In the

musical system of ancient Greece The musical system of ancient Greece evolved over a period of more than 500 years from simple scales of tetrachords, or divisions of the perfect fourth, into several complex systems encompassing tetrachords and octaves, as well as octave scales d ...

, genus (Greek: γένος 'genos'' pl. γένη 'genē'' Latin: ''genus'', pl. ''genera'' "type, kind") is a term used to describe certain classes of intonations of the two movable notes within a

tetrachord In music theory, a tetrachord ( el, τετράχορδoν; lat, tetrachordum) is a series of four notes separated by three intervals. In traditional music theory, a tetrachord always spanned the interval of a perfect fourth, a 4:3 frequency pr ...

. The tetrachordal system was inherited by the Latin medieval theory of scales and by the modal theory of Byzantine music; it may have been one source of the later theory of the

jins A jins ( ar, جنس, pl. ar, أجناس, ajnās, label=none) in traditional Arabic music theory, is a set of three, four, or five stepwise pitches used to build an Arabic ''maqam'', or melodic mode. They correspond to the English terms trichor ...

Arabic music Arabic music or Arab music ( ar, الموسيقى العربية, al-mūsīqā al-ʿArabīyyah) is the music of the Arab world with all its diverse music styles and genres. Arabic countries have many rich and varied styles of music and also man ...

. In addition,

Aristoxenus Aristoxenus of Tarentum ( el, Ἀριστόξενος ὁ Ταραντῖνος; born 375, fl. 335 BC) was a Greek Peripatetic philosopher, and a pupil of Aristotle. Most of his writings, which dealt with philosophy, ethics and music, have been ...

(in his fragmentary treatise on rhythm) calls some patterns of rhythm "genera".

Tetrachords

According to the system of

and his followers—

Cleonides Cleonides ( el, Κλεονείδης) is the author of a Greek treatise on music theory titled Εἰσαγωγὴ ἁρμονική ''Eisagōgē harmonikē'' (Introduction to Harmonics). The date of the treatise, based on internal evidence, can be e ...

, Bacchius, Gaudentius, Alypius, Bryennius, and

Aristides Quintilianus Aristides Quintilianus (Greek: Ἀριστείδης Κοϊντιλιανός) was the Greek author of an ancient musical treatise, ''Perì musikês'' (Περὶ Μουσικῆς, i.e. ''On Music''; Latin: ''De Musica'') According to Theodore Kar ...

—the paradigmatic tetrachord was bounded by the fixed tones ''hypate'' and ''mese'', which are a

perfect fourth A fourth is a musical interval encompassing four staff positions in the music notation of Western culture, and a perfect fourth () is the fourth spanning five semitones (half steps, or half tones). For example, the ascending interval from C to ...

apart and do not vary from one genus to another. Between these are two movable notes, called ''parhypate'' and ''lichanos''. The upper tone, lichanos, can vary over the range of a whole tone, whereas the lower note, parhypate, is restricted to the span of a quarter tone. However, their variation in position must always be proportional. This interval between the fixed hypate and movable parhypate cannot ever be larger than the interval between the two movable tones. When the composite of the two smaller intervals is less than the remaining ( incomposite) interval, the three-note group is called '' pyknon'' (meaning "compressed"). The positioning of these two notes defined three genera: the diatonic, chromatic (also called ''chroma'', "colour"), and enharmonic (also called ἁρμονία 'harmonia''. The first two of these were subject to further variation, called shades—χρόαι (''chroai'')—or species—εἶδη (''eidē''). For Aristoxenus himself, these shades were dynamic: that is, they were not fixed in an ordered scale, and the shades were flexible along a continuum within certain limits. Instead, they described characteristic functional progressions of intervals, which he called "roads" (ὁδοί), possessing different ascending and descending patterns while nevertheless remaining recognisable. For his successors, however, the genera became fixed intervallic successions, and their shades became precisely defined subcategories. Furthermore, in sharp contrast to the Pythagoreans, Aristoxenos deliberately avoids numerical ratios. Instead, he defines a whole tone as the difference between a perfect fifth and a perfect fourth, and then divides that tone into

semitone A semitone, also called a half step or a half tone, is the smallest musical interval commonly used in Western tonal music, and it is considered the most dissonant when sounded harmonically. It is defined as the interval between two adjacent no ...

s, third-tones, and quarter tones, to correspond to the diatonic, chromatic, and enharmonic genera, respectively.

