User:Contribution/Collection of tunings: Difference between revisions

From Xenharmonic Wiki
Jump to navigation Jump to search
← Older editNewer edit →
VisualWikitext
Contribution (talk | contribs)
3,308 edits
No edit summary
Contribution (talk | contribs)
3,308 edits
No edit summary
Line 402: Line 402:
|}
|}


{{todo|use sigma 1.0|inline=1|comment=instead of sigma 1/2}}
=== Notable Local Maxima of the Riemann Zeta Function after removing the prime 3 from the zeta product ===
 
{|class="wikitable sortable"
|+ style="font-size: 105%;" | Zeta Peak Indexes at sigma = 1, filtered with (height ≥ 2.5 and cents ≥ 40.0) or (height ≥ 2.6 and cents ≥ 15.0) or (height ≥ 2.8 and cents ≥ 12.0) or (height ≥ 3.1 and cents ≥ 6.0)
!colspan="3"|Tuning
!colspan="1"|Strength
!colspan="2"|Closest EDO
!colspan="2"|No-3 Integer limit
|-
!No-3 ZPI analog
!Steps per octave
!Cents
!Height
!EDO
!Octave
!Consistent
!Distinct
|-
|[[no-3 51zpi (σ = 1)]]
|15.9687074547
|75.1469712502
|2.56677
|[[16edo]]
|1202.35154000
|26
|8
|-
|[[no-3 75zpi (σ = 1)]]
|21.0417134383
|57.0295762045
|2.60042
|[[21edo]]
|1197.62110029
|17
|10
|-
|[[no-3 95zpi (σ = 1)]]
|24.9617781085
|48.0734984016
|2.64675
|[[25edo]]
|1201.83746004
|14
|11
|-
|[[no-3 127zpi (σ = 1)]]
|31.0146799866
|38.6913552073
|2.60405
|[[31edo]]
|1199.43201143
|11
|11
|-
|[[no-3 161zpi (σ = 1)]]
|37.0135086000
|32.4205957606
|2.92705
|[[37edo]]
|1199.56204314
|22
|16
|-
|[[no-3 196zpi (σ = 1)]]
|43.0494972034
|27.8748900209
|2.71380
|[[43edo]]
|1198.62027090
|22
|19
|-
|[[no-3 220zpi (σ = 1)]]
|47.0043385196
|25.5295582875
|2.69328
|[[47edo]]
|1199.88923951
|10
|10
|-
|[[no-3 276zpi (σ = 1)]]
|55.9891415481
|21.4327272543
|2.76321
|[[56edo]]
|1200.23272624
|20
|19
|-
|[[no-3 340zpi (σ = 1)]]
|65.9204029312
|18.2037722259
|2.65263
|[[66edo]]
|1201.44896691
|16
|16
|-
|[[no-3 354zpi (σ = 1)]]
|68.0229453080
|17.6411061674
|2.76285
|[[68edo]]
|1199.59521939
|11
|11
|-
|[[no-3 394zpi (σ = 1)]]
|74.0566473758
|16.2038121158
|2.76672
|[[74edo]]
|1199.08209657
|16
|16
|-
|[[no-3 421zpi (σ = 1)]]
|78.0097604150
|15.3826904943
|2.81219
|[[78edo]]
|1199.84985856
|17
|16
|-
|[[no-3 525zpi (σ = 1)]]
|93.0066513531
|12.9023030347
|2.97919
|[[93edo]]
|1199.91418223
|35
|19
|-
|[[no-3 751zpi (σ = 1)]]
|124.013627761
|9.67635591079
|3.13747
|[[124edo]]
|1199.86813294
|28
|26
|}


=== Notable Local Maxima of the Riemann Zeta Function after removing the prime 2 from the zeta product ===
=== Notable Local Maxima of the Riemann Zeta Function after removing the prime 2 from the zeta product ===
Zeta Peak Indexes at sigma = 1, filtered with (height ≥ 1.875 and cents ≥ 6.0)
 
