Table of 94edo intervals: Difference between revisions

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| 1
| 1
| 12.766
| 12.766
| 3125/3072
| [[3125/3072]]
| 245/243
| [[245/243]]
| colspan="2" | 99/98
| colspan="2" | [[99/98]]
| colspan="3" | 85/84
| colspan="3" | [[85/84]]
|-
|-
| 2
| 2
| 25.532
| 25.532
| 81/80
| [[81/80]]
| colspan="6" | 50/49
| colspan="6" | [[50/49]]
|-
|-
| 3
| 3
| 38.298
| 38.298
| 250/243
| [[250/243]]
| 49/48
| [[49/48]]
| 45/44
| [[45/44]]
| colspan="4" | 40/39
| colspan="4" | [[40/39]]
|-
|-
| 4
| 4
| 51.064
| 51.064
| 128/125
| [[128/125]]
| 36/35
| [[36/35]]
| colspan="5" | 33/32
| colspan="5" | [[33/32]]
|-
|-
| 5
| 5
| 63.830
| 63.830
| colspan="7" | 25/24
| colspan="7" | [[25/24]]
|-
|-
| 6
| 6
| 76.596
| 76.596
| 648/625
| [[648/625]]
| 256/245
| [[256/245]]
| colspan="5" | 22/21
| colspan="5" | [[22/21]]
|-
|-
| 7
| 7
| 89.362
| 89.362
| 135/128
| [[135/128]]
| colspan="4" | 21/20
| colspan="4" | [[21/20]]
| colspan="2" | 19/18
| colspan="2" | [[19/18]]
|-
|-
| 8
| 8
| 102.128
| 102.128
| 3125/2916
| [[3125/2916]]
| 343/324
| [[343/324]]
| colspan="2" | 35/33
| colspan="2" | [[35/33]]
| colspan="3" | 17/16
| colspan="3" | [[17/16]]
|-
|-
| 9
| 9
| 114.894
| 114.894
| 16/15
| [[16/15]]
| colspan="6" | 15/14
| colspan="6" | [[15/14]]
|-
|-
| 10
| 10
| 127.660
| 127.660
| 625/576
| [[625/576]]
| 175/162
| [[175/162]]
| 121/112
| [[121/112]]
| colspan="4" | 14/13
| colspan="4" | [[14/13]]
|-
|-
| 11
| 11
| 140.426
| 140.426
| colspan="3" | 27/25
| colspan="3" | [[27/25]]
| colspan="4" | 13/12
| colspan="4" | [[13/12]]
|-
|-
| 12
| 12
| 153.191
| 153.191
| 800/729
| [[800/729]]
| 35/32
| [[35/32]]
| colspan="5" | 12/11
| colspan="5" | [[12/11]]
|-
|-
| 13
| 13
| 165.957
| 165.957
| 2048/1875
| [[2048/1875]]
| 54/49
| [[54/49]]
| colspan="5" | 11/10
| colspan="5" | [[11/10]]
|-
|-
| 14
| 14
| 178.723
| 178.723
| colspan="7" | 10/9
| colspan="7" | [[10/9]]
|-
|-
| 15
| 15
| 191.489
| 191.489
| 3456/3125
| [[3456/3125]]
| 384/343
| [[384/343]]
| 49/44
| [[49/44]]
| colspan="2" | 39/35
| colspan="2" | [[39/35]]
| colspan="2" | 19/17
| colspan="2" | [[19/17]]
|-
|-
| 16
| 16
| 204.255
| 204.255
| colspan="7" | 9/8
| colspan="7" | [[9/8]]
|-
|-
| 17
| 17
| 217.021
| 217.021
| 2500/2187
| [[2500/2187]]
| 245/216
| [[245/216]]
| colspan="2" | 25/22
| colspan="2" | [[25/22]]
| colspan="3" | 17/15
| colspan="3" | [[17/15]]
|-
|-
| 18
| 18
| 229.787
| 229.787
| 256/225
| [[256/225]]
| colspan="6" | 8/7
| colspan="6" | [[8/7]]
|-
|-
| 19
| 19
| 242.553
| 242.553
| colspan="2" | 125/108
| colspan="2" | [[125/108]]
| 63/55
| [[63/55]]
| colspan="3" | 15/13
| colspan="3" | [[15/13]]
| colspan="1" | 23/20
| colspan="1" | [[23/20]]
|-
|-
| 20
| 20
| 255.319
