SOLUTION: theta is a central angle in a circle of radius r = 5 mm. Find the length of arc s cut off by theta; = 330�. (Round the answer to two decimal places.) How do you work this problem

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Question 412206: theta is a central angle in a circle of radius r = 5 mm. Find the length of arc s cut off by theta; = 330�. (Round the answer to two decimal places.) How do you work this problem?
Answer by jsmallt9(3758) (Show Source):
You can put this solution on YOUR website!
Central angles, their arcs and the areas of the sectors formed are all proportional:

central angle arc length area of sector ------------------ = ------------- = ------------------ 2pi or 360 degrees Circumference area of the circle

For your problem, which references central angles and arc length we will use the first two fractions:

central angle arc length ------------------ = ------------- 2pi or 360 degrees Circumference

Since your central angle is expressed in degrees we will use 360 in the denominator of the first fraction:

which simplifies to:

Cross multiplying we get:

Dividing by 12 we get:

All that's left is to replace with a decimal (3.14158....) and simplify the fraction. I'll leave that up to you.