Finding the Area of a Sector of a Circle
If the two radii form an angle of [latex]\theta[/latex], measured in radians, then [latex]\frac{\theta }{2\pi }[/latex] is the ratio of the angle measure to the measure of a full rotation and is also, therefore, the ratio of the area of the sector to the area of the circle. Thus, the area of a sector is the fraction [latex]\frac{\theta }{2\pi }[/latex] multiplied by the entire area. (Always remember that this formula only applies if [latex]\theta[/latex] is in radians.)
[latex]\begin{align}\text{Area of sector}&=\left(\frac{\theta }{2\pi }\right)\pi {r}^{2} \\ &=\frac{\theta \pi {r}^{2}}{2\pi } \\ &=\frac{1}{2}\theta {r}^{2} \end{align}[/latex]
area of a sector
The area of a sector of a circle with radius [latex]r[/latex] subtended by an angle [latex]\theta[/latex], measured in radians, is
[latex]A=\frac{1}{2}\theta {r}^{2}[/latex]
- If necessary, convert [latex]\theta[/latex] to radians.
- Multiply half the radian measure of [latex]\theta[/latex] by the square of the radius [latex]r:\text{ } A=\frac{1}{2}\theta {r}^{2}[/latex].
