| Prime factorization
|
2 × 32 × 13
|
| Step size
|
5.12821 ¢
|
| Fifth
|
137\234 (702.564 ¢)
|
| Semitones (A1:m2)
|
23:17 (117.9 ¢ : 87.18 ¢)
|
| Consistency limit
|
7
|
| Distinct consistency limit
|
7
|
Template:EDO intro
Theory
Script error: No such module "primes_in_edo".
Intervals
| #
|
Cents
|
Diatonic interval category
|
| 0
|
0.0
|
perfect unison
|
| 1
|
5.1
|
superunison
|
| 2
|
10.3
|
superunison
|
| 3
|
15.4
|
superunison
|
| 4
|
20.5
|
superunison
|
| 5
|
25.6
|
superunison
|
| 6
|
30.8
|
superunison
|
| 7
|
35.9
|
superunison
|
| 8
|
41.0
|
subminor second
|
| 9
|
46.2
|
subminor second
|
| 10
|
51.3
|
subminor second
|
| 11
|
56.4
|
subminor second
|
| 12
|
61.5
|
subminor second
|
| 13
|
66.7
|
subminor second
|
| 14
|
71.8
|
subminor second
|
| 15
|
76.9
|
subminor second
|
| 16
|
82.1
|
minor second
|
| 17
|
87.2
|
minor second
|
| 18
|
92.3
|
minor second
|
| 19
|
97.4
|
minor second
|
| 20
|
102.6
|
minor second
|
| 21
|
107.7
|
minor second
|
| 22
|
112.8
|
minor second
|
| 23
|
117.9
|
minor second
|
| 24
|
123.1
|
supraminor second
|
| 25
|
128.2
|
supraminor second
|
| 26
|
133.3
|
supraminor second
|
| 27
|
138.5
|
supraminor second
|
| 28
|
143.6
|
neutral second
|
| 29
|
148.7
|
neutral second
|
| 30
|
153.8
|
neutral second
|
| 31
|
159.0
|
neutral second
|
| 32
|
164.1
|
submajor second
|
| 33
|
169.2
|
submajor second
|
| 34
|
174.4
|
submajor second
|
| 35
|
179.5
|
submajor second
|
| 36
|
184.6
|
major second
|
| 37
|
189.7
|
major second
|
| 38
|
194.9
|
major second
|
| 39
|
200.0
|
major second
|
| 40
|
205.1
|
major second
|
| 41
|
210.3
|
major second
|
| 42
|
215.4
|
major second
|
| 43
|
220.5
|
supermajor second
|
| 44
|
225.6
|
supermajor second
|
| 45
|
230.8
|
supermajor second
|
| 46
|
235.9
|
supermajor second
|
| 47
|
241.0
|
ultramajor second
|
| 48
|
246.2
|
ultramajor second
|
| 49
|
251.3
|
ultramajor second
|
| 50
|
256.4
|
ultramajor second
|
| 51
|
261.5
|
subminor third
|
| 52
|
266.7
|
subminor third
|
| 53
|
271.8
|
subminor third
|
| 54
|
276.9
|
subminor third
|
| 55
|
282.1
|
minor third
|
| 56
|
287.2
|
minor third
|
| 57
|
292.3
|
minor third
|
| 58
|
297.4
|
minor third
|
| 59
|
302.6
|
minor third
|
| 60
|
307.7
|
minor third
|
| 61
|
312.8
|
minor third
|
| 62
|
317.9
|
minor third
|
| 63
|
323.1
|
supraminor third
|
| 64
|
328.2
|
supraminor third
|
| 65
|
333.3
|
supraminor third
|
| 66
|
338.5
|
supraminor third
|
| 67
|
343.6
|
neutral third
|
| 68
|
348.7
|
neutral third
|
| 69
|
353.8
|
neutral third
|
| 70
|
359.0
|
neutral third
|
| 71
|
364.1
|
submajor third
|
| 72
|
369.2
