User:Contribution/Successive superparticular complementary pair: Difference between revisions

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{{todo|Finish the article and move it|inline=1|comment=When the article is finished and the table explained, move it to the main root}}
== Context ==


For each pair of superparticular ratios <math>{s1}/{s2}</math>​ and <math>{s2}/{s3}</math>, there exists a ratio <math>{a}/{b}</math> such that <math>{s1}/{s2}</math>​ and <math>{s2}/{s3}</math>​ are <math>{a}/{b}</math> complementary; it is observed that <math>a−b=1</math> or <math>a−b=2</math>.
Read this first: [[Equal-step_tuning#Alpha-beta-gamma_family_of_equal_divisions]]
In other words, for each ratio <math>a/b</math> where <math>a−b=1</math> or <math>a−b=2</math>, there exists a pair of superparticular ratios <math>{s1}/{s2}</math>​ and <math>{s2}/{s3}</math> that are <math>{a}/{b}</math> complementary.


Bellow is a table that show for equal divisions of <math>a/b</math> the cent error in the mapping of superparticular ratios <math>{s1}/{s2}</math>​ and <math>{s2}/{s3}</math> that are <math>a/b</math> complementary.
== The Alpha-Beta-Gamma family ==
 
We can observe a converging sequence and pattern for low errors: 5, 7, 12; then 7, 9, 16; then 9, 11, 20; then 11, 13, 24; then 13, 15, 28; then 15, 17, 32; then 17, 19, 36; then 19, 21, 40; then 21, 23, 44; etc. --
 
{{todo|Table|inline=1|comment=Explain the table.}}
 
{{todo|Pattern|inline=1|comment=Clarify the observed pattern and create a descriptive name for it, such as the "Alpha-Beta-Gamma pattern" or the "Alpha-Beta-Gamma class" when referring to the group of scales. Assign distinct names to each scale within this class. For instance, 5edo might be called "2/1 Alpha", 7edo could be "2/1 Beta", and 12edo could be "2/1 Gamma". Additionally, compute the Dave Benson optimization for each scale as an alternative tuning. Note: 23edo with stretched octave is "7/5 Alpha".
Consider this second version for naming: "Alpha 2/1, Beta 2/1, Gamma 2/1, Alpha 7/5." Consistency and Clarity: The second version ("Alpha 2/1, Beta 2/1, Gamma 2/1, Alpha 7/5") places the descriptive name ("Alpha," "Beta," "Gamma") before the ratio. This makes it clear that "Alpha," "Beta," "Gamma," and so on are categories or types, while "2/1" and "7/5" are specific tunings or ratios within those categories. This ordering helps maintain a logical structure that is easier to follow.}}
 
{{todo|Add data|inline=1|comment=Include columns for the following optimizations: Pure Equave, Dave Benson, TE, POTE, and CTE. To prevent the table from becoming overcrowded, choose between using cents or EDO. Cents are preferable since these are EDONOI. Retain the EDO column for pure equaves to provide a sense of scale, but place it outside the optimization subgroup column.}}


