Quarter-comma meantone, or -comma meantone, was the most common
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 ...
in the sixteenth and seventeenth centuries, and was sometimes used later. In this system the
perfect fifth
In music theory, a perfect fifth is the Interval (music), musical interval corresponding to a pair of pitch (music), pitches with a frequency ratio of 3:2, or very nearly so.
In classical music from Western culture, a fifth is the interval fro ...
is flattened by one quarter of a
syntonic comma
In music theory, the syntonic comma, also known as the chromatic diesis, the Didymean comma, the Ptolemaic comma, or the diatonic comma is a small comma type interval between two musical notes, equal to the frequency ratio 81:80 (= 1.0125) ...
(81:80), with respect to its
just intonation
In music, just intonation or pure intonation is the tuning of musical intervals
Interval may refer to:
Mathematics and physics
* Interval (mathematics), a range of numbers
** Partially ordered set#Intervals, its generalization from numbers to ...
used in
Pythagorean tuning
Pythagorean tuning is a system of musical tuning in which the frequency ratios of all intervals are based on the ratio 3:2.Bruce Benward and Marilyn Nadine Saker (2003). ''Music: In Theory and Practice'', seventh edition, 2 vols. (Boston: Mc ...
(
frequency ratio
In music, an interval ratio is a ratio of the frequencies of the pitches in a musical interval. For example, a just perfect fifth (for example C to G) is 3:2 (), 1.5, and may be approximated by an equal tempered perfect fifth () which is 27/ ...
3:2); the result is × ()
= ≈ 1.49535, or a fifth of 696.578
cents. (The 12th power of that value is 125, whereas 7 octaves is 128, and so falls 41.059 cents short.) This fifth is then iterated to generate the diatonic scale and other notes of the temperament. The purpose is to obtain justly intoned
major third
In classical music, a third is a musical interval encompassing three staff positions (see Interval number for more details), and the major third () is a third spanning four semitones. Forte, Allen (1979). ''Tonal Harmony in Concept and P ...
s (with a frequency ratio equal to
5:4). It was described by
Pietro Aron
Pietro Aron, also known as Pietro (or Piero) Aaron (c. 1480 – after 1545), was an Italian music theorist and composer. He was born in Florence and probably died in Bergamo (other sources state Florence or Venice).
Biography
Very little is know ...
in his ''Toscanello de la Musica'' of 1523, by saying the major thirds should be tuned to be "sonorous and just, as united as possible." Later theorists
Gioseffo Zarlino
Gioseffo Zarlino (31 January or 22 March 1517 – 4 February 1590) was an Italian music theorist and composer of the Renaissance. He made a large contribution to the theory of counterpoint as well as to musical tuning.
Life and career
Zarlin ...
and
Francisco de Salinas
Francisco de Salinas (1513, Burgos – 1590, Salamanca) was a Spanish music theorist and organist, noted as among the first to describe meantone temperament in mathematically precise terms, and one of the first (along with Guillaume Costeley) to ...
described the tuning with mathematical exactitude.
Construction
In a meantone tuning, we have different chromatic and diatonic
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 chromatic semitone is the difference between C and C, and the diatonic semitone the difference between C and D. In Pythagorean tuning, the diatonic semitone is often called the
Pythagorean limma
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 ...
and the chromatic semitone
Pythagorean apotome
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 ...
, but in Pythagorean tuning the apotome is larger, whereas in -comma meantone the limma is larger. Put another way, in Pythagorean tuning we have that C is higher than D, whereas in -comma meantone we have C lower than D.
In any meantone or Pythagorean tuning, where a
whole tone
In Western music theory, a major second (sometimes also called whole tone or a whole step) is a second spanning two semitones (). A second is a musical interval encompassing two adjacent staff positions (see Interval number for more det ...
is composed of one semitone of each kind, a
major third
In classical music, a third is a musical interval encompassing three staff positions (see Interval number for more details), and the major third () is a third spanning four semitones. Forte, Allen (1979). ''Tonal Harmony in Concept and P ...
is two whole tones and therefore consists of two semitones of each kind, a
perfect fifth
In music theory, a perfect fifth is the Interval (music), musical interval corresponding to a pair of pitch (music), pitches with a frequency ratio of 3:2, or very nearly so.
