Mode (music)

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In music theory, the term mode or modus is used in a number of distinct senses, depending on context.

Its most common use may be described as a type of musical scale coupled with a set of characteristic melodic and harmonic behaviors. It is applied to major and minor keys as well as the seven diatonic modes (including the former as Ionian and Aeolian) which are defined by their starting note or tonic. (Olivier Messiaen's modes of limited transposition are strictly a scale type.) Related to the diatonic modes are the eight church modes or Gregorian modes, in which authentic and plagal forms of scales are distinguished by ambitus and tenor or reciting tone. Although both diatonic and Gregorian modes borrow terminology from ancient Greece, the Greek tonoi do not otherwise resemble their medieval/modern counterparts.

Previously, in the Middle Ages the term modus was used to describe intervals, individual notes, and rhythms (see Template:Slink). Modal rhythm was an essential feature of the modal notation system of the Notre-Dame school at the turn of the 12th century. In the mensural notation that emerged later, modus specifies the subdivision of the longa.

Outside of Western classical music, "mode" is sometimes used to embrace similar concepts such as Octoechos, maqam, pathet etc. (see Template:Slink below).

Mode as a general conceptEdit

Regarding the concept of mode as applied to pitch relationships generally, in 2001 Harold S. Powers proposed that "mode" has "a twofold sense", denoting either a "particularized scale" or a "generalized tune", or both: Template:Quote

In 1792, Sir Willam Jones applied the term "mode" to the music of "the Persians and the Hindoos".<ref>Template:Harvp</ref> As early as 1271, Amerus applied the concept to cantilenis organicis (lit. "organic songs", most probably meaning "polyphony").<ref name="Powers-2001-§III,1">Template:Harvp</ref> It is still heavily used with regard to Western polyphony before the onset of the common practice period, as for example "modale Mehrstimmigkeit" by Carl Dahlhaus<ref>Template:Harvp</ref> or "Alte Tonarten" of the 16th and 17th centuries found by Bernhard Meier.<ref>Template:Harvp</ref><ref>Template:Harvp</ref>

The word encompasses several additional meanings. Authors from the 9th century until the early 18th century (e.g., Guido of Arezzo) sometimes employed the Latin modus for interval,<ref name="Powers-2001-§1,2">Template:Harvp</ref> or for qualities of individual notes.<ref>N. Meeùs, "Modi vocum. Réflections sur la théorie modale médiévale." Con-Scientia Musica. Contrapunti per Rossana Dalmonte e Mario Baroni, A. R. Addessi e. a. ed., Lucca, Libreria Musicale Italiana, 2010, pp. 21-33</ref> In the theory of late-medieval mensural polyphony (e.g., Franco of Cologne), modus is a rhythmic relationship between long and short values or a pattern made from them;<ref name=Powers-2001-Introduction>Template:Harvp</ref> in mensural music most often theorists applied it to division of longa into 3 or 2 breves.<ref>A. M. Busse Berger, "The Evolution of Rhythmic Notation", The Cambridge History of Western Music Theory, Th. Christensen ed., Cambridge University Press 2002, pp. 628-656, particularly pp. 629-635</ref>

Modes and scalesEdit

A musical scale is a series of pitches in a distinct order.

The concept of "mode" in Western music theory has three successive stages: in Gregorian chant theory, in Renaissance polyphonic theory, and in tonal harmonic music of the common practice period. In all three contexts, "mode" incorporates the idea of the diatonic scale, but differs from it by also involving an element of melody type. This concerns particular repertories of short musical figures or groups of tones within a certain scale so that, depending on the point of view, mode takes on the meaning of either a "particularized scale" or a "generalized tune". Modern musicological practice has extended the concept of mode to earlier musical systems, such as those of Ancient Greek music, Jewish cantillation, and the Byzantine system of octoechoi, as well as to other non-Western types of music.<ref name="Powers-2001-§I,3" /><ref name="Winnington-Ingram-1936-2–3">Template:Harvp</ref>

By the early 19th century, the word "mode" had taken on an additional meaning, in reference to the difference between major and minor keys, specified as "major mode" and "minor mode". At the same time, composers were beginning to conceive "modality" as something outside of the major/minor system that could be used to evoke religious feelings or to suggest folk-music idioms.<ref>Template:Harvp</ref>

Greek modesEdit

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Early Greek treatises describe three interrelated concepts that are related to the later, medieval idea of "mode": (1) scales (or "systems"), (2) tonos – pl. tonoi – (the more usual term used in medieval theory for what later came to be called "mode"), and (3) harmonia (harmony) – pl. harmoniai – this third term subsuming the corresponding tonoi but not necessarily the converse.<ref name=Mathiesen-2001a-6iiie>Template:Harvp</ref>

Greek scalesEdit

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The Greek scales in the Aristoxenian tradition were:<ref>Template:Harvp</ref><ref name=Mathiesen-2001a-6iiid>Template:Harvp</ref>

Aristoxenian scale	rough modern pitch	Aristoxenus' description
Mixolydian	b–Template:Prime	hypate hypaton–paramese
Lydian	Template:Prime–cTemplate:Pprime	parhypate hypaton–trite diezeugmenon
Phrygian	Template:Prime–dTemplate:Pprime	lichanos hypaton–paranete diezeugmenon
Dorian	Template:Prime–eTemplate:Pprime	hypate meson–nete diezeugmenon
Hypolydian	Template:Prime–fTemplate:Pprime	parhypate meson–trite hyperbolaion
Hypophrygian	Template:Prime–gTemplate:Pprime	lichanos meson–paranete hyperbolaion
Common, Locrian, or Hypodorian	Template:Nobr a–Template:Prime	mese–nete hyperbolaion or proslambnomenos–mese

These names are derived from ancient Greeks' cultural subgroups (Dorians), small regions in central Greece (Locris), and certain Anatolian peoples (Lydia, Phrygia) (not ethnically Greek, but in close contact with them). The association of these ethnic names with the octave species appears to precede Aristoxenus, who criticized their application to the tonoi by the earlier theorists whom he called the "Harmonicists". According to Template:Harvp, he felt that their diagrams, which exhibit 28 consecutive dieses, were

"... devoid of any musical reality since more than two quarter-tones are never heard in succession."<ref>Template:Harvp</ref>

