...the fecond, tenth, fi Y y eleventh, eleventh, twelfth, and eighteenth, B. 12. El. in which he proves that Circles are to one another as the Squares of their Diameters; that a Cone is a third part of a Cylinder of the fame Bafe and Altitude ; that Cones and Cylinders...

...the circle. Now Euclid, in proving (Prop. 2. B. 12.) by means of polygons inscribed in the circles, that circles are to one another as the squares of their diameters, does not state expressly that the sides of the inscribed polygons are less than the least assignable...

...the consecutive deductions of the geometer is conscious of the necessary truth of the propositions, that circles are to one another as the squares of their diameters, and that spheres have to one another the triplicate ratio of that which their diameters have. If, then,...

...and to the making of a circle the double or the half of another circle, by Prop. 2, bk. xii. , ' ' that circles are to one another as the squares of their diameters. " 1°- To make a rectilineal figure AD KEF, similar to a given rectilineal figure ABLHC. Divide the...

...the consecutive deductions of the geometer is conscious of the necessary truth of the propositions, that circles are to one another as the squares of their diameters, and that spheres have to one another the triplicate ratio of that which their diameters have. If, then,...

...angle ;" and to the making of a circle the double or the half of another circle, by Prop. 2, bk. xii., "that circles are to one another as the squares of their diameters.". 1Q. To make a rectil. figure ADKEF, similar to a given rectil. figure ABLHC. Divide the figure into...

...these further attempts. It appears that Hippocrates made some important additions to his proposition that circles are to one another as the squares of their diameters. He proved1 that similar segments of a circle are to one another as the squares of their chords (/3ao-«9)...

...Similar triangles are to one another in the duplicate ratio of their homologous sides. Show briefly now it is proved that circles are to one another as the squares on their radii. 5. Draw a perpendicular to a given plane from a given point without it. If two straight...

...octagons, Xs and Y3 inscribed regular figures of sixteen sides, etc., the preceding process gives the proof that circles are to one another as the squares of their diameters. See De Morgan's article, Ceometry of the Greeks, in the Penny Encyclopedia, and Gow, pp. 171, 172....

...octagons, X, and Y3 inscribed regular figures of sixteen sides, etc., the preceding process gives the proof that circles are to one another as the squares of their diameters. See De Morgan's article, Geometry of the Greeks, in the Penny Encyclopedia, and Gow, pp. 171, 172....