In music theory , an eleventh is a compound interval consisting of an octave plus a fourth .
66-479: A perfect eleventh spans 17 and the augmented eleventh 18 semitones , or 10 steps in a diatonic scale . Since there are only seven degrees in a diatonic scale, the eleventh degree is the same as the subdominant (IV). The eleventh is considered highly dissonant with the major third . An eleventh chord is the stacking of five thirds in the span of an eleventh. In common practice tonality , it usually had subdominant function as minor eleventh chord on
132-411: A 12-tone scale (or half of a whole step ), visually seen on a keyboard as the distance between two keys that are adjacent to each other. For example, C is adjacent to C ♯ ; the interval between them is a semitone. In a 12-note approximately equally divided scale, any interval can be defined in terms of an appropriate number of semitones (e.g. a whole tone or major second is 2 semitones wide,
198-481: A commonly used version of 5 limit tuning have four different sizes, and can be classified as follows: The most frequently occurring semitones are the just ones ( S 3 , 16:15, and S 1 , 25:24): S 3 occurs at 6 short intervals out of 12, S 1 3 times, S 2 twice, and S 4 at only one interval (if diatonic D ♭ replaces chromatic D ♭ and sharp notes are not used). The smaller chromatic and diatonic semitones differ from
264-456: A diatonic and chromatic semitone in the tuning. Well temperament was constructed so that enharmonic equivalence could be assumed between all of these semitones, and whether they were written as a minor second or augmented unison did not effect a different sound. Instead, in these systems, each key had a slightly different sonic color or character, beyond the limitations of conventional notation. Like meantone temperament, Pythagorean tuning
330-546: A diminished seventh chord , or an augmented sixth chord . Its use is also often the consequence of a melody proceeding in semitones, regardless of harmonic underpinning, e.g. D , D ♯ , E , F , F ♯ . (Restricting the notation to only minor seconds is impractical, as the same example would have a rapidly increasing number of accidentals, written enharmonically as D , E ♭ , F ♭ , G [REDACTED] , A [REDACTED] ). Harmonically , augmented unisons are quite rare in tonal repertoire. In
396-467: A major third 4 semitones, and a perfect fifth 7 semitones). In music theory , a distinction is made between a diatonic semitone , or minor second (an interval encompassing two different staff positions , e.g. from C to D ♭ ) and a chromatic semitone or augmented unison (an interval between two notes at the same staff position, e.g. from C to C ♯ ). These are enharmonically equivalent if and only if twelve-tone equal temperament
462-465: A caustic dissonance, having no resolution. Some composers would even use large collections of harmonic semitones ( tone clusters ) as a source of cacophony in their music (e.g. the early piano works of Henry Cowell ). By now, enharmonic equivalence was a commonplace property of equal temperament , and instrumental use of the semitone was not at all problematic for the performer. The composer was free to write semitones wherever he wished. The exact size of
528-499: A family of intervals that may vary both in size and name. In Pythagorean tuning , seven semitones out of twelve are diatonic, with ratio 256:243 or 90.2 cents ( Pythagorean limma ), and the other five are chromatic, with ratio 2187:2048 or 113.7 cents ( Pythagorean apotome ); they differ by the Pythagorean comma of ratio 531441:524288 or 23.5 cents. In quarter-comma meantone , seven of them are diatonic, and 117.1 cents wide, while
594-519: A fundamental part of the musical language, even to the point where the usual accidental accompanying the minor second in a cadence was often omitted from the written score (a practice known as musica ficta ). By the 16th century, the semitone had become a more versatile interval, sometimes even appearing as an augmented unison in very chromatic passages. Semantically , in the 16th century the repeated melodic semitone became associated with weeping, see: passus duriusculus , lament bass , and pianto . By
660-450: A melodic half step, no "tendency was perceived of the lower tone toward the upper, or of the upper toward the lower. The second tone was not taken to be the 'goal' of the first. Instead, the half step was avoided in clausulae because it lacked clarity as an interval." However, beginning in the 13th century cadences begin to require motion in one voice by half step and the other a whole step in contrary motion. These cadences would become