Depending on the positioning (spacing) of the interposed tones in the tetrachords, three genera of the seven octave species can be recognized. The diatonic genus (composed of tones and semitones), the chromatic genus (semitones and a minor third), and the enharmonic genus (with a major third and two quarter tones or dieses).<ref>Template:Harvp</ref> The framing interval of the perfect fourth is fixed, while the two internal pitches are movable. Within the basic forms, the intervals of the chromatic and diatonic genera were varied further by three and two "shades" (chroai), respectively.<ref>Template:Harvp</ref><ref>Template:Harvp</ref>

In contrast to the medieval modal system, these scales and their related tonoi and harmoniai appear to have had no hierarchical relationships amongst the notes that could establish contrasting points of tension and rest, although the mese ("middle note") might have functioned as some sort of central, returning tone for the melody.<ref>Template:Harvp</ref>

TonoiEdit

The term tonos (pl. tonoi) was used in four senses:

"as note, interval, region of the voice, and pitch. We use it of the region of the voice whenever we speak of Dorian, or Phrygian, or Lydian, or any of the other tones".<ref name=Cleonides-1965-p44>Template:Harvp</ref>

Cleonides attributes thirteen tonoi to Aristoxenus, which represent a progressive transposition of the entire system (or scale) by semitone over the range of an octave between the Hypodorian and the Hypermixolydian.<ref name=Mathiesen-2001a-6iiie /> According to Cleonides, Aristoxenus's transpositional tonoi were named analogously to the octave species, supplemented with new terms to raise the number of degrees from seven to thirteen.<ref name=Cleonides-1965-p44 /> However, according to the interpretation of at least three modern authorities, in these transpositional tonoi the Hypodorian is the lowest, and the Mixolydian next-to-highest – the reverse of the case of the octave species,<ref name=Mathiesen-2001a-6iiie /><ref>Template:Harvp</ref><ref>Template:Harvp</ref> with nominal base pitches as follows (descending order):

nominal modern base	Aristoxenian school name
F	Hypermixolydian (or Hyperphrygian)
E	High Mixolydian or Hyperiastian
E^{Template:Music}	Low Mixolydian or Hyperdorian
D	Lydian
C^{Template:Music}	Low Lydian or Aeolian
C	Phrygian
B	Low Phrygian or Iastian
B^{Template:Music}	Dorian
A	Hypolydian
G^{Template:Music}	Low Hypolydian or Hypoaeolian
G	Hypophrygian
F^{Template:Music}	Low Hypophrygian or Hypoiastian
F	Hypodorian

Ptolemy, in his Harmonics, ii.3–11, construed the tonoi differently, presenting all seven octave species within a fixed octave, through chromatic inflection of the scale degrees (comparable to the modern conception of building all seven modal scales on a single tonic). In Ptolemy's system, therefore there are only seven tonoi.<ref name=Mathiesen-2001a-6iiie /><ref>Template:Harvp</ref> Pythagoras also construed the intervals arithmetically (if somewhat more rigorously, initially allowing for 1:1 = Unison, 2:1 = Octave, 3:2 = Fifth, 4:3 = Fourth and 5:4 = Major Third within the octave). In their diatonic genus, these tonoi and corresponding harmoniai correspond with the intervals of the familiar modern major and minor scales. See Pythagorean tuning and Pythagorean interval.

HarmoniaiEdit

*Harmoniai* of the School of Eratocles (enharmonic genus)
Mixolydian	Template:1/4	Template:1/4	2	Template:1/4	Template:1/4	2	1
Lydian	Template:1/4	2	Template:1/4	Template:1/4	2	1	Template:1/4
Phrygian	2	Template:1/4	Template:1/4	2	1	Template:1/4	Template:1/4
Dorian	Template:1/4	Template:1/4	2	1	Template:1/4	Template:1/4	2
Hypolydian	Template:1/4	2	1	Template:1/4	Template:1/4	2	Template:1/4
Hypophrygian	2	1	Template:1/4	Template:1/4	2	Template:1/4	Template:1/4
Hypodorian	1	Template:1/4	Template:1/4	2	Template:1/4	Template:1/4	2

In music theory the Greek word harmonia can signify the enharmonic genus of tetrachord, the seven octave species, or a style of music associated with one of the ethnic types or the tonoi named by them.<ref>Template:Harvp</ref>

Particularly in the earliest surviving writings, harmonia is regarded not as a scale, but as the epitome of the stylised singing of a particular district or people or occupation.<ref name="Winnington-Ingram-1936-2–3" /> When the late-6th-century poet Lasus of Hermione referred to the Aeolian harmonia, for example, he was more likely thinking of a melodic style characteristic of Greeks speaking the Aeolic dialect than of a scale pattern.<ref name=Anderson-Mathiesen-2001>Template:Harvp</ref> By the late 5th century BC, these regional types are being described in terms of differences in what is called harmonia – a word with several senses, but here referring to the pattern of intervals between the notes sounded by the strings of a lyra or a kithara.

However, there is no reason to suppose that, at this time, these tuning patterns stood in any straightforward and organised relations to one another. It was only around the year 400 that attempts were made by a group of theorists known as the harmonicists to bring these harmoniai into a single system and to express them as orderly transformations of a single structure. Eratocles was the most prominent of the harmonicists, though his ideas are known only at second hand, through Aristoxenus, from whom we learn they represented the harmoniai as cyclic reorderings of a given series of intervals within the octave, producing seven octave species. We also learn that Eratocles confined his descriptions to the enharmonic genus.<ref>Template:Harvp</ref>

Philosophical harmoniai in Plato and AristotleEdit

In the Republic, Plato uses the term inclusively to encompass a particular type of scale, range and register, characteristic rhythmic pattern, textual subject, etc.<ref name=Mathiesen-2001a-6iiie /> Plato held that playing music in a particular harmonia would incline one towards specific behaviors associated with it, and suggested that soldiers should listen to music in Dorian or Phrygian harmoniai to help harden them but avoid music in Lydian, Mixolydian, or Ionian harmoniai, for fear of being softened. Plato believed that a change in the musical modes of the state would cause a wide-scale social revolution.<ref>Template:Harvp</ref>

The philosophical writings of Plato and Aristotle (Template:Circa) include sections that describe the effect of different harmoniai on mood and character formation. For example, Aristotle stated in his Politics:<ref>Template:Harvp</ref>

