In an equal temperament, the distance between two adjacent steps of the scale is the same interval. Because the perceived identity of an interval depends on its ratio, this scale in even steps is a geometric sequence of multiplications. (An arithmetic sequence of intervals would not sound evenly spaced, and would not permit transposition to different keys.) Specifically, the smallest interval in an equal-tempered scale is the ratio:

${\displaystyle r^{n}=p}$ 

${\displaystyle r={\sqrt[{n}]{p}}}$ 

where the ratio r divides the ratio p (typically the octave, which is 2:1) into n equal parts. (See Twelve-tone equal temperament below.)

Scales are often measured in cents, which divide the octave into 1200 equal intervals (each called a cent). This logarithmic scale makes comparison of different tuning systems easier than comparing ratios, and has considerable use in Ethnomusicology. The basic step in cents for any equal temperament can be found by taking the width of p above in cents (usually the octave, which is 1200 cents wide), called below w, and dividing it into n parts:

${\displaystyle c={\frac {w}{n}}}$ 

In musical analysis, material belonging to an equal temperament is often given an integer notation, meaning a single integer is used to represent each pitch. This simplifies and generalizes discussion of pitch material within the temperament in the same way that taking the logarithm of a multiplication reduces it to addition. Furthermore, by applying the modular arithmetic where the modulus is the number of divisions of the octave (usually 12), these integers can be reduced to pitch classes, which removes the distinction (or acknowledges the similarity) between pitches of the same name, e.g. c is 0 regardless of octave register. The MIDI encoding standard uses integer note designations.

General formulas for the equal-tempered interval

12-tone equal temperament, which divides the octave into twelve equally-sized intervals, is the most common musical system used today, especially in Western music.

History

The two figures frequently credited with the achievement of exact calculation of equal temperament are Zhu Zaiyu (also romanized as Chu-Tsaiyu. Chinese: 朱載堉) in 1584 and Simon Stevin in 1585. According to Fritz A. Kuttner, a critic of the theory,^[5] it is known that "Chu-Tsaiyu presented a highly precise, simple and ingenious method for arithmetic calculation of equal temperament mono-chords in 1584" and that "Simon Stevin offered a mathematical definition of equal temperament plus a somewhat less precise computation of the corresponding numerical values in 1585 or later." The developments occurred independently.^[6]

Kenneth Robinson attributes the invention of equal temperament to Zhu Zaiyu^[7] and provides textual quotations as evidence.^[8] Zhu Zaiyu is quoted as saying that, in a text dating from 1584, "I have founded a new system. I establish one foot as the number from which the others are to be extracted, and using proportions I extract them. Altogether one has to find the exact figures for the pitch-pipers in twelve operations."^[8] Kuttner disagrees and remarks that his claim "cannot be considered correct without major qualifications."^[5] Kuttner proposes that neither Zhu Zaiyu or Simon Stevin achieved equal temperament and that neither of the two should be treated as inventors.^[9]

China

While China had previously come up with approximations for 12-TET, Zhu Zaiyu was the first person to mathematically solve twelve-tone equal temperament,^[10] which he described in his Fusion of Music and Calendar (律暦融通) in 1580 and Complete Compendium of Music and Pitch (Yuelü quan shu 樂律全書) in 1584.^[11] An extended account is also given by Joseph Needham.^[12] Zhu obtained his result mathematically by dividing the length of string and pipe successively by ¹²√2 ≈ 1.059463, and for pipe length by ²⁴√2,^[13] such that after twelve divisions (an octave) the length was divided by a factor of 2.

