722.65
|
|-
| 110
| 729.28
| [[32/21]]
|-
| 111
| 735.91
| [[26/17]]
|-
| 112
| 742.54
|
|-
| 113
| 749.17
|
|-
| 114
| 755.8
| [[65/42]]
|-
| 115
| 762.43
|
|-
| 116
| 769.06
|
|-
| 117
| 775.69
| [[36/23]]
|-
| 118
| 782.32
| [[11/7]]
|-
| 119
| 788.95
|
|-
| 120
| 795.58
| [[19/12]]
|-
| 121
| 802.21
| [[62/39]]
|-
| 122
| 808.84
|
|-
| 123
| 815.47
|
|-
| 124
| 822.1
| [[45/28]]
|-
| 125
| 828.73
|
|-
| 126
| 835.36
| [[34/21]]
|-
| 127
| 841.99
|
|-
| 128
| 848.62
| [[49/30]]
|-
| 129
| 855.25
|
|-
| 130
| 861.88
|
|-
| 131
| 868.51
| [[38/23]]
|-
| 132
| 875.14
| [[63/38]]
|-
| 133
| 881.77
|
|-
| 134
| 888.4
|
|-
| 135
| 895.03
| [[57/34]]
|-
| 136
| 901.66
| [[32/19]]
|-
| 137
| 908.29
|
|-
| 138
| 914.92
| [[39/23]], [[56/33]]
|-
| 139
| 921.55
| [[46/27]]
|-
| 140
| 928.18
| [[65/38]]
|-
| 141
| 934.81
|
|-
| 142
| 941.44
|
|-
| 143
| 948.07
|
|-
| 144
| 954.7
| [[33/19]]
|-
| 145
| 961.33
|
|-
| 146
| 967.96
| [[7/4]]
|-
| 147
| 974.59
|
|-
| 148
| 981.22
|
|-
| 149
| 987.85
| [[23/13]]
|-
| 150
| 994.48
|
|-
| 151
| 1001.1
|
|-
| 152
| 1007.73
| [[34/19]]
|-
| 153
| 1014.36
|
|-
| 154
| 1020.99
|
|-
| 155
| 1027.62
| [[38/21]]
|-
| 156
| 1034.25
| [[20/11]]
|-
| 157
| 1040.88
|
|-
| 158
| 1047.51
|
|-
| 159
| 1054.14
|
|-
| 160
| 1060.77
| [[24/13]]
|-
| 161
| 1067.4
| [[63/34]]
|-
| 162
| 1074.03
|
|-
| 163
| 1080.66
| [[28/15]]
|-
| 164
| 1087.29
| [[15/8]]
|-
| 165
| 1093.92
| [[32/17]]
|-
| 166
| 1100.55
| [[17/9]]
|-
| 167
| 1107.18
| [[36/19]]
|-
| 168
| 1113.81
| [[19/10]], [[40/21]]
|-
| 169
| 1120.44
| [[21/11]]
|-
| 170
| 1127.07
| [[23/12]]
|-
| 171
| 1133.7
| [[52/27]]
|-
| 172
| 1140.33
|
|-
| 173
| 1146.96
| [[64/33]]
|-
| 174
| 1153.59
|
|-
| 175
| 1160.22
|
|-
| 176
| 1166.85
| [[51/26]]
|-
| 177
| 1173.48
| [[63/32]], [[65/33]]
|-
| 178
| 1180.11
|
|-
| 179
| 1186.74
|
|-
| 180
| 1193.37
|
|-
| 181
| 1200
| [[2/1]]
|}
<nowiki/>*As a 23-limit temperament
 
