In music theory, the circle of fifths is a way of organizing the 12 chromatic pitches as a sequence of perfect fifths. (This is strictly true in the standard 12-tone equal temperament system — using a different system requires one interval of

diminished sixth In classical music from Western culture, a diminished sixth () is an interval produced by narrowing a minor sixth by a chromatic semitone.Benward & Saker (2003). ''Music: In Theory and Practice, Vol. I'', p.54. . Specific example of an d6 not ...

to be treated as a fifth). If C is chosen as a starting point, the sequence is: C, G, D, A, E, B (=C), F (=G), C (=D), A, E, B, F. Continuing the pattern from F returns the sequence to its starting point of C. This order places the most closely related

key signature In Western musical notation, a key signature is a set of sharp (), flat (), or rarely, natural () symbols placed on the staff at the beginning of a section of music. The initial key signature in a piece is placed immediately after the clef a ...

s adjacent to one another. It is usually illustrated in the form of a circle.

Definition

The circle of fifths organizes pitches in a sequence of perfect fifths, generally shown as a circle with the pitches (and their corresponding keys) in a clockwise progression. Musicians and composers often use the circle of fifths to describe the musical relationships between pitches. Its design is helpful in composing and harmonizing

melodies A melody (from Greek μελῳδία, ''melōidía'', "singing, chanting"), also tune, voice or line, is a linear succession of musical tones that the listener perceives as a single entity. In its most literal sense, a melody is a combinati ...

, building

chords Chord may refer to: * Chord (music), an aggregate of musical pitches sounded simultaneously ** Guitar chord a chord played on a guitar, which has a particular tuning * Chord (geometry), a line segment joining two points on a curve * Chord ( ...

, and modulating to different keys within a composition. Using the system of just intonation, a perfect fifth consists of two pitches with a frequency ratio of 3:2, but generating twelve successive perfect fifths in this way does not result in a return to the

pitch class In music, a pitch class (p.c. or pc) is a set of all pitches that are a whole number of octaves apart; for example, the pitch class C consists of the Cs in all octaves. "The pitch class C stands for all possible Cs, in whatever octave positio ...

of the starting note. To adjust for this, instruments are generally tuned with the equal temperament system. Twelve equal-temperament fifths lead to a note exactly seven octaves above the initial tone—this results in a perfect fifth that is equivalent to seven equal-temperament

semitone A semitone, also called a half step or a half tone, is the smallest musical interval commonly used in Western tonal music, and it is considered the most dissonant when sounded harmonically. It is defined as the interval between two adjacent no ...

s. The top of the circle shows the key of C Major, with no sharps or

flats Flat or flats may refer to: Architecture * Flat (housing), an apartment in the United Kingdom, Ireland, Australia and other Commonwealth countries Arts and entertainment * Flat (music), a symbol () which denotes a lower pitch * Flat (soldier), ...

. Proceeding clockwise, the pitches ascend by fifths. The key signatures associated with those pitches also change: the key of G has one sharp, the key of D has 2 sharps, and so on. Similarly, proceeding counterclockwise from the top of the circle, the notes change by descending fifths and the key signatures change accordingly: the key of F has one flat, the key of B has 2 flats, and so on. Some keys (at the bottom of the circle) can be notated either in sharps or in flats. Starting at any pitch and ascending by a fifth generates all twelve tones before returning to the beginning pitch class (a pitch class consists of all of the notes indicated by a given letter regardless of octave—all "C"s, for example, belong to the same pitch class). Moving counterclockwise, the pitches descend by a fifth, but ascending by a

perfect fourth A fourth is a musical interval encompassing four staff positions in the music notation of Western culture, and a perfect fourth () is the fourth spanning five semitones (half steps, or half tones). For example, the ascending interval from C to ...

will lead to the same note an octave higher (therefore in the same pitch class). Moving counter-clockwise from C could be thought of as descending by a fifth to F, or ascending by a fourth to F.

Structure and use

Diatonic key signatures

Each of the twelve pitches can serve as the tonic of a major or minor key, and each of these keys will have a diatonic scale associated with it. The circle diagram shows the number of sharps or flats in each

, with the major key indicated by a capital letter and the minor key indicated by a lower-case letter. Major and minor keys that have the same key signature are referred to as ''relative major'' and ''relative minor'' of one another.

