Table of 103edo intervals: Difference between revisions

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This '''table of [[103edo]] intervals''' assumes [[13-limit]] [[patent val]] {{val|103 163 239 289 356 381}}.  
This '''table of 103edo intervals''' assumes [[17-limit]] [[patent val]] {{val| 103 163 239 289 356 381 421 }} of [[103edo]].  


Intervals highlighted in '''bold''' are prime harmonics or subharmonics. Intervals that differ from their assigned steps by 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.
Intervals highlighted in '''bold''' are prime harmonics or subharmonics. Intervals that differ from their assigned steps by 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.
Line 5: Line 5:
{| class="wikitable center-1 right-2 center-3"
{| class="wikitable center-1 right-2 center-3"
|-
|-
! #
! Degree
! Cents
! Cents
! Marks
! Marks
Line 12: Line 12:
! 11-limit
! 11-limit
! 13-limit
! 13-limit
! 17-limit
|-
|-
|0
| 0
|0.00
| 0.000
|P1
| P1
|colspan="4" | '''[[1/1]]'''
| colspan="5" | '''1/1'''
|-
|-
|1
| 1
|11.650
| 11.650
|
|  
|''[[81/80]]''
| ''81/80''
|[[1029/1024]]
| [[126/125]]
|[[2835/2816]]
| "
|[[512/507]], [[144/143]]
| "
| "
|-
|-
|2
| 2
|23.301
| 23.301
|
|  
|81/80
|  
|[[64/63]]
|  
|[[8192/8085]]
|  
|[[65/64]], [[78/77]]
| 65/64, 66/65, 78/77
| "
|-
|-
|3
| 3
|34.951
| 34.951
|
|  
|''[[128/125]]''
|  
|''64/63'', [[49/48]], [[50/49]]
| 49/48, 50/49, ''64/63''
|
| "
|
| "
| "
|-
|-
|4
| 4
|46.602
| 46.602
|
|  
|128/125
|  
|[[36/35]]
| 36/35
|''[[33/32]]''
| ''33/32''
|[[40/39]], [[1053/1024]], [[416/405]]
| "
| 35/34
|-
|-
|5
| 5
|58.252
| 58.252
|
|  
|
|  
|[[28/27]]
|  
|33/32, [[512/495]]
|  
|[[121/117]]
| ''27/26''
| ''34/33''
|-
|-
|6
| 6
|69.903
| 69.903
|
|  
|[[25/24]]
| 25/24
|
| ''28/27''
|[[126/121]]
| "
|[[176/169]]
| 26/25
| "
|-
|-
|7
| 7
|81.553
| 81.553
|
|  
|''25/24'', [[16384/15625]]
|  
|[[21/20]]
| 21/20
|[[22/21]]
| 22/21
|
| "
| "
|-
|-
|8
| 8
|93.204
| 93.204
|m2
|  
|[[135/128]]
|  
|''21/20''
|  
|[[128/121]], [[5120/4851]]
|  
|[[96/91]], [[325/308]]
|  
| 18/17
|-
|-
|9
| 9
|104.854
| 104.854
|
| m2
|''[[16/15]]''
|  
|[[1225/1152]], [[3584/3375]]
|  
|[[1089/1024]]
|  
|''[[273/256]]'', [[52/49]]
|  
| '''17/16'''
|-
|-
|10
| 10
|116.505
| 116.505
|
|  
|16/15
| 16/15
|[[15/14]]
| 15/14