== Regular temperament properties ==
{| class="wikitable center-4 center-5 center-6"
|-
! rowspan="2" | [[Subgroup]]
! rowspan="2" | [[Comma list]]
! rowspan="2" | [[Mapping]]
! rowspan="2" | Optimal<br>8ve stretch (¢)
! colspan="2" | Tuning error
|-
! [[TE error|Absolute]] (¢)
! [[TE simple badness|Relative]] (%)
|-
| 2.3
| {{Monzo| 287 -181 }}
| {{Mapping| 181 287 }}
| −0.255
| 0.255
| 3.84
|-
| 2.3.5
| 2109375/2097152, {{monzo| 14 -22 9 }}
| {{Mapping| 181 287 420 }}
| +0.086
| 0.525
| 7.92
|-
| 2.3.5.7
| 2401/2400, 5120/5103, 390625/387072
| {{Mapping| 181 287 420 508 }}
| +0.142
| 0.465
| 7.01
|-
| 2.3.5.7.11
| 385/384, 1375/1372, 2200/2187, 4000/3993
| {{Mapping| 181 287 420 508 626 }}
| +0.174
| 0.421
| 6.35
|-
| 2.3.5.7.11.13
| 325/324, 352/351, 385/384, 1375/1372, 1575/1573
| {{Mapping| 181 287 420 508 626 670 }}
| +0.079
| 0.439
| 6.62
|-
| 2.3.5.7.11.13.17
| 325/324, 352/351, 375/374, 385/384, 595/594, 1275/1274
| {{Mapping| 181 287 420 508 626 670 740 }}
| +0.028
| 0.425
| 6.40
|-
| 2.3.5.7.11.13.17.19
| 325/324, 352/351, 375/374, 385/384, 400/399, 595/594, 1275/1274
| {{Mapping| 181 287 420 508 626 670 740 769 }}
| +0.000
| 0.404
| 6.09
|}
 
=== Rank-2 temperaments ===
{| class="wikitable center-all left-5"
|+ style="font-size: 105%;" | Table of rank-2 temperaments by generator
|-
! Periods<br>per 8ve
! Generator*
! Cents*
! Associated<br>ratio*
! Temperaments
|-
| 1
| 18\181
| 119.34
| 15/14
| [[Septidiasemi]]
|-
| 1
| 35\181
| 232.04
| 8/7
| [[Quadrawell]]
|-
| 1
| 39\181
| 258.56
| {{Monzo| -32 13 5 }}
| [[Lafa]]
|-
| 1
| 41\181
| 271.82
| 75/64
| [[Orson]]
|-
| 1
| 53\181
| 351.38
| 49/40
| [[Hemififths]] (7-limit)
|-
| 1
| 78\181
| 517.13
| 66/49
| [[Cutefourths]]
|-
| 1
| 88\181
| 583.43
| 7/5
| [[Cotritone]] (11-limit)
|}
<nowiki />* [[Normal forms #Equave-reduced-generator form|Octave-reduced form]], reduced to the first half-octave, and [[normal forms #Minimal-generator form|minimal form]] in parentheses if distinct
 
== Music ==
; [[Francium]]
* "Today Or Tomorrow?" from ''Questions'' (2024) – [https://open.spotify.com/track/24RikcnTP33a6v9vXyNPwh Spotify] | [https://francium223.bandcamp.com/track/today-or-tomorrow Bandcamp] | [https://www.youtube.com/watch?v=ipUyBAHIvlk YouTube] – slurpee in 181edo tuning
 
== See also ==
* [[181edo and stretched hemififths]]
 
[[Category:Listen]]

Latest revision as of 00:52, 4 April 2026

← 180edo 181edo 182edo →
Prime factorization 181 (prime)
Step size 6.62983 ¢ 
Fifth 106\181 (702.762 ¢)
Semitones (A1:m2) 18:13 (119.3 ¢ : 86.19 ¢)
Consistency limit 7
Distinct consistency limit 7

181 equal divisions of the octave (abbreviated 181edo or 181ed2), also called 181-tone equal temperament (181tet) or 181 equal temperament (181et) when viewed under a regular temperament perspective, is the tuning system that divides the octave into 181 equal parts of about 6.63 ¢ each. Each step represents a frequency ratio of 21/181, or the 181st root of 2.

Theory

181edo is only consistent to the 7-odd-limit, though except for 9/5, 23/20 and their octave complements, it is consistent to the 23-odd-limit. Beyond that, it does well on primes 37 and 43, and has unambiguous though not accurate approximations to 29, 31, and 41. However, the composite harmonics 25, 27, 35, and 39 cause inconsistencies, with harmonic 25 itself being inconsistent.

As an equal temperament, 181et tempers out 2109375/2097152 (semicomma) and [14 -22 9 in the 5-limit; 2401/2400, 5120/5103, and 390625/387072 in the 7-limit (supporting the hemififths and the cotritone). Using the patent val, it tempers out 385/384, 1375/1372, 2200/2187, and 4000/3993 in the 11-limit; and 325/324, 352/351, 847/845, and 1575/1573 in the 13-limit. It tempers out 375/374, 595/594, and 1275/1274 in the 17-limit, 400/399 in the 19-limit, and 300/299 in the 23-limit.