726-440: A pitch ratio of 16:15 ( play ) or 1.0666... (approximately 111.7 cents ), called the just diatonic semitone . This is a practical just semitone, since it is the interval that occurs twice within the diatonic scale between a: The 16:15 just minor second arises in the C major scale between B & C and E & F, and is, "the sharpest dissonance found in the scale". An "augmented unison" (sharp) in just intonation
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#1732765496052792-405: A scale presents the opportunity to "split" the scale by placing the tonic note of the scale on the middle note of the halfstep span. This allows a leading tone from below resolving upwards, as well as a descending flat-supertonic upper neighbor , both converging on the tonic. The split turns a weakness - dissonance of cohemitonia - to a strength: contrapuntal convergence on the tonic. It
858-437: A scale tend to allow more and varied intervals in the interval vector , there might be said to be a point of diminishing returns , when qualified against the also increasing dissonance, hemitonia, tritonia and cohemitonia. It is near these points where most popular scales lie. Though less used than ancohemitonic scales, the cohemitonic scales have an interesting property. The sequence of two (or more) consecutive halfsteps in
924-455: A semitone between F ♯ and G, and then a semitone between G and A ♭ . Ancohemitonic scales, in contrast, either contain no semitones (and thus are anhemitonic), or contain semitones (being hemitonic) where none of the semitones appear consecutively in scale order. Some authors, however, do not include anhemitonic scales in their definition of ancohemitonic scales. Examples of ancohemitonic scales are numerous, as ancohemitonia
990-477: A semitone depends on the tuning system used. Meantone temperaments have two distinct types of semitones, but in the exceptional case of equal temperament , there is only one. The unevenly distributed well temperaments contain many different semitones. Pythagorean tuning , similar to meantone tuning, has two, but in other systems of just intonation there are many more possibilities. In meantone systems, there are two different semitones. This results because of
1056-419: Is a broken circle of fifths . This creates two distinct semitones, but because Pythagorean tuning is also a form of 3-limit just intonation , these semitones are rational. Also, unlike most meantone temperaments, the chromatic semitone is larger than the diatonic. The Pythagorean diatonic semitone has a ratio of 256/243 ( play ), and is often called the Pythagorean limma . It is also sometimes called
1122-401: Is a different, smaller semitone, with frequency ratio 25:24 ( play ) or 1.0416... (approximately 70.7 cents). It is the interval between a major third (5:4) and a minor third (6:5). In fact, it is the spacing between the minor and major thirds, sixths, and sevenths (but not necessarily the major and minor second). Composer Ben Johnston used a sharp ( ♯ ) to indicate a note
1188-465: Is a property of the domain of note sets cardinality 4 through 8 (3 through 8 for improper ancohemitonia including unhemitonia as well). This places anhemitonia generally in the range of "chords" and ancohemitonia generally in the range of "scales". The interrelationship of semitones, tritones, and increasing note count can be demonstrated by taking five consecutive pitches from the circle of fifths ; starting on C, these are C, G, D, A, and E. Transposing
1254-481: Is added from below the tonic). This scale is strictly ancohemitonic, having 2 semitones but not consecutively; it is tritonic, having a tritone between F and B. Past this point in the projection series, no new intervals are added to the Interval vector analysis of the scale, but cohemitonia results. Adding still another note from the circle of fifths gives the major octatonic scale: C D E F F ♯ G A B (when
1320-455: Is called hemitonia; that of having no semitones is anhemitonia . A musical scale or chord containing semitones is called hemitonic; one without semitones is anhemitonic. The minor second occurs in the major scale , between the third and fourth degree, ( mi (E) and fa (F) in C major), and between the seventh and eighth degree ( ti (B) and do (C) in C major). It is also called the diatonic semitone because it occurs between steps in
1386-427: Is favored over cohemitonia in the world's musics: diatonic scale , melodic major/ melodic minor , harmonic major scale , harmonic minor scale , Hungarian major scale , Romanian major scale , and the so-called octatonic scale . Hemitonia is also quantified by the number of semitones present. Unhemitonic scales have only one semitone; dihemitonic scales have 2 semitones; trihemitonic scales have 3 semitones, etc. In
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#17327654960521452-449: Is raised 70.7 cents, or a flat ( ♭ ) to indicate a note is lowered 70.7 cents. (This is the standard practice for just intonation, but not for all other microtunings.) Two other kinds of semitones are produced by 5 limit tuning. A chromatic scale defines 12 semitones as the 12 intervals between the 13 adjacent notes, spanning a full octave (e.g. from C 4 to C 5 ). The 12 semitones produced by
