Find the area of the shaded region in the figure

Question

Find the area of the shaded region in the figure

What steps should I do? I tried following the steps listed here https://answers.yahoo.com/question/index?qid=20100305030526AAef8nZ

But I got 150.7 which is wrong.

Answer 1

Hint: Break the shaded region up into two shapes. One is a portion of the circle (you know the portion because of the given angle), and the other is a triangle (which is equilateral). Find the area of each shape and then add them.

Answer 2

The basic idea is right. First calculate the area of the sector by observing that $\dfrac{ \text{area of sector} }{ \text{area of circle} } = \dfrac{\pi / 3}{2 \pi}$.

Then find the area of the triangle by noting that the triangle is equilateral, and subtract it off. This will give you the white region.

Now subtract the white region from the area of the circle.

Answer 3

Area of white strip=Area of sector subtending$\frac{\pi}{3}$ at the center-Area of equilateral triangle

Area of sector subtending$\frac{\pi}{3}$ at the center=$\frac{1}{2}\theta r^2=\frac{1}{2}\frac{\pi}{3} (12)^2=24\pi=24\times 3.14=75.36 $sq units

Area of equilateral triangle=$\frac{\sqrt3}{4}$(side)$^2$=$\frac{\sqrt3}{4}$(12)$^2$=36$\sqrt3=$62.35 sq units

Area of white strip=75.36 -62.35=13.01 sq units

Area of circle=$\pi r^2=3.14\times12\times12=452.16$sq units

Shaded area=Area of circle-Area of white strip=452.16-13.01=439.15 sq units

Answer 4

Notice, the area of the equilateral triangle (indicated by red) $$=\frac{1}{2}(12)(12)\sin\frac{\pi}{3}$$ $$=72\frac{\sqrt{3}}{2}= 36\sqrt{3}$$ The area of the major circular sector subtending at the center an angle $2\pi-\frac{\pi}{3}=\frac{5\pi}{3}$ $$=\frac{1}{2}\left(\frac{5\pi}{3}\right)(12)^2=120\pi$$ Hence, the area of the shaded portion $$=\text{area of (red) triangle}+\text{area of major sector}$$ $$=\color{blue}{36\sqrt{3}+120\pi\approx 439.34494 \ }$$