Diatonic

Aristoxenus describes the diatonic genus ( grc, διατονικὸν γένος) as the oldest and most natural of the genera. It is the division of the tetrachord from which the modern

diatonic scale In music theory, a diatonic scale is any heptatonic scale that includes five whole steps (whole tones) and two half steps (semitones) in each octave, in which the two half steps are separated from each other by either two or three whole steps, ...

evolved. The distinguishing characteristic of the diatonic genus is that its largest interval is about the size of a

major second In Western music theory, a major second (sometimes also called whole tone or a whole step) is a second spanning two semitones (). A second is a musical interval encompassing two adjacent staff positions (see Interval number for more deta ...

. The other two intervals vary according to the tunings of the various shades.

Etymology

The English word ''

diatonic Diatonic and chromatic are terms in music theory that are most often used to characterize Scale (music), scales, and are also applied to musical instruments, Interval (music), intervals, Chord (music), chords, Musical note, notes, musical sty ...

'' is ultimately from the grc, διατονικός, diatonikós, itself from grc, διάτονος, diátonos, label=none, of disputed etymology. Most plausibly, it refers to the intervals being "stretched out" in that tuning, in contrast to the other two tunings, whose lower two intervals were referred to as grc, πυκνόν, pyknón, label=none, from grc, πυκνός, pyknós, dense, compressed, label=none. This takes grc, τόνος, tónos, label=none, to mean "interval of a tone"; see Liddell and Scott's
Greek Lexicon
' and Barsky (second interpretation), below. Alternatively, it could mean (as

OED The ''Oxford English Dictionary'' (''OED'') is the first and foundational historical dictionary of the English language, published by Oxford University Press (OUP). It traces the historical development of the English language, providing a co ...

claims) "through the tones", interpreting grc, διά, diá, label=none as "through". See also Barsky: "There are two possible ways of translating the Greek term 'diatonic': (1) 'running through tones', i.e. through the whole tones; or (2) a 'tensed' tetrachord filled up with the widest intervals". The second interpretation would be justified by consideration of the pitches in the diatonic tetrachord, which are more equally distributed ("stretched out") than in the chromatic and enharmonic tetrachords, and are also the result of tighter stretching of the two variable strings. It is perhaps also sounder on linguistic morphological grounds. Compare ''

diameter In geometry, a diameter of a circle is any straight line segment that passes through the center of the circle and whose endpoints lie on the circle. It can also be defined as the longest chord of the circle. Both definitions are also valid for ...

'' as "across/width distance". A completely separate explanation of the origins of the term ''diatonic'' appeals to the generation of the diatonic scale from "two tones": "Because the musical scale is based entirely on octaves and fifths, that is, two notes, it is called the 'diatonic scale' ". But this ignores the fact that it is the element ''di-'' that means "two", not the element ''dia-'', which has "through" among its meanings (see Liddell and Scott). There is a Greek term grc, δίτονος, dítonos, label=none, which is applied to an interval equivalent to two tones. It yields the English words ''

ditone In music, a ditone (, from , "of two tones") is the interval of a major third. The size of a ditone varies according to the sizes of the two tones of which it is compounded. The largest is the Pythagorean ditone, with a ratio of 81:64, also cal ...

'' and ''ditonic'' (see

Pythagorean comma In musical tuning, the Pythagorean comma (or ditonic comma), named after the ancient mathematician and philosopher Pythagoras, is the small interval (or comma) existing in Pythagorean tuning between two enharmonically equivalent notes such as ...