Because its harmonic 5 causes some inconsistencies, and is less accurate than the other harmonics, 181edo can reasonably be treated as a no-5 system, where it is purely consistent[idiosyncratic term] (meaning all harmonics have under 25% relative error) up to the 23-odd-limit. It tempers out [15 -13 2 and [-31 -7 15 in the 2.3.7 subgroup; 26411/26244, 43923/43904, and 131072/130977 in the 2.3.7.11 subgroup; and 352/351, 20449/20412, 31213/31104, and 53361/53248 in the 2.3.7.11.13 subgroup. It tempers out 833/832 and 1089/1088 in the no-5 17-limit, 343/342, 1729/1728, and 2432/2431 in the no-5 19-limit, and 392/391 in the no-5 23-limit.

Prime harmonics

Approximation of prime harmonics in 181edo
Harmonic 2 3 5 7 11 13 17 19 23 29 31
Error Absolute (¢) +0.00 +0.81 -1.78 -0.87 -1.04 +1.46 +1.12 +0.83 +1.56 -1.95 +1.93
Relative (%) +0.0 +12.2 -26.9 -13.1 -15.7 +22.0 +16.9 +12.5 +23.5 -29.5 +29.0
Steps
(reduced) 		181
(0) 		287
(106) 		420
(58) 		508
(146) 		626
(83) 		670
(127) 		740
(16) 		769
(45) 		819
(95) 		879
(155) 		897
(173)
Approximation of prime harmonics in 181edo (continued)
Harmonic 37 41 43 47 53 59 61 67 71 73 79
Error Absolute (¢) +0.59 +1.88 -1.02 -2.52 +1.63 +1.60 -3.07 +0.25 -0.69 -2.38 +0.10
Relative (%) +8.9 +28.3 -15.4 -38.1 +24.6 +24.2 -46.3 +3.8 -10.4 -35.8 +1.6
Steps
(reduced) 		943
(38) 		970
(65) 		982
(77) 		1005
(100) 		1037
(132) 		1065
(160) 		1073
(168) 		1098
(12) 		1113
(27) 		1120
(34) 		1141
(55)

Subsets and supersets

181edo is the 42nd prime edo.

