12edf: Difference between revisions

From Xenharmonic Wiki
Jump to navigation Jump to search
← Older editNewer edit →
VisualWikitext
Plumtree (talk | contribs)
autopatrolled, emailconfirmed
1,976 edits
m Infobox ET added
No edit summary
Line 1: Line 1:
{{Infobox ET}}
{{Infobox ET}}
'''12EDF''' is the [[EDF|equal division of the just perfect fifth]] into 12 parts of 58.4963 [[cent|cents]] each, corresponding to 20.5141 [[edo]] (similar to every second step of [[41edo]]). It is related to the [[Tetracot family|dodecacot temperament]], which tempers out 3087/3125 and 10976/10935 in the 7-limit.
'''12EDF''' is the [[EDF|equal division of the just perfect fifth]] into 12 parts of 58.49625 [[cent|cents]] each, corresponding to 20.5141 [[edo]] (similar to every second step of [[41edo]]). It is related to the [[Tetracot family|dodecacot temperament]], which tempers out 3087/3125 and 10976/10935 in the 7-limit.


==Intervals==
==Intervals==
Line 15: Line 15:
|-
|-
| | 1
| | 1
| | 58.4963
| | 58.49625
| | 91/88, 88/85
| | 91/88, 88/85
| |  
| |  
Line 25: Line 25:
|-
|-
| | 3
| | 3
| | 175.4888
| | 175.48875
| | [[21/19]]
| | [[21/19]]
| |  
| |  
Line 35: Line 35:
|-
|-
| | 5
| | 5
| | 292.4813
| | 292.48125
| | 45/38
| | 45/38
| |  
| |  
Line 45: Line 45:
|-
|-
| | 7
| | 7
| | 409.4738
| | 409.47375
| | [[19/15]]
| | [[19/15]]
| |  
| |  
Line 55: Line 55:
|-
|-
| | 9
| | 9
| | 526.4663
| | 526.46625
| | [[19/14]]
| | [[19/14]]
| |  
| |  
Line 134: Line 134:
|
|
|}
|}
==Scale tree==
If 4\7 (four degrees of 7EDO) is at one extreme and 3\5 (three degrees of 5EDO) is at the other, all other possible 5L 2s scales exist in a continuum between them. You can chop this continuum up by taking [[Mediant|"freshman sums"]] of the two edges - adding together the numerators, then adding together the denominators (i.e. adding them together as if you would be adding the complex numbers analogous real and imaginary parts). Thus, between 4\7 and 3\5 you have (4+3)\(7+5) = 7\12, seven degrees of 12EDO.