In classical music from Western culture, a fifth is the interval fro ...
of meantone contains four diatonic and three chromatic semitones, and an
octave
In music, an octave ( la, octavus: eighth) or perfect octave (sometimes called the diapason) is the interval between one musical pitch and another with double its frequency. The octave relationship is a natural phenomenon that has been refer ...
seven diatonic and five chromatic semitones, it follows that:
* Five fifths down and three octaves up make up a diatonic semitone, so that the
Pythagorean limma
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 ...
is tempered to a diatonic semitone.
* Two fifths up and an octave down make up a whole tone consisting of one diatonic and one chromatic semitone.
* Four fifths up and two octaves down make up a major third, consisting of two diatonic and two chromatic semitones, or in other words two whole tones.
Thus, in Pythagorean tuning, where sequences of
just
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fifths (
frequency ratio
In music, an interval ratio is a ratio of the frequencies of the pitches in a musical interval. For example, a just perfect fifth (for example C to G) is 3:2 (), 1.5, and may be approximated by an equal tempered perfect fifth () which is 27/ ...
3:2) and octaves are used to produce the other intervals, a whole tone is
:
and a major third is
:
the difference is the
syntonic comma
In music theory, the syntonic comma, also known as the chromatic diesis, the Didymean comma, the Ptolemaic comma, or the diatonic comma is a small comma type interval between two musical notes, equal to the frequency ratio 81:80 (= 1.0125) ...
, .
An interval of a seventeenth, consisting of sixteen diatonic and twelve chromatic semitones, such as the interval from D
4 to F
6, can be equivalently obtained using either
* a stack of four fifths (e.g. D
4–A
4–E
5–B
5–F
6), or
* a stack of two octaves and one major third (e.g. D
4–D
5–D
6–F
6).
This large interval of a seventeenth contains
staff positions. In Pythagorean tuning, the size of a seventeenth is defined using a stack of four justly tuned fifths (frequency ratio 3:2):
:
In quarter-comma meantone temperament, where a
just
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major third (5:4) is required, a slightly narrower seventeenth is obtained by stacking two octaves and a major third:
:
By definition, however, a seventeenth of the same size (5:1) must be obtained, even in quarter-comma meantone, by stacking four fifths. Since justly tuned fifths, such as those used in Pythagorean tuning, produce a slightly wider seventeenth, in quarter-comma meantone the fifths must be slightly flattened to meet this requirement. Letting ''x'' be the frequency ratio of the flattened fifth, it is desired that four fifths have a ratio of 5:1,
:
which implies that a fifth is
:
a whole tone, built by moving two fifths up and one octave down, is
:
and a diatonic semitone, built by moving three octaves up and five fifths down, is
:
Notice that, in quarter-comma meantone, the seventeenth is times narrower than in Pythagorean tuning. This difference in size, equal to about 21.506
cents, is called the
syntonic comma
In music theory, the syntonic comma, also known as the chromatic diesis, the Didymean comma, the Ptolemaic comma, or the diatonic comma is a small comma type interval between two musical notes, equal to the frequency ratio 81:80 (= 1.0125) ...
. This implies that the fifth is a quarter of a syntonic comma narrower than the justly tuned Pythagorean fifth. Namely, this system tunes the fifths in the ratio of
:
which is expressed in the logarithmic cents scale as
:
which is slightly smaller (or flatter) than the ratio of a justly tuned fifth:
:
which is expressed in the logarithmic cents scale as
:
The difference between these two sizes is a quarter of a syntonic comma:
:
In sum, this system tunes the major thirds to the
just
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ratio of 5:4 (so, for instance, if A
4 is tuned to 440
Hz, C
5 is tuned to 550 Hz), most of the whole tones (namely the
major second
In Western music theory, a major second (sometimes also called whole tone or a whole step) is a second spanning two semitones (). A second is a musical interval encompassing two adjacent staff positions (see Interval number for more deta ...
s) in the ratio :2, and most of the semitones (namely the diatonic semitones or
minor second
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) in the ratio (8:5). This is achieved by tuning the seventeenth a syntonic comma flatter than the Pythagorean seventeenth, which implies tuning the fifth a quarter of a syntonic comma flatter than the
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ratio of 3:2. It is this that gives the system its name of ''quarter-comma meantone''.
