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Table of zeta-stretched edos: Difference between revisions

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'''Explanation of what a 'zeta stretched edo' is''': [[The Riemann Zeta Function and Tuning#Optimal Octave Stretch]].
This table lists tuning instructions for [[EDO|equal divisions of the octave]] which have been stretched or compressed using optimal octave stretch based on zeta peaks, as described here: [[the Riemann zeta function and tuning]].


'''Instructions on how to calculate the second column using the free version of Wolfram Cloud''':
All of the tunings listed on this page are [[zeta peak index]] tunings, e.g. 1zpi, 2zpi, 3zpi... However, not all zeta peak index tunings are listed here - only those with intervals close to the octave. For a more complete table see: [[zeta peak index]].
 
=== Calculation instructions ===
How to calculate the third column using the free version of Wolfram Cloud:
#Copy-paste '''Plot[Abs[RiemannSiegelZ[9.06472028x]], {x, 11.9,12.1}]''' into a cell.
#Copy-paste '''Plot[Abs[RiemannSiegelZ[9.06472028x]], {x, 11.9,12.1}]''' into a cell.
#Change "'''11.9'''" and "'''12.1'''" to whatever values you want, e.g. to view the curve around 15edo you might use the values "'''14.9'''" and "'''15.1'''".
#Change "'''11.9'''" and "'''12.1'''" to whatever values you want, e.g. to view the curve around 15edo you might use the values "'''14.9'''" and "'''15.1'''".
Line 7: Line 10:
#In the menu select Evaluation > Evaluate Cells
#In the menu select Evaluation > Evaluate Cells


=== Table ===
{| class="wikitable sortable"
{| class="wikitable sortable"
!Edo
!Edo
!Zeta peak index
!No. of steps per 1200 cents
!No. of steps per 1200 cents
!Step size (cents)
!Step size (cents)
!Octave size (cents)
!Octave size (cents)
!Zeta peak height
!Zeta peak height
!Zeta peak index
!Gram point index
!Gram point index
|-
|-
|1edo
|1edo
|[[1zpi]]
|1.127
|1.127
|1064.774
|1064.774
|1064.774
|1064.774
|1.6
|1.6
|[[1zpi]]
| -1
| -1
|-
|-
|2edo
|2edo
|[[2zpi]]
|1.972
|1.972
|608.519
|608.519
|1217.039
|1217.039
|2.3
|2.3
|[[2zpi]]
|0
|0
|-
|-
|3edo
|3edo
|[[4zpi]]
|3.06
|3.06
|392.157
|392.157
|1176.471
|1176.471
|2.8
|2.8
|[[4zpi]]
|2
|2
|-
|-
|4edo
|4edo
|[[6zpi]]
|3.904
|3.904
|307.377
|307.377
|1229.508
|1229.508
|3.0
|3.0
|[[6zpi]]
|4
|4
|-
|-
|5edo
|5edo
|[[9zpi]]
|5.034
|5.034
|238.379
|238.379
|1191.895
|1191.895
|3.7
|3.7
|[[9zpi]]
|7
|7
|-
|-
|6edo
|6edo
|[[12zpi]]
|6.035
|6.035
|198.840
|198.840
|1193.041
|1193.041
|2.9
|2.9
|[[12zpi]]
|10
|10