1518-421: Is the diminished octave ( d8 , or dim 8 ). The augmented unison is also the inversion of the augmented octave , because the interval of the diminished unison does not exist. This is because a unison is always made larger when one note of the interval is changed with an accidental. Melodically , an augmented unison very frequently occurs when proceeding to a chromatic chord, such as a secondary dominant ,
1584-429: Is the septimal diatonic semitone of 15:14 ( play ) available in between the 5 limit major seventh (15:8) and the 7 limit minor seventh / harmonic seventh (7:4). There is also a smaller septimal chromatic semitone of 21:20 ( play ) between a septimal minor seventh and a fifth (21:8) and an octave and a major third (5:2). Both are more rarely used than their 5 limit neighbours, although
1650-467: Is used; for example, they are not the same thing in meantone temperament , where the diatonic semitone is distinguished from and larger than the chromatic semitone (augmented unison), or in Pythagorean tuning , where the diatonic semitone is smaller instead. See Interval (music) § Number for more details about this terminology. In twelve-tone equal temperament all semitones are equal in size (100 cents). In other tuning systems, "semitone" refers to
1716-435: Is very common that a cohemitonic (or even hemitonic) scale (e.g.: Hungarian minor { C D E ♭ F ♯ G A ♭ B }) be displaced preferentially to a mode where the halfstep span is split (e.cont.: Double harmonic scale { G A ♭ B C D E ♭ F ♯ }), and by which name we more commonly know the same circular series of intervals. Cohemitonic scales with multiple halfstep spans present
1782-528: The Augmented scale , and another the analog of the Octatonic scale - which itself appears, alone and solitary, at Column ">=4A". row "8". Column "2A", row "4", another minimum, represents a few frankly dissonant, yet strangely resonant harmonic combinations: mM9 with no 5, 11 ♭ 9, dom13 ♭ 9, and M7 ♯ 11. Note, too, that in the highest cardinality row for each column before
1848-541: The Baroque era (1600 to 1750), the tonal harmonic framework was fully formed, and the various musical functions of the semitone were rigorously understood. Later in this period the adoption of well temperaments for instrumental tuning and the more frequent use of enharmonic equivalences increased the ease with which a semitone could be applied. Its function remained similar through the Classical period, and though it
1914-537: The Neapolitan major scale , which is cohemitonic and somewhat less common but still popular enough to bear a name. Column "3A", row "7", another local minimum, represents the harmonic major scale and its involution harmonic minor scale , and the Hungarian major scale and its involution Romanian major scale . Column "3A", row "6", are the hexatonic analogs to these four familiar scales, one of which being
1980-467: The Pythagorean minor semitone . It is about 90.2 cents. It can be thought of as the difference between three octaves and five just fifths , and functions as a diatonic semitone in a Pythagorean tuning . The Pythagorean chromatic semitone has a ratio of 2187/2048 ( play ). It is about 113.7 cents . It may also be called the Pythagorean apotome or the Pythagorean major semitone . ( See Pythagorean interval .) It can be thought of as
2046-419: The diatonic scale . The minor second is abbreviated m2 (or −2 ). Its inversion is the major seventh ( M7 or Ma7 ). Listen to a minor second in equal temperament . Here, middle C is followed by D ♭ , which is a tone 100 cents sharper than C, and then by both tones together. Melodically , this interval is very frequently used, and is of particular importance in cadences . In
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2112-482: The functional harmony . It may also appear in inversions of a major seventh chord , and in many added tone chords . In unusual situations, the minor second can add a great deal of character to the music. For instance, Frédéric Chopin 's Étude Op. 25, No. 5 opens with a melody accompanied by a line that plays fleeting minor seconds. These are used to humorous and whimsical effect, which contrasts with its more lyrical middle section. This eccentric dissonance has earned
2178-412: The perfect and deceptive cadences it appears as a resolution of the leading-tone to the tonic . In the plagal cadence , it appears as the falling of the subdominant to the mediant . It also occurs in many forms of the imperfect cadence , wherever the tonic falls to the leading-tone. Harmonically , the interval usually occurs as some form of dissonance or a nonchord tone that is not part of
