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Step: major second (major tone) Major second on C.mid Play[ヘルプ/ファイル].
Minor tone (10:9) Minor tone on C.mid Play[ヘルプ/ファイル].

In Western music theory, a major second (sometimes also called whole tone) is a second spanning two semitones (Major second on C.mid Play[ヘルプ/ファイル]). A second is a musical interval encompassing two adjacent staff positions (see Interval number for more details). For example, the interval from C to D is a major second, as the note D lies two semitones above C, and the two notes are notated on adjacent staff positions. Diminished, minor and augmented seconds are notated on adjacent staff positions as well, but consist of a different number of semitones (zero, one, and three).

The major second is the interval that occurs between the first and second degrees of a major scale, the tonic and the supertonic. On a musical keyboard, a major second is the interval between two keys separated by one key, counting white and black keys alike. On a guitar string, it is the interval separated by two frets. In moveable-do solfège, it is the interval between do and re. It is considered a melodic step, as opposed to larger intervals called skips.

Intervals composed of two semitones, such as the major second and the diminished third, are also called tones, whole tones, or whole steps[1][2][3][4][5][6]

One source says step is "chiefly US."[7]

The preferred usage has been argued since the 19th century:

  • "Mr. M. in teaching the Diatonic scale calls a tone a step, and a semitone a half step; now, who ever heard of a step in music, or in sound ? Can any one suppose that a pupil will understand the meaning of tone and semitone any sooner by calling them step or half step, … ?"[8]
  • "… to use the term tone for a whole step is certainly objectionable …"[9]

In just intonation, major seconds can occur in at least two different frequency ratios:[10] 9:8 (about 203.9 cents) and 10:9 (about 182.4 cents). The largest (9:8) ones are called major tones or greater tones, the smallest (10:9) are called minor tones or lesser tones. Their size differs by exactly one syntonic comma (81:80, or about 21.5 cents). Some equal temperaments, such as 15-ET and 22-ET, also distinguish between a greater and a lesser tone.

The major second was historically considered one of the most dissonant intervals of the diatonic scale, although much 20th-century music saw it reimagined as a consonance. It is common in many different musical systems, including Arabic music, Turkish music and music of the Balkans, among others. It occurs in both diatonic and pentatonic scales.

Second_ET.ogg Listen to a major second in equal temperament[ヘルプ/ファイル]. Here, middle C is followed by D, which is a tone 200 cents sharper than C, and then by both tones together.

Major and minor tones

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Origin of large and small seconds and thirds in harmonic series.[11]
Lesser tone on D. Lesser tone on D.mid Play[ヘルプ/ファイル]

In tuning systems using just intonation, such as 5-limit tuning, in which major seconds occur in two different sizes, the wider of them is called a major tone or greater tone, and the narrower a minor tone or, lesser tone. The difference in size between a major tone and a minor tone is equal to one syntonic comma (about 21.51 cents).

The major tone is the 9:8 interval[12] Major tone on C.mid play[ヘルプ/ファイル], and it is an approximation thereof in other tuning systems, while the minor tone is the 10:9 ratio[12] Minor tone on C.mid play[ヘルプ/ファイル]. The major tone may be derived from the harmonic series as the interval between the eighth and ninth harmonics. The minor tone may be derived from the harmonic series as the interval between the ninth and tenth harmonics. The 10:9 minor tone arises in the C major scale between D and e and G and A, and is "a sharper dissonance" than 9:8.[13][14] The 9:8 major tone arises in the C major scale between C & D, F & G, and A & B.[13] This 9:8 interval was named epogdoon (meaning 'one eighth in addition') by the Pythagoreans.

Notice that in these tuning systems, a third kind of whole tone, even wider than the major tone, exists. This interval of two semitones, with ratio 256:225, is simply called the diminished third (for further details, see Five-limit tuning#Size of intervals).

Comparison, in cents, of intervals at or near a major second

Some equal temperaments also produce major seconds of two different sizes, called greater and lesser tones (or major and minor tones). For instance, this is true for 15-ET, 22-ET, 34-ET, 41-ET, 53-ET, and 72-ET. Conversely, in twelve-tone equal temperament, Pythagorean tuning, and meantone temperament (including 19-ET and 31-ET) all major seconds have the same size, so there cannot be a distinction between a greater and a lesser tone.

