Septimal minor third

Septimal minor third
Inverse	Septimal major sixth
Name
Other names	Subminor third, Septimal subminor third
Abbreviation	s3, sm3
Size
Semitones	2+2⁄3
Interval class	~2½
Just interval	7:6
Cents
12-Tone equal temperament	300
24-Tone equal temperament	250
Just intonation	267

In music, the septimal minor third, also called the subminor third (e.g., by Ellis^[3]^[4]) or septimal subminor third, is the musical interval exactly or approximately equal to a 7/6 ratio of frequencies.^[5] In terms of cents, it is 267 cents, a quartertone of size 36/35 flatter than a just minor third of 6/5. In 24-tone equal temperament five quarter tones approximate the septimal minor third at 250 cents (Play^ⓘ). A septimal minor third is almost exactly two-ninths of an octave, and thus all divisions of the octave into multiples of nine (72 equal temperament being the most notable) have an almost perfect match to this interval. The septimal major sixth, 12/7, is the inverse of this interval.

The septimal minor third may be derived in the harmonic series from the seventh harmonic, and as such is in inharmonic ratios with all notes in the regular 12TET scale, with the exception of the fundamental and the octave.^[6] It has a darker but generally pleasing character when compared to the 6/5 third. A triad formed by using it in place of the minor third is called a "septimal minor" or "subminor triad" play^ⓘ.

In the meantone era the interval made its appearance as the alternative minor third in remote keys, under the name augmented second. Tunings of the meantone fifth in the neighborhood of quarter-comma meantone will give three septimal minor thirds among the twelve minor thirds of the tuning; since the wolf fifth appears with an ordinary minor third, this entails there are three septimal minor triads, eight ordinary minor triads and one triad containing the wolf fifth arising from an ordinary minor third followed by a septimal major third.

Composer Ben Johnston uses a small "7" as an accidental to indicate a note is lowered 49 cents, or an upside down seven ("ㄥ") to indicate a note is raised 49 cents.^[7]

The position of this note also appears on the scale of the Moodswinger. Yuri Landman indicated the harmonic positions of his instrument in a color dotted series. The septimal minor third position is cyan blue as well as the other knotted positions of the seventh harmonic (5/7, 4/7, 3/7, 2/7 and 1/7 of the string length of the open string).^[8]

^ Haluška, Ján (2003). The Mathematical Theory of Tone Systems, p. xxiii. ISBN 0-8247-4714-3. Septimal minor third.
^ Leta E. Miller, ed. (1988). Lou Harrison: Selected Keyboard and Chamber Music, 1937–1994, p. xliii. ISBN 978-0-89579-414-7.
^ Alexander John Ellis, in his translation of Hermann L. F. von Helmholtz (2007). On the Sensations of Tone, p. 195. ISBN 1-60206-639-6.
^ Alexander J. Ellis, "Notes of Observations on Musical Beats", June 17, 1880, Proceedings of the Royal Society of London, p. 531
^ Partch, Harry (1979). Genesis of a Music, p. 68. ISBN 0-306-80106-X.
^ Leta E. Miller, Fredric Lieberman (2006). Lou Harrison, p. 72. ISBN 0-252-03120-2. "Among the most striking intervals are...the narrow 7:6 subminor third...The seventh harmonic...was problematic in all Western tuning systems. The interval it forms with the sixth harmonic [7:6 subminor third] is smaller than a minor third but larger than a major second. To cite a specific example: the seventh harmonic of C lies partway between A and B-flat. Sounding with the sixth harmonic (G), it forms a 7:6 subminor third of 267 cents – 33 cents smaller than the equal-tempered minor third, itself 16 cents smaller than the pure 6:5 minor third. This 7:6 interval is thus nearly a quarter tone smaller than the pure minor third (33 + 16 = 49 cents)."
^ Douglas Keislar; Easley Blackwood; John Eaton; Lou Harrison; Ben Johnston; Joel Mandelbaum; William Schottstaedt. p. 193. "Six American Composers on Nonstandard Tunnings", Perspectives of New Music, vol. 29, no. 1. (Winter 1991), pp. 176–211.
^ "Moodswinger", oddmusic.com

[1] Haluška, Ján (2003). The Mathematical Theory of Tone Systems, p. xxiii. ISBN 0-8247-4714-3. Septimal minor third.

[2] Leta E. Miller, ed. (1988). Lou Harrison: Selected Keyboard and Chamber Music, 1937–1994, p. xliii. ISBN 978-0-89579-414-7.

[3] Alexander John Ellis, in his translation of Hermann L. F. von Helmholtz (2007). On the Sensations of Tone, p. 195. ISBN 1-60206-639-6.

[4] Alexander J. Ellis, "Notes of Observations on Musical Beats", June 17, 1880, Proceedings of the Royal Society of London, p. 531

[5] Partch, Harry (1979). Genesis of a Music, p. 68. ISBN 0-306-80106-X.

[6] Leta E. Miller, Fredric Lieberman (2006). Lou Harrison, p. 72. ISBN 0-252-03120-2. "Among the most striking intervals are...the narrow 7:6 subminor third...The seventh harmonic...was problematic in all Western tuning systems. The interval it forms with the sixth harmonic [7:6 subminor third] is smaller than a minor third but larger than a major second. To cite a specific example: the seventh harmonic of C lies partway between A and B-flat. Sounding with the sixth harmonic (G), it forms a 7:6 subminor third of 267 cents – 33 cents smaller than the equal-tempered minor third, itself 16 cents smaller than the pure 6:5 minor third. This 7:6 interval is thus nearly a quarter tone smaller than the pure minor third (33 + 16 = 49 cents)."

[7] Douglas Keislar; Easley Blackwood; John Eaton; Lou Harrison; Ben Johnston; Joel Mandelbaum; William Schottstaedt. p. 193. "Six American Composers on Nonstandard Tunnings", Perspectives of New Music, vol. 29, no. 1. (Winter 1991), pp. 176–211.

[8] "Moodswinger", oddmusic.com

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