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The word ethos (Template:Math) in this context means "moral character", and Greek ethos theory concerns the ways that music can convey, foster, and even generate ethical states.<ref name=Anderson-Mathiesen-2001 />

MelosEdit

Some treatises also describe "melic" composition (Template:Math), "the employment of the materials subject to harmonic practice with due regard to the requirements of each of the subjects under consideration"<ref>Template:Harvp</ref> – which, together with the scales, tonoi, and harmoniai resemble elements found in medieval modal theory.<ref>Template:Harvp</ref> According to Aristides Quintilianus, melic composition is subdivided into three classes: dithyrambic, nomic, and tragic.<ref>Template:Harvp</ref> These parallel his three classes of rhythmic composition: systaltic, diastaltic and hesychastic. Each of these broad classes of melic composition may contain various subclasses, such as erotic, comic and panegyric, and any composition might be elevating (diastaltic), depressing (systaltic), or soothing (hesychastic).<ref>Template:Harvp</ref>

According to Thomas J. Mathiesen, music as a performing art was called melos, which in its perfect form (Template:Math) comprised not only the melody and the text (including its elements of rhythm and diction) but also stylized dance movement. Melic and rhythmic composition (respectively, Template:Math and Template:Math) were the processes of selecting and applying the various components of melos and rhythm to create a complete work. According to Aristides Quintilianus:

And we might fairly speak of perfect melos, for it is necessary that melody, rhythm and diction be considered so that the perfection of the song may be produced: in the case of melody, simply a certain sound; in the case of rhythm, a motion of sound; and in the case of diction, the meter. The things contingent to perfect melos are motion-both of sound and body-and also chronoi and the rhythms based on these.<ref>Template:Harvp</ref>{{#if:|{{#if:|}}
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Western ChurchEdit

File:Boezio, De Institutione Musica - scale.jpg

Excerpt from Boethius' De musica depicting a scale

Tonaries, lists of chant titles grouped by mode, appear in western sources around the turn of the 9th century. The influence of developments in Byzantium, from Jerusalem and Damascus, for instance the works of Saints John of Damascus (d. 749) and Cosmas of Maiouma,<ref>Template:Harvp</ref><ref>Template:Harvp</ref> are still not fully understood. The eight-fold division of the Latin modal system, in a four-by-two matrix, was certainly of Eastern provenance, originating probably in Syria or even in Jerusalem, and was transmitted from Byzantine sources to Carolingian practice and theory during the 8th century. However, the earlier Greek model for the Carolingian system was probably ordered like the later Byzantine oktōēchos, that is, with the four principal (authentic) modes first, then the four plagals, whereas the Latin modes were always grouped the other way, with the authentics and plagals paired.<ref name="Powers-2001-§II.1.ii">Template:Harvp</ref>

The 6th-century scholar Boethius had translated Greek music theory treatises by Nicomachus and Ptolemy into Latin.<ref>Template:Harvp</ref> Later authors created confusion by applying mode as described by Boethius to explain plainchant modes, which were a wholly different system.<ref>Template:Harvp</ref> In his De institutione musica, book 4 chapter 15, Boethius, like his Hellenistic sources, twice used the term harmonia to describe what would likely correspond to the later notion of "mode", but also used the word "modus" – probably translating the Greek word τρόπος (tropos), which he also rendered as Latin tropus – in connection with the system of transpositions required to produce seven diatonic octave species,<ref>Template:Harvp</ref> so the term was simply a means of describing transposition and had nothing to do with the church modes.<ref>Template:Harvp</ref>

Later, 9th-century theorists applied Boethius's terms tropus and modus (along with "tonus") to the system of church modes. The treatise De Musica (or De harmonica institutione) of Hucbald synthesized the three previously disparate strands of modal theory: chant theory, the Byzantine oktōēchos and Boethius's account of Hellenistic theory.<ref>Template:Harvp</ref> The late-9th- and early 10th-century compilation known as the Alia musica imposed the seven octave transpositions, known as tropus and described by Boethius, onto the eight church modes,<ref>Template:Harvp</ref> but its compilator also mentions the Greek (Byzantine) echoi translated by the Latin term sonus. Thus, the names of the modes became associated with the eight church tones and their modal formulas – but this medieval interpretation does not fit the concept of the ancient Greek harmonics treatises. The modern understanding of mode does not reflect that it is made of different concepts that do not all fit.

File:JubilateDeoIntroit.jpg

The introit Jubilate Deo, from which Jubilate Sunday gets its name, is in Mode 8.

According to Carolingian theorists the eight church modes, or Gregorian modes, can be divided into four pairs, where each pair shares the "final" note and the four notes above the final, but they have different intervals concerning the species of the fifth. If the octave is completed by adding three notes above the fifth, the mode is termed authentic, but if the octave is completed by adding three notes below, it is called plagal (from Greek πλάγιος, "oblique, sideways"). Otherwise explained: if the melody moves mostly above the final, with an occasional cadence to the sub-final, the mode is authentic. Plagal modes shift range and also explore the fourth below the final as well as the fifth above. In both cases, the strict ambitus of the mode is one octave. A melody that remains confined to the mode's ambitus is called "perfect"; if it falls short of it, "imperfect"; if it exceeds it, "superfluous"; and a melody that combines the ambituses of both the plagal and authentic is said to be in a "mixed mode".<ref>Template:Harvp</ref>

Although the earlier (Greek) model for the Carolingian system was probably ordered like the Byzantine oktōēchos, with the four authentic modes first, followed by the four plagals, the earliest extant sources for the Latin system are organized in four pairs of authentic and plagal modes sharing the same final: protus authentic/plagal, deuterus authentic/plagal, tritus authentic/plagal, and tetrardus authentic/plagal.<ref name="Powers-2001-§II.1.ii" />

Each mode has, in addition to its final, a "reciting tone", sometimes called the "dominant".<ref>Template:Harvp</ref><ref>Template:Harvp</ref> It is also sometimes called the "tenor", from Latin tenere "to hold", meaning the tone around which the melody principally centres.<ref>Template:Harvp</ref> The reciting tones of all authentic modes began a fifth above the final, with those of the plagal modes a third above. However, the reciting tones of modes 3, 4, and 8 rose one step during the 10th and 11th centuries with 3 and 8 moving from B to C (half step) and that of 4 moving from G to A (whole step).<ref>Template:Harvp</ref>

File:Gregorian chant.gif

Kyrie "orbis factor", in mode 1 (Dorian) with BTemplate:Music on scale-degree 6, descends from the reciting tone, A, to the final, D, and uses the subtonium (tone below the final).