In any system where there is only one size of major second, the terms greater and lesser tone (or major and minor tone) are rarely used with a different meaning. Namely, they are used to indicate the two distinct kinds of whole tone, more commonly and more appropriately called major second (M2) and diminished third (d3). Similarly, major semitones and minor semitones are more often and more appropriately referred to as minor seconds (m2) and augmented unisons (A2), or diatonic and chromatic semitones.

Unlike almost all uses of the terms major and minor, these intervals span the same number of semitones. They both span 2 semitones, while, for example, a major third (4 semitones) and minor third (3 semitones) differ by one semitone. Thus, to avoid ambiguity, it is preferable to call them greater tone and lesser tone (see also greater and lesser diesis).

Two major tones equal a ditone.

Epogdoon

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Diagram showing relations between epogdoon, diatessaron, diapente, and diapason
Detail of Raphael's School of Athens showing epogdoon diagram

In Pythagorean music theory, the epogdoon (古代ギリシア語: ἐπόγδοον) is the interval with the ratio 9 to 8. The word is composed of the prefix epi- meaning "on top of" and ogdoon meaning "one eighth"; so it means "one eighth in addition". For example, the natural numbers are 8 and 9 in this relation (8+(×8)=9).

According to Plutarch, the Pythagoreans hated the number 17 because it separates the 16 from its Epogdoon 18.[15]

"[Epogdoos] is the 9:8 ratio that corresponds to the tone, [hêmiolios] is the 3:2 ratio that is associated with the musical fifth, and [epitritos] is the 4:3 ratio associated with the musical fourth. It is common to translate epogdoos as 'tone' [major second]."[16]

Further reading

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  • Barker, Andrew (2007). The Science of Harmonics in Classical Greece. Cambridge University Press. ISBN 9780521879514.
  • Plutarch (2005). Moralia. Translated by Frank Cole Babbitt. Kessinger Publishing. ISBN 9781417905003.

See also

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References

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  1. ^ Whole step - Definition and More from the Free Merriam-Webster Dictionary”. Merriam-webster.com. 2015年2月25日閲覧。
  2. ^ Oxford Dictionaries - Dictionary, Thesaurus, & Grammar”. Askoxford.com (2015年2月11日). 2015年2月25日閲覧。
  3. ^ Whole step | Define Whole step at Dictionary.com”. Dictionary.reference.com. 2015年2月25日閲覧。
  4. ^ Whole tone | Define Whole tone at Dictionary.com”. Dictionary.reference.com. 2015年2月25日閲覧。
  5. ^ The Complete Idiot's Guide to Music Theory - Michael Miller - Google Books”. Books.google.com. 2015年2月25日閲覧。
  6. ^ Music Theory For Dummies - Michael Pilhofer, Holly Day - Google Books”. Books.google.com (2011年2月25日). 2015年2月25日閲覧。
  7. ^ Oxford Dictionaries - Dictionary, Thesaurus, & Grammar”. Askoxford.com (2015年2月11日). 2015年2月25日閲覧。
  8. ^ The Musical World - Google Books”. Books.google.com. 2015年2月25日閲覧。
  9. ^ Music: A Monthly Magazine Devoted to the Art, Science, Technic and ... - Google Books”. Books.google.com. 2015年2月25日閲覧。
  10. ^ Leta E. Miller, Fredric Lieberman (2006).
  11. ^ Leta E. Miller, ed. (1988).
  12. ^ a b Royal Society (Great Britain) (1880, digitized Feb 26, 2008).
  13. ^ a b Paul, Oscar (1885)
  14. ^ A Manual of Harmony for Use in Music-schools and Seminaries and for Self ... - Oscar Paul - Google Books”. Books.google.com (2010年5月25日). 2015年2月25日閲覧。
  15. ^ Plutarch • Isis and Osiris (Part 3 of 5)”. Penelope.uchicago.edu. 2015年2月25日閲覧。
  16. ^ Proclus : Commentary on Plato's Timaeus”. Philpapers.org. 25 February 2015閲覧。

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