If the volume of a sphere inscribed in a cubic box is 36pi, find the surface area of the box

Question

asked Sep 9, 2021 141k views

1 Answer

Jack Freeman · Answer 1 · 2021-09-14T01:53:25+0000

Answer:

Surface area of the cube = 216 square units

Explanation:

Let the length of a side of a cube = x unit

Diameter of the sphere inscribed in this cube = length of a side of the cube

Volume of the sphere =
$(4)/(3)\pi r^(3)$

Where r = radius of the sphere =
(x)/(2) units

36π =
$(4)/(3)\pi ((x)/(2))^(3)$

36π =
$(4x^(3)\pi )/(24)$

36×24 = 4x³

x =
$\sqrt[3]{(36* 24)/(4) }$

x = 6 units

Length of a side of the cube = 6 units

Surface area of the cube = 6×(Side)²

= 6×(6)²

= 216

= 216 square units