Zhu Zaiyu created several instruments tuned to his system, including bamboo pipes.^[14]

Europe

Some of the first Europeans to advocate for equal temperament were lutenists Vincenzo Galilei, Giacomo Gorzanis, and Francesco Spinacino, all of whom wrote music in it.^{[15][16][17][18]}

Simon Stevin was the first to develop 12-TET based on the twelfth root of two, which he described in Van De Spiegheling der singconst (ca. 1605), published posthumously nearly three centuries later in 1884.^[19]

Plucked instrument players (lutenists and guitarists) generally favored equal temperament,^[20] while others were more divided.^[21] In the end, twelve-tone equal temperament won out. This allowed enharmonic modulation, new styles of symmetrical tonality and polytonality, atonal music such as that written with the twelve tone technique or serialism, and jazz (at least its piano component) to develop and flourish.

Mathematics

In twelve-tone equal temperament, which divides the octave into 12 equal parts, the width of a semitone, i.e. the frequency ratio of the interval between two adjacent notes, is the twelfth root of two:

${\displaystyle {\sqrt[{12}]{2}}=2^{\frac {1}{12}}\approx 1.059463}$ 

This interval is divided into 100 cents.

Calculating absolute frequencies

To find the frequency, P_n, of a note in 12-TET, the following definition may be used:

${\displaystyle P_{n}=P_{a}\left({\sqrt[{12}]{2}}\right)^{(n-a)}}$ 

In this formula P_n refers to the pitch, or frequency (usually in hertz), you are trying to find. P_a refers to the frequency of a reference pitch. n and a refer to numbers assigned to the desired pitch and the reference pitch, respectively. These two numbers are from a list of consecutive integers assigned to consecutive semitones. For example, A₄ (the reference pitch) is the 49th key from the left end of a piano (tuned to 440 Hz), and C₄ (middle C), and F#₄ are the 40th and 46th key respectively. These numbers can be used to find the frequency of C₄ and F#₄ :

${\displaystyle P_{40}=440\left({\sqrt[{12}]{2}}\right)^{(40-49)}\approx 261.626\ \mathrm {Hz} }$ 

${\displaystyle P_{46}=440\left({\sqrt[{12}]{2}}\right)^{(46-49)}\approx 369.994\ \mathrm {Hz} }$ 

Converting frequencies to their equal temperament counterparts

To convert a frequency (in Hz) to its equal 12-TET counterpart, the following formula can be used:

${\displaystyle E_{n}=a\cdot 2^{\frac {\operatorname {round} \left(12\log _{2}\left({\frac {n}{a}}\right)\right)}{12}}}$ 

Where E_n refers to the frequency of a pitch in equal temperament, and a refers to the frequency of a reference pitch. For example, (if we let the reference pitch equal 440 Hz) we can see that E₅ and C#₅ are equal to the following frequencies respectively:

${\displaystyle E_{660}=440\cdot 2^{\frac {\operatorname {round} \left(12\log _{2}\left({\frac {660}{440}}\right)\right)}{12}}\approx 659.255\ \mathrm {Hz} }$ 

${\displaystyle E_{550}=440\cdot 2^{\frac {\operatorname {round} \left(12\log _{2}\left({\frac {550}{440}}\right)\right)}{12}}\approx 554.365\ \mathrm {Hz} }$ 

Comparison with just intonation

The intervals of 12-TET closely approximate some intervals in just intonation.^[22] The fifths and fourths are almost indistinguishably close to just intervals, while thirds and sixths are further away.

In the following table the sizes of various just intervals are compared against their equal-tempered counterparts, given as a ratio as well as cents.

Seven-tone equal division of the fifth

Violins, violas and cellos are tuned in perfect fifths (G – D – A – E, for violins, and C – G – D – A, for violas and cellos), which suggests that their semi-tone ratio is slightly higher than in the conventional twelve-tone equal temperament. Because a perfect fifth is in 3:2 relation with its base tone, and this interval is covered in 7 steps, each tone is in the ratio of ⁷√3⁄2 to the next (100.28 cents), which provides for a perfect fifth with ratio of 3:2 but a slightly widened octave with a ratio of ≈ 517:258 or ≈ 2.00388:1 rather than the usual 2:1 ratio, because twelve perfect fifths do not equal seven octaves.^[23] During actual play, however, the violinist chooses pitches by ear, and only the four unstopped pitches of the strings are guaranteed to exhibit this 3:2 ratio.

