Interval size measure: Difference between revisions
add link |
replace general link with specific source for 7mu/heptamu Tag: Undo |
||
| Line 174: | Line 174: | ||
| [[1536edo|1536]] | | [[1536edo|1536]] | ||
| 2<sup>9</sup> × 3 | | 2<sup>9</sup> × 3 | ||
| (7th MIDI unit), seventh MIDI-resolution unit, 1/128 (1/(2<sup>7</sup>)) of [[12ED2]] semitone | | (7th MIDI unit), seventh MIDI-resolution unit, 1/128 (1/(2<sup>7</sup>)) of [[12ED2]] semitone ([http://tonalsoft.com/enc/number/7mu.aspx source]) | ||
|- | |- | ||
| rhoon | | rhoon | ||
| Line 296: | Line 296: | ||
Another notation for ratios is a vector of prime factor exponents, often called a [[monzo]], such as {{monzo| -4 4 -1 }} (for the syntonic comma, 81/80 = 2^(-4) * 3^4 * 5^(-1)), which builds a bridge back to the logarithmic measure: intervals can be combined by component-wise addition or subtraction of their vectors. | Another notation for ratios is a vector of prime factor exponents, often called a [[monzo]], such as {{monzo| -4 4 -1 }} (for the syntonic comma, 81/80 = 2^(-4) * 3^4 * 5^(-1)), which builds a bridge back to the logarithmic measure: intervals can be combined by component-wise addition or subtraction of their vectors. | ||
[[Category:Interval size]] | [[Category:Interval size]] | ||