Oscillorwell
Oscillorwell is a family of temperaments with sinusoidally varying generators.
Oscillorwell, 3/2 repeating version
The formula for the nth generator is 1200*log(7/6,2) + 9.674*sin(pi n/7)^2, where the factor is chosen so that every seventh generator would form a just 3/2.
| 0.000 |
| 37.519 |
| 88.325 |
| 160.479 |
| 203.912 |
| 266.871 |
| 310.304 |
| 364.391 |
| 433.264 |
| 470.783 |
| 535.563 |
| 586.370 |
| 637.176 |
| 701.956 |
| 739.475 |
| 808.348 |
| 862.435 |
| 905.868 |
| 968.827 |
| 1012.260 |
| 1084.414 |
| 1135.220 |
Oscillorwell, 7/4 repeating version
The formula for the nth generator is 1200*log(7/6,2) + 8.465*sin(pi n/8)^2, where the factor is chosen so that every eighth generator would form a just 7/4.
| 0.000 |
| 36.939 |
| 76.870 |
| 162.743 |
| 202.674 |
| 268.111 |
| 308.042 |
| 350.966 |
| 433.846 |
| 470.785 |
| 539.214 |
| 582.139 |
| 626.302 |
| 701.957 |
| 737.656 |
| 813.311 |
| 857.475 |
| 900.399 |
| 968.828 |
| 1005.767 |
| 1088.647 |
| 1131.571 |