|-
|-
|7edo
|7edo
|[[15zpi]]
|6.957
|6.957
|172.488
|172.488
|1207.417
|1207.417
|4.2
|4.2
|[[15zpi]]
|13
|13
|-
|-
|8edo
|8edo
|[[19zpi]]
|8.137
|8.137
|147.474
|147.474
|1179.796
|1179.796
|3.6
|3.6
|[[19zpi]]
|17
|17
|-
|-
|9edo
|9edo
|[[22zpi]]
|8.95
|8.95
|134.078
|134.078
|1206.704
|1206.704
|4.0
|4.0
|[[22zpi]]
|20
|20
|-
|-
|10edo
|10edo
|[[26zpi]]
|10.008
|10.008
|119.904
|119.904
|1199.041
|1199.041
|4.5
|4.5
|[[26zpi]]
|24
|24
|-
|-
|11edo
|11edo
|[[30zpi]]
|11.037
|11.037
|108.725
|108.725
|1195.977
|1195.977
|2.7
|2.7
|[[30zpi]]
|28
|28
|-
|-
|12edo
|12edo
|[[34zpi]]
|12.023
|12.023
|99.809
|99.809
|1197.704
|1197.704
|5.2
|5.2
|[[34zpi]]
|32
|32
|-
|-
|13edo
|13edo
|[[38zpi]]
|12.969
|12.969
|92.528
|92.528
|1202.868
|1202.868
|3.1
|3.1
|[[38zpi]]
|36
|36
|-
|-
|14edo
|14edo
|[[42zpi]]
|13.9
|13.9
|86.331
|86.331
|1208.633
|1208.633
|4.6
|4.6
|[[42zpi]]
|40
|40
|-
|-
|15edo
|15edo
|[[47zpi]]
|15.053
|15.053
|79.718
|79.718
|1195.775
|1195.775
|5.1
|5.1
|[[47zpi]]
|45
|45
|-
|-
|16edo
|16edo
|[[51zpi]]
|15.945
|15.945
|75.259
|75.259
|1204.139
|1204.139
|4.2
|4.2
|[[51zpi]]
|49
|49
|-
|-
|17edo
|17edo
|[[56zpi]]
|17.045
|17.045
|70.402
|70.402
|1196.832
|1196.832
|5.1
|5.1
|[[56zpi]]
|54
|54
|-
|-
|18edo
|18edo
|[[61zpi]]
|18.119
|18.119
|66.229
|66.229
|1192.119
|1192.119
|3.5
|3.5
|[[61zpi]]
|59
|59
|-
|-
|19edo
|19edo
|[[65zpi]]
|18.948
|18.948
|63.331
|63.331
|1203.293
|1203.293
|6.0
|6.0
|[[65zpi]]
|63
|63
|-
|-
|20edo
|20edo
|[[70zpi]]
|19.982
|19.982
|60.054
|60.054
|1201.081
|1201.081
|3.4
|3.4
|[[70zpi]]
|68
|68
|-
|-
|21edo
|21edo
|[[75zpi]]
|21.028
|21.028
|57.067
|57.067
|1198.402
|1198.402
|4.1
|4.1
|[[75zpi]]
|73
|73
|-
|-
|22edo
|22edo
|[[80zpi]]
|22.025
|22.025
|54.484
|54.484
|1198.638
|1198.638
|6.1
|6.1
|[[80zpi]]
|78
|78
|-
|-
|23edo (1st peak)
|23edo (1st peak)
|[[84zpi]]
|22.807
|22.807
|52.615
|52.615
|1210.148
|1210.148
|3.7
|3.7
|[[84zpi]]
|82
|82
|-
|-
|23edo (2nd peak)
|23edo (2nd peak)
|[[85zpi]]
|23.026
|23.026
|52.115
|52.115
|1198.645
|1198.645
|2.2
|2.2
|[[85zpi]]
|83
|83
|-
|-
|24edo
|24edo
|[[90zpi]]
|24.006
|24.006
|49.988
|49.988
|1199.700
|1199.700
|5.7
|5.7
|[[90zpi]]
|88
|88
|-
|-
|25edo
|25edo
|[[95zpi]]
|24.965
|24.965
|48.067
|48.067
|1201.682
|1201.682
|3.9
|3.9
|[[95zpi]]
|93
|93
|-
|-
|26edo
|26edo
|[[100zpi]]
|25.936
|25.936
|46.268
|46.268
|1202.961
|1202.961
|5.6
|5.6
|[[100zpi]]
|98
|98
|-
|-
|27edo
|27edo
|[[106zpi]]
|27.087
|27.087
|44.302
|44.302
|1196.146
|1196.146
|6.1
|6.1
|[[106zpi]]
|104
|104
|-
|-
|28edo
|28edo
|[[111zpi]]
|28.032
|28.032