| 255.319
| 144/125
| [[144/125]]
| colspan="2" | 81/70
| colspan="2" | [[81/70]]
| 52/45
| [[52/45]]
| 51/44
| [[51/44]]
| colspan="2" | 22/19
| colspan="2" | [[22/19]]
|-
|-
| 21
| 21
| 268.085
| 268.085
| 75/64
| [[75/64]]
| colspan="6" | 7/6
| colspan="6" | [[7/6]]
|-
|-
| 22
| 22
| 280.851
| 280.851
| 729/625
| [[729/625]]
| 288/245
| [[288/245]]
| colspan="2" | 33/28
| colspan="2" | [[33/28]]
| colspan="3" | 20/17
| colspan="3" | [[20/17]]
|-
|-
| 23
| 23
| 293.617
| 293.617
| 32/27
| [[32/27]]
| colspan="2" | 25/21
| colspan="2" | [[25/21]]
| colspan="4" | 13/11
| colspan="4" | [[13/11]]
|-
|-
| 24
| 24
| 306.383
| 306.383
| 3125/2592
| [[3125/2592]]
| 343/288
| [[343/288]]
| colspan="2" | 105/88
| colspan="2" | [[105/88]]
| 81/68
| [[81/68]]
| 68/57
| [[68/57]]
| 55/46
| [[55/46]]
|-
|-
| 25
| 25
| 319.149
| 319.149
| colspan="7" | 6/5
| colspan="7" | [[6/5]]
|-
|-
| 26
| 26
| 331.915
| 331.915
| 625/512
| [[625/512]]
| 98/81
| [[98/81]]
| colspan="2" | 40/33
| colspan="2" | [[40/33]]
| colspan="2" | 17/14
| colspan="2" | [[17/14]]
| colspan="1" | 23/19
| colspan="1" | [[23/19]]
|-
|-
| 27
| 27
| 344.681
| 344.681
| 243/200
| [[243/200]]
| 60/49
| [[60/49]]
| colspan="5" | 11/9
| colspan="5" | [[11/9]]
|-
|-
| 28
| 28
| 357.447
| 357.447
| 100/81
| [[100/81]]
| 49/40
| [[49/40]]
| 27/22
| [[27/22]]
| colspan="4" | 16/13
| colspan="4" | [[16/13]]
|-
|-
| 29
| 29
| 370.213
| 370.213
| 768/625
| [[768/625]]
| 216/175
| [[216/175]]
| 99/80
| [[99/80]]
| 26/21
| [[26/21]]
| colspan="3" | 21/17
| colspan="3" | [[21/17]]
|-
|-
| 30
| 30
| 382.979
| 382.979
| colspan="7" | 5/4
| colspan="7" | [[5/4]]
|-
|-
| 31
| 31
| 395.745
| 395.745
| 3888/3125
| [[3888/3125]]
| 432/343
| [[432/343]]
| colspan="2" | 44/35
| colspan="2" | [[44/35]]
| colspan="3" | 34/27
| colspan="3" | [[34/27]]
|-
|-
| 32
| 32
| 408.511
| 408.511
| 81/64
| [[81/64]]
| colspan="2" | 63/50
| colspan="2" | [[63/50]]
| colspan="2" | 33/26
| colspan="2" | [[33/26]]
| colspan="2" | 19/15
| colspan="2" | [[19/15]]
|-
|-
| 33
| 33
| 421.277
| 421.277
| 625/486
| [[625/486]]
| 245/192
| [[245/192]]
| colspan="4" | 14/11
| colspan="4" | [[14/11]]
| colspan="1" | 23/18
| colspan="1" | [[23/18]]
|-
|-
| 34
| 34
| 434.043
| 434.043
| 32/25
| [[32/25]]
| colspan="6" | 9/7
| colspan="6" | [[9/7]]
|-
|-
| 35
| 35
| 446.809
| 446.809
| 125/96
| [[125/96]]
| colspan="3" | 35/27
| colspan="3" | [[35/27]]
| colspan="3" | 22/17
| colspan="3" | [[22/17]]
|-
|-
| 36
| 36
| 459.574
| 459.574
| 162/125
| [[162/125]]
| 64/49
| [[64/49]]
| 55/42
| [[55/42]]
| colspan="4" | 13/10
| colspan="4" | [[13/10]]
|-
|-
| 37
| 37
| 472.340
| 472.340
| 320/243
| [[320/243]]
| colspan="6" | 21/16
| colspan="6" | [[21/16]]
|-
|-
| 38
| 38
| 485.106