{|class="wikitable sortable"
{|class="wikitable sortable"
|+ style="font-size: 105%;" | Zeta Peak Indexes at sigma = 1, filtered with (height ≥ 1.875 and cents ≥ 6.0)
!colspan="3"|Tuning
!colspan="3"|Tuning
!colspan="1"|Strength
!colspan="1"|Strength
Line 412: Line 556:
!colspan="2"|No-2 Integer limit
!colspan="2"|No-2 Integer limit
|-
|-
!No-2 ZPI analog
!No-2 ZPI (σ = 1)
!Steps per octave
!Steps per octave
!Cents
!Cents
Line 421: Line 565:
!Distinct
!Distinct
|-
|-
|[[no-2 19zpi analog]]
|[[no-2 19zpi (σ = 1)]]
|8.18712929074
|8.18712929074
|146.571521883
|146.571521883
|1.87661
|1.87661
|[[13ed3]]
|[[13edt]]
|1905.42978449
|1905.42978449
|15
|15
|11
|11
|-
|-
|[[no-2 29zpi analog]]
|[[no-2 29zpi (σ = 1)]]
|10.7334869381
|10.7334869381
|111.799642271
|111.799642271
|1.95394
|1.95394
|[[17ed3]]
|[[17edt]]
|1900.59391860
|1900.59391860
|17
|17
|11
|11
|-
|-
|[[no-2 53zpi analog]]
|[[no-2 53zpi (σ = 1)]]
|16.4033618519
|16.4033618519
|73.1557354420
|73.1557354420
|2.01896
|2.01896
|[[26ed3]]
|[[26edt]]
|1902.04912149
|1902.04912149
|21
|21
|15
|15
|-
|-
|[[no-2 71zpi analog]]
|[[no-2 71zpi (σ = 1)]]
|20.2433432017
|20.2433432017
|59.2787460076
|59.2787460076
|2.00269
|2.00269
|[[32ed3]]
|[[32edt]]
|1896.91987224
|1896.91987224
|21
|21
|15
|15
|-
|-
|[[no-2 84zpi analog]]
|[[no-2 84zpi (σ = 1)]]
|22.7835155508
|22.7835155508
|52.6696592247
|52.6696592247
|1.89685
|1.89685
|[[36ed3]]
|[[36edt]]
|1896.10773209
|1896.10773209
|17
|17
|13
|13
|-
|-
|[[no-2 93zpi analog]]
|[[no-2 93zpi (σ = 1)]]
|24.5747239922
|24.5747239922
|48.8306603314
|48.8306603314
|2.12985
|2.12985
|[[39ed3]]
|[[39edt]]
|1904.39575293
|1904.39575293
|15
|15
|15
|15
|-
|-
|[[no-2 106zpi analog]]
|[[no-2 106zpi (σ = 1)]]
|27.1258094838
|27.1258094838
|44.2383111448
|44.2383111448
|1.97822
|1.97822
|[[43ed3]]
|[[43edt]]
|1902.24737923
|1902.24737923
|11
|11
|11
|11
|-
|-
|[[no-2 113zpi analog]]
|[[no-2 113zpi (σ = 1)]]
|28.4085507996
|28.4085507996
|42.2408030759
|42.2408030759
|1.96399
|1.96399
|[[45ed3]]
|[[45edt]]
|1900.83613842
|1900.83613842
|9
|9
|9
|9
|-
|-
|[[no-2 137zpi analog]]
|[[no-2 137zpi (σ = 1)]]
|32.7488975372
|32.7488975372
|36.6424548685
|36.6424548685
|2.02055
|2.02055
|[[52ed3]]
|[[52edt]]
|1905.40765316
|1905.40765316
|25
|25
|15
|15
|-
|-
|[[no-2 151zpi analog]]
|[[no-2 151zpi (σ = 1)]]
|35.3061077059
|35.3061077059
|33.9884534992
|33.9884534992
|2.08576
|2.08576
|[[56ed3]]
|[[56edt]]
|1903.35339595
|1903.35339595
|15
|15
|15
|15
|-
|-
|[[no-2 166zpi analog]]
|[[no-2 166zpi (σ = 1)]]
|37.8594891129
|37.8594891129
|31.6961487891
|31.6961487891
|1.97021
|1.97021
|[[60ed3]]
|[[60edt]]
|1901.76892734
|1901.76892734
|15
|15
|15
|15
|-
|-
|[[no-2 173zpi analog]]
|[[no-2 173zpi (σ = 1)]]
|39.1519961740
|39.1519961740
|30.6497782301
|30.6497782301
|1.99822
|1.99822
|[[62ed3]]
|[[62edt]]
|1900.28625027
|1900.28625027
|9
|9
|9
|9
|-
|-
|[[no-2 199zpi analog]]
|[[no-2 199zpi (σ = 1)]]
|43.5167998698
|43.5167998698
|27.5755571088
|27.5755571088
|2.05686
|2.05686
|[[69ed3]]
|[[69edt]]
|1902.71344050
|1902.71344050
|9
|9
|9
|9
|-
|-
|[[no-2 207zpi analog]]
|[[no-2 207zpi (σ = 1)]]
|44.8164999984
|44.8164999984
|26.7758526445
|26.7758526445
|2.10342
|2.10342
|[[71ed3]]
|[[71edt]]
|1901.08553776
|1901.08553776
|17
|17
|17
|17
|-
|-
|[[no-2 222zpi analog]]
|[[no-2 222zpi (σ = 1)]]
|47.3516876312
|47.3516876312
|25.3422857776
|25.3422857776
|2.11876
|2.11876
|[[75ed3]]
|[[75edt]]
|1900.67143332
|1900.67143332
|15
|15
|15
|15
|-
|-
|[[no-2 233zpi analog]]
|[[no-2 233zpi (σ = 1)]]
|49.1657210129
|49.1657210129
|24.4072491012
|24.4072491012
|2.07714
|2.07714
|[[78ed3]]
|[[78edt]]
|1903.76542989
|1903.76542989
|21
|21
|21
|21
|-
|-
|[[no-2 249zpi analog]]
|[[no-2 249zpi (σ = 1)]]
|51.6879877530
|51.6879877530
|23.2162259002
|23.2162259002
|2.03774
|2.03774
|[[82ed3]]
|[[82edt]]
|1903.73052382
|1903.73052382
|17
|17
|17
|17
|-
|-
|[[no-2 273zpi analog]]
|[[no-2 273zpi (σ = 1)]]
|55.5359583782
|55.5359583782
|21.6076220712
|21.6076220712
|2.19450
|2.19450
|[[88ed3]]
|[[88edt]]
|1901.47074227
|1901.47074227
|11
|11
|11
|11
|-
|-
|[[no-2 289zpi analog]]
|[[no-2 289zpi (σ = 1)]]
|58.0976839265
|58.0976839265
|20.6548681272
|20.6548681272
|1.99993
|1.99993
|[[92ed3]]
|[[92edt]]
|1900.24786771
|1900.24786771
|15
|15
|15
|15
|-
|-
|[[no-2 301zpi analog]]
|[[no-2 301zpi (σ = 1)]]
|59.8907003349
|59.8907003349
|20.0364997118
|20.0364997118
|1.93131
|1.93131
|[[95ed3]]
|[[95edt]]
|1903.46747262
|1903.46747262
|11
|11
|11
|11
|-
|-
|[[no-2 309zpi analog]]
|[[no-2 309zpi (σ = 1)]]
|61.2052267978
|61.2052267978
|19.6061686686
|19.6061686686
|1.96785
|1.96785
|[[97ed3]]
|[[97edt]]
|1901.79836086
|1901.79836086
|11
|11
|11
|11
|-
|-
|[[no-2 317zpi analog]]
|[[no-2 317zpi (σ = 1)]]
|62.4122030931
|62.4122030931
|19.2270091509
|19.2270091509
|2.07392
|2.07392
|[[99ed3]]
|[[99edt]]
|1903.47390594
|1903.47390594
|25
|25
|23
|23
|-
|-
|[[no-2 326zpi analog]]
|[[no-2 326zpi (σ = 1)]]
|63.7602215687
|63.7602215687
|18.8205117623
|18.8205117623
|2.05280
|2.05280
