Pentacircle chords: Difference between revisions
Jump to navigation
Jump to search
+pattern of chords |
m Improve readability; recategorize |
||
| Line 4: | Line 4: | ||
The pentacircle triads are | The pentacircle triads are | ||
* | * 1–9/7–16/9 with steps 9/7, 11/8, 9/8; | ||
* | * 1–9/7–16/11 with steps 9/7, 9/8, 11/8; | ||
* | * 1–11/7–16/9 with steps 11/7, 9/8, 9/8. | ||
The tetrads include the palindromic | The tetrads include the palindromic | ||
* | * 1–9/8–14/9–7/4 with steps 9/8, 11/8, 9/8, 8/7; | ||
* | * 1–9/8–11/8–14/9 with steps 9/8, 11/9, 9/8, 9/7. | ||
And the inversely related pairs | And the inversely related pairs | ||
* | * 1–11/8–11/7–16/9 with steps 11/8, 8/7, 9/8, 9/8, and its inverse | ||
* | * 1–11/8–14/9–7/4 with steps 11/8, 9/8, 9/8, 8/7; | ||
* | * 1–11/9–11/7–16/9 with steps 11/9, 9/7, 9/8, 9/8, and its inverse | ||
* | * 1–11/9–11/8–14/9 with steps 11/9, 9/8, 9/8, 9/7. | ||
Finally, there are two pentacircle pentads, inversely related: | Finally, there are two pentacircle pentads, inversely related: | ||
* | * 1–11/9–11/8–11/7–16/9 with steps 11/9, 9/8, 8/7, 9/8, 9/8, and its inverse | ||
* | * 1–11/9–11/8–14/9–16/9 with steps 11/9, 9/8, 9/8, 8/7, 9/8. | ||
[[ | [[Equal temperament]]s with pentacircle chords include {{EDOs| 22, 27, 41, 46, 58, 68, 80, 87, 121, 145, 167, and 208 }}, with 208edo giving the [[optimal patent val]]. | ||
[[Category:11-odd-limit]] | [[Category:11-odd-limit chords]] | ||
[[Category:Essentially tempered chords]] | [[Category:Essentially tempered chords]] | ||
[[Category:Triads]] | [[Category:Triads]] | ||
Revision as of 13:43, 11 October 2024
A pentacircle chord is an essentially tempered dyadic chord in the 2.9.7.11 subgroup in the 11-odd-limit, tempering out the pentacircle comma, 896/891.
Pentacircle chords are of pattern 1b in the 2.9.7.11 subgroup 11-odd-limit, meaning that there are 3 triads, 6 tetrads and 2 pentads, for a total of 11 distinct chord structures.
The pentacircle triads are
- 1–9/7–16/9 with steps 9/7, 11/8, 9/8;
- 1–9/7–16/11 with steps 9/7, 9/8, 11/8;
- 1–11/7–16/9 with steps 11/7, 9/8, 9/8.
The tetrads include the palindromic
- 1–9/8–14/9–7/4 with steps 9/8, 11/8, 9/8, 8/7;
- 1–9/8–11/8–14/9 with steps 9/8, 11/9, 9/8, 9/7.
And the inversely related pairs
- 1–11/8–11/7–16/9 with steps 11/8, 8/7, 9/8, 9/8, and its inverse
- 1–11/8–14/9–7/4 with steps 11/8, 9/8, 9/8, 8/7;
- 1–11/9–11/7–16/9 with steps 11/9, 9/7, 9/8, 9/8, and its inverse
- 1–11/9–11/8–14/9 with steps 11/9, 9/8, 9/8, 9/7.
Finally, there are two pentacircle pentads, inversely related:
- 1–11/9–11/8–11/7–16/9 with steps 11/9, 9/8, 8/7, 9/8, 9/8, and its inverse
- 1–11/9–11/8–14/9–16/9 with steps 11/9, 9/8, 9/8, 8/7, 9/8.
Equal temperaments with pentacircle chords include 22, 27, 41, 46, 58, 68, 80, 87, 121, 145, 167, and 208, with 208edo giving the optimal patent val.