Just intonation


In music, just intonation or pure intonation is a tuning system in which the space between notes' frequencies is a whole number ratio. Intervals spaced in this way are said to be pure, and are called just intervals. Just intervals consist of tones from a single harmonic series of an implied fundamental. For example, in the diagram, if the notes G3 and C4 are tuned as members of the harmonic series of the lowest C, their frequencies will be 3 and 4 times the fundamental frequency. The interval ratio between C4 and G3 is therefore 4:3, a just fourth.
In Western musical practice, bowed instruments such as violins, violas, cellos, and double basses are tuned using pure fifths or fourths. In contrast, keyboard instruments are rarely tuned using only pure intervals—the desire for different keys to have identical intervals in Western music makes this impractical. Some instruments of fixed pitch, such as electric pianos, are commonly tuned using equal temperament, in which all intervals other than octaves consist of irrational-number frequency ratios. Acoustic pianos are usually tuned with the octaves slightly widened, and thus with no pure intervals at all.
The phrase "just intonation" is used both to refer to one specific version of a 5-limit diatonic intonation, that is, Ptolemy's intense diatonic, as well to a whole class of tunings which use whole number intervals derived from the harmonic series. In this sense, "just intonation" is differentiated from equal temperaments and the "tempered" tunings of the early renaissance and baroque, such as Well temperament, or Meantone temperament. Since 5-limit has been the most prevalent just intonation used in western music, western musicians have subsequently tended to consider this scale to be the only version of just intonation. In principle, there are an infinite number of possible "just intonations", since the harmonic series is infinite.

Terminology

Just intonations are categorized by the notion of limits. The limit refers to the highest prime factor included in the intervals of a scale. All the intervals of any 3-limit just intonation will be ratios of powers of 2 and 3. So is included in 5-limit, because it has 5 in the denominator. If a scale uses an interval of 21:20, it is a 7-limit just intonation, since 21 is a multiple of 7. The interval is a 3-limit interval because the numerator and denominator are powers of 3 and 2, respectively. It is possible to have a scale that uses 5-limit intervals but not 2-limit intervals, i.e. no octaves, such as Wendy Carlos's alpha and beta scales. It is also possible to make diatonic scales that do not use fourths or fifths, but use 5- and 7-limit intervals only. Thus, the notion of limit is a helpful distinction, but certainly does not tell us everything there is to know about a particular scale.
Pythagorean tuning, or 3-limit tuning, allows ratios including the numbers 2 and 3 and their powers, such as 3:2, a perfect fifth, and 9:4, a major ninth. Although the interval from C to G is called a perfect fifth for purposes of musical analysis regardless of its tuning method, for purposes of discussing tuning systems musicologists may distinguish between a perfect fifth created using the 3:2 ratio and a tempered fifth using some other system, such as meantone or equal temperament.
5-limit tuning encompasses ratios additionally using the number 5 and its powers, such as 5:4, a major third, and 15:8, a major seventh. The specialized term perfect third is occasionally used to distinguish the 5:4 ratio from major thirds created using other tuning methods. 7 limit and higher systems use higher prime number partials in the overtone series
Commas are very small intervals that result from minute differences between pairs of just intervals. For example, the 5:4 ratio is different from the Pythagorean major third by a difference of 81:80, called the syntonic comma. The septimal comma, the ratio of 64:63, is a 7-limit interval, the distance between the Pythagorean semi-ditone,, and the septimal minor third, 7:6 , since
A cent is a measure of interval size. It is logarithmic in the musical frequency ratios. The octave is divided into 1200 steps, 100 cents for each semitone. Cents are often used to describe how much a just interval deviates from 12-TET. For example, the major third is 400 cents in 12-TET, but the 5th harmonic, 5:4 is 386.314 cents. Thus, the just major third deviates by −13.686 cents.

History

has been attributed to both Pythagoras and Eratosthenes by later writers, but may have been analyzed by other early Greeks or other early cultures as well. The oldest known description of the Pythagorean tuning system appears in Babylonian artifacts.
During the second century AD, Claudius Ptolemy described a 5-limit diatonic scale in his influential text on music theory Harmonics, which he called "intense diatonic". Given ratios of string lengths 120,, 100, 90, 80, 75,, and 60, Ptolemy quantified the tuning of what would later be called the Phrygian scale – 16:15, 9:8, 10:9, 9:8, 16:15, 9:8, and 10:9.
Ptolemy describes a variety of other just intonations derived from history and several of his own discovery / invention, including many interval patterns in 3-limit, 5-limit, 7-limit, and even an 11-limit diatonic.
Non-Western music, particularly that built on pentatonic scales, is largely tuned using just intonation. In China, the guqin has a musical scale based on harmonic overtone positions. The dots on its soundboard indicate the harmonic positions:,,,,,,,,,,,,. Indian music has an extensive theoretical framework for tuning in just intonation.