If we carry this freshman-summing out a little further, new, larger [[EDO]]s pop up in our continuum.
Generator range: 57.14286 cents (4\7/12 = 1\21) to 60 cents (3\5/12 = 1\20)
{| class="wikitable center-all"
! colspan="7" |Fifth
!Cents
!Comments
|-
|4\7 || || || || || || ||57.1429||
|-
| || ||  || || || ||27\47||57.4468 ||
|-
|  || ||  || || ||23\40|| ||57.5000||
|-
| || ||  || || ||  ||42\73||57.53425||
|-
| ||  || || || 19\33|| || || 57.{{Overline|57}}||
|-
| || || || || || ||53\92||57.6087||
|-
| || || || || ||34\59|| ||57.6271||
|-
| || || || || || ||49\85||57.6471||
|-
| || || ||15\26|| || || ||57.6923||
|-
| || || || || || ||56\97||57.7320||
|-
| || || || || ||41\71|| ||57.7465||
|-
| || || || || || ||67\116||57.7586||
|-
| || || || ||26\45|| || ||57.{{Overline|7}}||[[Flattone]] is in this region
|-
| || || || || || ||63\109||57.7982||
|-
| || || || || ||37\64|| ||57.8125||
|-
| || || || || || ||48\83||57.8313||
|-
| || ||11\19|| || || || ||57.8947||
|-
| || || || || || ||51\88||57.9{{Overline|54}}||
|-
| || || || || ||40\69|| ||57.9710||
|-
| || || || || || ||69\119||57.9832||
|-
| || || || ||29\50|| || ||58.000||
|-
| || || || || || ||76\131||58.0153||[[Golden meantone]] (696.2145¢)
|-
| || || || || ||47\81|| ||58.0247||
|-
| || || || || || ||65\112||58.0357||
|-
| || || ||18\31|| || || ||58.0645||[[Meantone]] is in this region
|-
| || || || || || ||61\105||58.0952||
|-
| || || || || ||43\74|| ||58.{{Overline|108}}||
|-
| || || || || || ||68\117||58.1967||
|-
| || || || ||25\43|| || ||58.1935||
|-
| || || || || || ||57\98||58.1633||
|-
| || || || || ||32\55|| ||58.{{Overline|18}}||
|-
| || || || || || ||39\67||58.2090||The generator closest to a just [[7/5]] for EDOs less than 2400
|-
| ||7\12|| || || || || ||58.{{Overline|3}}||
|-
| || || || || || ||38\65||58.4615||
|-
| || || || || ||31\53|| ||58.4906||The generator closest to a just [[3/2]] for EDOs less than 200
|-
| || || || || || ||55\94||58,5106||[[Garibaldi]] / [[Cassandra]]
|-
| || || || ||24\41|| || ||58.5366||
|-
| || || || || || ||65\111||58.{{Overline|558}}||
|-
| || || || || ||41\70|| ||58.5714||
|-
| || || || || || ||58\99||58.{{Overline|58}}||
|-
| || || ||17\29|| || || ||58.6207||
|-
| || || || || || ||61\104||58.65385||
|-
| || || || || ||44\75|| ||58.{{Overline|6}}||
|-
| || || || || || ||71\121||58.6777||Golden neogothic (704.0956¢)
|-
| || || || ||27\46|| || ||58.69565||[[Neogothic]] is in this region
|-
| || || || || || ||64\109||58.7155||
|-
| || || || || ||37\63|| ||58.7302||
|-
| || || || || || ||47\80||58.7500||
|-
| || ||10\17|| || || || ||58.8235||
|-
| || || || || || ||43\73||58.9041||
|-
| || || || || ||33\56|| ||58.9286||
|-
| || || || || || ||56\95||58.9474||
|-
| || || || ||23\39|| || ||58.9744||
|-
| || || || || || ||59\100||59.0000||
|-
| || || || || ||36\61|| ||59.0164||
|-
| || || || || || ||49\83||59.0361||
|-
| || || ||13\22|| || || ||59.{{Overline|09}}||[[Archy]] is in this region
|-
| || || || || || ||42\71||59.1549||
|-
| || || || || ||29\49|| ||59.1837||
|-
| || || || || || ||45\76||59.2105||
|-
| || || || ||16\27|| || ||59.{{Overline|259}}||
|-
| || || || || || ||35\59||59.3220||
|-
| || || || || ||19\32|| ||59.3750||
|-
| || || || || || ||22\37||59.{{Overline|459}}||
|-
|3\5|| || || || || || ||60.0000||
|}Tunings above 7\12 on this chart are called "negative tunings" (as they lessen the size of the fifth) and include meantone systems such as 1/3-comma (close to 11\19) and 1/4-comma (close to 18\31). As these tunings approach 4\7, the majors become flatter and the minors become sharper.
Tunings below 7\12 on this chart are called "positive tunings" and they include Pythagorean tuning itself (well approximated by 31\53) as well as superpyth tunings such as 10\17 and 13\22. As these tunings approach 3\5, the majors become sharper and the minors become flatter. Around 13\22 through 16\27, the thirds fall closer to 7-limit than 5-limit intervals: 7:6 and 9:7 as opposed to 6:5 and 5:4.
[[Category:Edf]]
[[Category:Edf]]
[[Category:Edonoi]]
[[Category:Edonoi]]

Revision as of 00:50, 20 March 2023

← 11edf 12edf 13edf →
Prime factorization 22 × 3 (highly composite)
Step size 58.4963 ¢ 
Octave 21\12edf (1228.42 ¢) (→ 7\4edf)
Twelfth 33\12edf (1930.38 ¢) (→ 11\4edf)
Consistency limit 3
Distinct consistency limit 3

12EDF is the equal division of the just perfect fifth into 12 parts of 58.49625 cents each, corresponding to 20.5141 edo (similar to every second step of 41edo). It is related to the dodecacot temperament, which tempers out 3087/3125 and 10976/10935 in the 7-limit.