| 485.106
| 4096/3125
| [[4096/3125]]
| 324/245
| [[324/245]]
| colspan="5" | 33/25
| colspan="5" | [[33/25]]
|-
|-
| 39
| 39
| 497.872
| 497.872
| colspan="7" | 4/3
| colspan="7" | [[4/3]]
|-
|-
| 40
| 40
| 510.638
| 510.638
| 3125/2304
| [[3125/2304]]
| 343/256
| [[343/256]]
| 66/49
| [[66/49]]
| colspan="4" | 35/26
| colspan="4" | [[35/26]]
|-
|-
| 41
| 41
| 523.404
| 523.404
| colspan="5" | 27/20
| colspan="5" | [[27/20]]
| colspan="1" | 19/14
| colspan="1" | [[19/14]]
| colspan="1" | 23/17
| colspan="1" | [[23/17]]
|-
|-
| 42
| 42
| 536.170
| 536.170
| 1000/729
| [[1000/729]]
| 49/36
| [[49/36]]
| colspan="5" | 15/11
| colspan="5" | [[15/11]]
|-
|-
| 43
| 43
| 548.936
| 548.936
| 512/375
| [[512/375]]
| 48/35
| [[48/35]]
| colspan="5" | 11/8
| colspan="5" | [[11/8]]
|-
|-
| 44
| 44
| 561.702
| 561.702
| 25/18
| [[25/18]]
| colspan="2" | 25/18
| colspan="2" | [[25/18]]
| colspan="4" | 18/13
| colspan="4" | [[18/13]]
|-
|-
| 45
| 45
| 574.468
| 574.468
| 864/625
| [[864/625]]
| 243/175
| [[243/175]]
| 88/63
| [[88/63]]
| colspan="3" | 39/28
| colspan="3" | [[39/28]]
| 32/23
| [[32/23]]
|-
|-
| 46
| 46
| 587.234
| 587.234
| 45/32
| [[45/32]]
| colspan="6" | 7/5
| colspan="6" | [[7/5]]
|-
|-
| 47
| 47
| 600.000
| 600.000
| 3125/2187
| [[3125/2187]]
| 343/243
| [[343/243]]
| colspan="2" | 99/70
| colspan="2" | [[99/70]]
| colspan="3" | 17/12
| colspan="3" | [[17/12]]
|-
|-
| 48
| 48
| 612.766
| 612.766
| 64/45
| [[64/45]]
| colspan="6" | 10/7
| colspan="6" | [[10/7]]
|-
|-
| 49
| 49
| 625.532
| 625.532
| 625/432
| [[625/432]]
| 343/240
| [[343/240]]
| 63/44
| [[63/44]]
| colspan="3" | 56/39
| colspan="3" | [[56/39]]
| 23/16
| [[23/16]]
|-
|-
| 50
| 50
| 638.298
| 638.298
| 36/25
| [[36/25]]
| colspan="2" | 36/25
| colspan="2" | [[36/25]]
| colspan="4" | 13/9
| colspan="4" | [[13/9]]
|-
|-
| 51
| 51
| 651.064
| 651.064
| 375/256
| [[375/256]]
| 35/24
| [[35/24]]
| colspan="5" | 16/11
| colspan="5" | [[16/11]]
|-
|-
| 52
| 52
| 663.830
| 663.830
| 729/500
| [[729/500]]
| 72/49
| [[72/49]]
| colspan="5" | 22/15
| colspan="5" | [[22/15]]
|-
|-
| 53
| 53
| 676.596
| 676.596
| colspan="5" | 40/27
| colspan="5" | [[40/27]]
| colspan="1" | 28/19
| colspan="1" | [[28/19]]
| colspan="1" | 34/23
| colspan="1" | [[34/23]]
|-
|-
| 54
| 54
| 689.362
| 689.362
| 4608/3125
| [[4608/3125]]
| 512/343
| [[512/343]]
| colspan="5" | 49/33
| colspan="5" | [[49/33]]
|-
|-
| 55
| 55
| 702.128
| 702.128
| colspan="7" | 3/2
| colspan="7" | [[3/2]]
|-
|-
| 56
| 56
| 714.894
| 714.894
| 3125/2048
| [[3125/2048]]
| 245/162
| [[245/162]]
| colspan="5" | 50/33
| colspan="5" | [[50/33]]
|-
|-
| 57
| 57
| 727.660
| 727.660
| 243/160
| [[243/160]]
| colspan="6" | 32/21
| colspan="6" | [[32/21]]
|-
|-
| 58
| 58
| 740.426