2244-407: The [major] scale ." Play B & C The augmented unison , the interval produced by the augmentation , or widening by one half step, of the perfect unison, does not occur between diatonic scale steps, but instead between a scale step and a chromatic alteration of the same step. It is also called a chromatic semitone . The augmented unison is abbreviated A1 , or aug 1 . Its inversion
2310-506: The additional possibility of modulating between tonics each furnished with both upper and lower neighbors. Western music's system of key signature is based upon the assumption of a heptatonic scale of 7 notes, such that there are never more than 7 accidentals present in a valid key signature. The global preference for anhemitonic scales combines with this basis to highlight the 6 ancohemitonic heptatonic scales, most of which are common in romantic music , and of which most Romantic music
2376-532: The break in the circle of fifths that occurs in the tuning system: diatonic semitones derive from a chain of five fifths that does not cross the break, and chromatic semitones come from one that does. The chromatic semitone is usually smaller than the diatonic. In the common quarter-comma meantone , tuned as a cycle of tempered fifths from E ♭ to G ♯ , the chromatic and diatonic semitones are 76.0 and 117.1 cents wide respectively. Extended meantone temperaments with more than 12 notes still retain
2442-442: The difference between four perfect octaves and seven just fifths , and functions as a chromatic semitone in a Pythagorean tuning . The Pythagorean limma and Pythagorean apotome are enharmonic equivalents (chromatic semitones) and only a Pythagorean comma apart, in contrast to diatonic and chromatic semitones in meantone temperament and 5-limit just intonation . A minor second in just intonation typically corresponds to
2508-405: The equal-tempered semitone. To cite a few: For more examples, see Pythagorean and Just systems of tuning below. There are many forms of well temperament , but the characteristic they all share is that their semitones are of an uneven size. Every semitone in a well temperament has its own interval (usually close to the equal-tempered version of 100 cents), and there is no clear distinction between
2574-539: The example to the right, Liszt had written an E ♭ against an E ♮ in the bass. Here E ♭ was preferred to a D ♯ to make the tone's function clear as part of an F dominant seventh chord, and the augmented unison is the result of superimposing this harmony upon an E pedal point . In addition to this kind of usage, harmonic augmented unisons are frequently written in modern works involving tone clusters , such as Iannis Xenakis ' Evryali for piano solo. The semitone appeared in
2640-442: The fifth is added from above the top note in the series--B in this case). This scale is cohemitonic, having 3 semitones together at E F F ♯ G, and tritonic as well. Similar behavior is seen across all scales generally, that more notes in a scale tend cumulatively to add dissonant intervals (specifically: hemitonia and tritonia in no particular order) and cohemitonia not already present. While also true that more notes in
2706-407: The former was often implemented by theorist Cowell , while Partch used the latter as part of his 43 tone scale . Under 11 limit tuning, there is a fairly common undecimal neutral second (12:11) ( play ), but it lies on the boundary between the minor and major second (150.6 cents). In just intonation there are infinitely many possibilities for intervals that fall within
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2772-483: The harmonic degrees that column "0" avoids. Column 2, however, represents sounds far more intractable. Column 0, row 5 are the full but pleasant chords: 9th, 6/9, and 9alt5 with no 7. Column "0", row "6", is the unique whole tone scale . Column "2A", row "7", a local minimum, refers to the diatonic scale and melodic major/ melodic minor scales. Ancohemitonia, inter alii, probably makes these scales popular. Column "2C", row "7", another local minimum, refers to
2838-454: The irrational [ sic ] remainder between the perfect fourth and the ditone ( 4 3 / ( 9 8 ) 2 = 256 243 ) {\displaystyle \left({\begin{matrix}{\frac {4}{3}}\end{matrix}}/{{\begin{matrix}({\frac {9}{8}})\end{matrix}}^{2}}={\begin{matrix}{\frac {256}{243}}\end{matrix}}\right)} ." In
2904-407: The larger by the syntonic comma (81:80 or 21.5 cents). The smaller and larger chromatic semitones differ from the respective diatonic semitones by the same 128:125 diesis as the above meantone semitones. Finally, while the inner semitones differ by the diaschisma (2048:2025 or 19.6 cents), the outer differ by the greater diesis (648:625 or 62.6 cents). In 7 limit tuning there