After the reciting tone, every mode is distinguished by scale degrees called "mediant" and "participant". The mediant is named from its position between the final and reciting tone. In the authentic modes it is the third of the scale, unless that note should happen to be B, in which case C substitutes for it. In the plagal modes, its position is somewhat irregular. The participant is an auxiliary note, generally adjacent to the mediant in authentic modes and, in the plagal forms, coincident with the reciting tone of the corresponding authentic mode (some modes have a second participant).<ref name=Rockstro-1880-342>Template:Harvp</ref>

Only one accidental is used commonly in Gregorian chant – B may be lowered by a half-step to BTemplate:Music. This usually (but not always) occurs in modes V and VI, as well as in the upper tetrachord of IV, and is optional in other modes except III, VII and VIII.<ref>Template:Harvp</ref>

Mode	I (Dorian)	II (Hypodorian)	III (Phrygian)	IV (Hypophrygian)	V (Lydian)	VI (Hypolydian)	VII (Mixolydian)	VIII (Hypomixolydian)
in Italian music until 17th century	primi toni	secundi toni	terzi toni	quarti toni	quinti toni	sexti toni	septimi toni	octavi toni
Final	D (=re)	D	E (=mi)	E	F (=fa)	F	G (=sol)	G
Dominant	A (=la)	F	B (=si) or C (=do)	G or A	C	A	D	B or C

In 1547, the Swiss theorist Henricus Glareanus published the Dodecachordon, in which he solidified the concept of the church modes, and added four additional modes: the Aeolian (mode 9), Hypoaeolian (mode 10), Ionian (mode 11), and Hypoionian (mode 12). A little later in the century, the Italian Gioseffo Zarlino at first adopted Glarean's system in 1558, but later (1571 and 1573) revised the numbering and naming conventions in a manner he deemed more logical, resulting in the widespread promulgation of two conflicting systems.

Zarlino's system reassigned the six pairs of authentic–plagal mode numbers to finals in the order of the natural hexachord, C–D–E–F–G–A, and transferred the Greek names as well, so that modes 1 through 8 now became C-authentic to F-plagal, and were now called by the names Dorian to Hypomixolydian. The pair of G modes were numbered 9 and 10 and were named Ionian and Hypoionian, while the pair of A modes retained both the numbers and names (11, Aeolian, and 12 Hypoaeolian) of Glarean's system. While Zarlino's system became popular in France, Italian composers preferred Glarean's scheme because it retained the traditional eight modes, while expanding them. Luzzasco Luzzaschi was an exception in Italy, in that he used Zarlino's new system.<ref name="Powers-2001-§III.4.ii.a">Template:Harvp</ref><ref>Template:Harvp</ref><ref>Template:Harvp</ref>

In the late-18th and 19th centuries, some chant reformers (notably the editors of the Mechlin, Pustet-Ratisbon (Regensburg), and Rheims-Cambrai Office-Books, collectively referred to as the Cecilian Movement) renumbered the modes once again, this time retaining the original eight mode numbers and Glareanus's modes 9 and 10, but assigning numbers 11 and 12 to the modes on the final B, which they named Locrian and Hypolocrian (even while rejecting their use in chant). The Ionian and Hypoionian modes (on C) become in this system modes 13 and 14.<ref name=Rockstro-1880-342 />

Given the confusion between ancient, medieval, and modern terminology, "today it is more consistent and practical to use the traditional designation of the modes with numbers one to eight",<ref>Template:Harvp</ref> using Roman numeral (I–VIII), rather than using the pseudo-Greek naming system. Medieval terms, first used in Carolingian treatises, later in Aquitanian tonaries, are still used by scholars today: the Greek ordinals ("first", "second", etc.) transliterated into the Latin alphabet protus (πρῶτος), deuterus (δεύτερος), tritus (τρίτος), and tetrardus (τέταρτος). In practice they can be specified as authentic or as plagal like "protus authentus / plagalis".

File:The eight musical modes.png

The eight musical modes. f indicates "final".<ref name=Curtis-1997-p255>Template:Harvp</ref>

UseEdit

A mode indicated a primary pitch (a final), the organization of pitches in relation to the final, the suggested range, the melodic formulas associated with different modes, the location and importance of cadences, and the affect (i.e., emotional effect/character). Liane Curtis writes that "Modes should not be equated with scales: principles of melodic organization, placement of cadences, and emotional affect are essential parts of modal content" in medieval and Renaissance music.<ref name=Curtis-1997-p255 />

Dahlhaus lists "three factors that form the respective starting points for the modal theories of Aurelian of Réôme, Hermannus Contractus, and Guido of Arezzo":<ref name=Dahlhaus-1990-pp191-192>Template:Harvp</ref>

the relation of modal formulas to the comprehensive system of tonal relationships embodied in the diatonic scale
the partitioning of the octave into a modal framework
the function of the modal final as a relational center.

The oldest medieval treatise regarding modes is Musica disciplina by Aurelian of Réôme (dating from around 850) while Hermannus Contractus was the first to define modes as partitionings of the octave.<ref name=Dahlhaus-1990-pp191-192 /> However, the earliest Western source using the system of eight modes is the Tonary of St Riquier, dated between about 795 and 800.<ref name="Powers-2001-§II.1.ii" />

Various interpretations of the "character" imparted by the different modes have been suggested. Three such interpretations, from Guido of Arezzo (995–1050), Adam of Fulda (1445–1505), and Juan de Espinosa Medrano (1632–1688), follow:Template:Citation needed

Name	Mode	D'Arezzo	Fulda	Espinosa	Example chant
Dorian	I	serious	any feeling	happy, taming the passions	File:Venisancte.ogg Veni sancte spiritus
Hypodorian	II	sad	sad	serious and tearful	File:Iesudulcis.ogg Iesu dulcis amor meus
Phrygian	III	mystic	vehement	inciting anger	File:Kyrie.ogg Kyrie, fons bonitatis
Hypophrygian	IV	harmonious	tender	inciting delights, tempering fierceness	File:Conditor.ogg Conditor alme siderum
Lydian	V	happy	happy	happy	File:Salve.ogg Salve Regina
Hypolydian	VI	devout	pious	tearful and pious	File:Ubicaritas.ogg Ubi caritas
Mixolydian	VII	angelical	of youth	uniting pleasure and sadness	File:Introibo.ogg Introibo
Hypomixolydian	VIII	perfect	of knowledge	very happy	File:Adcenam.ogg Ad cenam agni providi