| 740.426
| 125/81
| [[125/81]]
| colspan="2" | 49/32
| colspan="2" | [[49/32]]
| colspan="4" | 20/13
| colspan="4" | [[20/13]]
|-
|-
| 59
| 59
| 753.191
| 753.191
| 192/125
| [[192/125]]
| colspan="3" | 54/35
| colspan="3" | [[54/35]]
| colspan="3" | 17/11
| colspan="3" | [[17/11]]
|-
|-
| 60
| 60
| 765.957
| 765.957
| 25/16
| [[25/16]]
| colspan="6" | 14/9
| colspan="6" | [[14/9]]
|-
|-
| 61
| 61
| 778.723
| 778.723
| 972/625
| [[972/625]]
| 384/245
| [[384/245]]
| colspan="4" | 11/7
| colspan="4" | [[11/7]]
| colspan="1" | 36/23
| colspan="1" | [[36/23]]
|-
|-
| 62
| 62
| 791.489
| 791.489
| 128/81
| [[128/81]]
| colspan="2" | 63/40
| colspan="2" | [[63/40]]
| colspan="2" | 52/33
| colspan="2" | [[52/33]]
| colspan="2" | 19/12
| colspan="2" | [[19/12]]
|-
|-
| 63
| 63
| 804.255
| 804.255
| 3125/1944
| [[3125/1944]]
| 343/216
| [[343/216]]
| colspan="2" | 35/22
| colspan="2" | [[35/22]]
| colspan="3" | 27/17
| colspan="3" | [[27/17]]
|-
|-
| 64
| 64
| 817.021
| 817.021
| colspan="7" | 8/5
| colspan="7" | [[8/5]]
|-
|-
| 65
| 65
| 829.787
| 829.787
| 625/384
| [[625/384]]
| 175/108
| [[175/108]]
| 121/75
| [[121/75]]
| colspan="4" | 21/13
| colspan="4" | [[21/13]]
|-
|-
| 66
| 66
| 842.553
| 842.553
| 81/50
| [[81/50]]
| 80/49
| [[80/49]]
| 44/27
| [[44/27]]
| colspan="4" | 13/8
| colspan="4" | [[13/8]]
|-
|-
| 67
| 67
| 855.319
| 855.319
| 400/243
| [[400/243]]
| 49/30
| [[49/30]]
| colspan="5" | 18/11
| colspan="5" | [[18/11]]
|-
|-
| 68
| 68
| 868.085
| 868.085
| 1024/625
| [[1024/625]]
| 81/49
| [[81/49]]
| colspan="2" | 33/20
| colspan="2" | [[33/20]]
| colspan="2" | 28/17
| colspan="2" | [[28/17]]
| colspan="1" | 38/23
| colspan="1" | [[38/23]]
|-
|-
| 69
| 69
| 880.851
| 880.851
| colspan="7" | 5/3
| colspan="7" | [[5/3]]
|-
|-
| 70
| 70
| 893.617
| 893.617
| 5184/3125
| [[5184/3125]]
| 576/343
| [[576/343]]
| 121/72
| [[121/72]]
| colspan="2" | 117/70
| colspan="2" | [[117/70]]
| colspan="2" | 57/34
| colspan="2" | [[57/34]]
|-
|-
| 71
| 71
| 906.383
| 906.383
| colspan="3" | 27/16
| colspan="3" | [[27/16]]
| colspan="4" | 22/13
| colspan="4" | [[22/13]]
|-
|-
| 72
| 72
| 919.149
| 919.149
| 1250/729
| [[1250/729]]
| 245/144
| [[245/144]]
| 56/33
| [[56/33]]
| 56/33
| [[56/33]]
| colspan="3" | 17/10
| colspan="3" | [[17/10]]
|-
|-
| 73
| 73
| 931.915
| 931.915
| 128/75
| [[128/75]]
| colspan="6" | 12/7
| colspan="6" | [[12/7]]
|-
|-
| 74
| 74
| 944.681
| 944.681
| colspan="2" | 125/72
| colspan="2" | [[125/72]]
| 121/70
| [[121/70]]
| colspan="2" | 45/26
| colspan="2" | [[45/26]]
| colspan="2" | 19/11
| colspan="2" | [[19/11]]
|-
|-
| 75
| 75
| 957.447
| 957.447
|  colspan="2"| 216/125
|  colspan="2"| [[216/125]]
| 110/63
| [[110/63]]
| colspan="3" | 26/15