|42.808
|42.808
|1198.630
|1198.630
|3.7
|3.7
|[[111zpi]]
|109
|109
|-
|-
|29edo
|29edo
|[[116zpi]]
|28.94
|28.94
|41.465
|41.465
|1202.488
|1202.488
|5.6
|5.6
|[[116zpi]]
|114
|114
|-
|-
|30edo
|30edo
|[[122zpi]]
|30.062
|30.062
|39.918
|39.918
|1197.525
|1197.525
|3.3
|3.3
|[[122zpi]]
|120
|120
|-
|-
|31edo
|31edo
|[[127zpi]]
|30.978
|30.978
|38.737
|38.737
|1200.852
|1200.852
|7.0
|7.0
|[[127zpi]]
|125
|125
|-
|-
|32edo
|32edo
|[[133zpi]]
|32.07
|32.07
|37.418
|37.418
|1197.381
|1197.381
|4.5
|4.5
|[[133zpi]]
|131
|131
|-
|-
|33edo
|33edo
|[[138zpi]]
|32.972
|32.972
|36.395
|36.395
|1201.019
|1201.019
|3.3
|3.3
|[[138zpi]]
|136
|136
|-
|-
|34edo
|34edo
|[[144zpi]]
|34.045
|34.045
|35.247
|35.247
|1198.414
|1198.414
|6.7
|6.7
|[[144zpi]]
|142
|142
|-
|-
|35edo
|35edo
|[[149zpi]]
|34.926
|34.926
|34.358
|34.358
|1202.543
|1202.543
|4.2
|4.2
|[[149zpi]]
|147
|147
|-
|-
|36edo
|36edo
|[[155zpi]]
|35.982
|35.982
|33.350
|33.350
|1200.600
|1200.600
|6.0
|6.0
|[[155zpi]]
|153
|153
|-
|-
|37edo
|37edo
|[[161zpi]]
|37.027
|37.027
|32.409
|32.409
|1199.125
|1199.125
|5.3
|5.3
|[[161zpi]]
|159
|159
|-
|-
|38edo (1st peak)
|38edo (1st peak)
|[[166zpi]]
|37.89
|37.89
|31.671
|31.671
|1203.484
|1203.484
|5.8
|5.8
|[[166zpi]]
|164
|164
|-
|-
|38edo (2nd peak)
|38edo (2nd peak)
|[[167zpi]]
|38.103
|38.103
|31.494
|31.494
|1196.756
|1196.756
|2.5
|2.5
|[[167zpi]]
|165
|165
|-
|-
|39edo (1st peak)
|39edo (1st peak)
|[[172zpi]]
|38.916
|38.916
|30.836
|30.836
|1202.590
|1202.590
|2.6
|2.6
|[[172zpi]]
|170
|170
|-
|-
|39edo (2nd peak)
|39edo (2nd peak)
|[[173zpi]]
|39.124
|39.124
|30.672
|30.672
|1196.197
|1196.197
|5.6
|5.6
|[[173zpi]]
|171
|171
|-
|-
|40edo
|40edo
|[[178zpi]]
|39.968
|39.968
|30.024
|30.024
|1200.961
|1200.961
|4.0
|4.0
|[[178zpi]]
|176
|176
|-
|-
|41edo
|41edo
|[[184zpi]]
|40.988
|40.988
|29.277
|29.277
|1200.351
|1200.351
|7.6
|7.6
|[[184zpi]]
|182
|182
|-
|-
|42edo
|42edo
|[[190zpi]]
|41.999
|41.999
|28.572
|28.572
|1200.029
|1200.029
|2.7
|2.7
|[[190zpi]]
|188
|188
|-
|-
|43edo
|43edo
|[[196zpi]]
|43.027
|43.027
|27.889
|27.889
|1199.247
|1199.247
|6.2
|6.2
|[[196zpi]]
|194
|194
|-
|-
|44edo
|44edo
|[[202zpi]]
|44.015
|44.015
|27.263
|27.263
|1199.591
|1199.591
|4.6
|4.6
|[[202zpi]]
|200
|200
|-
|-
|45edo (1st peak)
|45edo (1st peak)
|[[207zpi]]
|44.84
|44.84
|26.762
|26.762
|1204.282
|1204.282
|5.3
|5.3
|[[207zpi]]
|205
|205
|-
|-
|45edo (2nd peak)
|45edo (2nd peak)
|[[208zpi]]
|45.035
|45.035
|26.646
|26.646
|1199.067
|1199.067
|2.1
|2.1
|[[208zpi]]
|206
|206
|-
|-
|46edo
|46edo
|[[214zpi]]
|46.009
|46.009
