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21 votes
21 votes
PLEASE I NEED HELP!

Circle A is shown with a central angle marked 30 degrees and the radius marked 5 inches.

Which of the following could be used to calculate the area of the sector in the circle shown above?

π(5in)30 over 360
π(5in)230 over 360
π(30in)25 over 360
π(30in)5 over 360

User Armen Sanoyan
by
2.3k points

2 Answers

8 votes
8 votes

Answer:


\pi (5\: \sf in)^2\left((30^(\circ))/(360^(\circ))\right)

π(5in)² 30 over 360

Explanation:


\textsf{Area of a sector of a circle}=\left((\theta)/(360^(\circ))\right) \pi r^2

(where
\theta is the angle and r is the radius)

Given:


  • \theta = 30°
  • r = 5 in

Substituting these values into the equation:


\begin{aligned}\implies\textsf{Area} &=\left((30^(\circ))/(360^(\circ))\right) \pi \cdot (5\: \sf in)^2\\\\ & = \pi (5\: \sf in)^2\left((30^(\circ))/(360^(\circ))\right)\\\\ & = \pi \cdot 25\:(\sf in^2) \cdot (1)/(12)\\\\ & = (25)/(12) \pi \:(\sf in^2) \\\\ & = 6.54\: \sf in^2\:(nearest\:hundredth) \end{aligned}

User Rahul Sawant
by
2.9k points
24 votes
24 votes

π(5in)² * 30 over 360 can be used to determine sector area.


\sf sector \ area \ : (\theta)/(360) *\pi *radius^2

# radius = 5 inches

# angle = 30 degrees

sector area:


\hookrightarrow \sf (30)/(360) *\pi *5^2


\hookrightarrow \sf (1)/(12) *\pi *25


\hookrightarrow \sf (25)/(12)\pi


\hookrightarrow \sf 6.54 \ inch^2

User Benjamin Confino
by
3.5k points
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