Pontiac: Difference between revisions

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Removed redirect to Schismatic family#Pontiac
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#REDIRECT [[Schismatic family #Pontiac]]
'''Pontiac temperament''' is a 7-limit (and higher) temperament of the [[Schismatic family #Pontiac|schismatic family]]. It is an extension of [[helmholtz]] temperament beyond the 5-limit but with the same simple chain-of-fifths structure (so that standard notation may be used). As in helmholtz temperament, [[5/4]] is mapped to the diminished fourth (e.g. A-D♭), and the new mapping specific to garibaldi is that [[7/4]] is mapped to the quintuple augmented third (e.g. A-Cxxx). This makes pontiac a [[Ragismic microtemperaments|ragismic temperament]].


Immediate 11-limit extensions include ''helenoid'' (53&65), mapping 11/8 to -30 fifths, ''ponta'' (53&171), mapping 11/8 to -83 fifths, and ''pontic'' (118&171), mapping 11/8 to +88 fifths.
== Interval chain ==
{| class="wikitable center-1 right-2"
! rowspan="3" | Fifth <br>generator
! rowspan="3" | Cents*
! colspan="4" | Approximate Ratios
|-
! rowspan="2" | 7-limit
! colspan="3" | 17-limit Extension
|-
! Helenoid
! Ponta
! Pontic
|-
| 0
| 0.00
| 1/1
|
|
|
|-
| 1
| 701.76
| 3/2
|
|
|
|-
| 2
| 203.51
| 9/8
|
|
|
|-
| 3
| 905.27
| 27/16
| 22/13
|
|
|-
| 4
| 407.03
| 81/64
|
|
|
|-
| 5
| 1108.78
| 243/128, 256/135
|
|
|
|-
| 6
| 610.54
| 64/45
|
|
|
|-
| 7
| 112.30
| 16/15
|
|
|
|-
| 8
| 814.05
| 8/5
|
|
|
|-
| 9
| 315.81
| 6/5
|
|
|
|-
| 10
| 1017.57
| 9/5
|
|
|
|-
| 11
| 519.32
| 27/20
|
|
|
|-
| 12
| 21.08
| 81/80
|
|
|
|-
| 13
| 722.84
| 243/160
|
|
|
|-
| 14
| 224.59
| 256/225
|
|
|
|-
| 15
| 926.35
| 128/75
|
|
|
|-
| 16
| 428.11
| 32/25
|
|
|
|-
| 17
| 1129.86
| 48/25
|
|
|
|-
| 18
| 631.62
| 36/25
|
|
|
|-
| 19
| 133.38
| 27/25
|
|
|
|-
| 20
| 835.13
| 81/50
|
|
|
|-
| 21
| 336.89
| 175/144
| 17/14
| 17/14
| 17/14
|-
| 22
| 1038.65
| 175/96
| 20/11
|
|
|-
| 23
| 540.40
| 175/128
| 15/11
|
|
|-
| 24
| 42.16
| 128/125
|
|
|
|-
| 25
| 743.92
| 192/125
| 20/13
| 20/13
| 20/13
|-
| 26
| 245.67
| 144/125
| 15/13
| 15/13
| 15/13
|-
| 27
| 947.43
| 140/81
|
|
|
|-
| 28
| 449.19
| 35/27
|
|
| 22/17
|-
| 29
| 1150.94
| 35/18
|
|
|
|-
| 30
| 652.70
| 35/24
| 16/11
|
|
|-