Modern modesEdit

Modern Western modes use the same set of notes as the major scale, in the same order, but starting from one of its seven degrees in turn as a tonic, and so present a different sequence of whole and half steps. With the interval sequence of the major scale being W–W–H–W–W–W–H, where "W" means a whole tone (whole step) and "H" means a semitone (half step), it is thus possible to generate the following modes:<ref>Template:Harvp</ref>

Mode	Tonic relative to major scale	Interval sequence	Example
Ionian	I	W–W–H–W–W–W–H	C–D–E–F–G–A–B–C
Dorian	ii	W–H–W–W–W–H–W	D–E–F–G–A–B–C–D
Phrygian	iii	H–W–W–W–H–W–W	E–F–G–A–B–C–D–E
Lydian	IV	W–W–W–H–W–W–H	F–G–A–B–C–D–E–F
Mixolydian	V	W–W–H–W–W–H–W	G–A–B–C–D–E–F–G
Aeolian	vi	W–H–W–W–H–W–W	A–B–C–D–E–F–G–A
Locrian	vii^ø	H–W–W–H–W–W–W	B–C–D–E–F–G–A–B

For the sake of simplicity, the examples shown above are formed by natural notes (also called "white notes", as they can be played using the white keys of a piano keyboard). However, any transposition of each of these scales is a valid example of the corresponding mode. In other words, transposition preserves mode.<ref>Template:Harvp</ref>

File:Modal Interval Sequence.png

Interval sequences for each of the modern modes, showing the relationship between the modes as a shifted grid of intervals.

Although the names of the modern modes are Greek and some have names used in ancient Greek theory for some of the harmoniai, the names of the modern modes are conventional and do not refer to the sequences of intervals found even in the diatonic genus of the Greek octave species sharing the same name.<ref>Template:Cite encyclopedia</ref>

AnalysisEdit

{{ safesubst:#invoke:Unsubst||date=__DATE__ |$B= {{ safesubst:#invoke:Unsubst||date=__DATE__ |$B= Template:Ambox }} }} Each mode has characteristic intervals and chords that give it its distinctive sound. The following is an analysis of each of the seven modern modes. The examples are provided in a key signature with no sharps or flats (scales composed of natural notes).

Ionian (I)Edit

The Ionian mode is the modern major scale. The example composed of natural notes begins on C, and is also known as the C-major scale: Template:Image frame

Natural notes	C	D	E	F	G	A	B	C
Interval from C	P1	M2	M3	P4	P5	M6	M7	P8

Tonic triad: C major
Tonic seventh chord: C^M7
Dominant triad: G (in modern tonal thinking, the fifth or dominant scale degree, which in this case is G, is the next-most important chord root after the tonic)
Seventh chord on the dominant: G⁷ (a dominant seventh chord, so-called because of its position in this – and only this – modal scale)

Dorian (II)Edit

The Dorian mode is the second mode. The example composed of natural notes begins on D: Template:Image frame

Natural notes	D	E	F	G	A	B	C	D
Interval from D	P1	M2	m3	P4	P5	M6	m7	P8

The Dorian mode is very similar to the modern natural minor scale (see Aeolian mode below). The only difference with respect to the natural minor scale is in the sixth scale degree, which is a major sixth (M6) above the tonic, rather than a minor sixth (m6).

Tonic triad: Dm
Tonic seventh chord: Dm⁷
Dominant triad: Am
Seventh chord on the dominant: Am⁷ (a minor seventh chord)

Phrygian (III)Edit

The Phrygian mode is the third mode. The example composed of natural notes starts on E: Template:Image frame

Natural notes	E	F	G	A	B	C	D	E
Interval from E	P1	m2	m3	P4	P5	m6	m7	P8

The Phrygian mode is very similar to the modern natural minor scale (see Aeolian mode below). The only difference with respect to the natural minor scale is in the second scale degree, which is a minor second (m2) above the tonic, rather than a major second (M2).

Tonic triad: Em
Tonic seventh chord: Em⁷
Dominant triad: Bdim
Seventh chord on the dominant: B^ø7 (a half-diminished seventh chord)

Lydian (IV)Edit

The Lydian mode is the fourth mode. The example composed of natural notes starts on F: Template:Image frame

Natural notes	F	G	A	B	C	D	E	F
Interval from F	P1	M2	M3	A4	P5	M6	M7	P8

The single tone that differentiates this scale from the major scale (Ionian mode) is its fourth degree, which is an augmented fourth (A4) above the tonic (F), rather than a perfect fourth (P4).

Tonic triad: F
Tonic seventh chord: F^M7
Dominant triad: C
Seventh chord on the dominant: C^M7 (a major seventh chord)

Mixolydian (V)Edit

The Mixolydian mode is the fifth mode. The example composed of natural notes begins on G: Template:Image frame

Natural notes	G	A	B	C	D	E	F	G
Interval from G	P1	M2	M3	P4	P5	M6	m7	P8

The single tone that differentiates this scale from the major scale (Ionian mode) is its seventh degree, which is a minor seventh (m7) above the tonic (G), rather than a major seventh (M7). Therefore, the seventh scale degree becomes a subtonic to the tonic because it is now a whole tone lower than the tonic, in contrast to the seventh degree in the major scale, which is a semitone tone lower than the tonic (leading-tone).

