1. 200 300 400 500 100 200 300 400 500 100 200 300 400 500 100 200 300 400 500 100 200 300 400 500 100 Extending Patterns Working With Matrices Applying Algebraic Expressions Working with Linear equations Wild Card FINAL JEOPARDY!!

2. Extending Patterns 100 points The table below shows a relationship between x and y. If the pattern continues, what are the next values for x and y? A x = 5, y = 20 B x = 5, y = 22 C x = 5, y = 24 D x = 5, y = 35

3. Extending Patterns 100 points ANSWER: C x = 5, y = 24

4. Extending Patterns 200 points The table below shows the total number of people served in a cafeteria. If the pattern continues, what will be the total number of people served by 1:00? A 145 C 205 B 175 D 235

5. Extending Patterns 200 points ANSWER: C 205

6. Extending Patterns 300 points Look at the pattern below. If the pattern continues, what will be the tenth term?

7. Extending Patterns 300 points ANSWER: 61/4

8. Extending Patterns 400 points Look at the pattern below. 2x + 4, 2x + 1, 2x - 2,... If the pattern continues, what will be the seventh term? A 2x + 11 B 2x – 11 C 2x + 14 D 2x - 14

9. Extending Patterns 400 points ANSWER: D 2x - 14

10. Extending Patterns 500 points A design starts with one equilateral, triangular tile. A tile of the same shape is added to each side. The first three stages with number of tiles used are shown below. If this pattern continues, how many triangular tiles will be used in the pattern at stage 8 ?

11. Extending Patterns 500 points ANSWER: 22 triangles for stage 8.

12. Working with Matrices 100 points The Class of 1998 sold class shirts in the styles and sizes shown in the matrix below. The Class of 1999 ordered twice the amount of shirts that were sold in 1998. What was the total number of extra-large shirts that were ordered by the Class of 1999? A46B60C74D120

13. Working with Matrices 100 points ANSWER: D120

14. Working with Matrices 200 points At the end of each day, Bob's Balloon Shop counts how many balloons they have in the store. The results of their Monday and Tuesday counts are shown in the matrices below. The shop received no new balloons on either day. How many helium balloons did they sell on Tuesday? A 7 B 12 C 38 D 43

15. Working with Matrices 200 points ANSWER: D 43

16. Working with Matrices 300 points The matrices below compare teen consumption of milk and soda in 1978 and 1996. Which of these matrices shows the change in consumption from 1978 to 1996? F G H J

17. Working with Matrices 300 points ANSWER: G.

18. Working with Matrices 400 points The matrix below shows the annual salaries, in dollars, for 3 different jobs based on the employee's level of education. If each employee's salary increased by 5%, what matrix represents the new salaries?

19. Working with Matrices 400 points Secretary2310027300 Customer Service Representative 2677529400 Manager3255036540

20. Working with Matrices 500 points The matrix below shows the sales, in thousands of dollars, for three different stores over a period of two years. Each store's profit is 3% of its sales. What is the profit, in thousands of dollars, for Store B in Year 2?

21. Working with Matrices 500 points ANSWER: $ 9,000

22. Applying Algebraic Expressions 100 points Barbara has x dollars to spend. Joe has 2x + 3 dollars to spend. Which of these expressions represents the total amount of money Barbara and Joe have to spend? F (2x + 3) + x G (2x + 3) – x H x(2x + 3) J (2x + 3) ÷ x, x ≠ 0

23. Applying Algebraic Expressions 100 points ANSWER: F (2x + 3) + x

24. Applying Algebraic Expressions 200 points At a movie theater, the child ticket price is x dollars and the adult price is $3.50 more. One evening 41 child tickets were sold and 65 adults tickets were sold. Which of these expressions represents the total ticket sales, in dollars? F 41x + 65(x + 3.50) G 41x + 65x + 3.50 H 41x + 65(3.50) J 41 + x + 65 + 3.50

25. Applying Algebraic Expressions 200 points ANSWER: F 41x + 65(x + 3.50)

26. Applying Algebraic Expressions 300 points Martha is x years old. Esteban is x + 7 years old. Martha's mother is 3x + 5 years old. Which of these expressions represents how much older Martha's mother is than Esteban? F(x + 7) – x G(3x + 5) – x H(x + 7) - (3x + 5) J(3x + 5) - (x + 7)

27. Applying Algebraic Expressions 300 points ANSWER: J. (3x + 5) - (x + 7)

28. Applying Algebraic Expressions 400 points In one day, a store sold 300 shirts at 25% off the regular price of x dollars. Which of these expressions represents the total amount, in dollars, that was received for the sale of shirts on that day? A 0.25(x – 300) B 25(x – 300) C 300(x – 25) D 300(x – 0.25x)

29. Applying Algebraic Expressions 400 points ANSWER: D 300(x – 0.25x)

30. Applying Algebraic Expressions 500 points The expression 16x 2 + 28x - 36 represents the perimeter of a square. Which of these expressions represents the length of one side? A B C D

31. Applying Algebraic Expressions 500 points ANSWER: D.

32. Working with Linear Equations 100 points Denise has 24 baseball cards in her collection. She collects 9 baseball cards per month. In how many months will she have a total of 150 baseball cards in her collection?

