@@ Line 1: / Line 1: @@
-''130edo'' divides the octave into 130 parts of size 9.231 cents each. It is the tenth [[The_Riemann_Zeta_Function_and_Tuning#Zeta EDO lists|zeta integral edo]] but not a gap edo. It can be used to tune a variety of temperaments, including hemiwürschmidt, sesquiquartififths, harry and hemischismic. It also can be used to tune the rank-three temperament [[Breed_family#Jove, aka Wonder|jove]], tempering out 243/242 and 441/440, plus 364/363 for the 13-limit and 595/594 for the 17-limit. It gives the [[Optimal_patent_val|optimal patent val]] for 11-limit [[Würschmidt_family#Hemiwürschmidt|hemiwürschmidt]] and [[Schismatic_family#Sesquiquartififths|sesquart]] and 13-limit [[Breedsmic_temperaments#Harry|harry]] temperaments.
+{{Infobox ET}}
+{{ED intro}}
--limit commas: 2401/2400, 3136/3125, 19683/19600
+== Theory ==
+edo is a [[zeta peak edo]], a [[zeta peak integer edo]], and a [[zeta integral edo]] but not a gap edo. It is [[distinctly consistent]] to the [[15-odd-limit]] and is the first [[trivial temperament|nontrivial edo]] to be consistent in the 14-[[odd prime sum limit|odd-prime-sum-limit]]. As an equal temperament, it [[tempering out|tempers out]] [[2401/2400]], [[3136/3125]], [[6144/6125]], and [[19683/19600]] in the 7-limit; [[243/242]], [[441/440]], [[540/539]], and [[4000/3993]] in the 11-limit; and [[351/350]], [[364/363]], [[676/675]], [[729/728]], [[1001/1000]], [[1575/1573]], [[1716/1715]], [[2080/2079]], [[4096/4095]], and [[4225/4224]] in the 13-limit. It can be used to tune a variety of temperaments, including [[hemiwürschmidt]], [[sesquiquartififths]], [[harry]] and [[hemischis]]. It also can be used to tune the [[rank-3 temperament]] [[jove]], tempering out 243/242 and 441/440, plus 364/363 for the 13-limit and [[595/594]] for the 17-limit. It gives the [[optimal patent val]] for 11-limit [[hemiwürschmidt]] and [[Schismatic family #Sesquiquartififths|sesquart]] and 13-limit [[harry]].
--limit commas: 441/440, 540/539, 3136/3125, 4000/3993
+=== Prime harmonics ===
+{{Harmonics in equal|130|columns=9}}
+{{Harmonics in equal|130|columns=9|start=10|collapsed=true|title=Approximation of prime harmonics in 130edo (continued)}}
--limit commas: 3136/3125, 243/242, 441/440, 351/350, 364/363
+=== Subsets and supersets ===
+Since 130 factors into 2 × 5 × 13, 130edo has subset edos {{EDOs| 2, 5, 10, 13, 26, and 65 }}.
--limit commas: 221/220, 364/363, 442/441, 595/594, 1275/1274, 4913/4875
+[[260edo]], which divides the edostep in two, provides a strong correction for the 29th harmonic.
