Roman numeral analysis
Roman numeral analysis is a system in music theory used to identify and describe the harmonic functions of chords within a given key by assigning Roman numerals to represent the scale degree of each chord's root, with uppercase numerals denoting major triads and lowercase numerals denoting minor triads.[1] This method encodes both the position of the chord in the diatonic scale and its quality, facilitating the recognition of harmonic patterns and progressions across different pieces and keys.[2] The practice of Roman numeral analysis emerged in the late 18th century, with early uses appearing in Johann Kirnberger's Die Kunst des reinen Satzes (1774), where Roman numerals denoted the fundamental bass, and in the theoretical works of Abbé Georg Joseph Vogler starting in 1776.[3][4] It gained prominence during the common practice period (roughly 1600–1900) as a tool for analyzing tonal harmony in Western classical music, emphasizing functional relationships such as tonic (I), subdominant (IV or ii), and dominant (V).[1] In standard notation, augmented chords are marked with a plus sign (e.g., III+) and diminished chords with a degree symbol (e.g., vii°), while inversions are indicated by figures below the numeral, such as 6 for first inversion.[2] Beyond classical analysis, the system has been extended to jazz and popular music, where additional symbols like slashes for added tones or alterations accommodate non-diatonic harmonies.[5] This versatility makes Roman numeral analysis a foundational technique for composers, performers, and educators in understanding and transposing musical structures.[1]Fundamentals
Notation Basics
Roman numeral analysis employs uppercase Roman numerals (I, II, III, IV, V, VI, VII) to denote major triads built on each scale degree within a given key.[2] Lowercase Roman numerals (i, ii, iii, iv, v, vi, vii) are used similarly for minor triads on those degrees.[6] This convention allows for a key-agnostic representation of harmonic structure, where the numeral indicates the root's position relative to the tonic rather than a specific pitch class.[2] The root of each numeral is determined by the key signature, ensuring that the chord quality aligns with the diatonic scale. For instance, in C major, the numeral I represents the tonic triad C-E-G, a major chord on the first scale degree.[6] Similarly, IV denotes F-A-C, the major triad on the fourth degree, while vi indicates A-C-E, the minor triad on the sixth degree.[6] This system facilitates transposition and comparison across keys by abstracting pitch content to functional relationships.[2] Special symbols modify the basic numerals to indicate non-standard triad qualities. A superscript degree symbol (°) after a lowercase numeral, such as vii°, denotes a diminished triad, as seen in the leading-tone chord G-B-D-F in C major (though typically just the triad G-B-D).[2] For augmented triads, a plus sign (+) is added, such as III+ , which might appear in modal mixtures or chromatic contexts to signify a major triad with a raised fifth.[2] A fundamental illustration of this notation is the common plagal-authentic cadence progression I–IV–V–I in major keys, which in C major corresponds to C major–F major–G major–C major and outlines the primary harmonic functions of tonic, subdominant, dominant, and return to tonic.[6] Inversions of these chords can be notated briefly with additional symbols, such as I6 for first inversion, but full details are addressed elsewhere.[2]Chord Representation
In Roman numeral analysis, chords are represented by numerals corresponding to the scale degree of their root within a given key, with the case and symbols indicating chord quality. In a major key, the diatonic triads are mapped as follows: I (major), ii (minor), iii (minor), IV (major), V (major), vi (minor), and vii° (diminished). For example, in C major, the I chord consists of the notes C-E-G, forming a major triad on the first scale degree. This system extends to minor keys, where the triads are i (minor), ii° (diminished), III (major), iv (minor), v (minor) or V (major with raised leading tone), VI (major), and VII (major); in A minor, the i chord is A-C-E, a minor triad on the tonic degree.