{| class="wikitable"
{| class="wikitable"
|+
|+
|-
|-
! colspan="2" | Intervals !! colspan="2" | Tuning !! colspan="2" | Mapping !! colspan="4" | Various optimizations
! colspan="3" | Tuning !! colspan="2" | Intervals !! colspan="2" | Mappings
|-
|-
! Name
! Equal division
! Steps per octave
! Equave
! Equave
! SSCP
! SSC pair
! Equal division
! Steps (Equave, SSC pair)
! Name
! Errors (cent)
! Mappings (Equave, SSCP)
! Errors
! Pure Equave (EDO)
! Pure Equave (Cent)
! Dave Benson (EDO)
! Dave Benson (Cent)
|-
|-
| [[Alpha 3/1]]
| [[3edt|3ed3/1]]
| 1.89278926071437
| rowspan="3" | 3/1
| rowspan="3" | 3/1
| rowspan="3" | 2/1, 3/2
| rowspan="3" | 2/1, 3/2
| [[3edt|3ed3/1]]
| [[Alpha 3/1]]
| 3\3<3/1>, 2\3<3/1>, 1\3<3/1>
| 3\3<3/1>, 2\3<3/1>, 1\3<3/1>
| 0, 67.970, -67.970
| 0, 67.970, -67.970
| 1.89278926071437
| 633.985000288462
| 1.90739592696007
| 629.130000247254
|-
|-
| [[Beta 3/1]]
| [[5edt|5ed3/1]]
| [[5edt|5ed3/1]]
| [[Beta 3/1]]
| 3.15464876785729
| 5\5<3/1>, 3\5<3/1>, 2\5<3/1>
| 5\5<3/1>, 3\5<3/1>, 2\5<3/1>
| 0, -58.827, 58.827
| 0, -58.827, 58.827
| 3.15464876785729
| 380.391000173077
| 3.14186231690763
| 381.939079106782
|-
|-
| [[Gamma 3/1]]
| [[8edt|8ed3/1]]
| [[8edt|8ed3/1]]
| [[Gamma 3/1]]
| 5.04743802857166
| 8\8<3/1>, 5\8<3/1>, 3\8<3/1>
| 8\8<3/1>, 5\8<3/1>, 3\8<3/1>
| 0, -11.278, 11.278
| 0, -11.278, 11.278
| 5.04743802857166
| 237.744375108173
| 5.04255621376059
| 237.974540913462
|-
|-
| [[Alpha 2/1]]
| [[5edo|5ed2/1]]
| 5
| rowspan="3" | 2/1
| rowspan="3" | 2/1
| rowspan="3" | 3/2, 4/3
| rowspan="3" | 3/2, 4/3
| [[5edo|5ed2/1]]
| [[Alpha 2/1]]
| 5\5<2/1>, 3\5<2/1>, 2\5<2/1>
| 5\5<2/1>, 3\5<2/1>, 2\5<2/1>
| 0, 18.045, -18.045
| 0, 18.045, -18.045
| 5.00000000000000
| 240.000000000000
| 5.00991270509077
| 239.525131601721
|-
|-
| [[Beta 2/1]]
| [[7edo|7ed2/1]]
| [[7edo|7ed2/1]]
| [[Beta 2/1]]
| 7
| 7\7<2/1>, 4\7<2/1>, 3\7<2/1>
| 7\7<2/1>, 4\7<2/1>, 3\7<2/1>
| 0, -16.241, 16.241
| 0, -16.241, 16.241
| 7.00000000000000
| 171.428571428571
| 6.99104980248710
| 171.648040552235
|-
|-
| [[Gamma 2/1]]
| [[12edo|12ed2/1]]
| [[12edo|12ed2/1]]
| [[Gamma 2/1]]
| 12
| 12\12<2/1>, 7\12<2/1>, 5\12<2/1>
| 12\12<2/1>, 7\12<2/1>, 5\12<2/1>
| 0, -1.955, 1.955
| 0, -1.955, 1.955
| 12.0000000000000
| 100.000000000000
| 11.9978480914311
| 100.017935787756
|-
|-
| [[Alpha 5/3]]
| [[7ed5/3]]
| 9.49840814199707
| rowspan="3" | 5/3
| rowspan="3" | 5/3
| rowspan="3" | 4/3, 5/4
| rowspan="3" | 4/3, 5/4
| [[7ed5/3]]
| [[Alpha 5/3]]
| 7\7<5/3>, 4\7<5/3>, 3\7<5/3>
| 7\7<5/3>, 4\7<5/3>, 3\7<5/3>
| 0, 7.303, -7.303
| 0, 7.303, -7.303
| 9.49840814199707
| 126.336958999921
| 9.50583353877785
| 126.238272015258
|-
|-
| [[Beta 5/3]]
| [[9ed5/3]]
| [[9ed5/3]]
| [[Beta 5/3]]
| 12.2122390397105
| 9\9<5/3>, 5\9<5/3>, 4\9<5/3>
| 9\9<5/3>, 5\9<5/3>, 4\9<5/3>
| 0, -6.735, 6.735
| 0, -6.735, 6.735
| 12.2122390397105
| 98.2620792221608
| 12.2053823008782
| 98.3172808862904
|-
|-
| [[Gamma 5/3]]
| [[16ed5/3]]
| [[16ed5/3]]
| [[Gamma 5/3]]
| 21.7106471817076
| 16\16<5/3>, 9\16<5/3>, 7\16<5/3>
| 16\16<5/3>, 9\16<5/3>, 7\16<5/3>
| 0, -0.593, 0.593
| 0, -0.593, 0.593
| 21.7106471817076
| 55.2724195624655
| 21.7094399215509
| 55.2754932571412
|-
|-
| [[Carlos Alpha|Alpha 3/2]]
| [[9edf|9ed3/2]]
| 15.3856016221631
| rowspan="3" | 3/2
| rowspan="3" | 3/2
| rowspan="3" | 5/4, 6/5
| rowspan="3" | 5/4, 6/5
| [[9edf|9ed3/2]]
| [[Carlos Alpha|Alpha 3/2]]
| 9\9<3/2>, 5\9<3/2>, 4\9<3/2>
| 9\9<3/2>, 5\9<3/2>, 4\9<3/2>
| 0, 3.661, -3.661
| 0, 3.661, -3.661
| 15.3856016221631
| 77.9950000961542
| 15.3915238996928
| 77.9649895501219
|-
|-
| [[Carlos Beta|Beta 3/2]]
| [[11edf|11ed3/2]]
| [[11edf|11ed3/2]]
| [[Carlos Beta|Beta 3/2]]
| 18.8046242048660
| 11\11<3/2>, 6\11<3/2>, 5\11<3/2>
| 11\11<3/2>, 6\11<3/2>, 5\11<3/2>
| 0, -3.429, 3.429
| 0, -3.429, 3.429
| 18.8046242048660
| 63.8140909877625
| 18.7990736394111
| 63.8329325698408
|-
|-
| [[Carlos Gamma|Gamma 3/2]]
| [[20edf|20ed3/2]]
| [[20edf|20ed3/2]]
| [[Carlos Gamma|Gamma 3/2]]
| 34.1902258270291
| 20\20<3/2>, 11\20<3/2>, 9\20<3/2>
| 20\20<3/2>, 11\20<3/2>, 9\20<3/2>
| 0, -0.238, 0.238
| 0, -0.238, 0.238
| 34.1902258270291
| 35.0977500432694
| 34.1894540921914
| 35.0985422804417
|-
|-
| [[Alpha 7/5]]
| [[11ed7/5]]
| 22.6604698881676
| rowspan="3" | 7/5
| rowspan="3" | 7/5
| rowspan="3" | 6/5, 7/6
| rowspan="3" | 6/5, 7/6
| [[11ed7/5]]
| [[Alpha 7/5]]
| 11\11<7/5>, 6\11<7/5>, 5\11<7/5>
| 11\11<7/5>, 6\11<7/5>, 5\11<7/5>
| 0, 2.093, -2.093
| 0, 2.093, -2.093
| 22.6604698881676
| 52.9556538731173
| 22.6653911133366