Tonic triad: G
Tonic seventh chord: G⁷ (the dominant seventh chord in this mode is the seventh chord built on the tonic degree)
Dominant triad: Dm
Seventh chord on the dominant: Dm⁷ (a minor seventh chord)

Aeolian (VI)Edit

The Aeolian mode is the sixth mode. It is also called the natural minor scale. The example composed of natural notes begins on A, and is also known as the A natural-minor scale:

Template:Image frame

Natural notes	A	B	C	D	E	F	G	A
Interval from A	P1	M2	m3	P4	P5	m6	m7	P8

Tonic triad: Am
Tonic seventh chord: Am⁷
Dominant triad: Em
Seventh chord on the dominant: Em⁷ (a minor seventh chord)

Locrian (VII)Edit

The Locrian mode is the seventh mode. The example composed of natural notes begins on B: Template:Image frame

Natural notes	B	C	D	E	F	G	A	B
Interval from B	P1	m2	m3	P4	d5	m6	m7	P8

The distinctive scale degree here is the diminished fifth (d5). This makes the tonic triad diminished, so this mode is the only one in which the chords built on the tonic and dominant scale degrees have their roots separated by a diminished, rather than perfect, fifth. Similarly the tonic seventh chord is half-diminished.

Tonic triad: Bdim or B°
Tonic seventh chord: Bm^{7Template:Music5} or B^ø7
Dominant triad: F
Seventh chord on the dominant: FM⁷ (a major seventh chord)

SummaryEdit

The modes can be arranged in the following sequence, which follows the circle of fifths. In this sequence, each mode has one more lowered interval relative to the tonic than the mode preceding it. Thus, taking Lydian as reference, Ionian (major) has a lowered fourth; Mixolydian, a lowered fourth and seventh; Dorian, a lowered fourth, seventh, and third; Aeolian (natural minor), a lowered fourth, seventh, third, and sixth; Phrygian, a lowered fourth, seventh, third, sixth, and second; and Locrian, a lowered fourth, seventh, third, sixth, second, and fifth. Put another way, the augmented fourth of the Lydian mode has been reduced to a perfect fourth in Ionian, the major seventh in Ionian to a minor seventh in Mixolydian, etc.Template:Citation needed

Mode	White note	Intervals with respect to the tonic
Mode	White note	unison	second	third	fourth	fifth	sixth	seventh	octave
Lydian	F	perfect	major	major	augmented	perfect	major	major	perfect
Ionian	C				perfect			major
Mixolydian	G							minor
Dorian	D			minor
Aeolian	A						minor
Phrygian	E		minor
Locrian	B		minor			diminished

The first three modes are sometimes called major,<ref>Template:Harvp</ref><ref name=Marx-1852-336 /><ref>Template:Harvp</ref><ref name=Serna-2013-35>Template:Harvp</ref> the next three minor,<ref>Template:Harvp</ref><ref name=Marx-1852-336>Template:Harvp</ref><ref name=Serna-2013-35 /> and the last one diminished (Locrian),<ref>{{#invoke:citation/CS1|citation |CitationClass=web }}</ref> according to the quality of their tonic triads. The Locrian mode is traditionally considered theoretical rather than practical because the triad built on the first scale degree is diminished. Because diminished triads are not consonant they do not lend themselves to cadential endings and cannot be tonicized according to traditional practice.

The Ionian mode corresponds to the major scale. Scales in the Lydian mode are major scales with an augmented fourth. The Mixolydian mode corresponds to the major scale with a minor seventh.
The Aeolian mode is identical to the natural minor scale. The Dorian mode corresponds to the natural minor scale with a major sixth. The Phrygian mode corresponds to the natural minor scale with a minor second.
The Locrian is neither a major nor a minor mode because, although its third scale degree is minor, the fifth degree is diminished instead of perfect. For this reason it is sometimes called a "diminished" scale, though in jazz theory this term is also applied to the octatonic scale. This interval is enharmonically equivalent to the augmented fourth found between scale degrees 1 and 4 in the Lydian mode and is also referred to as the tritone.

UseEdit

Use and conception of modes or modality today is different from that in early music. As Jim Samson explains, "Clearly any comparison of medieval and modern modality would recognize that the latter takes place against a background of some three centuries of harmonic tonality, permitting, and in the 19th century requiring, a dialogue between modal and diatonic procedure".<ref>Template:Harvp</ref> Indeed, when 19th-century composers revived the modes, they rendered them more strictly than Renaissance composers had, to make their qualities distinct from the prevailing major-minor system. Renaissance composers routinely sharped leading tones at cadences and lowered the fourth in the Lydian mode.<ref>Template:Harvp</ref>

The Ionian, or Iastian,<ref>Template:Harvp</ref><ref>Template:Harvp</ref><ref>Template:Harvp</ref><ref>Template:Harvp</ref><ref name="Powers-2001-§III.4.ii.a" /><ref>Template:Harvp</ref><ref>Template:Harvp</ref><ref>Template:Harvp</ref> mode is another name for the major scale used in much Western music. The Aeolian forms the base of the most common Western minor scale; in modern practice the Aeolian mode is differentiated from the minor by using only the seven notes of the Aeolian mode. By contrast, minor mode compositions of the common practice period frequently raise the seventh scale degree by a semitone to strengthen the cadences, and in conjunction also raise the sixth scale degree by a semitone to avoid the awkward interval of an augmented second. This is particularly true of vocal music.<ref>Template:Harvp</ref>

Traditional folk music provides countless examples of modal melodies. For example, Irish traditional music makes extensive usage not only of the major and minor (Aeolian) modes, but also the Mixolydian and Dorian modes. Within the context of Irish traditional music, the tunes are most commonly played in the keys of G-Major/A-Dorian/D-Mixolydian/E-Aeolian (minor) and D-Major/E-Dorian/A-Mixolydian/B-Aeolian (minor). Some Irish music is written in A-Major/F#-Aeolian (minor), with B-Dorian and E-Mixolydian tunes not being completely unheard of. Rarer still are Irish tunes in E-Major/F#-Dorian/B-Mixolydian.

In some regions of Ireland, such as the west-central coast area of counties Galway and Clare, "flat" keys are far more prevalent than in other areas. Instruments will be constructed or pitched accordingly to allow for modal playing in C-Major/D-Dorian/G-Mixolydian or F-Major/G-Dorian/C-Mixolydian/D-Aeolian (minor), with some rare exceptions in Eb-Major/C-minor being played regionally. Some tunes are even composed in Bb-Major, with modulating sections in F-Mixolydian. A-minor is less popularly played in the region, despite the localised prevalence of tunes in C-Major and related modes.<ref>Template:Harvp</ref> Much Flamenco music is in the Phrygian mode, though frequently with the third and seventh degrees raised by a semitone.<ref>Template:Harvp</ref>

Zoltán Kodály, Gustav Holst, and Manuel de Falla use modal elements as modifications of a diatonic background, while modality replaces diatonic tonality in the music of Claude Debussy and Béla Bartók.<ref>Template:Harvp</ref>

Other typesEdit

While the term "mode" is still most commonly understood to refer to Ionian, Dorian, Phrygian, Lydian, Mixolydian, Aeolian, or Locrian modes in the diatonic scale; in modern music theory the word "mode" is also often used differently, to mean scales other than the diatonic. This is seen, for example, in melodic minor scale harmony, which is based on the seven rotations of the ascending melodic minor scale, yielding some interesting scales as shown below. The "chord" row lists tetrads that can be built from the pitches in the given mode<ref>Template:Harvp</ref> (in jazz notation, the symbol Δ is for a major seventh).

