Math

QuestionCalculate the arc length of a circle with radius 12 inches and central angle 34π\frac{3}{4} \pi radians. Round to two decimals.

Studdy Solution

STEP 1

Assumptions1. The radius of the circle is12 inches. . The central angle measures 34π\frac{3}{4} \pi radians.
3. We are to find the arc length of the circle.

STEP 2

The formula to find the arc length () of a circle is given by=rθ = r \cdot \thetawhere r is the radius of the circle and θ\theta is the central angle in radians.

STEP 3

Now, plug in the given values for the radius and the central angle to calculate the arc length.
=12inches3πradians =12 \, inches \cdot \frac{3}{} \pi \, radians

STEP 4

Perform the multiplication to calculate the arc length.
=12inches34πradians=9πinches =12 \, inches \cdot \frac{3}{4} \pi \, radians =9\pi \, inches

STEP 5

Now, we need to convert the result into a decimal and round to the nearest hundredth.
9πinches28.27inches \approx9\pi \, inches \approx28.27 \, inchesSo, the arc length of the circle is approximately28.27 inches.

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