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[[File:Harmonic series klang.png|thumb|Harmonic series, partials 1–5 numbered {{audio|Harmonic series klang.mid|Play}}.]]
[[File:Harmonic series klang.png|thumb|Harmonic series, partials 1–5 numbered {{audio|Harmonic series klang.mid|Play}}.]]


In music, '''just intonation''' or '''pure intonation''' is the [[Musical tuning|tuning]] of musical [[Interval (music)|intervals]] as [[Natural number|whole number]] [[ratio]]s (such as 3:2 or 4:3) of [[Frequency|frequencies]]. Any [[interval (music)|interval]] tuned in this way is called a '''just interval'''. Just intervals (and chords created by combining them) consist of members of a single [[harmonic series (music)|harmonic series]] of a (lower) implied [[fundamental frequency|fundamental]]. For example, in the diagram at right, the notes G and middle C (labeled 3 and 4), are both members of the harmonic series of the lowest C and their frequencies will be 3 and 4 times, respectively, the fundamental frequency; thus, their interval ratio will be 4:3. If the frequency of the fundamental is 64 [[Hertz]], the frequencies of the two notes in question would be 192 and 256.
In music, '''just intonation''' or '''pure intonation''' is the [[Musical tuning|tuning]] of musical [[Interval (music)|intervals]] as [[Natural number|whole number]] [[ratio]]s (such as 3:2 or 4:3) of [[Frequency|frequencies]]. It is a measurement of frequencies using mathematical ratios. Any [[interval (music)|interval]] tuned in this way is called a '''just interval'''. Just intervals (and chords created by combining them) consist of members of a single [[harmonic series (music)|harmonic series]] of a (lower) implied [[fundamental frequency|fundamental]]. For example, in the diagram at right, the notes G and middle C (labeled 3 and 4), are both members of the harmonic series of the lowest C and their frequencies will be 3 and 4 times, respectively, the fundamental frequency; thus, their interval ratio will be 4:3. Every frequency has its own fundamental, and each fundamental its own frequency. If the frequency of the fundamental is 64 [[Hertz]], the frequencies of the two notes in question would be 192 and 256.


Instruments are not always tuned using these intervals. In the Western world, instruments of fixed pitch, such as pianos, are typically tuned using [[equal temperament]], in which intervals other than octaves consist of irrational-number frequency ratios.
Instruments are not always tuned using these intervals. In the Western world, instruments of fixed pitch, such as pianos, are typically tuned using [[equal temperament]], in which intervals other than octaves consist of irrational-number frequency ratios.

Revision as of 05:39, 14 April 2020

Harmonic series, partials 1–5 numbered Play.

In music, just intonation or pure intonation is the tuning of musical intervals as whole number ratios (such as 3:2 or 4:3) of frequencies. It is a measurement of frequencies using mathematical ratios. Any interval tuned in this way is called a just interval. Just intervals (and chords created by combining them) consist of members of a single harmonic series of a (lower) implied fundamental. For example, in the diagram at right, the notes G and middle C (labeled 3 and 4), are both members of the harmonic series of the lowest C and their frequencies will be 3 and 4 times, respectively, the fundamental frequency; thus, their interval ratio will be 4:3. Every frequency has its own fundamental, and each fundamental its own frequency. If the frequency of the fundamental is 64 Hertz, the frequencies of the two notes in question would be 192 and 256.

Instruments are not always tuned using these intervals. In the Western world, instruments of fixed pitch, such as pianos, are typically tuned using equal temperament, in which intervals other than octaves consist of irrational-number frequency ratios.

Terminology

Tuning systems that have frequency ratios of powers of 2 include perfect octaves and, potentially, octave transposability.

Pythagorean tuning, or 3-limit tuning, also allows ratios including the number 3 and its 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 music 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 partials in the overtone series.

A wolf interval is an interval whose tuning is too far from its just-tuned equivalent, usually perceived as discordant and undesirable.

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 (3-limit) major third (81:64) by a difference of 81:80, called the syntonic comma.

Cents are a measure of interval size. In 12-tone equal temperament, every half step is 100 cents.

History

Just (black) major and parallel minor triad, compared to its equal temperament (gray) approximations, within the chromatic circle

Pythagorean tuning has been attributed to both Pythagoras and Eratosthenes by later writers, but may also 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.[1]

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".[2] Given ratios of string lengths 120, 112 12, 100, 90, 80, 75, 66 23, and 60,[2] Ptolemy quantified the tuning of what would later be called the Phrygian scale (equivalent to the major scale beginning and ending on the third note) – 16:15, 9:8, 10:9, 9:8, 16:15, 9:8, and 10:9.