|[[77/72]]
| "
|
| "
| "
|-
|-
|11
| 11
|128.155
| 128.155
|
|  
|
|  
|
|  
|
|  
|''[[13/12]]'', [[14/13]]
| 14/13
| "
|-
|-
|12
| 12
|139.806
| 139.806
|
|  
|
|  
|[[1024/945]]
|  
|''[[12/11]]''
|  
|[[13/12]]
| 13/12
| "
|-
|-
|13
| 13
|151.456
| 151.456
|
|  
|
|  
|
|  
|12/11, [[275/252]]
| 12/11
|[[16384/15015]]
| "
| "
|-
|-
|14
| 14
|163.107
| 163.107
|
|  
|[[1125/1024]]
|  
|''[[35/32]]''
|  
|[[11/10]]
| 11/10
|[[100/91]]
| "
| "
|-
|-
|15
| 15
|174.757
| 174.757
|
|  
|''[[10/9]]''
|  
|[[567/512]], [[448/405]]
|  
|[[256/231]]
|  
|
| 72/65
| "
|-
|-
|16
| 16
|186.408
| 186.408
|
|  
|10/9
| 10/9
|
| "
|[[49/44]]
| "
|
| "
| "
|-
|-
|17
| 17
|198.058
| 198.058
|
| M2
|''[[9/8]]''
| ''9/8''
|[[28/25]], [[18375/16384]]
| "
|[[121/108]]
| "
|[[175/156]]
| "
| "
|-
|-
|18
| 18
|209.709
| 209.708
|M2
|  
|9/8
|  
|[[640/567]]
|  
|[[2048/1815]]
|  
|[[44/39]]
| 44/39
| "
|-
|-
|19
| 19
|221.359
| 221.359
|
|  
|[[256/225]]
|  
|'''''[[8/7]]'''''
|  
|[[25/22]]
| 25/22
|
| "
| 17/15
|-
|-
|20
| 20
|233.010
| 233.010
|
|  
|[[9375/8192]]
|  
|'''8/7'''
| '''8/7'''
|
| "
|[[143/125]]
| "
| "
|-
|-
|21
| 21
|244.660
| 244.660
|
|  
|[[144/125]]
|  
|[[147/128]]
|  
|
|  
|[[15/13]]
| 15/13
| "
|-
|-
|22
| 22
|256.311
| 256.311
|
|  
|
|  
|''[[7/6]]''
|  
|''[64/55]]'', [[297/256]]
|
|[[196/169]]
| ''52/45''
| "
|-
|-
|23
| 23
|267.961
| 267.961
|
|  
|
|  
|7/6
| 7/6
|
| "
|[[2048/1755]]
| "
| "
|-
|-
|24
| 24
|279.612
| 279.712
|
|
|[[75/64]]
|  
|[[288/245]]
|  
|[[33/28]], [[88/75]], [[1280/1089]]
|  
|[[169/144]], [[1053/896]]
|  
| 20/17
|-
|-
|25
| 25
|291.262
| 291.262
|m3
|  
|[[32/27]]
|  
|
|  
|[[4096/3465]]
|  
|[[13/11]], [[200/169]]
| 13/11
| "
|-
|-
|26
| 26
|302.913
| 303.013
|
| m3
|''32/27''
| ''32/27''
|[[25/21]], [[343/288]]
| 25/21
|
| "
|[[512/429]], [[143/120]]
| "
| "
|-
|-
|27
| 27
|314.563
| 314.563
|
|  
|[[6/5]]
| 6/5
|
| "
|
| "
|[[2457/2048]]
| "
| "
|-
|-
|28
| 28
|326.214
| 326.214
|
|  
|''6/5''
|  
|
|  
|''[[77/64]]'', [[1024/847]], [[2475/2048]]
|  
|''[[63/52]]'', [[169/140]]
| ''63/52'', 65/54
| "
|-
|-
|29
| 29
|337.864
| 337.864
|
|  
|
|  
|[[175/144]]
|  
|
|  
|[[39/32]], [[1280/1053]]
| 39/32
| 17/14
|-
|-
|30
| 30
|349.515
| 349.615
|
|  
|
|  
|[[49/40]], [[60/49]]
| 49/40, 60/49
|[[11/9]]
| 11/9, 27/22
