Tonus
In harmony, the tonus is the ratio 9:8 between a pair of frequencies or, equivalently, the ratio 8:9 between a pair of wavelengths. It is the arithmetic mean of unison and ditono:
- <math> {5:4 + 1:1 \over 2} = {5:4 + 4:4 \over 2} = {9:4 \over 2} = 9:8 .<math>
It is equal to diapente divided by diatessaron:
- <math> {3:2 \over 4:3} = {3 \cdot 3 \over 4 \cdot 2} = 9:8 .<math>
This means that a diapente is equal to a diatessaron and a tonus, put together.
The tonus is 1.001 in binary — 1 + 2−3 — and it is the inversion of the eptadem minus (minor seventh) (16:9),
- <math> {2:1 \over 16:9} = {2 \cdot 9 \over 16} = {18 \over 16} = 9:8. <math>
Notice also that the eptadem minus is a pair of diatessarons put together:
- <math> (4:3)^2 = 16:9 . \ <math>
The eptadem minus is the sum of the first eight reciprocals of triangular numbers:
- <math> {1 \over 1} + {1 \over 3} + {1 \over 6} + {1 \over 10} + {1 \over 15} + {1 \over 21} + {1 \over 28} + {1 \over 36} = {16 \over 9}. <math>
The tonus is also called major second.
Major and Minor
The tonus comes in two slightly different versions: the tuono maggiore (9:8) and the tuono minore (10:9).
The tuono minore is the harmonic mean of unison and ditono:
- <math> {2 \over {1 \over 1:1} + {1 \over 5:4}} = {2 \over 1:1 + 4:5} = {2 \over 5:5 + 4:5} = {2 \over 9:5} = {2 \cdot 5 \over 9} = 10:9 . <math>
In binary, the tuono minore is equal to 1.000111000111000111000111...
See also: unison, diapason, diapente, diatessaron, ditonus, semiditonus, semitonium.