12-tone scale
The whole chromatic scale (a subset of which is the diatonic scale), can be constructed by starting from a given ''base note'', and increasing or decreasing its frequency by one or more fifths. This method is identical to Pythagorean tuning, except for the size of the fifth, which is tempered as explained above. The construction table below illustrates how the pitches of the notes are obtained with respect to D (the ''base note''), in a D-based scale (see
Pythagorean tuning
Pythagorean tuning is a system of musical tuning in which the frequency ratios of all intervals are based on the ratio 3:2.Bruce Benward and Marilyn Nadine Saker (2003). ''Music: In Theory and Practice'', seventh edition, 2 vols. (Boston: Mc ...
for a more detailed explanation).
For each note in the basic octave, the table provides the conventional name of the
interval from D (the base note), the formula to compute its frequency ratio, and the approximate values for its frequency ratio and size in cents.
In the formulas, ''x'' = = 5 is the size of the tempered perfect fifth, and the ratios ''x'':1 or 1:''x'' represent an ascending or descending tempered perfect fifth (i.e. an increase or decrease in frequency by ''x''), while 2:1 or 1:2 represent an ascending or descending octave.
As in Pythagorean tuning, this method generates 13 pitches, with A and G nearly a quarter-tone apart. To build a 12-tone scale A is typically discarded.
C-based construction tables
The table above shows a D-based stack of fifths (i.e. a stack in which all ratios are expressed relative to D, and D has a ratio of 1/1). Since it is centered at D, the base note, this stack can be called ''D-based symmetric'':
:A–E–B–F–C–G–D–A–E–B–F–C–G
With the perfect fifth taken as , the ends of this scale are 125 in frequency ratio apart, causing a gap of (about two-fifths of a semitone) between its ends if they are normalized to the same octave. If the last step (here, G) is replaced by a copy of A but in the same octave as G, that will increase the interval C–G to a discord called a
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. ...
.
Except for the size of the fifth, this is identical to the stack traditionally used in
Pythagorean tuning
Pythagorean tuning is a system of musical tuning in which the frequency ratios of all intervals are based on the ratio 3:2.Bruce Benward and Marilyn Nadine Saker (2003). ''Music: In Theory and Practice'', seventh edition, 2 vols. (Boston: Mc ...
. Some authors prefer showing a C-based stack of fifths, ranging from A to G. Since C is not at its center, this stack is called ''C-based asymmetric'':
:A–E–B–F–C–G–D–A–E–B–F–C–G
Since the boundaries of this stack (A and G) are identical to those of the D-based symmetric stack, the note names of the 12 tone scale produced by this stack are also identical. The only difference is that the construction table shows intervals from C, rather than from D. Notice that 144 intervals can be formed from a 12-tone scale (see table below), which include intervals from C, D, and any other note. However, the construction table shows only 12 of them, in this case those starting from C. This is at the same time the main advantage and main disadvantage of the C-based asymmetric stack, as the intervals from C are commonly used, but since C is not at the center of this stack, they unfortunately include an
augmented fifth
In classical music from Western culture, an augmented fifth () is an interval produced by widening a perfect fifth by a chromatic semitone.Benward & Saker (2003). ''Music: In Theory and Practice, Vol. I'', p.54. . For instance, the interval ...
(i.e. the interval from C to G), instead of a
minor sixth
In Western classical music, a minor sixth is a musical interval encompassing six staff positions (see Interval number for more details), and is one of two commonly occurring sixths (the other one being the major sixth). It is qualified as ''mi ...
(from C to A). This augmented fifth is an extremely dissonant
wolf interval
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. ...