|'''''[[16/13]]''''', ''39/32'', [[175/143]]
| "
| "
|-
|-
|31
| 31
|361.165
| 361.165
|
|  
|
|  
|
|  
|[[8192/6655]], [[154/125]]
|  
|'''16/13''', [[832/675]]
| '''16/13'''
| 21/17
|-
|-
|32
| 32
|372.816
| 372.816
|
|  
|
|  
|
|  
|''[[96/77]]'', [[1024/825]], [[2541/2048]], [[32768/26411]]
|  
|[[26/21]]
| 26/21, ''81/65''
| "
|-
|-
|33
| 33
|384.466
| 384.466
|
|  
|'''[[5/4]]''', [[8192/6561]]
| '''5/4'''
|
| "
|
| "
|[[156/125]]
| "
| "
|-
|-
|34
| 34
|396.117
| 396.117
|
| M3
|'''''5/4'''''
|  
|
| 63/50
|[[121/96]], [[44/35]]
| 44/35
|
| "
| "
|-
|-
|35
| 35
|407.767
| 407.767
|M3
|  
|[[81/64]]
|  
|
|  
|''[[14/11]]''
|  
|
| 33/26
| "
|-
|-
|36
| 36
|419.417
| 419.417
|
|  
|''[[32/25]]''
|  
|[[125/98]], [[32768/25725]]
|  
|14/11, [[275/216]]
| 14/11
|[[8192/6435]], [[312/245]]
| "
| "
|-
|-
|37
| 37
|431.068
| 431.068
|
|  
|32/25
|  
|
| 9/7
|[[77/60]], [[440/343]]
| "
|[[50/39]]
| "
| "
|-
|-
|38
| 38
|442.718
| 442.708
|
|
|
|  
|''[[9/7]]'', [[1323/1024]]
|  
|[[128/99]]
|  
|
|  
| 22/17
|-
|-
|39
| 39
|454.369
| 454.369
|
|  
|
|  
|''[[64/49]]''
|  
|
|  
|[[13/10]]
| 13/10
| "
|-
|-
|40
| 40
|466.019
| 466.019
|
|  
|
|  
|[[21/16]], [[64/49]]
| 21/16
|[[72/55]]
| "
|[[1089/832]]
| "
| 17/13
|-
|-
|41
| 41
|477.670
| 477.670
|
|  
|[[675/512]]
|  
|''21/16''
|  
|
|  
|[[169/128]]
|  
|
|-
|-
|42
| 42
|489.320
| 489.320
|
|  
|'''''[[4/3]]'''''
|  
|[[4096/3087]]
|  
|[[512/385]], [[297/224]]
|  
|''169/128'', [[224/169]], [[65/49]]
| 65/49
| "
|-
|-
|43
| 43
|500.971
| 500.971
|P4
| P4
|'''4/3''', [[10935/8192]]
| '''4/3'''
|[[21875/16384]]
| "
|[[385/288]], [[147/110]], [[720/539]]
| "
|[[243/182]]
| "
| "
|-
|-
|44
| 44
|512.621
| 512.621
|
|  
|''[[27/20]]''
| ''27/20''
|''[[343/256]]'', [[168/125]]
| "
|[[121/90]]
| "
|[[192/143]], [[35/26]], [[3328/2475]]
| "
| "
|-
|-
|45
| 45
|524.272
| 524.272
|
|  
|27/20
|  
|[[256/189]]
|  
|[[693/512]]
|  
|[[65/48]], [[88/65]]
| 65/48
| "
|-
|-
|46
| 46
|535.922
| 535.922
|
|  
|
|  
|''[[48/35]]''
|  
|[[15/11]]
| 15/11
|[[567/416]]
| "
| "
|-
|-
|47
| 47
|547.573
| 547.573
|
|  
|
|  
|48/35
|  
|'''[[11/8]]'''
| '''11/8'''
|
| "
| "
|-
|-
|48
| 48
|559.223
| 559.223
|
|  
|
|  
|[[112/81]]
|  
|'''''11/8''''', [[243/176]], [[8192/5929]], [[2475/1792]]
|  
|[[18/13]]
| 18/13
| "
|-
|-
|49
| 49
|570.874
