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QUADRATURE OF THE CIRCLE, AND THE
TO WHICH ARE ADDED,
ELEMENTS OF PLANE AND SPHERICAL
JOHN PLAYFAIR, F.R.S. LOND. & EDIN.
PROFESSOR OF NATURAL PHILOSOPHY, FORMERLY OF MATHEMATICS, IN THE
FROM THE LAST LONDON EDITION, ENLARGED.
LIPPINCOTT, GRAM BO & CO.
Entered according to the Act of Congress, in the year One Thousand
Eight Hundred and Forty-five, by W. E. DEAN, in the Clerk's Of fice of the Southern District of New-York.
Ir is a remarkable fact in the history of science, that the oldest book of Elementary Geometry is still considered as the best, and that the writings of EUCLID, at the distance of two thousand years, continue to form the most approved introduction to the mathematical sciences. This remarkable distinction the Greek Geometer owes not only to the elegance and correctness of his demonstrations, but to an arrangement most happily contrived for the purpose of instruction,-advantages which, when they reach a certain eminence, secure the works of an author against the injuries of time more effectually than even originality of invention. The Elements of EuCLID, however, in passing through the hands of the ancient editors during the decline of science, had suffered some diminution of their excellence, and much skill and learning have been employed by the modern mathematicians to deliver them from blemishes which certainly did not enter into their original composition. Of these mathematicians, Dr. SIMSON, as he may be accounted the last, has also been the most successful, and has left very little room for the ingenuity of future editors to be exercised in, either by amending the text of EUCLID, or by improving the translations from it.
Such being the merits of Dr. SIMSON's edition, and the reception it has met with having been every way suitable, the work now offered to the public will perhaps appear unnecessary. And indeed, if the geometer just named had written with a view of accommodating the Elements of EUCLID to the present state of the mathematical sciences, it is not likely that any thing new in Elementary Geometry would have been soon attempted. But his design was different; it was his object to restore the writings of EUCLID to their original perfection, and to give them to Modern Europe as nearly as possible in the state wherein they made their first appearance in Ancient Greece. For this undertaking, nobody could be better qualified than Dr. SIMSON; who, to an accurate knowledge of the learned languages, and an indefatigable spirit of research, added a profound skill in the ancient Geometry, and an admiration of it almost enthusiastic. Accordingly, he not only restored the text of EUCLID wherever it had been corrupted, but in some cases removed imperfections that probably belonged to the original work: though his extreme partiality for his author never permitted him to suppose that such honour could fall to the share either of himself, or of any other of the moderns.
But, after all this was accomplished, something still remained to be done, since, notwithstanding the acknowledged excellence of EUCLID'S Elements, it could not be doubted that some alterations might be made that would accommodate them better to a state of the mathematical sciences, so much more improved and extended than at the period when they were written. Accordingly, the object of the edition now offered to the public, is not so much to give the writings of EUCLID the form which they originally had, as that which may at present render them most useful.
One of the alterations made with this view, respects the Doctrine of Proportion, the method of treating which, as it is laid down in the fifth of EUCLID, has great advantages accompanied with considerable defects; of which, however, it must be observed, that the advantages are essential, and the defects only accidental. To explain the nature of the former requires. a more minute examination than is suited to this place, and must therefore be reserved for the Notes; but, in the mean time, it may be remarked, that no definition, except that of EUCLID, has ever been given, from which the properties of proportionals can be deduced by reasonings, which, at the same time that they are perfectly rigorous, are also simple and direct. As to the defects, the prolixness and obscurity that have so often been complained of in the fifth Book, they seem to arise chiefly from the nature of the language employed, which being no other than that of ordinary discourse, cannot express, without much tediousness and circumlocution, the relations of mathematical quantities, when taken in their utmost generality, and when no assistance can be received from diagrams. As it is plain that the concise language of Algebra is directly calculated to remedy this inconvenience, I have endeavoured to introduce it here, in a very simple form however, and without changing the nature of the reasoning, or departing in any thing from the rigour of geometrical demonstration. By this means, the steps of the reasoning which were before far separated, are brought near to one another, and the force of the whole is so clearly and directly perceived, that I am persuaded no more difficulty will be found in understanding the propositions of the fifth Book than those of any other of the Elements.
In the second Book, also, some algebraic signs have been introduced, for the sake of representing more readily the addition and subtraction of the rectangles on which the demonstrations depend. The use of such symbolical writing, in translating from an original, where no symbols are used, cannot, I think, be regarded as an unwarrantable liberty: for, if by that means the translation is not made into English, it is made into that universal language so much sought after in all the sciences, but destined, it would seem, to be enjoyed only by the mathematical.
The alterations above mentioned are the most material that have been attempted on the books of EUCLID. There are, however, a few others, which, though less considerable, it is hoped may in some degree facilitate the study of the Elements. Such are those made on the definitions in the first Book, and particularly on that of a straight line. A new axiom is also introduced in the room of the 12th, for the purpose of demonstrating more easily some of the properties of parallel lines. In the third Book, the remarks concerning the angles made by a straight line, and the circumference of a circle, are left out, as tending to perplex one who has advanced no farther than the elements of the science. Some propositions also have been added; but for a fuller detail concerning these changes, I must refer to the Notes, in which several of the more difficult, or more interesting subJects of Elementary Geometry are treated at considerable length.
COLLEGE OF Edinburgh;
Dec. 1, 1813
EXPLANATION OF TERMS AND SIGNS.
1. Geometry is a science which has for its object the measurement of magnitudes.
Magnitudes may be considered under three dimensions,-length, breadth, height or thickness.
2. In Geometry there are several general terms or principles; such as, Definitions, Propositions, Axioms, Theorems, Problems, Lemmas, Scho liums, Corollaries, &c.
3. A Definition is the explication of any term or word in a science, showing the sense and meaning in which the term is employed.
Every definition ought to be clear, and expressed in words that are common and perfectly well understood.
4. An Axiom, or Maxim, is a self-evident proposition, requiring no formal demonstration to prove the truth of it; but is received and assented to as soon as mentioned.
Such as, the whole of any thing is greater than a part of it; or, the whole is equal to all its parts taken together; or, two quantities that are each of them equal to a third quantity, are equal to each other. 5. A Theorem is a demonstrative proposition; in which some property is asserted, and the truth of it required to be proved.
Thus, when it is said that the sum of the three angles of any plane triangle is equal to two right angles, this is called a Theorem; and the method of collecting the several arguments and proofs, and laying them together in proper order, by means of which the truth of the proposition becomes evident, is called a Demonstration.
6 A Direct Demonstration is that which concludes with the direct and ce tain proof of the proposition in hand.
It is also called Positive or Affirmative, and sometimes an Ostensive De monstration, because it is most satisfactory to the mind