Mynucumic chords: Difference between revisions
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'''Mynucumic chords''' are [[ | '''Mynucumic chords''' are [[dyadic chord|essentially tempered chords]] tempered by the mynucuma, [[196/195]]. | ||
There are 10 triads, 33 tetrads, 26 pentads and 6 hexads as 2.3.5.7.13 subgroup [[13-odd-limit]] essentially tempered chords. | There are 10 triads, 33 tetrads, 26 pentads and 6 hexads as 2.3.5.7.13 subgroup [[13-odd-limit]] essentially tempered chords. | ||
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The ''mynucumic triads'' are temperings of | The ''mynucumic triads'' are temperings of | ||
* | * 1–16/13–10/7 with steps of 16/13, 7/6, 7/5, and its inverse | ||
* | * 1–7/6–10/7 with steps of 7/6, 16/13, 7/5. | ||
The rest four inversely related pairs of triads contain semitones, such as 13/12 or 14/13: | The rest four inversely related pairs of triads contain semitones, such as 13/12 or 14/13: | ||
* | * 1–7/5–3/2 with steps of 7/5, 14/13, 4/3, and its inverse | ||
* | * 1–14/13–3/2 with steps of 14/13, 7/5, 4/3; | ||
* | * 1–7/6–5/4 with steps of 7/6, 14/13, 8/5, and its inverse | ||
* | * 1–14/13–5/4 with steps of 14/13, 7/6, 8/5; | ||
* | * 1–6/5–9/7 with steps of 6/5, 14/13, 14/9, and its inverse | ||
* | * 1–14/13–9/7 with steps of 14/13, 6/5, 14/9; | ||
* | * 1–9/7–7/5 with steps of 9/7, 13/12, 10/7, and its inverse | ||
* | * 1–13/12–7/5 with steps of 13/12, 9/7, 10/7. | ||
For tetrads, there are five palindromic chords and fourteen pairs of chords in inverse relationship. | For tetrads, there are five palindromic chords and fourteen pairs of chords in inverse relationship. | ||
The ''mynucumic tetrad'' is palindromic, a tempering of | The ''mynucumic tetrad'' is palindromic, a tempering of | ||
* | * 1–7/6–7/5–13/8 chord with steps of 7/6, 6/5, 7/6, 16/13. | ||
The rest four palindromic tetrads contain semitones: | The rest four palindromic tetrads contain semitones: | ||
* | * 1–14/13–7/5–3/2 chord with steps of 14/13, 13/10, 14/13, 4/3; | ||
* | * 1–14/13–7/6–5/4 chord with steps of 14/13, 13/12, 14/13, 8/5; | ||
* | * 1–6/5–9/7–13/7 chord with steps of 6/5, 14/13, 13/9, 14/13; | ||
* | * 1–9/7–7/5–9/5 chord with steps of 9/7, 13/12, 9/7, 10/9. | ||
The inversely related pairs of tetrads also contain semitones: | The inversely related pairs of tetrads also contain semitones: | ||
* | * 1–9/7–7/5–3/2 with steps of 9/7, 13/12, 14/13, 4/3, and its inverse | ||
* | * 1–14/13–7/6–3/2 with steps of 14/13, 13/12, 9/7, 4/3; | ||
* | * 1–6/5–9/7–3/2 with steps of 6/5, 14/13, 7/6, 4/3, and its inverse | ||
* | * 1–7/6–5/4–3/2 with steps of 7/6, 14/13, 6/5, 4/3; | ||
* | * 1–6/5–7/5–3/2 with steps of 6/5, 7/6, 14/13, 4/3, and its inverse | ||
* | * 1–14/13–5/4–3/2 with steps of 14/13, 7/6, 6/5, 4/3; | ||
* | * 1–7/6–7/5–3/2 with steps of 7/6, 6/5, 14/13, 4/3, and its inverse | ||
* | * 1–14/13–9/7–3/2 with steps of 14/13, 6/5, 7/6, 4/3; | ||
* | * 1–13/12–7/5–3/2 with steps of 13/12, 9/7, 14/13, 4/3, and its inverse | ||
