What’ s Your Type?

1. BONUS The Same Old Thing X Marks the Spot How’s Your Memory? What’ s Your Type? Prove It! Short Cuts 100 100 100 100 100 100 200 200 200 200 200 200 300 300 300 300 300 300 400 400 400 400 400 400 500 500 500 500 500 500 600 600 600 600 600 600 700 700 700 700 700 700

2. What’s your type?

3. 30° 10 18 120° 10 30°  √

4. Sum of two nonadjacent interior angles  √

5. Classify all three triangles by side length. C 65 35 A D  √ B

6. Triangle with two 40° angles  √

7. Triangle with a 30 degree angle and a 60 degree angle.  √

8. Triangle that is always acute  √

9. Classify all three triangles by angle measure. B 5o 60 35 A C  √ D

10. The Same Old Thing  √

11. Name the congruent figures and ALL of the corresponding congruent parts Q R P S  √

12. Name the congruent figures and ALL of the corresponding congruent parts B C A D  √

13. Use the definition of congruent triangles to prove  RPS  RPQ. Q P R S  √

14. State the third congruence that must be given to prove triangles congruent. Given: FE  ON F O Prove:  DEF   MNO Method: AAS  √

15. State the third congruence that must be given to prove triangles congruent. Given: A  X B  Y Prove:  ABC   XYZ Method: AAS  √

16. State the third congruence that must be given to prove triangles congruent. Given: DE  MN M D Prove:  DEF   MNO Method: SAS  √

17. State the third congruence that must be given to prove triangles congruent. Given: A  X AB  XY Prove:  ABC   XYZ Method: ASA  √

18. X marks the spot  √

19. J G ∆JGH  ∆PMN M  G N  H Find the value of x and classify the triangle N (2x - 6) 122 24 H M P  √

20. Find the value of x and classify the triangle (8x + 5) (2x + 11) 3x  √

21. Find the value of the third angle measure x if one of the acute angles in a right triangle is 40 degrees  √

22. 38 Find the value of x (10x + 9) (7x + 1)  √

23. Find the value of x and classify the triangle 10 10 6x x  √

24. 34 Find the value of x 4 x 4  √

25. Find the value of x and y y° 50° x°  √

26. Prove it!  √

27. Given: MA  TA, AHM=90Prove:  AHM  AHT A M T H  √

28. Given: A  B, ADC  BDC Prove: AC  BC A B D C DAILY DOUBLE  √

29. Given: T is the midpoint of PR and QS Prove:  STR  QTP P Q T S R  √

30. J L Given: JK  LM, KJS  MLS, JR  LQ Prove: LQR  JRQ S M K Q R  √

31. Given: A  B, CA ┴AB, D is the midpoint of AB, AC BC Prove:  ACD  BCD (using no shortcuts) D B A  √ C

32. Prove the Exterior Angles Theorem: m1 + m2 = m4 2 4 1 3  √

33. D Using the Isosceles Triangle Theorem: Find m D (21y+13) (6y+1) O G  √

34. Shortcuts  √

35. Name the  theorem and list the  statement or tell why it can’t be determined B C D A  √

36. Name the  theorem and list the  statement or tell why it can’t be determined A B C D E  √

37. Name the congruence method or none  √

38. Name the  theorem and list the  statement or tell why it can’t be determined R F G O  √

39. Name the congruence method or none Z VY  WX XV  YW VXY   WYX W V U X Y  √

40. Name the congruence method or none VX  WY VY BISECTS XZ WX BISECTS ZY VXY WYX Z W V U X Y  √

41. O N P M Q Name the congruence method or none  MOQ  PNQ  √

42. How’s Your Memory?  √

43. If two angles form a linear pair then they are:  √

44. If two lines are perpendicular then the angles created at their intersection are:______  √

45. The acute angles of a right triangle are:  √

46. ___ is the set of all points inside a triangle and ____ is the set of all points outside a triangle.  √

47. Angles formed by two sides of a triangle with a common vertex  √

48. An angle formed by one side of a polygon and the extension of an adjacent side  √

49. Interior angles of a polygon that are not adjacent to the exterior angle but their sum is equal to the measure of the exterior angle.  √

50. BET IT ALL • Given m  A= 43 degrees and the measure of  CBD is twice that of  CBA, what is the measure of  C?