In music from Western culture, a sixth is a musical interval encompassing six note letter names or staff positions (see Interval number for more details), and the major sixth is one of two commonly occurring sixths. It is qualified as major because it is the larger of the two. The major sixth spans nine semitones. Its smaller counterpart, the minor sixth, spans eight semitones. For example, the interval from C up to the nearest A is a major sixth. It is a sixth because it encompasses six note letter names (C, D, E, F, G, A) and six staff positions. It is a major sixth, not a minor sixth, because the note A lies nine semitones above C. Diminished and augmented sixths (such as C♯ to A♭ and C to A♯) span the same number of note letter names and staff positions, but consist of a different number of semitones (seven and ten, respectively).
Pythagorean major sixth Play (help·info), 3 Pythagorean perfect fifths on C.
The intervals from the tonic (keynote) in an upward direction to the second, to the third, to the sixth, and to the seventh scale degrees (of a major scale are called major.[2]
The major sixth is one of the consonances of common practice music, along with the unison, octave, perfect fifth, major and minor thirds, minor sixth, and (sometimes) the perfect fourth. In the common practice period, sixths were considered interesting and dynamic consonances along with their inverses the thirds. In medieval times theorists always described them as Pythagorean major sixths of 27/16 and therefore considered them dissonances unusable in a stable final sonority. We cannot know how major sixths actually were sung in the Middle Ages. In just intonation, the (5/3) major sixth is classed as a consonance of the 5-limit.
A major sixth is also used in transposing music to E-flat instruments, like the alto clarinet, alto saxophone, E-flat tuba, trumpet, natural horn, and alto horn when in E-flat, as a written C sounds like E-flat on those instruments.
Assuming close-position voicings for the following examples, the major sixth occurs in a first inversion minor triad, a second inversion major triad, and either inversion of a diminished triad. It also occurs in the second and third inversions of a dominant seventh chord.
Many intervals in a various tuning systems qualify to be called "major sixth," sometimes with additional qualifying words in the names. The following examples are sorted by increasing width.
In just intonation, the most common major sixth is the pitch ratio of 5:3 (play (help·info)), approximately 884 cents.
In 12-tone equal temperament, a major sixth is equal to nine semitones, exactly 900 cents, with a frequency ratio of the (9/12) root of 2 over 1.
Another major sixth is the Pythagorean major sixth with a ratio of 27:16, approximately 906 cents,[4] called "Pythagorean" because it can be constructed from three just perfect fifths (C-A = C-G-D-A = 702+702+702-1200=906). It is the inversion of the Pythagorean minor third, and corresponds to the interval between the 27th and the 16th harmonics. The 27:16 Pythagorean major sixth arises in the C Pythagorean major scale between F and D,[5][failed verification] as well as between C and A, G and E, and D and B. In the 5-limitjustly tuned major scale, it occurs between the 4th and 2nd degrees (in C major, between F and D). Play (help·info)
Another major sixth is the 12:7 septimal major sixth or supermajor sixth, the inversion of the septimal minor third, of approximately 933 cents.[4] The septimal major sixth (12/7) is approximated in 53-tone equal temperament by an interval of 41 steps, giving an actual frequency ratio of the (41/53) root of 2 over 1, approximately 928 cents.
The nineteenth subharmonic is a major sixth, A = 32/19 = 902.49 cents.
^Jan Haluska, The Mathematical Theory of Tone Systems (New York: Marcel Dekker; London: Momenta; Bratislava: Ister Science, 2004), p.xxiii. ISBN978-0-8247-4714-5. Septimal major sixth.
^Blake Neely, Piano For Dummies, second edition (Hoboken, NJ: Wiley Publishers, 2009), p. 201. ISBN978-0-470-49644-2.
^ abAlexander J. Ellis, Additions by the translator to Hermann L. F. Von Helmholtz (2007). On the Sensations of Tone, p.456. ISBN978-1-60206-639-7.
^Oscar Paul, A Manual of Harmony for Use in Music-Schools and Seminaries and for Self-Instruction, trans. Theodore Baker (New York: G. Schirmer, 1885), p. 165.