Diatonic scale

The prominent notes of a given scale may be tuned so that their frequencies form small whole number ratios.
The 5 limit diatonic major scale is tuned in such a way that major triads on the tonic, subdominant, and dominant are tuned in the proportion 4:5:6, and minor triads on the mediant and submediant are tuned in the proportion 10:12:15. Because of the two sizes of wholetone – 9:8 and 10:9 – the supertonic must be microtonally lowered by a syntonic comma to form a pure minor triad.
The 5 limit diatonic major scale on C is shown in the table below:
In this example the interval from D up to A would be a wolf fifth with the ratio, about 680 cents; noticeably smaller than the 702 cents of the pure ratio. This is mentioned by Schenker in reference to the teaching of Bruckner.
For a justly tuned diatonic minor scale, the mediant is tuned 6:5 and the submediant is tuned 8:5. It would include a tuning of 9:5 for the subtonic. For example, on A:

Twelve-tone scale

There are several ways to create a just tuning of the twelve-tone scale.

Pythagorean tuning

can produce a twelve-tone scale, but it does so by involving ratios of very large numbers, corresponding to natural harmonics very high in the harmonic series that do not occur widely in physical phenomena. This tuning uses ratios involving only powers of 3 and 2, creating a sequence of just fifths or fourths, as follows:
NoteGDAEBFCGDAEBF
Ratio1024:729256:243128:8132:2716:94:31:13:29:827:1681:64243:128729:512
Cents5889079229499649807022049064081110612

The ratios are computed with respect to C. Starting from C, they are obtained by moving six steps to the left and six to the right. Each step consists of a multiplication of the previous pitch by , , or their inversions.
Between the enharmonic notes at both ends of this sequence is a pitch ratio of, or about 23 cents, known as the Pythagorean comma. To produce a twelve-tone scale, one of them is arbitrarily discarded. The twelve remaining notes are repeated by increasing or decreasing their frequencies by a power of 2 to build scales with multiple octaves. A drawback of Pythagorean tuning is that one of the twelve fifths in this scale is badly tuned and hence unusable. This twelve-tone scale is fairly close to equal temperament, but it does not offer much advantage for tonal harmony because only the perfect intervals are simple enough to sound pure. Major thirds, for instance, receive the rather unstable interval of 81:64, sharp of the preferred 5:4 by an 81:80 ratio. The primary reason for its use is that it is extremely easy to tune, as its building block, the perfect fifth, is the simplest and consequently the most consonant interval after the octave and unison.
Pythagorean tuning may be regarded as a "three-limit" tuning system, because the ratios can be expressed as a product of integer powers of only whole numbers less than or equal to 3.

Five-limit tuning

A twelve-tone scale can also be created by compounding harmonics up to the fifth: namely, by multiplying the frequency of a given reference note by powers of 2, 3, or 5, or a combination of them. This method is called five-limit tuning.
To build such a twelve-tone scale, we may start by constructing a table containing fifteen pitches:
The factors listed in the first row and column are powers of 3 and 5, respectively. They are computed in two steps:
  1. For each cell of the table, a base ratio is obtained by multiplying the corresponding factors. For instance, the base ratio for the lower-left cell is
  2. The base ratio is then multiplied by a negative or positive power of 2, as large as needed to bring it within the range of the octave starting from C. For instance, the base ratio for the lower left cell is multiplied by 2, and the resulting ratio is 64:45, which is a number between 1:1 and 2:1.
Note that the powers of 2 used in the second step may be interpreted as ascending or descending octaves. For instance, multiplying the frequency of a note by 2 means increasing it by 6 octaves. Moreover, each row of the table may be considered to be a sequence of fifths, and each column a sequence of major thirds. For instance, in the first row of the table, there is an ascending fifth from D and A, and another one from A to E. This suggests an alternative but equivalent method for computing the same ratios. For instance, one can obtain A, starting from C, by moving one cell to the left and one upward in the table, which means descending by a fifth and ascending by a major third:
Since this is below C, one needs to move up by an octave to end up within the desired range of ratios :
A 12 tone scale is obtained by removing one note for each couple of enharmonic notes. This can be done in four ways that have in common the removal of G, according to a convention which was valid even for C-based Pythagorean and quarter-comma meantone scales. Note that it is a diminished fifth, close to half an octave, above the tonic C, which is a discordant interval; also its ratio has the largest values in its numerator and denominator of all tones in the scale, which make it least harmonious: All are reasons to avoid it.
The following chart shows one way to obtain a 12 tone scale by removing one note for each pair of enharmonic notes. In this method one discards the first column of the table.
This scale is "asymmetric" in the sense that going up from the tonic two semitones we multiply the frequency by, while going down from the tonic two semitones we do not divide the frequency by. For two methods that give "symmetric" scales, see.