| 31
| 154.46
| 35/32
| 12/11
|
|
|-
| 32
| 856.21
| 105/64
| 18/11
|
|
|-
| 33
| 357.97
| 315/256
| 16/13
| 16/13
| 16/13
|-
| 34
| 1059.73
| 448/243
| 24/13
| 24/13
| 24/13
|-
| 35
| 561.48
| 112/81
| 18/13
| 18/13
| 18/13
|-
| 36
| 63.24
| 28/27
|
|
|
|-
| 37
| 765.00
| 14/9
|
|
|
|-
| 38
| 266.75
| 7/6
|
|
|
|-
| 39
| 968.51
| 7/4
|
|
|
|-
| 40
| 470.27
| 21/16
|
|
|
|-
| 41
| 1172.02
| 63/32
|
|
|
|-
| 42
| 673.78
| 189/128
|
|
|
|-
| 43
| 175.54
| 448/405
|
|
|
|-
| 44
| 877.29
| 224/135
|
|
|
|-
| 45
| 379.05
| 56/45
|
|
|
|-
| 46
| 1080.81
| 28/15
|
|
|
|-
| 47
| 582.56
| 7/5
|
|
|
|-
| 48
| 84.32
| 21/20
|
|
|
|-
| 49
| 786.08
| 63/40
|
|
| 11/7
|-
| 50
| 287.83
| 189/160
|
| 13/11
|
|-
| 51
| 989.59
| 567/320
|
|
|
|-
| 52
| 491.35
| 896/675
|
|
|
|-
| 53
| 1193.10
| 448/225
|
|
|
|-
| 54
| 694.86
| 112/75
|
|
|
|-
| 55
| 196.62
| 28/25
|
|
|
|-
| 56
| 898.37
| 42/25
|
|
|
|-
| 57
| 400.13
| 63/50
|
|
|
|-
| 58
| 1101.89
| 189/100
| 17/9
| 17/9
| 17/9
|-
| 59
| 603.64
| 567/400
| 17/12
| 17/12
| 17/12
|-
| 60
| 105.40
| 1225/1152
| 17/16
| 17/16
| 17/16
|-
| 61
| 807.16
| 1225/768
|
|
|
|-
| 62
| 308.91
| 448/375
|
|
|
|-
| 63
| 1010.67
| 224/125
|
|
|
|-
| 64
| 512.43
| 168/125
|
|
|
|-
| 65
| 14.18
| 126/125
|
|
|
|-
| 66
| 715.94
| 189/125
|
|
|
|-
| 67
| 217.70
| 245/216
| 17/15
| 17/15
| 17/15
|-
| 68
| 919.45
| 245/144
| 17/10
| 17/10
| 17/10
|-
| 69
| 421.21
| 245/192
| 14/11
|
|
|-
| 70
| 1122.97
| 245/128
|
|
|
|-
| 71
| 624.72
| 735/512, 896/625
|
|
|
|-
| 72
| 126.48
| 672/625
| 14/13
| 14/13
| 14/13
|-
| 73
| 828.24
| 392/243
|
|
|
|-
| 74
| 329.99
| 98/81
|
|
|
|-
| 75
| 1031.75
| 49/27
|
| 20/11
|
|-
| 76
| 533.51
| 49/36
|
| 15/11
|
|-
| 77
| 35.26
| 49/48
|
|
|
|-
| 78
| 737.02
| 49/32
|
|
|
|-
| 79
| 238.78
| 147/128
|
|
|
|-
| 80
| 940.53
| 441/256
|
|
|
|-
| 81
| 442.29
| 1323/1024, 1568/1215
|
|
|
|-
| 82
| 1144.05
| 784/405
|
|
|
|-
| 83
| 645.80
| 196/135
|
| 16/11
|
|-
| 84
| 147.56
| 49/45
|
| 12/11
|
|-
| 85
| 849.32
| 49/30
|
| 18/11
|
|-
| 86
| 351.07
| 49/40
|
|
| 11/9
|-
| 87
| 1052.83
| 147/80
|
|
| 11/6
|-
| 88
| 554.59
| 441/320
|
|
| 11/8
|-
| 89
| 56.34
| 1323/1280
|
|
|
|-
| 90
| 758.10
| 3136/2025
| 17/11
|
|
|-
| 91
| 259.86
| 784/675
|
|
|
|-
| 92
| 961.61
| 392/225
|
|
|
|-
| 93
| 463.37