Intervals

Todo: complete table
Steps Cents Approximate ratios*
0 0 1/1
1 6.63
2 13.26
3 19.89
4 26.52 64/63, 65/64, 66/65
5 33.15 49/48, 50/49, 52/51
6 39.78 45/44, 51/50
7 46.41 35/34
8 53.04 33/32, 34/33, 36/35
9 59.67
10 66.3 25/24, 27/26
11 72.93 24/23, 26/25
12 79.56 22/21, 23/22
13 86.19 20/19, 21/20
14 92.82 19/18
15 99.45 18/17
16 106.08 17/16
17 112.71 16/15
18 119.34 15/14
19 125.97 14/13
20 132.6
21 139.23 13/12, 25/23, 27/25
22 145.86
23 152.49 12/11
24 159.12 23/21
25 165.75 11/10
26 172.38 21/19
27 179.01 10/9, 51/46
28 185.64 49/44
29 192.27 19/17
30 198.9 55/49
31 205.52 9/8
32 212.15 26/23
33 218.78 17/15
34 225.41
35 232.04 8/7
36 238.67 39/34
37 245.3 15/13, 23/20, 38/33
38 251.93
39 258.56 65/56
40 265.19
41 271.82
42 278.45 27/23
43 285.08 33/28, 46/39
44 291.71 45/38
45 298.34 19/16
46 304.97
47 311.6
48 318.23 6/5
49 324.86
50 331.49 23/19, 63/52
51 338.12 62/51
52 344.75
53 351.38 49/40, 60/49
54 358.01
55 364.64 21/17
56 371.27 57/46
57 377.9 56/45
58 384.53 5/4
59 391.16
60 397.79
61 404.42 24/19
62 411.05
63 417.68 14/11
64 424.31 23/18
65 430.94
66 437.57
67 444.2
68 450.83
69 457.46
70 464.09 17/13
71 470.72 21/16
72 477.35
73 483.98
74 490.61
75 497.24 4/3
76 503.87
77 510.5 51/38
78 517.13
79 523.76 23/17, 65/48
80 530.39
81 537.02 15/11
82 543.65 26/19, 63/46
83 550.28 11/8
84 556.91
85 563.54 18/13
86 570.17
87 576.8
88 583.43 7/5
89 590.06 45/32
90 596.69 24/17
91 603.31 17/12
92 609.94 64/45
93 616.57 10/7
94 623.2
95 629.83
96 636.46 13/9
97 643.09
98 649.72 16/11
99 656.35 19/13
100 662.98 22/15
101 669.61
102 676.24 34/23, 65/44
103 682.87
104 689.5
105 696.13
106 702.76 3/2
107 709.39
108 716.02
109 722.65
110 729.28 32/21
111 735.91 26/17
112 742.54
113 749.17
114 755.8 65/42
115 762.43
116 769.06
117 775.69 36/23
118 782.32 11/7
119 788.95
120 795.58 19/12
121 802.21 62/39
122 808.84
123 815.47
124 822.1 45/28
125 828.73
126 835.36 34/21
127 841.99
128 848.62 49/30
129 855.25
130 861.88
131 868.51 38/23
132 875.14 63/38
133 881.77
134 888.4
135 895.03 57/34
136 901.66 32/19
137 908.29
138 914.92 39/23, 56/33
139 921.55 46/27
140 928.18 65/38
141 934.81
142 941.44
143 948.07
144 954.7 33/19
145 961.33
146 967.96 7/4
147 974.59
148 981.22
149 987.85 23/13
150 994.48
151 1001.1
152 1007.73 34/19
153 1014.36
154 1020.99
155 1027.62 38/21
156 1034.25 20/11
157 1040.88
158 1047.51
159 1054.14
160 1060.77 24/13
161 1067.4 63/34
162 1074.03
163 1080.66 28/15
164 1087.29 15/8
165 1093.92 32/17
166 1100.55 17/9
167 1107.18 36/19
168 1113.81 19/10, 40/21
169 1120.44 21/11
170 1127.07 23/12
171 1133.7 52/27
172 1140.33
173 1146.96 64/33
174 1153.59
175 1160.22
176 1166.85 51/26
177 1173.48 63/32, 65/33
178 1180.11
179 1186.74
180 1193.37
181 1200 2/1

*As a 23-limit temperament

Regular temperament properties

Subgroup Comma list Mapping Optimal
8ve stretch (¢) 		Tuning error
Absolute (¢) Relative (%)
2.3 [287 -181 [181 287]] −0.255 0.255 3.84
2.3.5 2109375/2097152, [14 -22 9 [181 287 420]] +0.086 0.525 7.92
2.3.5.7 2401/2400, 5120/5103, 390625/387072 [181 287 420 508]] +0.142 0.465 7.01
2.3.5.7.11 385/384, 1375/1372, 2200/2187, 4000/3993 [181 287 420 508 626]] +0.174 0.421 6.35
2.3.5.7.11.13 325/324, 352/351, 385/384, 1375/1372, 1575/1573 [181 287 420 508 626 670]] +0.079 0.439 6.62
2.3.5.7.11.13.17 325/324, 352/351, 375/374, 385/384, 595/594, 1275/1274 [181 287 420 508 626 670 740]] +0.028 0.425 6.40
2.3.5.7.11.13.17.19 325/324, 352/351, 375/374, 385/384, 400/399, 595/594, 1275/1274 [181 287 420 508 626 670 740 769]] +0.000 0.404 6.09

Rank-2 temperaments

Table of rank-2 temperaments by generator
Periods
per 8ve 		Generator* Cents* Associated
ratio* 		Temperaments
1 18\181 119.34 15/14 Septidiasemi
1 35\181 232.04 8/7 Quadrawell
1 39\181 258.56 [-32 13 5 Lafa
1 41\181 271.82 75/64 Orson
1 53\181 351.38 49/40 Hemififths (7-limit)
1 78\181 517.13 66/49 Cutefourths
1 88\181 583.43 7/5 Cotritone (11-limit)

* Octave-reduced form, reduced to the first half-octave, and minimal form in parentheses if distinct

Music

Francium

See also

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