5 and 7 tone temperaments in ethnomusicology

Five and seven tone equal temperament (5-TET  Play (help·info) and 7-TET Play (help·info) ), with 240  Play (help·info) and 171  Play (help·info) cent steps respectively, are fairly common.

5-TET and 7-TET mark the endpoints of the syntonic temperament's valid tuning range, as shown in Figure 1.

• In 5-TET the tempered perfect fifth is 720 cents wide (at the top of the tuning continuum), and marks the endpoint on the tuning continuum at which the width of the minor second shrinks to a width of 0 cents.
• In 7-TET the tempered perfect fifth is 686 cents wide (at the bottom of the tuning continuum), and marks the endpoint on the tuning continuum, at which the minor second expands to be as wide as the major second (at 171 cents each).

5-tone equal temperament

Indonesian gamelans are tuned to 5-TET according to Kunst (1949), but according to Hood (1966) and McPhee (1966) their tuning varies widely, and according to Tenzer (2000) they contain stretched octaves. It is now well-accepted that of the two primary tuning systems in gamelan music, slendro and pelog, only slendro somewhat resembles five-tone equal temperament while pelog is highly unequal; however, Surjodiningrat et al. (1972) has analyzed pelog as a seven-note subset of nine-tone equal temperament (133-cent steps  Play (help·info)).

7-tone equal temperament

A Thai xylophone measured by Morton (1974) "varied only plus or minus 5 cents," from 7-TET. According to Morton, "Thai instruments of fixed pitch are tuned to an equidistant system of seven pitches per octave ... As in Western traditional music, however, all pitches of the tuning system are not used in one mode (often referred to as 'scale'); in the Thai system five of the seven are used in principal pitches in any mode, thus establishing a pattern of nonequidistant intervals for the mode."^[24]  Play (help·info)

A South American Indian scale from a pre-instrumental culture measured by Boiles (1969) featured 175-cent seven-tone equal temperament, which stretches the octave slightly as with instrumental gamelan music.

Chinese music has traditionally used 7-TET.^[25][26]

Various equal temperaments

19 EDO is famous and some instruments are tuned in 19 EDO. It has slightly flatter perfect fifth (at 695 cents), but its major sixth is less than a single cent away from just intonation's major sixth (at 884 cents). Its minor third is also less than a cent from just intonation's. (The lowest EDO that produces a better minor third and major sixth than 19 EDO is 232 EDO.) Its perfect fourth (at 505 cents), is only 5 cents sharp than just intonation's and 3 cents sharp from 12-tet's.

23 EDO is the largest EDO that fails to approximate the 3rd, 5th, 7th, and 11th harmonics (3:2, 5:4, 7:4, 11:8) within 20 cents, making it attractive to microtonalists looking for unusual microtonal harmonic territory.

24 EDO, the quarter tone scale (or 24-TET), was a popular microtonal tuning in the 20th century probably because it represented a convenient access point for composers conditioned on standard Western 12 EDO pitch and notation practices who were also interested in microtonality. Because 24 EDO contains all of the pitches of 12 EDO, plus new pitches halfway between each adjacent pair of 12 EDO pitches, they could employ the additional colors without losing any tactics available in 12-tone harmony. The fact that 24 is a multiple of 12 also made 24 EDO easy to achieve instrumentally by employing two traditional 12 EDO instruments purposely tuned a quarter-tone apart, such as two pianos, which also allowed each performer (or one performer playing a different piano with each hand) to read familiar 12-tone notation. Various composers including Charles Ives experimented with music for quarter-tone pianos. 24 EDO approximates the 11th harmonic very well, unlike 12 EDO.

26 EDO is the smallest EDO to almost purely tune the 7th harmonic (7:4). It is also a very flat meantone temperament that means after 4 fifths, it produces a neutral 3rd rather than a major one. 26 EDO has two minor thirds and two minor sixths. It could be a bit confusing at first glance because if you play the neutral 3rd it sounds like a very flat major one. 26EDO could be an alternative temperament of Barbershop harmony.