, as it deviates by 41.1 cents (a
diesis of ratio 128:125, almost twice a
syntonic comma
In music theory, the syntonic comma, also known as the chromatic diesis, the Didymean comma, the Ptolemaic comma, or the diatonic comma is a small comma type interval between two musical notes, equal to the frequency ratio 81:80 (= 1.0125) ...
) from the corresponding pure interval of 8:5 or 813.7 cents.
On the contrary, the intervals from D shown in the table above, since D is at the center of the stack, do not include wolf intervals and include a pure minor sixth (from D to B), instead of an impure augmented fifth. Notice that in the above-mentioned set of 144 intervals pure minor sixths are more frequently observed than impure augmented fifths (see table below), and this is one of the reasons why it is not desirable to show an impure augmented fifth in the construction table. A ''C-based symmetric'' stack might be also used, to avoid the above-mentioned drawback:
:G–D–A–E–B–F–C–G–D–A–E–B–F
In this stack, G and F have a similar frequency, and G is typically discarded. Also, the note between C and D is called D rather than C, and the note between G and A is called A rather than G. The C-based symmetric stack is rarely used, possibly because it produces 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. ...
in the unusual position of F–D instead of G–E, where musicians using Pythagorean tuning expected it).
Justly intonated quarter-comma meantone
A
just intonation
In music, just intonation or pure intonation is the tuning of musical intervals
Interval may refer to:
Mathematics and physics
* Interval (mathematics), a range of numbers
** Partially ordered set#Intervals, its generalization from numbers to ...
version of the quarter-comma meantone temperament may be constructed in the same way as
Johann Kirnberger's
rational version of
12-TET. The value of 5 · 35 is very close to 4, which is why a 7-limit interval 6144:6125 (which is the difference between the 5-limit
diesis 128:125 and the
septimal diesis 49:48), equal to 5.362 cents, appears very close to the quarter-comma () of 5.377 cents. So the perfect fifth has the ratio of 6125:4096, which is the difference between three
just major third
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s and two
septimal major second
In music, the septimal whole tone, septimal major second, or supermajor second is the musical interval exactly or approximately equal to an 8/7 ratio of frequencies.Andrew Horner, Lydia Ayres (2002). ''Cooking with Csound: Woodwind and Brass R ...
s; four such fifths exceed the ratio of 5:1 by the tiny interval of 0.058 cents. 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. ...
there appears to be 49:32, the difference between the
septimal minor seventh
The harmonic seventh interval, also known as the septimal minor seventh, or subminor seventh, is one with an exact 7:4 ratio (about 969 cents). This is somewhat narrower than and is, "particularly sweet", "sweeter in quality" than an "ordinar ...
and the
septimal major second
In music, the septimal whole tone, septimal major second, or supermajor second is the musical interval exactly or approximately equal to an 8/7 ratio of frequencies.Andrew Horner, Lydia Ayres (2002). ''Cooking with Csound: Woodwind and Brass R ...
.
Greater and lesser semitones
As discussed above, in the quarter-comma meantone temperament,
* the ratio of a semitone is ''S'' = 8:5,
* the ratio of a tone is ''T'' = :2.
The tones in the diatonic scale can be divided into pairs of semitones. However, since ''S''
2 is not equal to ''T'', each tone must be composed of a pair of unequal semitones, ''S'', and ''X'':
:
Hence,
:
Notice that ''S'' is 117.1 cents, and ''X'' is 76.0 cents. Thus, ''S'' is the greater semitone, and ''X'' is the lesser one. ''S'' is commonly called the diatonic semitone (or
minor second
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 ...
), while ''X'' is called the chromatic semitone (or
augmented unison
In modern Western tonal music theory an augmented unison or augmented prime is the interval between two notes on the same staff position, or denoted by the same note letter, whose alterations cause them, in ordinary equal temperament, to be o ...
).
The sizes of ''S'' and ''X'' can be compared to the just intonated ratio 18:17 which is 99.0 cents. ''S'' deviates from it by +18.2 cents, and ''X'' by −22.9 cents. These two deviations are comparable to the syntonic comma (21.5 cents), which this system is designed to tune out from the Pythagorean major third. However, since even the just intonated ratio 18:17 sounds markedly dissonant, these deviations are considered acceptable in a semitone.
