“34 equal temperament”的意思、由来-开放百科全书

词条

34 equal temperament

释义

History and use
Interval size
Scale diagram
References
External links

In musical theory, 34 equal temperament, also referred to as 34-TET, 34-EDO or 34-ET, is the tempered tuning derived by dividing the octave into 34 equal-sized steps (equal frequency ratios). {{audio|34-tet scale on C.mid|Play}} Each step represents a frequency ratio of {{radic|2|34}}, or 35.29 cents {{audio|1 step in 34-et on C.mid|Play}}.

History and use

Unlike divisions of the octave into 19, 31 or 53 steps, which can be considered as being derived from ancient Greek intervals (the greater and lesser diesis and the syntonic comma), division into 34 steps did not arise 'naturally' out of older music theory, although Cyriakus Schneegass proposed a meantone system with 34 divisions based in effect on half a chromatic semitone (the difference between a major third and a minor third, 25:24 or 70.67 cents).{{citation needed|date=August 2015}} Wider interest in the tuning was not seen until modern times, when the computer made possible a systematic search of all possible equal temperaments. While Barbour discusses it,^[1] the first recognition of its potential importance appears to be in an article published in 1979 by the Dutch theorist Dirk de Klerk.{{citation needed|date=August 2015}} The luthier Larry Hanson had an electric guitar refretted from 12 to 34 and persuaded American guitarist Neil Haverstick to take it up.{{citation needed|date=August 2015}}

As compared with 31-et, 34-et reduces the combined mistuning from the theoretically ideal just thirds, fifths and sixths from 11.9 to 7.9 cents. Its fifths and sixths are markedly better, and its thirds only slightly further from the theoretical ideal of the 5:4 ratio. Viewed in light of Western diatonic theory, the three extra steps (of 34-et compared to 31-et) in effect widen the intervals between C and D, F and G, and A and B, thus making a distinction between major tones, ratio 9:8 and minor tones, ratio 10:9. This can be regarded either as a resource or as a problem, making modulation in the contemporary Western sense more complex. As the number of divisions of the octave is even, the exact halving of the octave (600 cents) appears, as in 12-et. Unlike 31-et, 34 does not give an approximation to the harmonic seventh, ratio 7:4.

Interval size

The following table outlines some of the intervals of this tuning system and their match to various ratios in the harmonic series.

