23 equal temperament


In music, 23 equal temperament, called 23-TET, 23-EDO, or 23-ET, is the tempered scale derived by dividing the octave into 23 equal steps. Each step represents a frequency ratio of, or 52.174 cents. This system is the largest EDO that has an error of at least 20 cents for the 3rd, 5th, 7th, and 11th harmonics, which makes it unusual in microtonal music.

History and use

23-EDO was advocated by ethnomusicologist Erich von Hornbostel in the 1920s, as the result of "a cycle of 'blown' fifths" of about 678 cents that may have resulted from "overblowing" a bamboo pipe. Today, have been composed in this system.

Notation

There are two ways to notate the 23-tone system with the traditional letter names and system of sharps and flats, called Melodic Notation and Harmonic Notation.
Harmonic Notation preserves harmonic structures and interval arithmetic, but sharp and flat have reversed meanings. Because it preserves harmonic structures, 12-EDO music can be reinterpreted as 23-EDO Harmonic Notation, so it's also called Conversion Notation.
An example of these harmonic structures is the Circle of Fifths below
Melodic Notation preserves the meaning of sharp and flat, but harmonic structures and interval arithmetic no longer work.

Interval size

interval namesize size midijust ratiojust midierror
octave2312002:112000
major seventh211095.6515:81088.27+7.38
major sixth17886.965:3884.36+2.60
augmented fourth11573.9125:18568.72+5.19
doubly augmented third10521.743125:2304527.66−5.92
augmented third9469.57125:96456.99+12.58
diminished fourth8417.3932:25427.37−9.98
doubly diminished fourth7365.22768:625356.70+8.52
minor third6313.046:5315.64−2.60
augmented second5260.87125:108253.08+7.79
whole tone, major tone4208.709:8203.91+4.79
diminished second + septimal diatonic semitone3156.52192:175160.50−3.98
septimal diatonic semitone2104.3515:14119.44−15.09
diatonic semitone, just2104.3516:15111.73−7.38
diminished second152.17128:12541.06+11.11

Scale diagram

Modes