what is the height of the right circular cone?

The height of the right circular cone can be found using the Pythagorean theorem.

In a right circular cone, the slant height, height, and radius form a right triangle.

The diameter is equal to twice the radius, so the radius is 12in/2 = 6in.

Using the Pythagorean theorem:

(6in)^2 + height^2 = (15in)^2

36in^2 + height^2 = 225in^2

height^2 = 225in^2 - 36in^2

height^2 = 189in^2

Taking the square root of both sides:

height = √189in^2

Simplifying the square root:

height ≈ 13.74in

Therefore, the height of the right circular cone is approximately 13.74in.