|
submajor third
|
| 73
|
374.4
|
submajor third
|
| 74
|
379.5
|
submajor third
|
| 75
|
384.6
|
major third
|
| 76
|
389.7
|
major third
|
| 77
|
394.9
|
major third
|
| 78
|
400.0
|
major third
|
| 79
|
405.1
|
major third
|
| 80
|
410.3
|
major third
|
| 81
|
415.4
|
major third
|
| 82
|
420.5
|
supermajor third
|
| 83
|
425.6
|
supermajor third
|
| 84
|
430.8
|
supermajor third
|
| 85
|
435.9
|
supermajor third
|
| 86
|
441.0
|
ultramajor third
|
| 87
|
446.2
|
ultramajor third
|
| 88
|
451.3
|
ultramajor third
|
| 89
|
456.4
|
ultramajor third
|
| 90
|
461.5
|
subfourth
|
| 91
|
466.7
|
subfourth
|
| 92
|
471.8
|
subfourth
|
| 93
|
476.9
|
subfourth
|
| 94
|
482.1
|
perfect fourth
|
| 95
|
487.2
|
perfect fourth
|
| 96
|
492.3
|
perfect fourth
|
| 97
|
497.4
|
perfect fourth
|
| 98
|
502.6
|
perfect fourth
|
| 99
|
507.7
|
perfect fourth
|
| 100
|
512.8
|
perfect fourth
|
| 101
|
517.9
|
superfourth
|
| 102
|
523.1
|
superfourth
|
| 103
|
528.2
|
superfourth
|
| 104
|
533.3
|
superfourth
|
| 105
|
538.5
|
superfourth
|
| 106
|
543.6
|
superfourth
|
| 107
|
548.7
|
superfourth
|
| 108
|
553.8
|
superfourth
|
| 109
|
559.0
|
superfourth
|
| 110
|
564.1
|
low tritone
|
| 111
|
569.2
|
low tritone
|
| 112
|
574.4
|
low tritone
|
| 113
|
579.5
|
low tritone
|
| 114
|
584.6
|
low tritone
|
| 115
|
589.7
|
low tritone
|
| 116
|
594.9
|
low tritone
|
| 117
|
600.0
|
high tritone
|
| 118
|
605.1
|
high tritone
|
| 119
|
610.3
|
high tritone
|
| 120
|
615.4
|
high tritone
|
| 121
|
620.5
|
high tritone
|
| 122
|
625.6
|
high tritone
|
| 123
|
630.8
|
high tritone
|
| 124
|
635.9
|
high tritone
|
| 125
|
641.0
|
subfifth
|
| 126
|
646.2
|
subfifth
|
| 127
|
651.3
|
subfifth
|
| 128
|
656.4
|
subfifth
|
| 129
|
661.5
|
subfifth
|
| 130
|
666.7
|
subfifth
|
| 131
|
671.8
|
subfifth
|
| 132
|
676.9
|
subfifth
|
| 133
|
682.1
|
subfifth
|
| 134
|
687.2
|
perfect fifth
|
| 135
|
692.3
|
perfect fifth
|
| 136
|
697.4
|
perfect fifth
|
| 137
|
702.6
|
perfect fifth
|
| 138
|
707.7
|
perfect fifth
|
| 139
|
712.8
|
perfect fifth
|
| 140
|
717.9
|
perfect fifth
|
| 141
|
723.1
|
superfifth
|
| 142
|
728.2
|
superfifth
|
| 143
|
733.3
|
superfifth
|
| 144
|
738.5
|
superfifth
|
| 145
|
743.6
|
ultrafifth
|
| 146
|
748.7
|
ultrafifth
|
| 147
|
753.8
|
ultrafifth
|
| 148
|
759.0
|
ultrafifth
|
| 149
|
764.1
|
subminor sixth
|
| 150
|
769.2
|
subminor sixth
|
| 151
|
774.4
|
subminor sixth
|
| 152
|
779.5
|
subminor sixth
|
| 153
|
784.6
|
minor sixth
|
| 154
|
789.7
|
minor sixth
|
| 155
|
794.9
|
minor sixth
|
| 156
|
800.0
|
minor sixth
|
| 157
|
805.1
|
minor sixth
