12L 1s: Difference between revisions
Jump to navigation
Jump to search
m formatting, category |
m Categories |
||
| Line 566: | Line 566: | ||
|} | |} | ||
[[Category:Abstract MOS patterns]] | |||
[[category:todo:unify precision]] | [[category:todo:unify precision]] | ||
Revision as of 21:09, 9 April 2022
This MOS, the grumpy tridecatonic, apparently belongs to no particularly important temperament. However, it becomes a compressed 12ed scale when you ignore the octave (this obviously does not work when the generator is very near 12edo (within -7/24¢ of it), for the 13th degree of the scale registers as identical to the octave for human listeners, and it becomes indistinct from 13edo or the Happy dodecatonic (1L 11s) in the 1.75¢ above 1/13edo because the large and small steps register as identical to one another for human listeners).
| Generator | Cents | 12g | ||
|---|---|---|---|---|
| 1/13 | 92.308 | 1107.692 | ||
| 5/64 | 93.75 | 1125 | ||
| 9/115 | 93.913 | 1126.9565 | ||
| 13/166 | 93.976 | 1127.711 | ||
| 17/217 | 94.009 | 1128.111 | ||
| 4/51 | 94.118 | 1129.412 | ||
| 15/191 | 94.241 | 1130.89 | ||
| 11/140 | 94.296 | 1131 3/7 | ||
| 7/89 | 94.382 | 1132.584 | ||
| 10/127 | 94.448 | 1133.858 | ||
| 13/165 | 94.5455 | 1134.5455 | ||
| 16/203 | 94.581 | 1134.975 | ||
| 19/241 | 94.606 | 1135.27 | ||
| 3/38 | 94.737 | 1136.842 | ||
| 26/329 | 94.8875 | 1137.6505 | ||
| 23/291 | 94.845 | 1138.1443 | ||
| 20/253 | 94.862 | 1138.34 | ||
| 17/215 | 94.884 | 1138.605 | ||
| 14/177 | 94.915 | 1138.983 | ||
| 94.962 | 1139.545 | |||
| 11/139 | 94.964 | 1139.568 | ||
| 8/101 | 95.0495 | 1140.594 | ||
| 95.102 | 1141.224 | |||
| 13/164 | 95.122 | 1141.463 | ||
| 5/63 | 95.238 | 1142.714 | ||
| 17/214 | 95.374 | 1143.486 | ||
| 12/151 | 95.362 | 1144.371 | ||
| 95.41 | 1144.915 | |||
| 7/88 | 95,4545 | 1145.4545 | ||
| 9/113 | 95.575 | 1146.903 | ||
| 11/138 | 95.652 | 1147.826 | ||
| 13/163 | 95.7055 | 1148.466 | ||
| 15/188 | 95.745 | 1148.936 | ||
| 17/213 | 95.775 | 1149.296 | ||
| 19/238 | 95.798 | 1149.58 | ||
| 21/263 | 95.8175 | 1149.81 | ||
| 23/288 | 95.833 | 1150 | ||
| 25/313 | 95.847 | 1150.16 | ||
| 27/338 | 95.858 | 1150.296 | ||
| 29/363 | 95.868 | 1150.467 | ||
| 31/388 | 95.876 | 1150.5155 | ||
| 33/413 | 95.884 | 1150.605 | ||
| 35/438 | 95.89 | 1150.685 | ||
| 37/463 | 95.896 | 1150.75 | ||
| 39/488 | 95.902 | 1150.82 | ||
| 41/513 | 95.906 | 1150.877 | ||
| 43/538 | 95.911 | 1150.929 | ||
| 45/563 | 95.915 | 1150.977 | ||
| 47/588 | 95.918 | 1151.02 | ||
| 2/25 | 96 | 1152 | ||
| 25/312 | 96.154 | 1153.846 | ||
| 23/287 | 96.167 | 1154.007 | ||
| 21/262 | 96.183 | 1154.1985 | ||
| 19/237 | 96.2025 | 1154,43 | ||
| 17/212 | 96.226 | 1154.717 | ||
| 15/187 | 96.257 | 1155.08 | ||
| 13/162 | 96.296 | 1155.556 | ||
| 11/137 | 96.35 | 1156.204 | ||
| 9/112 | 96.429 | 1157.143 | ||
| 7/87 | 96.552 | 1158.621 | ||
| 12/149 | 96.644 | 1159.7315 | ||
| 17/211 | 96.6825 | 1160.278 | ||
| 5/62 | 96.774 | 1161.29 | ||
| 13/161 | 96.894 | 1162.733 | ||
| 96.915 | 1162.982 | |||
| 8/99 | 96.97 | 1163.636 | ||
| 11/136 | 97.059 | 1164.706 | ||
| 97.0255 | 1164.306 | |||
| 14/173 | 97.11 | 1165.318 | ||
| 17/210 | 97.143 | 1165.714 | ||
| 20/247 | 97.166 | 1165.992 | ||
| 23/284 | 97.183 | 1166.197 | ||
| 3/37 | 97.297 | 1167.568 | ||
| 25/308 | 97.403 | 1168.831 | ||
| 97.416 | 1168.9915 | |||
| 22/271 | 97.417 | 1169.004 | ||
| 19/234 | 97.436 | 1169.231 | ||
| 16/197 | 97.462 | 1169.543 | ||
| 13/160 | 97.5 | 1170 | ||
| 10/123 | 97.561 | 1170.731 | ||
| 17/209 | 97.608 | 1171.292 | ||
| 7/86 | 97.674 | 1172.093 | ||
| 11/135 | 97,778 | 1173.333 | ||
| 15/184 | 97.826 | 1173.913 | ||
| 19/233 | 97.854 | 1174.249 | ||
| 4/49 | 97.959 | 1175.51 | ||
| 17/208 | 98.077 | 1176.923 | ||
| 13/159 | 98.113 | 1177.3585 | ||
| 9/110 | 98.182 | 1178.182 | ||
| 14/171 | 98.246 | 1178.947 | ||
| 19/232 | 98.276 | 1179.31 | ||
| 5/61 | 98.361 | 1180.323 | ||
| 1/12 | 100 | 1200 | ||