|[[101ed3]]
|[[101edt]]
|1900.87168799
|1900.87168799
|9
|9
|9
|9
|-
|-
|[[no-2 342zpi analog]]
|[[no-2 342zpi (σ = 1)]]
|66.2583876236
|66.2583876236
|18.1109146033
|18.1109146033
|2.06825
|2.06825
|[[105ed3]]
|[[105edt]]
|1901.64603334
|1901.64603334
|17
|17
|17
|17
|-
|-
|[[no-2 363zpi analog]]
|[[no-2 363zpi (σ = 1)]]
|69.4191721809
|69.4191721809
|17.2862908372
|17.2862908372
|2.08043
|2.08043
|[[110ed3]]
|[[110edt]]
|1901.49199210
|1901.49199210
|23
|23
|23
|23
|-
|-
|[[no-2 380zpi analog]]
|[[no-2 380zpi (σ = 1)]]
|71.9200195089
|71.9200195089
|16.6852012582
|16.6852012582
|2.07565
|2.07565
|[[114ed3]]
|[[114edt]]
|1902.11294344
|1902.11294344
|17
|17
|17
|17
|-
|-
|[[no-2 397zpi analog]]
|[[no-2 397zpi (σ = 1)]]
|74.4867252346
|74.4867252346
|16.1102531521
|16.1102531521
|1.92629
|1.92629
|[[118ed3]]
|[[118edt]]
|1901.00987195
|1901.00987195
|15
|15
|15
|15
|-
|-
|[[no-2 409zpi analog]]
|[[no-2 409zpi (σ = 1)]]
|76.2807590080
|76.2807590080
|15.7313589378
|15.7313589378
|1.97954
|1.97954
|[[121ed3]]
|[[121edt]]
|1903.49443147
|1903.49443147
|25
|25
|23
|23
|-
|-
|[[no-2 418zpi analog]]
|[[no-2 418zpi (σ = 1)]]
|77.5713604064
|77.5713604064
|15.4696268534
|15.4696268534
|1.90376
|1.90376
|[[123ed3]]
|[[123edt]]
|1902.76410297
|1902.76410297
|9
|9
|9
|9
|-
|-
|[[no-2 435zpi analog]]
|[[no-2 435zpi (σ = 1)]]
|80.1032694573
|80.1032694573
|14.9806619396
|14.9806619396
|1.99098
|1.99098
|[[127ed3]]
|[[127edt]]
|1902.54406634
|1902.54406634
|11
|11
|11
|11
|-
|-
|[[no-2 453zpi analog]]
|[[no-2 453zpi (σ = 1)]]
|82.6700405439
|82.6700405439
|14.5155366092
|14.5155366092
|2.38406
|2.38406
|[[131ed3]]
|[[131edt]]
|1901.53529581
|1901.53529581
|27
|27
|27
|27
|-
|-
|[[no-2 492zpi analog]]
|[[no-2 492zpi (σ = 1)]]
|88.3238806401
|88.3238806401
|13.5863595587
|13.5863595587
|2.12238
|2.12238
|[[140ed3]]
|[[140edt]]
|1902.09033822
|1902.09033822
|9
|9
|9
|9
|-
|-
|[[no-2 510zpi analog]]
|[[no-2 510zpi (σ = 1)]]
|90.8334979880
|90.8334979880
|13.2109852266
|13.2109852266
|2.23067
|2.23067
|[[144ed3]]
|[[144edt]]
|1902.38187263
|1902.38187263
|39
|39
|27
|27
|-
|-
|[[no-2 519zpi analog]]
|[[no-2 519zpi (σ = 1)]]
|92.1840749628
|92.1840749628
|13.0174327885
|13.0174327885
|1.99259
|1.99259
|[[146ed3]]
|[[146edt]]
|1900.54518712
|1900.54518712
|17
|17
|17
|17
|-
|-
|[[no-2 550zpi analog]]
|[[no-2 550zpi (σ = 1)]]
|96.5187261015
|96.5187261015
|12.4328205362
|12.4328205362
|2.24293
|2.24293
|[[153ed3]]
|[[153edt]]
|1902.22154203
|1902.22154203
|15
|15
|15
|15
|-
|-
|[[no-2 568zpi analog]]
|[[no-2 568zpi (σ = 1)]]
|99.0730275901
|99.0730275901
|12.1122774704
|12.1122774704
|2.00937
|2.00937
|[[157ed3]]
|[[157edt]]
|1901.62756285
|1901.62756285
|11
|11
|11
|11
|-
|-
|[[no-2 577zpi analog]]
|[[no-2 577zpi (σ = 1)]]
|100.316260311
|100.316260311
|11.9621684090
|11.9621684090
|1.98584
|1.98584
|[[159ed3]]
|[[159edt]]
|1901.98477703
|1901.98477703
|11
|11
|11
|11
|-
|-
|[[no-2 596zpi analog]]
|[[no-2 596zpi (σ = 1)]]
|102.908364024
|102.908364024
|11.6608597502
|11.6608597502
|1.96654
|1.96654
|[[163ed3]]
|[[163edt]]
|1900.72013927
|1900.72013927
|15
|15
|15
|15
|-
|-
|[[no-2 609zpi analog]]
|[[no-2 609zpi (σ = 1)]]
|104.713326539
|104.713326539
|11.4598594053
|11.4598594053
|2.00635
|2.00635
|[[166ed3]]
|[[166edt]]
|1902.33666128
|1902.33666128
|11
|11
|11
|11
|-
|-
|[[no-2 614zpi analog]]
|[[no-2 614zpi (σ = 1)]]
|105.436045548
|105.436045548
|11.3813069692
|11.3813069692
|1.92595
|1.92595
|[[167ed3]]
|[[167edt]]
|1900.67826385
|1900.67826385
|23
|23
|23
|23
|-
|-
|[[no-2 627zpi analog]]
|[[no-2 627zpi (σ = 1)]]
|107.244021785
|107.244021785
|11.1894348983
|11.1894348983
|2.29774
|2.29774
|[[170ed3]]
|[[170edt]]
|1902.20393272
|1902.20393272
|15
|15
|15
|15
|-
|-
|[[no-2 646zpi analog]]
|[[no-2 646zpi (σ = 1)]]
|109.793603482
|109.793603482
|10.9295984642
|10.9295984642
|1.96998
|1.96998
|[[174ed3]]
|[[174edt]]
|1901.75013278
|1901.75013278
|15
|15
|15
|15
|-
|-
|[[no-2 655zpi analog]]
|[[no-2 655zpi (σ = 1)]]
|111.085500608
|111.085500608
|10.8024899148
|10.8024899148
|2.00672
|2.00672
|[[176ed3]]
|[[176edt]]
|1901.23822501
|1901.23822501
|21
|21
|21
|21
|-
|-
|[[no-2 659zpi analog]]
|[[no-2 659zpi (σ = 1)]]
|111.586744725
|111.586744725
|10.7539654729
|10.7539654729
|1.88303
|1.88303
|[[177ed3]]
|[[177edt]]
|1903.45188870
|1903.45188870
|7
|7
|7
|7
|-
|-
|[[no-2 687zpi analog]]
|[[no-2 687zpi (σ = 1)]]
|115.412802617
|115.412802617
|10.3974600113
|10.3974600113
|2.18983
|2.18983
|[[183ed3]]
|[[183edt]]
|1902.73518207
|1902.73518207
|15
|15
|15
|15
|-
|-
|[[no-2 697zpi analog]]
|[[no-2 697zpi (σ = 1)]]
|116.734850378
|116.734850378
|10.2797064983
|10.2797064983
|2.15793
|2.15793
|[[185ed3]]
|[[185edt]]
|1901.74570218
|1901.74570218
|29
|29
|29
|29
|-
|-
|[[no-2 706zpi analog]]
|[[no-2 706zpi (σ = 1)]]
|117.949591604
|117.949591604
|10.1738376851
|10.1738376851
|1.91643
|1.91643
|[[187ed3]]
|[[187edt]]
|1902.50764711
|1902.50764711
|11
|11
|11
|11
|-
|-
|[[no-2 725zpi analog]]
|[[no-2 725zpi (σ = 1)]]
|120.530724507
|120.530724507
