Sqrt(25/24)
| Interval information |
ptolemaic semichroma
Sqrt(25/24), the classical semichroma or ptolemaic semichroma[note 1], is a the difference between a 5-limit major or minor third and a neutral third sqrt(3/2) dividing the perfect fifth in two.
This is an interval that allows to pass from a just major third (5/4) to a just minor third (6/5) by equal contrary motion, and vice versa. Let be two voices forming a 5/4 interval. If the lower voice goes up by a sqrt(25/24) and the upper voice goes down by the same interval, the next interval formed by the two voices will be a 6/5 interval. Any edo that maps 25/24 to an even number of steps, and thus any edo that contains a true neutral third, contains a representation of this interval.
Rational intervals that are close to this interval include 49/48 and 50/49, which stack to 25/24. The difference between 49/48 and 50/49 is 2401/2400, and tempering it out leads to the super-accurate breed temperament.
This interval, when stacked, yields a tuning system close to 34edo, which consistently represents it as one step.
Listen
Approximations
EDOs that have both a good 5-odd-limit and a sqrt(25/24) distinct from 25/24 include (among others) 24, 27, 31 and 34.
34edo has such an excellent sqrt(25/24) that the next EDO to have a better one is 441.
- ↑ It is not diptolemaic as it is only flattened by one comma from the (hemi-)Pythagorean semichroma of sqrt(2187/2048).