27 EDO is the smallest EDO that uniquely represents all intervals involving the first eight harmonics. It tempers out the septimal comma but not the syntonic comma.

29 EDO is the lowest number of equal divisions of the octave that produces a better perfect fifth than 12 EDO. Its major third is roughly as inaccurate as 12-TET; however, it is tuned 14 cents flat rather than 14 cents sharp. It tunes the 7th, 11th, and 13th harmonics flat as well, by roughly the same amount. This means intervals such as 7:5, 11:7, 13:11, etc., are all matched extremely well in 29-TET.

31 EDO was advocated by Christiaan Huygens and Adriaan Fokker. 31 EDO has a slightly less accurate fifth than 12 EDO, but provides near-just major thirds, and provides decent matches for harmonics up to at least 13, of which the seventh harmonic is particularly accurate.

34 EDO gives slightly less total combined errors of approximation to the 5-limit just ratios 3:2, 5:4, 6:5, and their inversions than 31 EDO does, although the approximation of 5:4 is worse. 34 EDO doesn't approximate ratios involving prime 7 well. It contains a 600-cent tritone, since it is an even-numbered EDO.

41 EDO is the second lowest number of equal divisions that produces a better perfect fifth than 12 EDO. Its major third is more accurate than 12 EDO and 29 EDO, about 6 cents flat. It is not meantone, so it distinguishes 10:9 and 9:8, unlike 31edo. It is more accurate in 13-limit than 31edo.

46 EDO provides slightly sharp major thirds and perfect fifths, giving triads a characteristic bright sound. The harmonics up to 11 are approximated within 5 cents of accuracy, with 10:9 and 9:5 being a fifth of a cent away from pure. As it's not a meantone system, it distinguishes 10:9 and 9:8.

53 EDO is better at approximating the traditional just consonances than 12, 19 or 31 EDO, but has had only occasional use. Its extremely good perfect fifths make it interchangeable with an extended Pythagorean tuning, but it also accommodates schismatic temperament, and is sometimes used in Turkish music theory. It does not, however, fit the requirements of meantone temperaments, which put good thirds within easy reach via the cycle of fifths. In 53 EDO, the very consonant thirds would be reached instead by using a Pythagorean diminished fourth (C-F♭), as it is an example of schismatic temperament, just like 41 EDO.

72 EDO approximates many just intonation intervals well, even into the 7-limit and 11-limit, such as 7:4, 9:7, 11:5, 11:6 and 11:7. 72 EDO has been taught, written and performed in practice by Joe Maneri and his students (whose atonal inclinations typically avoid any reference to just intonation whatsoever). It can be considered an extension of 12 EDO because 72 is a multiple of 12. 72 EDO has a smallest interval that is six times smaller than the smallest interval of 12 EDO and therefore contains six copies of 12 EDO starting on different pitches. It also contains three copies of 24 EDO and two copies of 36 EDO, which are themselves multiples of 12 EDO. 72 EDO has also been criticized for its redundancy by retaining the poor approximations contained in 12 EDO, despite not needing them for any lower limits of just intonation (e.g. 5-limit).

96 EDO approximates all intervals within 6.25 cents, which is barely distinguishable. As an eightfold multiple of 12, it can be used fully like the common 12 EDO. It has been advocated by several composers, especially Julián Carrillo from 1924 to the 1940s.^[28]

Other equal divisions of the octave that have found occasional use include 15 EDO, 17 EDO, and 22 EDO.

