Area and Arc Length of a Sector

A sector is a slice of a circle. Its area is π × radius² × angle ÷ 360, and its arc length is 2 × π × radius × angle ÷ 360.

A sector is the slice of a circle cut off by two radii. The central angle says what fraction of the full 360360^\circ the slice covers, and both the area and the arc length are that same fraction of the whole circle.

S=πr2×θ360=2πr×θ360S = \pi r^2 \times \dfrac{\theta}{360} \qquad \ell = 2 \pi r \times \dfrac{\theta}{360}

The perimeter is the arc plus the two straight radii: L=+2rL = \ell + 2r.

Example

With the defaults, a radius of r=6r = 6 and a central angle of θ=60\theta = 60^\circ. Since 60360=16\dfrac{60}{360} = \dfrac{1}{6}, the sector is one sixth of the circle.

Watch out

The perimeter is not the arc on its own. Remember to add the two radii, which is what this calculator does: +2r\ell + 2r. Enter the angle in degrees; anything outside the range 00^\circ to 360360^\circ is rejected, and the radius must be positive. At 360360^\circ the sector becomes the whole circle, and the formulas collapse to πr2\pi r^2 and 2πr2\pi r.