In quarter-comma meantone, the minor second is considered acceptable while the augmented unison sounds dissonant and should be avoided.
Size of intervals
The table above shows only intervals from D. However, intervals can be formed by starting from each of the above listed 12 notes. Thus, twelve intervals can be defined for each interval type (twelve unisons, twelve
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, twelve intervals composed of 2 semitones, twelve intervals composed of 3 semitones, etc.).
As explained above, one of the twelve fifths (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. ...
) has a different size with respect to the other eleven. For a similar reason, each of the other interval types, except for the unisons and the octaves, has two different sizes in quarter-comma meantone. This is the price paid for seeking
just intonation
In music, just intonation or pure intonation is the tuning of musical intervals
Interval may refer to:
Mathematics and physics
* Interval (mathematics), a range of numbers
** Partially ordered set#Intervals, its generalization from numbers to ...
. The table below shows their approximate size in cents.
Interval names are given in their standard shortened form. For instance, the size of the interval from D to A, which is a perfect fifth (P5), can be found in the seventh column of the row labeled D.
Strictly just (or ''pure'') intervals are shown in
bold
In typography, emphasis is the strengthening of words in a text with a font in a different style from the rest of the text, to highlight them. It is the equivalent of prosody stress in speech.
Methods and use
The most common methods in W ...
font.
Wolf interval
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. ...
s are highlighted in red.
Surprisingly, although this tuning system was designed to produce pure major thirds, only eight of them are pure (5:4 or about 386.3 cents).
The reason why the interval sizes vary throughout the scale is that the pitches forming the scale are unevenly spaced. Namely, as mentioned above, the frequencies defined by construction for the twelve notes determine two different kinds of semitones (i.e. intervals between adjacent notes):
* The minor second (m2), also called the diatonic semitone, with size
::
: (for instance, between D and E)
* The augmented unison (A1), also called the chromatic semitone, with size
::
: (for instance, between C and C)
Conversely, in an
equally tempered
An equal temperament is a musical temperament or tuning system, which approximates just intervals by dividing an octave (or other interval) into equal steps. This means the ratio of the frequencies of any adjacent pair of notes is the same, w ...
chromatic scale, by definition the twelve pitches are equally spaced, all semitones having a size of exactly
:
As a consequence all intervals of any given type have the same size (e.g., all major thirds have the same size, all fifths have the same size, etc.). The price paid, in this case, is that none of them is justly tuned and perfectly consonant, except, of course, for the unison and the octave.
For a comparison with other tuning systems, see also
this table.
By definition, in quarter-comma meantone 11 perfect fifths (P5 in the table) have a size of approximately 696.6 cents (700 − ''ε'' cents, where ''ε'' ≈ 3.422 cents); since the average size of the 12 fifths must equal exactly 700 cents (as in equal temperament), the other one must have a size of 700 + 11''ε'' cents, which is about 737.6 cents (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. ...
). Notice that, as shown in the table, the latter interval, although
enharmonically equivalent
In modern musical notation and tuning, an enharmonic equivalent is a note, interval, or key signature that is equivalent to some other note, interval, or key signature but "spelled", or named differently. The enharmonic spelling of a written no ...
to a fifth, is more properly called a
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 ...
(d6). Similarly,
* 10
major second
In Western music theory, a major second (sometimes also called whole tone or a whole step) is a second spanning two semitones (). A second is a musical interval encompassing two adjacent staff positions (see Interval number for more deta ...
s (M2) are ≈ 193.2 cents (200 − 2''ε''), 2
diminished third
In classical music from Western culture, a diminished third () is the musical interval produced by narrowing a minor third by a chromatic semitone.Benward & Saker (2003). ''Music: In Theory and Practice, Vol. I'', p.54. . For instance, the inte ...
s (d3) are ≈ 234.2 cents (200 + 10''ε''), and their average is 200 cents;
* 9
minor third
In music theory, a minor third is a musical interval that encompasses three half steps, or semitones. Staff notation represents the minor third as encompassing three staff positions (see: interval number). The minor third is one of two com ...