interval name	size (steps)	size (cents)	midi	just ratio	just (cents)	midi	error
octave	34	1200		2:1	1200		0
perfect fifth	20	705.88	{{audio\|help=no\|10 steps in 17-et on C.mid\|Play}}	3:2	701.95	{{audio\|help=no\|Just perfect fifth on C.mid\|Play}}	+{{0}}3.93
septendecimal tritone	17	600.00	{{audio\|help=no\|Tritone on C.mid\|Play}}	17:12	603.00		−{{0}}3.00
lesser septimal tritone	17	600.00		7:5	582.51	{{audio\|help=no\|Lesser septimal tritone on C.mid\|Play}}	+17.49
tridecimal narrow tritone	16	564.71	{{audio\|help=no\|8 steps in 17-et on C.mid\|Play}}	18:13	563.38	{{audio\|help=no\|Tridecimal narrow tritone on C.mid\|Play}}	+{{0}}1.32
11:8 wide fourth	16	564.71		11:8{{0}}	551.32	{{audio\|help=no\|Eleventh harmonic on C.mid\|Play}}	+13.39
undecimal wide fourth	15	529.41	{{audio\|help=no\|15 steps in 34-et on C.mid\|Play}}	15:11	536.95	{{audio\|help=no\|Undecimal augmented fourth on C.mid\|Play}}	−{{0}}7.54
perfect fourth	14	494.12	{{audio\|help=no\|7 steps in 17-et on C.mid\|Play}}	4:3	498.04	{{audio\|help=no\|Just perfect fourth on C.mid\|Play}}	−{{0}}3.93
tridecimal major third	12	458.82	{{audio\|help=no\|6 steps in 17-et on C.mid\|Play}}	13:10	454.21	{{audio\|help=no\|Tridecimal major third on C.mid\|Play}}	+{{0}}4.61
septimal major third	12	423.53		9:7	435.08	{{audio\|help=no\|Septimal major third on C.mid\|Play}}	−11.55
undecimal major third	12	423.53		14:11	417.51	{{audio\|help=no\|Undecimal major third on C.mid\|Play}}	+{{0}}6.02
major third	11	388.24	{{audio\|help=no\|11 steps in 34-et on C.mid\|Play}}	5:4	386.31	{{audio\|help=no\|Just major third on C.mid\|Play}}	+{{0}}1.92
tridecimal neutral third	10	352.94	{{audio\|help=no\|5 steps in 17-et on C.mid\|Play}}	16:13	359.47	{{audio\|help=no\|Tridecimal neutral third on C.mid\|Play}}	−{{0}}6.53
undecimal neutral third	10	352.94		11:9{{0}}	347.41	{{audio\|help=no\|Undecimal neutral third on C.mid\|Play}}	+{{0}}5.53
minor third	{{0}}9	317.65	{{audio\|help=no\|9 steps in 34-et on C.mid\|Play}}	6:5	315.64	{{audio\|help=no\|Just minor third on C.mid\|Play}}	+{{0}}2.01
tridecimal minor third	{{0}}8	282.35	{{audio\|help=no\|4 steps in 17-et on C.mid\|Play}}	13:11	289.21	{{audio\|help=no\|Tridecimal minor third on C.mid\|Play}}	−{{0}}6.86
septimal minor third	{{0}}8	282.35		7:6	266.87	{{audio\|help=no\|Septimal minor third on C.mid\|Play}}	+15.48
tridecimal semimajor second	{{0}}7	247.06	{{audio\|help=no\|7 steps in 34-et on C.mid\|Play}}	15:13	247.74	{{audio\|help=no\|Tridecimal five-quarter tone on C.mid\|Play}}	−{{0}}0.68
septimal whole tone	{{0}}7	247.06		8:7	231.17	{{audio\|help=no\|Septimal major second on C.mid\|Play}}	+15.88
whole tone, major tone	{{0}}6	211.76	{{audio\|help=no\|3 steps in 17-et on C.mid\|Play}}	9:8	203.91	{{audio\|help=no\|Major tone on C.mid\|Play}}	+{{0}}7.85
whole tone, minor tone	{{0}}5	176.47	{{audio\|help=no\|5 steps in 34-et on C.mid\|Play}}	10:9{{0}}	182.40	{{audio\|help=no\|Minor tone on C.mid\|Play}}	−{{0}}5.93
neutral second, greater undecimal	{{0}}5	176.47		11:10	165.00	{{audio\|help=no\|Greater undecimal neutral second on C.mid\|Play}}	+11.47
neutral second, lesser undecimal	{{0}}4	141.18	{{audio\|help=no\|2 steps in 17-et on C.mid\|Play}}	12:11	150.64	{{audio\|help=no\|Lesser undecimal neutral second on C.mid\|Play}}	−{{0}}9.46
greater tridecimal {{2/3}}-tone	{{0}}4	141.18		13:12	138.57	{{audio\|help=no\|Greater tridecimal two-third tone on C.mid\|Play}}	+{{0}}2.60
lesser tridecimal {{2/3}}-tone	{{0}}4	141.18		14:13	128.30	{{audio\|help=no\|Lesser tridecimal two-third tone on C.mid\|Play}}	+12.88
15:14 semitone	{{0}}3	105.88	{{audio\|help=no\|3 steps in 34-et on C.mid\|Play}}	15:14	119.44	{{audio\|help=no\|Septimal diatonic semitone on C.mid\|Play}}	−13.56
diatonic semitone	{{0}}3	105.88		16:15	111.73	{{audio\|help=no\|Just diatonic semitone on C.mid\|Play}}	−{{0}}5.85
17th harmonic	{{0}}3	105.88		17:16	104.96	{{audio\|help=no\|Just major semitone on C.mid\|Play}}	+{{0}}0.93
21:20 semitone	{{0}}2	{{0}}70.59	{{audio\|help=no\|1 step in 17-et on C.mid\|Play}}	21:20	{{0}}84.47	{{audio\|help=no\|Septimal chromatic semitone on C.mid\|Play}}	−13.88
chromatic semitone	{{0}}2	{{0}}70.59		25:24	{{0}}70.67	{{audio\|help=no\|Just chromatic semitone on C.mid\|Play}}	−{{0}}0.08
28:27 semitone	{{0}}2	{{0}}70.59		28:27	{{0}}62.96	{{audio\|help=no\|Septimal minor second on C.mid\|Play}}	+{{0}}7.63
septimal sixth-tone	{{0}}1	{{0}}35.29	{{audio\|help=no\|1 step in 34-et on C.mid\|Play}}	50:49	{{0}}34.98	{{audio\|help=no\|Septimal sixth-tone on C.mid\|Play}}	+{{0}}0.31

Scale diagram

The following are 15 of the 34 notes in the scale:

Interval (cents)	106	106	70	35	70	106	106	106	70	35	70	106	106	106
Note name	C	C{{music\|♯}}/D{{music\|♭}}	D	D{{music\|♯}}	E{{music\|♭}}	E	F	F{{music\|♯}}/G{{music\|♭}}	G	G{{music\|♯}}	A{{music\|♭}}	A	A{{music\|♯}}/B{{music\|♭}}	B	C
Note (cents)	0	106	212	282	318	388	494	600	706	776	812	882	988	1094	1200

The remaining notes can easily be added.

References

J. Murray Barbour, Tuning and Temperament, Michigan State College Press, 1951.

1. ^Tuning and Temperament, Michigan State College Press, 1951

External links

[https://www.jstor.org/stable/932181 Dirk de Klerk. "Equal Temperament"], Acta Musicologica, Vol. 51, Fasc. 1 (Jan. - Jun., 1979), pp. 140-150.
Stickman: Neil Haverstick - Neil Haverstick is a composer and guitarist who uses microtonal tunings, especially 19, 31 and 34 tone equal temperament.

2 : Equal temperaments|Microtonality

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