1. Angles – Part 1 33 22 11 Notation, Definitions& Measurement of Angles Coterminal, Right, Complementary, Supplementary Angles & Intro to Radians Practice Problems

2. Notation  Variables for angles  Frequently Greek letters  a (alpha)  b (beta)  g (gamma)  Q (theta) 2

3. Definitions  Initial side  Point of origin for measuring a given angle  Typically 0˚ (360˚)  Terminal Side  Ending point for measuring a given angle  Can be any size 3

4. Measurement  Clockwise (CW)  Negative Angle  Counter-Clockwise (CCW)  Positive Angle 4

5. Measurement (Cont.)  Degrees  May be in decimal form (72.64˚)  May be in Degrees/Minutes/Seconds (25˚ 43’ 37”) Minutes ( ’ ) 60’ = 1˚ Seconds ( ” ) 60” = 1’  90˚ = 89˚ 59’ 60” 5 www.themegallery.com

6. Measurement (Cont.)  Radians  Similar to degrees  Always measured in terms of pi ( π ) 360˚/0˚ = 2 π 90˚ = π /2 180˚ = π 270˚ = 3 π /2 6

7. Coterminal Angles  Have the same initial and terminal sides 7

8. Finding Coterminal Angles  Add multiples of 360˚  Subtract Multiples of 360˚ Example: Find 4 coterminal angles of 60˚ 60˚ + 360˚ = 420˚ 60˚ + 720˚ = 780˚ 60˚ – 360˚ = -300˚ 60˚ – 720˚ = -660˚ Answer: 420˚, 780˚, -300˚, -660˚ 8

9. Defining Angles  Right Angles measure 90˚ 9

10. Finding Complimentary Angles  For degrees:  = 90˚ - Q or  = 89˚ 59’ 60” – Q Example: Find the angle complementary to 73.26˚ 10

11. Finding Complementary Angles Example 2: Find the angle that is complementary to 25˚ 43’ 37”. 11

12. Finding Complementary Angles  For Radians  = π /2 – Q Example: Find the complementary angle of π /4 radians. 12

13. Finding Supplementary Angles  For degrees  = 180˚ - Q  For radians  = π - Q 13

14. Practice Problems  Page 409 Problems 1-8 14