s (m3) are ≈ 310.3 cents (300 + 3''ε''), 3
augmented second
In classical music from Western culture, an augmented second is an interval that, in equal temperament, is sonically equivalent to a minor third, spanning three semitones, and is created by widening a major second by a chromatic semitone.Ben ...
s (A2) are ≈ 269.2 cents (300 − 9''ε''), and their average is 300 cents;
* 8
major third
In classical music, a third is a musical interval encompassing three staff positions (see Interval number for more details), and the major third () is a third spanning four semitones. Forte, Allen (1979). ''Tonal Harmony in Concept and P ...
s (M3) are ≈ 386.3 cents (400 − 4''ε''), 4
diminished fourth
In classical music from Western culture, a diminished fourth () is an interval produced by narrowing a perfect fourth by a chromatic semitone.Benward & Saker (2003). ''Music: In Theory and Practice, Vol. I'', p.54. . Specific example of an d4 ...
s (d4) are ≈ 427.4 cents (400 + 8''ε''), and their average is 400 cents;
* 7 diatonic
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 (m2) are ≈ 117.1 cents (100 + 5''ε''), 5 chromatic semitones (A1) are ≈ 76.0 cents (100 − 7''ε''), and their average is 100 cents.
In short, similar differences in width are observed for all interval types, except for unisons and octaves, and they are all multiples of ε, the difference between the quarter-comma meantone fifth and the average fifth.
Notice that, as an obvious consequence, each augmented or diminished interval is exactly 12''ε'' cents (≈ 41.1 cents) wider or narrower than its enharmonic equivalent. For instance, the diminished sixth (or wolf fifth) is 12''ε'' cents wider than each perfect fifth, and each augmented second is 12''ε'' cents narrower than each minor third. This interval of size 12''ε'' is known as a
diesis, or
diminished second
In modern Western tonal music theory, a diminished second is the interval produced by narrowing a minor second by one chromatic semitone.Bruce Benward and Marilyn Saker (2003). ''Music: In Theory and Practice, Vol. I'', p. 54. . Specific example ...
. This implies that ''ε'' can be also defined as one twelfth of a diesis.
Triads in the chromatic scale
The
major triad
In music theory, a major chord is a chord that has a root, a major third, and a perfect fifth. When a chord comprises only these three notes, it is called a major triad. For example, the major triad built on C, called a C major triad, has pitch ...
can be defined by a pair of intervals from the root note: a
major third
In classical music, a third is a musical interval encompassing three staff positions (see Interval number for more details), and the major third () is a third spanning four semitones. Forte, Allen (1979). ''Tonal Harmony in Concept and P ...
(interval spanning 4 semitones) and a
perfect fifth
In music theory, a perfect fifth is the Interval (music), musical interval corresponding to a pair of pitch (music), pitches with a frequency ratio of 3:2, or very nearly so.
In classical music from Western culture, a fifth is the interval fro ...
(7 semitones). The
minor triad
In music theory, a minor chord is a chord that has a root, a minor third, and a perfect fifth. When a chord comprises only these three notes, it is called a minor triad. For example, the minor triad built on C, called a C minor triad, has pitch ...
can likewise be defined by a
minor third
In music theory, a minor third is a musical interval that encompasses three half steps, or semitones. Staff notation represents the minor third as encompassing three staff positions (see: interval number). The minor third is one of two com ...
(3 semitones) and a perfect fifth (7 semitones).
As shown above, a chromatic scale has twelve intervals spanning seven semitones. Eleven of these are perfect fifths, while the twelfth is a diminished sixth. Since they span the same number of semitones, perfect fifths and diminished sixths are considered to be
enharmonically equivalent
In modern musical notation and tuning, an enharmonic equivalent is a note, interval, or key signature that is equivalent to some other note, interval, or key signature but "spelled", or named differently. The enharmonic spelling of a written no ...