-==Intervals==
+== Intervals ==
+{| class="wikitable center-all right-2 left-3"
-{| class="wikitable"
 |-
-| | degree of 130edo
+! Degree
-| | cents value
+! Cents
-| | associated temperament
+! Approximate ratios
 |-
-| | 0
+| 0
-| | 0.00
+| 0.00
-| |
+| 1/1
 |-
-| | 1
+| 1
-| | 9.23
+| 9.23
-| |
+| ''126/125'', 144/143, 169/168, 176/175, 196/195, 225/224
 |-
-| | 2
+| 2
-| | 18.46
+| 18.46
-| |
+| 78/77, 81/80, 91/90, 99/98, 100/99, 105/104, 121/120
 |-
-| | 3
+| 3
-| | 27.69
+| 27.69
-| |
+| 56/55, 64/63, 65/64, 66/65
 |-
-| | 4
+| 4
-| | 36.92
+| 36.92
-| |
+| 45/44, 49/48, 50/49, ''55/54''
 |-
-| | 5
+| 5
-| | 46.15
+| 46.15
-| |
+| 36/35, 40/39
 |-
-| | 6
+| 6
-| | 55.38
+| 55.38
-| |
+| 33/32
 |-
-| | 7
+| 7
-| | 64.62
+| 64.62
-| |
+| 27/26, 28/27
 |-
-| | 8
+| 8
-| | 73.85
+| 73.85
-| |
+| 25/24, 26/25
 |-
-| | 9
+| 9
-| | 83.08
+| 83.08
-| | [[Breedsmic_temperaments#Harry|harry]]
+| 21/20, 22/21
 |-
-| | 10
+| 10
-| | 92.31
+| 92.31
-| |
+| 135/128
 |-
-| | 11
+| 11
-| | 101.54
+| 101.54
-| |
+| 35/33
 |-
-| | 12
+| 12
-| | 110.77
+| 110.77
-| |
+| 16/15
 |-
-| | 13
+| 13
-| | 120
+| 120.00
-| |
+| 15/14
 |-
-| | 14
+| 14
-| | 129.23
+| 129.23
-| |
+| 14/13
 |-
-| | 15
+| 15
-| | 138.46
+| 138.46
-| |
+| 13/12
 |-
-| | 16
+| 16
-| | 147.69
+| 147.69
-| |
+| 12/11
 |-
-| | 17
+| 17
-| | 156.92
+| 156.92
-| |
+| 35/32
 |-
-| | 18
+| 18
-| | 166.15
+| 166.15
-| |
+| 11/10
 |-
-| | 19
+| 19
-| | 175.38
+| 175.38
-| | [[Schismatic_family#Sesquiquartififths|sesquart]]
+| 72/65
 |-
-| | 20
+| 20
-| | 184.62
+| 184.62
-| |
+| 10/9
 |-
-| | 21
+| 21
-| | 193.85
+| 193.85
-| | [[Würschmidt_family#Hemiw�rschmidt|hemiwürschmidt]]
+| 28/25
 |-
-| | 22
+| 22
-| | 203.08
+| 203.08
-| |
+| 9/8
 |-
-| | 23
+| 23
-| | 212.31
+| 212.31
-| |
+| 44/39
 |-
-| | 24
+| 24
-| | 221.54
+| 221.54
-| |
+| 25/22
 |-
-| | 25
+| 25
-| | 230.77
+| 230.77
-| |
+| 8/7
 |-
-| | 26
+| 26
-| | 240
+| 240.00
-| |
+| 55/48
 |-
-| | 27
+| 27
-| | 249.23
+| 249.23
-| | hemischismic
+| 15/13
 |-
-| | 28
+| 28
-| | 258.46
+| 258.46
-| |
+| 64/55
 |-
-| | 29
+| 29
-| | 267.69
+| 267.69
-| |
+| 7/6
 |-
-| | 30
+| 30
-| | 276.92
+| 276.92
-| |
+| 75/64
 |-
-| | 31
+| 31
-| | 286.15
+| 286.15
-| |
+| 13/11
 |-
-| | 32
+| 32
-| | 295.38
+| 295.38
-| |
+| 32/27
 |-
-| | 33
+| 33
-| | 304.62
+| 304.62
-| |
+| 25/21
 |-
-| | 34
+| 34
-| | 313.85
+| 313.85
-| |
+| 6/5
 |-
-| | 35
+| 35
-| | 323.08
+| 323.08
-| |
+| 65/54
 |-
-| | 36
+| 36
-| | 332.31
+| 332.31
-| |
+| 40/33
 |-
-| | 37
+| 37
-| | 341.54
+| 341.54
-| |
+| 39/32
 |-
-| | 38
+| 38
-| | 350.77
+| 350.77
-| |
+| 11/9, 27/22
 |-
-| | 39
+| 39
-| | 360
+| 360.00
-| |
+| 16/13
 |-
-| | 40
+| 40
-| | 369.23
+| 369.23
-| |
+| 26/21
 |-
-| | 41
+| 41
-| | 378.46
+| 378.46
-| |
+| 56/45
 |-
-| | 42
+| 42
-| | 387.69
+| 387.69
-| |
+| 5/4
 |-
-| | 43
+| 43
-| | 396.92
+| 396.92
-| |
+| 44/35
 |-
-| | 44
+| 44
-| | 406.15
+| 406.15
-| |
+| 81/64
 |-
-| | 45
+| 45
-| | 415.38
+| 415.38
-| |
+| 14/11
 |-