| 52.9441558718088
|-
|-
| [[Beta 7/5]]
| [[13ed7/5]]
| [[13ed7/5]]
| [[Beta 7/5]]
| 26.7805553223799
| 13\13<7/5>, 7\13<7/5>, 6\13<7/5>
| 13\13<7/5>, 7\13<7/5>, 6\13<7/5>
| 0, -1.981, 1.981
| 0, -1.981, 1.981
| 26.7805553223799
| 44.8086302003300
| 26.7758951088566
| 44.8164289231577
|-
|-
| [[Gamma 7/5]]
| [[24ed7/5]]
| [[24ed7/5]]
| [[Gamma 7/5]]
| 49.4410252105475
| 24\24<7/5>, 13\24<7/5>, 11\24<7/5>
| 24\24<7/5>, 13\24<7/5>, 11\24<7/5>
| 0, -0.114, 0.114
| 0, -0.114, 0.114
| 49.4410252105475
| 24.2713413585121
| 49.4404896216012
| 24.2716042900130
|-
|-
| [[Alpha 4/3]]
| [[13ed4/3]]
| 31.3224709154917
| rowspan="3" | 4/3
| rowspan="3" | 4/3
| rowspan="3" | 7/6, 8/7
| rowspan="3" | 7/6, 8/7
| [[13ed4/3]]
| [[Alpha 4/3]]
| 13\13<4/3>, 7\13<4/3>, 6\13<4/3>
| 13\13<4/3>, 7\13<4/3>, 6\13<4/3>
| 0, 1.307, -1.307
| 0, 1.307, -1.307
| 31.3224709154917
| 38.3111537795856
| 31.3266790320926
| 38.3060074376432
|-
|-
| [[Beta 4/3]]
| [[15ed4/3]]
| [[15ed4/3]]
| [[Beta 4/3]]
| 36.1413125947981
| 15\15<4/3>, 8\15<4/3>, 7\15<4/3>
| 15\15<4/3>, 8\15<4/3>, 7\15<4/3>
| 0, -1.247, 1.247
| 0, -1.247, 1.247
| 36.1413125947981
| 33.2029999423075
| 36.1372975038827
| 33.2066890135066
|-
|-
| [[Gamma 4/3]]
| [[28ed4/3]]
| [[28ed4/3]]
| [[Gamma 4/3]]
| 67.4637835102899
| 28\28<4/3>, 15\28<4/3>, 13\28<4/3>
| 28\28<4/3>, 15\28<4/3>, 13\28<4/3>
| 0, -0.061, 0.061
| 0, -0.061, 0.061
| 67.4637835102899
| 17.7873213976647
| 67.4633901646646
| 17.7874251067289
|-
|-
| [[Alpha 9/7]]
| [[15ed9/7]]
| 41.3713123417559
| rowspan="3" | 9/7
| rowspan="3" | 9/7
| rowspan="3" | 8/7, 9/8
| rowspan="3" | 8/7, 9/8
| [[15ed9/7]]
| [[Alpha 9/7]]
| 15\15<9/7>, 8\15<9/7>, 7\15<9/7>
| 15\15<9/7>, 8\15<9/7>, 7\15<9/7>
| 0, 0.871, -0.871
| 0, 0.871, -0.871
| 41.3713123417559
| 29.0056063507767
| 41.3749871639859
| 29.0030301458200
|-
|-
| [[Beta 9/7]]
| [[17ed9/7]]
| [[17ed9/7]]
| [[Beta 9/7]]
| 46.8874873206567
| 17\17<9/7>, 9\17<9/7>, 8\17<9/7>
| 17\17<9/7>, 9\17<9/7>, 8\17<9/7>
| 0, -0.835, 0.835
| 0, -0.835, 0.835
| 46.8874873206567
| 25.5931820742147
| 46.8839609068713
| 25.5951070854196
|-
|-
| [[Gamma 9/7]]
| [[32ed9/7]]
| [[32ed9/7]]
| [[Gamma 9/7]]
| 88.2587996624126
| 32\32<9/7>, 17\32<9/7>, 15\32<9/7>
| 32\32<9/7>, 17\32<9/7>, 15\32<9/7>
| 0, -0.036, 0.036
| 0, -0.036, 0.036
| 88.2587996624126
| 13.5963779769266
| 88.2584985804157
| 13.5964243591413
|-
|-
| [[Alpha 5/4]]
| [[17ed5/4]]
| 52.8068232315916
| rowspan="3" | 5/4
| rowspan="3" | 5/4
| rowspan="3" | 9/8, 10/9
| rowspan="3" | 9/8, 10/9
| [[17ed5/4]]
| [[Alpha 5/4]]
| 17\17<5/4>, 9\17<5/4>, 8\17<5/4>
| 17\17<5/4>, 9\17<5/4>, 8\17<5/4>
| 0, 0.609, -0.609
| 0, 0.609, -0.609
| 52.8068232315916
| 22.7243361096962
| 52.8100843743057
| 22.7229328303033
|-
|-
| [[Beta 5/4]]
| [[19ed5/4]]
| [[19ed5/4]]
| [[Beta 5/4]]
| 59.0193906706024
| 19\19<5/4>, 10\19<5/4>, 9\19<5/4>
| 19\19<5/4>, 10\19<5/4>, 9\19<5/4>
| 0, -0.587, 0.587
| 0, -0.587, 0.587
| 59.0193906706024
| 20.3323007297281
| 59.0162471250305
| 20.3333837452881
|-
|-
| [[Gamma 5/4]]
| [[36ed5/4]]
| [[36ed5/4]]
| [[Gamma 5/4]]
| 111.826213902194
| 36\36<5/4>, 19\36<5/4>, 17\36<5/4>
| 36\36<5/4>, 19\36<5/4>, 17\36<5/4>
| 0, -0.022, 0.022
| 0, -0.022, 0.022
| 111.826213902194
| 10.7309364962454
| 111.825976049766
| 10.7309593208108
|-
|-
| [[Alpha 11/9]]
| [[19ed11/9]]
| 65.6288971357202
| rowspan="3" | 11/9
| rowspan="3" | 11/9
| rowspan="3" | 10/9, 11/10
| rowspan="3" | 10/9, 11/10
| [[19ed11/9]]
| [[Alpha 11/9]]
| 19\19<11/9>, 10\19<11/9>, 9\19<11/9>
| 19\19<11/9>, 10\19<11/9>, 9\19<11/9>
| 0, 0.443, -0.443
| 0, 0.443, -0.443
| 65.6288971357202
| 18.2846284544201
| 65.6318281194766
| 18.2838119001578
|-
|-
| [[Beta 11/9]]
| [[21ed11/9]]
| [[21ed11/9]]
| [[Beta 11/9]]
| 72.5372020973750
| 21\21<11/9>, 11\21<11/9>, 10\21<11/9>
| 21\21<11/9>, 11\21<11/9>, 10\21<11/9>
| 0, -0.428, 0.428
| 0, -0.428, 0.428
| 72.5372020973750
| 16.5432352682849
| 72.5343665614942
| 16.5438819815521
|-
|-
| [[Gamma 11/9]]
| [[40ed11/9]]
| [[40ed11/9]]
| [[Gamma 11/9]]
| 138.166099233095
| 40\40<11/9>, 21\40<11/9>, 19\40<11/9>
| 40\40<11/9>, 21\40<11/9>, 19\40<11/9>
| 0, -0.015, 0.015
| 0, -0.015, 0.015
| 138.166099233095
| 8.68519851584955
| 138.165906595462
| 8.68521062517612
|-
|-
| [[Alpha 6/5]]
| [[21ed6/5]]
| 79.8374643554025
| rowspan="3" | 6/5
| rowspan="3" | 6/5
| rowspan="3" | 11/10, 12/11
| rowspan="3" | 11/10, 12/11
| [[21ed6/5]]
| [[Alpha 6/5]]
| 21\21<6/5>, 11\21<6/5>, 10\21<6/5>
| 21\21<6/5>, 11\21<6/5>, 10\21<6/5>
| 0, 0.332, -0.332
| 0, 0.332, -0.332
| 79.8374643554025