| 570.874
|
|  
|[[25/18]]
| 25/18
|''[[7/5]]''
| "
|[[245/176]], [[2816/2025]]
| "
|''18/13''
| "
| "
|-
|-
|50
| 50
|582.524
| 582.524
|d5
|  
|
| ''45/32''
|[[7/5]]
| 7/5
|
| "
|
| "
| "
|-
|-
|51
| 51
|594.175
| 594.175
|
| A4
|[[45/32]]
|  
|
|  
|[[512/363]], [[5775/4096]]
|  
|[[128/91]], [[55/39]]
|  
| 24/17
|-
|-
|52
| 52
|605.825
| 605.825
|A4
| d5
|[[64/45]]
|
|
|  
|[[363/256]], [[78/55]], [[8192/5775]]
|  
|[[91/64]]
|  
| 17/12
|-
|-
|53
| 53
|617.476
| 617.476
|
|  
|
| 64/45
|[[10/7]]
| 10/7
|
| "
|
| "
| "
|-
|-
|54
| 54
|629.126
| 629.126
|
|  
|[[36/25]]
| 36/25
|''10/7''
| "
|[[352/245]], [[2025/1408]]
| "
|''[[13/9]]''
| "
| "
|-
|-
|55
| 55
|640.777
| 640.777
|
|  
|
|  
|[[81/56]]
|  
|'''''[[16/11]]''''', [[352/243]], [[5929/4096]], [[3584/2475]]
|  
|13/9
| 13/9
| "
|-
|-
|56
| 56
|652.427
| 652.427
|
|  
|
|  
|[[35/24]]
|  
|'''16/11'''
| '''16/11'''
|
| "
| "
|-
|-
|57
| 57
|664.078
| 664.078
|
|  
|
|  
|''35/24''
|  
|[[22/15]]
| 22/15
|[[832/567]]
| "
| "
|-
|-
|58
| 58
|675.728
| 675.728
|
|  
|[[40/27]]
|  
|[[189/128]]
|  
|[[1024/693]]
|  
|[[96/65]], [[65/44]]
| 96/65
| "
|-
|-
|59
| 59
|687.379
| 687.379
|
|  
|''40/27''
| 40/27
|''[[512/343]]'', [[125/84]]
| "
|[[180/121]]
| "
|[[143/96]], [[52/35]], [[2475/1664]]
| "
| "
|-
|-
|60
| 60
|699.029
| 699.029
|P5
| P5
|'''[[3/2]]''', [[16384/10935]]
| '''3/2'''
|[[32768/21875]]
| "
|[[576/385]], [[220/147]], [[539/360]]
| "
|[[364/243]]
| "
| "
|-
|-
|61
| 61
|710.680
| 710.680
|
|  
|'''''3/2'''''
|  
|[[3087/2048]]
|  
|[[385/256]], [[448/297]]
|  
|''[[256/169]]'', [[169/112]], [[98/65]]
| 98/65
| "
|-
|-
|62
| 62
|722.330
| 722.330
|
|  
|[[1024/675]]
|  
|''[[32/21]]''
|  
|
|  
|256/169
|  
|
|-
|-
|63
| 63
|733.981
| 733.981
|
|  
|
|  
|32/21, [[49/32]]
| 32/21
|[[55/36]]
| "
|[[1664/1089]]
| "
| "
|-
|-
|64
| 64
|745.631
| 745.631
|
|  
|
|  
|''49/32''
|  
|
|  
|[[20/13]]
| 20/13
| "
|-
|-
|65
| 65
|757.282
| 757.282
|
|  
|
|  
|''[[14/9]]'', [[2048/1323]]
|  
|[[99/64]]
|  
|
|  
| 17/11
|-
|-
|66
| 66
|768.932
| 768.932
|
|  
|[[25/16]]
|  
|
| 14/9
|[[120/77]], [[343/220]]
| "
|[[39/25]]
| "
| "
|-
|-
|67
| 67
|780.583
| 780.583
|
|  
|''25/16''
|  
|[[196/125]], [[25725/16384]]
|  
|[[11/7]], [[432/275]]
| 11/7
|[[6435/4096]], [[245/156]]
| "
| "
|-
|-
|68
| 68
