In music theory, a leading-tone (also subsemitone, and called the leading-note in the UK) is a note or pitch which resolves or "leads" to a note one semitone higher or lower, being a lower and upper leading-tone, respectively. Typically, the leading tone refers to the seventh scale degree of a major scale (), a major seventh above the tonic. In the movable do solfège system, the leading-tone is sung as ti.
A leading-tone triad is a triad built on the seventh scale degree in a major key (viio), while a leading-tone seventh chord is a seventh chord built on the seventh scale degree (either viiø7 or viiø7). Walter Piston considers and notates viio as V0
7, an incomplete dominant seventh chord (Goldman 1965, 17).
Seventh scale degree (or lower leading tone)Edit
Typically, when people speak of the leading tone, they mean the seventh scale degree ( ) of the major scale, which has a strong affinity for and leads melodically to the tonic (Benward and Saker 2003, 203). It is sung as ti in movable-do solfège. For example, in the C major scale, the leading note is the note B.
As a diatonic function, the leading tone is the seventh scale degree of any diatonic scale when the distance between it and the tonic is a single semitone. In diatonic scales in which there is a whole tone between the seventh scale degree and the tonic, such as the Mixolydian mode, the seventh degree is called the subtonic. However, in modes without a leading tone, such as Dorian and Mixolydian, a raised seventh is often featured during cadences (Benward and Saker 2009, 4), such as in the harmonic minor scale.
A leading tone outside of the current scale is called a secondary leading-tone, leading to a secondary tonic. It functions to briefly tonicize a scale tone (usually the 5th degree) (Berry 1987, 55) as part of a secondary dominant chord. In the second measure of Beethoven's Waldstein Sonata (shown below), the F♯'s function as secondary leading-tones, which resolve to G in the next measure (Berry 1987, 55).
By contrast, an upper leading-tone (Berger 1987, 148; Coker 1991, 50) is a leading tone that resolves down, as opposed to the seventh scale degree (a lower leading-tone) which resolves up. The upper leading-tone usually is a lowered second degree (♭ ) resolving to the tonic, but the expression may at times refer to a ♭ resolving to the dominant. In German, the term Gegenleitton ("counter leading tone") is used by Hugo Riemann to denote the upper leading-tone (♭ ) (Riemann 1918, 113–114), but Heinrich Schenker uses abwärtssteigenden Leitton ("descending leading tone") to mean the descending diatonic supertonic (♮ ) (Schenker, 102–104, 171–172, 217–218; Schenker 1979, 13).
The tritone substitution, chord progression ii-subV-I on C (Dm-Db7-C), results in an upper leading-note.
According to Ernst Kurth (1913, 119–736) the major and minor thirds contain "latent" tendencies towards the perfect fourth and whole tone, respectively, and thus establish tonality. However, Carl Dahlhaus (1990, 44–47) contests Kurth's position, holding that this drive is in fact created through or with harmonic function, a root progression in another voice by a whole-tone or fifth, or melodically (monophonically) by the context of the scale. For example, the leading tone of alternating C chord and F minor chords is either the note E leading to F (if F is tonic), or A♭ leading to G (if C is tonic).
In works from the 14th- and 15th-century Western tradition, the leading tone is created by the progression from imperfect to perfect consonances, such as a major third to a perfect fifth or minor third to a unison. The same pitch outside of the imperfect consonance is not a leading tone.
Forte (1979, 11–2) claims that the leading tone is only one example of a more general tendency: the strongest progressions, melodic and harmonic, are by half step. He suggests that one play a G major scale and stop on the seventh note (F♯) to personally experience the feeling of lack caused by the "particularly strong attraction" of the seventh note to the eighth (F♯→G'), thus its name.
A leading-tone chord is a triad built on the seventh scale degree in major and the raised seventh-scale-degree in minor. The quality of the leading-tone triad is diminished in both major and minor keys (Benjamin, Horvit & Nelson 2008, 106). For example, in both C major and C minor, it is a B diminished triad (though it is usually written in first inversion, as described below).
According to John Bunyan Herbert:
The subtonic [leading-tone] chord is founded upon seven (the leading tone) of the major key, and is a diminished chord... The subtonic chord is very much neglected by many composers, and possibly a little overworked by others. Its occasional use gives character and dignity to a composition. On the whole, the chord has a poor reputation. Its history, in brief, seems to be: Much abused and little used (Herbert 1897, 102).