* | * 1–14/13–18/13–3/2 with steps of 14/13, 9/7, 13/12, 4/3; | ||
* | * 1–7/5–3/2–9/5 with steps of 7/5, 14/13, 6/5, 10/9, and its inverse | ||
* | * 1–14/13–3/2–5/3 with steps of 14/13, 7/5, 10/9, 6/5; | ||
* | * 1–7/5–3/2–7/4 with steps of 7/5, 14/13, 7/6, 8/7, and its inverse | ||
* | * 1–14/13–3/2–12/7 with steps of 14/13, 7/5, 8/7, 7/6; | ||
* | * 1–7/5–3/2–12/7 with steps of 7/5, 14/13, 8/7, 7/6, and its inverse | ||
* | * 1–14/13–3/2–7/4 with steps of 14/13, 7/5, 7/6, 8/7; | ||
* | * 1–9/7–3/2–24/13 with steps of 9/7, 7/6, 16/13, 13/12, and its inverse | ||
* | * 1–7/6–3/2–13/8 with steps of 7/6, 9/7, 13/12, 16/13; | ||
* | * 1–7/5–3/2–13/8 with steps of 7/5, 14/13, 13/12, 16/13, and its inverse | ||
* | * 1–14/13–3/2–24/13 with steps of 14/13, 7/5, 16/13, 13/12; | ||
* | * 1–7/6–5/4–13/8 with steps of 7/6, 14/13, 13/10, 16/13, and its inverse | ||
* | * 1–14/13–5/4–20/13 with steps of 14/13, 7/6, 16/13, 13/10; | ||
* | * 1–7/6–5/4–10/7 with steps of 7/6, 14/13, 8/7, 7/5, and its inverse | ||
* | * 1–14/13–5/4–7/4 with steps of 14/13, 7/6, 7/5, 8/7; | ||
* | * 1–6/5–13/10–13/7 with steps of 6/5, 13/12, 10/7, 14/13, and its inverse | ||
* | * 1–6/5–9/7–24/13 with steps of 6/5, 14/13, 10/7, 13/12; | ||
* | * 1–6/5–12/7–13/7 with steps of 6/5, 10/7, 13/12, 14/13, and its inverse | ||
* | * 1–6/5–9/7–7/5 with steps of 6/5, 14/13, 13/12, 10/7. | ||
For pentads, there are thirteen pairs of chords in inverse relationship, all of them involve semitones and the perfect fifth: | For pentads, there are thirteen pairs of chords in inverse relationship, all of them involve semitones and the perfect fifth: | ||
* | * 1–6/5–9/7–7/5–3/2 with steps of 6/5, 14/13, 13/12, 14/13, 4/3, and its inverse | ||
* | * 1–14/13–7/6–5/4–3/2 with steps of 14/13, 13/12, 14/13, 6/5, 4/3; | ||
* | * 1–13/12–7/6–7/5–3/2 with steps of 13/12, 14/13, 6/5, 14/13, 4/3, and its inverse | ||
* | * 1–14/13–9/7–18/13–3/2 with steps of 14/13, 6/5, 14/13, 13/12, 4/3; | ||
* | * 1–14/13–9/7–7/5–3/2 with steps of 14/13, 6/5, 13/12, 14/13, 4/3, and its inverse | ||
* | * 1–14/13–7/6–7/5–3/2 with steps of 14/13, 13/12, 6/5, 14/13, 4/3; | ||
* | * 1–9/7–7/5–3/2–9/5 with steps of 9/7, 13/12, 14/13, 6/5, 10/9, and its inverse | ||
* | * 1–14/13–7/6–3/2–5/3 with steps of 14/13, 13/12, 9/7, 10/9, 6/5; | ||
* | * 1–6/5–9/7–3/2–9/5 with steps of 6/5, 14/13, 7/6, 6/5, 10/9, and its inverse | ||
* | * 1–7/6–5/4–3/2–5/3 with steps of 7/6, 14/13, 6/5, 10/9, 6/5; | ||
* | * 1–6/5–9/7–3/2–12/7 with steps of 6/5, 14/13, 7/6, 8/7, 7/6, and its inverse | ||
* | * 1–7/6–5/4–3/2–7/4 with steps of 7/6, 14/13, 6/5, 7/6, 8/7; | ||
* | * 1–6/5–7/5–3/2–12/7 with steps of 6/5, 7/6, 14/13, 8/7, 7/6, and its inverse | ||
* | * 1–14/13–5/4–3/2–7/4 with steps of 14/13, 7/6, 6/5, 7/6, 8/7; | ||
* | * 1–14/13–7/5–3/2–7/4 with steps of 14/13, 13/10, 14/13, 7/6, 8/7, and its inverse | ||
* | * 1–14/13–7/5–3/2–12/7 with steps of 14/13, 13/10, 14/13, 8/7, 7/6; | ||
* | * 1–9/7–18/13–3/2–24/13 with steps of 9/7, 14/13, 13/12, 16/13, 13/12, and its inverse | ||