|792.233
| 792.233
|m6
|  
|[[128/81]]
|  
|
|  
|''11/7''
|  
|
| 52/33
| "
|-
|-
|69
| 69
|803.883
| 803.883
|
| m6
|'''''[[8/5]]'''''
|  
|
| 100/63
|[[192/121]], [[35/22]]
| 35/22
|
| "
| "
|-
|-
|70
| 70
|815.534
| 815.534
|
|
|'''8/5''', [[6561/4096]]
|  
|
| '''8/5'''
|
| "
|[[125/78]]
| "
| "
|-
|-
|71
| 71
|827.184
| 827.184
|
|  
|
|  
|
|  
|''[[77/48]]'', [[825/512]], [[4096/2541]], [[26411/16384]]
|  
|[[21/13]]
| 21/13, 130/81
| "
|-
|-
|72
| 72
|838.835
| 838.835
|
|  
|
|  
|
|  
|[[6655/4096]], [[125/77]]
|  
|'''[[13/8]]''', [[675/416]]
| '''13/8'''
| 34/21
|-
|-
|73
| 73
|850.485
| 850.485
|
|  
|
|  
|[[80/49]], [[49/30]]
| 49/30, 80/49
|[[18/11]]
| 18/11, 44/27
|'''''13/8''''', ''[[64/39]]''
| "
| "
|-
|-
|74
| 74
|862.136
| 862.136
|
|  
|
|  
|[[288/175]]
|  
|
|  
|64/39, [[1053/640]]
| 64/39
| 28/17
|-
|-
|75
| 75
|873.786
| 873.786
|
|  
|''[[5/3]]''
|  
|
|  
|''[[128/77]]'', [[847/512]], [[4096/2475]]
|  
|''[[104/63]]'', [[280/169]]
| ''104/63'', 108/65
| "
|-
|-
|76
| 76
|885.437
| 885.437
|
|
|5/3
|  
|
| 5/3
|
| "
|[[4096/2457]]
| "
| "
|-
|-
|77
| 77
|897.087
| 897.087
|
| M6
|''[[27/16]]''
| ''27/16''
|[[42/25]], [[576/343]]
| 42/25
|
| "
|[[429/256]], [[240/143]]
| "
| "
|-
|-
|78
| 78
|908.738
| 908.738
|M6
|  
|27/16
|  
|
|  
|[[3465/2048]]
|  
|[[22/13]], [[169/100]]
| 22/13
| "
|-
|-
|79
| 79
|920.388
| 920.388
|
|  
|[[128/75]]
|  
|[[245/144]]
|  
|[[56/33]], [[75/44]], [[1089/640]]
|  
|[[288/169]], [[1792/1053]]
|  
| 17/10
|-
|-
|80
| 80
|932.039
| 932.039
|
|  
|
|  
|[[12/7]]
| 12/7
|
| "
|[[1755/1024]]
| "
| "
|-
|-
|81
| 81
|943.689
| 943.689
|
|  
|
|  
|''12/7''
|  
|''[[55/32]]'', [[512/297]]
| 45/26
|[[169/98]]
| "
| "
|-
|-
|82
| 82
|955.340
| 955.340
|
|  
|[[125/72]]
|  
|[[256/147]]
|  
|
| 26/15
|[[26/15]]
| "
| "
|-
|-
|83
| 83
|966.990
| 966.990
|
|  
|[[16384/9375]]
|  
|'''[[7/4]]'''
| '''7/4'''
|
| "
|[[250/143]]
| "
| "
|-
|-
|84
| 84
|978.641
| 978.641
|
|  
|[[225/128]]
|  
|'''''7/4'''''
|  
|[[44/25]]
| 44/25
|
| "
| 30/17
|-
|-
|85
| 85
|990.291
| 990.291
|m7
|  
|[[16/9]]
|  
|[[567/320]]
|  
|[[1815/1024]]
|  
|[[39/22]]
| 39/22
| "
|-
|-
|86
| 86
|1001.942
| 1001.942
|
| m7
|''16/9''
| ''16/9''
|[[25/14]], [[32768/18375]]
| "
|[[216/121]]
| "
|[[312/175]]
| "
| "
|-
|-
|87
| 87
|1013.592
| 1013.592