|26.082
|26.082
|1199.765
|1199.765
|7.5
|7.5
|[[214zpi]]
|212
|212
|-
|-
|47edo
|47edo
|[[220zpi]]
|47.006
|47.006
|25.529
|25.529
|1199.847
|1199.847
|4.3
|4.3
|[[220zpi]]
|218
|218
|-
|-
|48edo
|48edo
|[[226zpi]]
|47.988
|47.988
|25.006
|25.006
|1200.300
|1200.300
|5.8
|5.8
|[[226zpi]]
|224
|224
|-
|-
|49edo (1st peak)
|49edo (1st peak)
|[[232zpi]]
|48.945
|48.945
|24.517
|24.517
|1201.348
|1201.348
|2.2
|2.2
|[[232zpi]]
|230
|230
|-
|-
|49edo (2nd peak)
|49edo (2nd peak)
|[[233zpi]]
|49.141
|49.141
|24.420
|24.420
|1196.557
|1196.557
|5.7
|5.7
|[[233zpi]]
|231
|231
|-
|-
|50edo
|50edo
|[[238zpi]]
|49.939
|49.939
|24.029
|24.029
|1201.466
|1201.466
|6.7
|6.7
|[[238zpi]]
|236
|236
|-
|-
|51edo
|51edo
|[[245zpi]]
|51.079
|51.079
|23.493
|23.493
|1198.144
|1198.144
|4.8
|4.8
|[[245zpi]]
|243
|243
|-
|-
|52edo
|52edo
|[[251zpi]]
|52.043
|52.043
|23.058
|23.058
|1199.009
|1199.009
|4.1
|4.1
|[[251zpi]]
|249
|249
|-
|-
|53edo
|53edo
|[[257zpi]]
|52.997
|52.997
|22.643
|22.643
|1200.068
|1200.068
|8.2
|8.2
|[[257zpi]]
|255
|255
|-
|-
|54edo (1st peak)
|54edo (1st peak)
|[[263zpi]]
|53.949
|53.949
|22.243
|22.243
|1201.134
|1201.134
|2.0
|2.0
|[[263zpi]]
|261
|261
|-
|-
|54edo (2nd peak)
|54edo (2nd peak)
|[[264zpi]]
|54.116
|54.116
|22.175
|22.175
|1197.428
|1197.428
|3.5
|3.5
|[[264zpi]]
|262
|262
|-
|-
|55edo
|55edo
|[[269zpi]]
|54.894
|54.894
|21.860
|21.860
|1202.317
|1202.317
|5.3
|5.3
|[[269zpi]]
|267
|267
|-
|-
|56edo
|56edo
|[[276zpi]]
|56.008
|56.008
|21.426
|21.426
|1199.829
|1199.829
|6.1
|6.1
|[[276zpi]]
|274
|274
|-
|-
|57edo
|57edo
|[[282zpi]]
|56.968
|56.968
|21.064
|21.064
|1200.674
|1200.674
|4.9
|4.9
|[[282zpi]]
|280
|280
|-
|-
|58edo
|58edo
|[[289zpi]]
|58.067
|58.067
|20.666
|20.666
|1198.615
|1198.615
|7.8
|7.8
|[[289zpi]]
|287
|287
|-
|-
|59edo
|59edo
|[[295zpi]]
|58.992
|58.992
|20.342
|20.342
|1200.163
|1200.163
|4.0
|4.0
|[[295zpi]]
|293
|293
|-
|-
|60edo
|60edo
|[[301zpi]]
|59.92
|59.92
|20.027
|20.027
|1201.602
|1201.602
|7.1
|7.1
|[[301zpi]]
|299
|299
|-
|-
|61edo
|61edo
|[[308zpi]]
|61.003
|61.003
|19.671
|19.671
|1199.941
|1199.941
|3.7
|3.7
|[[308zpi]]
|306
|306
|-
|-
|62edo
|62edo
|[[314zpi]]
|61.938
|61.938
|19.374
|19.374
|1201.201
|1201.201
|6.3
|6.3
|[[314zpi]]
|312
|312
|-
|-
|63edo
|63edo
|[[321zpi]]
|63.019
|63.019
|19.042
|19.042
|1199.638
|1199.638
|6.8
|6.8
|[[321zpi]]
|319
|319
|-
|-
|64edo
|64edo
|[[328zpi]]
|64.099
|64.099
|18.721
|18.721
|1198.147
|1198.147
|3.6
|3.6
|[[328zpi]]
|326
|326
|-
|-
|65edo
|65edo
|[[334zpi]]
|65.016
|65.016
|18.457
|18.457
|1199.705
|1199.705
