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What is mathematics?
Aristotle thinks that all philosophy consisted of theory and practice,11951195 θεωρίας καὶ πράξεως. and divides the practical into ethical and political, and the theoretic again into the theological, the physical, and the mathematical. And thus very clearly and skilfully he shows that mathematics is (a branch of) philosophy.
The Chaldæans were the originators of astronomy, and the Egyptians of geometry and arithmetic.…
And whence did mathematics derive its name?
Those of the Peripatetic school affirmed that in rhetoric and poetry, and in the popular music, any one may be an adept though he has gone through no process of study; but that in those pursuits properly called studies,11961196 μαθήματα. none can have any real knowledge unless he has first become a student of them. Hence they supposed that the theory of these things was called Mathematics, from μάθημα, study, science. And the followers of Pythagoras are said to have given this more distinctive name of mathematics to geometry, and arithmetic alone. For of old these had each its own separate name; and they had up till then no name common to both. And he (Archytas) gave them this name, because he found science11971197 τὸ ἐπιστημονικόν. in them, and that in a manner suitable to man’s study.11981198 μάθησιν. For they (the Pythagoreans) perceived that these studies dealt with things eternal and immutable and perfect,11991199 εἰλικρινῆ, absolute. in which things alone they considered that science consisted. But the more recent philosophers have given a more extensive application to this name, so that, in their opinion, the mathematician deals not only with substances12001200 ὕλην. incorporeal, and falling simply within the province of the understanding,12011201 νοητήν. but also with that which touches upon corporeal and sensible matter. For he ought to be cognisant of12021202 θεωρητικός. the course of the stars, and their velocity, and their magnitudes, and forms, and distances. And, besides, he ought to investigate their dispositions to vision, examining into the causes, why they are not seen as of the same form and of the same size from every distance, retaining, indeed, as we know them to do, their dispositions relative to each other,12031203 τοὺς πρὸς ἄλληλα λόγους. but producing, at the same time, deceptive appearances, both in respect of order and position. And these are so, either as determined by the state of the heavens and the air, or as seen in reflecting and all polished surfaces and in transparent bodies, and in all similar kinds. In addition to this, they thought that the man ought to be versed in mechanics and geometry and dialectics. And still further, that he should engage himself with the causes of the harmonious combination of sounds, and with the composition of music; which things are bodies,12041204 σώματα, substances. or at least are to be ultimately referred to sensible matter.
What is mathematics?
Mathematics is a theoretic science12051205 ἐπιστήμη θεωρητική. of things apprehensible by perception and sensation for communication to others.12061206 πρὸς τὴν τῶν ὑποπιπτόντων δόσιν. And before this a certain person indulging in a joke, while hitting his mark, said that mathematics is that science to which Homer’s description of Discord may be applied.—
“Small at her birth, but rising every hour,
While scarce the skies her horrid (mighty) head can bound,
How many divisions are there of mathematics?
Of the more notable and the earliest mathematics there are two principal divisions, viz., arithmetic and geometry. And of the mathematics which deals with things sensible there are six divisions, viz., computation (practical arithmetic), geodesy, optics, theoretical music, mechanics, and astronomy. But that neither the so-called tactics nor architecture,12091209 τὸ ἀρχιτεκτονικόν. nor the popular music, nor physics, nor the art which is called equivocally the mechanical, constitutes, as some think, a branch of mathematics, we shall prove, as the discourse proceeds, clearly and systematically.
As to the circle having eight solids and six superficies and four angles.…What branches of arithmetic have closest affinity with each other? Computation and theoretical music have a closer 153affinity than others with arithmetic; for this department, being one also of quantity and ratio, approaches it in number and proportion.12101210 ἀναλογίας. Optics and geodesy, again, are more in affinity with geometry. And mechanics and astrology are in general affinity with both.
As to mathematics having its principles12111211 ἀρχάς, beginnings. in hypothesis and about hypothesis. Now, the term hypothesis is used in three ways, or indeed in many ways. For according to one usage of the term we have the dramatic revolution;12121212 περιπέτεια, reversal of circumstances on which the plot of a tragedy hinges. and in this sense there are said to be hypotheses in the dramas of Euripides. According to a second meaning, we have the investigation of matters in the special in rhetoric; and in this sense the Sophists say that a hypothesis must be proposed. And, according to a third signification, the beginning of a proof is called a hypothesis, as being the begging of certain matters with a view to the establishment of another in question. Thus it is said that Democritus12131213 A native of Abdera, in Thrace, born about 460 b.c., and, along with Leucippus, the founder of the philosophical theory of atoms, according to which the creation of all things was explained as being due to the fortuitous combination of an infinite number of atoms floating in infinite space. used a hypothesis, namely, that of atoms and a vacuum; and Asclepiades12141214 A famous physician, a native of Bithynia, but long resident in great repute at Rome in the middle of the first century b.c. He adopted the Epicurean doctrine of atoms and pores, and tried to form a new theory of disease, on the principle that it might be in all cases reduced to obstruction of the pores and irregular distribution of the atoms. that of atoms12151215 ὄγκοις. and pores. Now, when applied to mathematics, the term hypothesis is to be taken in the third sense.
That Pythagoras was not the only one who duly honoured arithmetic, but that his best known disciples did so too, being wont to say that “all things fit number.”12161216 [Wisd. xi. 20; Ecclus. xxxviii. 29 and xlii. 7.]
That arithmetic has as its immediate end chiefly the theory of science,12171217 τὴν ἐπιστημονικὴν θεωρίαν. than which there is no end either greater or nobler. And its second end is to bring together in one all that is found in determinate substance.12181218 συλλήβδην καταλαβεῖν πόσα τῇ ὡρισμένῃ οὐσίᾳ συμβέβηκεν.
Who among the mathematicians has made any discovery?
Eudemus12191219 A native of Rhodes, a disciple of Aristotle, and editor of his works. relates in his Astrologies that Œnopides12201220 A native of Chios, mentioned by Plato in connection with Anaxagoras, and therefore supposed by some to have been a contemporary of the latter sage. found out the circle of the zodiac and the cycle12211221 περίστασιν, revolution. of the great year. And Thales12221222 Of Miletus, one of the sages, and founder of the Ionic school. discovered the eclipse of the sun and its period in the tropics in its constant inequality. And Anaximander12231223 Of Miletus, born 610 b.c., the immediate successor of Thales in the Ionic school of philosophy. discovered that the earth is poised in space,12241224 μετέωρος. and moves round the axis of the universe. And Anaximenes12251225 Of Miletus, the third in the series of Ionic philosophers. discovered that the moon has her light from the sun, and found out also the way in which she suffers eclipse. And the rest of the mathematicians have also made additions to these discoveries. We may instance the facts—that the fixed stars move round the axis passing through the poles, while the planets remove from each other12261226 απεχουσιν ἀλλήλων. round the perpendicular axis of the zodiac; and that the axis of the fixed stars and the planets is the side of a pentedecagon with four-and-twenty parts.
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