73edo
| ← 72edo | 73edo | 74edo → |
73 EDO divides the octave into 73 equal parts of 16.438 cents each. It tempers out 78732/78125 and 262144/253125 in the 5-limit, 126/125 and 245/243 in the 7-limit, 176/175, 441/440 and 4000/3993 in the 11-limit, and 91/90, 169/168, 196/195, 325/324, 351/350 and 352/351 in the 13-limit. It provides the optimal patent val for marrakesh temperament. 73 EDO has a sharp tendency, with the approximations of 3, 5, 7, 11 all sharp, see following table.
Script error: No such module "primes_in_edo".
73 EDO fits in mavila scale, by the 9;5 relation in the superdiatonic scheme.
73 EDO is the 21st prime EDO.
Intervals
| # | Cents | Diatonic interval category |
|---|---|---|
| 0 | 0.0 | perfect unison |
| 1 | 16.4 | superunison |
| 2 | 32.9 | superunison |
| 3 | 49.3 | subminor second |
| 4 | 65.8 | subminor second |
| 5 | 82.2 | minor second |
| 6 | 98.6 | minor second |
| 7 | 115.1 | minor second |
| 8 | 131.5 | supraminor second |
| 9 | 147.9 | neutral second |
| 10 | 164.4 | submajor second |
| 11 | 180.8 | major second |
| 12 | 197.3 | major second |
| 13 | 213.7 | major second |
| 14 | 230.1 | supermajor second |
| 15 | 246.6 | ultramajor second |
| 16 | 263.0 | subminor third |
| 17 | 279.5 | subminor third |
| 18 | 295.9 | minor third |
| 19 | 312.3 | minor third |
| 20 | 328.8 | supraminor third |
| 21 | 345.2 | neutral third |
| 22 | 361.6 | submajor third |
| 23 | 378.1 | submajor third |
| 24 | 394.5 | major third |
| 25 | 411.0 | major third |
| 26 | 427.4 | supermajor third |
| 27 | 443.8 | ultramajor third |
| 28 | 460.3 | subfourth |
| 29 | 476.7 | subfourth |
| 30 | 493.2 | perfect fourth |
| 31 | 509.6 | perfect fourth |
| 32 | 526.0 | superfourth |
| 33 | 542.5 | superfourth |
| 34 | 558.9 | superfourth |
| 35 | 575.3 | low tritone |
| 36 | 591.8 | low tritone |
| 37 | 608.2 | high tritone |
| 38 | 624.7 | high tritone |
| 39 | 641.1 | subfifth |
| 40 | 657.5 | subfifth |
| 41 | 674.0 | subfifth |
| 42 | 690.4 | perfect fifth |
| 43 | 706.8 | perfect fifth |
| 44 | 723.3 | superfifth |
| 45 | 739.7 | superfifth |
| 46 | 756.2 | ultrafifth |
| 47 | 772.6 | subminor sixth |
| 48 | 789.0 | minor sixth |
| 49 | 805.5 | minor sixth |
| 50 | 821.9 | supraminor sixth |
| 51 | 838.4 | supraminor sixth |
| 52 | 854.8 | neutral sixth |
| 53 | 871.2 | submajor sixth |
| 54 | 887.7 | major sixth |
| 55 | 904.1 | major sixth |
| 56 | 920.5 | supermajor sixth |
| 57 | 937.0 | supermajor sixth |
| 58 | 953.4 | ultramajor sixth |
| 59 | 969.9 | subminor seventh |
| 60 | 986.3 | minor seventh |
| 61 | 1002.7 | minor seventh |
| 62 | 1019.2 | minor seventh |
| 63 | 1035.6 | supraminor seventh |
| 64 | 1052.1 | neutral seventh |
| 65 | 1068.5 | submajor seventh |
| 66 | 1084.9 | major seventh |
| 67 | 1101.4 | major seventh |
| 68 | 1117.8 | major seventh |
| 69 | 1134.2 | supermajor seventh |
| 70 | 1150.7 | ultramajor seventh |
| 71 | 1167.1 | suboctave |
| 72 | 1183.6 | suboctave |
| 73 | 1200.0 | perfect octave |