|7.8
|7.8
|[[334zpi]]
|332
|332
|-
|-
|66edo
|66edo
|[[340zpi]]
|65.916
|65.916
|18.205
|18.205
|1201.529
|1201.529
|4.5
|4.5
|[[340zpi]]
|338
|338
|-
|-
|67edo
|67edo
|[[347zpi]]
|66.998
|66.998
|17.911
|17.911
|1200.036
|1200.036
|5.3
|5.3
|[[347zpi]]
|345
|345
|-
|-
|68edo
|68edo
|[[354zpi]]
|68.049
|68.049
|17.634
|17.634
|1199.136
|1199.136
|7.7
|7.7
|[[354zpi]]
|352
|352
|-
|-
|69edo
|69edo
|[[360zpi]]
|68.96
|68.96
|17.401
|17.401
|1200.696
|1200.696
|4.1
|4.1
|[[360zpi]]
|358
|358
|-
|-
|70edo
|70edo
|[[367zpi]]
|70.004
|70.004
|17.142
|17.142
|1199.931
|1199.931
|5.7
|5.7
|[[367zpi]]
|365
|365
|-
|-
|71edo
|71edo
|[[374zpi]]
|71.059
|71.059
|16.887
|16.887
|1199.004
|1199.004
|3.8
|3.8
|[[374zpi]]
|372
|372
|-
|-
|72edo
|72edo
|[[380zpi]]
|71.951
|71.951
|16.678
|16.678
|1200.817
|1200.817
|9.2
|9.2
|[[380zpi]]
|378
|378
|-
|-
|73edo
|73edo
|[[387zpi]]
|72.984
|72.984
|16.442
|16.442
|1200.263
|1200.263
|3.4
|3.4
|[[387zpi]]
|385
|385
|-
|-
|74edo
|74edo
|[[394zpi]]
|74.052
|74.052
|16.205
|16.205
|1199.157
|1199.157
|5.1
|5.1
|[[394zpi]]
|392
|392
|-
|-
|75edo
|75edo
|[[401zpi]]
|75.091
|75.091
|15.981
|15.981
|1198.546
|1198.546
|6.0
|6.0
|[[401zpi]]
|399
|399
|-
|-
|76edo
|76edo
|[[407zpi]]
|75.968
|75.968
|15.796
|15.796
|1200.505
|1200.505
|2.6
|2.6
|[[407zpi]]
|405
|405
|-
|-
|77edo
|77edo
|[[414zpi]]
|76.992
|76.992
|15.586
|15.586
|1200.125
|1200.125
|8.2
|8.2
|[[414zpi]]
|412
|412
|-
|-
|78edo
|78edo
|[[420zpi]]
|78.021
|78.021
|15.380
|15.380
|1199.677
|1199.677
|5.4
|5.4
|[[420zpi]]
|418
|418
|-
|-
|79edo
|79edo
|[[427zpi]]
|78.892
|78.892
|15.211
|15.211
|1201.643
|1201.643
|5.8
|5.8
|[[427zpi]]
|425
|425
|-
|-
|80edo
|80edo
|[[435zpi]]
|80.073
|80.073
|14.986
|14.986
|1198.906
|1198.906
|7.9
|7.9
|[[435zpi]]
|433
|433
|-
|-
|81edo
|81edo
|[[441zpi]]
|80.947
|80.947
|14.825
|14.825
|1200.786
|1200.786
|5.2
|5.2
|[[441zpi]]
|439
|439
|-
|-
|82edo
|82edo
|[[448zpi]]
|81.954
|81.954
|14.642
|14.642
|1200.674
|1200.674
|6.7
|6.7
|[[448zpi]]
|446
|446
|-
|-
|83edo
|83edo
|[[455zpi]]
|82.967
|82.967
|14.464
|14.464
|1200.477
|1200.477
|3.9
|3.9
|[[455zpi]]
|453
|453
|-
|-
|84edo
|84edo
|[[462zpi]]
|83.997
|83.997
|14.286
|14.286
|1200.043
|1200.043
|8.0
|8.0
|[[462zpi]]
|460
|460
|-
|-
|85edo
|85edo
|[[469zpi]]
|84.991
|84.991
|14.119
|14.119
|1200.127
|1200.127
|3.0
|3.0
|[[469zpi]]
|467
|467
|-
|-
|86edo
|86edo
|[[476zpi]]
|86.019
|86.019
|13.950
|13.950
|1199.735
|1199.735
|2.4
|2.4
|[[476zpi]]
|474
|474
|-
|-
|87edo
|87edo
|[[483zpi]]
|87.014
|87.014
|13.791
|13.791
|1199.807
|1199.807