Non-Western music, particular 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: 18, 16, 15, 14, 13, 25, 12, 35, 23, 34, 45, 56, 78.[3] Indian music has an extensive theoretical framework for tuning in just intonation.

Diatonic scale

Primary triads in C Play.
Just tuned diatonic scale derivation.[4]

The prominent notes of a given scale may be tuned so that their frequencies form (relatively) 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 (major wholetone) and 10:9 (minor wholetone) – the supertonic must be microtonally lowered by a syntonic comma to form a pure minor triad.

5-limit diatonic major scale on C is shown in the table below:[4][5][6]: 78  (Ptolemy's intense diatonic scale):[7]

Note Name C D E F G A B C
Ratio from C 1:1 9:8 5:4 4:3 3:2 5:3 15:8 2:1
Harmonic of Fundamental F 24 27 30 32 36 40 45 48
Cents 0 204 386 498 702 884 1088 1200
Step Name   T t s T t T s  
Ratio 9:8 10:9 16:15 9:8 10:9 9:8 16:15
Cents 204 182 112 204 182 204 112

In this example the interval from D up to A would be a wolf fifth with the ratio 4027, about 680 cents, noticeably smaller than the 702 cents of the pure 32 ratio.

For a justly tuned harmonic minor scale, the mediant is tuned 6:5 and the submediant is tuned 8:5. Natural minor would include a tuning of 9:5 for the subtonic.

Twelve-tone scale

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

Pythagorean tuning

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:

Note G D A E B F C G D A E B F
Ratio 1024:729 256:243 128:81 32:27 16:9 4:3 1:1 3:2 9:8 27:16 81:64 243:128 729:512
Cents 588 90 792 294 996 498 0 702 204 906 408 1110 612

The ratios are computed with respect to C (the base note). Starting from C, they are obtained by moving six steps (around the circle of fifths) to the left and six to the right. Each step consists of a multiplication of the previous pitch by 2/3 (descending fifth), 3/2 (ascending fifth), or their inversions (3/4 or 4/3).

Between the enharmonic notes at both ends of this sequence is a pitch ratio of 312 / 219 = 531441 / 524288, 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 (the size of one or more octaves) to build scales with multiple octaves (such as the keyboard of a piano). A drawback of Pythagorean tuning is that one of the twelve fifths in this scale is badly tuned and hence unusable (the wolf fifth, either F-D if G is discarded, or B-G if F is discarded). 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 (fourth, fifth, and octave) 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.[8] 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 (the base 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 (using C as the base note), we may start by constructing a table containing fifteen pitches:

Factor 19 13 1 3 9
5 D A E B F note
10:9 5:3 5:4 15:8 45:32 ratio
182 884 386 1088 590 cents
1 B F C G D note
16:9 4:3 1:1 3:2 9:8 ratio
996 498 0 702 204 cents
15 G D A E B note
64:45 16:15 8:5 6:5 9:5 ratio
610 112 814 316 1018 cents

The factors listed in the first row and column are powers of 3 and 5, respectively (e.g., 1/9 = 3−2). Colors indicate couples of enharmonic notes with almost identical pitch. The ratios are all expressed relative to C in the centre of this diagram (the base note for this scale). 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 1/9 × 1/5 = 1/45.
  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 (from 1:1 to 2:1). For instance, the base ratio for the lower left cell (1/45) is multiplied by 26, 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 26 means increasing it by 6 octaves. Moreover, each row of the table may be considered to be a sequence of fifths (ascending to the right), and each column a sequence of major thirds (ascending upward). For instance, in the first row of the table, there is an ascending fifth from D and A, and another one (followed by a descending octave) 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:

2/3 × 5/4 = 10/12 = 5/6.

Since this is below C, one needs to move up by an octave to end up within the desired range of ratios (from 1:1 to 2:1):

5/6 × 2/1 = 10/6 = 5/3.

A 12-tone scale is obtained by removing one note for each couple of enharmonic notes. This can be done in at least three ways, which 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 disharmonic 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 reasons to avoid it.

