Alpha scale
The α (alpha) scale is a non-octave-repeating musical scale invented by Wendy Carlos and first used on her album Beauty in the Beast (1986). It is derived from approximating just intervals using multiples of a single interval without, as is standard in equal temperaments, requiring an octave (2:1). It may be approximated by dividing the perfect fifth (3:2) into nine equal steps (3:2)1⁄9,[1] or by dividing the minor third (6:5) into four steps (6:5)1⁄4.[1][2][3]
The scale step may also be precisely derived from using 9:5 (B♭, 1017.60 cents,
Carlos' α (alpha) scale arises from...taking a value for the scale degree so that nine of them approximate a 3:2 perfect fifth, five of them approximate a 5:4 major third, and four of them approximate a 6:5 minor third. In order to make the approximation as good as possible we minimize the mean square deviation.[4]
and (
At 78 cents per step, this totals approximately 15.385 steps per octave, however, more accurately, the alpha scale step is 77.965 cents and there are 15.3915 per octave.[4][5]
Though it does not have an octave, the alpha scale produces, "wonderful triads," (
interval name | size (steps) |
size (cents) |
just ratio | just (cents) |
error |
septimal major second | 3 | 233.90 | 8:7 | 231.17 | +2.72 |
major third | 5 | 389.83 | 5:4 | 386.31 | +3.51 |
perfect fifth | 9 | 701.69 | 3:2 | 701.96 | −0.27 |
harmonic seventh | 12 | 935.58 | 7:4 | 968.83 | −33.25 |
octave | 15 | 1169.48 | 2:1 | 1200.00 | −30.52 |
octave | 16 | 1247.44 | 2:1 | 1200.00 | +47.44 |
Sources
- Carlos, Wendy (1989–96). "Three Asymmetric Divisions of the Octave", WendyCarlos.com. "9 steps to the perfect (no kidding) fifth." The alpha scale, "splits the minor third exactly in half (also into quarters)."
- Milano, Dominic (November 1986). "A Many-Colored Jungle of Exotic Tunings", Keyboard. "The idea was to split a minor third into two equal parts. Then that was divided again."
- Carlos, Wendy (2000/1986). "Liner notes", Beauty in the Beast. ESD 81552.
- Benson, Dave (2006). Music: A Mathematical Offering, p.232-233. ISBN 0-521-85387-7. "This actually differs very slightly from Carlos' figure of 15.385 α-scale degrees to the octave. This is obtained by approximating the scale degree to 78.0 cents."
- Sethares, William (2004). Tuning, Timbre, Spectrum, Scale, p.60. ISBN 1-85233-797-4. Scale step of 78 cents.