| 98/75
| 17/13
| 17/13
| 17/13
|-
| 94
| 1165.13
| 49/25
|
|
|
|-
| 95
| 666.88
| 147/100
|
|
| 22/15
|-
| 96
| 168.64
| 441/400
|
|
| 11/10
|-
| 97
| 870.40
| 1323/800
|
|
|
|-
| 98
| 372.15
| 3969/3200
|
|
|
|-
| 99
| 1073.91
| 6272/3375
|
|
|
|-
| 100
| 575.67
| 1568/1125
|
|
|
|-
| 101
| 77.42
| 392/375
|
|
|
|-
| 102
| 779.18
| 196/125
|
|
|
|-
| 103
| 280.94
| 147/125
|
|
|
|-
| 104
| 982.69
| 441/250
|
|
|
|-
| 105
| 484.45
| 1323/1000
|
|
|
|-
| 106
| 1186.21
| 1715/864
|
|
|
|-
| 107
| 687.96
| 1715/1152
|
|
|
|-
| 108
| 189.72
| 1715/1536
|
|
|
|-
| 109
| 891.48
| 1715/1024, 3136/1875
|
|
|
|-
| 110
| 393.23
| 784/625
|
|
|
|-
| 111
| 1094.99
| 1176/625
|
|
|
|-
| 112
| 596.75
| 343/243
|
|
|
|-
| 113
| 98.50
| 343/324
|
|
|
|-
| 114
| 800.26
| 343/216
|
|
|
|-
| 115
| 302.02
| 343/288
|
|
|
|-
| 116
| 1003.77
| 343/192
|
|
|
|-
| 117
| 505.53
| 343/256
|
|
|
|-
| 118
| 7.29
| 1029/1024
|
|
|
|-
| 119
| 709.04
| 3087/2048, 4704/3125, <br>5488/3645
|
|
|
|-
| 120
| 210.80
| 1372/1215
|
|
|
|-
| 121
| 912.56
| 686/405
|
|
| 22/13
|-
| 122
| 414.31
| 343/270
|
| 14/11
|
|-
| 123
| 1116.07
| 343/180
|
|
|
|-
| 124
| 617.83
| 343/240
|
|
|
|-
| 125
| 119.58
| 343/320
|
|
|
|}
<nowiki>*</nowiki> in 7-limit POTE tuning
== Spectrum of pontiac tunings by eigenmonzos ==
=== Helenoid mapping ===
Gencom: [2 4/3; 352/351 385/384 625/624 729/728]
Gencom map: [{{val|1 2 -1 19 -9 -10}}, {{val|0 -1 8 -39 30 33}}]
{| class="wikitable center-1 right-2"
|-
! Eigenmonzo
! Fifth
! Comments
|-
| 11/10
| 701.591
|
|-
| 15/11
| 701.607
|
|-
| 11/8
| 701.623
|
|-
| 12/11
| 701.633
|
|-
| 11/9
| 701.644
|
|-
| 16/15
| 701.676
|
|-
| 14/11
| 701.703
| 11-odd-limit minimax
|-
| 5/4
| 701.711
|
|-
| 6/5
| 701.738
| 5-odd-limit minimax
|-
| 15/14
| 701.7512
|
|-
| 9/7
| 701.7544
|
|-
| 7/5
| 701.7556
| 7-odd-limit minimax
|-
| 10/9
| 701.7596
| 9-odd-limit minimax
|-
| 7/6
| 701.7598
|
|-
| 8/7
| 701.7648
|
|-
| 14/13
| 701.782
| 13 and 15-odd-limit minimax
|-
| 16/13
| 701.802
|
|-
| 13/12
| 701.807
|
|-
| 18/13
| 701.811
|
|-
| 13/10
| 701.831
|
|-
| 15/13
| 701.836
|
|-
| 4/3
| 701.955
|
|-
| 13/11
| 703.597
|
|}
[[Category:Ragismic microtemperaments]]
[[Category:Schismatic family]]
[[Category:Schismatic family]]
{{IoT}}
[[Category:Index of temperaments]]