[7][2] The representation emphasizes functional harmony, grouping chords into primary categories based on their roles in tonal progressions: the tonic function (I in major or i in minor) establishes stability; the subdominant function (IV or iv in major/minor, or ii substituting for IV) introduces movement away from the tonic; and the dominant function (V or v in major/minor, or vii° as a substitute) creates tension resolving back to the tonic. These functions arise from the intervallic relationships within the diatonic collection, where root-position triads imply specific intervals—such as the perfect fifth and major or minor third above the root—differentiating major triads (major third + perfect fifth) from minor (minor third + perfect fifth) and diminished (minor third + diminished fifth). For instance, the V chord in C major (G-B-D) features a major third (G-B) and perfect fifth (G-D), driving resolution to I.[7][2] Inversions are denoted separately to indicate when the root is not in the bass, but the core numeral retains the chord's root and quality.[7] The following table summarizes the standard Roman numeral representations for root-position diatonic triads in major and minor keys:| Scale Degree | Major Key | Minor Key (Natural) | Minor Key (Harmonic, for V/vii°) |
|---|---|---|---|
| 1 (Tonic) | I (major) | i (minor) | i (minor) |
| 2 | ii (minor) | ii° (diminished) | ii° (diminished) |
| 3 | iii (minor) | III (major) | III (major) |
| 4 (Subdominant) | IV (major) | iv (minor) | iv (minor) |
| 5 (Dominant) | V (major) | v (minor) | V (major) |
| 6 | vi (minor) | VI (major) | VI (major) |
| 7 | vii° (diminished) | VII (major) | vii° (diminished) |
Historical Development
Origins in Theory
The roots of Roman numeral analysis trace back to 18th-century practices in figured bass and partimento traditions, which emphasized harmonic realization from bass lines annotated with numerical figures to indicate intervals above the bass note.[8] These methods, prevalent in Baroque and early Classical teaching, focused on practical keyboard improvisation and composition but did not employ Roman numerals; instead, they relied on Arabic figures for chord construction. Jean-Philippe Rameau's theory of the fundamental bass, introduced in his Traité de l'harmonie (1722), laid a conceptual groundwork by positing a generative bass line of root-position chords to explain harmonic progressions, influencing later functional analyses though Rameau himself used figured bass notation rather than Roman symbols.[9][8] The earliest known usage of Roman numerals to denote the fundamental bass appears in Johann Kirnberger's Die Kunst des reinen Satzes (1774).[3] The explicit introduction of Roman numerals as a shorthand for chord functions emerged later in the late 18th century through the work of Abbé Georg Joseph Vogler. In treatises such as Gründe der Kuhrpfälzischen Tonschule (1778), Vogler employed uppercase Roman numerals to denote the scale degrees of chord roots, marking an early shift toward a symbolic representation of harmonic structure independent of specific keys.[10] This innovation built on Rameau's ideas but adapted them for pedagogical clarity in German theoretical circles, where numerals served to abstract chordal relationships from voice-leading details. Vogler's system, though not yet standardized, represented a pivotal step in formalizing harmonic analysis beyond mere figured bass.[9] Gottfried Weber further advanced and popularized the method in his influential Versuch einer geordneten Theorie der Tonsetzkunst (1817–1821), where he refined Vogler's approach by distinguishing major and minor triads through uppercase and lowercase Roman numerals, respectively.[10] Weber's treatise integrated these symbols into a comprehensive framework for tonal composition, emphasizing their utility in analyzing chord progressions and modulations, which helped disseminate the system across European music theory education.[9] This work marked a transition from ad hoc notations to a more systematic tool, influencing subsequent theorists in the Austro-German tradition. Although Roman numeral analysis developed after the height of the Classical period, it has been retrospectively applied to works by composers like Wolfgang Amadeus Mozart to elucidate underlying harmonic functions in pieces such as his piano sonatas.[11] For instance, analysts using Weber's conventions have identified typical tonic-dominant resolutions in Mozart's expositions, revealing how his music aligned with emerging functional principles even before the notation's formalization.[12] Such applications underscore the system's retrospective value in interpreting pre-19th-century repertoire.Evolution in Common Practice
