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13 votes
A circle has a radius of 4 inches. Find the length of the arc intercepted by a central angle of 240 degrees.

User Lecham
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1 Answer

15 votes
15 votes

Solution

- The formula for the length of an arc is


\begin{gathered} L=(\theta)/(360\degree)*2*\pi* r \\ \\ where, \\ r=\text{ radius of the circle} \\ \theta=\text{ The angle subtended at the center of the circle} \end{gathered}

- We have been given the following parameters:


\begin{gathered} \theta=240\degree \\ r=4inches \end{gathered}

- Thus, we can find the length of the arc as follows:


\begin{gathered} L=(240\degree)/(360\degree)*2*\pi*4 \\ \\ \therefore L=(16)/(3)\pi\approx16.7552inches \end{gathered}

Final Answer

The length of the arc is 16.7552inches

User Shodanex
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