If slant height of a right circular cone is `3 cm` then the maximum volume of cone is (a) `2sqrt(3) pi cm^(3)` (b) `4sqrt(3) pi cm^(3)` (c) `(2+sqrt(3)) pi cm^(3)` (d) `(2-sqrt(3)) pi cm^(3)`

The slant height of a right circular cone is 3cm. The height of the cone if its volume is greatest is equal to

The radius and height of a right circular cone are 4 cm and 9 cm respectively. Its volume will be : (i) 36pi cm^(3) (ii) 48pi cm^(3) (iii) 72pi cm^(3) (iv) 100pi cm^(3)

The volume of a right circular cone of height 3 cm and slant height 5 cm is

The diameter of a right circular cone is 8cm and its volume is 48 pi cm^(3). What is its height?

The height of a right circular cone is 84 cm and its base radius is 3.5 cm. Its volume is (A) 3234 cm^3 (B) 1078cm^3 (c ) 2156 cm^3 (D) 2496 cm^3

If the volume of a right circular cone of height 9cm is 48 pi cm^(3) find the diameter of its base.

The radius of a right circular cone is 3 cm and its height is 4 cm. The total surface area of the cone is

The base of a right pyramid is an equilateral triangle of side 4cm .The height of the pyramid is half of its slant height. The volume of the pyramid is: A) (8sqrt(3))/(9)cm^(3) B) (4sqrt(3))/(9)cm^(3) C) (16)/(3)cm^(3) D) (18)/(sqrt(3))cm^(3)

Each side of a regular hexagon is 1cm. The area of the hexagon is 3sqrt(2)backslash cm^(2) (b) 4sqrt(3)backslash cm^(2) (c) (3sqrt(3))/(4)backslash cm^(2) (d) (3sqrt(3))/(2)backslash cm^(2)

A right circular cone have slant height 3 cm. Then its volume is maximum at height