Further reading
Duckworth, William (1996). [untitled chapter][verification needed] In Sound and Light: La Monte Young, Marian Zazeela, edited by William Duckworth and Richard Fleming, p. 167. Bucknell Review 40, no. 1. Lewisburg [Pa.]: Bucknell University Press; London and Cranbury, NJ: Associated University Presses. ISBN9780838753460. Paperback reprint 2006, ISBN0-8387-5738-3. [septimal][clarification needed]
December 31, 2022
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In music from Western culture a sixth is a musical interval encompassing six note letter names or staff positions see Interval number for more details and the major sixth is one of two commonly occurring sixths It is qualified as major because it is the larger of the two The major sixth spans nine semitones Its smaller counterpart the minor sixth spans eight semitones For example the interval from C up to the nearest A is a major sixth It is a sixth because it encompasses six note letter names C D E F G A and six staff positions It is a major sixth not a minor sixth because the note A lies nine semitones above C Diminished and augmented sixths such as C to A and C to A span the same number of note letter names and staff positions but consist of a different number of semitones seven and ten respectively major sixthInverseminor thirdNameOther namesseptimal major sixth supermajor sixth major hexachord greater hexachord hexachordon maiusAbbreviationM6SizeSemitones9Interval class3Just interval5 3 12 7 septimal 27 16 1 CentsEqual temperament900Just intonation884 933 906Major sixth Play help info Pythagorean major sixth Play help info 3 Pythagorean perfect fifths on C The intervals from the tonic keynote in an upward direction to the second to the third to the sixth and to the seventh scale degrees of a major scale are called major 2 A commonly cited example of a melody featuring the major sixth as its opening is My Bonnie Lies Over the Ocean 3 The major sixth is one of the consonances of common practice music along with the unison octave perfect fifth major and minor thirds minor sixth and sometimes the perfect fourth In the common practice period sixths were considered interesting and dynamic consonances along with their inverses the thirds In medieval times theorists always described them as Pythagorean major sixths of 27 16 and therefore considered them dissonances unusable in a stable final sonority We cannot know how major sixths actually were sung in the Middle Ages In just intonation the 5 3 major sixth is classed as a consonance of the 5 limit A major sixth is also used in transposing music to E flat instruments like the alto clarinet alto saxophone E flat tuba trumpet natural horn and alto horn when in E flat as a written C sounds like E flat on those instruments Assuming close position voicings for the following examples the major sixth occurs in a first inversion minor triad a second inversion major triad and either inversion of a diminished triad It also occurs in the second and third inversions of a dominant seventh chord The septimal major sixth 12 7 is approximated in 53 tone equal temperament by an interval of 41 steps or 928 cents Major sixth equal temperament source source The file plays middle C followed by A a tone 900 cents sharper than C followed by both tones together Problems playing this file See media help Contents 1 Frequency proportions 2 See also 3 References 4 Further readingFrequency proportions EditMany intervals in a various tuning systems qualify to be called major sixth sometimes with additional qualifying words in the names The following examples are sorted by increasing width In just intonation the most common major sixth is the pitch ratio of 5 3 play help info approximately 884 cents In 12 tone equal temperament a major sixth is equal to nine semitones exactly 900 cents with a frequency ratio of the 9 12 root of 2 over 1 Another major sixth is the Pythagorean major sixth with a ratio of 27 16 approximately 906 cents 4 called Pythagorean because it can be constructed from three just perfect fifths C A C G D A 702 702 702 1200 906 It is the inversion of the Pythagorean minor third and corresponds to the interval between the 27th and the 16th harmonics The 27 16 Pythagorean major sixth arises in the C Pythagorean major scale between F and D 5 failed verification as well as between C and A G and E and D and B In the 5 limit justly tuned major scale it occurs between the 4th and 2nd degrees in C major between F and D Play help info Another major sixth is the 12 7 septimal major sixth or supermajor sixth the inversion of the septimal minor third of approximately 933 cents 4 The septimal major sixth 12 7 is approximated in 53 tone equal temperament by an interval of 41 steps giving an actual frequency ratio of the 41 53 root of 2 over 1 approximately 928 cents The nineteenth subharmonic is a major sixth A 32 19 902 49 cents See also EditMusical tuning List of meantone intervals Sixth chordReferences Edit Jan Haluska The Mathematical Theory of Tone Systems New York Marcel Dekker London Momenta Bratislava Ister Science 2004 p xxiii ISBN 978 0 8247 4714 5 Septimal major sixth Bruce Benward and Marilyn Nadine Saker Music In Theory and Practice Vol I seventh edition full citation needed 2003 p 52 ISBN 978 0 07 294262 0 Blake Neely Piano For Dummies second edition Hoboken NJ Wiley Publishers 2009 p 201 ISBN 978 0 470 49644 2 a b Alexander J Ellis Additions by the translator to Hermann L F Von Helmholtz 2007 On the Sensations of Tone p 456 ISBN 978 1 60206 639 7 Oscar Paul A Manual of Harmony for Use in Music Schools and Seminaries and for Self Instruction trans Theodore Baker New York G Schirmer 1885 p 165 Further reading EditDuckworth William 1996 untitled chapter verification needed In Sound and Light La Monte Young Marian Zazeela edited by William Duckworth and Richard Fleming p 167 Bucknell Review 40 no 1 Lewisburg Pa Bucknell University Press London and Cranbury NJ Associated University Presses ISBN 9780838753460 Paperback reprint 2006 ISBN 0 8387 5738 3 septimal clarification needed Retrieved from https en wikipedia org w index php title Major sixth amp oldid 1117874642, wikipedia, wiki, book, books, library,