* | * 1–13/12–7/6–3/2–13/12 with steps of 13/12, 14/13, 9/7, 13/12, 16/13; | ||
* | * 1–6/5–9/7–3/2–24/13 with steps of 6/5, 14/13, 7/6, 16/13, 13/12, and its inverse | ||
* | * 1–7/6–5/4–3/2–13/8 with steps of 7/6, 14/13, 6/5, 13/12, 16/13; | ||
* | * 1–7/6–7/5–3/2–13/8 with steps of 7/6, 6/5, 14/13, 13/12, 16/13, and its inverse | ||
* | * 1–14/13–9/7–3/2–24/13 with steps of 14/13, 6/5, 7/6, 16/13, 13/12; | ||
* | * 1–9/7–3/2–12/7–24/13 with steps of 9/7, 7/6, 8/7, 14/13, 13/12, and its inverse | ||
* | * 1–7/6–3/2–13/8–7/4 with steps of 7/6, 9/7, 13/12, 14/13, 8/7; | ||
* | * 1–7/5–3/2–13/8–7/4 with steps of 7/5, 14/13, 13/12, 14/13, 8/7, and its inverse | ||
* | * 1–14/13–3/2–12/7–24/13 with steps of 14/13, 7/5, 8/7, 14/13, 13/12. | ||
For hexads, there are two palindromic chords and two pairs of chords in inverse relationship. The palindromic chords are | For hexads, there are two palindromic chords and two pairs of chords in inverse relationship. The palindromic chords are | ||
* | * 1–14/13–7/6–5/4–3/2–5/3 chord with steps of 14/13, 13/12, 14/13, 6/5, 10/9, 6/5; | ||
* | * 1–13/12–7/6–7/5–3/2–13/8 chord with steps of 13/12, 14/13, 6/5, 14/13, 13/12, 16/13. | ||
The inversely related pairs of chords are | The inversely related pairs of chords are | ||
* | * 1–6/5–9/7–7/5–3/2–12/7 with steps of 6/5, 14/13, 13/12, 14/13, 8/7, 7/6, and its inverse | ||
* | * 1–14/13–7/6–5/4–3/2–7/4 with steps of 14/13, 13/12, 14/13, 6/5, 7/6, 8/7; | ||
* | * 1–14/13–9/7–7/5–3/2–12/7 with steps of 14/13, 6/5, 13/12, 14/13, 8/7, 7/6, and its inverse | ||
* | * 1–14/13–7/6–7/5–3/2–7/4 with steps of 14/13, 13/12, 6/5, 14/13, 7/6, 8/7. | ||
Equal | [[Equal temperament]]s with mynucumic chords include {{Optimal ET sequence| 19, 27, 31, 41, 46, 58, 68, 77, 87, 118, 145 and 232 }}. | ||
[[Category:13-odd-limit]] | [[Category:13-odd-limit chords]] | ||
[[Category:Essentially tempered chords]] | [[Category:Essentially tempered chords]] | ||
[[Category:Triads]] | [[Category:Triads]] | ||
Latest revision as of 14:34, 19 March 2025
Mynucumic chords are essentially tempered chords tempered by the mynucuma, 196/195.
There are 10 triads, 33 tetrads, 26 pentads and 6 hexads as 2.3.5.7.13 subgroup 13-odd-limit essentially tempered chords.
For triads, there are five pairs of chords in inverse relationship.
The mynucumic triads are temperings of
- 1–16/13–10/7 with steps of 16/13, 7/6, 7/5, and its inverse
- 1–7/6–10/7 with steps of 7/6, 16/13, 7/5.
The rest four inversely related pairs of triads contain semitones, such as 13/12 or 14/13:
- 1–7/5–3/2 with steps of 7/5, 14/13, 4/3, and its inverse
- 1–14/13–3/2 with steps of 14/13, 7/5, 4/3;
- 1–7/6–5/4 with steps of 7/6, 14/13, 8/5, and its inverse
- 1–14/13–5/4 with steps of 14/13, 7/6, 8/5;
- 1–6/5–9/7 with steps of 6/5, 14/13, 14/9, and its inverse
- 1–14/13–9/7 with steps of 14/13, 6/5, 14/9;
- 1–9/7–7/5 with steps of 9/7, 13/12, 10/7, and its inverse
- 1–13/12–7/5 with steps of 13/12, 9/7, 10/7.
