A cube and a sphere have equal total surface area. Find the ratio of the volume of sphere and cube.

A sphere and a hemisphere have the same surface area. The ratio of their volumes is

A sphere and a cube have equal surface areas. The ratio of the volume of the sphere to that of the cube is sqrt(pi)backslash:sqrt(6)(b)sqrt(2)backslash sqrt(pi)(c)sqrt(pi)backslash:sqrt(3)(d)sqrt(6)backslash sqrt(pi)

A sphere and a cube has same surface area.Show that the ratio of the volume of sphere to cube is sqrt(6):sqrt(pi)

A sphere and a cube have same surface area. What is the ratio of the square of volume of the sphere to the square of volume of the cube ?

The sphere and cube have same surface. Show that the ratio of the volume of sphere to that of cube is root 6 : root pi

A sphere and a cube are of the same height. The ratio of their volume is

The total surface area of a cube is 96 m^(2) . The volume of the cube is

The total surface area of a cube is 96 cm^(2) . The volume of the cube is

A sphere is placed in a cube so that it touches all the faces of the cube. If 'a' is the ratio of the volume of the cube to the volume of the sphere, and 'b' is the ratio of the surface area of the sphere to the surface area of the cube, then the value of ab is:

The side of a cube is equal to the radius of the sphere. Find the ratio of their volumes.