7-limit: Difference between revisions
| Line 30: | Line 30: | ||
RH zil[14] | RH zil[14] | ||
<pre> | <pre> | ||
21/20 | 21/20; 9/8; 189/160; 6/5; 21/16; 27/20; 7/5; 3/2; 63/40; 8/5; 7/4; 9/5; 63/32; 2/1 | ||
9/8 | |||
189/160 | |||
6/5 | |||
21/16 | |||
27/20 | |||
7/5 | |||
3/2 | |||
63/40 | |||
8/5 | |||
7/4 | |||
9/5 | |||
63/32 | |||
2/1 | |||
</pre> | </pre> | ||
LH zil[14] | LH zil[14] | ||
<pre> | <pre> | ||
21/20 | 21/20; 9/8; 7/6; 6/5; 21/16; 4/3; 7/5; 3/2; 63/40; 8/5; 7/4; 9/5; 63/32; 2/1 | ||
9/8 | |||
7/6 | |||
6/5 | |||
21/16 | |||
4/3 | |||
7/5 | |||
3/2 | |||
63/40 | |||
8/5 | |||
7/4 | |||
9/5 | |||
63/32 | |||
2/1 | |||
</pre> | </pre> | ||
| Line 67: | Line 41: | ||
Zil[24] is achiral. It has a 4×3×2 structure in the 7-limit lattice. | Zil[24] is achiral. It has a 4×3×2 structure in the 7-limit lattice. | ||
<pre> | <pre> | ||
525/512 | 525/512; 135/128; 35/32; 9/8; 4725/4096; 75/64; 315/256; 5/4; 21/16; 675/512; 175/128; 45/32; 189/128; 3/2; 1575/1024; 25/16; 105/64; 27/16; 7/4; 225/128; 945/512; 15/8; 63/32; 2/1 | ||
135/128 | |||
35/32 | |||
9/8 | |||
4725/4096 | |||
75/64 | |||
315/256 | |||
5/4 | |||
21/16 | |||
675/512 | |||
175/128 | |||
45/32 | |||
189/128 | |||
3/2 | |||
1575/1024 | |||
25/16 | |||
105/64 | |||
27/16 | |||
7/4 | |||
225/128 | |||
945/512 | |||
15/8 | |||
63/32 | |||
2/1 | |||
</pre> | </pre> | ||
| Line 98: | Line 49: | ||
RH | RH | ||
<pre> | <pre> | ||
35/32 | 35/32; 7/6; 5/4; 4/3; 35/24; 3/2; 5/3; 7/4; 15/8; 2/1 | ||
7/6 | |||
5/4 | |||
4/3 | |||
35/24 | |||
3/2 | |||
5/3 | |||
7/4 | |||
15/8 | |||
2/1 | |||
</pre> | </pre> | ||
LH | LH | ||
<pre> | <pre> | ||
16/15 | 16/15; 8/7; 6/5; 4/3; 48/35; 3/2; 8/5; 12/7; 64/35; 2/1 | ||
8/7 | |||
6/5 | |||
4/3 | |||
48/35 | |||
3/2 | |||
8/5 | |||
12/7 | |||
64/35 | |||
2/1 | |||
</pre> | </pre> | ||
| Line 128: | Line 61: | ||
<pre> | <pre> | ||
33075/32768 | 33075/32768; 525/512; 135/128; 2205/2048; 35/32; 9/8; 147/128; 4725/4096; 75/64; 1225/1024; 315/256; 5/4; 1323/1024; 21/16; 675/512; 11025/8192; 175/128; 45/32; 735/512; 189/128; 3/2; 49/32; 1575/1024; 25/16; 6615/4096; 105/64; 27/16; 441/256; 7/4; 225/128; 3675/2048; 945/512; 15/8; 245/128; 63/32; 2/1 | ||
525/512 | |||
135/128 | |||
2205/2048 | |||
35/32 | |||
9/8 | |||
147/128 | |||
4725/4096 | |||
75/64 | |||
1225/1024 | |||
315/256 | |||
5/4 | |||
1323/1024 | |||
21/16 | |||
675/512 | |||
11025/8192 | |||
175/128 | |||
45/32 | |||
735/512 | |||
189/128 | |||
3/2 | |||
49/32 | |||
1575/1024 | |||
25/16 | |||
6615/4096 | |||
105/64 | |||
27/16 | |||
441/256 | |||
7/4 | |||
225/128 | |||
3675/2048 | |||
945/512 | |||
15/8 | |||
245/128 | |||
63/32 | |||
2/1 | |||
</pre> | </pre> | ||
Revision as of 21:38, 11 April 2026
The 7-limit or the 2.3.5.7 subgroup is the subgroup of just intonation consisting of the intervals reachable by stacking 2/1, 3/2, 5/4, and 7/4.
