Palingenetic chords: Difference between revisions
No edit summary Tags: Mobile edit Mobile web edit |
m Readability |
||
| Line 5: | Line 5: | ||
There is an inversely related pair which is even more squeezed: | There is an inversely related pair which is even more squeezed: | ||
* 1-18/17-10/9 with steps 18/17-21/20-9/5 and its inverse 1-21/20-10/9 with steps 21/20-18/17-9/5. | * 1-18/17-10/9 with steps 18/17-21/20-9/5 and its inverse | ||
* 1-21/20-10/9 with steps 21/20-18/17-9/5. | |||
They can be extended to the following tetrads, with two palindromic chords and two pairs of chords in inverse relationship. The palindromic chords are | They can be extended to the following tetrads, with two palindromic chords and two pairs of chords in inverse relationship. The palindromic chords are | ||
| Line 12: | Line 13: | ||
The inversely related pairs of chords are | The inversely related pairs of chords are | ||
* 1-10/9-20/17-21/17 with steps 10/9-18/17-21/20-34/21 and its inverse 1-21/20-10/9-21/17 with steps 21/20-18/17-10/9-34/21; | * 1-10/9-20/17-21/17 with steps 10/9-18/17-21/20-34/21 and its inverse | ||
* 1-10/9-7/6-21/17 with steps 10/9-21/20-18/17-34/21 and its inverse 1-18/17-10/9-21/17 with steps 18/17-21/20-10/9-34/21. | * 1-21/20-10/9-21/17 with steps 21/20-18/17-10/9-34/21; | ||
* 1-10/9-7/6-21/17 with steps 10/9-21/20-18/17-34/21 and its inverse | |||
* 1-18/17-10/9-21/17 with steps 18/17-21/20-10/9-34/21. | |||
Then there are two inversely related pentads: | Then there are two inversely related pentads: | ||
| Line 31: | Line 34: | ||
* 1-28/25-32/27-40/27 with steps 28/25-18/17-5/4-27/20 | * 1-28/25-32/27-40/27 with steps 28/25-18/17-5/4-27/20 | ||
Equal temperaments with palingenetic chords include {{Optimal ET sequence|12, 46, 53, 58, 60, 72, 99, 111, 118, 171, 183, 243, 270, 289, 354, 400, 472 and 571}}. | Equal temperaments with palingenetic chords include {{Optimal ET sequence| 12, 46, 53, 58, 60, 72, 99, 111, 118, 171, 183, 243, 270, 289, 354, 400, 472 and 571 }}. | ||
[[Category:21-odd-limit]] | [[Category:21-odd-limit]] | ||
Revision as of 06:37, 21 July 2023
A palingenetic chord is an essentially tempered dyadic chord tempered by 1701/1700, the palingenetic comma.
The most typical palingenetic triad is a palindrome in the 2.3.5.7.17 subgroup 21-odd-limit since it identifies 21/17 by a stack of two 10/9's:
- 1-10/9-21/17 chord with steps 10/9-10/9-34/21.
There is an inversely related pair which is even more squeezed:
- 1-18/17-10/9 with steps 18/17-21/20-9/5 and its inverse
- 1-21/20-10/9 with steps 21/20-18/17-9/5.
They can be extended to the following tetrads, with two palindromic chords and two pairs of chords in inverse relationship. The palindromic chords are
- 1-18/17-10/9-20/17 chord with steps 18/17-21/10-18/17-17/10;
- 1-21/20-10/9-7/6 chord with steps 21/20-18/17-21/10-12/7.
The inversely related pairs of chords are
- 1-10/9-20/17-21/17 with steps 10/9-18/17-21/20-34/21 and its inverse
- 1-21/20-10/9-21/17 with steps 21/20-18/17-10/9-34/21;
- 1-10/9-7/6-21/17 with steps 10/9-21/20-18/17-34/21 and its inverse
- 1-18/17-10/9-21/17 with steps 18/17-21/20-10/9-34/21.
Then there are two inversely related pentads:
- 1-18/17-10/9-20/17-21/17 with steps 18/17-21/20-18/17-21/20-34/21, and its inverse
- 1-21/20-10/9-7/6-21/17 with steps 21/20-18/17-21/20-18/17-34/21.
If we allow the 27-odd-limit, we have four more known triads and two more known tetrads.
The known 27-odd-limit palingenetic triads are:
- 1-34/27-3/2 with steps 34/27-25/21-4/3, dubbed the "palingenetic major triad", and its inverse
- 1-25/21-3/2 with steps 25/21-34/27-4/3, dubbed the "palingenetic minor triad";
- 1-18/17-32/27 with steps 18/17-28/25-27/16, and its inverse
- 1-28/25-32/27 with steps 28/25-18/17-27/16.
The known 27-odd-limit palingenetic tetrads are:
- 1-18/17-32/27-8/5 with steps 18/17-28/25-27/20-5/4, and its inverse
- 1-28/25-32/27-40/27 with steps 28/25-18/17-5/4-27/20
Equal temperaments with palingenetic chords include 12, 46, 53, 58, 60, 72, 99, 111, 118, 171, 183, 243, 270, 289, 354, 400, 472 and 571.