22 equal temperament
In music, 22 equal temperament, called 22-TET, 22-EDO, or 22-ET, is the tempered scale derived by dividing the octave into 22 equal steps (equal frequency ratios). ⓘ Each step represents a frequency ratio of 22√2, or 54.55 cents (ⓘ).
When composing with 22-ET, one needs to take into account a variety of considerations. Considering the 5-limit, there is a difference between 3 fifths and the sum of 1 fourth + 1 major third. It means that, starting from C, there are two A's - one 16 steps and one 17 steps away. There is also a difference between a major tone and a minor tone. In C major, the second note (D) will be 4 steps away. However, in A minor, where A is 6 steps below C, the fourth note (D) will be 9 steps above A, so 3 steps above C. So when switching from C major to A minor, one needs to slightly change the D note. These discrepancies arise because, unlike 12-ET, 22-ET does not temper out the syntonic comma of 81/80, but instead exaggerates its size by mapping it to one step.
Extending 22-ET to the 7-limit, we find the septimal minor seventh (7/4) can be distinguished from the sum of a fifth (3/2) and a minor third (6/5). Also the septimal subminor third (7/6) is different from the minor third (6/5). This mapping tempers out the septimal comma of 64/63, which allows 22-ET to function as a "Superpythagorean" system where four stacked fifths are equated with the septimal major third (9/7) rather than the usual pental third of 5/4. This system is a "mirror image" of septimal meantone in many ways: meantone systems tune the fifth flat so that intervals of 5 are simple while intervals of 7 are complex, superpythagorean systems have the fifth tuned sharp so that intervals of 7 are simple while intervals of 5 are complex. The enharmonic structure is also reversed: sharps are sharper than flats, similar to Pythagorean tuning (and by extension 53 equal temperament), but to a greater degree.
Finally, 22-ET has a good approximation of the 11th harmonic, and is in fact the smallest equal temperament to be consistent in the 11-limit.
The net effect is that 22-ET allows (and to some extent even forces) the exploration of new musical territory, while still having excellent approximations of common practice consonances.
History and use[edit]
The idea of dividing the octave into 22 steps of equal size seems to have originated with nineteenth-century music theorist RHM Bosanquet. Inspired by the use of a 22-tone unequal division of the octave in the music theory of India, Bosanquet noted that a 22-tone equal division was capable of representing 5-limit music with tolerable accuracy.[1] In this he was followed in the twentieth century by theorist José Würschmidt, who noted it as a possible next step after 19 equal temperament, and J. Murray Barbour in his survey of tuning history, Tuning and Temperament.[2] Contemporary advocates of 22 equal temperament include music theorist Paul Erlich.
Notation[edit]
22-EDO can be notated several ways. The first, Ups And Downs Notation,[3] uses up and down arrows, written as a caret and a lower-case "v", usually in a sans-serif font. One arrow equals one edostep. In note names, the arrows come first, to facilitate chord naming. This yields the following chromatic scale:
C, ^C/D♭, vC♯/^D♭, C♯/vD,
D, ^D/E♭, vD♯/^E♭, D♯/vE, E,
F, ^F/G♭, vF♯/^G♭, F♯/vG,
G, ^G/A♭, vG♯/^A♭, G♯/vA,
A, ^A/B♭, vA♯/^B♭, A♯/vB, B, C
The pythagorean minor chord with 32/27 on C is still named Cm and still spelled C–E♭–G. But the 5-limit upminor chord uses the upminor 3rd 6/5 and is spelled C–^E♭–G. This chord is named C^m. Compare with ^Cm (^C–^E♭–^G).
The second, Quarter Tone Notation, uses half-sharps and half-flats instead of up and down arrows:
C, C
, C♯/D♭, D
,
D, D, D♯/E♭, E, E,
F, F, F♯/G♭, G,
G, G, G♯/A♭, A,
A, A, A♯/B♭, B, B, C
However, chords and some enharmonic equivalences are much different than they are in 12-EDO. For example, even though a 5-limit C minor triad is notated as C–E♭–G, C major triads are now C–E–G instead of C–E–G, and an A minor triad is now A–C–E even though an A major triad is still A–C♯–E. Additionally, while major seconds such as C–D are divided as expected into 4 quarter tones, minor seconds such as E–F and B–C are 1 quarter tone, not 2. Thus E♯ is now equivalent to F instead of F, F♭ is equivalent to E instead of E, F is equivalent to E, and E is equivalent to F. Furthermore, the note a fifth above B is not the expected F♯ but rather F
or G, and the note that is a fifth below F is now B
instead of B♭.
The third, Porcupine Notation, introduces no new accidentals, but significantly changes chord spellings (e.g. the 5-limit major triad is now C–E♯–G♯). In addition, enharmonic equivalences from 12-EDO are no longer valid. This yields the following chromatic scale:
C, C♯, D♭,
D, D♯, E♭,
E, E♯, F♭,
F, F♯, G♭,
G, G♯, G
/A
, A♭,
A, A♯, B♭,
B, B♯, C♭, C
Interval size[edit]
The table below gives the sizes of some common intervals in 22 equal temperament. An interval shown with a shaded background — such as the septimal tritone — is one that is more than 1/4 of a step (approximately 13.6 cents) out of tune, when compared to the just ratio it approximates.