|
|  
|[[9/5]]
| 9/5
|
| "
|[[88/49]]
| "
|
| "
| "
|-
|-
|88
| 88
|1025.243
| 1025.243
|
|  
|''9/5''
|  
|[[1024/567]], [[405/224]]
|  
|[[231/128]]
|  
|
| 65/36
| "
|-
|-
|89
| 89
|1036.893
| 1036.893
|
|  
|[[2048/1125]]
|  
|''[[64/35]]''
|  
|[[20/11]]
| 20/11
|[[91/50]]
| "
| "
|-
|-
|90
| 90
|1048.544
| 1048.544
|
|  
|
|  
|
|  
|[[11/6]], [[504/275]]
| 11/6
|[[15015/8192]]
| "
| "
|-
|-
|91
| 91
|1060.194
| 1060.194
|
|  
|
|  
|[[945/512]]
|  
|''11/6''
|  
|[[24/13]]
| 24/13
| "
|-
|-
|92
| 92
|1071.845
| 1071.845
|
|  
|
|  
|
|  
|
|  
|''24/13'', [[13/7]]
| 13/7
| "
|-
|-
|93
| 93
|1083.495
| 1083.495
|
|  
|[[15/8]]
| 15/8
|[[28/15]]
| 28/15
|[[144/77]]
| "
|
| "
| "
|-
|-
|94
| 94
|1095.146
| 1095.146
|
| M7
|''15/8''
| "
|[[2304/1225]], [[3375/1792]]
| "
|[[2048/1089]]
| "
|''[[512/273]]'', [[49/26]]
| "
| '''32/17'''
|-
|-
|95
| 95
|1106.796
| 1106.796
|M7
|  
|[[256/135]]
|  
|''[[40/21]]''
|  
|[[121/64]], [[4851/2560]]
|  
|[[91/48]], [[616/325]]
|  
| 17/9
|-
|-
|96
| 96
|1118.447
| 1118.447
|
|  
|''[[48/25]]'', [[15625/8192]]
|  
|[[40/21]]
| 40/21
|[[21/11]]
| 21/11
|
| "
| "
|-
|-
|97
| 97
|1130.097
| 1130.097
|
|  
|48/25
| 48/25
|
| ''27/14''
|[[121/63]]
| "
|[[169/88]]
| 25/13
| "
|-
|-
|98
| 98
|1141.748
| 1141.748
|
|  
|
|  
|[[27/14]]
|  
|[[64/33]], [[495/256]]
|  
|[[234/121]]
| ''52/27''
| ''33/17''
|-
|-
|99
| 99
|1153.398
| 1153.398
|
|  
|[[125/64]]
|  
|[[35/18]]
| 35/18
|''64/33''
| ''64/33''
|[[39/20]], [[2048/1053]], [[405/208]]
| "
| 68/35
|-
|-
|100
| 100
|1165.049
| 1165.049
|
|  
|''125/64''
|  
|''[[63/32]]'', [[96/49]], [[49/25]]
| 49/25, ''63/32'', 96/49
|
| "
|
| "
| "
|-
|-
|101
| 101
|1176.699
| 1176.699
|
|  
|[[160/81]]
|  
|63/32
|  
|[[8085/4096]]
|  
|[[128/65]], [[77/39]]
| 65/33, 77/39, 128/65
| "
|-
|-
|102
| 102
|1188.350
| 1188.350
|
|  
|''160/81''
| ''160/81''
|[[2048/1029]]
| 125/63
|[[5632/2835]]
| "
|[[507/256]], [[143/72]]
| "
| "
|-
|-
|103
| 103
|1200.000
| 1200.000
|P8
| P8
|colspan="4" | '''[[2/1]]'''
| colspan="5" | '''2/1'''
|}
|}


[[Category:103edo]]
[[Category:103edo]]
[[Category:Tables of edo intervals]]
[[Category:Tables of edo intervals]]

Latest revision as of 15:05, 27 May 2026

This table of 103edo intervals assumes 17-limit patent val 103 163 239 289 356 381 421] of 103edo.