This is only one possible strategy of five-limit tuning. It consists of discarding the first column of the table (labeled "19"). The resulting 12-tone scale is shown below:

Asymmetric scale
Factor 1/3 1 3 9
5 A E B F
5:3 5:4 15:8 45:32
1 F C G D
4:3 1:1 3:2 9:8
1/5 D A E B
16:15 8:5 6:5 9:5

Extension of the twelve-tone scale

The table above uses only low powers of 3 and 5 to build the base ratios. However, it can be easily extended by using higher positive and negative powers of the same numbers, such as 52 = 25, 5−2 = 1/25, 33 = 27, or 3−3 = 1/27. A scale with 25, 35 or even more pitches can be obtained by combining these base ratios, as in five-limit tuning.

Indian scales

In Indian music, the just diatonic scale described above is used, though there are different possibilities, for instance for the sixth pitch (Dha), and further modifications may be made to all pitches excepting Sa and Pa.[9]

Note Sa Re Ga Ma Pa Dha Ni Sa
Ratio 1:1 9:8 5:4 4:3 3:2 5:3 or 27:16 15:8 2:1
Cents 0 204 386 498 702 884 or 906 1088 1200

Some accounts of Indian intonation system cite a given 22 Shrutis.[10][11] According to some musicians, one has a scale of a given 12 pitches and ten in addition (the tonic, Shadja (Sa), and the pure fifth, Pancham (Pa), are inviolate):

Note C D D D D E E E E F F
Ratio 1:1 256:243 16:15 10:9 9:8 32:27 6:5 5:4 81:64 4:3 27:20
Cents 0 90 112 182 204 294 316 386 408 498 520
F F G A A A A B B B B C
45:32 729:512 3:2 128:81 8:5 5:3 27:16 16:9 9:5 15:8 243:128 2:1
590 612 702 792 814 884 906 996 1018 1088 1110 1200

Where we have two ratios for a given letter name, we have a difference of 81:80 (or 22 cents), which is known as the syntonic comma.[8] One can see the symmetry, looking at it from the tonic, then the octave.

(This is just one example of explaining a 22-Śruti scale of tones. There are many different explanations.)

Practical difficulties

Some fixed just intonation scales and systems, such as the diatonic scale above, produce wolf intervals. The above scale allows a minor tone to occur next to a semitone which produces the awkward ratio 32:27 for D-F, and still worse, a minor tone next to a fourth giving 40:27 for D-A. Moving D down to 10:9 alleviates these difficulties but creates new ones: D-G becomes 27:20, and D-B becomes 27:16. This fundamental problem arises in any system of tuning using a limited number of notes.

One can have more frets on a guitar to handle both As, 9:8 with respect to G and 10:9 with respect to G so that A-C can be played as 6:5 while A-D can still be played as 3:2. 9:8 and 10:9 are less than 1/53 of an octave apart, so mechanical and performance considerations have made this approach extremely rare. And the problem of how to tune chords such as C-E-G-A-D, in typical 5-limit just intonation, is left unresolved (for instance, A could be 4:3 below D (making it 9:8, if G is 1) or 4:3 above E (making it 10:9, if G is 1) but not both at the same time, so one of the fourths in the chord will have to be an out-of-tune wolf interval). However the frets may be removed entirely—this, unfortunately, makes in-tune fingering of many chords exceedingly difficult, due to the construction and mechanics of the human hand—and the tuning of most complex chords in just intonation is generally ambiguous.

Some composers deliberately use these wolf intervals and other dissonant intervals as a way to expand the tone color palette of a piece of music. For example, the extended piano pieces The Well-Tuned Piano by LaMonte Young and The Harp Of New Albion by Terry Riley use a combination of very consonant and dissonant intervals for musical effect. In "Revelation", Michael Harrison goes even further, and uses the tempo of beat patterns produced by some dissonant intervals as an integral part of several movements.

For many fixed-pitch instruments tuned in just intonation, one cannot change keys without retuning the instrument. For instance, if a piano is tuned in just intonation intervals and a minimum of wolf intervals for the key of G, then only one other key (typically E-flat) can have the same intervals, and many of the keys have a very dissonant and unpleasant sound. This makes modulation within a piece, or playing a repertoire of pieces in different keys, impractical to impossible.

Synthesizers have proven a valuable tool for composers wanting to experiment with just intonation. They can be easily retuned with a microtuner. Many commercial synthesizers provide the ability to use built-in just intonation scales or to create them manually. Wendy Carlos used a system on her 1986 album Beauty in the Beast, where one electronic keyboard was used to play the notes, and another used to instantly set the root note to which all intervals were tuned, which allowed for modulation. On her 1987 lecture album Secrets of Synthesis there are audible examples of the difference in sound between equal temperament and just intonation.

