C is a common tone between the C and G major scales, as are D, E, G, A, and B.
In music, a common tone is a pitch class that is a member of, or common to (shared by) two or more scales or sets.
Common tone theorem
Common tones between G major and C major and between C major and F♯ major, 6 and 1 common tones respectively.
A common tone is a pitch class that is a member of, or common to, a musical scale and a transposition of that scale, as in modulation.[1] Six of seven possible common tones are shared by closely related keys, though keys may also be thought of as more or less closely related according to their number of common tones. "Obviously, tonal distance is in some sense a function of the extent of intersection between diatonic PC collections of tonal systems".[2]
Diatonic transposition
0
1/e
2/t
3/9
4/8
5/7
6/6
Common tones
7
2
5
4
3
6
1
In diatonic set theory the common tone theorem explains that scales possessing the deep scale property share a different number of common tones, not counting enharmonic equivalents (for example, C♯ and C♭ have no common tones with C major), for every different transposition of the scale. However many times an interval class occurs in a diatonic scale is the number of tones common both to the original scale and a scale transposed by that particular interval class. For example, then, modulation to the dominant (transposition by a perfect fifth) includes six common tones between the keys as there are six perfect fifths in a diatonic scale, while transposition by the tritone includes only one common tone as there is only one tritone in a diatonic scale.[1]
Diatonic scale transposed a perfect fifth: since it contains six perfect fifths the two scales a perfect fifth apart have six common tones.
Key
IC
CT
Notes common with C
C
0
NA
C
D
E
F
G
A
B
B
1
2
E
B
D♭
C
F
D
2
5
D
E
G
A
B
B♭
C
D
F
G
A
A
3
4
D
E
A
B
E♭
C
D
F
G
E
4
3
E
A
B
A♭
C
F
G
G
5
6
C
D
E
G
A
B
F
C
D
E
F
G
A
F♯
6
1
B
G♭
F
Deep scale property
Diatonic scale in the chromatic circle with each interval class a different color, each occurs a unique number of timesC major scale with interval classes labelledWhole tone scale on C with interval classes labelled
The common tone theorem describes that scales possessing the deep scale property share a different number of common tones for every different transposition of the scale, suggesting an explanation for the use and usefulness of the diatonic collection.[1]
and has only two distinct transpositions (every even transposition of the whole tone scale is identical with the original and every odd transposition has no common tones whatsoever).
Johnson, Timothy A. (2003). Foundations of Diatonic Theory: A Mathematically Based Approach to Music Fundamentals. Mathematics Across the Curriculum. Emeryville CA: Key College Publishing. ISBN9781930190801. LCCN2002075736.
Browne, Richmond (1981). "Tonal Implications of the Diatonic Set" In Theory Only 5, nos. 6–7:6–10.
Douthett, Jack Moser, Martha M. Hyde, and Charles J. Smith, eds. (2008). Music Theory and Mathematics. Eastman Studies in Music. Rochester, NY: University of Rochester Press. ISBN9781580462662.
Gamer, Carlton (1967). "Deep Scales and Difference Sets in Equal-Tempered Systems", American Society of University Composers: Proceedings of the Second Annual Conference: 113-22 and "Some Combinational Resources of Equal-Tempered Systems", Journal of Music Theory 11: 32-59.
Winograd, Terry. "An Analysis of the Properties of 'Deep Scales' in a T-Tone System", unpublished.