), but it is quite distinct from διάτονος. The Byzantine theorist

George Pachymeres George Pachymeres ( el, Γεώργιος Παχυμέρης, Geórgios Pachyméris; 1242 – 1310) was a Byzantine Greek historian, philosopher, music theorist and miscellaneous writer. Biography Pachymeres was born at Nicaea, in Bithynia, wher ...

consider the term derived from grc, διατείνω, diateíno, label=none, meaning "to stretch to the end", because "...the voice is most stretched by it" ( grc-x-medieval, "... σφοδρότερον ἡ φωνὴ κατ’ αὐτὸ διατείνεται"). Yet another derivation assumes the sense "through the tones" for διάτονος, but interprets ''tone'' as meaning ''individual note'' of the scale: "The word diatonic means 'through the tones' (i.e., through the tones of the key)" (Gehrkens, 1914, see ; see also the Prout citation, at the same location). This is not in accord with any accepted Greek meaning, and in Greek theory it would fail to exclude the other tetrachords. The fact that τόνος itself has at least four distinct meanings in Greek theory of music contributes to the uncertainty of the exact meaning and derivation of διατονικός, even among ancient writers: τόνος may refer to a pitch, an interval, a "key" or register of the voice, or a mode.Solon Michaelides, ''The Music of Ancient Greece: An Encyclopaedia'' (London; Faber and Faber, 1978), pp. 335–40: "Tonos".

Shades or tunings

The diatonic tetrachord can be "tuned" using several shades or tunings. Aristoxenus (and Cleonides, following his example; see also Ptolemy's tunings) describes two shades of the diatonic, which he calls συντονόν (''syntonón'', from συντονός) and μαλακόν (''malakón'', from μαλακός). ''Syntonón'' and ''malakón'' can be translated as "tense" ("taut") and "relaxed" ("lax, loose"), corresponding to the tension in the strings. These are often translated as "intense" and "soft", as in

Harry Partch Harry Partch (June 24, 1901 – September 3, 1974) was an American composer, music theorist, and creator of unique musical instruments. He composed using scales of unequal intervals in just intonation, and was one of the first 20th-century com ...

's influential ''

Genesis of a Music ''Genesis of a Music'' is a book first published in 1949 by microtonal composer Harry Partch (1901–1974). Partch first presents a polemic against both equal temperament and the long history of stagnation in the teaching of music; according ...

'', or alternatively as "sharp" (higher in pitch) and "soft" ("flat", lower in pitch). The structures of some of the most common tunings are the following: The traditional

Pythagorean tuning Pythagorean tuning is a system of musical tuning in which the frequency ratios of all intervals are based on the ratio 3:2.Bruce Benward and Marilyn Nadine Saker (2003). ''Music: In Theory and Practice'', seventh edition, 2 vols. (Boston: Mc ...

of the diatonic, also known as Ptolemy's ditonic diatonic, has two identical 9:8 tones (see

major tone In Western music theory, a major second (sometimes also called whole tone or a whole step) is a second spanning two semitones (). A second is a musical interval encompassing two adjacent staff positions (see Interval number for more deta ...

) in succession, making the other interval a Pythagorean limma (256:243): hypate parhypate lichanos mese 4:3 81:64 9:8 1:1 , 256:243 , 9:8 , 9:8 , -498 -408 -204 0 cents However, the most common tuning in practice from about the 4th century BC to the 2nd century AD appears to have been Archytas's diatonic, or Ptolemy's "tonic diatonic", which has an 8:7 tone (see

septimal whole tone In music, the septimal whole tone, septimal major second, or supermajor second is the musical interval exactly or approximately equal to an 8/7 ratio of frequencies.Andrew Horner, Lydia Ayres (2002). ''Cooking with Csound: Woodwind and Brass R ...

) and the

superparticular In mathematics, a superparticular ratio, also called a superparticular number or epimoric ratio, is the ratio of two consecutive integer numbers. More particularly, the ratio takes the form: :\frac = 1 + \frac where is a positive integer. Thu ...