Singing and scale-free instruments

The human voice is among the most pitch-flexible instruments in common use. Pitch can be varied with no restraints and adjusted in the midst of performance, without needing to retune. Although the explicit use of just intonation fell out of favour concurrently with the increasing use of instrumental accompaniment (with its attendant constraints on pitch), most a cappella ensembles naturally tend toward just intonation because of the comfort of its stability. Barbershop quartets are a good example of this.

The unfretted stringed instruments from the violin family (the violin, the viola, the cello and the double bass) are quite flexible in the way pitches can be adjusted. Stringed instruments that are not playing with fixed pitch instruments tend to adjust the pitch of key notes such as thirds and leading tones so that the pitches differ from equal temperament.

Trombones have a slide that allows arbitrary tuning during performance. French horns can be tuned by shortening or lengthening the main tuning slide on the back of the instrument, with each individual rotary or piston slide for each rotary or piston valve, and by using the right hand inside the bell to adjust the pitch by pushing the hand in deeper to sharp the note, or pulling it out to flatten the note while playing. Some natural horns also may adjust the tuning with the hand in the bell, and valved cornets, trumpets, Flugelhorns, Saxhorns, Wagner tubas, and tubas have overall and valve-by-valve tuning slides, like valved horns.

Wind instruments with valves are biased towards natural tuning and must be micro-tuned if equal temperament is required.

Other wind instruments, although built to a certain scale, can be micro-tuned to a certain extent by using the embouchure or adjustments to fingering.

Western composers

Composers often impose a limit on how complex the ratios may become.[12] For example, a composer who chooses to write in 7-limit just intonation will not employ ratios that use powers of prime numbers larger than 7. Under this scheme, ratios like 11:7 and 13:6 would not be permitted, because 11 and 13 cannot be expressed as powers of those prime numbers ≤ 7 (i.e. 2, 3, 5, and 7).

Though just intonation in its simplest form (5-limit) may seem to suggest a necessarily tonal logic, it need not be the case. Some music of Kraig Grady and Daniel James Wolf uses just intonation scales designed by Erv Wilson explicitly for a consonant form of atonality, and many of Ben Johnston's early works, like the Sonata for Microtonal Piano and String Quartet No. 2, use serialism to elide the predominance of a tonal centre.

Alternatively, composers such as La Monte Young, Ben Johnston, James Tenney, Marc Sabat, Wolfgang von Schweinitz, and Catherine Lamb have sought a new kind tonality and harmony – one based on the perception and experience of sound, which not only allows for the more familiar consonant structures, but also extends them beyond the 5-limit into a nuanced and diverse network of relationships between tones.[13]

Yuri Landman devised a just intonation musical scale from an atonal prepared guitar playing technique based on adding a third bridge under the strings. When this bridge is positioned at nodal positions of the guitar strings' harmonic series, the volume of the instrument increases and the overtone becomes clear, having a consonant relation to the complementary opposed string part creating a harmonic multiphonic tone.[14]

Staff notation

Legend of the HE Accidentals
Fig. 1: Legend of the Helmholtz-Ellis Accidentals within the 23-limit.

Originally a system of notation to describe scales was devised by Hauptmann and modified by Helmholtz (1877); the starting note is presumed Pythagorean; a “+” is placed between if the next note is a just major third up, a “−” if it is a just minor third, among others; finally, subscript numbers are placed on the second note to indicate how many syntonic commas (81:80) to lower by.[15] For example, the Pythagorean major third on C is C+E (Play) while the just major third is C+E1 (Play). A similar system was devised by Carl Eitz and used in Barbour (1951) in which Pythagorean notes are started with and positive or negative superscript numbers are added indicating how many commas (81:80, syntonic comma) to adjust by.[16] For example, the Pythagorean major third on C is C−E0 while the just major third is C−E−1. An extension of this Pythagorean-based notation to higher primes is the Helmholtz / Ellis / Wolf / Monzo system[17] of ASCII symbols and prime-factor-power vectors described in Monzo's Tonalsoft Encyclopaedia.[17]

While these systems allow precise indication of intervals and pitches in print, more recently some composers have been developing notation methods for Just Intonation using the conventional five-line staff. James Tenney, amongst others, preferred to combine JI ratios with cents deviations from the equal tempered pitches, indicated in a legend or directly in the score, allowing performers to readily use electronic tuning devices if desired.[18]

