2. Instructions for using this template. Remember this is Jeopardy, so where I have written Answer this is the prompt the students will see, and where I have Question should be the students response. To enter your questions and answers, click once on the text on the slide, then highlight and just type over whats there to replace it. If you hit Delete or Backspace, it sometimes makes the text box disappear. When clicking on the slide to move to the next appropriate slide, be sure you see the hand, not the arrow. (If you put your cursor over a text box, it will be an arrow and WILL NOT take you to the right location.)

3. Choose a category. You will be given a question. You must provide the correct answer. Click to begin.

4. Click here for Final Jeopardy

5. Solve quadratic equations Determine number of solutions Choosing type: linear, quadratic, or exponential 10 Point 20 Points 30 Points 40 Points 50 Points 10 Point 20 Points 30 Points 40 Points 50 Points 30 Points 40 Points 50 Points Applications of Quadratic Equations Graphs of Quadratic Functions

6. Which way does the graph y = -6x 2 + 2 open?

7. down

8. Where is the axis of symmetry for the graph of y = 2x 2 + 4?

9. X = 0

10. Where is the axis of symmetry for the graph of y = 4x 2 + 4x -2?

11. X = - 1/2

12. Find the axis of symmetry and vertex for the graph y = -3x 2 + 3x - 1

13. x = ½ (1/2, -1/4)

14. Find the vertex and axis of symmetry for y = 4 + 8x – 2x 2

15. X = 2 (2, 12)

16. Solve for x (x+2)(x-4) = 0

17. x= -2 or 4

18. Solve: x 2 + 3x + 2 = 0

19. x = -1 or -2

20. Solve: 2x 2 + 5x + 3 = 0

21. X = -1 or -1.5

22. Solve: 5x 2 – 68x = 192

23. X = 16 or -2.4

24. Solve and round to the nearest hundredth 2x 2 – 24x + 33 = 0

25. X = 10.42 or 1.58

26. Suppose you throw a ball upward and the equation h = -16t 2 +30t + 6 models the path the ball takes where h is the height of the ball and t is time in seconds. After how many seconds will the ball hit the ground?

27. About 2.1 seconds

28. Suppose a rectangle has an area of 60 ft 2 and dimensions x and (x + 1). Find the dimensions of the rectangle to the nearest hundredth.

29. 7.26 ft x 8.26 ft

30. A rectangle has a length of x. Its width is 3 feet longer than twice the length. Find the dimensions if its area is 80 ft 2. Round to the nearest tenth of a foot.

31. 5.6 ft by 14.2 ft

32. An apartment rental agency uses the formula I = 5400 + 300n – 50n 2 to find its monthly income I based on renting n apartments. Will the agencys monthly income ever reach $7000? Explain.

33. No, the discriminant is negative (300 2 – 4 (-50)(-1600) = -230,000)

34. For the equation x 2 + 2x + k = 0; find the value of k to the equation has one solution

35. k = 1

36. How many solutions does x 2 – 6x + 9 = 0 have?

37. One (discriminant = 0)

38. How many x-intercepts does x 2 – 2x – 3 = 0 have?

39. 2 (discriminant = 16)

40. The function P = 3i 2 – 2i + 450 models the power P in an electric circuit with a current i. Can the power in this circuit ever be zero? If so, what is the value of i?

41. No, the discriminant is -5396.

42. How many zeros does the equation 2x 2 – 3x + 4 = 0 have?

43. None, the discriminant is -23.

44. Does the graph of the function cross the x- axis? y = 4x 2 + x - 5

45. Yes, twice. The discriminant is 81.

46. What type of equation do the points form? XY 02 14 26 38 410

47. Linear

48. What type of equation do the points form? XY 00 11.5 26 313.5 424

49. Quadratic

50. Find the type of equation and the equation the data forms XY 05 12 2.8 3.32 4.128

51. exponential, y = 5 (.4) x

52. Find the type of equation and the equation the data forms XY 00 12.8 211.2 325.2 444.8

53. Quadratic, y = 2.8x 2

54. Find the type of equation and the equation the data forms XY 0.5 11 21.5 32 42.5

55. Linear, Y = ½x + ½

56. Make your wager

57. A square pool has side length p. The border around the pool is 1 ft wide. The combined area of the border and the pool is 400 ft 2. Find the length and the area of the pool alone.

58. Length = 18 ft Area = 324 ft 2