How to Find the Surface Area of a Torus

Calculates the surface area of a torus as 4 × π² × center distance × tube radius, by the theorem of Pappus. It is the circumference of the tube, 2πr, swept along the circle of length 2πR that the tube follows.

A torus is the doughnut shape a circle sweeps out as it turns about an axis outside it. Its surface is what the rim of the tube traces as it goes around.

S=4π2RrS = 4\pi^2 R r

RR must be greater than rr.

The theorem of Pappus

Take the length of the curve that was turned and multiply it by the distance its centroid travelled. The cross-section of the tube has circumference 2πr2\pi r, and its center travels 2πR2\pi R.

S=2πr×2πR=4π2RrS = 2\pi r \times 2\pi R = 4\pi^2 R r

The volume uses the area of the cross-section, πr2\pi r^2; the surface area uses its perimeter, 2πr2\pi r. That is the only difference between the two formulas.

Example

With the defaults, a center distance of R=10R = 10 and a tube radius of r=3r = 3.

S=4π2×10×3=120π21184.3525S = 4\pi^2 \times 10 \times 3 = 120\pi^2 \approx 1184.3525

A curiosity

The surface area depends only on the product RrRr. A torus with R=10,r=3R = 10, r = 3 and one with R=6,r=5R = 6, r = 5 both have Rr=30Rr = 30, so their surfaces are exactly the same size. Their volumes are not: 2π2Rr22\pi^2 R r^2 squares the tube radius, so the fatter tube holds more.