Equable heptatonic: Difference between revisions
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Revision as of 04:30, 22 July 2023
In the theory of Margo Schulter, equable heptatonic is a category of intervals which occupy regions intermediate between 11/10 and 10/9, or 9/5 and 20/11. There are two heartland regions given below, with approximate cents ranges from Schulter's article Regions of the Interval Spectrum:
- Neut2–Maj2 – intermediate between 11/10 and 10/9 – 160¢–182¢
- min7–Neut7 – intermediate between 9/5 and 20/11 – 1018¢–1040¢
Equable heptatonic intervals are well-represented in 7edo at 171.429¢ (1\7) and 1028.571¢ (6\7). They also appear in 27edo, 34edo and 41edo. As they fall in ambiguous zones between simpler categories, they are inevitably xenharmonic.
Examples
Some equable heptatonic intervals in all two ranges, both just and tempered, are listed below.
Neut2–Maj2 (submajor second)
| Interval | Cents Value | Prime Limit (if applicable) |
|---|---|---|
| 34/31 | 159.920 | 31 |
| 2\15 | 160.000 | - |
| 79/72 | 160.627 | 79 |
| 45/41 | 161.161 | 41 |
| 7\52 | 161.538 | - |
| 101/92 | 161.579 | 101 |
| 56/51 | 161.915 | 17 |
| 5\37 | 162.162 | - |
| 67/61 | 162.422 | 67 |
| 78/71 | 162.786 | 71 |
| 89/81 | 163.060 | 89 |
| 100/91 | 163.274 | 13 |
| 3\22 | 163.636 | - |
| 7\51 | 164.706 | - |
| 11/10 | 165.004 | 11 |
| 4\29 | 165.517 | - |
| 5\36 | 166.667 | - |
| 98/89 | 166.772 | 89 |
| 87/79 | 166.995 | 79 |
| 76/69 | 167.284 | 23 |
| 6\43 | 167.442 | - |
| 65/59 | 167.670 | 59 |
| 7\50 | 168.000 | - |
| 54/49 | 168.213 | 7 |
| 97/88 | 168.577 | 97 |
| 43/39 | 169.035 | 43 |
| 75/68 | 169.627 | 17 |
| 32/29 | 170.423 | 29 |
| 85/77 | 171.125 | 17 |
| 1\7 | 171.429 | - |
| 53/48 | 171.550 | 53 |
| 74/67 | 172.037 | 67 |
| 95/86 | 172.309 | 43 |
| 21/19 | 173.268 | 19 |
| 94/85 | 174.237 | 47 |
| 73/66 | 174.517 | 77 |
| 7\48 | 175.000 | - |
| 52/47 | 175.021 | 47 |
| 83/75 | 175.465 | 83 |
| 6\41 | 175.610 | - |
| 31/28 | 176.210 | 31 |
| 5\34 | 176.471 | - |
| 72/65 | 177.069 | 13 |
| 41/37 | 177.718 | 41 |
| 4\27 | 177.778 | - |
| 92/83 | 178.227 | 83 |
| 51/46 | 178.636 | 23 |
| 7\47 | 178.723 | - |
| 61/55 | 179.253 | 61 |
| 71/64 | 179.697 | 71 |
| 3\20 | 180.000 | - |
| 81/73 | 180.031 | 73 |
| 91/82 | 180.291 | 41 |
| 5\33 | 181.818 | - |
| 10/9 | 182.404 | 5 |
| 7\46 | 182.609 | - |
| 2\13 | 184.615 | - |
min7–Neut7 (supraminor seventh)
| Interval | Cents Value | Prime Limit (if applicable) |
|---|---|---|
| 11\13 | 1015.385 | - |
| 39\46 | 1017.391 | - |
| 9/5 | 1017.596 | 5 |
| 28\33 | 1018.182 | - |
| 17\20 | 1020.000 | - |
| 40\47 | 1021.277 | - |
| 92/51 | 1021.364 | 23 |
| 83/46 | 1021.773 | 83 |
| 23\27 | 1022.222 | - |
| 74/41 | 1022.282 | 41 |
| 65/36 | 1022.931 | 13 |
| 29\34 | 1023.529 | - |
| 56/31 | 1023.790 | 31 |
| 35\41 | 1024.390 | - |
| 47/26 | 1024.979 | 47 |
| 41\48 | 1025.000 | - |
| 85/47 | 1025.763 | 47 |
| 38/21 | 1026.732 | 19 |
| 67/37 | 1027.963 | 67 |
| 6\7 | 1028.571 | - |
| 29/16 | 1029.577 | 29 |
| 78/43 | 1030.965 | 43 |
| 49/27 | 1031.787 | 7 |
| 43\50 | 1032.000 | - |
| 69/38 | 1032.716 | 23 |
| 37\43 | 1032.558 | - |
| 89/49 | 1033.228 | 89 |
| 31\36 | 1033.333 | - |
| 25\29 | 1034.483 | - |
| 20/11 | 1034.996 | 11 |
| 44\51 | 1035.294 | - |
| 19\22 | 1036.364 | - |
| 91/50 | 1036.726 | 13 |
| 71/39 | 1037.214 | 71 |
| 32\37 | 1037.838 | - |
| 51/28 | 1038.085 | 17 |
| 45\52 | 1038.462 | - |
| 82/45 | 1038.839 | 41 |
| 13\15 | 1040.000 | - |
| 31/17 | 1040.080 | 31 |