ANGLES

1. ANGLES ANGLES

2. R We write: PR P RAY part of a line goes forever in one direction has one endpoint ray a line a point

3. angle two rays with a common endpoint side vertex side

4. opposite rays

5. interior exterior

6. A Angles are measured in DEGREES 30° m A = 30

7. 30° A B Angles are measured in DEGREES 45° m B = 45

8. A 45° B C 30° Angles are measured in DEGREES 90° m C = 90

9. D A B 90° C 45° 30° Angles are measured in DEGREES 135° m D = 135

10. 30° A F 45° B 90° C D 135° Angles are measured in DEGREES 180° m F = 180

11. 4 angle names 4

12. A angle names A

13. B C A D angle names BAD or DAB

14. B C A D angle names BAC or CAB

15. B C A D angle names CAD or DAC

16. 5 1 2 m1 + m 2 = m 5 ANGLE ADDITION POSTULATE

17. Q P  QOP  ROQ O R mROQ m ROP + m QOP = ANGLE ADDITION POSTULATE

18. D acute angle m  D < 90°

19. D right angle m  D = 90°

20. D m  D > 90° but < 180° obtuse angle

21. D straight angle 180° m  D = 180°

22. 1 2 CONGRUENT ANGLES 40° If  1 and  2 have the same measure, then  1   2 40° If  1   2, then  1 and  2 have the same measure

23. PS bisects RPT divides an angle into 2  angles Angle bisector R S RPS  SPT T P

24. PR  QS Q P R S PERPENDICULAR LINES  lines  lines form rt. s perpendicular lines form right angles

25. 2 1 3 4 VERTICAL ANGLES 1 and 3 are vertical angles 2 and 4 are vertical angles

26. 2 1 3 4 VERTICAL ANGLES vertical angles are congruent vert. s  1  3 ; 2  4

27. 5 2 1 3 4 ADJACENT ANGLES adj s 1 and 2  2 and 3  3 and 4  5 and 4 • 5 and 1

28. LINEAR PAIR 1 2 1 and 2 are a linear pair the sum of the angle measures of a linear pair is 180

29. 2 1 3 LINEAR TRIPLE 1,  2, and 3 are a linear triple the sum of the angle measures of a linear triple is 180

30. 50  70  3 20 1 2 40  4 COMPLEMENTARY ANGLES comp s 3 and 4 are comp s 1 and 2 are comp s

31. 70  160  3 110  20 1 2 4 SUPPLEMENTARY ANGLES supp s 3 and 4 are supp s 1 and 2 are supp s

32. THE END