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Degrees, Radians, and Arc Length Solutions

Circles have angles and arcs that can be measured. 
An arc is a portion of the circumference of a circle. 
The central angle of a circle is an angle whose vertex is the center of the circle.
 The angles of a circle can be measured in degrees or in radians, $θ .$  
A radian is a unit of angle measure for a circle.

One radian is the measure of the central angle of a circle that intersects an arc equal in length to the radius of the circle. 
The arc length of a circle, s, is directly proportional to both the central angle and the radius.
The formula to determine the arc length of a circle is: $s = r θ,$ where $θ$ must be in radians.
The formula to convert from degrees (deg) to radians (rad) is: $r a d = d e g \cdot \frac{π}{180}$
The formula to convert from radians (rad) to degrees (deg) is: $d e g = r a d \cdot \frac{180}{π}$

Example 1

Convert $150 °$ to radians using π.

$\begin{array}{rcl} r a d & = & d e g \cdot \frac{π}{180} \\ r a d & = & 150 \cdot \frac{π}{180} = \frac{150 π}{180} \\ r a d & = & \frac{5 π}{6} \end{array}$

Example 2

Convert the radian measure, $\frac{π}{2}$ , to a degree measure.

$d e g = r a d \cdot \frac{180}{π} d e g = \frac{π}{2} \cdot \frac{180}{π} = \frac{180 π}{2 π} d e g = 90 °$

Example 3

Determine the arc length of a circle with a $225 °$ central angle and a radius of 7.

$r = 7 r a d = 225 \cdot \frac{π}{180} = \frac{225 π}{180} = \frac{5 π}{4} \begin{array}{l} s = r θ \\ s = 7 \cdot \frac{5 π}{4} \\ s = \frac{35 π}{4} \end{array}$