The leading-tone triad is used in several functions. It is commonly used as a passing chord between a root position tonic triad and a first inversion tonic triad (Forte 1979, 122): that is, "In addition to its basic function of passing between I and I6, VII6 has another important function: it can form a neighboring chord to I or I6." (Aldwell, Schachter, and Cadwallader 2010, 138). In that instance, the leading-tone triad prolongs tonic through neighbor and passing motion. The example below shows two measures from the fourth movement of Beethoven's Piano Sonata No. 3 in C major, Op. 2 (Forte 1979, 169) in which a leading-tone triad functions as a passing chord between I and I6.
The leading-tone triad may also be regarded as an incomplete dominant seventh chord: "A chord is called 'Incomplete' when its root is omitted. This omission occurs, occasionally, in the chord of the dom.-seventh, and the result is a triad upon the leading-tone." (Goetschius 1917, 72, §162–63, 165)
Some sources say the chord is not a chord; some argue it is an incomplete dominant seventh chord, especially when the diminished triad is written in its first inversion (resembling a second inversion dominant seventh without a root) (Herbert 1897, 102):
The subtonic [leading-tone] chord is a very common chord and a useful one. The triad differs in formation from the preceding six [major and minor diatonic] triads. It is dissonant and active... a diminished triad. The subtonic chord belongs to the dominant family. The factors of the triad are the same tones as the three upper factors of the dominant seventh chord and progress in the same manner. These facts have led many theorists to call this triad a 'dominant seventh chord without root.'... The subtonic chord in both modes has suffered much criticism from theorists although it has been and is being used by masters. It is criticized as being 'overworked', and that much can be accomplished with it with a minimum of technique (Gardner 1918, 48, 50).
For example, viio6 often substitutes for V4
3, which it closely resembles, and its use may be required in situations by voice leading: "In a strict four-voice texture, if the bass is doubled by the soprano, the VII6 [viio6] is required as a substitute for the V4
3" (Forte 1979, 168).
Since the leading-tone triad is a diminished triad, it is usually found in its first inversion (Goldman 1965, 72; Root 1872, 315). According to Carl Edward Gardner, "The first inversion of the triad is considered, by many, preferable to root position. The second inversion of the triad is unusual. Some theorists forbid its use." (Gardner 1918, 48–9)
In a four-part chorale texture, the third of the leading-tone triad is doubled in order to avoid adding emphasis on the tritone created by the root and the fifth. Unlike a dominant chord where the leading-tone can be frustrated and not resolve to the tonic if it is in an inner voice, the leading-tone in a leading-tone triad must resolve to the tonic. Commonly, the fifth of the triad resolves down since it is phenomenologically similar to the seventh in a dominant seventh chord. All in all, the tritone resolves inward if it is written as a diminished fifth (m. 1 below) and outward if it is written as an augmented fourth (m. 2).
Leading-tone seventh chordEdit
The leading-tone seventh chords are viiø7 and viio7 (Benward and Saker 2003, 218–9), the half-diminished and diminished seventh chords on the seventh scale degree ( ) of the major and harmonic minor. For example, in C major and C minor, the leading-tone seventh chords are B half-diminished (BDFA) and B diminished (B(♮)DFA♭), respectively.
Leading-tone seventh chords were not characteristic of Renaissance music but are typical of the Baroque and Classical period. They are used more freely in Romantic music but began to be used less in classical music as conventions of tonality broke down. They are integral to ragtime and contemporary popular and jazz music genres (Benward and Saker 2003, 220–2).
Composers throughout the common practice period often employed modal mixture when using the leading-tone seventh chord in a major key, allowing for the substitution of the half-diminished seventh chord with the fully diminished seventh chord (by lowering its seventh). This mixture is commonly used when the leading-tone seventh chord is functioning as a secondary leading-tone chord.
The leading-tone seventh chord has a dominant function and may be used in place of V or V 7 (Benjamin, Horvit & Nelson 2008, 128). Just as viio is sometimes considered an incomplete dominant seventh chord, a leading-tone seventh chord is often considered a "dominant ninth chord without root" (Gardner 1918, 49; Goldman 1965, 72).
For variety, leading-tone seventh chords are frequently substituted for dominant chords, with which they have three common tones (Benward and Saker 2003, 217): "The seventh chord founded upon the subtonic [in major]... is occasionally used. It resolves directly to the tonic... This chord may be employed without preparation" (Herbert 1897, 135).
In contrast to leading-tone triads, leading-tone seventh chords appear in root position. The example below shows leading-tone seventh chords (in root position) functioning as dominants in a reduction of Mozart's Don Giovanni, K. 527, Act I, Scene XIII (Benward and Saker 2003, 219).
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