Squbemic chords: Difference between revisions
Jump to navigation
Jump to search
m Recategorize |
m Cleanup |
||
| (One intermediate revision by one other user not shown) | |||
| Line 1: | Line 1: | ||
'''Squbemic chords''' are [[dyadic chord|essentially tempered chord]] tempered by the squbema, [[729/728]]. | |||
[[13-odd-limit]] squebmic chords belong to a tempering of the 2.9.7.13 subgroup, including two triads and three tetrads. | |||
The two squbemic triads are in inverse relationship: | |||
* | * 1–9/8–13/9 with steps of 9/8, 9/7, 18/13; | ||
* | * 1–9/7–13/9 with steps of 9/7, 9/8, 18/13. | ||
They can be extended to palindromic tetrads: | |||
* 1–9/8–14/9–7/4 with steps of 9/8, 18/13, 9/8, 8/7; | |||
* 1–9/8–13/9–13/8 with steps of 9/8, 9/7, 9/8, 16/13; | |||
* 1–9/7–13/9–13/7 with steps of 9/7, 9/8, 9/7, 14/13. | |||
[[Category:13-odd-limit]] | Equal temperaments with squbemic chords include {{Optimal ET sequence| 24, 36, 41, 53, 58, 72, 111, 130, 183, 190, 224, 354, 373, 525, 597, 845, 1028, 1069 and 1724 }}, with 1724edo giving the optimal patent val. | ||
[[Category:13-odd-limit chords]] | |||
[[Category:Essentially tempered chords]] | [[Category:Essentially tempered chords]] | ||
[[Category:Triads]] | [[Category:Triads]] | ||
[[Category:Tetrads]] | [[Category:Tetrads]] | ||
[[Category:Squbemic]] | [[Category:Squbemic]] | ||
Latest revision as of 14:10, 19 March 2025
Squbemic chords are essentially tempered chord tempered by the squbema, 729/728.
13-odd-limit squebmic chords belong to a tempering of the 2.9.7.13 subgroup, including two triads and three tetrads.
The two squbemic triads are in inverse relationship:
- 1–9/8–13/9 with steps of 9/8, 9/7, 18/13;
- 1–9/7–13/9 with steps of 9/7, 9/8, 18/13.
They can be extended to palindromic tetrads:
- 1–9/8–14/9–7/4 with steps of 9/8, 18/13, 9/8, 8/7;
- 1–9/8–13/9–13/8 with steps of 9/8, 9/7, 9/8, 16/13;
- 1–9/7–13/9–13/7 with steps of 9/7, 9/8, 9/7, 14/13.
Equal temperaments with squbemic chords include 24, 36, 41, 53, 58, 72, 111, 130, 183, 190, 224, 354, 373, 525, 597, 845, 1028, 1069 and 1724, with 1724edo giving the optimal patent val.