Modulation and chord progression

Tonal music Tonality is the arrangement of pitches and/or chords of a musical work in a hierarchy of perceived relations, stabilities, attractions and directionality. In this hierarchy, the single pitch or triadic chord with the greatest stability is cal ...

often modulates to a new tonal center whose key signature differs from the original by only one flat or sharp. These closely-related keys are a fifth apart from each other and are therefore adjacent in the circle of fifths.

Chord progression In a musical composition, a chord progression or harmonic progression (informally chord changes, used as a plural) is a succession of chords. Chord progressions are the foundation of harmony in Western musical tradition from the common practice ...

s also often move between chords whose roots are related by perfect fifth, making the circle of fifths useful in illustrating the "harmonic distance" between chords. The circle of fifths is used to organize and describe the

harmonic function In mathematics, mathematical physics and the theory of stochastic processes, a harmonic function is a twice continuously differentiable function f: U \to \mathbb R, where is an open subset of that satisfies Laplace's equation, that is, : \f ...

. Chords can progress in a pattern of ascending perfect fourths (alternately viewed as descending perfect fifths) in "functional succession". This can be shown "...by the circle of fifths (in which, therefore, scale degree II is closer to the dominant than scale degree IV)". In this view the tonic is considered the end point of a

chord progression In a musical composition, a chord progression or harmonic progression (informally chord changes, used as a plural) is a succession of chords. Chord progressions are the foundation of harmony in Western musical tradition from the common practice ...

derived from the circle of fifths. Ii-V-I turnaround in C

According to

Richard Franko Goldman Richard Franko Goldman (December 7, 1910 – January 19, 1980) was a conductor, educator, author, music critic, and composer. Born Richard Henry Maibrunn Goldman (Maibrunn being his mother's family name), he adopted the same middle name as ...

's ''Harmony in Western Music'', "the IV chord is, in the simplest mechanisms of diatonic relationships, at the greatest distance from I. In terms of the escendingcircle of fifths, it leads away from I, rather than toward it." He states that the progression I–ii–V–I (an

authentic cadence In Western musical theory, a cadence (Latin ''cadentia'', "a falling") is the end of a phrase in which the melody or harmony creates a sense of full or partial resolution, especially in music of the 16th century onwards.Don Michael Randel (199 ...

) would feel more final or resolved than I–IV–I (a

plagal cadence In Western musical theory, a cadence (Latin ''cadentia'', "a falling") is the end of a phrase in which the melody or harmony creates a sense of full or partial resolution, especially in music of the 16th century onwards.Don Michael Randel (1999 ...

). Goldman concurs with Nattiez, who argues that "the chord on the fourth degree appears long before the chord on II, and the subsequent final I, in the progression I–IV–vii^o–iii–vi–ii–V–I", and is farther from the tonic there as well. (In this and related articles, upper-case Roman numerals indicate major triads while lower-case Roman numerals indicate minor triads.)

Circle closure in non-equal tuning systems

Using the exact 3:2 ratio of frequencies to define a perfect fifth ( just intonation) does not quite result in a return to the

of the starting note after going around the circle of fifths. Equal temperament tuning produces fifths that return to a tone exactly seven octaves above the initial tone and makes the frequency ratio of each half step the same. An equal-tempered fifth has a frequency ratio of 2^7/12:1 (or about 1.498307077:1), approximately two cents narrower than a justly tuned fifth at a ratio of 3:2. Ascending by justly tuned fifths fails to close the circle by an excess of approximately 23.46 cents, roughly a quarter of a

, an interval known as the

Pythagorean comma In musical tuning, the Pythagorean comma (or ditonic comma), named after the ancient mathematician and philosopher Pythagoras, is the small interval (or comma) existing in Pythagorean tuning between two enharmonically equivalent notes such as ...

. In Pythagorean tuning, this problem is solved by markedly shortening the

width Length is a measure of distance. In the International System of Quantities, length is a quantity with dimension distance. In most systems of measurement a base unit for length is chosen, from which all other units are derived. In the Intern ...

of one of the twelve fifths, which makes it severely

dissonant In music, consonance and dissonance are categorizations of simultaneous or successive Sound, sounds. Within the Western tradition, some listeners associate consonance with sweetness, pleasantness, and acceptability, and dissonance with harshness ...