. In an
equally-tuned chromatic scale, perfect fifths and diminished sixths have exactly the same size. The same is true for all the enharmonically equivalent intervals spanning 4 semitones (major thirds and diminished fourths), or 3 semitones (minor thirds and augmented seconds). However, in the meantone temperament this is not true. In this tuning system, enharmonically equivalent intervals may have different sizes, and some intervals may markedly deviate from their
justly tuned ideal ratios. As explained in the previous section, if the deviation is too large, then the given interval is not usable, either by itself or in a chord.
The following table focuses only on the above-mentioned three interval types, used to form major and minor triads. Each row shows three intervals of different types but which have the same root note. Each interval is specified by a pair of notes. To the right of each interval is listed the formula for the
interval ratio
In music, an interval ratio is a ratio of the frequencies of the pitches in a musical interval. For example, a just perfect fifth (for example C to G) is 3:2 (), 1.5, and may be approximated by an equal tempered perfect fifth () which is ...
. The intervals diminished fourth, diminished sixth and augmented second may be regarded as
wolf interval
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. ...
s, and have been marked in
red
Red is the color at the long wavelength end of the visible spectrum of light, next to orange and opposite violet. It has a dominant wavelength of approximately 625–740 nanometres. It is a primary color in the RGB color model and a secondar ...
. ''S'' and ''X'' denote the ratio of the two abovementioned kinds of semitones (minor second and augmented unison).
First, look at the last two columns on the right. All the 7-semitone intervals except one have a ratio of
:
which deviates by −5.4 cents from the just 3:2 of 702.0 cents. Five cents is small and acceptable. On the other hand, the diminished sixth from G to E has a ratio of
:
which deviates by +35.7 cents from the just perfect fifth. Thirty-five cents is beyond the acceptable range.
Now look at the two columns in the middle. Eight of the twelve 4-semitone intervals have a ratio of
:
which is exactly a just 5:4. On the other hand, the four diminished fourths with roots at C, F, G and B have a ratio of
:
which deviates by +41.1 cents from the just major third. Again, this sounds badly out of tune.
Major triads are formed out of both major thirds and perfect fifths. If either of the two intervals is substituted by a wolf interval (d6 instead of P5, or d4 instead of M3), then the triad is not acceptable. Therefore, major triads with root notes of C, F, G and B are not used in meantone scales whose fundamental note is C.
Now look at the first two columns on the left. Nine of the twelve 3-semitone intervals have a ratio of
:
which deviates by −5.4 cents from the just 6:5 of 315.6 cents. Five cents is acceptable. On the other hand, the three augmented seconds whose roots are E, F and B have a ratio of
:
which deviates by −46.4 cents from the just minor third. It is a close match, however, for the 7:6
septimal minor third
In music, the septimal minor third, also called the subminor third (e.g., by Ellis), is the musical interval exactly or approximately equal to a 7/6 ratio of frequencies. In terms of cents, it is 267 cents, a quartertone of size 36/35 flatter ...
of 266.9 cents, deviating by +2.3 cents. These augmented seconds, though sufficiently consonant by themselves, will sound "exotic" or atypical when played together with a perfect fifth.
Minor triads are formed out of both minor thirds and fifths. If either of the two intervals are substituted by an enharmonically equivalent interval (d6 instead of P5, or A2 instead of m3), then the triad will not sound good. Therefore, minor triads with root notes of E, F, G and B are not used in the meantone scale defined above.
*The following major triads are usable: C, D, E, E, F, G, A, B.
*The following minor triads are usable: C, C, D, E, F, G, A, B.
*The following root notes are useful for both major and minor triads: C, D, E, G and A. Notice that these five pitches form a major
pentatonic scale
A pentatonic scale is a musical scale with five notes per octave, in contrast to the heptatonic scale, which has seven notes per octave (such as the major scale and minor scale).
Pentatonic scales were developed independently by many ancien ...
.
*The following root notes are useful only for major triads: E, F, B.
*The following root notes are useful only for minor triads: C, F, B.
*The following root note is useful for neither major nor minor triad: G.
Alternative construction
As discussed above, in the quarter-comma meantone temperament,
* the ratio of a greater (diatonic) semitone is ''S'' = 8:5,
* the ratio of a lesser (chromatic) semitone is ''X'' = 5:16,
* the ratio of most whole tones is ''T'' = :2,
* the ratio of most fifths is ''P'' = .