33. Working with Linear Equations 100 points ANSWER: 24 + 9x = 150 X = 14 months In 14 months, Denise will have 150 baseball cards.

34. Working with Linear Equations 200 points The number of people (n) who will attend a dance depends on the admission price (p), in dollars. This relationship is represented by the equation shown below. n = 800 - 50p Which of these is a correct interpretation of the slope of this equation? A 50 people will attend if the admission price is free B 50 fewer people will attend for every dollar the admission price increases C 800 people will attend if the admission price is free D 800 fewer people will attend for every dollar the admission price increases

35. Working with Linear Equations 200 points ANSWER: B 50 fewer people will attend for every dollar the admission price increases.

36. Working with Linear Equations 300 points Carlos uses the formula below to change Celsius temperatures (C) into Fahrenheit temperatures (F). F = 9C/5 + 32 Which of these graphs represents this formula? A B C D

37. Working with Linear Equations 300 points ANSWER: B.

38. Working with Linear Equations 400 points A fish tank empties at a constant rate. The table below shows the volume of water left in the fish tank after each minute. Which of these equations describes the volume of water in the tank as a function of time? F v = -8t + 622G v = -8t + 630 H v = 8t + 622J v = 8t + 630

39. Working with Linear Equations 400 points ANSWER: G v = -8t + 630

40. Working with Linear Equations 500 points The graph below shows a linear model of the number of people in the United States who have private or government health insurance. What is the slope, in millions of people per year, of this linear model?

41. Working with Linear Equations 500 points ANSWER: 2 million people per year.

42. Wild Card 100 points Look at the graph. Which of these tables corresponds to the line that is graphed? A B C D x-313 y62-2-6 x-313 y6-22-6 x20-2-6 y-40 3 x-2026 y-4043

43. Wild Card 100 points Answer: A x-313 y62-2-6

44. Wild Card 200 points Look at the function that is graphed below. What is the greatest rate of increase of this function? F 3/5 G 3/2 H 2 J 5

45. Wild Card 200 points ANSWER: H 2

46. Wild Card 300 points Sue's doctor must decide how much medicine she needs for each dosage. The dosage (d), in milligrams, depends on Sue's body mass (m), in kilograms. The formula below is used to calculate the dosage of her medicine. d = 0.1m 2 + 5m What is the dosage needed, in milligrams, if Sue's body mass is 70 kilograms?

47. Wild Card 300 points ANSWER: 840 milligrams of medicine

48. Wild Card 400 points Look at the line that is graphed below. Which of these equations describes this line? F y = -2x + 6 G y = -½x + 6 H y = ½x + 6 J y = 2x + 6

49. Wild Card 400 points ANSWER: G y = -½x + 6

50. Wild Card 500 points Mike wants to know how many calories he can burn while jogging. The number of calories burned depends on the length of time Mike jogs. The table below shows the number of calories Mike burns while jogging. Complete the following: Write an equation for a line of best fit. What is the slope of your line of best fit? What does the slope mean in the context of this problem? Mike jogged for 60 minutes. According to your line of best fit, how many calories did he burn? Use mathematics to explain how you determined your answer. Use words, symbols, or both in your explanation. Length of time Jogging (min) 0102030 Calories Burned098196295

51. Wild Card 500 points ANSWER: Equation: y = 9.83x – 0.2 Slope: 9.83 calories / minute This is how many calories Mike burns each minute he is jogging. y = 9.83x – 0.2 x = 60 min y = 9.83 ( 60) – 0.2 y = 589.6 calories

52. FINAL JEOPARDY A tire company wants to determine how quickly the tread on its tires wears down with average use. Let x represent the number of months the tire was used. Let y represent the thickness of the tire tread, in millimeters. An equation for a line of best fit is shown below. y= -5/9x + 20 Complete the following: What is the slope of this line of best fit? What does the slope mean in the context of this problem? What is the y-intercept of this line of best fit? What does the y-intercept mean in the context of this problem? Tina will need to replace her new tires when they have 5 millimeters of tire tread left. According to the line of best fit, for how many months can Tina drive before she needs to replace her tires? Use mathematics to explain how you determined your answer. Use words, symbols, or both in your explanation.