|8.9
|8.9
|[[483zpi]]
|481
|481
|-
|-
|88edo
|88edo
|[[490zpi]]
|88.027
|88.027
|13.632
|13.632
|1199.632
|1199.632
|2.6
|2.6
|[[490zpi]]
|488
|488
|-
|-
|89edo
|89edo
|[[497zpi]]
|89.023
|89.023
|13.480
|13.480
|1199.690
|1199.690
|7.6
|7.6
|[[497zpi]]
|495
|495
|-
|-
|90edo
|90edo
|[[504zpi]]
|90.006
|90.006
|13.332
|13.332
|1199.920
|1199.920
|4.8
|4.8
|[[504zpi]]
|502
|502
|-
|-
|91edo (1st peak)
|91edo (1st peak)
|[[510zpi]]
|90.852
|90.852
|13.208
|13.208
|1201.955
|1201.955
|6.7
|6.7
|[[510zpi]]
|508
|508
|-
|-
|91edo (2nd peak)
|91edo (2nd peak)
|[[511zpi]]
|91.033
|91.033
|13.182
|13.182
|1199.565
|1199.565
|3.4
|3.4
|[[511zpi]]
|509
|509
|-
|-
|92edo
|92edo
|[[518zpi]]
|91.993
|91.993
|13.044
|13.044
|1200.091
|1200.091
|4.5
|4.5
|[[518zpi]]
|516
|516
|-
|-
|93edo
|93edo
|[[525zpi]]
|93.002
|93.002
|12.903
|12.903
|1199.974
|1199.974
|5.6
|5.6
|[[525zpi]]
|523
|523
|-
|-
|94edo
|94edo
|[[532zpi]]
|93.984
|93.984
|12.768
|12.768
|1200.204
|1200.204
|8.8
|8.8
|[[532zpi]]
|530
|530
|-
|-
|95edo (1st peak)
|95edo (1st peak)
|[[539zpi]]
|94.962
|94.962
|12.637
|12.637
|1200.480
|1200.480
|0.9
|0.9
|[[539zpi]]
|537
|537
|-
|-
|95edo (2nd peak)
|95edo (2nd peak)
|[[540zpi]]
|95.117
|95.117
|12.616
|12.616
|1198.524
|1198.524
|5.3
|5.3
|[[540zpi]]
|538
|538
|-
|-
|96edo
|96edo
|[[546zpi]]
|95.954
|95.954
|12.506
|12.506
|1200.575
|1200.575
|7.3
|7.3
|[[546zpi]]
|544
|544
|-
|-
|97edo
|97edo
|[[553zpi]]
|96.925
|96.925
|12.381
|12.381
|1200.929
|1200.929
|4.2
|4.2
|[[553zpi]]
|551
|551
|-
|-
|98edo
|98edo
|[[560zpi]]
|97.923
|97.923
|12.255
|12.255
|1200.944
|1200.944
|4.3
|4.3
|[[560zpi]]
|558
|558
|-
|-
|99edo
|99edo
|[[568zpi]]
|99.047
|99.047
|12.115
|12.115
|1199.431
|1199.431
|9.4
|9.4
|[[568zpi]]
|566
|566
|-
|-
|100edo
|100edo
|[[575zpi]]
|100.024
|100.024
|11.997
|11.997
|1199.712
|1199.712
|4.3
|4.3
|[[575zpi]]
|573
|573
|-
|-
|270edo
|270edo
|[[1936zpi]]
|270.018
|270.018
|4.444
|4.444
|1199.920
|1199.920
|13.4
|13.4
|[[1936zpi]]
|1934
|1934
|-
|-
|311edo
|311edo
|[[2293zpi]]
|311.004
|311.004
|3.858
|3.858
|1199.985
|1199.985
|13.1
|13.1
|[[2293zpi]]
|2291
|2291
|-
|-
|342edo
|342edo
|[[2568zpi]]
|341.975
|341.975
|3.509
|3.509
|1200.088
|1200.088
|13.5
|13.5
|[[2568zpi]]
|2566
|2566
|-
|-
|494edo
|494edo
|[[3971zpi]]
|494.014
|494.014
|2.429
|2.429
|1199.966
|1199.966
|14.7
|14.7
|[[3971zpi]]
|3969
|3969
|-
|-
|684edo
|684edo
|[[5818zpi]]
|683.939
|683.939
|1.755
|1.755
|1200.107
|1200.107
|14.3
|14.3
|[[5818zpi]]
|5816
|5816
|}
|}
Retrieved from "https://en.xen.wiki/w/Table_of_zeta-stretched_edos"