| 15.0305374762168
| 79.8401257721902
| 15.0300364433792
|-
|-
| [[Beta 6/5]]
| [[23ed6/5]]
| [[23ed6/5]]
| [[Beta 6/5]]
| 87.4410323892504
| 23\23<6/5>, 12\23<6/5>, 11\23<6/5>
| 23\23<6/5>, 12\23<6/5>, 11\23<6/5>
| 0, -0.322, 0.322
| 0, -0.322, 0.322
| 87.4410323892504
| 13.7235342174153
| 87.4384499734953
| 13.7239395296205
|-
|-
| [[Gamma 6/5]]
| [[44ed6/5]]
| [[44ed6/5]]
| [[Gamma 6/5]]
| 167.278496744653
| 44\44<6/5>, 23\44<6/5>, 21\44<6/5>
| 44\44<6/5>, 23\44<6/5>, 21\44<6/5>
| 0, -0.010, 0.010
| 0, -0.010, 0.010
| 167.278496744653
| 7.17366561364892
| 167.278337553932
| 7.17367244048030
|-
|-
| [[Alpha 13/11]]
| [[23ed13/11]]
| 95.4324773621886
| rowspan="3" | 13/11
| rowspan="3" | 13/11
| rowspan="3" | 12/11, 13/12
| rowspan="3" | 12/11, 13/12
| [[23ed13/11]]
| [[Alpha 13/11]]
| 23\23<13/11>, 12\23<13/11>, 11\23<13/11>
| 23\23<13/11>, 12\23<13/11>, 11\23<13/11>
| 0, 0.255, -0.255
| 0, 0.255, -0.255
| 95.4324773621886
| 12.5743356262850
| 95.4349145508238
| 12.5740145066190
|-
|-
| [[Beta 13/11]]
| [[25ed13/11]]
| [[25ed13/11]]
| [[Beta 13/11]]
| 103.730953654553
| 25\25<13/11>, 13\25<13/11>, 12\25<13/11>
| 25\25<13/11>, 13\25<13/11>, 12\25<13/11>
| 0, -0.248, 0.248
| 0, -0.248, 0.248
| 103.730953654553
| 11.5683887761822
| 103.728582924337
| 11.5686531732080
|-
|-
| [[Gamma 13/11]]
| [[48ed13/11]]
| [[48ed13/11]]
| [[Gamma 13/11]]
| 199.163431016741
| 48\48<13/11>, 25\48<13/11>, 23\48<13/11>
| 48\48<13/11>, 25\48<13/11>, 23\48<13/11>
| 0, -0.007, 0.007
| 0, -0.007, 0.007
| 199.163431016741
| 6.02520248759487
| 199.163297261208
| 6.02520653404413
|-
|-
| [[Alpha 7/6]]
| [[25ed7/6]]
| 112.413902640048
| rowspan="3" | 7/6
| rowspan="3" | 7/6
| rowspan="3" | 13/12, 14/13
| rowspan="3" | 13/12, 14/13
| [[25ed7/6]]
| [[Alpha 7/6]]
| 25\25<7/6>, 13\25<7/6>, 12\25<7/6>
| 25\25<7/6>, 13\25<7/6>, 12\25<7/6>
| 0, 0.200, -0.200
| 0, 0.200, -0.200
| 112.413902640048
| 10.6748362241495
| 112.416150402631
| 10.6746227806420
|-
|-
| [[Beta 7/6]]
| [[27ed7/6]]
| [[27ed7/6]]
| [[Beta 7/6]]
| 121.407014851252
| 27\27<7/6>, 14\27<7/6>, 13\27<7/6>
| 27\27<7/6>, 14\27<7/6>, 13\27<7/6>
| 0, -0.195, 0.195
| 0, -0.195, 0.195
| 121.407014851252
| 9.88410761495324
| 121.404823766036
| 9.88428600096291
|-
|-
| [[Gamma 7/6]]
| [[52ed7/6]]
| [[52ed7/6]]
| [[Gamma 7/6]]
| 233.820917491300
| 52\52<7/6>, 27\52<7/6>, 25\52<7/6>
| 52\52<7/6>, 27\52<7/6>, 25\52<7/6>
| 0, -0.005, 0.005
| 0, -0.005, 0.005
| 233.820917491300
| 5.13213280007188
| 233.820803527977
| 5.13213530145284
|-
|-
| [[Alpha 15/13]]
| [[27ed15/13]]
| 130.781715879411
| rowspan="3" | 15/13
| rowspan="3" | 15/13
| rowspan="3" | 14/13, 15/14
| rowspan="3" | 14/13, 15/14
| [[27ed15/13]]
| [[Alpha 15/13]]
| 27\27<15/13>, 14\27<15/13>, 13\27<15/13>
| 27\27<15/13>, 14\27<15/13>, 13\27<15/13>
| 0, 0.160, -0.160
| 0, 0.160, -0.160
| 130.781715879411
| 9.17559455410784
| 130.783801507845
| 9.17544822955784
|-
|-
| [[Beta 15/13]]
| [[29ed15/13]]
| [[29ed15/13]]
| [[Beta 15/13]]
| 140.469250388997
| 29\29<15/13>, 15\29<15/13>, 14\29<15/13>
| 29\29<15/13>, 15\29<15/13>, 14\29<15/13>
| 0, -0.156, 0.156
| 0, -0.156, 0.156
| 140.469250388997
| 8.54279492968661
| 140.467213664560
| 8.54291879716245
|-
|-
| [[Gamma 15/13]]
| [[56ed15/13]]
| [[56ed15/13]]
| [[Gamma 15/13]]
| 271.250966268408
| 56\56<15/13>, 29\56<15/13>, 27\56<15/13>
| 56\56<15/13>, 29\56<15/13>, 27\56<15/13>
| 0, -0.004, 0.004
| 0, -0.004, 0.004
| 271.250966268408
| 4.42394737430199
| 271.250868008139
| 4.42394897687108
|-
|-
| [[Alpha 8/7]]
| [[29ed8/7]]
| 150.535899020849
| rowspan="3" | 8/7
| rowspan="3" | 8/7
| rowspan="3" | 15/14, 16/15
| rowspan="3" | 15/14, 16/15
| [[29ed8/7]]
| [[Alpha 8/7]]
| 29\29<8/7>, 15\29<8/7>, 14\29<8/7>
| 29\29<8/7>, 15\29<8/7>, 14\29<8/7>
| 0, 0.130, -0.130
| 0, 0.130, -0.130
| 150.535899020849
| 7.97152046658190
| 150.537844310638
| 7.97141745648869
|-
|-
| [[Beta 8/7]]
| [[31ed8/7]]
| [[31ed8/7]]
| [[Beta 8/7]]
| 160.917685160217
| 31\31<8/7>, 16\31<8/7>, 15\31<8/7>
| 31\31<8/7>, 16\31<8/7>, 15\31<8/7>
| 0, -0.127, 0.127
| 0, -0.127, 0.127
| 160.917685160217
| 7.45722882357662
| 160.915782495277
| 7.45731699769858
|-
|-
| [[Gamma 8/7]]
| [[60ed8/7]]
| [[60ed8/7]]
| [[Gamma 8/7]]
| 311.453584181066
| 60\60<8/7>, 31\60<8/7>, 29\60<8/7>
| 60\60<8/7>, 31\60<8/7>, 29\60<8/7>
| 0, -0.003, 0.003
| 0, -0.003, 0.003
| 311.453584181066
| 3.85290155884792
| 311.453498588282
| 3.85290261769161
|}
|}
{{todo|Temperaments|inline=1|comment=Compute the temperaments associated to each Alpha-Beta-Gamma scales.}}


