1. MATH JEOPARDY

2. Your Categories are:

3. Vocabulary

4. Chapter 1

5. Chapter 2

6. Chapter 3

7. Chapter 4

8. ?

9. Vocabulary Chapter 1 Chapter 2 Chapter 3 Chapter 4 10 20 30 40 50 Click here for final jeopardy 10 20 30 40 50 ?

10. This is final jeopardy!! Berfore clicking for your question discuss how many of your points you would like to wager. Click here for question

11. A C B 5x  (2x-30)  AC  BC Find <ACB Click here for answer

12. <ACB= 120 

13. Thanks for Playing!!

14. Find the value of x for which a//b 1 23 5 4 6 m<2 = 5x+12, m<4= 2x+18 Click here for answer

15. X=2 Click to get back to Categories

16. What additional information is needed to show that the triangles are congruent by ASA? A B C L M N Click here for answer

17. AC  NL Click to get back to Categories

18. Indicate whether the pair of triangles is congruent by SSS, SAS, ASA, AAS, HA, or HL. Click here for answer

19. HA or AAS Click to get back to Categories

20. True or False A B C D Line AC is a median. Click here for answer

21. False Click to get back to Categories

22. Use the common angle theorem to complete the statement. E A BC D If <AEB  <DEC, then ____  ____ ? Click here for answer

23. <DEB Click to get back to Categories

24. Q P R 1 2 Given: <1 is complementary to <2 Prove: PQ  PR Statements Reasons <1 is complementary to <2 1. m<1 + m<2 = 90 2. m<1 + m<2 = <QPR 3. 4. Substitution <QPR is a right angle 5. 6. 7. Answer 1-7 Click here for answer

25. 1. Given 2. Definition of complementary angles 3. Angle addition postulate 4. m< QPR = 90 5. Definition of right angles 6. PQ  PR 7. Definition of perpendicular Click to get back to Categories

26. What are three things you can assume about a diagram? Click here for answer

27. 1. Straightness of lines 2.Betweeness of points 3.Collinearity of points on a line, coplanarity of points 4. Intersection of lines 5. Adjacency and nonadjacency of angles Click to get back to Categories

28. Statements Reasons M is the midpoint of AB 1. 2. Definition of midpoint AM+MB=AB 3. AM+AM=AB 4. 5. Collect like terms Prove: AM=1/2 AB 6. Answer 1-6 Given: M is the midpoint of AB Prove: AM=1/2 AB A M B Click here for answer

29. 1. Given 2. AM=AB 3. Segment addition postulate 4. Substitution 5. 2AM=AB 6.Division property Click to get back to Categories

30. Write this statement as a conditional: The midpoint M of AB divides AB so that AM= ½ AB Click here for answer

31. If M is the midpoint of AB, then AM= 1/2AB Click to get back to Categories

32. If m<AFB= 3x +10 and m<BFC= 5x, find m<AFB A F B C D E Click here for answer

33. m< AFB= 40 Click to get back to Categories

34. In a right triangle, the side opposite the right angle. Click here for answer

35. Hypotenuse Click to get back to Categories

36. Two angles of a triangle that are not adjacent to the exterior angle. Click here for answer

37. Remote interior angles Click to get back to Categories

38. Two lines that intersect at right angles. Click here for answer

39. Perpendicular lines Click to get back to Categories

40. Formed by nagating both the hypothesis and the conditional. Click here for answer

41. Inverse Click to get back to Categories

42. Describes angles or segments that have the same measure or length. Click here for answer

43. Congruent Click to get back to Categories

44. D xx yy A B C 65  53  BE // CD Find the values of x and y Click here for answer E

45. X= 53 Y=62 Click to get back to Categories

46. Find the value of X 70  60  xx A B D E C Click here for answer

47. X=50 Click to get back to Categories

48. Find m<CEA 50  60  xx C E A Click here for answer

49. m< CEA= 10  Click to get back to Categories

50. Find the value X 100  (2x+25)  (3x- 5)  Click here for answer

51. X= 52 Click to get back to Categories

52. What is the sum of the interior angles of a polygon with 7 sides. Click here for answer

53. 900 Click to get back to Categories

54. What is the vertical angles of <ABD C B A D E Click here for answer

55. <CBE Click to get back to Categories

56. Find AC A C B 40 5x 6x+4 Click here for answer

57. AC=30 Click to get back to Categories

58. Find m<B A B C (3x+6)  2x  (x+6)  Click here for answer

59. m<B= 56  Click to get back to Categories

60. Find RT S R T 3t-4 2t+6 Click here for answer

61. RT= 26 Click to get back to Categories

62. Congratulations!!! You have chosen a double jeopardy question. Berfore clicking for your question discuss how many points you would like to wager. This question is worth 50 points so you can wager up to 50 points. Click here for question

63. Use the coordinates (1,1) and (1,5) to find the distance. (*Use the distance formula) Click here for answer

64. Distance=4 Click to get back to Categories

65. State the congruence between the pair of triangles. Click here for answer

66. There is no congruence Click to get back to Categories

67. A B CD E Given: AC  AD, BC  DE, AB  AE Prove: ABC  AED Statements Reasons AC  AD 1. BC  DE 2. 3. Given ABC  AED 4. Answer 1-4 Click here for answer

68. 1.Given 2. Given 3.AB  AE 4.SSS Click to get back to Categories

69. Does this figure show a perpendicular bisector, altitude, a median, and/or, and angle bisector. Click here for answer

70. Altitude and an angle bisector Click to get back to Categories

71. Answer 1-5 B A E C D 12 3 4 5 6 7 8 Given: AC  AD, <1  <2 Prove: ADB  ACE Statements Reasons AC  AD 1. <5  <6 2. <1  <2 3. <BAD  <EAC 4. ADB  ACE 5. Click here for answer

72. 1.Given 2. Isosceles triangle theorm 3. Given 4. Common angle theorm 5. ASA Click to get back to Categories

73. Congratulations!!! You have chosen a double jeopardy question. Berfore clicking for your question discuss how many points you would like to wager. This question is worth 50 points so you can wager up to 50 points. Click here for question

74. Given: AB  CD, <1  <2, <3  <4 Prove:BF  DE D A B C E 6 4 1 F 3 2 5 Statements Reasons 1. Given 2. Given 3. Given 4. ASA 5. CPCTC Answer 1-5 Click here for answer

75. 1. AB  CD 2. <1  <2 3. <3  <4 4. CAE  AFB 5. BF  DE Click to get back to Categories