For tetrads, there are five palindromic chords and fourteen pairs of chords in inverse relationship.
The mynucumic tetrad is palindromic, a tempering of
- 1–7/6–7/5–13/8 chord with steps of 7/6, 6/5, 7/6, 16/13.
The rest four palindromic tetrads contain semitones:
- 1–14/13–7/5–3/2 chord with steps of 14/13, 13/10, 14/13, 4/3;
- 1–14/13–7/6–5/4 chord with steps of 14/13, 13/12, 14/13, 8/5;
- 1–6/5–9/7–13/7 chord with steps of 6/5, 14/13, 13/9, 14/13;
- 1–9/7–7/5–9/5 chord with steps of 9/7, 13/12, 9/7, 10/9.
The inversely related pairs of tetrads also contain semitones:
- 1–9/7–7/5–3/2 with steps of 9/7, 13/12, 14/13, 4/3, and its inverse
- 1–14/13–7/6–3/2 with steps of 14/13, 13/12, 9/7, 4/3;
- 1–6/5–9/7–3/2 with steps of 6/5, 14/13, 7/6, 4/3, and its inverse
- 1–7/6–5/4–3/2 with steps of 7/6, 14/13, 6/5, 4/3;
- 1–6/5–7/5–3/2 with steps of 6/5, 7/6, 14/13, 4/3, and its inverse
- 1–14/13–5/4–3/2 with steps of 14/13, 7/6, 6/5, 4/3;
- 1–7/6–7/5–3/2 with steps of 7/6, 6/5, 14/13, 4/3, and its inverse
- 1–14/13–9/7–3/2 with steps of 14/13, 6/5, 7/6, 4/3;
- 1–13/12–7/5–3/2 with steps of 13/12, 9/7, 14/13, 4/3, and its inverse
- 1–14/13–18/13–3/2 with steps of 14/13, 9/7, 13/12, 4/3;
- 1–7/5–3/2–9/5 with steps of 7/5, 14/13, 6/5, 10/9, and its inverse
- 1–14/13–3/2–5/3 with steps of 14/13, 7/5, 10/9, 6/5;
- 1–7/5–3/2–7/4 with steps of 7/5, 14/13, 7/6, 8/7, and its inverse
- 1–14/13–3/2–12/7 with steps of 14/13, 7/5, 8/7, 7/6;
- 1–7/5–3/2–12/7 with steps of 7/5, 14/13, 8/7, 7/6, and its inverse
- 1–14/13–3/2–7/4 with steps of 14/13, 7/5, 7/6, 8/7;
- 1–9/7–3/2–24/13 with steps of 9/7, 7/6, 16/13, 13/12, and its inverse
- 1–7/6–3/2–13/8 with steps of 7/6, 9/7, 13/12, 16/13;
- 1–7/5–3/2–13/8 with steps of 7/5, 14/13, 13/12, 16/13, and its inverse
- 1–14/13–3/2–24/13 with steps of 14/13, 7/5, 16/13, 13/12;
- 1–7/6–5/4–13/8 with steps of 7/6, 14/13, 13/10, 16/13, and its inverse
- 1–14/13–5/4–20/13 with steps of 14/13, 7/6, 16/13, 13/10;
- 1–7/6–5/4–10/7 with steps of 7/6, 14/13, 8/7, 7/5, and its inverse
- 1–14/13–5/4–7/4 with steps of 14/13, 7/6, 7/5, 8/7;
- 1–6/5–13/10–13/7 with steps of 6/5, 13/12, 10/7, 14/13, and its inverse
- 1–6/5–9/7–24/13 with steps of 6/5, 14/13, 10/7, 13/12;
- 1–6/5–12/7–13/7 with steps of 6/5, 10/7, 13/12, 14/13, and its inverse
- 1–6/5–9/7–7/5 with steps of 6/5, 14/13, 13/12, 10/7.
