In music, 72 equal temperament, called twelfth-tone, 72-TET, 72- EDO, or 72-ET, is the tempered scale derived by dividing the octave into twelfth-tones, or in other words 72 equal steps (equal frequency ratios). Each step represents a frequency ratio of , or cents, which divides the 100 cent " halftone" into 6 equal parts (100 ÷ = 6) and is thus a "twelfth-tone" (). Since 72 is divisible by 1, 2, 3, 4, 6, 8, 9, 12, 18, 24, 36, and 72, 72-EDO includes all those equal temperaments. Since it contains so many temperaments, 72-EDO contains at the same time tempered semitones, third-tones, quartertones and sixth-tones, which makes it a very versatile temperament. This division of the octave has attracted much attention from tuning theorists, since on the one hand it subdivides the standard

12 equal temperament Twelve-tone equal temperament (12-TET) is the musical system that divides the octave into 12 parts, all of which are equally tempered (equally spaced) on a logarithmic scale, with a ratio equal to the 12th root of 2 ( ≈ 1.05946). That resultin ...

and on the other hand it accurately represents overtones up to the twelfth partial tone, and hence can be used for 11-limit music. It was theoreticized in the form of twelfth-tones by

Alois Hába Alois Hába (21 June 1893 – 18 November 1973) was a Czech composer, music theorist and teacher. He belongs to the important discoverers in modern classical music, and major composers of microtonal music, especially using the quarter-tone scal ...

and

Ivan Wyschnegradsky Ivan Alexandrovich Wyschnegradsky; Is also transliterated as Vïshnegradsky, Wyshnegradsky, Wischnegradsky, Vishnegradsky, or Wishnegradsky (after he emigrated to France, he used "Wyschnegradsky" as spelling for his surname)., group=n ( ; Septe ...

, who considered it as a good approach to the ''continuum'' of sound. 72-EDO is also cited among the divisions of the tone by

Julián Carrillo Julián Carrillo Trujillo (January 28, 1875 – September 9, 1965) was a Mexican composer,Camp, Roderic Ai (1995). "Carrillo (Flores), Nabor" on ''Mexican Political Biographies, 1935–1993: Third Edition'', p. 121. . conductor, violi ...

, who preferred the sixteenth-tone as an approximation to continuous sound in discontinuous scales.

History and use

Byzantine music

The 72 equal temperament is used in Byzantine music theory,
G. Chryssochoidis, D. Delviniotis and G. Kouroupetroglou, "A semi-automated tagging methodology for Orthodox Ecclesiastic Chant Acoustic corpora", Proceedings SMC'07, 4th Sound and Music Computing Conference, Lefkada, Greece (11–13 July 2007). dividing the octave into 72 equal ''moria'', which itself derives from interpretations of the theories of Aristoxenos, who used something similar. Although the 72 equal temperament is based on

irrational Irrationality is cognition, thinking, talking, or acting without inclusion of rationality. It is more specifically described as an action or opinion given through inadequate use of reason, or through emotional distress or cognitive deficiency. T ...

intervals (see above), as is the 12 tone equal temperament mostly commonly used in Western music (and which is contained as a subset within 72 equal temperament), 72 equal temperament, as a much finer division of the octave, is an excellent tuning for both representing the division of the octave according to the diatonic and the chromatic genera in which intervals are based on

ratio In mathematics, a ratio shows how many times one number contains another. For example, if there are eight oranges and six lemons in a bowl of fruit, then the ratio of oranges to lemons is eight to six (that is, 8:6, which is equivalent to the ...

s between notes, and for representing with great accuracy many rational intervals as well as irrational intervals.

Other history and use

A number of composers have made use of it, and these represent widely different points of view and types of musical practice. These include

, Julián Carrillo,

and

Iannis Xenakis Giannis Klearchou Xenakis (also spelled for professional purposes as Yannis or Iannis Xenakis; el, Γιάννης "Ιωάννης" Κλέαρχου Ξενάκης, ; 29 May 1922 – 4 February 2001) was a Romanian-born Greek-French avant-garde c ...

. Many other composers use it freely and intuitively, such as jazz musician

Joe Maneri Joseph Gabriel Esther Maneri (February 9, 1927 – August 24, 2009), was an American jazz composer, saxophone and clarinet player. Violinist Mat Maneri is his son. Boston Microtonal Society In 1988, Maneri founded the Boston Microtonal Society ...

