128/125: Difference between revisions
mNo edit summary |
m →Temperaments: link |
||
| Line 16: | Line 16: | ||
== Temperaments == | == Temperaments == | ||
=== As a comma === | === As a comma === | ||
[[Tempering out]] this comma leads to [[augmented]] temperament. See [[ | [[Tempering out]] this comma leads to [[augmented (temperament)|augmented]] temperament. See [[Augmented family]] for the family where it is tempered out. | ||
=== As an interval === | === As an interval === | ||
If the diesis is treated as a musical interval in its own right as opposed to tempering it out, it is approximately a quarter-tone and so can be used to introduce [[7-limit]] and [[11-limit]] harmony into 5-limit scales. | If the diesis is treated as a musical interval in its own right as opposed to tempering it out, it is approximately a quarter-tone and so can be used to introduce [[7-limit]] and [[11-limit]] harmony into 5-limit scales. | ||
== Trivia == | == Trivia == | ||
Latest revision as of 04:24, 11 September 2025
| Interval information |
augmented comma,
enharmonic diesis,
enharmonic comma
Trigu comma
reduced subharmonic
The 41.059-cent interval of 128/125 is called the diesis or augmented comma; it represents the gap between a stack of three 5/4 just major thirds and the octave, or in other words 2/(5/4)3.
Approximations
This interval is fairly accurately represented by a single step in 28-, 31- or 34edo, and by two steps of 53-, 59- or 65edo. In any tuning with pure octaves and just major thirds, such as quarter-comma meantone, it will be exact. Furthermore, in meantone it appears as the difference between sharps and flats, e.g. between D# and Eb. It is also called enharmonic diesis or enharmonic comma for this reason.
Temperaments
As a comma
Tempering out this comma leads to augmented temperament. See Augmented family for the family where it is tempered out.
As an interval
If the diesis is treated as a musical interval in its own right as opposed to tempering it out, it is approximately a quarter-tone and so can be used to introduce 7-limit and 11-limit harmony into 5-limit scales.
Trivia
This interval represents the amount by which the binary definition of kilobyte, 1024 bytes, exceeds the nominal definition of "kilo" prefix, 1000.
See also
- Diesis (disambiguation page)