. This anomalous fifth is called the

wolf fifth In music theory, the wolf fifth (sometimes also called Procrustean fifth, or imperfect fifth) Paul, Oscar (1885). A manual of harmony for use in music-schools and seminaries and for self-instruction', p.165. Theodore Baker, trans. G. Schirmer. ...

– a humorous reference to a wolf howling an off-pitch note. The

quarter-comma meantone Quarter-comma meantone, or -comma meantone, was the most common meantone temperament in the sixteenth and seventeenth centuries, and was sometimes used later. In this system the perfect fifth is flattened by one quarter of a syntonic comma (81:80 ...

tuning system uses eleven fifths slightly narrower than the equally tempered fifth, and requires a much wider and even more dissonant wolf fifth to close the circle. More complex tuning systems based on just intonation, such as

5-limit tuning Five-limit tuning, 5-limit tuning, or 5-prime-limit tuning (not to be confused with 5-odd-limit tuning), is any system for tuning a musical instrument that obtains the frequency of each note by multiplying the frequency of a given reference note ...

, use at most eight justly tuned fifths and at least three non-just fifths (some slightly narrower, and some slightly wider than the just fifth) to close the circle. Other tuning systems use up to 53 tones (the original 12 tones and 42 more between them) in order to close the circle of fifths.

History

The circle of fifths developed in the late 1600s and early 1700s to theorize the modulation of the Baroque era (see ). The first circle of fifths diagram appears in the ''Grammatika'' (1677) of the composer and theorist Nikolay Diletsky, who intended to present music theory as a tool for composition. It was "the first of its kind, aimed at teaching a Russian audience how to write Western-style polyphonic compositions." A circle of fifths diagram was independently created by German composer and theorist Johann David Heinichen in his ''Neu erfundene und gründliche Anweisung'' (1711), which he called the "Musical Circle" (German: ''Musicalischer Circul''). This was also published in his ''Der General-Bass in der Composition'' (1728). Heinichen placed the relative minor key next to the major key, which did not reflect the actual proximity of keys.

Johann Mattheson Johann Mattheson (28 September 1681 – 17 April 1764) was a German composer, singer, writer, lexicographer, diplomat and music theorist. Early life and career The son of a prosperous tax collector, Mattheson received a broad liberal education ...

(1735) and others attempted to improve this— David Kellner (1737) proposed having the major keys on one circle, and the relative minor keys on a second, inner circle. This was later developed into

chordal space Music theorists have often used graphs, tilings, and geometrical spaces to represent the relationship between chords. We can describe these spaces as ''chord spaces'' or ''chordal spaces'', though the terms are relatively recent in origin. His ...

, incorporating the parallel minor as well. Some sources imply that the circle of fifths was known in antiquity, by

Pythagoras Pythagoras of Samos ( grc, Πυθαγόρας ὁ Σάμιος, Pythagóras ho Sámios, Pythagoras the Samian, or simply ; in Ionian Greek; ) was an ancient Ionian Greek philosopher and the eponymous founder of Pythagoreanism. His politi ...

. This is a misunderstanding and an anachronism. Tuning by fifths (so-called Pythagorean tuning) dates to Ancient Mesopotamia; see , though they did not extend this to a twelve note scale, stopping at seven. The

was calculated by

Euclid Euclid (; grc-gre, Εὐκλείδης; BC) was an ancient Greek mathematician active as a geometer and logician. Considered the "father of geometry", he is chiefly known for the '' Elements'' treatise, which established the foundations of ...

and by Chinese mathematicians (in the ''

Huainanzi The ''Huainanzi'' is an ancient Chinese text that consists of a collection of essays that resulted from a series of scholarly debates held at the court of Liu An, Prince of Huainan, sometime before 139. The ''Huainanzi'' blends Daoist, Confuci ...

''); see . Thus, it was known in antiquity that a cycle of twelve fifths was almost exactly seven octaves (more practically, alternating ascending fifths and descending fourths was almost exactly an octave). However, this was theoretical knowledge, and was not used to construct a repeating twelve-tone scale, nor to modulate. This was done later in

meantone temperament Meantone temperament is a musical temperament, that is a tuning system, obtained by narrowing the fifths so that their ratio is slightly less than 3:2 (making them ''narrower'' than a perfect fifth), in order to push the thirds closer to pure. M ...

and

twelve-tone 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 ...

, which allowed modulation while still being in tune, but did not develop in Europe until about 1500.

