Arcs & Sectors
TipLearning Objectives
- Compute arc length and sector area.
- Use proportional reasoning with central angles.
- Interpret arcs and sectors in geometric and applied contexts.
Key Ideas
Arcs and sectors are fractions of a circle based on the central angle.
Arc Length
\[ \text{Arc length} = \frac{\theta}{360^\circ} \cdot 2\pi r \]
Sector Area
\[ \text{Sector area} = \frac{\theta}{360^\circ} \cdot \pi r^2 \]

Common Problem Types
Arc Length from Degrees
Proportion of circumference.
Sector Area from Degrees
Proportion of total area.
Finding Angle Given Arc Length / Area
Solve proportion for \(\theta\).
Real-World Applications
Pizza slices, fan blades, rotation, radar sweep angles.
Strategies
- Set up proportion:
\[\frac{\theta}{360} = \frac{\text{part}}{\text{whole}}.\] - Keep \(\pi\) exact for cleaner answers.
- Convert to radians only when required.
Worked Examples
Example 1
In a circle with radius 12, find arc length for a 45° arc.
\[ \frac{45}{360} \cdot 2\pi(12) = \frac{1}{8} \cdot 24\pi = 3\pi. \]
Example 2
Find sector area for radius 10 and central angle 90°.
\[ \frac{90}{360} \cdot \pi(10^2) = \frac14 100\pi = 25\pi. \]
WarningCommon Mistakes
- Forgetting arc length uses circumference, not area.
- Using degrees when formula expects radians (or vice versa).
- Dividing by 180 instead of 360.
Practice Problems
- Radius = 6, angle = 60° → arc length.
- Radius = 4, angle = 30° → sector area.
- Arc length = \(5\pi\), radius = 10. Find angle.
TipStep-by-Step Solutions
- \(=2\pi\sqrt{}? → (60/360)(12\pi)=2\pi.\)
- \(=(30/360)(16\pi)=\frac{1}{12}16\pi=\frac43\pi.\)
- Solve \(5\pi = (\theta/360)(20\pi)\) → \(\theta=90^\circ\).
Summary
- Arc length ∝ circumference.
- Sector area ∝ circle area.
TipQuick Tips
- Always divide angle by 360.
- When stuck, rewrite as part/whole proportions.