In the late 19th century, Hugo Riemann further advanced harmonic theory by emphasizing dualism, positing a symmetrical relationship between major and minor modes as inverted counterparts—major as an "over-chord" and minor as an "under-chord"—which influenced the interpretive framework for Roman numeral representations in tonal music. Although Riemann favored his own functional notation (Tonic, Dominant, Subdominant), his dualistic principles complemented Roman numeral analysis by promoting a balanced view of major-minor symmetry in pedagogical contexts, enhancing its application to chromatic and modulatory passages. This evolution solidified Roman numerals as a tool for tracking harmonic progressions in complex works, such as Beethoven's symphonies, where theorists like Weber and his successors used them to elucidate thematic development and structural modulations—for instance, in the first movement of Symphony No. 5, where numeral shifts highlight the transition from C minor to related keys.[13][9][14] By the early 20th century, Roman numeral analysis had become entrenched in conservatory curricula, notably through Arnold Schoenberg's Harmonielehre (1911), which integrated it with voice-leading principles to teach harmonic coherence amid increasing chromaticism. Schoenberg employed Roman numerals alongside figured bass to analyze progressions, underscoring their utility in revealing underlying tonal structures and modulatory paths in common practice repertoire. This institutional adoption ensured the method's enduring role in dissecting the era's symphonic and sonata forms.[15]Core Concepts in Common Practice
Diatonic Functions
In common practice music, diatonic functions describe the harmonic roles of chords built from the notes of a major or minor scale, organizing them into three primary categories: tonic, subdominant, and dominant. These functions govern chord progressions by creating cycles of tension and resolution, with the tonic providing stability, the subdominant introducing movement away from the tonic, and the dominant generating the strongest pull back to resolution. This functional approach, rooted in the principles of tonal harmony, allows analysts to interpret chord successions beyond mere scale degrees, emphasizing their relational dynamics within a key.[16][17] The tonic function represents stability and serves as the harmonic center, offering a sense of rest and resolution. In major keys, it is primarily fulfilled by the I chord, while in minor keys, the i chord takes this role; the vi (in major) or VI (in minor) chord can also substitute for tonic function, providing a related sense of closure due to shared scale tones. Tonic chords typically appear at the beginning or end of phrases and do not strongly demand progression to another harmony.[18][17] The subdominant function acts as a preparatory harmony, moving away from the tonic to build toward greater tension, often leading to the dominant. In major keys, this function is embodied by the IV and ii chords, while in minor keys, the iv and ii° (diminished) chords serve similarly; the ii° in minor particularly enhances the preparatory quality through its dissonant diminished fifth. Subdominant chords are flexible in position but commonly precede dominant harmonies to facilitate smooth voice leading.[16][17] The dominant function creates the principal tension in tonal harmony, strongly resolving to the tonic due to the leading tone's pull and the tritone interval in the chord. In both major and minor keys, the V (or v in natural minor) and vii° chords perform this role, with the V chord often preferred in minor for its major triad quality borrowed from the harmonic minor scale. Dominant chords demand resolution and typically conclude phrases on an unstable note, heightening expectation for the tonic.[18][16] Common progressions exploit these functions to create coherent harmonic motion, such as the I–IV–V–I cycle, which traces tonic to subdominant to dominant and back, exemplifying a full cadential close in major keys. Another frequent pattern is ii–V–I (or ii°–V–i in minor), where the supertonic (ii/ii°) acts as a predominant subdominant, leading efficiently to the dominant and tonic for a smooth resolution. These progressions form the backbone of phrase structure in common practice compositions.