|9.95596769960
|9.95596769960
|1.89765
|1.89765
|[[191ed3]]
|[[191edt]]
|1901.58983062
|1901.58983062
|5
|5
|5
|5
|-
|-
|[[no-2 729zpi analog]]
|[[no-2 729zpi (σ = 1)]]
|121.102378223
|121.102378223
|9.90897138117
|9.90897138117
|2.05767
|2.05767
|[[192ed3]]
|[[192edt]]
|1902.52250518
|1902.52250518
|17
|17
|17
|17
|-
|-
|[[no-2 748zpi analog]]
|[[no-2 748zpi (σ = 1)]]
|123.601895646
|123.601895646
|9.70858896401
|9.70858896401
|1.91762
|1.91762
|[[196ed3]]
|[[196edt]]
|1902.88343695
|1902.88343695
|11
|11
|11
|11
|-
|-
|[[no-2 753zpi analog]]
|[[no-2 753zpi (σ = 1)]]
|124.304838560
|124.304838560
|9.65368696748
|9.65368696748
|1.91680
|1.91680
|[[197ed3]]
|[[197edt]]
|1901.77633259
|1901.77633259
|21
|21
|21
|21
|-
|-
|[[no-2 767zpi analog]]
|[[no-2 767zpi (σ = 1)]]
|126.183698594
|126.183698594
|9.50994473428
|9.50994473428
|2.05769
|2.05769
|[[200ed3]]
|[[200edt]]
|1901.98894686
|1901.98894686
|9
|9
|9
|9
|-
|-
|[[no-2 777zpi analog]]
|[[no-2 777zpi (σ = 1)]]
|127.486291223
|127.486291223
|9.41277676594
|9.41277676594
|2.21095
|2.21095
|[[202ed3]]
|[[202edt]]
|1901.38090672
|1901.38090672
|17
|17
|17
|17
|-
|-
|[[no-2 810zpi analog]]
|[[no-2 810zpi (σ = 1)]]
|131.822840677
|131.822840677
|9.10312654342
|9.10312654342
|2.25360
|2.25360
|[[209ed3]]
|[[209edt]]
|1902.55344758
|1902.55344758
|21
|21
|21
|21
|-
|-
|[[no-2 829zpi analog]]
|[[no-2 829zpi (σ = 1)]]
|134.373782790
|134.373782790
|8.93031345169
|8.93031345169
|2.13475
|2.13475
|[[213ed3]]
|[[213edt]]
|1902.15676521
|1902.15676521
|29
|29
|29
|29
|-
|-
|[[no-2 839zpi analog]]
|[[no-2 839zpi (σ = 1)]]
|135.657892938
|135.657892938
|8.84578091263
|8.84578091263
|2.11125
|2.11125
|[[215ed3]]
|[[215edt]]
|1901.84289622
|1901.84289622
|15
|15
|15
|15
|-
|-
|[[no-2 858zpi analog]]
|[[no-2 858zpi (σ = 1)]]
|138.196070465
|138.196070465
|8.68331491602
|8.68331491602
|2.20051
|2.20051
|[[219ed3]]
|[[219edt]]
|1901.64596661
|1901.64596661
|11
|11
|11
|11
|-
|-
|[[no-2 878zpi analog]]
|[[no-2 878zpi (σ = 1)]]
|140.756053126
|140.756053126
|8.52538823977
|8.52538823977
|1.91894
|1.91894
|[[223ed3]]
|[[223edt]]
|1901.16157747
|1901.16157747
|15
|15
|15
|15
|-
|-
|[[no-2 882zpi analog]]
|[[no-2 882zpi (σ = 1)]]
|141.320264620
|141.320264620
|8.49135121014
|8.49135121014
|1.94097
|1.94097
|[[224ed3]]
|[[224edt]]
|1902.06267107
|1902.06267107
|17
|17
|17
|17
|-
|-
|[[no-2 902zpi analog]]
|[[no-2 902zpi (σ = 1)]]
|143.873905513
|143.873905513
|8.34063686336
|8.34063686336
|2.09948
|2.09948
|[[228ed3]]
|[[228edt]]
|1901.66520485
|1901.66520485
|11
|11
|11
|11
|-
|-
|[[no-2 911zpi analog]]
|[[no-2 911zpi (σ = 1)]]
|145.102065664
|145.102065664
|8.27004077793
|8.27004077793
|1.96452
|1.96452
|[[230ed3]]
|[[230edt]]
|1902.10937892
|1902.10937892
|23
|23
|23
|23
|-
|-
|[[no-2 921zpi analog]]
|[[no-2 921zpi (σ = 1)]]
|146.379932964
|146.379932964
|8.19784498941
|8.19784498941
|1.96989
|1.96989
|[[232ed3]]
|[[232edt]]
|1901.90003754
|1901.90003754
|9
|9
|9
|9
|-
|-
|[[no-2 945zpi analog]]
|[[no-2 945zpi (σ = 1)]]
|149.470277594
|149.470277594
|8.02835198621
|8.02835198621
|1.92855
|1.92855
|[[237ed3]]
|[[237edt]]
|1902.71942073
|1902.71942073
|19
|19
|19
|19
|-
|-
|[[no-2 965zpi analog]]
|[[no-2 965zpi (σ = 1)]]
|152.075713777
|152.075713777
|7.89080629768
|7.89080629768
|2.10893
|2.10893
|[[241ed3]]
|[[241edt]]
|1901.68431774
|1901.68431774
|15
|15
|15
|15
|-
|-
|[[no-2 985zpi analog]]
|[[no-2 985zpi (σ = 1)]]
|154.604034485
|154.604034485
|7.76176381166
|7.76176381166
|2.40811
|2.40811
|[[245ed3]]
|[[245edt]]
|1901.63213386
|1901.63213386
|21
|21
|21
|21
|-
|-
|[[no-2 995zpi analog]]
|[[no-2 995zpi (σ = 1)]]
|155.863142206
|155.863142206
|7.69906202978
|7.69906202978
|1.88900
|1.88900
|[[247ed3]]
|[[247edt]]
|1901.66832135
|1901.66832135
|7
|7
|7
|7
|-
|-
|[[no-2 1019zpi analog]]
|[[no-2 1019zpi (σ = 1)]]
|158.932236585
|158.932236585
|7.55038767329
|7.55038767329
|1.94652
|1.94652
|[[252ed3]]
|[[252edt]]
|1902.69769367
|1902.69769367
|15
|15
|15
|15
|-
|-
|[[no-2 1029zpi analog]]
|[[no-2 1029zpi (σ = 1)]]
|160.260260060
|160.260260060
|7.48782012177
|7.48782012177
|2.17192
|2.17192
|[[254ed3]]
|[[254edt]]
|1901.90631093
|1901.90631093
|9
|9
|9
|9
|-
|-
|[[no-2 1049zpi analog]]
|[[no-2 1049zpi (σ = 1)]]
|162.750022676
|162.750022676
|7.37327086209
|7.37327086209
|2.14738
|2.14738
|[[258ed3]]
|[[258edt]]
|1902.30388242
|1902.30388242
|17
|17
|17
|17
|-
|-
|[[no-2 1069zpi analog]]
|[[no-2 1069zpi (σ = 1)]]
|165.332187903
|165.332187903
|7.25811480039
|7.25811480039
|2.19607
|2.19607
|[[262ed3]]
|[[262edt]]
|1901.62607770
|1901.62607770
|17
|17
|17
|17
|-
|-
|[[no-2 1083zpi analog]]
|[[no-2 1083zpi (σ = 1)]]
|167.112289634
|167.112289634
|7.18080042243
|7.18080042243
|1.93984
|1.93984
|[[265ed3]]
|[[265edt]]
|1902.91211194
|1902.91211194
|11
|11
|11
|11
|-
|-
|[[no-2 1104zpi analog]]
|[[no-2 1104zpi (σ = 1)]]
|169.714157484
|169.714157484
|7.07071241310
|7.07071241310
|1.92771
|1.92771
|[[269ed3]]
|[[269edt]]
|1902.02163912
|1902.02163912
|15
|15
|15
|15
|-
|-
