Diminished fourth: Difference between revisions
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Whygreen44 (talk | contribs) Added Pythagorean tuning to the Infobox |
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semitones = 4| |
semitones = 4| |
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interval_class = 4| |
interval_class = 4| |
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just_interval = 32:25<ref name="Haluska">Haluska, Jan (2003). ''The Mathematical Theory of Tone Systems'', p.xxv. {{ISBN|0-8247-4714-3}}. Classic diminished fourth.</ref>| |
just_interval = 32:25<ref name="Haluska">Haluska, Jan (2003). ''The Mathematical Theory of Tone Systems'', p.xxv. {{ISBN|0-8247-4714-3}}. Classic diminished fourth.</ref>, 8192:6561| |
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cents_equal_temperament = 400| |
cents_equal_temperament = 400| |
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cents_24T_equal_temperament = 400| |
cents_24T_equal_temperament = 400| |
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cents_just_intonation = 427 |
cents_just_intonation = 427, 384 |
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Revision as of 05:14, 27 October 2017
| Inverse | augmented fifth |
|---|---|
| Name | |
| Other names | - |
| Abbreviation | d4[1] |
| Size | |
| Semitones | 4 |
| Interval class | 4 |
| Just interval | 32:25[2], 8192:6561 |
| Cents | |
| 12-Tone equal temperament | 400 |
| 24-Tone equal temperament | 400 |
| Just intonation | 427, 384 |
In classical music from Western culture, a diminished fourth () is an interval produced by narrowing a perfect fourth by a chromatic semitone.[1][3] For example, the interval from C to F is a perfect fourth, five semitones wide, and both the intervals from C♯ to F, and from C to F♭ are diminished fourths, spanning four semitones. Being diminished, it is considered a dissonant interval.[4]
A diminished fourth is enharmonically equivalent to a major third; that is, it spans the same number of semitones, and they are physically the same pitch in twelve-tone equal temperament. For example, B–D♯ is a major third; but if the same pitches are spelled B and E♭, as occurs in the C harmonic minor scale, the interval is instead a diminished fourth. In other tunings, however, they are not necessarily identical. For example, in 31 equal temperament the diminished fourth is slightly wider than a major third, and is instead the same width as the septimal major third. The Pythagorean diminished fourth (F♭--, 8192:6561 = 384.36 cents), also known as the schismatic major third, is closer to the just major third than the Pythagorean major third.
The 32:25 just diminished fourth arises in the C harmonic minor scale between B and E♭.[5]
See also
Sources
- ^ a b Benward & Saker (2003). Music: In Theory and Practice, Vol. I, p.54. ISBN 978-0-07-294262-0. Specific example of an d4 not given but general example of perfect intervals described.
- ^ Haluska, Jan (2003). The Mathematical Theory of Tone Systems, p.xxv. ISBN 0-8247-4714-3. Classic diminished fourth.
- ^ Hoffmann, F.A. (1881). Music: Its Theory & Practice, p.89-90. Thurgate & Sons. Digitized Aug 16, 2007.
- ^ Benward & Saker (2003), p.92.
- ^ 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.
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| Other tuning systems |
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| Other intervals |
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