Radian measure is a game-changer in trigonometry. It simplifies circular motion calculations and trig formulas by using the ratio of arc length to radius. One radian is the angle that subtends an arc equal to the radius length.
Converting between degrees and radians is crucial. Remember, 360° equals 2π radians. Memorizing common angles like π/2 (90°) and π (180°) helps with quick mental conversions. These concepts are key for solving problems involving arc length and central angles.
Understanding Radian Measure
Radian measure definition and relationship
- Radian measure quantifies angle by ratio of arc length to radius
- One radian subtends arc equal to radius length
- Full circle spans 360° or 2π radians
- Conversion factor links degrees and radians $2π$ radians = 360°
- Radian measure simplifies circular motion calculations and trigonometric formulas
Radian to degree conversions
- Degrees to radians: $θ_{rad} = θ_{deg} × (π/180)$
- Radians to degrees: $θ_{deg} = θ_{rad} × (180/π)$
- 90° equals $π/2$ radians
- 180° equals $π$ radians
- 270° equals $3π/2$ radians
- Memorize common angles for quick mental conversions
- Use proportions to estimate unfamiliar angle measures
Common angles in radians
- Multiples of $π/6$
- $π/6$ approximates 30°
- $π/3$ approximates 60°
- $2π/3$ approximates 120°
- $5π/6$ approximates 150°
- Multiples of $π/4$
- $π/4$ approximates 45°
- $3π/4$ approximates 135°
- $5π/4$ approximates 225°
- $7π/4$ approximates 315°
- Key angles
- $π/2$ equals 90°
- $π$ equals 180°
- $3π/2$ equals 270°
- $2π$ equals 360°
Arc length and central angles
- Arc length formula: $s = rθ$
- s represents arc length
- r denotes radius
- θ signifies angle in radians
- Central angle formula: $θ = s/r$
- Area of a sector formula: $A = (1/2)r²θ$
- Applications include circular motion analysis (Ferris wheels), planetary orbit calculations, gear system design
- Problem-solving steps:
- Identify given information
- Select appropriate formula
- Substitute values and solve
- Verify units and result plausibility