|
| 158
|
810.3
|
minor sixth
|
| 159
|
815.4
|
minor sixth
|
| 160
|
820.5
|
supraminor sixth
|
| 161
|
825.6
|
supraminor sixth
|
| 162
|
830.8
|
supraminor sixth
|
| 163
|
835.9
|
supraminor sixth
|
| 164
|
841.0
|
neutral sixth
|
| 165
|
846.2
|
neutral sixth
|
| 166
|
851.3
|
neutral sixth
|
| 167
|
856.4
|
neutral sixth
|
| 168
|
861.5
|
submajor sixth
|
| 169
|
866.7
|
submajor sixth
|
| 170
|
871.8
|
submajor sixth
|
| 171
|
876.9
|
submajor sixth
|
| 172
|
882.1
|
major sixth
|
| 173
|
887.2
|
major sixth
|
| 174
|
892.3
|
major sixth
|
| 175
|
897.4
|
major sixth
|
| 176
|
902.6
|
major sixth
|
| 177
|
907.7
|
major sixth
|
| 178
|
912.8
|
major sixth
|
| 179
|
917.9
|
major sixth
|
| 180
|
923.1
|
supermajor sixth
|
| 181
|
928.2
|
supermajor sixth
|
| 182
|
933.3
|
supermajor sixth
|
| 183
|
938.5
|
supermajor sixth
|
| 184
|
943.6
|
ultramajor sixth
|
| 185
|
948.7
|
ultramajor sixth
|
| 186
|
953.8
|
ultramajor sixth
|
| 187
|
959.0
|
ultramajor sixth
|
| 188
|
964.1
|
subminor seventh
|
| 189
|
969.2
|
subminor seventh
|
| 190
|
974.4
|
subminor seventh
|
| 191
|
979.5
|
subminor seventh
|
| 192
|
984.6
|
minor seventh
|
| 193
|
989.7
|
minor seventh
|
| 194
|
994.9
|
minor seventh
|
| 195
|
1000.0
|
minor seventh
|
| 196
|
1005.1
|
minor seventh
|
| 197
|
1010.3
|
minor seventh
|
| 198
|
1015.4
|
minor seventh
|
| 199
|
1020.5
|
supraminor seventh
|
| 200
|
1025.6
|
supraminor seventh
|
| 201
|
1030.8
|
supraminor seventh
|
| 202
|
1035.9
|
supraminor seventh
|
| 203
|
1041.0
|
neutral seventh
|
| 204
|
1046.2
|
neutral seventh
|
| 205
|
1051.3
|
neutral seventh
|
| 206
|
1056.4
|
neutral seventh
|
| 207
|
1061.5
|
submajor seventh
|
| 208
|
1066.7
|
submajor seventh
|
| 209
|
1071.8
|
submajor seventh
|
| 210
|
1076.9
|
submajor seventh
|
| 211
|
1082.1
|
major seventh
|
| 212
|
1087.2
|
major seventh
|
| 213
|
1092.3
|
major seventh
|
| 214
|
1097.4
|
major seventh
|
| 215
|
1102.6
|
major seventh
|
| 216
|
1107.7
|
major seventh
|
| 217
|
1112.8
|
major seventh
|
| 218
|
1117.9
|
major seventh
|
| 219
|
1123.1
|
supermajor seventh
|
| 220
|
1128.2
|
supermajor seventh
|
| 221
|
1133.3
|
supermajor seventh
|
| 222
|
1138.5
|
supermajor seventh
|
| 223
|
1143.6
|
ultramajor seventh
|
| 224
|
1148.7
|
ultramajor seventh
|
| 225
|
1153.8
|
ultramajor seventh
|
| 226
|
1159.0
|
ultramajor seventh
|
| 227
|
1164.1
|
suboctave
|
| 228
|
1169.2
|
suboctave
|
| 229
|
1174.4
|
suboctave
|
| 230
|
1179.5
|
suboctave
|
| 231
|
1184.6
|
suboctave
|
| 232
|
1189.7
|
suboctave
|
| 233
|
1194.9
|
suboctave
|
| 234
|
1200.0
|
perfect octave
|