| interval name | size (steps) | size (cents) | midi | just ratio | just (cents) | midi | error (cents) |
|---|---|---|---|---|---|---|---|
| octave | 22 | 1200 | 2:1 | 1200 | 0 | ||
| major seventh | 20 | 1090.91 | ⓘ | 15:8 | 1088.27 | ⓘ | +2.64 |
| septimal minor seventh | 18 | 981.818 | 7:4 | 968.82591 | +12.99 | ||
| 17:10 wide major sixth | 17 | 927.27 | ⓘ | 17:10 | 918.64 | +8.63 | |
| major sixth | 16 | 872.73 | ⓘ | 5:3 | 884.36 | ⓘ | −11.63 |
| perfect fifth | 13 | 709.09 | ⓘ | 3:2 | 701.95 | ⓘ | +7.14 |
| septendecimal tritone | 11 | 600.00 | ⓘ | 17:12 | 603.00 | −3.00 | |
| tritone | 11 | 600.00 | 45:32 | 590.22 | ⓘ | +9.78 | |
| septimal tritone | 11 | 600.00 | 7:5 | 582.51 | ⓘ | +17.49 | |
| 11:8 wide fourth | 10 | 545.45 | ⓘ | 11:8 | 551.32 | ⓘ | −5.87 |
| 375th subharmonic | 10 | 545.45 | 512:375 | 539.10 | +6.35 | ||
| 15:11 wide fourth | 10 | 545.45 | 15:11 | 536.95 | ⓘ | +8.50 | |
| perfect fourth | 9 | 490.91 | ⓘ | 4:3 | 498.05 | ⓘ | −7.14 |
| septendecimal supermajor third | 8 | 436.36 | ⓘ | 22:17 | 446.36 | −10.00 | |
| septimal major third | 8 | 436.36 | 9:7 | 435.08 | ⓘ | +1.28 | |
| diminished fourth | 8 | 436.36 | 32:25 | 427.37 | ⓘ | +8.99 | |
| undecimal major third | 8 | 436.36 | 14:11 | 417.51 | ⓘ | +18.86 | |
| major third | 7 | 381.82 | ⓘ | 5:4 | 386.31 | ⓘ | −4.49 |
| undecimal neutral third | 6 | 327.27 | ⓘ | 11:9 | 347.41 | ⓘ | −20.14 |
| septendecimal supraminor third | 6 | 327.27 | 17:14 | 336.13 | ⓘ | −8.86 | |
| minor third | 6 | 327.27 | 6:5 | 315.64 | ⓘ | +11.63 | |
| septendecimal augmented second | 5 | 272.73 | ⓘ | 20:17 | 281.36 | −8.63 | |
| augmented second | 5 | 272.73 | 75:64 | 274.58 | ⓘ | −1.86 | |
| septimal minor third | 5 | 272.73 | 7:6 | 266.88 | ⓘ | +5.85 | |
| septimal whole tone | 4 | 218.18 | ⓘ | 8:7 | 231.17 | ⓘ | −12.99 |
| diminished third | 4 | 218.18 | 256:225 | 223.46 | ⓘ | −5.28 | |
| septendecimal major second | 4 | 218.18 | 17:15 | 216.69 | +1.50 | ||
| whole tone, major tone | 4 | 218.18 | 9:8 | 203.91 | ⓘ | +14.27 | |
| whole tone, minor tone | 3 | 163.64 | ⓘ | 10:9 | 182.40 | ⓘ | −18.77 |
| neutral second, greater undecimal | 3 | 163.64 | 11:10 | 165.00 | ⓘ | −1.37 | |
| 1125th harmonic | 3 | 163.64 | 1125:1024 | 162.85 | +0.79 | ||
| neutral second, lesser undecimal | 3 | 163.64 | 12:11 | 150.64 | ⓘ | +13.00 | |
| septimal diatonic semitone | 2 | 109.09 | ⓘ | 15:14 | 119.44 | ⓘ | −10.35 |
| diatonic semitone, just | 2 | 109.09 | 16:15 | 111.73 | ⓘ | −2.64 | |
| 17th harmonic | 2 | 109.09 | 17:16 | 104.95 | ⓘ | +4.13 | |
| Arabic lute index finger | 2 | 109.09 | 18:17 | 98.95 | ⓘ | +10.14 | |
| septimal chromatic semitone | 2 | 109.09 | 21:20 | 84.47 | ⓘ | +24.62 | |
| chromatic semitone, just | 1 | 54.55 | ⓘ | 25:24 | 70.67 | ⓘ | −16.13 |
| septimal third-tone | 1 | 54.55 | 28:27 | 62.96 | ⓘ | −8.42 | |
| undecimal quarter tone | 1 | 54.55 | 33:32 | 53.27 | ⓘ | +1.27 | |
| septimal quarter tone | 1 | 54.55 | 36:35 | 48.77 | ⓘ | +5.78 | |
| diminished second | 1 | 54.55 | 128:125 | 41.06 | ⓘ | +13.49 |
See also[edit]
References[edit]
- ^ Bosanquet, R.H.M. "On the Hindoo division of the octave, with additions to the theory of higher orders" (Archived 2009-10-22), Proceedings of the Royal Society of London vol. 26 (March 1, 1877, to December 20, 1877) Taylor & Francis, London 1878, pp. 372–384. (Reproduced in Tagore, Sourindro Mohun, Hindu Music from Various Authors, Chowkhamba Sanskrit Series, Varanasi, India, 1965).
- ^ Barbour, James Murray, Tuning and temperament, a historical survey, East Lansing, Michigan State College Press, 1953 [c1951].
- ^ "Ups_and_downs_notation", on Xenharmonic Wiki. Accessed 2023-8-12.
External links[edit]
- Erlich, Paul, "Tuning, Tonality, and Twenty-Two Tone Temperament", William A. Sethares.
- Pachelbel's Canon in 22edo (MIDI), Herman Miller
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