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14 December, 23:59

A circle has a radius of 5 in. A central angle that measures 150° cuts off an arc.

Explain how to find the arc length exactly, and then approximate it to one decimal place.

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Answers (1)
  1. 15 December, 00:02
    0
    Part 1) The exact value of the arc length is / frac{25}{6}/pi / in

    Part 2) The approximate value of the arc length is 13.1 / in

    Step-by-step explanation:

    ind the circumference of the circle

    The circumference of a circle is equal to

    C=2/pi r

    we have

    r=5 / in

    substitute

    C=2/pi (5)

    C=10/pi / in

    step 2

    Find the exact value of the arc length by a central angle of 150 degrees

    Remember that the circumference of a circle subtends a central angle of 360 degrees

    by proportion

    /frac{10/pi}{360} = / frac{x}{150}/ / / /x=10/pi * 150/360/ / / /x=/frac{25}{6}/pi / in

    Find the approximate value of the arc length

    To find the approximate value, assume

    /pi = 3.14

    substitute

    /frac{25}{6} (3.14) = 13.1 / in
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