28:27 instead of the complex 256:243 for the lowest interval: hypate parhypate lichanos mese 4:3 9:7 9:8 1:1 , 28:27 , 8:7 , 9:8 , -498 -435 -204 0 cents Didymus described the following tuning, similar to Ptolemy's later tense diatonic, but reversing the order of the 10:9 and 9:8, namely: hypate parhypate lichanos mese 4:3 5:4 9:8 1:1 , 16:15 , 10:9 , 9:8 , -498 -386 -204 0 cents Ptolemy, following Aristoxenus, also described "tense" and "relaxed" ("intense" and "soft") tunings. His "tense diatonic", as used in

Ptolemy's intense diatonic scale Ptolemy's intense diatonic scale, also known as the Ptolemaic sequence, justly tuned major scale, Ptolemy's tense diatonic scale, or the syntonous (or syntonic) diatonic scale, is a tuning for the diatonic scale proposed by Ptolemy, and corresp ...

, is: hypate parhypate lichanos mese 4:3 5:4 10:9 1:1 , 16:15 , 9:8 , 10:9 , -498 -386 -182 0 cents Ptolemy's "relaxed diatonic" ("soft diatonic") was: hypate parhypate lichanos mese 4:3 80:63 8:7 1:1 , 21:20 , 10:9 , 8:7 , -498 -413 -231 0 cents Ptolemy described his "equable" or "even diatonic" as sounding foreign or rustic, and its

neutral second In music theory, a neutral interval is an interval that is neither a major nor minor, but instead in between. For example, in equal temperament, a major third is 400 cents, a minor third is 300 cents, and a neutral third is 350 cents. A neutral ...

s are reminiscent of scales used in

. It is based on an equal division of string lengths (thus presumably simple to build and "rustic"), which implies a harmonic series of pitch frequencies: hypate parhypate lichanos mese 4:3 11:9 10:9 1:1 , 12:11 , 11:10 , 10:9 , -498 -347 -182 0 cents

Byzantine music

In Byzantine music most of the modes of the

octoechos Oktōēchos (here transcribed "Octoechos"; Greek: ;The feminine form exists as well, but means the book octoechos. from ὀκτώ "eight" and ἦχος "sound, mode" called echos; Slavonic: Осмогласие, ''Osmoglasie'' from о́с� ...

are based on the diatonic genus, apart from the ''second mode (both authentic and plagal)'' which is based on the

chromatic genus In the musical system of ancient Greece, genus (Greek: γένος 'genos'' pl. γένη 'genē'' Latin: ''genus'', pl. ''genera'' "type, kind") is a term used to describe certain classes of intonations of the two movable notes within a tetrach ...

. Byzantine music theory distinguishes between two tunings of the diatonic genus, the so-called "hard diatonic" on which the ''third mode'' and two of the ''grave modes'' are based, and the "soft diatonic" on which the ''first mode (both authentic and plagal)'' and the ''fourth mode (both authentic and plagal)'' are based. The hard tuning of the diatonic genus in Byzantine music may also be referred to as the ''enharmonic genus''; an unfortunate name that persisted, since it can be confused with the ancient

enharmonic genus In the musical system of ancient Greece, genus (Greek: γένος 'genos'' pl. γένη 'genē'' Latin: ''genus'', pl. ''genera'' "type, kind") is a term used to describe certain classes of intonations of the two movable notes within a tetrach ...

Chromatic

Aristoxenus describes the chromatic genus ( el, χρωματικὸν γένος or χρωματική) as a more recent development than the diatonic. It is characterized by an upper interval of a

minor third In music theory, a minor third is a musical interval that encompasses three half steps, or semitones. Staff notation represents the minor third as encompassing three staff positions (see: interval number). The minor third is one of two com ...

. The ''pyknon'' (πυκνόν), consisting of the two movable members of the tetrachord, is divided into two adjacent semitones. The scale generated by the chromatic genus is not like the modern twelve-tone

chromatic scale The chromatic scale (or twelve-tone scale) is a set of twelve pitches (more completely, pitch classes) used in tonal music, with notes separated by the interval of a semitone. Chromatic instruments, such as the piano, are made to produce the ...