== Coincidence? ==


As a coincidence (?), all Alpha scales are (s1 + s2)ED(a / b), all Beta scales are (s2 + s3)ED(a / b), and all Gamma scales are (s1 + s2 + s2 + s3)ED(a / b).
== The converging Alpha-Beta-Gamma sequence ==
 
As a fact, for each <math>n\ge 2</math>, equal divisions of <math>R_n=\dfrac{n+1}{n-1}</math> where low errors appear for <math>S_n=\dfrac{n+1}{n}</math> and <math>B_n=\dfrac{n}{n-1}</math> forms a converging sequence and pattern, with the happy equal divisions of <math>R_n</math> being:
* '''Alpha:''' <math>k_\alpha=2n-1</math>
* '''Beta:''' <math>k_\beta=2n+1</math>
* '''Gamma:''' <math>k_\gamma=4n=k_\alpha+k_\beta</math>
 
In this sequence, the errors are lower and lower.
 
{{todo|Why this pattern|inline=1|comment=Explain why divisions of ratios where low errors appear for successive superparticular complementary pair make this pattern appears.}}


{| class="wikitable sortable right-1 left-2 right-3 left-4 right-5 left-6 right-7 left-8 right-9 left-10 right-11 left-12 right-13 left-14 right-15 left-16 right-17 left-18 right-19 left-20"
{| class="wikitable sortable right-1 left-2 right-3 left-4 right-5 left-6 right-7 left-8 right-9 left-10 right-11 left-12 right-13 left-14 right-15 left-16 right-17 left-18 right-19 left-20"

Latest revision as of 00:21, 28 October 2025

Context

Read this first: Equal-step_tuning#Alpha-beta-gamma_family_of_equal_divisions

The Alpha-Beta-Gamma family

Tuning Intervals Mappings
Name Equal division Steps per octave Equave SSC pair Steps (Equave, SSC pair) Errors (cent)
Alpha 3/1 3ed3/1 1.89278926071437 3/1 2/1, 3/2 3\3<3/1>, 2\3<3/1>, 1\3<3/1> 0, 67.970, -67.970
Beta 3/1 5ed3/1 3.15464876785729 5\5<3/1>, 3\5<3/1>, 2\5<3/1> 0, -58.827, 58.827
Gamma 3/1 8ed3/1 5.04743802857166 8\8<3/1>, 5\8<3/1>, 3\8<3/1> 0, -11.278, 11.278
Alpha 2/1 5ed2/1 5 2/1 3/2, 4/3 5\5<2/1>, 3\5<2/1>, 2\5<2/1> 0, 18.045, -18.045
Beta 2/1 7ed2/1 7 7\7<2/1>, 4\7<2/1>, 3\7<2/1> 0, -16.241, 16.241
Gamma 2/1 12ed2/1 12 12\12<2/1>, 7\12<2/1>, 5\12<2/1> 0, -1.955, 1.955
Alpha 5/3 7ed5/3 9.49840814199707 5/3 4/3, 5/4 7\7<5/3>, 4\7<5/3>, 3\7<5/3> 0, 7.303, -7.303
Beta 5/3 9ed5/3 12.2122390397105 9\9<5/3>, 5\9<5/3>, 4\9<5/3> 0, -6.735, 6.735
Gamma 5/3 16ed5/3 21.7106471817076 16\16<5/3>, 9\16<5/3>, 7\16<5/3> 0, -0.593, 0.593
Alpha 3/2 9ed3/2 15.3856016221631 3/2 5/4, 6/5 9\9<3/2>, 5\9<3/2>, 4\9<3/2> 0, 3.661, -3.661
Beta 3/2 11ed3/2 18.8046242048660 11\11<3/2>, 6\11<3/2>, 5\11<3/2> 0, -3.429, 3.429
Gamma 3/2 20ed3/2 34.1902258270291 20\20<3/2>, 11\20<3/2>, 9\20<3/2> 0, -0.238, 0.238
Alpha 7/5 11ed7/5 22.6604698881676 7/5 6/5, 7/6 11\11<7/5>, 6\11<7/5>, 5\11<7/5> 0, 2.093, -2.093
Beta 7/5 13ed7/5 26.7805553223799 13\13<7/5>, 7\13<7/5>, 6\13<7/5> 0, -1.981, 1.981
Gamma 7/5 24ed7/5 49.4410252105475 24\24<7/5>, 13\24<7/5>, 11\24<7/5> 0, -0.114, 0.114
Alpha 4/3 13ed4/3 31.3224709154917 4/3 7/6, 8/7 13\13<4/3>, 7\13<4/3>, 6\13<4/3> 0, 1.307, -1.307
Beta 4/3 15ed4/3 36.1413125947981 15\15<4/3>, 8\15<4/3>, 7\15<4/3> 0, -1.247, 1.247
Gamma 4/3 28ed4/3 67.4637835102899 28\28<4/3>, 15\28<4/3>, 13\28<4/3> 0, -0.061, 0.061
Alpha 9/7 15ed9/7 41.3713123417559 9/7 8/7, 9/8 15\15<9/7>, 8\15<9/7>, 7\15<9/7> 0, 0.871, -0.871
Beta 9/7 17ed9/7 46.8874873206567 17\17<9/7>, 9\17<9/7>, 8\17<9/7> 0, -0.835, 0.835
Gamma 9/7 32ed9/7 88.2587996624126 32\32<9/7>, 17\32<9/7>, 15\32<9/7> 0, -0.036, 0.036
Alpha 5/4 17ed5/4 52.8068232315916 5/4 9/8, 10/9 17\17<5/4>, 9\17<5/4>, 8\17<5/4> 0, 0.609, -0.609
Beta 5/4 19ed5/4 59.0193906706024 19\19<5/4>, 10\19<5/4>, 9\19<5/4> 0, -0.587, 0.587
Gamma 5/4 36ed5/4 111.826213902194 36\36<5/4>, 19\36<5/4>, 17\36<5/4> 0, -0.022, 0.022
Alpha 11/9 19ed11/9 65.6288971357202 11/9 10/9, 11/10 19\19<11/9>, 10\19<11/9>, 9\19<11/9> 0, 0.443, -0.443
Beta 11/9 21ed11/9 72.5372020973750 21\21<11/9>, 11\21<11/9>, 10\21<11/9> 0, -0.428, 0.428
Gamma 11/9 40ed11/9 138.166099233095 40\40<11/9>, 21\40<11/9>, 19\40<11/9> 0, -0.015, 0.015
Alpha 6/5 21ed6/5 79.8374643554025 6/5 11/10, 12/11 21\21<6/5>, 11\21<6/5>, 10\21<6/5> 0, 0.332, -0.332
Beta 6/5 23ed6/5 87.4410323892504 23\23<6/5>, 12\23<6/5>, 11\23<6/5> 0, -0.322, 0.322
Gamma 6/5 44ed6/5 167.278496744653 44\44<6/5>, 23\44<6/5>, 21\44<6/5> 0, -0.010, 0.010
Alpha 13/11 23ed13/11 95.4324773621886 13/11 12/11, 13/12 23\23<13/11>, 12\23<13/11>, 11\23<13/11> 0, 0.255, -0.255
Beta 13/11 25ed13/11 103.730953654553 25\25<13/11>, 13\25<13/11>, 12\25<13/11> 0, -0.248, 0.248
Gamma 13/11 48ed13/11 199.163431016741 48\48<13/11>, 25\48<13/11>, 23\48<13/11> 0, -0.007, 0.007
Alpha 7/6 25ed7/6 112.413902640048 7/6 13/12, 14/13 25\25<7/6>, 13\25<7/6>, 12\25<7/6> 0, 0.200, -0.200
Beta 7/6 27ed7/6 121.407014851252 27\27<7/6>, 14\27<7/6>, 13\27<7/6> 0, -0.195, 0.195
Gamma 7/6 52ed7/6 233.820917491300 52\52<7/6>, 27\52<7/6>, 25\52<7/6> 0, -0.005, 0.005
Alpha 15/13 27ed15/13 130.781715879411 15/13 14/13, 15/14 27\27<15/13>, 14\27<15/13>, 13\27<15/13> 0, 0.160, -0.160
Beta 15/13 29ed15/13 140.469250388997 29\29<15/13>, 15\29<15/13>, 14\29<15/13> 0, -0.156, 0.156
Gamma 15/13 56ed15/13 271.250966268408 56\56<15/13>, 29\56<15/13>, 27\56<15/13> 0, -0.004, 0.004
Alpha 8/7 29ed8/7 150.535899020849 8/7 15/14, 16/15 29\29<8/7>, 15\29<8/7>, 14\29<8/7> 0, 0.130, -0.130
Beta 8/7 31ed8/7 160.917685160217 31\31<8/7>, 16\31<8/7>, 15\31<8/7> 0, -0.127, 0.127
Gamma 8/7 60ed8/7 311.453584181066 60\60<8/7>, 31\60<8/7>, 29\60<8/7> 0, -0.003, 0.003


