Ploidacot/Tetracot/Generator tunings: Difference between revisions
Jump to navigation
Jump to search
No edit summary |
m Categorised this uncategorised page |
||
| Line 601: | Line 601: | ||
| | 3/20 | | | 3/20 | ||
|} | |} | ||
[[Category:MOS scales]] | |||
[[Category:Tables]] | |||
Revision as of 19:35, 23 April 2023
For most of its generator range, this MOS is the chromatic scale of the family of temperaments which divide the perfect fifth into four equal parts, thus representing 81:80 (the syntonic comma) by +7 or -13 generators. In fact, this comma, which may be exaggerated until the point where it is 60¢, appears as the difference between the generator and the disjunct tone and as the small step when the generator is flatter than 3/20edo.
| Generator | cents | Syntonic comma | cents | Generator | |||||
|---|---|---|---|---|---|---|---|---|---|
| 1/7 | 171.429 | 0 | 184.615 | 2/13 | |||||
| 6/41 | 175.61 | 29.268 | 20.339 | 183.051 | 9/59 | ||||
| 23/157 | 175.796 | 30.573 | 21.525 | 182.96 | 34/223 | ||||
| 17/116 | 175.862 | 31.0345 | 21.951 | 182.927 | 25/164 | ||||
| 11/75 | 176 | 32 | 22.857 | 182.857 | 16/105 | ||||
| 16/109 | 176.147 | 33.0275 | 23.841 | 182.7815 | 23/151 | ||||
| 21/143 | 176.224 | 33.5665 | 24.3655 | 182.721 | 30/197 | ||||
| 26/177 | 176.271 | 33.8983 | 24.691 | 182.741 | 37/243 | ||||
| 31/211 | 176.303 | 34.171 | 24.9135 | 182.72 | 44/289 | ||||
| 36/245 | 176.3265 | 34.286 | 25.075 | 182.687 | 51/335 | ||||
| 176.328 | 34.294 | 25.083 | 182.686 | ||||||
| 5/34 | 176.471 | 35.294 | 26.0345 | 182.609 | 7/46 | ||||
| 24/163 | 176.687 | 36.872 | 27.843 | 182.4885 | 33/217 | ||||
| 19/129 | 176.744 | 37.209 | 28.07 | 182.456 | 26/171 | ||||
| 176.781 | 37.467 | 28.344 | 182.435 | ||||||
| 14/95 | 176.842 | 37.895 | 28.8 | 182.4 | 19/125 | ||||
| 176.901 | 38.3065 | 29.244 | 182.366 | ||||||
| 23/156 | 176.923 | 38.4615 | 29.412 | 182.353 | 31/204 | ||||
| 9/61 | 177.049 | 39.344 | 30.38 | 182.2875 | 12/79 | ||||
| 22/149 | 177.181 | 40.2685 | 31.414 | 182.199 | 29/191 | ||||
| 13/88 | 177.273 | 40.909 | 32.143 | 182.143 | 17/112 | ||||
| 17/115 | 177.391 | 41.739 | 33.103 | 182.069 | 22/145 | ||||
| 21/142 | 177.465 | 42.2535 | 33.708 | 182.0225 | 27/178 | ||||
| 25/169 | 177.515 | 42.604 | 33.825 | 181.9905 | 32/211 | ||||
| 29/196 | 177.551 | 42.857 | 34.426 | 181.967 | 37/244 | ||||
| 177.553 | 42.871 | 34.542 | 181.958 | ||||||
| 33/223 | 177.5785 | 43.049 | 34.657 | 181.9495 | 42/277 | ||||
| 37/250 | 177.6 | 43.2 | 34.839 | 181.9355 | 47/310 | ||||
| 41/277 | 177.617 | 43.321 | 34.985 | 181.924 | 52/343 | ||||
| 45/304 | 177.632 | 43.421 | 35.106 | 181.915 | 57/376 | ||||
| 4/27 | 177.778 | 44.444 | 36.364 | 181.818 | 5/33 | ||||
| 39/263 | 177.947 | 45.585 | 37.539 | 181.7035 | 48/317 | ||||
| 35/236 | 177.966 | 45.763 | 38.028 | 181.69 | 43/284 | ||||
| 31/209 | 177.99 | 45.933 | 38.247 | 181.673 | 38/251 | ||||
| 27/182 | 178.022 | 46.154 | 38.514 | 181.651 | 33/218 | ||||
| 23/155 | 178.0645 | 46.452 | 38.919 | 181.621 | 28/185 | ||||
| 19/128 | 178.125 | 46.875 | 39.474 | 181.579 | 23/152 | ||||
| 15/101 | 178.218 | 47.525 | 40.336 | 181.513 | 18/119 | ||||
| 178.252 | 47.762 | 40.655 | 181.488 | ||||||
| 11/74 | 178.378 | 48.649 | 41.8605 | 181.395 | 13/86 | ||||
| 29/195 | 178.4615 | 49.231 | 42.667 | 181.333 | 34/225 | ||||
| 178.476 | 49.3295 | 42.8045 | 181.323 | ||||||
| 18/121 | 178.512 | 49.587 | 43.1655 | 181.295 | 21/139 | ||||
| 25/168 | 178.571 | 50 | 43.75 | 181.25 | 29/192 | ||||
| 178.573 | 50.009 | 43.763 | 181.249 | ||||||
| 32/215 | 178.605 | 50.233 | 44.082 | 181.2245 | 37/245 | ||||
| 7/47 | 178.723 | 51.063 | 45.283 | 181.132 | 8/53 | ||||
| 24/161 | 178.882 | 52.174 | 46.927 | 181.006 | 27/179 | ||||
| 17/114 | 178.947 | 52.632 | 47.619 | 180.952 | 19/126 | ||||
| 27/181 | 179.0055 | 53.039 | 48.241 | 180.814 | 30/199 | ||||
| 10/67 | 179.1045 | 53.732 | 49.315 | 180.575 | 11/73 | ||||
| 23/154 | 179.221 | 54.5455 | 50.602 | 180.506 | 25/166 | ||||
| 13/87 | 179.31 | 55.172 | 51.613 | 180.452 | 14/93 | ||||
| 3/20 | 180 | 60 | 180 | 3/20 | |||||