, and classically oriented composers such as Julia Werntz and others associated with the Boston Microtonal Society. Others, such as New York composer

Joseph Pehrson Joseph Pehrson (August 14, 1950 – April 4, 2020) was an American composer and pianist. Life Pehrson comes from Detroit, Michigan. He studied at the University of Michigan and Eastman School of Music. ( D.M.A. 1981). His teachers include Les ...

are interested in it because it supports the use of

miracle temperament George Secor (November 8, 1943 – March 2, 2020) was an American musician, composer and music-theorist from Chicago. He was the discoverer of miracle temperament and eponym of the secor. As an inventor, Secor and Hermann Pedtke's ''Motorola Scal ...

, and still others simply because it approximates higher-limit just intonation, such as Ezra Sims and

James Tenney James Tenney (August 10, 1934 – August 24, 2006) was an American composer and music theorist. He made significant early musical contributions to plunderphonics, sound synthesis, algorithmic composition, process music, spectral music, microto ...

. There was also an active Soviet school of 72 equal composers, with less familiar names: Evgeny Alexandrovich Murzin, Andrei Volkonsky, Nikolai Nikolsky, Eduard Artemiev, Alexander Nemtin,

Andrei Eshpai Andrei Yakovlevich Eshpai (russian: Андре́й Я́ковлевич Эшпа́й; 15 May 1925 – 8 November 2015) was an ethnic Mari (Russian and Soviet) composer. He was awarded the title of People's Artist of the USSR in 1981. Bio ...

Gennady Gladkov Gennady Igorevich Gladkov (russian: link=no, Геннадий Игоревич Гладков; born 18 February 1935) is a Soviet and Russian composer. He composed music for some of the most famous Soviet movies and cartoons, most notably '' The ...

, Pyotr Meshchianinov, and

Stanislav Kreichi Stanislav and variants may refer to: People *Stanislav (given name), a Slavic given name with many spelling variations (Stanislaus, Stanislas, Stanisław, etc.) Places * Stanislav, a coastal village in Kherson, Ukraine * Stanislaus County, Cali ...

. The ANS synthesizer uses 72 equal temperament.

Notation

The Maneri-Sims notation system designed for 72-et uses the accidentals and for -tone down and up (1 step = cents), and for down and up (2 steps = cents), and and for up and down (3 steps = 50 cents). They may be combined with the traditional sharp and flat symbols (6 steps = 100 cents) by being placed before them, for example: or , but without the intervening space. A tone may be one of the following , , , or (4 steps = ) while 5 steps may be , , or ( cents).

Interval size

Below are the sizes of some intervals (common and esoteric) in this tuning. For reference, differences of less than 5 cents are melodically imperceptible to most people: * * * Although 12-ET can be viewed as a subset of 72-ET, the closest matches to most commonly used intervals under 72-ET are distinct from the closest matches under 12-ET. For example, the

major third In classical music, a third is a Interval (music), musical interval encompassing three staff positions (see Interval (music)#Number, Interval number for more details), and the major third () is a third spanning four semitones.Allen Forte, ...

of 12-ET, which is sharp, exists as the 24-step interval within 72-ET, but the 23-step interval is a much closer match to the 5:4 ratio of the just major third. 12-ET has a very good approximation for the perfect fifth (third harmonic), especially for such a small number of steps per octave, but compared to the equally-tempered versions in 12-ET, the just major third (fifth harmonic) is off by about a sixth of a step, the

seventh harmonic The harmonic seventh interval, also known as the septimal minor seventh, or subminor seventh, is one with an exact 7:4 ratio (about 969 cents). This is somewhat narrower than and is, "particularly sweet", "sweeter in quality" than an "ordinar ...

is off by about a third of a step, and the eleventh harmonic is off by about half of a step. This suggests that if each step of 12-ET were divided in six, the fifth, seventh, and eleventh harmonics would now be well-approximated, while 12-ET's excellent approximation of the third harmonic would be retained. Indeed, all intervals involving harmonics up through the 11th are matched very closely in 72-ET; no intervals formed as the difference of any two of these intervals are tempered out by this tuning system. Thus, 72-ET can be seen as offering an almost perfect approximation to 7-, 9-, and 11-limit music. When it comes to the higher harmonics, a number of intervals are still matched quite well, but some are tempered out. For instance, the comma 169:168 is tempered out, but other intervals involving the 13-th harmonic are distinguished. Unlike tunings such as 31-ET and 41-ET, 72-ET contains many intervals which do not closely match any small-number (<16) harmonics in the harmonic series.

Scale diagram

Regular diatonic tunings 72-tone versus 12-tone

Because 72-EDO contains 12-EDO, the scale of 12-EDO is in 72-EDO. However, the true scale can be approximated better by other intervals.

References

External links

The Boston Microtonal Society official site
* *
Sagittal.org
**
Sagittal notation
, ''The Xenharmonic wiki'' * —symbols for Maneri-Sims notation and others
Byzantine Music Electroacoustic Music
{{Byzantine music Equal temperaments Byzantine music Microtonality