Answer:
The surface area and volume of the cube are 5400 in² and 27,000 in³.
Step-by-step explanation:
We are given that the volume of the cube is 4500π in³.
As, Volume of a cube = [tex]\frac{4}{3}\pi r^3[/tex]
So, we have,
[tex]4500\pi = \frac{4}{3}\pi r^3\\\\r^3=\frac{4500\times 3}{4}\\\\r^3=3375\\\\r=15\ inches[/tex]
Then, the diameter (d) is given by,
[tex]d=2r\\\\d=2\times 15\\\\d=30\ inches[/tex]
Since, the diameter of the basketball is equal to the edge length of the cube.
Then, edge length of the cube (a) is 30 inches.
So, Surface area of the cube = [tex]6a^2=6\times 30^2=5400\ in^2[/tex]
And, Volume of the cube = [tex]a^3=30^3=27000\ in^3[/tex]
Hence, the surface area and volume of the cube are 5400 in² and 27,000 in³.