Intervals highlighted in bold are prime harmonics or subharmonics. Intervals that differ from their assigned steps by 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 17-limit
0 0.000 P1 1/1
1 11.650 81/80 126/125 " " "
2 23.301 65/64, 66/65, 78/77 "
3 34.951 49/48, 50/49, 64/63 " " "
4 46.602 36/35 33/32 " 35/34
5 58.252 27/26 34/33
6 69.903 25/24 28/27 " 26/25 "
7 81.553 21/20 22/21 " "
8 93.204 18/17
9 104.854 m2 17/16
10 116.505 16/15 15/14 " " "
11 128.155 14/13 "
12 139.806 13/12 "
13 151.456 12/11 " "
14 163.107 11/10 " "
15 174.757 72/65 "
16 186.408 10/9 " " " "
17 198.058 M2 9/8 " " " "
18 209.708 44/39 "
19 221.359 25/22 " 17/15
20 233.010 8/7 " " "
21 244.660 15/13 "
22 256.311 52/45 "
23 267.961 7/6 " " "
24 279.712 20/17
25 291.262 13/11 "
26 303.013 m3 32/27 25/21 " " "
27 314.563 6/5 " " " "
28 326.214 63/52, 65/54 "
29 337.864 39/32 17/14
30 349.615 49/40, 60/49 11/9, 27/22 " "
31 361.165 16/13 21/17
32 372.816 26/21, 81/65 "
33 384.466 5/4 " " " "
34 396.117 M3 63/50 44/35 " "
35 407.767 33/26 "
36 419.417 14/11 " "
37 431.068 9/7 " " "
38 442.708 22/17
39 454.369 13/10 "
40 466.019 21/16 " " 17/13
41 477.670
42 489.320 65/49 "
43 500.971 P4 4/3 " " " "
44 512.621 27/20 " " " "
45 524.272 65/48 "
46 535.922 15/11 " "
47 547.573 11/8 " "
48 559.223 18/13 "
49 570.874 25/18 " " " "
50 582.524 45/32 7/5 " " "
51 594.175 A4 24/17
52 605.825 d5 17/12
53 617.476 64/45 10/7 " " "
54 629.126 36/25 " " " "
55 640.777 13/9 "
56 652.427 16/11 " "
57 664.078 22/15 " "
58 675.728 96/65 "
59 687.379 40/27 " " " "
60 699.029 P5 3/2 " " " "
61 710.680 98/65 "
62 722.330
63 733.981 32/21 " " "
64 745.631 20/13 "
65 757.282 17/11
66 768.932 14/9 " " "
67 780.583 11/7 " "
68 792.233 52/33 "
69 803.883 m6 100/63 35/22 " "
70 815.534 8/5 " " "
71 827.184 21/13, 130/81 "
72 838.835 13/8 34/21
73 850.485 49/30, 80/49 18/11, 44/27 " "
74 862.136 64/39 28/17
75 873.786 104/63, 108/65 "
76 885.437 5/3 " " "
77 897.087 M6 27/16 42/25 " " "
78 908.738 22/13 "
79 920.388 17/10
80 932.039 12/7 " " "
81 943.689 45/26 " "
82 955.340 26/15 " "
83 966.990 7/4 " " "
84 978.641 44/25 " 30/17
85 990.291 39/22 "
86 1001.942 m7 16/9 " " " "
87 1013.592 9/5 " " " "
88 1025.243 65/36 "
89 1036.893 20/11 " "
90 1048.544 11/6 " "
91 1060.194 24/13 "
92 1071.845 13/7 "
93 1083.495 15/8 28/15 " " "
94 1095.146 M7 " " " " 32/17
95 1106.796 17/9
96 1118.447 40/21 21/11 " "
97 1130.097 48/25 27/14 " 25/13 "
98 1141.748 52/27 33/17
99 1153.398 35/18 64/33 " 68/35
100 1165.049 49/25, 63/32, 96/49 " " "
101 1176.699 65/33, 77/39, 128/65 "
102 1188.350 160/81 125/63 " " "
103 1200.000 P8 2/1
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