Revision as of 00:40, 27 June 2021

Pontiac temperament is a 7-limit (and higher) temperament of the schismatic family. It is an extension of helmholtz temperament beyond the 5-limit but with the same simple chain-of-fifths structure (so that standard notation may be used). As in helmholtz temperament, 5/4 is mapped to the diminished fourth (e.g. A-D♭), and the new mapping specific to garibaldi is that 7/4 is mapped to the quintuple augmented third (e.g. A-Cxxx). This makes pontiac a ragismic temperament.

Immediate 11-limit extensions include helenoid (53&65), mapping 11/8 to -30 fifths, ponta (53&171), mapping 11/8 to -83 fifths, and pontic (118&171), mapping 11/8 to +88 fifths.

Interval chain

Fifth
generator 		Cents* Approximate Ratios
7-limit 17-limit Extension
Helenoid Ponta Pontic
0 0.00 1/1
1 701.76 3/2
2 203.51 9/8
3 905.27 27/16 22/13
4 407.03 81/64
5 1108.78 243/128, 256/135
6 610.54 64/45
7 112.30 16/15
8 814.05 8/5
9 315.81 6/5
10 1017.57 9/5
11 519.32 27/20
12 21.08 81/80
13 722.84 243/160
14 224.59 256/225
15 926.35 128/75
16 428.11 32/25
17 1129.86 48/25
18 631.62 36/25
19 133.38 27/25
20 835.13 81/50
21 336.89 175/144 17/14 17/14 17/14
22 1038.65 175/96 20/11
23 540.40 175/128 15/11
24 42.16 128/125
25 743.92 192/125 20/13 20/13 20/13
26 245.67 144/125 15/13 15/13 15/13
27 947.43 140/81
28 449.19 35/27 22/17
29 1150.94 35/18
30 652.70 35/24 16/11
31 154.46 35/32 12/11
32 856.21 105/64 18/11
33 357.97 315/256 16/13 16/13 16/13
34 1059.73 448/243 24/13 24/13 24/13
35 561.48 112/81 18/13 18/13 18/13
36 63.24 28/27
37 765.00 14/9
38 266.75 7/6
39 968.51 7/4
40 470.27 21/16
41 1172.02 63/32
42 673.78 189/128
43 175.54 448/405
44 877.29 224/135
45 379.05 56/45
46 1080.81 28/15
47 582.56 7/5
48 84.32 21/20
49 786.08 63/40 11/7
50 287.83 189/160 13/11
51 989.59 567/320
52 491.35 896/675
53 1193.10 448/225
54 694.86 112/75
55 196.62 28/25
56 898.37 42/25
57 400.13 63/50
58 1101.89 189/100 17/9 17/9 17/9
59 603.64 567/400 17/12 17/12 17/12
60 105.40 1225/1152 17/16 17/16 17/16
61 807.16 1225/768
62 308.91 448/375
63 1010.67 224/125
64 512.43 168/125
65 14.18 126/125
66 715.94 189/125
67 217.70 245/216 17/15 17/15 17/15
68 919.45 245/144 17/10 17/10 17/10
69 421.21 245/192 14/11
70 1122.97 245/128
71 624.72 735/512, 896/625
72 126.48 672/625 14/13 14/13 14/13
73 828.24 392/243
74 329.99 98/81
75 1031.75 49/27 20/11
76 533.51 49/36 15/11
77 35.26 49/48
78 737.02 49/32
79 238.78 147/128
80 940.53 441/256
81 442.29 1323/1024, 1568/1215
82 1144.05 784/405
83 645.80 196/135 16/11
84 147.56 49/45 12/11
85 849.32 49/30 18/11
86 351.07 49/40 11/9
87 1052.83 147/80 11/6
88 554.59 441/320 11/8
89 56.34 1323/1280
90 758.10 3136/2025 17/11
91 259.86 784/675
92 961.61 392/225
93 463.37 98/75 17/13 17/13 17/13
94 1165.13 49/25
95 666.88 147/100 22/15
96 168.64 441/400 11/10
97 870.40 1323/800
98 372.15 3969/3200
99 1073.91 6272/3375
100 575.67 1568/1125
101 77.42 392/375
102 779.18 196/125
103 280.94 147/125
104 982.69 441/250
105 484.45 1323/1000
106 1186.21 1715/864
107 687.96 1715/1152
108 189.72 1715/1536
109 891.48 1715/1024, 3136/1875
110 393.23 784/625
111 1094.99 1176/625
112 596.75 343/243
113 98.50 343/324
114 800.26 343/216
115 302.02 343/288
116 1003.77 343/192
117 505.53 343/256
118 7.29 1029/1024
119 709.04 3087/2048, 4704/3125,
5488/3645
120 210.80 1372/1215
121 912.56 686/405 22/13
122 414.31 343/270 14/11
123 1116.07 343/180
124 617.83 343/240
125 119.58 343/320

* in 7-limit POTE tuning

Spectrum of pontiac tunings by eigenmonzos

Helenoid mapping

Gencom: [2 4/3; 352/351 385/384 625/624 729/728]

Gencom map: [1 2 -1 19 -9 -10], 0 -1 8 -39 30 33]]

Eigenmonzo Fifth Comments
11/10 701.591
15/11 701.607
11/8 701.623
12/11 701.633
11/9 701.644
16/15 701.676
14/11 701.703 11-odd-limit minimax
5/4 701.711
6/5 701.738 5-odd-limit minimax
15/14 701.7512
9/7 701.7544
7/5 701.7556 7-odd-limit minimax
10/9 701.7596 9-odd-limit minimax
7/6 701.7598
8/7 701.7648
14/13 701.782 13 and 15-odd-limit minimax
16/13 701.802
13/12 701.807
18/13 701.811
13/10 701.831
15/13 701.836
4/3 701.955
13/11 703.597
Retrieved from "https://en.xen.wiki/index.php?title=Pontiac&oldid=73240"