For pentads, there are thirteen pairs of chords in inverse relationship, all of them involve semitones and the perfect fifth:
- 1–6/5–9/7–7/5–3/2 with steps of 6/5, 14/13, 13/12, 14/13, 4/3, and its inverse
- 1–14/13–7/6–5/4–3/2 with steps of 14/13, 13/12, 14/13, 6/5, 4/3;
- 1–13/12–7/6–7/5–3/2 with steps of 13/12, 14/13, 6/5, 14/13, 4/3, and its inverse
- 1–14/13–9/7–18/13–3/2 with steps of 14/13, 6/5, 14/13, 13/12, 4/3;
- 1–14/13–9/7–7/5–3/2 with steps of 14/13, 6/5, 13/12, 14/13, 4/3, and its inverse
- 1–14/13–7/6–7/5–3/2 with steps of 14/13, 13/12, 6/5, 14/13, 4/3;
- 1–9/7–7/5–3/2–9/5 with steps of 9/7, 13/12, 14/13, 6/5, 10/9, and its inverse
- 1–14/13–7/6–3/2–5/3 with steps of 14/13, 13/12, 9/7, 10/9, 6/5;
- 1–6/5–9/7–3/2–9/5 with steps of 6/5, 14/13, 7/6, 6/5, 10/9, and its inverse
- 1–7/6–5/4–3/2–5/3 with steps of 7/6, 14/13, 6/5, 10/9, 6/5;
- 1–6/5–9/7–3/2–12/7 with steps of 6/5, 14/13, 7/6, 8/7, 7/6, and its inverse
- 1–7/6–5/4–3/2–7/4 with steps of 7/6, 14/13, 6/5, 7/6, 8/7;
- 1–6/5–7/5–3/2–12/7 with steps of 6/5, 7/6, 14/13, 8/7, 7/6, and its inverse
- 1–14/13–5/4–3/2–7/4 with steps of 14/13, 7/6, 6/5, 7/6, 8/7;
- 1–14/13–7/5–3/2–7/4 with steps of 14/13, 13/10, 14/13, 7/6, 8/7, and its inverse
- 1–14/13–7/5–3/2–12/7 with steps of 14/13, 13/10, 14/13, 8/7, 7/6;
- 1–9/7–18/13–3/2–24/13 with steps of 9/7, 14/13, 13/12, 16/13, 13/12, and its inverse
- 1–13/12–7/6–3/2–13/12 with steps of 13/12, 14/13, 9/7, 13/12, 16/13;
- 1–6/5–9/7–3/2–24/13 with steps of 6/5, 14/13, 7/6, 16/13, 13/12, and its inverse
- 1–7/6–5/4–3/2–13/8 with steps of 7/6, 14/13, 6/5, 13/12, 16/13;
- 1–7/6–7/5–3/2–13/8 with steps of 7/6, 6/5, 14/13, 13/12, 16/13, and its inverse
- 1–14/13–9/7–3/2–24/13 with steps of 14/13, 6/5, 7/6, 16/13, 13/12;
- 1–9/7–3/2–12/7–24/13 with steps of 9/7, 7/6, 8/7, 14/13, 13/12, and its inverse
- 1–7/6–3/2–13/8–7/4 with steps of 7/6, 9/7, 13/12, 14/13, 8/7;
- 1–7/5–3/2–13/8–7/4 with steps of 7/5, 14/13, 13/12, 14/13, 8/7, and its inverse
- 1–14/13–3/2–12/7–24/13 with steps of 14/13, 7/5, 8/7, 14/13, 13/12.
For hexads, there are two palindromic chords and two pairs of chords in inverse relationship. The palindromic chords are
- 1–14/13–7/6–5/4–3/2–5/3 chord with steps of 14/13, 13/12, 14/13, 6/5, 10/9, 6/5;
- 1–13/12–7/6–7/5–3/2–13/8 chord with steps of 13/12, 14/13, 6/5, 14/13, 13/12, 16/13.
The inversely related pairs of chords are
- 1–6/5–9/7–7/5–3/2–12/7 with steps of 6/5, 14/13, 13/12, 14/13, 8/7, 7/6, and its inverse
- 1–14/13–7/6–5/4–3/2–7/4 with steps of 14/13, 13/12, 14/13, 6/5, 7/6, 8/7;
- 1–14/13–9/7–7/5–3/2–12/7 with steps of 14/13, 6/5, 13/12, 14/13, 8/7, 7/6, and its inverse
- 1–14/13–7/6–7/5–3/2–7/4 with steps of 14/13, 13/12, 6/5, 14/13, 7/6, 8/7.
Equal temperaments with mynucumic chords include 19, 27, 31, 41, 46, 58, 68, 77, 87, 118, 145 and 232.