2970-404: The major hexatonic scale: C D E G A B. This scale is hemitonic, having a semitone between B and C; it is atritonic, having no tritones. In addition, this is the maximal number of notes taken consecutively from the circle of fifths for which is it still possible to avoid a tritone. Adding still another note from the circle of fifths gives the major heptatonic scale: C D E F G A B (when the fifth
3036-438: The minor diatonic semitone is 17:16 or 105.0 cents, and septendecimal limma is 18:17 or 98.95 cents. Though the names diatonic and chromatic are often used for these intervals, their musical function is not the same as the meantone semitones. For instance, 15:14 would usually be written as an augmented unison, functioning as the chromatic counterpart to a diatonic 16:15. These distinctions are highly dependent on
3102-405: The music theory of Greek antiquity as part of a diatonic or chromatic tetrachord , and it has always had a place in the diatonic scales of Western music since. The various modal scales of medieval music theory were all based upon this diatonic pattern of tones and semitones. Though it would later become an integral part of the musical cadence , in the early polyphony of the 11th century this
3168-489: The musical context, and just intonation is not particularly well suited to chromatic use (diatonic semitone function is more prevalent). 19-tone equal temperament distinguishes between the chromatic and diatonic semitones; in this tuning, the chromatic semitone is one step of the scale ( play 63.2 cents ), and the diatonic semitone is two ( play 126.3 cents ). 31-tone equal temperament also distinguishes between these two intervals, which become 2 and 3 steps of
3234-650: The number of semitones is more important to the perception of dissonance than the adjacency (or lack thereof) of any pair of them. Additional adjacency between semitones (once adjacency is present) does not necessarily increase the dissonance, the count of semitones again being equal. Related to these semitone classifications are tritonic and atritonic scales. Tritonic scales contain one or more tritones , while atritonic scales do not contain tritones. A special monotonic relationship exists between semitones and tritones as scales are built by projection, q.v. below. The harmonic relationship of all these categories comes from
3300-491: The other five are chromatic, and 76.0 cents wide; they differ by the lesser diesis of ratio 128:125 or 41.1 cents. 12-tone scales tuned in just intonation typically define three or four kinds of semitones. For instance, Asymmetric five-limit tuning yields chromatic semitones with ratios 25:24 (70.7 cents) and 135:128 (92.2 cents), and diatonic semitones with ratios 16:15 (111.7 cents) and 27:25 (133.2 cents). For further details, see below . The condition of having semitones
3366-464: The perception that semitones and tritones are the severest of dissonances , and that avoiding them is often desirable. The most-used scales across the planet are anhemitonic. Of the remaining hemitonic scales, the ones most used are ancohemitonic. Most of the world's music is anhemitonic, perhaps 90%. Of that other hemitonic portion, perhaps 90% is unhemitonic, predominating in chords of only 1 semitone, all of which are ancohemitonic by definition. Of
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#17327654960523432-555: The piece its nickname: the "wrong note" étude. This kind of usage of the minor second appears in many other works of the Romantic period, such as Modest Mussorgsky 's Ballet of the Unhatched Chicks . More recently, the music to the movie Jaws exemplifies the minor second. In just intonation a 16:15 minor second arises in the C major scale between B & C and E & F, and is "the sharpest dissonance found in
3498-399: The pitches to fit into one octave rearranges the pitches into the major pentatonic scale : C, D, E, G, A. This scale is anhemitonic, having no semitones; it is atritonic, having no tritones. In addition, this is the maximal number of notes taken consecutively from the circle of fifths for which is it still possible to avoid a semitone. Adding another note from the circle of fifths gives
3564-473: The range of the semitone (e.g. the Pythagorean semitones mentioned above), but most of them are impractical. In 13 limit tuning, there is a tridecimal 2 / 3 tone (13:12 or 138.57 cents) and tridecimal 1 / 3 tone (27:26 or 65.34 cents). In 17 limit just intonation, the major diatonic semitone is 15:14 or 119.4 cents ( Play ), and
3630-426: The remaining 10%, perhaps 90% are dihemitonic, predominating in chords of no more than 2 semitones. The same applies to chords of 3 semitones. In both later cases, however, there is a distinct preference for ancohemitonia, as the lack of adjacency of any two semitones goes a long way towards softening the increasing dissonance. The following table plots sonority size (downwards on the left) against semitone count (to