. The modern (18th-century) well-tempered chromatic scale has twelve pitches to the

octave In music, an octave ( la, octavus: eighth) or perfect octave (sometimes called the diapason) is the interval between one musical pitch and another with double its frequency. The octave relationship is a natural phenomenon that has been refer ...

, and consists of semitones of various sizes; the

equal temperament An equal temperament is a musical temperament or tuning system, which approximates just intervals by dividing an octave (or other interval) into equal steps. This means the ratio of the frequencies of any adjacent pair of notes is the same, wh ...

common today, on the other hand, also has twelve pitches to the octave, but the semitones are all of the same size. In contrast, the ancient Greek chromatic scale had seven pitches (i.e. heptatonic) to the octave (assuming alternating conjunct and disjunct tetrachords), and had incomposite minor thirds as well as semitones and whole tones. The (Dorian) scale generated from the chromatic genus is composed of two chromatic tetrachords: Greek Dorian chromatic genus

:E−F−G−A , , B−C−D−E whereas in modern music theory, a "

" is: :E−F−G−A−B−C−D−E

Shades

The number and nature of the shades of the chromatic genus vary amongst the Greek theorists. The major division is between the Aristoxenians and the Pythagoreans. Aristoxenus and Cleonides agree there are three, called soft, hemiolic, and tonic.

Ptolemy Claudius Ptolemy (; grc-gre, Πτολεμαῖος, ; la, Claudius Ptolemaeus; AD) was a mathematician, astronomer, astrologer, geographer, and music theorist, who wrote about a dozen scientific treatises, three of which were of importanc ...

, representing a Pythagorean view, held that there are five.

Tunings

Theon of Smyrna Theon of Smyrna ( el, Θέων ὁ Σμυρναῖος ''Theon ho Smyrnaios'', ''gen.'' Θέωνος ''Theonos''; fl. 100 CE) was a Greek philosopher and mathematician, whose works were strongly influenced by the Pythagorean school of thought. Hi ...

gives an incomplete account of

Thrasyllus of Mendes Thrasyllus of Mendes (; grc-gre, Θράσυλλος ), also known as Thrasyllus of AlexandriaLevick, ''Tiberius: The Politician'', p. 7 and by his Roman name Tiberius Claudius ThrasyllusLevick, ''Tiberius: The Goat '', p. 137 (fl. second ha ...

' formulation of the greater perfect system, from which the diatonic and enharmonic genera can be deduced. For the chromatic genus, however, all that is given is a 32:27 proportion of ''mese'' to ''lichanos''. This leaves 9:8 for the ''pyknon'', but there is no information at all about the position of the chromatic ''parhypate'' and therefore of the division of the ''pyknon'' into two semitones, though it may have been the ''limma'' of 256:243, as

Boethius Anicius Manlius Severinus Boethius, commonly known as Boethius (; Latin: ''Boetius''; 480 – 524 AD), was a Roman senator, consul, ''magister officiorum'', historian, and philosopher of the Early Middle Ages. He was a central figure in the tr ...

does later. Someone has referred to this speculative reconstructions as the traditional

of the chromatic genus: hypate parhypate lichanos mese 4:3 81:64 32:27 1:1 , 256:243 , 2187:2048 , 32:27 , -498 -408 -294 0 cents Archytas used the simpler and more consonant 9:7, which he used in all three of his genera. His chromatic division is: hypate parhypate lichanos mese 4:3 9:7 32:27 1:1 , 28:27 , 243:224 , 32:27 , -498 -435 -294 0 cents According to

's calculations, Didymus's chromatic has only 5-

limit Limit or Limits may refer to: Arts and media * ''Limit'' (manga), a manga by Keiko Suenobu * ''Limit'' (film), a South Korean film * Limit (music), a way to characterize harmony * "Limit" (song), a 2016 single by Luna Sea * "Limits", a 2019 ...