Use

In musical pieces from the Baroque music era and the Classical era of music and in Western

popular music Popular music is music with wide appeal that is typically distributed to large audiences through the music industry. These forms and styles can be enjoyed and performed by people with little or no musical training.Popular Music. (2015). ''Fu ...

traditional music Folk music is a music genre that includes traditional folk music and the contemporary genre that evolved from the former during the 20th-century folk revival. Some types of folk music may be called world music. Traditional folk music has ...

and

folk music Folk music is a music genre that includes traditional folk music and the contemporary genre that evolved from the former during the 20th-century folk revival. Some types of folk music may be called world music. Traditional folk music has b ...

, when pieces or songs modulate to a new key, these modulations are often associated with the circle of fifths. In practice, compositions rarely make use of the entire circle of fifths. More commonly, composers make use of "the compositional idea of the 'cycle' of 5ths, when music moves consistently through a smaller or larger segment of the tonal structural resources which the circle abstractly represents." The usual practice is to derive the circle of fifths progression from the seven tones of the diatonic scale, rather from the full range of twelve tones present in the chromatic scale. In this diatonic version of the circle, one of the fifths is not a true fifth: it is a tritone (or a diminished fifth), e.g. between F and B in the "natural" diatonic scale (i.e. without sharps or flats). Here is how the circle of fifths derives, through permutation from the diatonic major scale: And from the (natural) minor scale: The following is the basic sequence of chords that can be built over the major bass-line: And over the minor: Adding sevenths to the chords creates a greater sense of forward momentum to the harmony:

Baroque era

According to

Richard Taruskin Richard Filler Taruskin (April 2, 1945 – July 1, 2022) was an American musicologist and music critic who was among the leading and most prominent music historians of his generation. The breadth of his scrutiny into source material as well as ...

Arcangelo Corelli Arcangelo Corelli (, also , , ; 17 February 1653 – 8 January 1713) was an Italian composer and violinist of the Baroque era. His music was key in the development of the modern genres of sonata and concerto, in establishing the preeminence of th ...

was the most influential composer to establish the pattern as a standard harmonic "trope": "It was precisely in Corelli's time, the late seventeenth century, that the circle of fifths was being 'theorized' as the main propellor of harmonic motion, and it was Corelli more than any one composer who put that new idea into telling practice." The circle of fifths progression occurs frequently in the music of

J. S. Bach Johann Sebastian Bach (28 July 1750) was a German composer and musician of the late Baroque period. He is known for his orchestral music such as the '' Brandenburg Concertos''; instrumental compositions such as the Cello Suites; keyboard wo ...

. In the following, from ''Jauchzet Gott in allen Landen'', BWV 51, even when the solo bass line implies rather than states the chords involved: Handel uses a circle of fifths progression as the basis for the

Passacaglia The passacaglia (; ) is a musical form that originated in early seventeenth-century Spain and is still used today by composers. It is usually of a serious character and is often based on a bass- ostinato and written in triple metre. Origin The t ...

movement from his Harpsichord suite No. 6 in G minor. Baroque composers learnt to enhance the "propulsive force" of the harmony engendered by the circle of fifths "by adding sevenths to most of the constituent chords." "These sevenths, being dissonances, create the need for resolution, thus turning each progression of the circle into a simultaneous reliever and re-stimulator of harmonic tension... Hence harnessed for expressive purposes." Striking passages that illustrate the use of sevenths occur in the aria "Pena tiranna" in Handel's 1715 opera '' Amadigi di Gaula'': – and in Bach's keyboard arrangement of

Alessandro Marcello Alessandro Ignazio Marcello (; 1 February 1673 – 19 June 1747) was an Italian nobleman and composer. Biography Born in Venice, Marcello was the son of a senator, and as a nobleman, enjoyed a comfortable life that gave him the freedom to ...

's Concerto for Oboe and Strings.

Nineteenth century

During the nineteenth century, composers made use of the circle of fifths to enhance the expressive character of their music.

Franz Schubert Franz Peter Schubert (; 31 January 179719 November 1828) was an Austrian composer of the late Classical and early Romantic eras. Despite his short lifetime, Schubert left behind a vast ''oeuvre'', including more than 600 secular vocal wo ...