The converging Alpha-Beta-Gamma sequence

As a fact, for each [math]\displaystyle{ n\ge 2 }[/math], equal divisions of [math]\displaystyle{ R_n=\dfrac{n+1}{n-1} }[/math] where low errors appear for [math]\displaystyle{ S_n=\dfrac{n+1}{n} }[/math] and [math]\displaystyle{ B_n=\dfrac{n}{n-1} }[/math] forms a converging sequence and pattern, with the happy equal divisions of [math]\displaystyle{ R_n }[/math] being:

  • Alpha: [math]\displaystyle{ k_\alpha=2n-1 }[/math]
  • Beta: [math]\displaystyle{ k_\beta=2n+1 }[/math]
  • Gamma: [math]\displaystyle{ k_\gamma=4n=k_\alpha+k_\beta }[/math]

In this sequence, the errors are lower and lower.

Todo: Why this pattern

Explain why divisions of ratios where low errors appear for successive superparticular complementary pair make this pattern appears.

Error (abs, ¢) on successive superparticular complementary pair in equal divisions
#ed3/1 2/1, 3/2 error #ed2/1 3/2, 4/3 error #ed5/3 4/3, 5/4 error #ed3/2 5/4, 6/5 error #ed7/5 6/5, 7/6 error #ed4/3 7/6, 8/7 error #ed9/7 8/7, 9/8 error #ed5/4 9/8, 10/9 error #ed11/9 10/9, 11/10 error #ed6/5 11/10, 12/11 error
1ed3/1 701.96 1ed2/1 498.04 1ed5/3 386.31 1ed3/2 315.64 1ed7/5 266.87 1ed4/3 231.17 1ed9/7 203.91 1ed5/4 182.40 1ed11/9 165.00 1ed6/5 150.64
2ed3/1 249.02 2ed2/1 101.96 2ed5/3 55.87 2ed3/2 35.34 2ed7/5 24.39 2ed4/3 17.85 2ed9/7 13.63 2ed5/4 10.75 2ed11/9 8.70 2ed6/5 7.18
3ed3/1 67.97 3ed2/1 98.04 3ed5/3 91.53 3ed3/2 81.66 3ed7/5 72.70 3ed4/3 65.16 3ed9/7 58.88 3ed5/4 53.63 3ed11/9 49.20 3ed6/5 45.42
4ed3/1 226.47 4ed2/1 101.96 4ed5/3 55.87 4ed3/2 35.34 4ed7/5 24.39 4ed4/3 17.85 4ed9/7 13.63 4ed5/4 10.75 4ed11/9 8.70 4ed6/5 7.18
5ed3/1 58.83 5ed2/1 18.04 5ed5/3 32.57 5ed3/2 34.86 5ed7/5 33.87 5ed4/3 31.96 5ed9/7 29.88 5ed5/4 27.88 5ed11/9 26.04 5ed6/5 24.38
6ed3/1 67.97 6ed2/1 98.04 6ed5/3 55.87 6ed3/2 35.34 6ed7/5 24.39 6ed4/3 17.85 6ed9/7 13.63 6ed5/4 10.75 6ed11/9 8.70 6ed6/5 7.18
7ed3/1 113.17 7ed2/1 16.24 7ed5/3 7.30 7ed3/2 14.80 7ed7/5 17.22 7ed4/3 17.73 7ed9/7 17.45 7ed5/4 16.84 7ed11/9 16.12 7ed6/5 15.36
8ed3/1 11.28 8ed2/1 48.04 8ed5/3 54.68 8ed3/2 35.34 8ed7/5 24.39 8ed4/3 17.85 8ed9/7 13.63 8ed5/4 10.75 8ed11/9 8.70 8ed6/5 7.18
9ed3/1 67.97 9ed2/1 35.29 9ed5/3 6.73 9ed3/2 3.66 9ed7/5 7.98 9ed4/3 9.82 9ed9/7 10.54 9ed5/4 10.71 9ed11/9 10.60 9ed6/5 10.35
10ed3/1 58.83 10ed2/1 18.04 10ed5/3 32.57 10ed3/2 34.86 10ed7/5 24.39 10ed4/3 17.85 10ed9/7 13.63 10ed5/4 10.75 10ed11/9 8.70 10ed6/5 7.18
11ed3/1 10.34 11ed2/1 47.41 11ed5/3 15.67 11ed3/2 3.43 11ed7/5 2.09 11ed4/3 4.79 11ed9/7 6.14 11ed5/4 6.81 11ed11/9 7.09 11ed6/5 7.16
12ed3/1 67.97 12ed2/1 1.96 12ed5/3 17.83 12ed3/2 23.16 12ed7/5 24.16 12ed4/3 17.85 12ed9/7 13.63 12ed5/4 10.75 12ed11/9 8.70 12ed6/5 7.18
13ed3/1 29.57 13ed2/1 36.51 13ed5/3 21.85 13ed3/2 8.34 13ed7/5 1.98 13ed4/3 1.31 13ed9/7 3.10 13ed5/4 4.11 13ed11/9 4.66 13ed6/5 4.96
14ed3/1 22.69 14ed2/1 16.24 14ed5/3 7.30 14ed3/2 14.80 14ed7/5 17.22 14ed4/3 17.73 14ed9/7 13.63 14ed5/4 10.75 14ed11/9 8.70 14ed6/5 7.18
15ed3/1 58.83 15ed2/1 18.04 15ed5/3 26.39 15ed3/2 11.94 15ed7/5 4.97 15ed4/3 1.25 15ed9/7 0.87 15ed5/4 2.12 15ed11/9 2.88 15ed6/5 3.34
16ed3/1 11.28 16ed2/1 26.96 16ed5/3 0.59 16ed3/2 8.54 16ed7/5 12.02 16ed4/3 13.28 16ed9/7 13.56 16ed5/4 10.75 16ed11/9 8.70 16ed6/5 7.18
17ed3/1 30.68 17ed2/1 3.93 17ed5/3 22.17 17ed3/2 14.69 17ed7/5 7.25 17ed4/3 3.20 17ed9/7 0.84 17ed5/4 0.61 17ed11/9 1.52 17ed6/5 2.10
18ed3/1 37.69 18ed2/1 31.38 18ed5/3 6.73 18ed3/2 3.66 18ed7/5 7.98 18ed4/3 9.82 18ed9/7 10.54 18ed5/4 10.71 18ed11/9 8.70 18ed6/5 7.18
19ed3/1 1.23 19ed2/1 7.22 19ed5/3 13.95 19ed3/2 16.86 19ed7/5 9.06 19ed4/3 4.74 19ed9/7 2.18 19ed5/4 0.59 19ed11/9 0.44 19ed6/5 1.12
20ed3/1 36.27 20ed2/1 18.04 20ed5/3 11.65 20ed3/2 0.24 20ed7/5 4.74 20ed4/3 7.05 20ed9/7 8.12 20ed5/4 8.56 20ed11/9 8.67 20ed6/5 7.18
21ed3/1 22.60 21ed2/1 16.24 21ed5/3 7.30 21ed3/2 14.80 21ed7/5 10.52 21ed4/3 5.99 21ed9/7 3.27 21ed5/4 1.56 21ed11/9 0.43 21ed6/5 0.33
22ed3/1 10.34 22ed2/1 7.14 22ed5/3 15.67 22ed3/2 3.43 22ed7/5 2.09 22ed4/3 4.79 22ed9/7 6.14 22ed5/4 6.81 22ed11/9 7.09 22ed6/5 7.16
23ed3/1 40.41 23ed2/1 23.69 23ed5/3 1.81 23ed3/2 10.44 23ed7/5 11.72 23ed4/3 7.02 23ed9/7 4.17 23ed5/4 2.36 23ed11/9 1.15 23ed6/5 0.32
24ed3/1 11.28 24ed2/1 1.96 24ed5/3 17.83 24ed3/2 6.09 24ed7/5 0.11 24ed4/3 2.90 24ed9/7 4.50 24ed5/4 5.34 24ed11/9 5.78 24ed6/5 5.97
25ed3/1 17.25 25ed2/1 18.04 25ed5/3 2.80 25ed3/2 6.78 25ed7/5 10.57 25ed4/3 7.89 25ed9/7 4.93 25ed5/4 3.03 25ed11/9 1.75 25ed6/5 0.87
26ed3/1 29.57 26ed2/1 9.65 26ed5/3 12.16 26ed3/2 8.34 26ed7/5 1.98 26ed4/3 1.31 26ed9/7 3.10 26ed5/4 4.11 26ed11/9 4.66 26ed6/5 4.96
27ed3/1 2.47 27ed2/1 9.16 27ed5/3 6.73 27ed3/2 3.66 27ed7/5 7.98 27ed4/3 8.63 27ed9/7 5.57 27ed5/4 3.60 27ed11/9 2.27 27ed6/5 1.34
28ed3/1 22.69 28ed2/1 16.24 28ed5/3 7.30 28ed3/2 10.27 28ed7/5 3.58 28ed4/3 0.06 28ed9/7 1.91 28ed5/4 3.04 28ed11/9 3.71 28ed6/5 4.09
