Proof Prove the following Theorem of Pappus: Let R be a region in a plane and let L be a line in the same plane such that L does not intersect the interior of R. If r is the distance between the centroid of R and the line, then the volume V of the solid of revolution formed by revolving R about the line is , where A is the area of R.

Second Theorem of Pappus

In Exercises 55 and 56, use the Second Theorem of Pappus, which is stated as follows:

If a segment of a plane curve C is revolved about an axis that does not intersect the curve (except possibly at its endpoints), then the area S' of the resulting surface of revolution is equal to the product of the length of C times the distance d traveled by the centroid of C.

A torus is formed by revolving the graph of about the y-axis. Find the surface area of the torus.

Second Theorem of Pappus

In Exercises 55 and 56, use the Second Theorem of Pappus, which is stated as follows:

If a segment of a plane curve C is revolved about an axis that does not intersect the curve (except possibly at its endpoints), then the area S' of the resulting surface of revolution is equal to the product of the length of C times the distance d traveled by the centroid of C.

Find the area of the surface formed by revolving the graph of  about the y-axis.