Intervals

degree cents value corresponding
JI intervals 		comments
0 exact 1/1
1 58.49625 91/88, 88/85
2 116.9925 15/14
3 175.48875 21/19
4 233.9850 8/7
5 292.48125 45/38
6 350.9775 11/9, 27/22
7 409.47375 19/15
8 467.9700 21/16
9 526.46625 19/14
10 584.9625 7/5
11 643.4588 13/9
12 701.9550 exact 3/2 just perfect fifth
13 760.45125 273/176, 132/85
14 818.9475 8/5
15 877.44375 63/38
16 935.94 12/7
17 994.43625 135/76
18 1052.9325 11/6, 81/44
19 1111.42875 19/10
20 1169.925 63/32
21 1228.42125 57/28
22 1286.9175 21/10
23 1345.41375 13/6
24 1403.91 exact 9/4

Scale tree

If 4\7 (four degrees of 7EDO) is at one extreme and 3\5 (three degrees of 5EDO) is at the other, all other possible 5L 2s scales exist in a continuum between them. You can chop this continuum up by taking "freshman sums" of the two edges - adding together the numerators, then adding together the denominators (i.e. adding them together as if you would be adding the complex numbers analogous real and imaginary parts). Thus, between 4\7 and 3\5 you have (4+3)\(7+5) = 7\12, seven degrees of 12EDO.

If we carry this freshman-summing out a little further, new, larger EDOs pop up in our continuum.

Generator range: 57.14286 cents (4\7/12 = 1\21) to 60 cents (3\5/12 = 1\20)

Fifth Cents Comments
4\7 57.1429
27\47 57.4468
23\40 57.5000
42\73 57.53425
19\33 57.57
53\92 57.6087
34\59 57.6271
49\85 57.6471
15\26 57.6923
56\97 57.7320
41\71 57.7465
67\116 57.7586
26\45 57.7 Flattone is in this region
63\109 57.7982
37\64 57.8125
48\83 57.8313
11\19 57.8947
51\88 57.954
40\69 57.9710
69\119 57.9832
29\50 58.000
76\131 58.0153 Golden meantone (696.2145¢)
47\81 58.0247
65\112 58.0357
18\31 58.0645 Meantone is in this region
61\105 58.0952
43\74 58.108
68\117 58.1967
25\43 58.1935
57\98 58.1633
32\55 58.18
39\67 58.2090 The generator closest to a just 7/5 for EDOs less than 2400
7\12 58.3
38\65 58.4615
31\53 58.4906 The generator closest to a just 3/2 for EDOs less than 200
55\94 58,5106 Garibaldi / Cassandra
24\41 58.5366
65\111 58.558
41\70 58.5714
58\99 58.58
17\29 58.6207
61\104 58.65385
44\75 58.6
71\121 58.6777 Golden neogothic (704.0956¢)
27\46 58.69565 Neogothic is in this region
64\109 58.7155
37\63 58.7302
47\80 58.7500
10\17 58.8235
43\73 58.9041
33\56 58.9286
56\95 58.9474
23\39 58.9744
59\100 59.0000
36\61 59.0164
49\83 59.0361
13\22 59.09 Archy is in this region
42\71 59.1549
29\49 59.1837
45\76 59.2105
16\27 59.259
35\59 59.3220
19\32 59.3750
22\37 59.459
3\5 60.0000

Tunings above 7\12 on this chart are called "negative tunings" (as they lessen the size of the fifth) and include meantone systems such as 1/3-comma (close to 11\19) and 1/4-comma (close to 18\31). As these tunings approach 4\7, the majors become flatter and the minors become sharper.

Tunings below 7\12 on this chart are called "positive tunings" and they include Pythagorean tuning itself (well approximated by 31\53) as well as superpyth tunings such as 10\17 and 13\22. As these tunings approach 3\5, the majors become sharper and the minors become flatter. Around 13\22 through 16\27, the thirds fall closer to 7-limit than 5-limit intervals: 7:6 and 9:7 as opposed to 6:5 and 5:4.

Retrieved from "https://en.xen.wiki/index.php?title=12edf&oldid=105843"