16. A Cylinder is a solid, described by the revolution of a rectangle, AEFD, about a fixed side, EF.

As the rectangle AEFD, turns around the side EF, like a door upon its hinges, the lines AE and FD describe circles, and the line AD describes the convex surface of the cylinder.

E

The circle described by the line AE, is called the lower base of the cylinder, and the circle described by DF, is called upper base.

the

Of the Cylinder.

The immovable line EF is called the axis of the cylinder A cylinder, therefore, is a round body with circular ends

17. If a plane be passed through the axis of a cylinder, it will intersect the cylinder in a rectangle, PG, which is double the revolving rectangle DE.

K

18. If a cylinder be cut by a plane parallel to the base, the section will be a circle equal to the base. For, while the side FC, of the rectangle MC, describes

the lower base, the equal side MP, will describe the circle MLKN, equal to the F lower base.

19 If a polygon be inscribed in the lawer base of a cylinder, and a corresponding polygon be inscribed in the upper base, and their vertices be joined by straight lines, the prism thus formed is said to be inscribed in the cylinder.

Of the Cone.

20. A cone is a solid, described by the revolution of a right angled triangle, ABC, about one of its sides, CB. The circle described by the revolving side, AB, is called the base of the cone. The hypothenuse, AC, is called the slant height of the cone, and the surface described by it, is called the conver surface of the cone.

The side of the triangle, CB, which remains fixed, is called the axis, or altitude of the cone, and the point C, the vertex of the cone.

21. If a cone be cut by a plane parallel to the base, the section will be a circle. For, while in the revolution of the right angled triangle SAC, the line CA describes the base of the cone, its parallel FG will describe a circle FKHI, parallel to the base. If from the cone S-CDB, the cone S-FKH be taken away, the remaining part is called the frustum of the cone

22. If a polygon be inscribed in the base of a cone, and straight lines be drawn from its vertices to the vertex of the cone, the pyramid thus formed is said to be inscribed in the cone. Thus, the pyramid S-ABCD is inscribed in

the cone

F

H

G

K

A

B

D

E

D

Of the Sphere.

23. Two cylinders are similar, when the diameters of their bases are proportional to their altitudes.

24. Two cones are also similar, when the diameters of then bases are proportional to their altitudes.

25. A sphere is a solid terminated by a curved surface, all the points of which are equally distant from a certain point within called the centre.

Of the Sphere.

29. All diameters of a sphere are equal to each other and each is double a radius.

30. The axis of a sphere is any line about which it r rolves; and the points at which the axis meets the surface, are called the poles.