Since Dorian mode is the standard mode, we compare it with other modes:

(♯ and ♭ are dual, 2 and 7 are dual, 3 and 6 are dual, 4 and 5 are dual)

Dorian is self-dual, Mixolydian mode and Aeolian mode are dual, Ionian mode and Phrygian mode are dual, etc.

characteristic scale notes	dual scale characteristics	implied modeTemplate:Cn
♯3	Template:Grey	Mixolydian mode
Template:Grey	♭6	Aeolian mode (natural minor and descending melodic minor)
♯3 ♯7	Template:Grey	Ionian mode (natural major and ascending melodic major)
Template:Grey	♭2 ♭6	Phrygian mode
♯3 ♯4 ♯7	Template:Grey	Lydian mode
Template:Grey	♭2 ♭5 ♭6	Locrian mode
♯3 ♯4 ♯5 ♯7	Template:Grey	Lydian augmented scale
Template:Grey	♭2 ♭4 ♭5 ♭6	Altered scale
♯7	Template:Grey	Jazz minor scale (ascending melodic minor)
Template:Grey	♭2	Dorian ♭2 scale
♯3 ♯4	Template:Grey	Acoustic scale
Template:Grey	♭5 ♭6	Half diminished scale
♯3 ♯4 ♭6	Template:Grey	Lydian dominant ♭6 scale
Template:Grey	♯3 ♭5 ♭6	Major Locrian scale
♯3 ♯7 ♭2	Template:Grey	? (Ionian ♭2 scale?)
Template:Grey	♯7 ♭2 ♭6	Neapolitan minor scale
♯3 ♯4 ♭2	Template:Grey	Romanian major scale
Template:Grey	♯7 ♭5 ♭6	?
♯3 ♯4 ♯7 ♭2 ♭6	Template:Grey	Double Harmonic Augmented Scale
Template:Grey	♯3 ♯7 ♭2 ♭5 ♭6	Persian scale
♯4	Template:Grey	Ukrainian Dorian scale (Dorian harmonic scale?)
Template:Grey	♭5	? (Dorian harmonic scale?)
♯3 ♭2	Template:Grey	? (Mixolydian harmonic scale?)
Template:Grey	♯7 ♭6	? (Aeolian harmonic scale?) (harmonic minor)
♯3 ♯7 ♭6	Template:Grey	? (Ionian harmonic scale?) (harmonic major)
Template:Grey	♯3 ♭2 ♭6	Phrygian dominant scale (Phrygian harmonic scale?)
♯4 ♯7	Template:Grey	? (Lydian harmonic scale?)
Template:Grey	♭2 ♭5	? (Locrian harmonic scale?)
♯4 ♯7 ♭6	Template:Grey	Hungarian minor scale
Template:Grey	♯3 ♭2 ♭5	Oriental mode
♯3 ♭6		Aeolian dominant scale (descending melodic major) (self-dual)
♯7 ♭2		Neapolitan major scale (self-dual)
♯3 ♯7 ♭2 ♭6		Double harmonic scale (self-dual)

Or remove two diatonic notes to get pentatonic scale:

removed scale notes	altered scale notes	implied pentatonic scale	implied classical Chinese scale
3 6	Template:Grey	suspended pentatonic scale	商 (shāng) mode (self-dual)
3 7	Template:Grey	blues major pentatonic scale	徵 (zhǐ) mode
2 6	Template:Grey	minor pentatonic scale	羽 (yǔ) mode
4 7	♯3	major pentatonic scale	宮 (gōng) mode
2 5	♭6	blues minor pentatonic scale	角 (jué) mode

Scales that are called "harmonic" contain all seven types of seventh chordsTemplate:Cn (like the harmonic major scale and the harmonic minor scale).

e.g. for Dorian ♯4:

1st: Minor seventh chord
2nd: Dominant seventh chord
3rd: Major seventh chord
4th (start with the ♯4): Diminished seventh chord
5th: Minor major seventh chord
6th: Half-diminished seventh chord
7th: Augmented major seventh chord

and for Dorian ♭5:

1st: Half-diminished seventh chord
2nd: Minor seventh chord
3rd: Minor major seventh chord
4th: Dominant seventh chord
5th (start with the ♭5): Augmented major seventh chord
6th: Diminished seventh chord
7th: Major seventh chord

In contrast, the original Dorian mode (also the natural major scale and the natural minor scale) does not contain minor major seventh chord and augmented major seventh chord and diminished seventh chord.

type	in a major key	in a minor key
natural	Ionian (start with C, use all white keys)	Aeolian (start with A, use all white keys)
harmonic	♭6	♯7
melodic	ascending: same as natural / descending: ♭6, ♭7	ascending: ♯6, ♯7 / descending: same as natural

The Dorian mode, and Aeolian dominant scale (Dorian ♯3 ♭6 scale), and Neapolitan major scale (Dorian ♭2 ♯7 scale), and double harmonic scale (Dorian ♭2 ♯3 ♭6 ♯7 scale), are all self-dual.Template:Cn However, there are no harmonic scales that are self-dual.Template:Cn From that, we can list the scales and the triad qualities and the seventh chord qualities in each scale as degrees of Dorian mode and Aeolian dominant scale (Dorian ♯3 ♭6 scale) and Neapolitan major scale (Dorian ♭2 ♯7 scale) and double harmonic scale (Dorian ♭2 ♯3 ♭6 ♯7 scale) and the two types of Dorian harmonic scale:Template:Cn Template:Clarify (for Dorian mode and Aeolian dominant scale and Neapolitan major scale and double harmonic scale, the 2nd / 7th scales, the 3rd / 6th scales, the 4th / 5th scales, are dual scales, and for the scale of a type of Dorian harmonic scale, its dual is the 2nd / 7th scale, the 3rd / 6th scale, the 4th / 5th scale, of another Dorian harmonic scale).Template:Clarify Template:Cn