3696-482: The right) plus the quality of ancohemitonia (denoted with letter A) versus cohemitonia (denoted with letter C). In general, ancohemitonic combinations are fewer for a given chord or scale size, but used much more frequently so that their names are well known. Column "0" represents the most commonly used chords., avoiding intervals of M7 and chromatic 9ths and such combinations of 4th, chromatic 5ths, and 6th to produce semitones. Column 1 represents chords that barely use
3762-412: The same two semitone sizes, but there is more flexibility for the musician about whether to use an augmented unison or minor second. 31-tone equal temperament is the most flexible of these, which makes an unbroken circle of 31 fifths, allowing the choice of semitone to be made for any pitch. 12-tone equal temperament is a form of meantone tuning in which the diatonic and chromatic semitones are exactly
3828-434: The same way that an anhemitonic scale is less dissonant than a hemitonic scale, an anhemitonic scale is less dissonant than a dihemitonic scale. The qualification of cohemitonia versus ancohemitonia combines with the cardinality of semitones, giving terms like: dicohemitonic, triancohemitonic, and so forth. An ancohemitonic scale is less dissonant than a cohemitonic scale, the count of their semitones being equal. In general,
3894-472: The same, because its circle of fifths has no break. Each semitone is equal to one twelfth of an octave. This is a ratio of 2 (approximately 1.05946), or 100 cents, and is 11.7 cents narrower than the 16:15 ratio (its most common form in just intonation , discussed below ). All diatonic intervals can be expressed as an equivalent number of semitones. For instance a major sixth equals nine semitones. There are many approximations, rational or otherwise, to
3960-512: The scale, respectively. 53-ET has an even closer match to the two semitones with 3 and 5 steps of its scale while 72-ET uses 4 ( play 66.7 cents ) and 7 ( play 116.7 cents ) steps of its scale. In general, because the smaller semitone can be viewed as the difference between a minor third and a major third, and the larger as the difference between a major third and a perfect fourth, tuning systems that closely match those just intervals (6/5, 5/4, and 4/3) will also distinguish between
4026-496: The second degree ( supertonic ) of the major scale . This music theory article is a stub . You can help Misplaced Pages by expanding it . Semitone A semitone , also called a minor second , 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 notes in
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#17327654960524092-407: The terminal zeros begin, the sonority counts are small, except for row "7" and the "3" columns of all sorts. This explosion of hemitonic possibility associated with note cardinality 7 (and above) possibly marks the lower bound for the entity called "scale" (in contrast to "chord"). As shown in the table, anhemitonia is a property of the domain of note sets cardinality 2 through 6, while ancohemitonia
4158-464: The two types of semitones and closely match their just intervals (25/24 and 16/15). Anhemitonic scale Musicology commonly classifies scales as either hemitonic or anhemitonic . Hemitonic scales contain one or more semitones , while anhemitonic scales do not contain semitones. For example, in traditional Japanese music , the anhemitonic yo scale is contrasted with the hemitonic in scale . The simplest and most commonly used scale in
4224-444: The world is the atritonic anhemitonic "major" pentatonic scale . The whole tone scale is also anhemitonic. A special subclass of the hemitonic scales is the cohemitonic scales. Cohemitonic scales contain two or more semitones (making them hemitonic) such that two or more of the semitones appear consecutively in scale order. For example, the Hungarian minor scale in C includes F ♯ , G, and A ♭ in that order, with
4290-401: Was not the case. Guido of Arezzo suggested instead in his Micrologus other alternatives: either proceeding by whole tone from a major second to a unison, or an occursus having two notes at a major third move by contrary motion toward a unison, each having moved a whole tone. "As late as the 13th century the half step was experienced as a problematic interval not easily understood, as
4356-401: Was used more frequently as the language of tonality became more chromatic in the Romantic period, the musical function of the semitone did not change. In the 20th century, however, composers such as Arnold Schoenberg , Béla Bartók , and Igor Stravinsky sought alternatives or extensions of tonal harmony, and found other uses for the semitone. Often the semitone was exploited harmonically as
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