Rank-3 subgroups:
Full 7-limit JI scales
Mode 5
8:9:10:12:14:16
The simplest full 7-limit JI scale. This scale is notably used in the music of the Wagogo people in Tanzania.
Rooted Mixolydian
16:18:20:21:24:27:28:32
Rooted Ionian
16:18:20:21:24:27:30:32
Zil
Zil (from the temperament Godzilla which the zil series serves as a detempering of) is a series of 7-limit JI scales created from a generator sequence GS(8/7, 7/6, 8/7, 7/6, 8/7, 7/6, 8/7, 189/160).
Zil[14]
The most discussed of the zil scales is zil[14] which is chiral depending on the chirality of the interleaved 5-limit zarlino copies:
RH zil[14]
21/20; 9/8; 189/160; 6/5; 21/16; 27/20; 7/5; 3/2; 63/40; 8/5; 7/4; 9/5; 63/32; 2/1
LH zil[14]
21/20; 9/8; 7/6; 6/5; 21/16; 4/3; 7/5; 3/2; 63/40; 8/5; 7/4; 9/5; 63/32; 2/1
Zil[24]
Zil[24] is achiral. It has a 4×3×2 structure in the 7-limit lattice.
525/512; 135/128; 35/32; 9/8; 4725/4096; 75/64; 315/256; 5/4; 21/16; 675/512; 175/128; 45/32; 189/128; 3/2; 1575/1024; 25/16; 105/64; 27/16; 7/4; 225/128; 945/512; 15/8; 63/32; 2/1
12:14:16:18:21:24 by 5/4
A 10-note scale with an analogous structure to zil[14] (note that these are subsets of both zil[14] chiralities):
RH
35/32; 7/6; 5/4; 4/3; 35/24; 3/2; 5/3; 7/4; 15/8; 2/1
LH
16/15; 8/7; 6/5; 4/3; 48/35; 3/2; 8/5; 12/7; 64/35; 2/1
A Mothra[36] detemper
GS(8/7 8/7 147/128 8/7 8/7 147/128 8/7 8/7 147/128 8/7 8/7 245/216)[36]; 4×3×3 generator structure
33075/32768; 525/512; 135/128; 2205/2048; 35/32; 9/8; 147/128; 4725/4096; 75/64; 1225/1024; 315/256; 5/4; 1323/1024; 21/16; 675/512; 11025/8192; 175/128; 45/32; 735/512; 189/128; 3/2; 49/32; 1575/1024; 25/16; 6615/4096; 105/64; 27/16; 441/256; 7/4; 225/128; 3675/2048; 945/512; 15/8; 245/128; 63/32; 2/1
Full 7-limit tempered scales
Superpyth[12]
Superpyth[12] is constructed by applying Superpyth temperament (2.3.5.7[22 & 27]; equivalently tempering out 64/63 and 245/243) to a 12-note chain of fifths. It contains Superpyth-tempered 5-limit blackdye.
Pajara
Pajara can be used as an interpretation of 2L8s and 10L2s or their modifications. Pajara works best in 22edo.
7-limit diachrome
7-limit diachrome, an aberrismic scale, is constructed by taking a 6+6 or 7+5 fifth chain structure and tempering out 5120/5103.