ScaleTemplate:Cn
scale	1st	2nd	3rd	4th	5th	6th	7th
Dorian mode	Dorian mode	Phrygian mode	Lydian mode	Mixolydian mode	Aeolian mode, natural minor, descending melodic minor	Locrian mode	Ionian mode, natural major, ascending melodic major
Aeolian dominant scale, Dorian ♯3 ♭6 scale	Aeolian dominant scale, descending melodic major, Aeolian ♯3 scale, Mixolydian ♭6 scale, Hindu scale, (Dorian ♯3 ♭6 scale)	half diminished scale, Locrian ♮2 scale, Aeolian ♭5 scale	altered scale, altered dominant scale, super Locrian scale, Locrian ♭4 scale	jazz minor scale, ascending melodic minor	Dorian ♭2 scale, Phrygian ♮6 scale	Lydian augmented scale, Lydian ♯5 scale	acoustic scale, overtone scale, Lydian dominant scale, Lydian ♭7 scale, Mixolydian ♯4 scale
Neapolitan major scale, Dorian ♭2 ♯7 scale	Neapolitan major scale, (Dorian ♭2 ♯7 scale)	leading whole tone scale, Lydian augmented ♯6 scale	Lydian augmented dominant scale	Lydian dominant ♭6	major Locrian scale	half-diminished ♭4 scale, altered dominant ♯2 scale	altered dominant Template:Music3 scale
double harmonic scale, Dorian ♭2 ♯3 ♭6 ♯7 scale	double harmonic scale, double harmonic major scale, (Dorian ♭2 ♯3 ♭6 ♯7 scale)	Lydian ♯2 ♯6 scale	Ultraphrygian scale	Hungarian minor scale, double harmonic minor scale, Gypsy minor scale	Oriental mode	Ionian ♯2 ♯5 scale	Locrian Template:Music3 Template:Music7 scale
Dorian harmonic (♯4) scale	Ukrainian Dorian scale, Romanian minor scale, altered Dorian scale, Dorian harmonic (♯4) scale	Phrygian dominant scale, altered Phrygian scale, dominant ♭2 ♭6 scale (in jazz), Freygish scale, Phrygian harmonic (♮3) scale	Lydian harmonic (♯9) scale	super Locrian Template:Music7 scale, altered diminished scale	harmonic minor, Aeolian harmonic (♮7) scale	Locrian harmonic (♮6) scale	Ionian harmonic (♯5) scale, augmented major scale
Dorian harmonic (♭5) scale	Dorian harmonic (♭5) scale, Locrian ♮2 ♮6 scale	altered dominant ♮5 scale, Phrygian harmonic (♭4) scale	melodic minor ♯4 scale, Lydian harmonic (♭3) scale	Mixolydian harmonic (♭2) scale	Lydian augmented ♯2 scale	Locrian harmonic (Template:Music7) scale	harmonic major, Ionian harmonic (♭6) scale

Triad qualitiesTemplate:Clarify
scale	1st	2nd	3rd	4th	5th	6t	7th
Dorian mode	minor triad	minor triad	major triad	major triad	minor triad	diminished triad	major triad
Aeolian dominant scale, Dorian ♯3 ♭6 scale	major triad	diminished triad	diminished triad	minor triad	minor triad	augmented triad	major triad
Neapolitan major scale, Dorian ♭2 ♯7 scale	minor triad	augmented triad	augmented triad	major triad	major triad ♭5, Template:Small	diminished triad	sus2 triad ♭5, Template:Small
double harmonic scale, Dorian ♭2 ♯3 ♭6 ♯7 scale	major triad	major triad	minor triad	minor triad	major triad ♭5, Template:Small	augmented triad	sus2 triad ♭5, Template:Small
Dorian harmonic (♯4) scale	minor triad	major triad	major triad	diminished triad	major triad	diminished triad	augmented triad
Dorian harmonic (♭5) scale	diminished triad	minor triad	minor triad	major triad	augmented triad	diminished triad	major triad

Seventh chord qualitiesTemplate:Cn Template:Clarify
scale	1st	2nd	3rd	4th	5th	6th	7th
Dorian mode	minor seventh chord	minor seventh chord	major seventh chord	dominant seventh chord	minor seventh chord	half-diminished seventh chord	major seventh chord
Aeolian dominant scale, Dorian ♯3 ♭6 scale	dominant seventh chord	half-diminished seventh chord	half-diminished seventh chord	minor major seventh chord	minor seventh chord	augmented major seventh chord	dominant seventh chord
Neapolitan major scale, Dorian ♭2 ♯7 scale	minor major seventh chord	augmented major seventh chord	augmented seventh chord	dominant seventh chord	dominant seventh flat five chord	half-diminished seventh chord	sus2 triad add7 ♭5
double harmonic scale, Dorian ♭2 ♯3 ♭6 ♯7 scale	major seventh chord	minor seventh chord	minor sixth chord, Template:Small	minor major seventh chord	dominant seventh flat five chord	augmented major seventh chord	sus2 triad add6 ♭5, Template:Small
Dorian harmonic (♯4) scale	minor seventh chord	dominant seventh chord	major seventh chord	diminished seventh chord	minor major seventh chord	half-diminished seventh chord	augmented major seventh chord
Dorian harmonic (♭5) scale	half-diminished seventh chord	minor seventh chord	minor major seventh chord	dominant seventh chord	augmented major seventh chord	diminished seventh chord	major seventh chord

Aeolian dominant scale (Dorian ♯3 ♭6 scale) can be called "anti-Dorian scale", since it and Dorian scale are the only two scales which are self-dual.

Dual triadsTemplate:Clarify

Template:Div col begin

major triad ~ minor triad

diminished triad (self-dual)

augmented triad (self-dual)

Template:Div col end

Dual seventh chordsTemplate:Clarify

major seventh chord (self-dual)	dominant seventh chord ~ half-diminished seventh chord
minor seventh chord (self-dual)	augmented major seventh chord ~ minor major seventh chord
diminished seventh chord (self-dual)