Dominant seventh chord

See also: Didymic chords

In meantone (including 12edo), on which traditional tonal harmony is built, the dominant seventh chord is a 9-odd-limit essentially tempered chord:

• (Meantone) 1/1 ‒ 5/4 ‒ 3/2 ‒ 9/5 with steps 5/4, 6/5, 6/5.

Note the ~9/5 is simultaneously ~16/9, and the interval between the third and seventh is ~10/7. Therefore, every interval of this chord is within the 9-odd-limit tonality diamond.

In the 7-limit:

• 4:5:6:7, the harmonic seventh chord, is a concord in the 7-limit, often used as a tuning target in barbershop music.

In the 5-limit:

• 36:45:54:64, the Ptolemaic dominant seventh chord, is found on the dominant scale degree (V or 3⁄2) of Ptolemy's intense diatonic scale (Zarlino), perhaps the most common 5-limit diatonic.

• 20:25:30:36, the major-minor seventh chord, combines a major third with the consonant seventh that would be found in a Ptolemaic minor seventh chord built on the same root. It is found rooted at the I (1⁄1) and IV (4⁄3) of the duodene.

• 108:135:160:192 is found on the dominant scale degree (V or 3⁄2) of a diatonic scale with the second degree tuned a comma lower than in Zarlino (10/9 instead of 9/8), such as in left-handed nicetone.

• 128:160:192:225, a 5-limit interpretation of an inversion of the Neapolitan or German sixth chord, is found rooted at the ♭II (16⁄15) and ♭VI (8⁄5) of the duodene. (225/128 is often considered an augmented sixth rather than a minor seventh, but in some meantone tunings this chord is tuned identically to other “dominant seventh” chords such as 4:5:6:7, 36:45:54:64, and 20:25:30:36.)

In the 3-limit:

• 576:729:864:1024, the Pythagorean dominant seventh chord, is found on the dominant scale degree (V or 3⁄2) of the Pythagorean diatonic scale.

• Well Tuned Dominant Sevenths by Graham Breed