's poignant Impromptu in E flat major, D 899, contains such a passage: – as does the

Intermezzo In music, an intermezzo (, , plural form: intermezzi), in the most general sense, is a composition which fits between other musical or dramatic entities, such as acts of a play or movements of a larger musical work. In music history, the term ha ...

movement from

Mendelssohn Jakob Ludwig Felix Mendelssohn Bartholdy (3 February 18094 November 1847), born and widely known as Felix Mendelssohn, was a German composer, pianist, organist and conductor of the early Romantic period. Mendelssohn's compositions include sym ...

's String Quartet No.2: Robert Schumann's evocative "Child falling asleep" from his ''

Kinderszenen ' (, "Scenes from Childhood"), Op. 15, by Robert Schumann, is a set of thirteen pieces of music for piano written in 1838. History and description Schumann wrote 30 movements for this work but chose 13 for the final version. The unused mo ...

'' springs a surprise at the end of the progression: the piece ends on an A minor chord, instead of the expected tonic E minor. In

Wagner Wilhelm Richard Wagner ( ; ; 22 May 181313 February 1883) was a German composer, theatre director, polemicist, and conductor who is chiefly known for his operas (or, as some of his mature works were later known, "music dramas"). Unlike most op ...

's opera, ''

Götterdämmerung ' (; ''Twilight of the Gods''), WWV 86D, is the last in Richard Wagner's cycle of four music dramas titled (''The Ring of the Nibelung'', or ''The Ring Cycle'' or ''The Ring'' for short). It received its premiere at the on 17 August 1876, as ...

'', a cycle of fifths progression occurs in the music which transitions from the end of the prologue into the first scene of Act 1, set in the imposing hall of the wealthy Gibichungs. "Status and reputation are written all over the motifs assigned to Gunther", chief of the Gibichung clan:

Jazz and popular music

The enduring popularity of the circle of fifths as both a form-building device and as an expressive musical trope is evident in the number of "

standard Standard may refer to: Symbols * Colours, standards and guidons, kinds of military signs * Standard (emblem), a type of a large symbol or emblem used for identification Norms, conventions or requirements * Standard (metrology), an object th ...

" popular songs composed during the twentieth century. It is also favored as a vehicle for improvisation by jazz musicians. *

Bart Howard Bart Howard (born Howard Joseph Gustafson, June 1, 1915 – February 21, 2004) was an American composer and songwriter, most notably of the jazz standard " Fly Me to the Moon", which has been performed by Kaye Ballard, Judy Garland, Frank Sinatra, ...

, "

Fly Me to the Moon "Fly Me to the Moon", originally titled "In Other Words", is a song written in 1954 by Bart Howard. The first recording of the song was made in 1954 by Kaye Ballard. Frank Sinatra's 1964 version was closely associated with the Apollo missions ...

" *

Jerome Kern Jerome David Kern (January 27, 1885 – November 11, 1945) was an American composer of musical theatre and popular music. One of the most important American theatre composers of the early 20th century, he wrote more than 700 songs, used in ove ...

, " All the Things You Are" *

Ray Noble Raymond Stanley Noble (17 December 1903 – 2 April 1978) was an English jazz and big band musician, who was a bandleader, composer and arranger, as well as a radio host, television and film comedian and actor; he also performed in the United ...

, "

Cherokee The Cherokee (; chr, ᎠᏂᏴᏫᏯᎢ, translit=Aniyvwiyaʔi or Anigiduwagi, or chr, ᏣᎳᎩ, links=no, translit=Tsalagi) are one of the indigenous peoples of the Southeastern Woodlands of the United States. Prior to the 18th century, t ...

." Many jazz musicians have found this particularly challenging as the

middle eight The 32- bar form, also known as the AABA song form, American popular song form and the ballad form, is a song structure commonly found in Tin Pan Alley songs and other American popular music, especially in the first half of the 20th century. ...

progresses so rapidly through the circle, "creating a series of II–V–I progressions that temporarily pass through several tonalities." * Kosmo, Prevert and Mercer, " Autumn Leaves" *

The Beatles The Beatles were an English rock band, formed in Liverpool in 1960, that comprised John Lennon, Paul McCartney, George Harrison and Ringo Starr. They are regarded as the most influential band of all time and were integral to the developmen ...

, "

You Never Give Me Your Money "You Never Give Me Your Money" is a song by the English rock band the Beatles. It was written by Paul McCartney (and credited to Lennon–McCartney) and documented the financial and personal difficulties facing the band. The song is the fir ...