-| | 46
+| 46
-| | 424.62
+| 424.62
-| |
+| 32/25
 |-
-| | 47
+| 47
-| | 433.85
+| 433.85
-| |
+| 9/7
 |-
-| | 48
+| 48
-| | 443.08
+| 443.08
-| |
+| 84/65, 128/99
 |-
-| | 49
+| 49
-| | 452.31
+| 452.31
-| |
+| 13/10
 |-
-| | 50
+| 50
-| | 461.54
+| 461.54
-| |
+| 64/49, ''72/55''
 |-
-| | 51
+| 51
-| | 470.77
+| 470.77
-| |
+| 21/16
 |-
-| | 52
+| 52
-| | 480
+| 480.00
-| |
+| 33/25
 |-
-| | 53
+| 53
-| | 489.23
+| 489.23
-| |
+| 65/49
 |-
-| | 54
+| 54
-| | 498.46
+| 498.46
-| |
+| 4/3
 |-
-| | 55
+| 55
-| | 507.69
+| 507.69
-| |
+| 75/56
 |-
-| | 56
+| 56
-| | 516.92
+| 516.92
-| |
+| 27/20
 |-
-| | 57
+| 57
-| | 526.15
+| 526.15
-| |
+| 65/48
 |-
-| | 58
+| 58
-| | 535.38
+| 535.38
-| |
+| 15/11
 |-
-| | 59
+| 59
-| | 544.62
+| 544.62
-| |
+| 48/35
 |-
-| | 60
+| 60
-| | 553.85
+| 553.85
-| |
+| 11/8
 |-
-| | 61
+| 61
-| | 563.08
+| 563.08
-| |
+| 18/13
 |-
-| | 62
+| 62
-| | 572.31
+| 572.31
-| |
+| 25/18
 |-
-| | 63
+| 63
-| | 581.54
+| 581.54
-| |
+| 7/5
 |-
-| | 64
+| 64
-| | 590.77
+| 590.77
-| |
+| 45/32
 |-
-| | 65
+| 65
-| | 600
+| 600.00
-| |
+| 99/70, 140/99
 |-
-| | 66
+|…
-| | 609.23
+|…
-| |
+|…
+|}
+== Notation ==
+=== Sagittal notation ===
+{| class="wikitable center-all"
+! Steps
+| 0
+| 1
+| 2
+| 3
+| 4
+| 5
+| 6
+| 7
+| 8
+| 9
+| 10
+| 11
+| 12
 |-
-| | 67
+! Symbol
-| | 618.46
+| [[File:Sagittal natural.png]]
-| |
+| [[File:Sagittal nai.png]]
+| [[File:Sagittal pai.png]]
+| [[File:Sagittal tai.png]]
+| [[File:Sagittal phai.png]]
+| [[File:Sagittal patai.png]]
+| [[File:Sagittal pakai.png]]
+| [[File:Sagittal jakai.png]]
+| [[File:Sagittal sharp phao.png]]
+| [[File:Sagittal sharp tao.png]]
+| [[File:Sagittal sharp pao.png]]
+| [[File:Sagittal sharp nao.png]]
+| [[File:Sagittal sharp.png]]
+|}
+== Approximation to JI ==
+=== Zeta peak index ===
+{{ZPI
+| zpi = 796
+| steps = 130.003910460506
+| step size = 9.23049157328654
+| tempered height = 10.355108
+| pure height = 10.339572
+| integral = 1.634018
+| gap = 19.594551
+| octave = 1199.96390452725
+| consistent = 16
+| distinct = 16
+}}
+== Regular temperament properties ==
+{| class="wikitable center-4 center-5 center-6"
 |-
-| | 68
+! rowspan="2" | [[Subgroup]]
-| | 627.69
+! rowspan="2" | [[Comma list]]
-| |
+! rowspan="2" | [[Mapping]]
+! rowspan="2" | Optimal<br>8ve stretch (¢)
+! colspan="2" | Tuning error
 |-
-| | 69
+! [[TE error|Absolute]] (¢)
-| | 636.92
+! [[TE simple badness|Relative]] (%)
-| |
 |-
-| | 70
+| 2.3.5.7
-| | 646.15
+| 2401/2400, 3136/3125, 19683/19600
-| |
+| {{Mapping| 130 206 302 365 }}
+| −0.119
+| 0.311
+| 3.37
 |-
-| | 71
+| 2.3.5.7.11
-| | 655.38
+| 243/242, 441/440, 3136/3125, 4000/3993
-| |
+| {{Mapping| 130 206 302 365 450 }}
+| −0.241
+| 0.370
+| 4.02
 |-
-| | 72
+| 2.3.5.7.11.13
-| | 664.62
+| 243/242, 351/350, 364/363, 441/440, 3136/3125
-| |
+| {{Mapping| 130 206 302 365 450 481 }}
+| −0.177
+| 0.367
+| 3.98
+|}
+=== Rank-2 temperaments ===
+Note: temperaments supported by [[65edo|65et]] are not included.