|[[no-2 1114zpi analog]]
|[[no-2 1114zpi (σ = 1)]]
|170.990381058
|170.990381058
|7.01793862657
|7.01793862657
|1.91502
|1.91502
|[[271ed3]]
|[[271edt]]
|1901.86136780
|1901.86136780
|9
|9
|9
|9
|-
|-
|[[no-2 1134zpi analog]]
|[[no-2 1134zpi (σ = 1)]]
|173.506549648
|173.506549648
|6.91616542681
|6.91616542681
|2.26764
|2.26764
|[[275ed3]]
|[[275edt]]
|1901.94549237
|1901.94549237
|29
|29
|29
|29
|-
|-
|[[no-2 1145zpi analog]]
|[[no-2 1145zpi (σ = 1)]]
|174.860916353
|174.860916353
|6.86259700012
|6.86259700012
|1.98752
|1.98752
|[[277ed3]]
|[[277edt]]
|1900.93936903
|1900.93936903
|15
|15
|15
|15
|-
|-
|[[no-2 1159zpi analog]]
|[[no-2 1159zpi (σ = 1)]]
|176.625850825
|176.625850825
|6.79402247404
|6.79402247404
|2.14379
|2.14379
|[[280ed3]]
|[[280edt]]
|1902.32629273
|1902.32629273
|11
|11
|11
|11
|-
|-
|[[no-2 1179zpi analog]]
|[[no-2 1179zpi (σ = 1)]]
|179.167803205
|179.167803205
|6.69763193238
|6.69763193238
|2.29964
|2.29964
|[[284ed3]]
|[[284edt]]
|1902.12746880
|1902.12746880
|15
|15
|15
|15
|-
|-
|[[no-2 1200zpi analog]]
|[[no-2 1200zpi (σ = 1)]]
|181.734924328
|181.734924328
|6.60302363146
|6.60302363146
|1.98334
|1.98334
|[[288ed3]]
|[[288edt]]
|1901.67080586
|1901.67080586
|11
|11
|11
|11
|-
|-
|[[no-2 1210zpi analog]]
|[[no-2 1210zpi (σ = 1)]]
|183.000523023
|183.000523023
|6.55735830793
|6.55735830793
|1.88033
|1.88033
|[[290ed3]]
|[[290edt]]
|1901.63390930
|1901.63390930
|17
|17
|17
|17
|-
|-
|[[no-2 1225zpi analog]]
|[[no-2 1225zpi (σ = 1)]]
|184.832854856
|184.832854856
|6.49235224405
|6.49235224405
|1.92540
|1.92540
|[[293ed3]]
|[[293edt]]
|1902.25920751
|1902.25920751
|9
|9
|9
|9
|-
|-
|[[no-2 1245zpi analog]]
|[[no-2 1245zpi (σ = 1)]]
|187.354933401
|187.354933401
|6.40495544056
|6.40495544056
|2.28021
|2.28021
|[[297ed3]]
|[[297edt]]
|1902.27176585
|1902.27176585
|21
|21
|21
|21
|-
|-
|[[no-2 1266zpi analog]]
|[[no-2 1266zpi (σ = 1)]]
|189.909845446
|189.909845446
|6.31878772364
|6.31878772364
|2.17116
|2.17116
|[[301ed3]]
|[[301edt]]
|1901.95510482
|1901.95510482
|17
|17
|17
|17
|-
|-
|[[no-2 1297zpi analog]]
|[[no-2 1297zpi (σ = 1)]]
|193.736743714
|193.736743714
|6.19397217583
|6.19397217583
|2.12380
|2.12380
|[[307ed3]]
|[[307edt]]
|1901.54945798
|1901.54945798
|21
|21
|21
|21
|-
|-
|[[no-2 1301zpi analog]]
|[[no-2 1301zpi (σ = 1)]]
|194.272130007
|194.272130007
|6.17690247159
|6.17690247159
|1.87710
|1.87710
|[[308ed3]]
|[[308edt]]
|1902.48596125
|1902.48596125
|7
|7
|7
|7
|-
|-
|[[no-2 1312zpi analog]]
|[[no-2 1312zpi (σ = 1)]]
|195.595668163
|195.595668163
|6.13510519569
|6.13510519569
|1.92538
|1.92538
|[[310ed3]]
|[[310edt]]
|1901.88261066
|1901.88261066
|9
|9
|9
|9
|-
|-
|[[no-2 1332zpi analog]]
|[[no-2 1332zpi (σ = 1)]]
|198.083101013
|198.083101013
|6.05806347873
|6.05806347873
|2.07112
|2.07112
|[[314ed3]]
|[[314edt]]
|1902.23193232
|1902.23193232
|15
|15
|15
|15
|-
|-
|[[no-2 1343zpi analog]]
|[[no-2 1343zpi (σ = 1)]]
|199.415414525
|199.415414525
|6.01758897555
|6.01758897555
|2.36503
|2.36503
|[[316ed3]]
|[[316edt]]
|1901.55811627
|1901.55811627
|39
|39
|39
|39
|}
=== Notable Local Maxima of the Riemann Zeta Function after removing the prime 3 from the zeta product ===
{|class="wikitable sortable"
|+ style="font-size: 105%;" | Zeta Peak Indexes at sigma = 1, filtered with (height ≥ 2.5 and cents ≥ 40.0) or (height ≥ 2.6 and cents ≥ 15.0) or (height ≥ 2.8 and cents ≥ 12.0) or (height ≥ 3.1 and cents ≥ 6.0)
!colspan="3"|Tuning
!colspan="1"|Strength
!colspan="2"|Closest EDO
!colspan="2"|No-3 Integer limit
|-
!No-3 ZPI analog
!Steps per octave
!Cents
!Height
!EDO
!Octave
!Consistent
!Distinct
|-
|[[no-3 51zpi (σ = 1)]]
|15.9687074547
|75.1469712502
|2.56677
|[[16edo]]
|1202.35154000
|26
|8
|-
|[[no-3 75zpi (σ = 1)]]
|21.0417134383
|57.0295762045
|2.60042
|[[21edo]]
|1197.62110029
|17
|10
|-
|[[no-3 95zpi (σ = 1)]]
|24.9617781085
|48.0734984016
|2.64675
|[[25edo]]
|1201.83746004
|14
|11
|-
|[[no-3 127zpi (σ = 1)]]
|31.0146799866
|38.6913552073
|2.60405
|[[31edo]]
|1199.43201143
|11
|11
|-
|[[no-3 161zpi (σ = 1)]]
|37.0135086000
|32.4205957606
|2.92705
|[[37edo]]
|1199.56204314
|22
|16
|-
|[[no-3 196zpi (σ = 1)]]
|43.0494972034
|27.8748900209
|2.71380
|[[43edo]]
|1198.62027090
|22
|19
|-
|[[no-3 220zpi (σ = 1)]]
|47.0043385196
|25.5295582875
|2.69328
|[[47edo]]
|1199.88923951
|10
|10
|-
|[[no-3 276zpi (σ = 1)]]
|55.9891415481
|21.4327272543
|2.76321
|[[56edo]]
|1200.23272624
|20
|19
|-
|[[no-3 340zpi (σ = 1)]]
|65.9204029312
|18.2037722259
|2.65263
|[[66edo]]
|1201.44896691
|16
|16
|-
|[[no-3 354zpi (σ = 1)]]
|68.0229453080
|17.6411061674
|2.76285
|[[68edo]]
|1199.59521939
|11
|11
|-
|[[no-3 394zpi (σ = 1)]]
|74.0566473758
|16.2038121158
|2.76672
|[[74edo]]
|1199.08209657
|16
|16
|-
|[[no-3 421zpi (σ = 1)]]
|78.0097604150
|15.3826904943
|2.81219
|[[78edo]]
|1199.84985856
|17
|16
|-
|[[no-3 525zpi (σ = 1)]]
|93.0066513531
|12.9023030347
|2.97919
|[[93edo]]
|1199.91418223
|35
|19
|-
|[[no-3 751zpi (σ = 1)]]
|124.013627761
|9.67635591079
|3.13747
|[[124edo]]
|1199.86813294
|28
|26
|}
|}


