Table of 227edo intervals

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This table of 227edo intervals assumes 13-limit patent val 227 360 527 637 785 840] of 227edo.

Intervals highlighted in bold are prime harmonics or subharmonics. Intervals, that differ more than 50%, but no more than 100%, are shown in italic. Intervals that differ by more than 100% are not shown. For clarity, an entry can contain multiple intervals if they are of comparable complexity.

Degree Cents Marks 5-limit 7-limit 11-limit 13-limit
0 0.000 P1 1/1
1 5.286
2 10.573
3 15.859
4 21.145
5 26.632 64/63 65/64, 66/65
6 31.718 56/55
7 37.004 50/49
8 42.291 40/39
9 47.577
10 52.863 33/32 65/63
11 58.150
12 63.436
13 68.723 25/24 26/25
14 74.009
15 79.295 22/21
16 84.582 m2 21/20
17 89.868
18 95.154 55/52
19 100.441 35/33
20 105.727
21 111.013 16/15
22 116.300
23 121.586
24 126.872 14/13
25 132.159
26 137.445 13/12
27 142.731
28 148.018
29 153.304 35/32
30 158.590
31 163.877 11/10
32 169.163
33 174.449
34 179.736
35 185.022 49/44
36 190.308
37 195.595 28/25
38 200.881 55/49
39 206.167 M2
40 211.454
41 216.740
42 222.026 25/22
43 227.313
44 232.599 8/7
45 237.885
46 243.172
47 248.458 15/13, 52/45
48 253.744
49 259.031 65/56
50 264.317 64/55
51 269.604
52 274.890 75/64
53 280.176
54 285.463 33/28
55 290.749 m3 13/11
56 296.035
57 301.322 25/21
58 306.608
59 311.894
60 317.181 6/5
61 322.467
62 327.753
63 333.040 40/33 63/52
64 338.326
65 343.612 39/32
66 348.899
67 354.185
68 359.471 16/13
69 364.758
70 370.044 26/21
71 375.330
72 380.617
73 385.903 5/4
74 391.189
75 396.476 44/35
76 401.762 63/50
77 407.048
78 412.335 M3 80/63 33/26
79 417.621 14/11
80 422.907
81 428.194 32/25 50/39
82 433.480
83 438.767
84 444.053
85 449.339
86 454.626 13/10
87 459.912
88 465.198 55/42
89 470.485 21/16
90 475.771
91 481.057 33/25
92 486.344
93 491.630
94 496.916 P4 4/3
95 502.203
96 507.489 75/56
97 512.775 35/26
98 518.062
99 523.348 65/48
100 528.634
101 533.921
102 539.207
103 544.493
104 549.780 11/8
105 555.066
106 560.352
107 565.639
108 570.925
109 576.211
110 581.498 d5 7/5
111 586.784
112 592.070 45/32
113 597.357
114 602.643
115 607.930 64/45
116 613.216
117 618.502 A4 10/7
118 623.789
119 629.075
120 634.361 75/52
121 639.648
122 644.934
123 650.220 16/11
124 655.507
125 660.793
126 666.079
127 671.366
128 676.652 65/44
129 681.938
130 687.225 52/35
131 692.511
132 697.797
133 703.084 P5 3/2
134 708.370
135 713.656
136 718.934 50/33
137 724.229
138 729.515 32/21
139 734.802
140 740.088
141 745.374 20/13
142 750.661
143 755.947 65/42
144 761.233
145 766.520
146 771.806 25/16 39/25
147 777.093
148 782.379 11/7
149 787.665 m6 63/40 52/33
150 792.952
151 798.238
152 803.524 35/22
153 808.811
154 814.079 8/5
155 819.383
156 824.670
157 829.956 21/13
158 835.242
159 840.529 13/8
160 845.815
161 851.101
162 856.388 64/39
163 861.674
164 866.960 33/20
165 872.247
166 877.533
167 882.819 5/3
168 888.106
169 893.392
170 898.678 42/25
171 903.965
172 909.251 M6 22/13
173 914.537 56/33
174 919.824
175 925.110 75/44
176 930.396
177 935.683 55/32
178 940.969
179 946.256
180 951.542 26/15, 45/26
181 956.828
182 962.115
183 967.401 7/4
184 972.687
185 977.974 44/25
186 983.260
187 988.546
188 993.833 m7
189 999.119
190 1004.405 25/14
191 1009.692
192 1014.978
193 1020.264
194 1025.551
195 1030.837
196 1036.123 20/11
197 1041.410
198 1046.696 64/35
199 1051.982
200 1057.269
201 1062.555 24/13
202 1067.841
203 1073.128 13/7
204 1078.414
205 1083.700
206 1088.987 15/8
207 1094.273
208 1099.559 66/35
209 1104.846
210 1110.132
211 1115.419 M7 40/21
212 1120.705 21/11
213 1125.991
214 1131.278 48/25 25/13
215 1136.564
216 1141.850
217 1147.137 64/33
218 1152.423
219 1157.709 39/20
220 1162.996 49/25
221 1168.282 55/28
222 1173.568 63/32 65/33
223 1178.855
224 1184.141
225 1189.427
226 1194.714
227 1200.000 P8 2/1
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