29ed3/1 19.48 29ed2/1 1.49 29ed5/3 10.12 29ed3/2 0.97 29ed7/5 5.74 29ed4/3 7.91 29ed9/7 6.13 29ed5/4 4.09 29ed11/9 2.71 29ed6/5 1.74
30ed3/1 4.57 30ed2/1 18.04 30ed5/3 3.09 30ed3/2 11.46 30ed7/5 4.97 30ed4/3 1.25 30ed9/7 0.87 30ed5/4 2.12 30ed11/9 2.88 30ed6/5 3.34
31ed3/1 27.07 31ed2/1 5.18 31ed5/3 13.07 31ed3/2 1.37 31ed7/5 3.80 31ed4/3 6.25 31ed9/7 6.61 31ed5/4 4.52 31ed11/9 3.10 31ed6/5 2.09
32ed3/1 11.28 32ed2/1 10.54 32ed5/3 0.59 32ed3/2 8.54 32ed7/5 6.18 32ed4/3 2.28 32ed9/7 0.04 32ed5/4 1.32 32ed11/9 2.16 32ed6/5 2.68
33ed3/1 10.34 33ed2/1 11.05 33ed5/3 11.13 33ed3/2 3.43 33ed7/5 2.09 33ed4/3 4.79 33ed9/7 6.14 33ed5/4 4.90 33ed11/9 3.44 33ed6/5 2.40
34ed3/1 25.26 34ed2/1 3.93 34ed5/3 3.84 34ed3/2 5.96 34ed7/5 7.25 34ed4/3 3.20 34ed9/7 0.84 34ed5/4 0.61 34ed11/9 1.52 34ed6/5 2.10
35ed3/1 4.49 35ed2/1 16.24 35ed5/3 7.30 35ed3/2 5.25 35ed7/5 0.58 35ed4/3 3.50 35ed9/7 5.01 35ed5/4 5.23 35ed11/9 3.74 35ed6/5 2.67
36ed3/1 15.14 36ed2/1 1.96 36ed5/3 6.73 36ed3/2 3.66 36ed7/5 7.98 36ed4/3 4.01 36ed9/7 1.55 36ed5/4 0.02 36ed11/9 0.95 36ed6/5 1.58
37ed3/1 17.70 37ed2/1 11.56 37ed5/3 3.89 37ed3/2 6.88 37ed7/5 0.77 37ed4/3 2.34 37ed9/7 4.01 37ed5/4 4.91 37ed11/9 4.01 37ed6/5 2.92
38ed3/1 1.23 38ed2/1 7.22 38ed5/3 9.32 38ed3/2 1.61 38ed7/5 6.27 38ed4/3 4.74 38ed9/7 2.18 38ed5/4 0.59 38ed11/9 0.44 38ed6/5 1.12
39ed3/1 19.20 39ed2/1 5.74 39ed5/3 0.82 39ed3/2 8.34 39ed7/5 1.98 39ed4/3 1.31 39ed9/7 3.10 39ed5/4 4.11 39ed11/9 4.25 39ed6/5 3.14
40ed3/1 11.28 40ed2/1 11.96 40ed5/3 10.46 40ed3/2 0.24 40ed7/5 4.74 40ed4/3 5.40 40ed9/7 2.75 40ed5/4 1.10 40ed11/9 0.01 40ed6/5 0.71
41ed3/1 6.12 41ed2/1 0.48 41ed5/3 1.94 41ed3/2 7.47 41ed7/5 3.07 41ed4/3 0.37 41ed9/7 2.29 41ed5/4 3.38 41ed11/9 4.01 41ed6/5 3.33
42ed3/1 22.60 42ed2/1 12.33 42ed5/3 7.30 42ed3/2 1.91 42ed7/5 3.35 42ed4/3 5.87 42ed9/7 3.27 42ed5/4 1.56 42ed11/9 0.43 42ed6/5 0.33
43ed3/1 5.75 43ed2/1 4.28 43ed5/3 4.45 43ed3/2 5.48 43ed7/5 4.06 43ed4/3 0.47 43ed9/7 1.55 43ed5/4 2.72 43ed11/9 3.42 43ed6/5 3.51
44ed3/1 10.34 44ed2/1 7.14 44ed5/3 4.43 44ed3/2 3.43 44ed7/5 2.09 44ed4/3 4.79 44ed9/7 3.74 44ed5/4 1.97 44ed11/9 0.80 44ed6/5 0.01
45ed3/1 16.56 45ed2/1 8.62 45ed5/3 6.73 45ed3/2 3.66 45ed7/5 4.97 45ed4/3 1.25 45ed9/7 0.87 45ed5/4 2.12 45ed11/9 2.88 45ed6/5 3.34
46ed3/1 0.94 46ed2/1 2.39 46ed5/3 1.81 46ed3/2 4.82 46ed7/5 0.94 46ed4/3 3.81 46ed9/7 4.17 46ed5/4 2.36 46ed11/9 1.15 46ed6/5 0.32
47ed3/1 14.01 47ed2/1 12.59 47ed5/3 8.83 47ed3/2 2.00 47ed7/5 5.79 47ed4/3 1.95 47ed9/7 0.25 47ed5/4 1.58 47ed11/9 2.39 47ed6/5 2.89
48ed3/1 11.28 48ed2/1 1.96 48ed5/3 0.59 48ed3/2 6.09 48ed7/5 0.11 48ed4/3 2.90 48ed9/7 4.50 48ed5/4 2.70 48ed11/9 1.46 48ed6/5 0.61
49ed3/1 3.28 49ed2/1 8.25 49ed5/3 7.30 49ed3/2 0.48 49ed7/5 5.33 49ed4/3 2.60 49ed9/7 0.31 49ed5/4 1.07 49ed11/9 1.94 49ed6/5 2.48
50ed3/1 17.25 50ed2/1 5.96 50ed5/3 2.80 50ed3/2 6.78 50ed7/5 1.08 50ed4/3 2.07 50ed9/7 3.77 50ed5/4 3.03 50ed11/9 1.75 50ed6/5 0.87
51ed3/1 6.62 51ed2/1 3.93 51ed5/3 4.83 51ed3/2 0.93 51ed7/5 4.17 51ed4/3 3.20 51ed9/7 0.84 51ed5/4 0.61 51ed11/9 1.52 51ed6/5 2.10
52ed3/1 7.01 52ed2/1 9.65 52ed5/3 4.84 52ed3/2 5.16 52ed7/5 1.98 52ed4/3 1.31 52ed9/7 3.10 52ed5/4 3.32 52ed11/9 2.02 52ed6/5 1.11
53ed3/1 15.76 53ed2/1 0.07 53ed5/3 2.54 53ed3/2 2.23 53ed7/5 3.09 53ed4/3 3.75 53ed9/7 1.32 53ed5/4 0.18 53ed11/9 1.13 53ed6/5 1.75
54ed3/1 2.47 54ed2/1 9.16 54ed5/3 6.73 54ed3/2 3.66 54ed7/5 2.81 54ed4/3 0.60 54ed9/7 2.48 54ed5/4 3.55 54ed11/9 2.27 54ed6/5 1.34
55ed3/1 10.34 55ed2/1 3.77 55ed5/3 0.41 55ed3/2 3.43 55ed7/5 2.09 55ed4/3 4.27 55ed9/7 1.77 55ed5/4 0.22 55ed11/9 0.78 55ed6/5 1.42
56ed3/1 11.28 56ed2/1 5.19 56ed5/3 7.30 56ed3/2 2.27 56ed7/5 3.58 56ed4/3 0.06 56ed9/7 1.91 56ed5/4 3.04 56ed11/9 2.50 56ed6/5 1.55
57ed3/1 1.23 57ed2/1 7.22 57ed5/3 1.56 57ed3/2 4.55 57ed7/5 1.16 57ed4/3 4.00 57ed9/7 2.18 57ed5/4 0.59 57ed11/9 0.44 57ed6/5 1.12
58ed3/1 13.32 58ed2/1 1.49 58ed5/3 5.12 58ed3/2 0.97 58ed7/5 4.30 58ed4/3 0.67 58ed9/7 1.37 58ed5/4 2.57 58ed11/9 2.71 58ed6/5 1.74
59ed3/1 7.25 59ed2/1 9.91 59ed5/3 3.40 59ed3/2 5.59 59ed7/5 0.30 59ed4/3 3.26 59ed9/7 2.57 59ed5/4 0.93 59ed11/9 0.13 59ed6/5 0.84
60ed3/1 4.57 60ed2/1 1.96 60ed5/3 3.09 60ed3/2 0.24 60ed7/5 4.74 60ed4/3 1.25 60ed9/7 0.87 60ed5/4 2.12 60ed11/9 2.88 60ed6/5 1.92
61ed3/1 15.18 61ed2/1 6.24 61ed5/3 5.12 61ed3/2 4.94 61ed7/5 0.51 61ed4/3 2.56 61ed9/7 2.93 61ed5/4 1.25 61ed11/9 0.16 61ed6/5 0.58
62ed3/1 3.61 62ed2/1 5.18 62ed5/3 1.19 62ed3/2 1.37 62ed7/5 3.80 62ed4/3 1.78 62ed9/7 0.40 62ed5/4 1.71 62ed11/9 2.51 62ed6/5 2.09
63ed3/1 7.59 63ed2/1 2.81 63ed5/3 6.73 63ed3/2 3.66 63ed7/5 1.27 63ed4/3 1.92 63ed9/7 3.27 63ed5/4 1.56 63ed11/9 0.43 63ed6/5 0.33
64ed3/1 11.28 64ed2/1 8.21 64ed5/3 0.59 64ed3/2 2.43 64ed7/5 2.92 64ed4/3 2.28 64ed9/7 0.04 64ed5/4 1.32 64ed11/9 2.16 64ed6/5 2.25