[17][18] Cadences, the harmonic punctuations of phrases, further illustrate diatonic functions through specific endings. The authentic cadence (V–I or V–i) delivers the strongest resolution from dominant to tonic, confirming the key. The plagal cadence (IV–I or iv–i) offers a milder close from subdominant to tonic, often evoking a sense of finality in hymns. The half cadence concludes on the dominant (e.g., I–V or IV–V), leaving tension unresolved to propel the music forward. Inversions can subtly alter the strength of these functions without changing their core identity.[16][17]Inversion Symbols
In Roman numeral analysis of common-practice harmony, inversion symbols indicate the position of a chord by specifying the intervals between the bass note and the other chord tones, distinguishing inversions from root-position chords where the root is in the bass. These symbols, derived from figured bass notation, are appended to the Roman numeral and emphasize the bass note's role, which is typically not the root in inverted positions, thereby avoiding confusion with root-position sonorities that share the same pitch classes.[19] For triads, the first inversion places the third of the chord in the bass, notated with a superscript 6 (or 6/3 in fuller figured bass, though often simplified to 6) following the Roman numeral. This symbol represents the sixth interval from the bass to the root (an octave above) and the third to the fifth. In C major, the tonic triad in first inversion (E-G-C, with E in the bass) is labeled I6, highlighting the bass's position on the scale-degree 3 rather than the root on scale-degree 1.[20] The second inversion positions the fifth in the bass, denoted by 6/4, indicating a sixth to the root and a fourth to the third above the bass. For example, the dominant triad in C major (D-G-B, bass D) appears as V6/4, where the bass occupies scale-degree 7 instead of the root on scale-degree 5.[19] Seventh chords employ additional inversion symbols due to their four notes. The third inversion, with the seventh of the chord in the bass, is notated as 4/2 (or simply 2), representing a fourth to the root and second to the third above the bass; alternatively, 4/3 may appear in some contexts for the second inversion but is standardly 4/3 for that position, with third inversion distinctly 4/2. In C major, the dominant seventh chord in third inversion (F-G-B-D, bass F) is V4/2, underscoring the bass on scale-degree 4 (the chordal seventh) rather than the root. For the second inversion of seventh chords, 4/3 is used, as in V4/3 (bass on the fifth (D), D-F-G-B in C major). These notations ensure the bass's non-root placement is clear, differentiating from root-position seventh chords marked simply with 7.[20][21] Inversion symbols also carry functional implications in voice leading and progression, guiding harmonic motion beyond mere structure. First-inversion triads, such as I6, often serve passing or neighbor functions, smoothing bass lines through stepwise motion rather than asserting strong harmonic roots like their root-position counterparts. For instance, an I6 might connect root-position V to root-position I via a passing bass tone.[22] The second-inversion dominant, V6/4, frequently appears in cadential contexts as part of a V6/4-I progression, where it embellishes the upcoming root-position V or directly approaches the tonic, enhancing resolution through upper-voice scale degrees 2 and 4 descending to 1 and 3 while the bass ascends stepwise. This usage leverages the inversion to create melodic momentum without altering the dominant's preparatory role.[23] Such implications prioritize bass-line continuity and cadential drive, ensuring inversions support rather than replace root-position functions.[20]Applications in Modern Styles
Jazz and Popular Music Adaptations
