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22 equal temperament

From Wikipedia, the free encyclopedia

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). Play Each step represents a frequency ratio of 222, or 54.55 cents (Play).

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 and 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.

In the 7-limit, the septimal minor seventh (7/4) can be distinguished from the sum of a fifth (3/2) and a minor third (6/5), and 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

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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

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Circle of fifths in 22 tone equal temperament, "ups and downs" notation
Circle of edosteps in 22 tone equal temperament, "ups and downs" notation

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, Chalf sharp, C/D, Dhalf flat,

D, Dhalf sharp, D/E, Ehalf flat, E,

F, Fhalf sharp, F/G, Ghalf flat,

G, Ghalf sharp, G/A, Ahalf flat,

A, Ahalf sharp, A/B, Bhalf flat, 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–Ehalf flat–G instead of C–E–G, and an A minor triad is now A–Chalf sharp–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 Fhalf sharp instead of F, F is equivalent to Ehalf flat instead of E, F is equivalent to Ehalf sharp, and E is equivalent to Fhalf flat. Furthermore, the note a fifth above B is not the expected F but rather Fthree quarter sharp or Ghalf flat, and the note that is a fifth below F is now Bthree quarter flat 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, Gdouble sharp/Adouble flat, A, A, A, B, B, B, C, C

Interval size

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Just intervals approximated in 22 equal temperament

The table below gives the sizes of some common intervals in 22 equal temperament. Intervals shown with a shaded background—such as the septimal tritones—are more than 1/4 of a step (approximately 13.6 cents) out of tune, when compared to the just ratios they approximate.

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 Play 15:8 1088.27 Play +02.64
septimal minor seventh 18 981.818 7:4 968.82591 +012.99
17:10 wide major sixth 17 927.27 Play 17:10 918.64 +08.63
major sixth 16 872.73 Play 5:3 884.36 Play −11.63
perfect fifth 13 709.09 Play 3:2 701.95 Play +07.14
septendecimal tritone 11 600.00 Play 17:12 603.00 03.00
tritone 11 600.00 45:32 590.22 Play +09.78
septimal tritone 11 600.00 7:5 582.51 Play +17.49
11:8 wide fourth 10 545.45 Play 11:80 551.32 Play 05.87
375th subharmonic 10 545.45 512:375 539.10 +06.35
15:11 wide fourth 10 545.45 15:11 536.95 Play +08.50
perfect fourth 09 490.91 Play 4:3 498.05 Play 07.14
septendecimal supermajor third 08 436.36 Play 22:17 446.36 −10.00
septimal major third 08 436.36 9:7 435.08 Play +01.28
diminished fourth 08 436.36 32:25 427.37 Play +08.99
undecimal major third 08 436.36 14:11 417.51 Play +18.86
major third 07 381.82 Play 5:4 386.31 Play 04.49
undecimal neutral third 06 327.27 Play 11:90 347.41 Play −20.14
septendecimal supraminor third 06 327.27 17:14 336.13 Play 08.86
minor third 06 327.27 6:5 315.64 Play +11.63
septendecimal augmented second 05 272.73 Play 20:17 281.36 08.63
augmented second 05 272.73 75:64 274.58 Play 01.86
septimal minor third 05 272.73 7:6 266.88 Play +05.85
septimal whole tone 04 218.18 Play 8:7 231.17 Play −12.99
diminished third 04 218.18 256:225 223.46 Play 05.28
septendecimal major second 04 218.18 17:15 216.69 +01.50
whole tone, major tone 04 218.18 9:8 203.91 Play +14.27
whole tone, minor tone 03 163.64 Play 10:90 182.40 Play −18.77
neutral second, greater undecimal 03 163.64 11:10 165.00 Play 01.37
1125th harmonic 03 163.64 1125:1024 162.85 +00.79
neutral second, lesser undecimal 03 163.64 12:11 150.64 Play +13.00
septimal diatonic semitone 02 109.09 Play 15:14 119.44 Play −10.35
diatonic semitone, just 02 109.09 16:15 111.73 Play 02.64
17th harmonic 02 109.09 17:16 104.95 Play +04.13
Arabic lute index finger 02 109.09 18:17 098.95 Play +10.14
septimal chromatic semitone 02 109.09 21:20 084.47 Play +24.62
chromatic semitone, just 01 054.55 Play 25:24 070.67 Play −16.13
septimal third-tone 01 054.55 28:27 062.96 Play 08.42
undecimal quarter tone 01 054.55 33:32 053.27 Play +01.27
septimal quarter tone 01 054.55 36:35 048.77 Play +05.78
diminished second 01 054.55 128:125 041.06 Play +13.49

See also

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References

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  1. ^ 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).
  2. ^ Barbour, James Murray, Tuning and temperament, a historical survey, East Lansing, Michigan State College Press, 1953 [c1951].
  3. ^ "Ups_and_downs_notation", on Xenharmonic Wiki. Accessed 2023-8-12.
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