2, 5, 12, 41, 53, 306, 665 and 15601 are denominators of first convergents of log₂(3), so 2, 5, 12, 41, 53, 306, 665 and 15601 twelfths (and fifths), being in correspondent equal temperaments equal to an integer number of octaves, are better approximation of 2, 5, 12, 41, 53, 306, 665 and 15601 just twelfths/fifths than for any equal temperaments with fewer tones.^[29][30]

1, 2, 3, 5, 7, 12, 29, 41, 53, 200... (sequence A060528 in the OEIS) is the sequence of divisions of octave that provide better and better approximations of the perfect fifth. Related sequences contain divisions approximating other just intervals.^[31]

Equal temperaments of non-octave intervals

The equal-tempered version of the Bohlen–Pierce scale consists of the ratio 3:1, 1902 cents, conventionally a perfect fifth plus an octave (that is, a perfect twelfth), called in this theory a tritave ( play (help·info)), and split into thirteen equal parts. This provides a very close match to justly tuned ratios consisting only of odd numbers. Each step is 146.3 cents ( play (help·info)), or ¹³√3.

Wendy Carlos created three unusual equal temperaments after a thorough study of the properties of possible temperaments having a step size between 30 and 120 cents. These were called alpha, beta, and gamma. They can be considered as equal divisions of the perfect fifth. Each of them provides a very good approximation of several just intervals.^[32] Their step sizes:

• alpha: ⁹√3⁄2 (78.0 cents)  Play (help·info)
• beta: ¹¹√3⁄2 (63.8 cents)  Play (help·info)
• gamma: ²⁰√3⁄2 (35.1 cents)  Play (help·info)

Alpha and Beta may be heard on the title track of her 1986 album Beauty in the Beast.

Proportions between semitone and whole tone

In this section, semitone and whole tone may not have their usual 12-EDO meanings, as it discusses how they may be tempered in different ways from their just versions to produce desired relationships. Let the number of steps in a semitone be s, and the number of steps in a tone be t.

There is exactly one family of equal temperaments that fixes the semitone to any proper fraction of a whole tone, while keeping the notes in the right order (meaning that, for example, C, D, E, F, and F♯ are in ascending order if they preserve their usual relationships to C). That is, fixing q to a proper fraction in the relationship qt = s also defines a unique family of one equal temperament and its multiples that fulfil this relationship.

For example, where k is an integer, 12k-EDO sets q = 1⁄2, and 19k-EDO sets q = 1⁄3. The smallest multiples in these families (e.g. 12 and 19 above) has the additional property of having no notes outside the circle of fifths. (This is not true in general; in 24-EDO, the half-sharps and half-flats are not in the circle of fifths generated starting from C.) The extreme cases are 5k-EDO, where q = 0 and the semitone becomes a unison, and 7k-EDO, where q = 1 and the semitone and tone are the same interval.

Once one knows how many steps a semitone and a tone are in this equal temperament, one can find the number of steps it has in the octave. An equal temperament fulfilling the above properties (including having no notes outside the circle of fifths) divides the octave into 7t − 2s steps, and the perfect fifth into 4t − s steps. If there are notes outside the circle of fifths, one must then multiply these results by n, which is the number of nonoverlapping circles of fifths required to generate all the notes (e.g. two in 24-EDO, six in 72-EDO). (One must take the small semitone for this purpose: 19-EDO has two semitones, one being 1⁄3 tone and the other being 2⁄3.)

The smallest of these families is 12k-EDO, and in particular, 12-EDO is the smallest equal temperament that has the above properties. Additionally, it also makes the semitone exactly half a whole tone, the simplest possible relationship. These are some of the reasons why 12-EDO has become the most commonly used equal temperament. (Another reason is that 12-EDO is the smallest equal temperament to closely approximate 5-limit harmony, the next-smallest being 19-EDO.)

Each choice of fraction q for the relationship results in exactly one equal temperament family, but the converse is not true: 47-EDO has two different semitones, where one is 1⁄7 tone and the other is 8⁄9, which are not complements of each other like in 19-EDO (1⁄3 and 2⁄3). Taking each semitone results in a different choice of perfect fifth.