Beginning in the 1960s, Ben Johnston had proposed an alternative approach, redefining the understanding of conventional symbols (the seven "white" notes, the sharps and flats) and adding further accidentals, each designed to extend the notation into higher prime limits. His notation "begins with the 16th-century Italian definitions of intervals and continues from there."[19] Johnston notation is based on a diatonic C Major scale tuned in JI (Fig. 4), in which the interval between D (9:8 above C) and A (5:3 above C) is one syntonic comma less than a Pythagorean perfect fifth 3:2. To write a perfect fifth, Johnston introduces a pair of symbols, + and − again, to represent this comma. Thus, a series of perfect fifths beginning with F would proceed C G D A+ E+ B+. The three conventional white notes A E B are tuned as Ptolemaic major thirds (5:4) above F C G respectively. Johnston introduces new symbols for the septimal (7 & 7 upside-down), undecimal ( & ), tridecimal (13 & 13 upside down), and further prime-number extensions to create an accidental based exact JI notation for what he has named "Extended Just Intonation" (Fig. 2 & Fig. 3).[6]: 77–88  For example, the Pythagorean major third on C is C-E+ while the just major third is C-E (Fig. 4).

Fig. 2: Staff notation of partials 1, 3, 5, 7, 11, 13, 17, and 19 on C[20] using Johnston notation Play.
Fig. 3: Just harmonic seventh chord (4:5:6:7:8) on C Play in Johnston notation. The size of the 7th is 968.826 cents: 48.77 cents lower than B tuned 9:5 above C.


In 2000–2004, Marc Sabat and Wolfgang von Schweinitz worked in Berlin to develop a different accidental-based method, the Extended Helmholtz-Ellis JI Pitch Notation.[21] Following the method of notation suggested by Helmholtz in his classic On the Sensations of Tone as a Physiological Basis for the Theory of Music, incorporating Ellis' invention of cents, and continuing Johnston's step into "Extended JI", Sabat and Schweinitz propose unique symbols (accidentals) for each prime dimension of harmonic space. In particular, the conventional flats, naturals and sharps define a Pythagorean series of perfect fifths. The Pythagorean pitches are then paired with new symbols that commatically alter them to represent various other partials of the harmonic series (Fig. 1). To facilitate quick estimation of pitches, cents indications may be added (e.g. downward deviations below and upward deviations above the respective accidental). A typically used convention is that cent deviations refer to the tempered pitch implied by the flat, natural, or sharp. A complete legend and fonts for the notation (see samples) are open source and available from the Plainsound Music Edition website.[22] For example, the Pythagorean major third on C is C-E while the just major third is C-E↓ (see Fig. 4 for "combined" symbol)

Fig. 4: Comparison of Helmholtz-Ellis JI Pitch Notation and Johnston Notation. Unaltered naturals in Helmholtz-Ellis may be omitted if desired.
Fig. 5: Just harmonic thirteenth chord (4:5:6:7:9:11:13) on G in Sagittal notation (with mnemonics)

Sagittal notation (from Latin sagitta, "arrow") is a system of arrow-like accidentals that indicate prime-number comma alterations to tones in a Pythagorean series. It is used to notate both just intonation and equal temperaments. The size of the symbol indicates the size of the alteration.[23]

The great advantage of such notation systems is that they allow the natural harmonic series to be precisely notated. At the same time, they provide some degree of practicality through their extension of staff notation, as traditionally trained performers may draw on their intuition for roughly estimating pitch height. This may be contrasted with the more abstract use of ratios for representing pitches in which the amount by which two pitches differ and the "direction" of change may not be immediately obvious to most musicians. One caveat is the requirement for performers to learn and internalize a (large) number of new graphical symbols. However, the use of unique symbols reduces harmonic ambiguity and the potential confusion arising from indicating only cent deviations.

Audio examples

  • Just intonation An A-major scale, followed by three major triads, and then a progression of fifths in just intonation.
  • Equal temperament An A-major scale, followed by three major triads, and then a progression of fifths in equal temperament. The beating in this file may be more noticeable after listening to the above file.
  • Equal temperament and just intonation compared A pair of major thirds, followed by a pair of full major chords. The first in each pair is in equal temperament; the second is in just intonation. Piano sound.
  • Equal temperament and just intonation compared with square waveform A pair of major chords. The first is in equal temperament; the second is in just intonation. The pair of chords is repeated with a transition from equal temperament to just intonation between the two chords. In the equal temperament chords a roughness or beating can be heard at about 4 Hz and about 0.8 Hz. In the just intonation triad, this roughness is absent. The square waveform makes the difference between equal temperament and just intonation more obvious.

