Dakotismic chords
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Dakotismic chords are essentially tempered chords tempered by the dakotisma, 595/594.
Dakotismic chords are numerous, including 14 triads and 51 tetrads as 2.3.5.7.11.17 subgroup 17-odd-limit essentially tempered chords.
For triads, there are seven pairs of chords in inverse relationship:
- 1–6/5–17/11 with steps 6/5, 9/7, 22/17, and its inverse
- 1–22/17–5/3 with steps 22/17, 9/7, 6/5;
- 1–7/6–22/17 with steps 7/6, 10/9, 17/11, and its inverse
- 1–17/11–12/7 with steps 17/11, 10/9, 7/6;
- 1–11/10–17/12 with steps 11/10, 9/7, 24/17, and its inverse
- 1–9/7–17/12 with steps 9/7, 11/10, 24/17;
- 1–14/11–24/17 with steps 14/11, 10/9, 17/12, and its inverse
- 1–10/9–24/17 with steps 10/9, 14/11, 17/12;
- 1–9/7–15/11 with steps 9/7, 18/17, 22/15, and its inverse
- 1–9/7–17/9 with steps 9/7, 22/15, 18/17;
- 1–11/7–5/3 with steps 11/7, 18/17, 6/5, and its inverse
- 1–11/7–17/9 with steps 11/7, 6/5, 18/17;
- 1–11/10–7/6 with steps 11/10, 18/17, 12/7, and its inverse
- 1–11/10–17/9 with steps 11/10, 12/7, 18/17.
For tetrads, there are three palindromic chords and twenty-four pairs of chords in inverse relationship. The palindromic chords are
- 1–6/5–9/7–17/11 with steps 6/5, 15/14, 6/5, 22/17;
- 1–18/17–9/7–15/11 with steps 18/17, 17/14, 18/17, 22/15;
- 1–18/17–5/3–30/17 with steps 18/17, 11/7, 18/17, 17/15.
The inversely related pairs of chords are
- 1–14/11–17/11–9/5 with steps 14/11, 17/14, 7/6, 10/9, and its inverse
- 1–7/6–17/12–9/5 with steps 7/6, 17/14, 14/11, 10/9;
- 1–6/5–17/11–12/7 with steps 6/5, 9/7, 10/9, 7/6, and its inverse
- 1–7/6–22/17–5/3 with steps 7/6, 10/9, 9/7, 6/5;
- 1–6/5–17/11–9/5 with steps 6/5, 9/7, 7/6, 10/9, and its inverse
- 1–10/9–22/17–5/3 with steps 10/9, 7/6, 9/7, 6/5;
- 1–9/7–17/12–11/7 with steps 9/7, 11/10, 10/9, 14/11, and its inverse
- 1–14/11–24/17–14/9 with steps 14/11, 10/9, 11/10, 9/7;
- 1–11/10–17/12–11/7 with steps 11/10, 9/7, 10/9, 14/11, and its inverse
- 1–14/11–24/17–20/11 with steps 14/11, 10/9, 9/7, 11/10;
- 1–11/10–17/12–17/10 with steps 11/10, 9/7, 6/5, 20/17, and its inverse
- 1–6/5–17/11–17/10 with steps 6/5, 9/7, 11/10, 20/17;
- 1–17/12–11/7–11/6 with steps 17/12, 10/9, 7/6, 12/11, and its inverse
- 1–17/12–17/11–9/5 with steps 17/12, 12/11, 7/6, 10/9;
- 1–22/17–5/3–11/6 with steps 22/17, 9/7, 11/10, 12/11, and its inverse
- 1–11/10–17/12–11/6 with steps 11/10, 9/7, 22/17, 12/11;
- 1–17/12–3/2–9/5 with steps 17/12, 18/17, 6/5, 10/9, and its inverse
- 1–18/17–3/2–5/3 with steps 18/17, 17/12, 10/9, 6/5;
- 1–9/7–15/11–3/2 with steps 9/7, 18/17, 11/10, 4/3, and its inverse
- 1–11/10–7/6–3/2 with steps 11/10, 18/17, 9/7, 4/3;
- 1–9/7–17/12–3/2 with steps 9/7, 11/10, 18/17, 4/3, and its inverse
- 1–18/17–7/6–3/2 with steps 18/17, 11/10, 9/7, 4/3;
- 1–11/10–17/12–3/2 with steps 11/10, 9/7, 18/17, 4/3, and its inverse
- 1–18/17–15/11–3/2 with steps 18/17, 9/7, 11/10, 4/3;
- 1–9/7–15/11–5/3 with steps 9/7, 18/17, 11/9, 6/5, and its inverse
- 1–9/7–17/11–17/9 with steps 9/7, 6/5, 11/9, 18/17;
- 1–9/7–15/11–18/11 with steps 9/7, 18/17, 6/5, 11/9, and its inverse
- 1–9/7–11/7–17/9 with steps 9/7, 11/9, 6/5, 18/17;
- 1–9/7–17/11–18/11 with steps 9/7, 6/5, 18/17, 11/9, and its inverse
- 1–6/5–17/11–17/9 with steps 6/5, 9/7, 11/9, 18/17;
- 1–6/5–14/9–17/9 with steps 6/5, 22/17, 17/14, 18/17, and its inverse
- 1–17/14–11/7–17/9 with steps 17/14, 22/17, 6/5, 18/17;
- 1–9/7–5/3–17/9 with steps 9/7, 22/17, 17/15, 18/17, and its inverse
- 1–17/15–22/15–17/9 with steps 17/15, 22/17, 9/7, 18/17;
- 1–6/5–17/10–17/9 with steps 6/5, 17/12, 10/9, 18/17, and its inverse
- 1–10/9–11/7–17/9 with steps 10/9, 17/12, 6/5, 18/17;
- 1–17/14–9/7–17/12 with steps 17/14, 18/17, 11/10, 24/17, and its inverse
- 1–11/10–7/6–17/12 with steps 11/10, 18/17, 17/14, 24/17;
- 1–10/7–11/7–5/3 with steps 10/7, 11/10, 18/17, 6/5, and its inverse
- 1–10/7–12/7–20/11 with steps 10/7, 6/5, 18/17, 11/10;
- 1–11/10–11/9–17/9 with steps 11/10, 10/9, 17/11, 18/17, and its inverse
- 1–17/11–12/7–17/9 with steps 17/11, 10/9, 11/10, 18/17;
- 1–10/9–12/7–17/9 with steps 10/9, 17/11, 11/10, 18/17, and its inverse
- 1–11/10–17/10–17/9 with steps 11/10, 17/11, 10/9, 18/17;
- 1–11/10–6/5–17/9 with steps 11/10, 12/11, 11/7, 18/17, and its inverse
- 1–11/7–12/7–17/9 with steps 11/7, 12/11, 11/10, 18/17;
- 1–15/14–9/7–15/11 with steps 15/14, 6/5, 18/17, 22/15, and its inverse
- 1–18/17–14/11–15/11 with steps 18/17, 6/5, 15/14, 22/15.
Equal temperaments with dakotismic chords include 12, 14c, 15g, 19eg, 22, 26, 27eg, 31g, 41, 46, 50, 58, 72, 94, 118, 121, 140, 239 and 311.