Question

If a sphere & cube have the same surface, find the ratio of the volume of the sphere to that of the cube? ​

Answer 1

Answer:

Let r and a be the radius of the sphere and edge of the cube respectively.

Given, Surface area of sphere = Surface area of cube

4πr2 = 6a2

(r/a)2 = 3 / 2π

r / a = √(3/2π)

Volume of sphere / Volume of cube = (4/3)πr3 / a3 = (4π/3)(r/a)3

= (4π/3)(√(3/2π))3

= (4π/3)(3/2π)(√(3/2π))

= 2√(3/2π)

= √(4x3/2π)

= √(6/π)

Thus, Volume of sphere : Volume of cube = √6 : √π.

Answer 2

Answer:

show that the ratio of the volumes of the sphere to that of the cube is √6 : √π show that the ratio of the volumes of the sphere to that of the cube is √6 : √π. ...