In jazz harmony, Roman numeral analysis adapts the classical system by using uppercase numerals for all chord roots, regardless of major or minor quality, to emphasize functional relationships over strict triadic distinctions; chord qualities and extensions are instead indicated with additional symbols such as "maj7" for major seventh chords (e.g., Imaj7), "m7" for minor seventh chords (e.g., IIm7), and "7" for dominant seventh chords (e.g., V7). This approach, popularized in institutions like Berklee College of Music, simplifies transposition and analysis of complex progressions by relating all chords to the key's scale degrees while appending descriptors for tensions like ninths or elevenths.[24] Secondary dominants play a prominent role in jazz adaptations, denoted as V7 of a target chord (e.g., V7/V for the dominant of the dominant, creating a temporary modulation to heighten tension before resolving).[25] These function as chromatic passing chords that temporarily shift the harmonic center, often leading to smoother voice leading in improvisational contexts. A foundational jazz progression is the ii–V–I, typically realized as IIm7–V7–Imaj7, which resolves through cycle-of-fifths motion and underpins countless standards like "Autumn Leaves."[26] Another staple is the "rhythm changes" form, derived from George Gershwin's "I Got Rhythm" and structured around an AABA template with the core I–VI–ii–V sequence (e.g., Imaj7–VI7–IIm7–V7), frequently embellished with secondary dominants for rhythmic drive.[27] In popular music, Roman numeral analysis highlights repetitive, hook-driven structures that prioritize emotional accessibility over classical resolution; a ubiquitous example is the I–V–vi–IV progression, which cycles through primary and relative minor chords to evoke familiarity and uplift.[28] This schema appears in The Beatles' "Let It Be" (C–G–Am–F in C major), where it supports verse-chorus transitions and has influenced countless hits across genres due to its versatile, non-functional flow.[29] Compared to classical applications, jazz and pop Roman numeral usage places greater emphasis on linear voice leading—smoothing connections between chord tones for improvisation—and substitutions like tritone or modal interchange, allowing flexible reinterpretations of diatonic functions without rigid cadential imperatives.[30]Extended and Altered Chords
In Roman numeral analysis, seventh chords extend the basic triadic structure by adding a seventh interval above the root, typically notated by appending a superscript 7 to the Roman numeral, which implies a complete 7-5-3 sonority in root position.[31] The dominant seventh (V7) consists of a major triad with a minor seventh, creating strong tension toward resolution, as seen in the progression I–V7–I.[32] Major seventh chords (Imaj7 or IΔ7) feature a major triad plus a major seventh, often providing a stable tonic function, while minor seventh chords (IIm7) use a minor triad with a minor seventh for subdominant roles.[33] Fully diminished sevenths (viio7) stack four minor thirds, yielding heightened dissonance suitable for leading-tone functions.[2] Extended chords beyond the seventh incorporate additional tertian intervals, notated by appending numbers like 9, 11, or 13 to the Roman numeral, indicating the presence of those scale degrees without implying all intermediate tones unless specified (e.g., V9 includes the ninth but assumes the seventh).[34] Ninth chords (V9) add a major or minor ninth to the dominant seventh, enhancing color and tension, common in resolutions to the tonic. Eleventh chords (V11) extend further with an eleventh, often omitting the third to avoid dissonance, while thirteenth chords (V13) complete the tertian stack up to the thirteenth, typically implying the dominant seventh and ninth for practical voicing.[35] Added ninth notations (add9) distinguish non-seventh extensions from full ninth chords.[36] Altered dominants modify the dominant seventh chord through chromatic alterations to the fifth, ninth, or eleventh, notated with accidentals or symbols like alt, #5, or b9 adjacent to the Roman numeral (e.g., V7alt or V7#5), increasing dissonance for expressive tension in modulations.[37] An augmented fifth (V7+5) raises the fifth by a half step, while a diminished fifth (V7o5) lowers it, both amplifying the tritone's instability.[38] Altered ninths (V7b9 or V7#9) adjust the ninth for specific colors, often resolving to target chords in non-diatonic contexts.[39] Secondary chords function as dominants or leading tones relative to non-tonic chords, notated with a slash indicating the target (e.g., V7/V for the secondary dominant of V, or viio7/V), expanding harmonic possibilities beyond the diatonic palette. Borrowed chords draw from parallel modes, notated by their altered quality (e.g., bVII for the flat-seven major chord from Mixolydian borrowing), integrating modal flavors without key change.