" *

Mike Oldfield Mike may refer to: Animals * Mike (cat), cat and guardian of the British Museum * Mike the Headless Chicken, chicken that lived for 18 months after his head had been cut off * Mike (chimpanzee), a chimpanzee featured in several books and document ...

, "

Incantations An incantation, a spell, a charm, an enchantment or a bewitchery, is a magical formula intended to trigger a magical effect on a person or objects. The formula can be spoken, sung or chanted. An incantation can also be performed during ceremo ...

" * Carlos Santana, "

Europa (Earth's Cry Heaven's Smile) "Europa (Earth's Cry Heaven's Smile)" is an instrumental from the Santana album '' Amigos'', written by Carlos Santana and Tom Coster. It is one of Santana's most popular compositions and it reached the top in the Spanish Singles Chart in July ...

" * Gloria Gaynor, "

I Will Survive "I Will Survive" is a song by American singer Gloria Gaynor, released in October 1978 as the second single from her sixth album, '' Love Tracks'' (1978). It was written by Freddie Perren and Dino Fekaris. A top-selling song, it is a popular di ...

" * Pet Shop Boys, "

It's a Sin "It's a Sin" is a song by English synth-pop duo Pet Shop Boys from their second studio album, ''Actually'' (1987). Written by Chris Lowe and Neil Tennant, the song was released on 15 June 1987 as the album's lead single. It became the duo's ...

" * Donna Summer, " Love to Love you, Baby"

Related concepts

Diatonic circle of fifths

The diatonic circle of fifths is the circle of fifths encompassing only members of the diatonic scale. Therefore, it contains a diminished fifth, in C major between B and F. See structure implies multiplicity. The

circle progression A circle is a shape consisting of all points in a plane that are at a given distance from a given point, the centre. Equivalently, it is the curve traced out by a point that moves in a plane so that its distance from a given point is const ...

is commonly a circle of fifths through the diatonic chords, including one

diminished chord In music theory, a diminished triad (also known as the minor flatted fifth) is a triad consisting of two minor thirds above the root. It is a minor triad with a lowered ( flattened) fifth. When using chord symbols, it may be indicated by the ...

. A circle progression in C major with chords I–IV–vii^o–iii–vi–ii–V–I is shown below. :

Chromatic circle

The circle of fifths is closely related to the

chromatic circle The chromatic circle is a clock diagram for displaying relationships among the 12 equal-tempered pitch classes making up the familiar chromatic scale on a circle. Explanation If one starts on any equal-tempered pitch and repeatedly ascends by ...

, which also arranges the twelve equal-tempered pitch classes in a circular ordering. A key difference between the two circles is that the

can be understood as a continuous space where every point on the circle corresponds to a conceivable

, and every conceivable pitch class corresponds to a point on the circle. By contrast, the circle of fifths is fundamentally a ''discrete'' structure, and there is no obvious way to assign pitch classes to each of its points. In this sense, the two circles are mathematically quite different. However, the twelve equal-tempered

es can be represented by the

cyclic group In group theory, a branch of abstract algebra in pure mathematics, a cyclic group or monogenous group is a group, denoted C''n'', that is generated by a single element. That is, it is a set of invertible elements with a single associative bina ...

of order twelve, or equivalently, the residue classes modulo twelve,

\mathbb/12\mathbb

. The group

\mathbb_

has four generators, which can be identified with the ascending and descending semitones and the ascending and descending perfect fifths. The semitonal generator gives rise to the

while the perfect fifth gives rise to the circle of fifths.

Relation with chromatic scale

The circle of fifths, or fourths, may be mapped from the

chromatic scale The chromatic scale (or twelve-tone scale) is a set of twelve pitches (more completely, pitch classes) used in tonal music, with notes separated by the interval of a semitone. Chromatic instruments, such as the piano, are made to produce th ...

by multiplication, and vice versa. To map between the circle of fifths and the chromatic scale (in

integer notation In music, a pitch class (p.c. or pc) is a set of all pitches that are a whole number of octaves apart; for example, the pitch class C consists of the Cs in all octaves. "The pitch class C stands for all possible Cs, in whatever octave posit ...

) multiply by 7 ( M7), and for the circle of fourths multiply by 5 (P5). Here is a demonstration of this procedure. Start off with an ordered 12-tuple (

tone row In music, a tone row or note row (german: Reihe or '), also series or set, is a non-repetitive ordering of a set of pitch-classes, typically of the twelve notes in musical set theory of the chromatic scale, though both larger and smaller sets ...