See also

Notes

Sources

  1. ^ West, M.L. (May 1994). "The Babylonian musical notation and the Hurrian melodic texts". Music & Letters. 75 (2): 161–179. doi:10.1093/ml/75.2.161. JSTOR 737674.
  2. ^ a b Barker, Andrew (1989). Greek musical writings. Cambridge: Cambridge University Press. p. 350. ISBN 0521235936. OCLC 10022960.
  3. ^ "Qin tunings, some theoretical concepts". silkqin.com. Table 2: Relative positions of studs on the qin.
  4. ^ a b Campbell, Murray; Greated, Clive (2001) [1987]. The Musician's Guide to Acoustics (Reprint of 1st ed.). London, UK & New York, NY: Oxford University Press. pp. 172–173. ISBN 978-0-19-816505-7. {{cite book}}: Unknown parameter |last-author-amp= ignored (|name-list-style= suggested) (help)
  5. ^ Wright, David (2009). Mathematics and Music. Mathematical World. Vol. 28. Providence, Rhode Island: American Mathematical Society. pp. 140–141. ISBN 978-0-8218-4873-9.
  6. ^ a b Johnston, Ben (2006) [2003]. "A notation system for extended Just Intonation". In Gilmore, Bob (ed.). ‘Maximum Clarity’ and Other Writings on Music. Urbana and Chicago, IL: University of Illinois Press. p. 77–88. ISBN 978-0-252-03098-7.
  7. ^ Partch, Harry (1979). Genesis of a Music. pp. 165 & 73. ISBN 978-0-306-80106-8.
  8. ^ a b Danielou, Alain (1968). The Ragas of Northern Indian Music. London: Barrie & Rockliff. ISBN 0-214-15689-3.
  9. ^ Bagchee, Sandeep (1998). Nad: Understanding Raga Music. BPI (India) PVT Ltd. p. 23. ISBN 81-86982-07-8.
  10. ^ Danielou, Alain (1995). Music and the Power of Sound: The Influence of Tuning and Interval on Consciousness (Rep Sub ed.). Inner Traditions. ISBN 0892813369.
  11. ^ Danielou, Alain (1999). Introduction to the Study of Musical Scales. Oriental Book Reprint Corporation. ISBN 8170690986.
  12. ^ 1901–1974, Partch, Harry (1974). Genesis of a music : an account of a creative work, its roots and its fulfillments (Second edition, enlarged ed.). New York. ISBN 030671597X. OCLC 624666. {{cite book}}: |last= has numeric name (help)CS1 maint: location missing publisher (link) CS1 maint: multiple names: authors list (link)
  13. ^ "Plainsound Music Edition".
  14. ^ 3rd Bridge Helix Archived 2012-08-24 at the Wayback Machine by Yuri Landman on furious.com
  15. ^ von Helmholtz, Hermann (1885). On the Sensations of Tone as a Physiological Basis for the Theory of Music. Longmans, Green. p. 276. Note the use of the “+” between just major thirds, “−” between just minor thirds, “|” between Pythagorean minor thirds, and “±” between perfect fifths.
  16. ^ Benson, David J. (2007). Music: A Mathematical Offering. p. 172. ISBN 978-0-521-85387-3.
    who cites Eitz, Carl A. (1891). Das mathematisch-reine Tonsystem. Leipzig.{{cite book}}: CS1 maint: location missing publisher (link)
  17. ^ a b Monzo. "Helmholtz / Ellis / Wolf / Monzo system". Tonalsoft Encyclopaedia. tonalsoft.com.
  18. ^ Garland, Peter, ed. (1984). The Music of James Tenney. Soundings. Vol. 13. Santa Fe, New Mexico: Soundings Press. OCLC 11371167.
  19. ^ "Just Intonation Explained". KyleGann.com. Retrieved 28 February 2016.
  20. ^ Fonville, John (Summer 1991). "Ben Johnston's Extended Just Intonation: A guide for interpreters". Perspectives of New Music. 29 (2): 121, 106–137.
  21. ^ Stahnke, Manfred, ed. (2005). "The Extended Helmholtz-Ellis JI Pitch Notation: eine Notationsmethode für die natürlichen Intervalle". Mikrotöne und Mehr – Auf György Ligetis Hamburger Pfaden. Hamburg: von Bockel Verlag. ISBN 3-932696-62-X.
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  23. ^ Secor, George D.; Keenan, David C. (2006). "Sagittal: A Microtonal Notation System" (PDF). Xenharmonikôn: An Informal Journal of Experimental Music. Vol. 18. pp. 1–2 – via Sagittal.org.