Answer:
(D) 30pi inches
Step-by-step explanation:
First, we use the given volume, the given height, and the formula of the volume of a cylinder to find the radius of the base. Then we use the radius of the base to find the circumference of the base.
[tex] volume = \pi r^2 h [/tex]
[tex] volume = 6750 \pi~in.^3 [/tex]
We set the formula equal to the volume and replace h with 30 in.
[tex] \pi r^2 h = 6750 \pi~in.^3 [/tex]
[tex] \pi r^2 \times 30 ~in. = 6750 \pi~in.^3 [/tex]
Divide both sides by 30pi in.
[tex] r^2 = 225 ~in.^2 [/tex]
Take the square root of each side.
[tex] \sqrt{r^2} = \sqrt{225 ~in.^2} [/tex]
[tex] r = 15~in. [/tex]
The radius of the base is 15 in.
Now we use the radius of the base and the formula of the circumference of a circle to find the answer.
[tex] circumference = 2 \pi r [/tex]
[tex] circumference = 2 \pi \times 15~in. [/tex]
[tex] circumference = 30 \pi ~in. [/tex]
