Radian Measure
TipLearning Objectives
- Convert between degrees and radians.
- Interpret radian measure as arc-length per radius.
- Use radian-based formulas for arc length and sector area.
Key Ideas
Definition
A radian is the angle that subtends an arc equal to the radius.
Conversions
\[ 180^\circ = \pi \text{ rad} \]
- Degrees → radians: multiply by \(\pi/180\)
- Radians → degrees: multiply by \(180/\pi\)
Radian Arc Formulas
Arc length:
\[
s = r\theta
\] Sector area:
\[
A = \frac12 r^2 \theta
\]

Common Problem Types
Convert Units
Degrees ↔︎ radians.
Find Arc Length Using \(s = r\theta\)
Only works with radians.
Find Sector Area
Use \(\frac12 r^2\theta\).
Recognizing Exact Radians
\(\pi/6,\pi/4,\pi/3,\pi/2,\pi\).
Strategies
- Always check units: if using formulas, convert to radians.
- Keep answers in \(\pi\)-form unless told otherwise.
- Draw reference circle if needed.
Worked Examples
Example 1
Convert 150° to radians:
\[
150^\circ \cdot \frac{\pi}{180} = \frac{5\pi}{6}.
\]
Example 2
Find arc length if \(r=8\), \(\theta=\frac{\pi}{4}\):
\[
s = r\theta = 8\cdot \frac{\pi}{4} = 2\pi.
\]
WarningCommon Mistakes
- Using degree values directly in \(s=r\theta\).
- Forgetting to multiply by \(\pi\).
- Confusing arc-length formulas for radians vs degrees.
Practice Problems
- Convert 60° to radians.
- Find arc length if \(r=10,\theta=\frac{\pi}{3}\).
- Sector area if \(r=6,\theta=\frac{\pi}{2}\).
TipStep-by-Step Solutions
- \(\pi/3\).
- \(10 \cdot \frac{\pi}{3} = \frac{10\pi}{3}.\)
- \(\frac12 36 \cdot \frac{\pi}{2} = 9\pi.\)
Summary
- Radians measure arc per radius.
- Use \(s=r\theta\) and \(\frac12 r^2\theta\).
TipQuick Tips
- If a formula needs radians, convert first!