Surface Area of a Cylinder

Unrolling the side of a cylinder gives a rectangle. The lateral area is 2 × π × radius × height, and the total surface area adds the two circular ends: 2 × π × radius × (radius + height).

The surface of a cylinder is made of a curved side and two circular ends. Cut the side open and lay it flat and you get a rectangle whose height is hh and whose width is the circumference of the base, 2πr2\pi r. That rectangle is the lateral area.

A=2πrhS=2πr(r+h)A = 2 \pi r h \qquad S = 2 \pi r (r + h)

The total adds the two circular ends, 2πr22\pi r^2, to the lateral area: 2πrh+2πr2=2πr(r+h)2\pi r h + 2\pi r^2 = 2\pi r(r + h).

Example

With the defaults, r=3r = 3 and h=7h = 7:

As a check, each end has area π×32=9π\pi \times 3^2 = 9\pi, so the two together are 18π18\pi. Adding that to the lateral 42π42\pi gives 60π60\pi, which matches the total.

Watch out

The lateral area is the curved side alone; the total surface area includes both flat ends. The label wrapped around a tin uses the lateral area, while painting the whole tin uses the total. A container with no lid needs one end, not two. Both the radius and the height must be positive.