65ed3/1 0.31 65ed2/1 0.42 65ed5/3 5.36 65ed3/2 2.46 65ed7/5 1.98 65ed4/3 1.31 65ed9/7 3.10 65ed5/4 1.84 65ed11/9 0.68 65ed6/5 0.10
66ed3/1 10.34 66ed2/1 7.14 66ed5/3 2.27 66ed3/2 3.43 66ed7/5 2.09 66ed4/3 2.76 66ed9/7 0.45 66ed5/4 0.95 66ed11/9 1.83 66ed6/5 2.38
67ed3/1 7.73 67ed2/1 3.45 67ed5/3 3.53 67ed3/2 1.33 67ed7/5 2.65 67ed4/3 0.74 67ed9/7 2.60 67ed5/4 2.10 67ed11/9 0.92 67ed6/5 0.12
68ed3/1 2.71 68ed2/1 3.93 68ed5/3 3.84 68ed3/2 4.37 68ed7/5 1.31 68ed4/3 3.20 68ed9/7 0.84 68ed5/4 0.61 68ed11/9 1.52 68ed6/5 2.10
69ed3/1 12.84 69ed2/1 6.30 69ed5/3 1.81 69ed3/2 0.27 69ed7/5 3.28 69ed4/3 0.20 69ed9/7 2.13 69ed5/4 2.36 69ed11/9 1.15 69ed6/5 0.32
70ed3/1 4.49 70ed2/1 0.90 70ed5/3 5.33 70ed3/2 4.78 70ed7/5 0.58 70ed4/3 3.50 70ed9/7 1.20 70ed5/4 0.28 70ed11/9 1.23 70ed6/5 1.83
71ed3/1 5.46 71ed2/1 7.90 71ed5/3 0.19 71ed3/2 0.73 71ed7/5 3.87 71ed4/3 0.31 71ed9/7 1.69 71ed5/4 2.59 71ed11/9 1.36 71ed6/5 0.52
72ed3/1 11.28 72ed2/1 1.96 72ed5/3 5.55 72ed3/2 3.66 72ed7/5 0.11 72ed4/3 2.90 72ed9/7 1.55 72ed5/4 0.02 72ed11/9 0.95 72ed6/5 1.58
73ed3/1 1.51 73ed2/1 4.89 73ed5/3 1.35 73ed3/2 1.68 73ed7/5 3.54 73ed4/3 0.79 73ed9/7 1.27 73ed5/4 2.48 73ed11/9 1.56 73ed6/5 0.70
74ed3/1 8.00 74ed2/1 4.66 74ed5/3 3.89 74ed3/2 2.61 74ed7/5 0.77 74ed4/3 2.34 74ed9/7 1.87 74ed5/4 0.31 74ed11/9 0.69 74ed6/5 1.35
75ed3/1 8.11 75ed2/1 2.04 75ed5/3 2.80 75ed3/2 2.58 75ed7/5 2.80 75ed4/3 1.25 75ed9/7 0.87 75ed5/4 2.12 75ed11/9 1.75 75ed6/5 0.87
76ed3/1 1.23 76ed2/1 7.22 76ed5/3 2.32 76ed3/2 1.61 76ed7/5 1.39 76ed4/3 1.81 76ed9/7 2.18 76ed5/4 0.59 76ed11/9 0.44 76ed6/5 1.12
77ed3/1 10.34 77ed2/1 0.66 77ed5/3 4.18 77ed3/2 3.43 77ed7/5 2.09 77ed4/3 1.68 77ed9/7 0.49 77ed5/4 1.79 77ed11/9 1.93 77ed6/5 1.03
78ed3/1 5.18 78ed2/1 5.74 78ed5/3 0.82 78ed3/2 0.66 78ed7/5 1.98 78ed4/3 1.31 78ed9/7 2.48 78ed5/4 0.85 78ed11/9 0.21 78ed6/5 0.91
79ed3/1 3.77 79ed2/1 3.22 79ed5/3 5.49 79ed3/2 4.24 79ed7/5 1.42 79ed4/3 2.09 79ed9/7 0.14 79ed5/4 1.47 79ed11/9 2.10 79ed6/5 1.19
80ed3/1 11.28 80ed2/1 3.04 80ed5/3 0.59 80ed3/2 0.24 80ed7/5 2.54 80ed4/3 0.83 80ed9/7 2.68 80ed5/4 1.10 80ed11/9 0.01 80ed6/5 0.71
81ed3/1 2.47 81ed2/1 5.66 81ed5/3 4.18 81ed3/2 3.66 81ed7/5 0.79 81ed4/3 2.48 81ed9/7 0.20 81ed5/4 1.17 81ed11/9 2.02 81ed6/5 1.34
82ed3/1 6.12 82ed2/1 0.48 82ed5/3 1.94 82ed3/2 1.09 82ed7/5 3.07 82ed4/3 0.37 82ed9/7 2.29 82ed5/4 1.33 82ed11/9 0.23 82ed6/5 0.51
83ed3/1 8.41 83ed2/1 6.48 83ed5/3 2.74 83ed3/2 2.72 83ed7/5 0.18 83ed4/3 2.85 83ed9/7 0.53 83ed5/4 0.88 83ed11/9 1.76 83ed6/5 1.48
84ed3/1 0.04 84ed2/1 1.96 84ed5/3 3.23 84ed3/2 1.91 84ed7/5 3.35 84ed4/3 0.06 84ed9/7 1.91 84ed5/4 1.56 84ed11/9 0.43 84ed6/5 0.33
85ed3/1 8.30 85ed2/1 3.93 85ed5/3 1.36 85ed3/2 1.83 85ed7/5 0.40 85ed4/3 2.66 85ed9/7 0.84 85ed5/4 0.61 85ed11/9 1.52 85ed6/5 1.61
86ed3/1 5.75 86ed2/1 4.28 86ed5/3 4.45 86ed3/2 2.69 86ed7/5 2.71 86ed4/3 0.47 86ed9/7 1.55 86ed5/4 1.77 86ed11/9 0.62 86ed6/5 0.16
87ed3/1 2.39 87ed2/1 1.49 87ed5/3 0.04 87ed3/2 0.97 87ed7/5 0.95 87ed4/3 2.19 87ed9/7 1.13 87ed5/4 0.35 87ed11/9 1.28 87ed6/5 1.74
88ed3/1 10.34 88ed2/1 6.50 88ed5/3 4.43 88ed3/2 3.43 88ed7/5 2.09 88ed4/3 0.87 88ed9/7 1.20 88ed5/4 1.97 88ed11/9 0.80 88ed6/5 0.01
89ed3/1 3.26 89ed2/1 0.83 89ed5/3 1.21 89ed3/2 0.16 89ed7/5 1.48 89ed4/3 1.74 89ed9/7 1.41 89ed5/4 0.10 89ed11/9 1.06 89ed6/5 1.68
90ed3/1 4.57 90ed2/1 4.71 90ed5/3 3.09 90ed3/2 3.66 90ed7/5 1.50 90ed4/3 1.25 90ed9/7 0.87 90ed5/4 2.12 90ed11/9 0.98 90ed6/5 0.17
91ed3/1 8.67 91ed2/1 3.05 91ed5/3 2.42 91ed3/2 0.62 91ed7/5 1.98 91ed4/3 1.31 91ed9/7 1.68 91ed5/4 0.14 91ed11/9 0.84 91ed6/5 1.49
92ed3/1 0.94 92ed2/1 2.39 92ed5/3 1.81 92ed3/2 2.81 92ed7/5 0.94 92ed4/3 1.61 92ed9/7 0.56 92ed5/4 1.84 92ed11/9 1.15 92ed6/5 0.32
93ed3/1 6.62 93ed2/1 5.18 93ed5/3 3.56 93ed3/2 1.37 93ed7/5 2.46 93ed4/3 0.90 93ed9/7 1.94 93ed5/4 0.37 93ed11/9 0.64 93ed6/5 1.30
94ed3/1 6.22 94ed2/1 0.17 94ed5/3 0.58 94ed3/2 2.00 94ed7/5 0.40 94ed4/3 1.95 94ed9/7 0.25 94ed5/4 1.58 94ed11/9 1.31 94ed6/5 0.47
95ed3/1 1.23 95ed2/1 5.41 95ed5/3 4.64 95ed3/2 2.09 95ed7/5 2.92 95ed4/3 0.50 95ed9/7 2.18 95ed5/4 0.59 95ed11/9 0.44 95ed6/5 1.12
96ed3/1 8.53 96ed2/1 1.96 96ed5/3 0.59 96ed3/2 1.22 96ed7/5 0.11 96ed4/3 2.28 96ed9/7 0.04 96ed5/4 1.32 96ed11/9 1.46 96ed6/5 0.61
97ed3/1 3.93 97ed2/1 3.20 97ed5/3 3.40 97ed3/2 2.77 97ed7/5 2.64 97ed4/3 0.12 97ed9/7 2.07 97ed5/4 0.80 97ed11/9 0.25 97ed6/5 0.95
98ed3/1 3.28 98ed2/1 4.00 98ed5/3 1.72 98ed3/2 0.48 98ed7/5 0.61 98ed4/3 2.48 98ed9/7 0.31 98ed5/4 1.07 98ed11/9 1.61 98ed6/5 0.74
99ed3/1 8.88 99ed2/1 1.08 99ed5/3 2.20 99ed3/2 3.43 99ed7/5 2.09 99ed4/3 0.24 99ed9/7 1.75 99ed5/4 1.00 99ed11/9 0.07 99ed6/5 0.79
100ed3/1 1.77 100ed2/1 5.96 100ed5/3 2.80 100ed3/2 0.24 100ed7/5 1.08 100ed4/3 2.07 100ed9/7 0.58 100ed5/4 0.84 100ed11/9 1.72 100ed6/5 0.87
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