What is Frustum? Height and slant height of Frustum.

Radius; Height and Slant Height of Cone

If the radus of two circular ends of a busket are 5//2 cm and 1 cm respectively and its height is 6 cm then find the slant height of frustum.

The radii of the circular ends of a frustum of a cone are 14 cm and 8 cm. If the height of the frustum is 8 cm, find (i) slant height of frustum (ii) total surface area of frustum (iii) Volume of frustum, (pi=3.14)

If the radii of circular ends of a frustum of a cone are 20 cm and 12 cm and its length is 6 cm, then find the slant height of frustum.

A tent consists of a frustum of a cone, surmounted by a cone. If the diameters of the upper and lower and circular ends of the frustum be 14 m and 26 m respectively, the height of the frustum be 8 m and the slant height of the surmounted conical portion be 12 m, find the area of the canvas required to make the tent. (Assume that the radii of the upper circular end of the frustum and the base of the surmounted conical portion are equal).

Let C be a right-circular cone. It is given that the two ends of a frustum of C are of radii 3 cm and 6 cm, and the height of the frustum is 9 cm. What is the slant height of the given frustum?

A tent consists of a frustum of a cone capped by a cone. If the radii of the ends of the frustum be 13 m and 7 m, the height of the frustum be 8 m and the slant height of the conical cap be 12 m, find the canvas required for the tent.

If r_1 and r_2 denote the radii of the circular bases of the frustum of a cone such that r_1> r_2 , then write the ratio of the height of the cone of which the frustum is a part to the height of the frustum.

The radius of the base of a right circular cone is r.It is cut by a plane parallel to the base at aheight h from the base.The slant height of the frustum is sqrt(h^(2)+(4)/(9)r^(2)) .Show that the volume of 13 the frustum is (13)/(27)pi r^(2)h

Volume of a Frustum