Revision as of 15:52, 27 September 2025

Equal-step tunings

About this list

The table that follows is not a “best-of” roster but a modest snapshot of equal-step tunings that happen to score highly under a few specific mathematical lenses. In particular, it gathers:

  • Prominent peak counts from the classic Riemann zeta function
  • Prominent peaks after removing the prime 2 from the zeta product
  • Prominent peaks after removing the prime 3
  • Prominent peaks after simultaneously removing the primes 2 and 3
  • The α–β–γ family, with an equave sliding from 3/1 down to 4/3

These tunings earn the label “optimized” only relative to the limited set of zeta-derived functions explored here. When you layer many differently pruned zeta functions in a tool such as Wolfram Mathematica, striking peaks emerge almost everywhere; the peaks simply shift as each combination of omitted primes reshapes the landscape. That ubiquity means there is no absolute “good” or “bad” equal-step tuning, only different alignments of primes that reveal different musical affordances.

Consequently, the list below is inherently biased toward a handful of functions and can only hint at the boundless diversity of xenharmonic equal-step systems. Treat it as a useful starting palette, not a definitive canon.

Notable Local Maxima of the Riemann Zeta Function

Zeta Peak Indexes at sigma = 1, filtered with (height ≥ 2.5 and cents ≥ 40.0) or (height ≥ 2.8 and cents ≥ 12.0) or (height ≥ 3.25 and cents ≥ 10.0) or (height ≥ 3.6 and cents ≥ 6.0)
Tuning Strength Closest EDO Integer limit
ZPI (σ = 1) Steps per octave Step size (cents) Height EDO Octave (cents) Consistent Distinct
15zpi (σ = 1) 6.95688550773 172.490980147 2.55384 7edo 1207.43686103 6 5
26zpi (σ = 1) 10.0089746115 119.892401228 2.57426 10edo 1198.92401228 8 5
34zpi (σ = 1) 12.0220488259 99.8165967700 2.85866 12edo 1197.79916124 10 6
42zpi (σ = 1) 13.9020220557 86.3183783764 2.50514 14edo 1208.45729727 7 5
47zpi (σ = 1) 15.0534708836 79.7158349246 2.69313 15edo 1195.73752387 8 7
56zpi (σ = 1) 17.0432556931 70.4090827252 2.65741 17edo 1196.95440633 4 4
65zpi (σ = 1) 18.9489976130 63.3278880767 3.02387 19edo 1203.22987346 10 7
80zpi (σ = 1) 22.0251749360 54.4831086920 2.99601 22edo 1198.62839122 12 8
90zpi (σ = 1) 24.0053572889 49.9888414723 2.82476 24edo 1199.73219533 6 6
100zpi (σ = 1) 25.9356337472 46.2683893402 2.71167 26edo 1202.97812285 14 9
106zpi (σ = 1) 27.0853383248 44.3044124320 2.90524 27edo 1196.21913566 10 8
116zpi (σ = 1) 28.9431579907 41.4605759463 2.68561 29edo 1202.35670244 8 7
127zpi (σ = 1) 30.9779815456 38.7371913897 3.23190 31edo 1200.85293308 12 9
144zpi (σ = 1) 34.0437506778 35.2487600839 3.07414 34edo 1198.45784285 6 6
155zpi (σ = 1) 35.9827898689 33.3492762616 2.80355 36edo 1200.57394542 8 8
184zpi (σ = 1) 40.9880790756 29.2768050385 3.32966 41edo 1200.34900658 16 10
214zpi (σ = 1) 46.0106419996 26.0809227572 3.25119 46edo 1199.72244683 14 11
238zpi (σ = 1) 49.9382924730 24.0296562132 2.90274 50edo 1201.48281066 10 9
257zpi (σ = 1) 52.9969882711 22.6427961125 3.46399 53edo 1200.06819396 10 10
289zpi (σ = 1) 58.0645692462 20.6666477609 3.25823 58edo 1198.66557013 16 12
301zpi (σ = 1) 59.9223835273 20.0259056693 2.98826 60edo 1201.55434016 10 10
321zpi (σ = 1) 63.0197888699 19.0416378969 2.87513 63edo 1199.62318750 8 8
334zpi (σ = 1) 65.0145858034 18.4573966776 3.23462 65edo 1199.73078404 6 6
354zpi (σ = 1) 68.0496579343 17.6341812204 3.14200 68edo 1199.12432299 10 10
380zpi (σ = 1) 71.9512656175 16.6779554147 3.61665 72edo 1200.81278986 18 13
414zpi (σ = 1) 76.9924672555 15.5859403235 3.28825 77edo 1200.11740491 10 10
435zpi (σ = 1) 80.0733926855 14.9862514845 3.14833 80edo 1198.90011876 12 12
462zpi (σ = 1) 83.9950884037 14.2865496400 3.19687 84edo 1200.07016976 10 10
483zpi (σ = 1) 87.0139579095 13.7908908965 3.44872 87edo 1199.80750799 16 14
497zpi (σ = 1) 89.0215260329 13.4798857476 3.02681 89edo 1199.70983154 12 12
532zpi (σ = 1) 93.9843698073 12.7680805059 3.39762 94edo 1200.19956756 24 15
546zpi (σ = 1) 95.9558568688 12.5057504477 2.93099 96edo 1200.55204298 6 6
568zpi (σ = 1) 99.0456175574 12.1156294402 3.56676 99edo 1199.44731458 12 12
596zpi (σ = 1) 102.936325452 11.6576922163 3.25007 103edo 1200.74229828 15 15
655zpi (σ = 1) 111.058159333 10.8051493669 3.39509 111edo 1199.37157972 22 16
706zpi (σ = 1) 117.971388652 10.1719579104 3.62695 118edo 1200.29103343 12 12
796zpi (σ = 1) 130.004267285 9.23046623824 3.72487 130edo 1199.96061097 16 16
872zpi (σ = 1) 139.992781938 8.57187051639 3.60746 140edo 1200.06187229 10 10
965zpi (σ = 1) 152.050659206 7.89210652729 3.68901 152edo 1199.60019215 15 15
1114zpi (σ = 1) 170.995049914 7.01774700849 3.82285 171edo 1200.03473845 14 14
1210zpi (σ = 1) 183.000273182 6.55736726036 3.76064 183edo 1199.99820865 18 18

Notable Local Maxima of the Riemann Zeta Function after removing the prime 3 from the zeta product

Zeta Peak Indexes at sigma = 1, filtered with (height ≥ 2.5 and cents ≥ 40.0) or (height ≥ 2.6 and cents ≥ 15.0) or (height ≥ 2.8 and cents ≥ 12.0) or (height ≥ 3.1 and cents ≥ 6.0)
Tuning Strength Closest EDO No-3 Integer limit
No-3 ZPI analog Steps per octave Cents Height EDO Octave Consistent Distinct
no-3 51zpi (σ = 1) 15.9687074547 75.1469712502 2.56677 16edo 1202.35154000 26 8
no-3 75zpi (σ = 1) 21.0417134383 57.0295762045 2.60042 21edo 1197.62110029 17 10
no-3 95zpi (σ = 1) 24.9617781085 48.0734984016 2.64675 25edo 1201.83746004 14 11
no-3 127zpi (σ = 1) 31.0146799866 38.6913552073 2.60405 31edo 1199.43201143 11 11
no-3 161zpi (σ = 1) 37.0135086000 32.4205957606 2.92705 37edo 1199.56204314 22 16
no-3 196zpi (σ = 1) 43.0494972034 27.8748900209 2.71380 43edo 1198.62027090 22 19
no-3 220zpi (σ = 1) 47.0043385196 25.5295582875 2.69328 47edo 1199.88923951 10 10
no-3 276zpi (σ = 1) 55.9891415481 21.4327272543 2.76321 56edo 1200.23272624 20 19
no-3 340zpi (σ = 1) 65.9204029312 18.2037722259 2.65263 66edo 1201.44896691 16 16
no-3 354zpi (σ = 1) 68.0229453080 17.6411061674 2.76285 68edo 1199.59521939 11 11
no-3 394zpi (σ = 1) 74.0566473758 16.2038121158 2.76672 74edo 1199.08209657 16 16
no-3 421zpi (σ = 1) 78.0097604150 15.3826904943 2.81219 78edo 1199.84985856 17 16
no-3 525zpi (σ = 1) 93.0066513531 12.9023030347 2.97919 93edo 1199.91418223 35 19
no-3 751zpi (σ = 1) 124.013627761 9.67635591079 3.13747 124edo 1199.86813294 28 26

Notable Local Maxima of the Riemann Zeta Function after removing the prime 2 from the zeta product