) of integers : (0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11) representing the notes of the chromatic scale: 0 = C, 2 = D, 4 = E, 5 = F, 7 = G, 9 = A, 11 = B, 1 = C, 3 = D, 6 = F, 8 = G, 10 = A. Now multiply the entire 12-tuple by 7: : (0, 7, 14, 21, 28, 35, 42, 49, 56, 63, 70, 77) and then apply a modulo 12 reduction to each of the numbers (subtract 12 from each number as many times as necessary until the number becomes smaller than 12): : (0, 7, 2, 9, 4, 11, 6, 1, 8, 3, 10, 5) which is equivalent to : (C, G, D, A, E, B, F, C, G, D, A, F) which is the circle of fifths. Note that this is enharmonically equivalent to: : (C, G, D, A, E, B, G, D, A, E, B, F).

Enharmonic equivalents, theoretical keys, and the spiral of fifths

Equal temperament tuning does not use the exact 3:2 ratio of frequencies that defines a perfect fifth, wheras the system of just intonation uses this exact ratio. Ascending by fifths in equal temperament leads to a return to the starting pitch class—starting with a C and ascending by fifths leads to another C after twelve iterations. This does not occur if an exact 3:2 ratio is used (just intonation). The adjustment made in equal temperament tuning is called the

. Because of this difference, pitches that are enharmonically equivalent in equal temperament tuning (e.g., D and C) are not equivalent when using just intonation. In just intonation the sequence of fifths can therefore be visualized as a spiral, not a circle—a sequence of twelve fifths results in a "

comma pump In music theory, a comma pump (or comma drift) is a sequence of notes, often a chord progression, where the pitch shifts up or down by a comma (a small interval) every time the sequence is traversed. Comma pumps often arise from a sequence of just ...

" by the Pythagorean comma, visualized as going up a level in the spiral. See also . Without enharmonic equivalence, continuing a sequence of fifths results in notes with double accidentals (double sharps or double flats). When using equal temperament, these can be replaced by an enharmonically equivalent note. Keys with double sharps or flats in the key signatures are called

theoretical key In music theory, a theoretical key is a key whose key signature would have at least one double-flat () or double-sharp (). Double-flats and double-sharps are often used as accidentals, but placing them in the key signature (in music that use ...

s—their use is extremely rare. Notation in these cases is not standardized. \relative c' The default behaviour of

LilyPond LilyPond is a computer program and file format for music engraving. One of LilyPond's major goals is to produce scores that are engraved with traditional layout rules, reflecting the era when scores were engraved by hand. LilyPond is cross-pl ...

(pictured above) writes single sharps or flats in the circle-of-fifths order, before proceeding to double sharps or flats. This is the format used in

John Foulds John Herbert Foulds (; 2 November 188025 April 1939) was an English cellist and composer of classical music. He was largely self-taught as a composer, and belongs among the figures of the English Musical Renaissance. A successful composer of li ...

' ''A World Requiem'', Op. 60, which ends with the key signature of G major, as displayed above. The sharps in the key signature of G major here proceed C, G, D, A, E, B, F. Single sharps or flats in the key signature are sometimes repeated as a courtesy, e.g. Max Reger's ''Supplement to the Theory of Modulation'', which contains D minor key signatures o
pp. 42–45
These have a B at the start and also a B at the end (with a double-flat symbol), going B, E, A, D, G, C, F, B. The convention of LilyPond and Foulds would suppress the initial B. Sometimes the double signs are written at the beginning of the key signature, followed by the single signs. For example, the F key signature is notated as B, E, A, D, G, C, F. This convention is used by Victor Ewald, by the program

Finale (software) Finale is a proprietary music notation software developed and released by MakeMusic for Microsoft Windows and macOS since 1988. Functionality Finale's tools are organized into multiple hierarchically organized palettes, and the corresponding ...

, and by some theoretical works.

Notes

References

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External links

Decoding the Circle of Vths

Interactive Circle of Fifths

Interactive circle of fifths for guitarists

An introduction to the circle of fifths

This is your basic guide to understand how the Circle of Fifths works
{{DEFAULTSORT:Circle Of Fifths Harmony Musical keys Tonality