intervals, with the smallest possible numerators and denominators. The successive intervals are all

superparticular ratio In mathematics, a superparticular ratio, also called a superparticular number or epimoric ratio, is the ratio of two consecutive integer numbers. More particularly, the ratio takes the form: :\frac = 1 + \frac where is a positive integer. Thu ...

s: hypate parhypate lichanos mese 4:3 5:4 6:5 1:1 , 16:15 , 25:24 , 6:5 , -498 -386 -316 0 cents

Byzantine music

In Byzantine music the chromatic genus is the genus on which the ''second mode'' and ''second plagal mode'' are based. The "extra" mode

nenano Phthora nenano (Medieval Greek: , also νενανώ) is the name of one of the two "extra" modes in the Byzantine Octoechos—an eight mode system, which was proclaimed by a synod of . The phthorai nenano and nana were favoured by composers at th ...

is also based on this genus.

Enharmonic

Aristoxenus describes the enharmonic genus ( grc, �ένοςἐναρμόνιον; lat, enarmonium,

enus Enus is a given name and surname. Notable people with the name include: *Anton Enus Anton Albert Enus is a South African-born Australian news presenter. He is currently co-host of '' SBS World News'' on Special Broadcasting Service (SBS). Car ...

enarmonicum, harmonia) as the "highest and most difficult for the senses". Historically it has been the most mysterious and controversial of the three genera. Its characteristic interval is a

(or

major third In classical music, a third is a musical interval encompassing three staff positions (see Interval number for more details), and the major third () is a third spanning four semitones. Forte, Allen (1979). ''Tonal Harmony in Concept and P ...

in modern terminology), leaving the ''pyknon'' to be divided by two intervals smaller than a semitone called dieses (approximately quarter tones, though they could be calculated in a variety of ways). Because it is not easily represented by

meantone temperament Meantone temperament is a musical temperament, that is a tuning system, obtained by narrowing the fifths so that their ratio is slightly less than 3:2 (making them ''narrower'' than a perfect fifth), in order to push the thirds closer to pure. M ...

, there was much fascination with it in the

Renaissance The Renaissance ( , ) , from , with the same meanings. is a period in European history marking the transition from the Middle Ages to modernity and covering the 15th and 16th centuries, characterized by an effort to revive and surpass ideas ...

. In the modern tuning system of

twelve-tone equal temperament Twelve-tone equal temperament (12-TET) is the musical system that divides the octave into 12 parts, all of which are equally tempered (equally spaced) on a logarithmic scale, with a ratio equal to the 12th root of 2 ( ≈ 1.05946). That resultin ...

, ''

enharmonic In modern musical notation and tuning, an enharmonic equivalent is a note, interval, or key signature that is equivalent to some other note, interval, or key signature but "spelled", or named differently. The enharmonic spelling of a written n ...

'' refers to tones that are ''identical'', but spelled differently. In other tuning systems, enharmonic notes, such as C and D, may be close but not identical, differing by a

comma The comma is a punctuation mark that appears in several variants in different languages. It has the same shape as an apostrophe or single closing quotation mark () in many typefaces, but it differs from them in being placed on the baseline ...

(an interval smaller than a semitone, like a diesis).

Notation

Modern notation for enharmonic notes requires two special symbols for raised and lowered quarter tones or half-semitones or quarter steps. Some symbols used for a quarter-tone flat are a downward-pointing arrow ↓, or a flat combined with an upward-pointing arrow ↑. Similarly, for a quarter-tone sharp, an upward-pointing arrow may be used, or else a sharp with a downward-pointing arrow. Three-quarter flat and sharp symbols are formed similarly. A further modern notation involves reversed flat signs for quarter-flat, so that an enharmonic tetrachord may be represented: :D E F G , or :A B C D . The double-flat symbol () is used for modern notation of the third tone in the tetrachord to keep scale notes in letter sequence, and to remind the reader that the third tone in an enharmonic tetrachord (say F, shown above) was not tuned quite the same as the second note in a diatonic or chromatic scale (the E expected instead of F).