| colspan="3" | [[26/15]]
| colspan="1" | 40/23
| colspan="1" | [[40/23]]
|-
|-
| 76
| 76
| 970.213
| 970.213
| 225/128
| [[225/128]]
| colspan="6" | 7/4
| colspan="6" | [[7/4]]
|-
|-
| 77
| 77
| 982.979
| 982.979
| 2187/1250
| [[2187/1250]]
| 432/245
| [[432/245]]
| colspan="2" | 44/25
| colspan="2" | [[44/25]]
| colspan="3" | 30/17
| colspan="3" | [[30/17]]
|-
|-
| 78
| 78
| 995.745
| 995.745
| colspan="7" | 16/9
| colspan="7" | [[16/9]]
|-
|-
| 79
| 79
| 1008.511
| 1008.511
| 3125/1728
| [[3125/1728]]
| 343/192
| [[343/192]]
| colspan="3" | 88/49
| colspan="3" | [[88/49]]
| colspan="2" | 34/19
| colspan="2" | [[34/19]]
|-
|-
| 80
| 80
| 1021.277
| 1021.277
| colspan="7" | 9/5
| colspan="7" | [[9/5]]
|-
|-
| 81
| 81
| 1034.043
| 1034.043
| 1875/1024
| [[1875/1024]]
| 49/27
| [[49/27]]
| colspan="5" | 20/11
| colspan="5" | [[20/11]]
|-
|-
| 82
| 82
| 1046.809
| 1046.809
| 729/400
| [[729/400]]
| 64/35
| [[64/35]]
| colspan="5" | 11/6
| colspan="5" | [[11/6]]
|-
|-
| 83
| 83
| 1059.574
| 1059.574
| colspan="3" | 50/27
| colspan="3" | [[50/27]]
| colspan="4" | 24/13
| colspan="4" | [[24/13]]
|-
|-
| 84
| 84
| 1072.340
| 1072.340
| 1152/625
| [[1152/625]]
| 324/175
| [[324/175]]
| 224/121
| [[224/121]]
| colspan="4" | 13/7
| colspan="4" | [[13/7]]
|-
|-
| 85
| 85
| 1085.106
| 1085.106
| colspan="7" | 15/8
| colspan="7" | [[15/8]]
|-
|-
| 86
| 86
| 1097.872
| 1097.872
| 5832/3125
| [[5832/3125]]
| 648/343
| [[648/343]]
| 66/35
| [[66/35]]
| 49/26
| [[49/26]]
| colspan="3" | 17/9
| colspan="3" | [[17/9]]
|-
|-
| 87
| 87
| 1110.638
| 1110.638
| 243/128
| [[243/128]]
| colspan="4" | 40/21
| colspan="4" | [[40/21]]
| colspan="2" | 19/10
| colspan="2" | [[19/10]]
|-
|-
| 88
| 88
| 1123.404
| 1123.404
| 625/324
| [[625/324]]
| 245/128
| [[245/128]]
| colspan="5" | 21/11
| colspan="5" | [[21/11]]
|-
|-
| 89
| 89
| 1136.170
| 1136.170
| 48/25
| [[48/25]]
| colspan="6" | 27/14
| colspan="6" | [[27/14]]
|-
|-
| 90
| 90
| 1148.936
| 1148.936
| 125/64
| [[125/64]]
| colspan="3" | 35/18
| colspan="3" | [[35/18]]
| colspan="3" | 33/17
| colspan="3" | [[33/17]]
|-
|-
| 91
| 91
| 1161.702
| 1161.702
| 243/125
| [[243/125]]
| 96/49
| [[96/49]]
| 55/28
| [[55/28]]
| colspan="4" | 39/20
| colspan="4" | [[39/20]]
|-
|-
| 92
| 92
| 1174.468
| 1174.468
| 160/81
| [[160/81]]
| colspan="6" | 49/25
| colspan="6" | [[49/25]]
|-
|-
| 93
| 93
| 1187.234
| 1187.234
| 6144/3125
| [[6144/3125]]
| 486/245
| [[486/245]]
| colspan="5" | 99/50
| colspan="5" | [[99/50]]
|-
|-
| 94
| 94
| 1200.000
| 1200.000
| colspan="7" | 2/1
| colspan="7" | [[2/1]]
|}
|}


Latest revision as of 10:10, 10 December 2025

Assuming 23-limit patent val <94 149 218 264 325 348 384 399 425|, here is a table of intervals as approximated by 94edo steps.