Zeta Peak Indexes at sigma = 1, filtered with (height ≥ 1.875 and cents ≥ 6.0)
Tuning Strength Closest EDT No-2 Integer limit
No-2 ZPI (σ = 1) Steps per octave Cents Height EDT Tritave Consistent Distinct
no-2 19zpi (σ = 1) 8.18712929074 146.571521883 1.87661 13edt 1905.42978449 15 11
no-2 29zpi (σ = 1) 10.7334869381 111.799642271 1.95394 17edt 1900.59391860 17 11
no-2 53zpi (σ = 1) 16.4033618519 73.1557354420 2.01896 26edt 1902.04912149 21 15
no-2 71zpi (σ = 1) 20.2433432017 59.2787460076 2.00269 32edt 1896.91987224 21 15
no-2 84zpi (σ = 1) 22.7835155508 52.6696592247 1.89685 36edt 1896.10773209 17 13
no-2 93zpi (σ = 1) 24.5747239922 48.8306603314 2.12985 39edt 1904.39575293 15 15
no-2 106zpi (σ = 1) 27.1258094838 44.2383111448 1.97822 43edt 1902.24737923 11 11
no-2 113zpi (σ = 1) 28.4085507996 42.2408030759 1.96399 45edt 1900.83613842 9 9
no-2 137zpi (σ = 1) 32.7488975372 36.6424548685 2.02055 52edt 1905.40765316 25 15
no-2 151zpi (σ = 1) 35.3061077059 33.9884534992 2.08576 56edt 1903.35339595 15 15
no-2 166zpi (σ = 1) 37.8594891129 31.6961487891 1.97021 60edt 1901.76892734 15 15
no-2 173zpi (σ = 1) 39.1519961740 30.6497782301 1.99822 62edt 1900.28625027 9 9
no-2 199zpi (σ = 1) 43.5167998698 27.5755571088 2.05686 69edt 1902.71344050 9 9
no-2 207zpi (σ = 1) 44.8164999984 26.7758526445 2.10342 71edt 1901.08553776 17 17
no-2 222zpi (σ = 1) 47.3516876312 25.3422857776 2.11876 75edt 1900.67143332 15 15
no-2 233zpi (σ = 1) 49.1657210129 24.4072491012 2.07714 78edt 1903.76542989 21 21
no-2 249zpi (σ = 1) 51.6879877530 23.2162259002 2.03774 82edt 1903.73052382 17 17
no-2 273zpi (σ = 1) 55.5359583782 21.6076220712 2.19450 88edt 1901.47074227 11 11
no-2 289zpi (σ = 1) 58.0976839265 20.6548681272 1.99993 92edt 1900.24786771 15 15
no-2 301zpi (σ = 1) 59.8907003349 20.0364997118 1.93131 95edt 1903.46747262 11 11
no-2 309zpi (σ = 1) 61.2052267978 19.6061686686 1.96785 97edt 1901.79836086 11 11
no-2 317zpi (σ = 1) 62.4122030931 19.2270091509 2.07392 99edt 1903.47390594 25 23
no-2 326zpi (σ = 1) 63.7602215687 18.8205117623 2.05280 101edt 1900.87168799 9 9
no-2 342zpi (σ = 1) 66.2583876236 18.1109146033 2.06825 105edt 1901.64603334 17 17
no-2 363zpi (σ = 1) 69.4191721809 17.2862908372 2.08043 110edt 1901.49199210 23 23
no-2 380zpi (σ = 1) 71.9200195089 16.6852012582 2.07565 114edt 1902.11294344 17 17
no-2 397zpi (σ = 1) 74.4867252346 16.1102531521 1.92629 118edt 1901.00987195 15 15
no-2 409zpi (σ = 1) 76.2807590080 15.7313589378 1.97954 121edt 1903.49443147 25 23
no-2 418zpi (σ = 1) 77.5713604064 15.4696268534 1.90376 123edt 1902.76410297 9 9
no-2 435zpi (σ = 1) 80.1032694573 14.9806619396 1.99098 127edt 1902.54406634 11 11
no-2 453zpi (σ = 1) 82.6700405439 14.5155366092 2.38406 131edt 1901.53529581 27 27
no-2 492zpi (σ = 1) 88.3238806401 13.5863595587 2.12238 140edt 1902.09033822 9 9
no-2 510zpi (σ = 1) 90.8334979880 13.2109852266 2.23067 144edt 1902.38187263 39 27
no-2 519zpi (σ = 1) 92.1840749628 13.0174327885 1.99259 146edt 1900.54518712 17 17
no-2 550zpi (σ = 1) 96.5187261015 12.4328205362 2.24293 153edt 1902.22154203 15 15
no-2 568zpi (σ = 1) 99.0730275901 12.1122774704 2.00937 157edt 1901.62756285 11 11
no-2 577zpi (σ = 1) 100.316260311 11.9621684090 1.98584 159edt 1901.98477703 11 11
no-2 596zpi (σ = 1) 102.908364024 11.6608597502 1.96654 163edt 1900.72013927 15 15
no-2 609zpi (σ = 1) 104.713326539 11.4598594053 2.00635 166edt 1902.33666128 11 11
no-2 614zpi (σ = 1) 105.436045548 11.3813069692 1.92595 167edt 1900.67826385 23 23
no-2 627zpi (σ = 1) 107.244021785 11.1894348983 2.29774 170edt 1902.20393272 15 15
no-2 646zpi (σ = 1) 109.793603482 10.9295984642 1.96998 174edt 1901.75013278 15 15
no-2 655zpi (σ = 1) 111.085500608 10.8024899148 2.00672 176edt 1901.23822501 21 21
no-2 659zpi (σ = 1) 111.586744725 10.7539654729 1.88303 177edt 1903.45188870 7 7
no-2 687zpi (σ = 1) 115.412802617 10.3974600113 2.18983 183edt 1902.73518207 15 15
no-2 697zpi (σ = 1) 116.734850378 10.2797064983 2.15793 185edt 1901.74570218 29 29
no-2 706zpi (σ = 1) 117.949591604 10.1738376851 1.91643 187edt 1902.50764711 11 11
no-2 725zpi (σ = 1) 120.530724507 9.95596769960 1.89765 191edt 1901.58983062 5 5
no-2 729zpi (σ = 1) 121.102378223 9.90897138117 2.05767 192edt 1902.52250518 17 17
no-2 748zpi (σ = 1) 123.601895646 9.70858896401 1.91762 196edt 1902.88343695 11 11
no-2 753zpi (σ = 1) 124.304838560 9.65368696748 1.91680 197edt 1901.77633259 21 21
no-2 767zpi (σ = 1) 126.183698594 9.50994473428 2.05769 200edt 1901.98894686 9 9
no-2 777zpi (σ = 1) 127.486291223 9.41277676594 2.21095 202edt 1901.38090672 17 17
no-2 810zpi (σ = 1) 131.822840677 9.10312654342 2.25360 209edt 1902.55344758 21 21
no-2 829zpi (σ = 1) 134.373782790 8.93031345169 2.13475 213edt 1902.15676521 29 29
no-2 839zpi (σ = 1) 135.657892938 8.84578091263 2.11125 215edt 1901.84289622 15 15
no-2 858zpi (σ = 1) 138.196070465 8.68331491602 2.20051 219edt 1901.64596661 11 11
no-2 878zpi (σ = 1) 140.756053126 8.52538823977 1.91894 223edt 1901.16157747 15 15
no-2 882zpi (σ = 1) 141.320264620 8.49135121014 1.94097 224edt 1902.06267107 17 17
no-2 902zpi (σ = 1) 143.873905513 8.34063686336 2.09948 228edt 1901.66520485 11 11
no-2 911zpi (σ = 1) 145.102065664 8.27004077793 1.96452 230edt 1902.10937892 23 23
no-2 921zpi (σ = 1) 146.379932964 8.19784498941 1.96989 232edt 1901.90003754 9 9
no-2 945zpi (σ = 1) 149.470277594 8.02835198621 1.92855 237edt 1902.71942073 19 19
no-2 965zpi (σ = 1) 152.075713777 7.89080629768 2.10893 241edt 1901.68431774 15 15
no-2 985zpi (σ = 1) 154.604034485 7.76176381166 2.40811 245edt 1901.63213386 21 21
no-2 995zpi (σ = 1) 155.863142206 7.69906202978 1.88900 247edt 1901.66832135 7 7
no-2 1019zpi (σ = 1) 158.932236585 7.55038767329 1.94652 252edt 1902.69769367 15 15
no-2 1029zpi (σ = 1) 160.260260060 7.48782012177 2.17192 254edt 1901.90631093 9 9
no-2 1049zpi (σ = 1) 162.750022676 7.37327086209 2.14738 258edt 1902.30388242 17 17
no-2 1069zpi (σ = 1) 165.332187903 7.25811480039 2.19607 262edt 1901.62607770 17 17
no-2 1083zpi (σ = 1) 167.112289634 7.18080042243 1.93984 265edt 1902.91211194 11 11
no-2 1104zpi (σ = 1) 169.714157484 7.07071241310 1.92771 269edt 1902.02163912 15 15
no-2 1114zpi (σ = 1) 170.990381058 7.01793862657 1.91502 271edt 1901.86136780 9 9
no-2 1134zpi (σ = 1) 173.506549648 6.91616542681 2.26764 275edt 1901.94549237 29 29
no-2 1145zpi (σ = 1) 174.860916353 6.86259700012 1.98752 277edt 1900.93936903 15 15
no-2 1159zpi (σ = 1) 176.625850825 6.79402247404 2.14379 280edt 1902.32629273 11 11
no-2 1179zpi (σ = 1) 179.167803205 6.69763193238 2.29964 284edt 1902.12746880 15 15
no-2 1200zpi (σ = 1) 181.734924328 6.60302363146 1.98334 288edt 1901.67080586 11 11
no-2 1210zpi (σ = 1) 183.000523023 6.55735830793 1.88033 290edt 1901.63390930 17 17
no-2 1225zpi (σ = 1) 184.832854856 6.49235224405 1.92540 293edt 1902.25920751 9 9
no-2 1245zpi (σ = 1) 187.354933401 6.40495544056 2.28021 297edt 1902.27176585 21 21
no-2 1266zpi (σ = 1) 189.909845446 6.31878772364 2.17116 301edt 1901.95510482 17 17
no-2 1297zpi (σ = 1) 193.736743714 6.19397217583 2.12380 307edt 1901.54945798 21 21
no-2 1301zpi (σ = 1) 194.272130007 6.17690247159 1.87710 308edt 1902.48596125 7 7
no-2 1312zpi (σ = 1) 195.595668163 6.13510519569 1.92538 310edt 1901.88261066 9 9
no-2 1332zpi (σ = 1) 198.083101013 6.05806347873 2.07112 314edt 1902.23193232 15 15
no-2 1343zpi (σ = 1) 199.415414525 6.01758897555 2.36503 316edt 1901.55811627 39 39