It can be verified through calculation that most whole tones (namely, the major seconds) are composed of one greater and one lesser semitone:
:
Similarly, a fifth is typically composed of three tones and one greater semitone:
:
which is equivalent to four greater and three lesser semitones:
:
Diatonic scale
A
diatonic scale
In music theory, a diatonic scale is any heptatonic scale that includes five whole steps (whole tones) and two half steps (semitones) in each octave, in which the two half steps are separated from each other by either two or three whole steps, ...
can be constructed by starting from the fundamental note and multiplying it either by ''T'' to move up by a tone or by ''S'' to move up by a semitone.
C D E F G A B C′
, ----, ----, ----, ----, ----, ----, ----,
''T T S T T T S''
The resulting interval sizes with respect to the base note C are shown in the following table:
:
Chromatic scale
Construction of a quarter-comma meantone
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 the ...
can proceed by stacking a series of 12 semitones, each of which may be either diatonic (''S'') or chromatic (''X'').
C C D E E F F G G A B B C′
, ----, ----, ----, ----, ----, ----, ----, ----, ----, ----, ----, ----,
''X S S X S X S X S S X S''
Notice that this scale is an extension of the diatonic scale shown in the previous table. Only five notes have been added: C, E, F, G and B (a
pentatonic scale
A pentatonic scale is a musical scale with five notes per octave, in contrast to the heptatonic scale, which has seven notes per octave (such as the major scale and minor scale).
Pentatonic scales were developed independently by many ancien ...
).
As explained above, an identical scale was originally defined and produced by using a sequence of tempered fifths, ranging from E (five fifths below D) to G (six fifths above D), rather than a sequence of semitones. This more conventional approach, similar to the ''D-based''
Pythagorean tuning
Pythagorean tuning is a system of musical tuning in which the frequency ratios of all intervals are based on the ratio 3:2.Bruce Benward and Marilyn Nadine Saker (2003). ''Music: In Theory and Practice'', seventh edition, 2 vols. (Boston: Mc ...
system, explains the reason why the X and S semitones are arranged in the particular and apparently arbitrary sequence shown above.
The interval sizes with respect to the base note C are presented in the following table. The frequency ratios are computed as shown by the formulas. Delta is the difference in cents between meantone and 12-TET. -c is the difference in quarter-commas between meantone and Pythagorean tuning.
:
Comparison with 31 equal temperament
The perfect fifth of quarter-comma meantone, expressed as a fraction of an octave, is . This number is
irrational
Irrationality is cognition, thinking, talking, or acting without inclusion of rationality. It is more specifically described as an action or opinion given through inadequate use of reason, or through emotional distress or cognitive deficiency. T ...
and in fact
transcendental; hence a chain of meantone fifths, like a chain of pure 3:2 fifths, never closes (i.e. never equals a chain of octaves). However, the
continued fraction
In mathematics, a continued fraction is an expression obtained through an iterative process of representing a number as the sum of its integer part and the reciprocal of another number, then writing this other number as the sum of its integer ...
approximations to this irrational fraction number allow us to find equal divisions of the octave which do close; the denominators of these are 1, 2, 5, 7, 12, 19, 31, 174, 205, 789 ... From this we find that 31 quarter-comma meantone fifths come close to closing, and conversely
31 equal temperament
In music, 31 equal temperament, 31-ET, which can also be abbreviated 31-TET (31 tone ET) or 31- EDO (equal division of the octave), also known as tricesimoprimal, is the tempered scale derived by dividing the octave into 31 equal-sized steps (equ ...
represents a good approximation to quarter-comma meantone. See also
schisma
In music, the schisma (also spelled ''skhisma'') is the interval between a Pythagorean comma (531441:524288) and a syntonic comma (81:80) and equals or 32805:32768 = 1.00113, which is 1.9537 cents (). It may also be defined as:
* the differ ...
.
Footnotes
References
External links
*
{{DEFAULTSORT:Quarter-Comma Meantone
Musical temperaments