Regular diatonic tunings

The diatonic tuning in twelve equal can be generalized to any regular diatonic tuning dividing the octave as a sequence of steps TTSTTTS (or a rotation of it) with all the T's and all the S's the same size and the S's smaller than the T's. In twelve equal the S is the semitone and is exactly half the size of the tone T. When the S's reduce to zero the result is TTTTT or a five-tone equal temperament, As the semitones get larger, eventually the steps are all the same size, and the result is in seven tone equal temperament. These two endpoints are not included as regular diatonic tunings.

The notes in a regular diatonic tuning are connected together by a cycle of seven tempered fifths. The twelve-tone system similarly generalizes to a sequence CDCDDCDCDCDD (or a rotation of it) of chromatic and diatonic semitones connected together in a cycle of twelve fifths. In this case, seven equal is obtained in the limit as the size of C tends to zero and five equal is the limit as D tends to zero while twelve equal is of course the case C = D.

Some of the intermediate sizes of tones and semitones can also be generated in equal temperament systems. For instance if the diatonic semitone is double the size of the chromatic semitone, i.e. D = 2*C the result is nineteen equal with one step for the chromatic semitone, two steps for the diatonic semitone and three steps for the tone and the total number of steps 5*T + 2*S = 15 + 4 = 19 steps. The resulting twelve-tone system closely approximates to the historically important 1/3 comma meantone.

If the chromatic semitone is two-thirds of the size of the diatonic semitone, i.e. C = (2/3)*D, the result is thirty one equal, with two steps for the chromatic semitone, three steps for the diatonic semitone, and five steps for the tone where 5*T + 2*S = 25 + 6 = 31 steps. The resulting twelve-tone system closely approximates to the historically important 1/4 comma meantone.

• Just intonation
• Musical acoustics (the physics of music)
• Music and mathematics
• Microtuner
• Microtonal music
• Piano tuning
• List of meantone intervals
• Diatonic and chromatic
• Electronic tuner
• Musical tuning

Citations

Sources

• Cho, Gene Jinsiong. (2003). The Discovery of Musical Equal Temperament in China and Europe in the Sixteenth Century. Lewiston, NY: Edwin Mellen Press.
• Duffin, Ross W. How Equal Temperament Ruined Harmony (and Why You Should Care). W.W.Norton & Company, 2007.
• Jorgensen, Owen. Tuning. Michigan State University Press, 1991. ISBN 0-87013-290-3
• Sethares, William A. (2005). Tuning, Timbre, Spectrum, Scale (2nd ed.). London: Springer-Verlag. ISBN 1-85233-797-4.
• Surjodiningrat, W., Sudarjana, P.J., and Susanto, A. (1972) Tone measurements of outstanding Javanese gamelans in Jogjakarta and Surakarta, Gadjah Mada University Press, Jogjakarta 1972. Cited on . Retrieved May 19, 2006.
• Stewart, P. J. (2006) "From Galaxy to Galaxy: Music of the Spheres" [1]
• Khramov, Mykhaylo. "Approximation of 5-limit just intonation. Computer MIDI Modeling in Negative Systems of Equal Divisions of the Octave", Proceedings of the International Conference SIGMAP-2008^{[permanent dead link]}, 26–29 July 2008, Porto, pp. 181–184, ISBN 978-989-8111-60-9

• Sensations of Tone a foundational work on acoustics and the perception of sound by Hermann von Helmholtz. Especially Appendix XX: Additions by the Translator, pages 430-556, (pdf pages 451-577)]

• Xenharmonic wiki on EDOs vs. Equal Temperaments
• Huygens-Fokker Foundation Centre for Microtonal Music
• "Temperament" from A supplement to Mr. Chambers's cyclopædia (1753)
• Barbieri, Patrizio. . (2008) Latina, Il Levante Libreria Editrice
• Fractal Microtonal Music, Jim Kukula.
• All existing 18th century quotes on J.S. Bach and temperament
• Dominic Eckersley: "Rosetta Revisited: Bach's Very Ordinary Temperament"
• Well Temperaments, based on the Werckmeister Definition
• FAVORED CARDINALITIES OF SCALES by PETER BUCH