Step Cents 5 limit 7 limit 11 limit 13 limit 17 limit 19 limit 23 limit
1 12.766 3125/3072 245/243 99/98 85/84
2 25.532 81/80 50/49
3 38.298 250/243 49/48 45/44 40/39
4 51.064 128/125 36/35 33/32
5 63.830 25/24
6 76.596 648/625 256/245 22/21
7 89.362 135/128 21/20 19/18
8 102.128 3125/2916 343/324 35/33 17/16
9 114.894 16/15 15/14
10 127.660 625/576 175/162 121/112 14/13
11 140.426 27/25 13/12
12 153.191 800/729 35/32 12/11
13 165.957 2048/1875 54/49 11/10
14 178.723 10/9
15 191.489 3456/3125 384/343 49/44 39/35 19/17
16 204.255 9/8
17 217.021 2500/2187 245/216 25/22 17/15
18 229.787 256/225 8/7
19 242.553 125/108 63/55 15/13 23/20
20 255.319 144/125 81/70 52/45 51/44 22/19
21 268.085 75/64 7/6
22 280.851 729/625 288/245 33/28 20/17
23 293.617 32/27 25/21 13/11
24 306.383 3125/2592 343/288 105/88 81/68 68/57 55/46
25 319.149 6/5
26 331.915 625/512 98/81 40/33 17/14 23/19
27 344.681 243/200 60/49 11/9
28 357.447 100/81 49/40 27/22 16/13
29 370.213 768/625 216/175 99/80 26/21 21/17
30 382.979 5/4
31 395.745 3888/3125 432/343 44/35 34/27
32 408.511 81/64 63/50 33/26 19/15
33 421.277 625/486 245/192 14/11 23/18
34 434.043 32/25 9/7
35 446.809 125/96 35/27 22/17
36 459.574 162/125 64/49 55/42 13/10
37 472.340 320/243 21/16
38 485.106 4096/3125 324/245 33/25
39 497.872 4/3
40 510.638 3125/2304 343/256 66/49 35/26
41 523.404 27/20 19/14 23/17
42 536.170 1000/729 49/36 15/11
43 548.936 512/375 48/35 11/8
44 561.702 25/18 25/18 18/13
45 574.468 864/625 243/175 88/63 39/28 32/23
46 587.234 45/32 7/5
47 600.000 3125/2187 343/243 99/70 17/12
48 612.766 64/45 10/7
49 625.532 625/432 343/240 63/44 56/39 23/16
50 638.298 36/25 36/25 13/9
51 651.064 375/256 35/24 16/11
52 663.830 729/500 72/49 22/15
53 676.596 40/27 28/19 34/23
54 689.362 4608/3125 512/343 49/33
55 702.128 3/2
56 714.894 3125/2048 245/162 50/33
57 727.660 243/160 32/21
58 740.426 125/81 49/32 20/13
59 753.191 192/125 54/35 17/11
60 765.957 25/16 14/9
61 778.723 972/625 384/245 11/7 36/23
62 791.489 128/81 63/40 52/33 19/12
63 804.255 3125/1944 343/216 35/22 27/17
64 817.021 8/5
65 829.787 625/384 175/108 121/75 21/13
66 842.553 81/50 80/49 44/27 13/8
67 855.319 400/243 49/30 18/11
68 868.085 1024/625 81/49 33/20 28/17 38/23
69 880.851 5/3
70 893.617 5184/3125 576/343 121/72 117/70 57/34
71 906.383 27/16 22/13
72 919.149 1250/729 245/144 56/33 56/33 17/10
73 931.915 128/75 12/7
74 944.681 125/72 121/70 45/26 19/11
75 957.447 216/125 110/63 26/15 40/23
76 970.213 225/128 7/4
77 982.979 2187/1250 432/245 44/25 30/17
78 995.745 16/9
79 1008.511 3125/1728 343/192 88/49 34/19
80 1021.277 9/5
81 1034.043 1875/1024 49/27 20/11
82 1046.809 729/400 64/35 11/6
83 1059.574 50/27 24/13
84 1072.340 1152/625 324/175 224/121 13/7
85 1085.106 15/8
86 1097.872 5832/3125 648/343 66/35 49/26 17/9
87 1110.638 243/128 40/21 19/10
88 1123.404 625/324 245/128 21/11
89 1136.170 48/25 27/14
90 1148.936 125/64 35/18 33/17
91 1161.702 243/125 96/49 55/28 39/20
92 1174.468 160/81 49/25
93 1187.234 6144/3125 486/245 99/50
94 1200.000 2/1


Todo: improve synopsis, clarify

Explain what are the criteria for a given interval to appear in this table.

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