+{| class="wikitable center-all left-5"
+|+ style="font-size: 105%;" | Table of rank-2 temperaments by generator
 |-
-| | 73
+! Periods<br>per 8ve
-| | 673.85
+! Generator*
-| |
+! Cents*
+! Associated<br>ratio*
+! Temperament
 |-
-| | 74
+| 1
-| | 683.08
+| 3\130
-| |
+| 27.69
+| 64/63
+| [[Arch]]
 |-
-| | 75
+| 1
-| | 692.31
+| 7\130
-| |
+| 64.62
+| 26/25
+| [[Rectified hebrew]]
 |-
-| | 76
+| 1
-| | 701.54
+| 9\130
-| |
+| 83.08
+| 21/20
+| [[Sextilifourths]]
 |-
-| | 77
+| 1
-| | 710.77
+| 19\130
-| |
+| 175.38
+| 72/65
+| [[Sesquiquartififths]] / [[sesquart]]
 |-
-| | 78
+| 1
-| | 720
+| 21\130
-| |
+| 193.85
+| 28/25
+| [[Hemiwürschmidt]]
 |-
-| | 79
+| 1
-| | 729.23
+| 27\130
-| |
+| 249.23
+| 15/13
+| [[Hemischis]]
 |-
-| | 80
+| 1
-| | 738.46
+| 41\130
-| |
+| 378.46
+| 56/45
+| [[Subpental]]
 |-
-| | 81
+| 2
-| | 747.69
+| 6\130
-| |
+| 55.38
+| 33/32
+| [[Septisuperfourth]]
 |-
-| | 82
+| 2
-| | 756.92
+| 9\130
-| |
+| 83.08
+| 21/20
+| [[Harry]]
 |-
-| | 83
+| 2
-| | 766.15
+| 17\130
-| |
+| 156.92
+| 35/32
+| [[Bison]]
 |-
-| | 84
+| 2
-| | 775.38
+| 19\130
-| |
+| 175.38
+| 448/405
+| [[Bisesqui]]
 |-
-| | 85
+| 2
-| | 784.62
+| 54\130<br>(11\130)
-| |
+| 498.46<br>(101.54)
+| 4/3<br>(35/33)
+| [[Bischismic]]
 |-
-| | 86
+| 5
-| | 793.85
+| 27\130<br>(1\130)
-| |
+| 249.23<br>(9.23)
+| 81/70<br>(176/175)
+| [[Hemiquintile]]
 |-
-| | 87
+| 10
-| | 803.08
+| 27\130<br>(1\130)
-| |
+| 249.23<br>(9.23)
+| 15/13<br>(176/175)
+| [[Decoid]]
 |-
-| | 88
+| 10
-| | 812.31
+| 54\130<br>(2\130)
-| |
+| 498.46<br>(18.46)
+| 4/3<br>(81/80)
+| [[Decile]]
 |-
-| | 89
+| 26
-| | 821.54
+| 54\130<br>(1\130)
-| |
+| 498.46<br>(9.23)
-|-
+| 4/3<br>(225/224)
-| | 90
+| [[Bosonic]]
-| | 830.77
+|}
-| |
+<nowiki/>* [[Normal lists|Octave-reduced form]], reduced to the first half-octave, and [[Normal lists|minimal form]] in parentheses if distinct
-|-
-| | 91
+== Scales ==
-| | 840
+{| class="wikitable"
-| |
+|+ style="font-size: 105%;" | 14-tone temperament of "Narrative Wars"<br />as an example of using 130edo:
 |-
-| | 92
+! Step
-| | 849.23
+! Cents
-| |
+! Distance to the nearest JI interval<br />(selected ratios)
 |-
-| | 93
+| 13 (13/130)
-| | 858.46
+| 120.000
-| |
+| [[15/14]] (+0.557{{c}})
 |-
-| | 94
+| 7 (20/130)
-| | 867.69
+| 184.615
-| |
+| [[10/9]] (+2.211{{c}})
 |-
-| | 95
+| 9 (29/130)
-| | 876.92
+| 267.692
-| |
+| [[7/6]] (+0,821{{c}})
 |-
-| | 96
+| 9 (38/130)
-| | 886.15
+| 350.769
-| |
+| [[11/9]] (+3.361{{c}})
 |-
-| | 97
+| 9 (47/130)
