Question

A solid consists of a cone on top of a cylinder with a radius equal to that of the cone. The height of the cone is `36` and the height of the cylinder is `6`. If the volume of the solid is `48 pi`, what is the area of the base of the cylinder?

Answer 1

`A=2.667pi`

`A = 8.37`

Explanation:

We can use the volume of the shape to solve for the radius using the combination of the volume of the cylinder and the cone.

Volume of a Cone = `1/3pir^2h`
Volume of a Cylinder = `pir^2h`

Total Volume = `1/3pir^2h+pir^2h`

`48pi = 1/3pir^2(36)+pir^2(6)`

`48pi = 12pir^2+6pir^2`

`48pi = 18pir^2`

#(48cancelpi)/(18cancelpi) = ((cancel18cancelpi)r^2)/(cancel18cancelpi)#

`2.667 = r^2`

`sqrt2.667 = sqrt(r^2)`

`1.633 = r`

Area of the circular base is `A=pir^2`

`A=pi(1.633)^2`

`A=2.667pi`

`A = 8.37`