[40] Chromatic examples include the Neapolitan chord (N6 or bII6), a major triad on the lowered supertonic in first inversion, functioning as a subdominant variant for dramatic color, often preceding V.[41] Augmented sixth chords, such as the Italian (It6: ♭6–#1–♭3), German (Ger6: ♭6–#1–♭3–5), and French (Fr6: ♭6–#1–♭3–4–5), create augmented sixth intervals resolving to V, notated with specific abbreviations or as inverted secondary dominants (e.g., ♭VI7/V in some analyses).[42][34] These structures appear across styles, including applications in jazz progressions for tension building, such as augmented sixth chords functioning as tritone substitutes in ii-V-I resolutions (e.g., in "All the Things You Are") and Neapolitan chords as ♭IImaj7 for subdominant color.[43]Scale and Mode Integration
Major and Minor Scales
In Roman numeral analysis, the major scale provides a foundational set of diatonic triads, each built by stacking thirds from successive scale degrees. The resulting chords follow a consistent pattern of qualities: major on the tonic (I), subdominant (IV), and dominant (V); minor on the supertonic (ii), mediant (iii), and submediant (vi); and diminished on the leading tone (vii°). This derivation emphasizes the scale's inherent harmonic structure, where the major third between the first and third degrees supports the tonic's stability.[45] The harmonic minor scale, which raises the seventh degree to create a leading tone, alters this pattern to accommodate tonal resolutions in minor keys. The diatonic triads are: minor on the tonic (i) and subdominant (iv); diminished on the supertonic (ii°) and leading tone (vii°); augmented on the mediant (III+); and major on the dominant (V) and subtonic (VI). These variations arise from the scale's altered intervals, particularly the major third in the V chord, which strengthens its pull toward the tonic.[46][47]| Scale Degree | Major Scale Chord | Harmonic Minor Scale Chord |
|---|---|---|
| I/i | I (major) | i (minor) |
| II/ii | ii (minor) | ii° (diminished) |
| III/iii | iii (minor) | III+ (augmented) |
| IV/iv | IV (major) | iv (minor) |
| V/v | V (major) | V (major) |
| VI/vi | vi (minor) | VI (major) |
| VII/vii | vii° (diminished) | vii° (diminished) |
Modal Variations
Roman numeral analysis extends to modal music by reorienting the numbering system around the modal tonic, treating the mode as a self-contained diatonic collection rather than deriving it strictly from major or minor scales. This approach highlights the unique "color notes" that distinguish each mode, such as the flattened sixth in Dorian or the sharpened fourth in Lydian, which alter chord qualities accordingly. In church modes and modern modal contexts, the Roman numerals reflect the mode's scale degrees, with uppercase for major triads and lowercase for minor, ensuring the analysis captures the modal center without implying tonal hierarchy.[49] The diatonic triads in each mode follow a predictable pattern based on the major scale's rotation, but adjusted to the new tonic. For instance, the Dorian mode, starting on the second degree of the major scale, features a minor tonic and includes a major IV and a flattened VII chord; in D Dorian, the progression yields i (Dm), ii (Em), ♭III (F), IV (G), v (Am), vi° (B°), and ♭VII (C). Similarly, Phrygian, beginning on the third degree, emphasizes a half-step between the tonic and second scale degree, producing i (Em), ♭II (F), ♭III (G), iv (Am), v° (B°), ♭VI (C), and ♭vii (Dm). Lydian, on the fourth degree, introduces a raised fourth for an augmented iv° chord, as in F Lydian: I (F), II (G), iii (A), ♯iv° (B°), V (C), vi (Dm), and vii (E). Mixolydian, the fifth rotation, flattens the seventh for a subtonic ♭VII, yielding in G Mixolydian: I (G), ii (Am), iii° (B°), IV (C), v (Dm), vi (E), and ♭VII (F). These can be summarized in the following table for clarity:| Mode | Tonic Quality | Characteristic Chords (Roman Numerals) | Color Note |
|---|---|---|---|
| Dorian | Minor | i, ii, ♭III, IV, v, vi°, ♭VII | ♭6 |
| Phrygian | Minor | i, ♭II, ♭III, iv, v°, ♭VI, ♭vii | ♭2 |
| Lydian | Major | I, II, iii, ♯iv°, V, vi, vii | ♯4 |
| Mixolydian | Major | I, ii, iii°, IV, v, vi, ♭VII | ♭7 |