Scale

Like the diatonic scale, the ancient Greek

enharmonic scale In music theory, an enharmonic scale is "an maginarygradual progression by quarter tones" or any " usicalscale proceeding by quarter tones". The enharmonic scale uses dieses (divisions) nonexistent on most keyboards,John Wall Callcott (1833). ...

also had seven notes to the octave (assuming alternating conjunct and disjunct tetrachords), not 24 as one might imagine by analogy to the modern chromatic scale. A scale generated from two disjunct enharmonic tetrachords is: :D E F G , , A B C D or, in music notation starting on E: Greek Dorian enharmonic genus

, with the corresponding conjunct tetrachords forming :A B C , D, E F G or, transposed to E like the previous example: Mixolydian enh

Tunings

The precise ancient Pythagorean tuning of the enharmonic genus is not known. Aristoxenus believed that the ''pyknon'' evolved from an originally

pentatonic A pentatonic scale is a musical scale (music), scale with five Musical note, notes per octave, in contrast to the heptatonic scale, which has seven notes per octave (such as the major scale and minor scale). Pentatonic scales were developed ...

trichord in which a perfect fourth was divided by a single " infix"—an additional note dividing the fourth into a semitone plus a major third (e.g., E, F, A, where F is the infix dividing the fourth E–A). Such a division of a fourth necessarily produces a scale of the type called pentatonic, because compounding two such segments into an octave produces a scale with just five steps. This became an enharmonic tetrachord by the division of the semitone into two quarter tones (E, E↑, F, A). Archytas, according to

, ''Harmonics'', ii.14—for no original writings by him survive—used 9:7, as in all three of his genera; here it is the

mediant In music, the mediant (''Latin'': to be in the middle) is the third scale degree () of a diatonic scale, being the note halfway between the tonic and the dominant.Benward & Saker (2003), p.32. In the movable do solfège system, the mediant note i ...

of 4:3 and 5:4, as (4+5):(3+4) = 9:7: hypate parhypate lichanos mese 4:3 9:7 5:4 1:1 , 28:27 , 36:35, 5:4 , -498 -435 -386 0 cents Also according to Ptolemy, Didymus uses the same major third (5:4) but divides the pyknon with the

arithmetic mean In mathematics and statistics, the arithmetic mean ( ) or arithmetic average, or just the ''mean'' or the ''average'' (when the context is clear), is the sum of a collection of numbers divided by the count of numbers in the collection. The colle ...

of the string lengths (if one wishes to think in terms of frequencies, rather than string lengths or interval distance down from the tonic, as the example below does, splitting the interval between the frequencies 4:3 and 5:4 by their harmonic mean 31:24 will result in the same sequence of intervals as below): hypate parhypate lichanos mese 4:3 31:24 5:4 1:1 , 32:31 , 31:30 , 5:4 , -498 -443 -386 0 cents This method splits the 16:15 half-step pyknon into two nearly equal intervals, the difference in size between 31:30 and 32:31 being less than 2 cents.

Rhythmic genera

The principal theorist of rhythmic genera was Aristides Quintilianus, who considered there to be three: equal ( dactylic or

anapest An anapaest (; also spelled anapæst or anapest, also called antidactylus) is a metrical foot used in formal poetry. In classical quantitative meters it consists of two short syllables followed by a long one; in accentual stress meters it consist ...

ic), sesquialteran ( paeonic), and duple ( iambic and

trochaic In English poetic metre and modern linguistics, a trochee () is a metrical foot consisting of a stressed syllable followed by an unstressed one. But in Latin and Ancient Greek poetic metre, a trochee is a heavy syllable followed by a light one (al ...

), though he also admitted that some authorities added a fourth genus, sesquitertian.

References

Sources

* * * * * * * * * * * *

Tetrachords

Diatonic

Etymology

Shades or tunings

Byzantine music

Chromatic

Shades

Tunings

Byzantine music

Enharmonic

Notation

Scale

Tunings

Rhythmic genera

References

Sources

Further reading