APPENDIX.

PAGE

Prism, Pyramid, Cylinder, Sphere, and Cone, 283

299

300

300

302

A.-Modern theory of parallel lines,

B.-Legendre's proof of Euclid, I., XXXII.,

C.-To inscribe a regular polygon of seventeen sides in a

circle-Ampere's solution simplified,

D.-To find two mean proportionals between two given

F.-On the trisection of an angle by the ruler and com-

THE

ELEMENTS OF EUCLID.

INTRODUCTION.

GEOMETRY is the Science of figured Space. Figured Space is of one, two, or three dimensions, according as it consists of lines, surfaces, or solids. The boundaries of solids are surfaces; of surfaces, lines; and of lines, points. Thus it is the province of Geometry to investigate the properties of solids, of surfaces, and of the figures described on surfaces. The simplest of all surfaces is the plane, and that department of Geometry which is occupied with the lines and curves drawn on a plane is called Plane Geometry; that which demonstrates the properties of solids, of curved surfaces, and the figures described on curved surfaces, is Geometry

B

र

of Three Dimensions. The simplest lines that can be drawn on a plane are the right line and circle, and the study of the properties of the point, the right line, and the circle, is the introduction to Geometry, of which it forms an extensive and important department. This is the part of Geometry on which the oldest Mathematical Book in existence, namely, Euclid's Elements, is written, and is the subject of the present volume. The conic sections and other curves that can be described on a plane form special branches, and complete the divisions of this, the most comprehensive of all the Sciences. The student will find in Chasles' Aperçu Historique a valuable history of the origin and the development of the methods of Geometry.

In the following work, when figures are not drawn, the student should construct them from the given directions. The Propositions of Euclid will be printed in larger type, and will be referred to by Roman numerals enclosed in brackets. Thus [III. XXXII.] will denote the 32nd Proposition of the 3rd Book. The number of the Book will be given only when different from that under

which the reference occurs.

The general and the

particular enunciation of every Proposition will be given in one. By omitting the letters enclosed in parentheses we have the general enunciation, and by reading them, the particular. The annotations will be printed in smaller type. The following symbols will be used in them :

In addition to these we shall employ the usual symbols +, -, &c. of Algebra, and also the sign of congruence, namely =. This symbol has been introduced by the illustrious Gauss.