ἱστορίαι Historiai
Plut. Mor., Concerning Music 22 Concerning Music, Plutarch; served verbatim
Having already shown that Plato neither for want of skill nor for ignorance blamed all the other moods and casts of composition, we now proceed to show that he really w^s skilled in harmony. For in his discourse concerning the procreation of the soul, inserted into Timaeus, he has made known his great knowledge in all the sciences, and of music among the rest, in this manner : " After this," saith he, " he filled up the double and treble intervals, taking parts from thence, and adding them to the midst between them, so that there were in every interval two middle terms." * This proem was the effect of his experience in music, as we shall presently make out. The means from whence every mean is taken are three, arithmetical, enharmonical, geometrical. Of these the first exceeds and is exceeded in number, the second in proportion, the third neither in number nor proportion. Plato therefore, desirous to show the harmony of the four elements in the soul, and harmonically also to explain the reason of that mutual concord arising from discording and jarring principles, undertakes to make out two middle terms of the soul in every interval, according to harmonical proportion. Thus in a musical octave there happen to be two middle distances, whose proportion we shall explain. As for the octaves, they keep a double proportion between their two extremes. For example, let the double arithmetical proportion be 6 and 12, this being the interval between the vTtdr?^ ^iawv and the vi]xri di^^svyfisvmv ; 6 therefore and 12 being the two extremes, the former note contains the number 6, and the latter 12. To these are to be added the intermediate numbers, to which the extremes must hold the proportion, the one of one and a third, and the other of one and a half. These are the numbers 8 and 9. For as 8 contains one and a third of 6, so 9 contains one and a half of 6 ; thus you have one extreme. The other is 12, containing 9 and a third part of 9, and 8 and half 8. These then being the numbers between 6 and 12, and the interval of the octave consisting of a diatessaron and diapente, it is plain that the number 8 belongs to mese, and the number 9 to paramese ; which being so, it follows that hypate is to mese as paramese to nete of the disjunct tetrachords ; for it is a fourth from the first term to the second of this proportion, and the same interval from the third term to the fourth. The same proportion will be also found in the numbers. For as 6 is to 8, so is 9 to 12 ; and as 6 is to 9, so is 8 to 12. For 8 is one and a third part of 6, and 12 of 9 ; while 9 is one and a half part of 6, and 12 of 8. What has been said may suffice to show how great was Plato's zeal and learning in the liberal sciences.

The Greek stands ready in the workroom; the English is served. Both faces will read together.

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Filed here — the addresses this episode attests; counted by the house’s first pass

Concerning Music, Plutarch — translated by John Philips (rev. W. W. Goodwin), 1874
Apparatus shelf + pinned Perseus TEI — Plutarch's Morals (the Moralia), ed. William W. Goodwin, five volumes · 'Plutarch's Morals. Translated from the Greek by several hands. Corrected and revised by William W. Goodwin, Ph. D.', with an introduction by R. W. Emerson; Boston: Little, Brown, and Company, 1874 (five volumes; a minority of the TEI transcriptions were keyed from the same publisher's 1878 reprint)
license: public-domain (US: the Goodwin edition is an 1874 Boston publication of a 1684-1694 translation — title pages verified on all five shelf scans at acquisition; Perseus digital editions CC BY-SA 4.0, attribution recorded per ops/corpus-staging/SOURCES.md pattern)