-| | 895.38
+| 433.846
-| |
+| [[9/7]] (−1.238{{c}})
 |-
-| | 98
+| 7 (54/130)
-| | 904.62
+| 498.462
-| |
+| [[4/3]] (+0.417{{c}})
 |-
-| | 99
+| 13 (67/130)
-| | 913.85
+| 618.462
-| |
+| [[10/7]] (+0.974{{c}})
 |-
-| | 100
+| 9 (76/130)
-| | 923.08
+| 701.538
-| |
+| [[3/2]] (−0.417{{c}})
 |-
-| | 101
+| 7 (83/130)
-| | 932.31
+| 766.154
-| |
+| [[14/9]] (+1.238{{c}})
 |-
-| | 102
+| 13 (96/130)
-| | 941.54
+| 886.154
-| |
+| [[5/3]] (+1.795{{c}})
 |-
-| | 103
+| 5 (101/130)
-| | 950.77
+| 932.308
-| |
+| [[12/7]] (−0.821{{c}})
 |-
-| | 104
+| 13 (114/130)
-| | 960
+| 1052.308
-| |
+| [[11/6]] (+2.945{{c}})
 |-
-| | 105
+| 7 (121/130)
-| | 969.23
+| 1116.923
-| |
+| [[21/11]] (−2.540{{c}})
 |-
-| | 106
+| 9 (130/130)
-| | 978.46
+| 1200.000
-| |
+| [[Octave]] (2/1, 0{{c}})
-|-
-| | 107
-| | 987.69
-| |
-|-
-| | 108
-| | 996.92
-| |
-|-
-| | 109
-| | 1006.15
-| |
-|-
-| | 110
-| | 1015.38
-| |
-|-
-| | 111
-| | 1024.62
-| |
-|-
-| | 112
-| | 1033.85
-| |
-|-
-| | 113
-| | 1043.08
-| |
-|-
-| | 114
-| | 1052.31
-| |
-|-
-| | 115
-| | 1061.54
-| |
-|-
-| | 116
-| | 1070.77
-| |
-|-
-| | 117
-| | 1080
-| |
-|-
-| | 118
-| | 1089.23
-| |
-|-
-| | 119
-| | 1098.46
-| |
-|-
-| | 120
-| | 1107.69
-| |
-|-
-| | 121
-| | 1116.92
-| |
-|-
-| | 122
-| | 1126.15
-| |
-|-
-| | 123
-| | 1135.38
-| |
-|-
-| | 124
-| | 1144.62
-| |
-|-
-| | 125
-| | 1153.85
-| |
-|-
-| | 126
-| | 1163.08
-| |
-|-
-| | 127
-| | 1172.31
-| |
-|-
-| | 128
-| | 1181.54
-| |
-|-
-| | 129
-| | 1190.77
-| |
 |}
-==Music==
+== Instruments ==
-[http://www.archive.org/details/TheParadiseOfCantor The Paradise of Cantor] [http://www.archive.org/download/TheParadiseOfCantor/cantor.mp3 play] by [[Gene_Ward_Smith|Gene Ward Smith]]      [[Category:edo]]
+[[Lumatone mapping for 130edo]]
-[[Category:harry]]
-[[Category:hemischismic]]
+== Music ==
-[[Category:hemiwuerschmidt]]
+{{Catrel|130edo tracks}}
-[[Category:listen]]
-[[Category:sesquiquartififths]]
+; [[birdshite stalactite]]
-[[Category:zeta]]
+* [https://www.youtube.com/watch?v=q41n5XI6YA4 ''wazzock''] (2024)
+; [[Sevish]]
+* [https://www.youtube.com/watch?v=30UQVYWnsDU Narrative Wars]
+; [[Gene Ward Smith]]
+* [https://www.archive.org/details/TheParadiseOfCantor ''The Paradise of Cantor''] [https://www.archive.org/download/TheParadiseOfCantor/cantor.mp3 play] (2006)
+[[Category:Harry]]
+[[Category:Hemischis]]
+[[Category:Hemiwürschmidt]]
+[[Category:Listen]]
+[[Category:Sesquiquartififths]]

130edo: Difference between revisions