Notable Local Maxima of the Riemann Zeta Function after removing the primes 2 and 3 from the zeta product

Tuning Strength Closest ED5 No-2 No-3 Integer limit
No-2 No-3 ZPI analog Steps per octave Cents Height Integral Gap ED5 Pentave Consistent Distinct
no-2 no-3 55zpi analog 16.7630030425585 71.5862185882446 3.480299 0.477759 9.649416 39ed5 2791.86252494154 13 13
no-2 no-3 125zpi analog 30.5974484926723 39.2189564527704 3.769318 0.448541 9.828199 71ed5 2784.54590814670 19 19
no-2 no-3 176zpi analog 39.5828667040955 30.3161468564337 3.603524 0.421674 10.452207 92ed5 2789.08551079190 11 11
no-2 no-3 186zpi analog 41.3477989230936 29.0221010852836 4.469823 0.556068 11.567493 96ed5 2786.12170418722 35 23
no-2 no-3 212zpi analog 45.6783815054539 26.2706330752267 3.818225 0.433470 10.611042 106ed5 2784.68710597403 13 13
no-2 no-3 235zpi analog 49.4631517377883 24.2604839732289 3.853032 0.428042 10.508697 115ed5 2789.95565692132 25 25
no-2 no-3 284zpi analog 57.2705618247184 20.9531731794898 3.913350 0.465932 11.922515 133ed5 2786.77203287214 17 17
no-2 no-3 298zpi analog 59.4923782274424 20.1706510271339 4.083075 0.465782 11.463643 138ed5 2783.54984174448 23 23
no-2 no-3 312zpi analog 61.6047959566046 19.4790029147292 4.416896 0.501431 11.339301 143ed5 2785.49741680628 25 23
no-2 no-3 340zpi analog 65.8904943328257 18.2120351676004 4.092923 0.526694 13.998526 153ed5 2786.44138064287 13 13
no-2 no-3 368zpi analog 70.2158409653819 17.0901606176251 4.382540 0.518334 12.481351 163ed5 2785.69618067290 19 19
no-2 no-3 423zpi analog 78.3601842342727 15.3138996765548 4.270381 0.502072 12.963711 182ed5 2787.12974113297 19 19
no-2 no-3 438zpi analog 80.4944089071946 14.9078677176639 4.243838 0.450422 11.371118 187ed5 2787.77126320314 7 7
no-2 no-3 465zpi analog 84.4075187897342 14.2167429774745 4.301350 0.486089 12.332303 196ed5 2786.48162358500 17 17
no-2 no-3 477zpi analog 86.1814871554687 13.9241041157161 4.459348 0.505570 12.446285 200ed5 2784.82082314323 25 25
no-2 no-3 565zpi analog 98.6257548378926 12.1672072570942 4.883729 0.545550 12.639964 229ed5 2786.29046187457 29 29
no-2 no-3 581zpi analog 100.797128599965 11.9051010347969 4.579796 0.536282 13.693791 234ed5 2785.79364214247 25 25
no-2 no-3 671zpi analog 113.256639862217 10.5954052800778 5.104294 0.563708 12.937931 263ed5 2786.59158866045 19 19
no-2 no-3 764zpi analog 125.745930952370 9.54305233506547 5.001815 0.548008 12.976730 292ed5 2786.57128183912 37 37
no-2 no-3 905zpi analog 144.300058486204 8.31600494545005 5.030210 0.539592 13.254432 335ed5 2785.86165672577 43 41
no-2 no-3 938zpi analog 148.561761173834 8.07744866861039 5.510552 0.600083 13.846076 345ed5 2786.71979067058 25 25

The α–β–γ family

α–β–γ family
Optimization Equal division of a ratio
Proposed name Steps per octave Cents Optimization method
Alpha 3/1 1.90739592696007 629.130000247254 Dave Benson 3ed3/1
Beta 3/1 3.14186231690763 381.939079106782 Dave Benson 5ed3/1
Alpha 2/1 5.00991270509077 239.525131601721 Dave Benson 5ed2/1
Gamma 3/1 5.04255621376059 237.974540913462 Dave Benson 8ed3/1
Beta 2/1 6.99104980248710 171.648040552235 Dave Benson 7ed2/1
Alpha 5/3 9.50583353877785 126.238272015258 Dave Benson 7ed5/3
Gamma 2/1 11.9978480914311 100.017935787756 Dave Benson 12ed2/1
Beta 5/3 12.2053823008782 98.3172808862904 Dave Benson 9ed5/3
Alpha 3/2 15.3915238996928 77.9649895501219 Dave Benson 9ed3/2
Beta 3/2 18.7990736394111 63.8329325698408 Dave Benson 11ed3/2
Gamma 5/3 21.7094399215509 55.2754932571412 Dave Benson 16ed5/3
Alpha 7/5 22.6653911133366 52.9441558718088 Dave Benson 11ed7/5
Beta 7/5 26.7758951088566 44.8164289231577 Dave Benson 13ed7/5
Alpha 4/3 31.3266790320926 38.3060074376432 Dave Benson 13ed4/3
Gamma 3/2 34.1894540921914 35.0985422804417 Dave Benson 20ed3/2
Beta 4/3 36.1372975038827 33.2066890135065 Dave Benson 15ed4/3
Gamma 7/5 49.4404896216012 24.2716042900130 Dave Benson 24ed7/5
Gamma 4/3 67.4633901646646 17.7874251067289 Dave Benson 28ed4/3

Unequal-step tunings

Unequal-step tunings from equal divisions of a ratio

Tuning Period Mode Why it matters
Stretched hemififth 94\93<2/1> 16 11 16 12 16 11 12
833 Cent Acoustic Golden Scale [11] 25\36<2/1> 3 1 3 3 1 3 1 3 3 1 3
833 Cent Logarithmic Golden Scale [8] ϕ ϕ 1 ϕ ϕ 1 ϕ 1 ϕ
Retrieved from "https://en.xen.wiki/index.php?title=User:Contribution/Collection_of_tunings&oldid=211202"