2. Splash Screen

3. Contents Lesson 9-1Properties Lesson 9-2Solving Addition Equations Lesson 9-3Solving Subtraction Equations Lesson 9-4Solving Multiplication Equations Lesson 9-5Solving Two-Step Equations Lesson 9-6Functions Lesson 9-7Graphing Functions

4. Lesson 1 Contents Example 1Use the Distributive Property Example 2Apply the Distributive Property Example 3Identify Properties Example 4Identify Properties Example 5Apply Properties

5. Example 1-1a Find mentally using the Distributive Property. Write 43 as Distributive Property Multiply 6 and 40 mentally. Add 240 and 18 mentally. Answer: 258

6. Example 1-1b Find mentally using the Distributive Property. Answer: 231

7. Example 1-2a THEME PARKS Suppose admission to a theme park costs $35 per person and meals cost $20 per person. What is the cost for a family of 5 people? Method 1 Find the cost of 5 admissions and 5 meals. Then add. cost of 5 admissions cost of 5 meals Method 2 Find the cost for 1 person. Then multiply by 5. cost for 1 person

8. Example 1-2b Evaluate either expression. Answer: The total cost is $275. Distributive Property Multiply. Add.

9. Example 1-2c BOWLING Suppose the cost of bowling three games at a local bowling alley is $6.50 and the cost of shoe rental is $1.50. What is the cost for a group of 6 friends to each rent a pair of shoes and bowl three games? Answer: $48

10. Example 1-3a Answer: This is the Commutative Property of Addition. The order in which the numbers are added changes. Identify the property shown by the equation

11. Example 1-3b Answer: Commutative Property of Multiplication Identify the property shown by the equation

12. Example 1-4a Answer: This is the Associative Property of Multiplication. The grouping of the numbers to be multiplied changes. Identify the property shown by the equation

13. Example 1-4b Answer: Associative Property of Addition Identify the property shown by the equation

14. Example 1-5a Find mentally. Since you can easily multiply 2 and 4, change the order. Commutative Property Now group the numbers. The parentheses tell you which to perform first. Associative Property Multiply 2 and 4 mentally. Multiply 8 and 12 mentally. Answer: 96

15. Example 1-5b Find mentally. Answer: 117

16. Lesson 2 Contents Example 1Solve an Equation by Subtracting Example 2Solve an Equation Using Zero Pairs

17. Example 2-1a Method 1Use models.

18. Example 2-1b Method 2 Use symbols. Write the equation. Answer: The solution is 1. Subtract 4 from each side to “undo” the addition of 4 on the left.

19. Example 2-1c Answer:

20. Example 2-2a Method 1Use models. Check your solution.

21. Example 2-2b

22. Method 2 Use symbols. Write the equation. Subtract 11 from each side to undo x plus 11. Check Write the equation. Replace x with –4. This sentence is true. Answer: The solution is –4. Subtract 11 from each side.

23. Example 2-2c Answer: –6

24. Lesson 3 Contents Example 1Solve an Equation by Adding Example 2Solve a Subtraction Equation Example 3Use an Equation to Solve a Problem

25. Example 3-1a Method 1Use models.

26. Example 3-1b Method 2 Use symbols. Write the equation. Add 5 to each side. Simplify. Add 5 to each side to undo the subtraction of 5 on the left. Answer: The solution is 15.

27. Example 3-1c Answer: 12

28. Example 3-2a Check your solution. Write the equation. Add 5 to each side. Simplify. Answer: The solution is 4. Check Write the original equation. Replace x with 4. This sentence is true.

29. Example 3-2b Check your solution. Answer: 3

30. Example 3-3a GRID-IN TEST ITEM The difference between the record high and the record low temperatures in Oregon is 173  F. The record low temperature is –54  F. What is the record high temperature in degrees Fahrenheit? Read the Test Item The record high temperature is 119  F. Write the equation. Definition of subtraction Subtract 54 from each side. Simplify. Solve the Test Item You need to find the record high temperature. Write and solve an equation. Let x represent the high temperature.

31. Example 3-3b Answer:

32. Example 3-3c GRID-IN TEST ITEM The difference between the age of Julie’s mother and Julie’s age is 27 years. Julie’s age is 6. What is the age of Julie’s mother? Answer:

33. Lesson 4 Contents Example 1Solve a Multiplication Equation Example 2Solve a Multiplication Equation Example 3Use an Equation to Solve a Problem

34. Example 4-1a Check your solution.

35. Example 4-1b

36. Example 4-1c Check Write the original equation. Replace x with 3. This sentence is true. Answer: The solution is 3.

37. Example 4-1d Check your solution. Answer: 5

38. Example 4-2a Write the equation. Divide each side by –5. Answer: The solution is –3. Check this solution.

39. Example 4-2b Answer: –7

40. Example 4-3a GEOMETRY The area of a rectangle is 144 square inches and the width is 4 inches. Write an equation to find the length of the rectangle and use it to solve the problem. The area of a rectangle is equal to its length times its width. 144

41. Example 4-3b Write the equation. Divide each side by 4. Simplify. Answer: The length of the rectangle is 36 inches. Check

42. Example 4-3c GEOMETRY The area of a rectangle is 126 square feet and the width is 7 feet. Write an equation to find the length of the rectangle and use it to solve the problem. Answer: 18 feet

43. Lesson 5 Contents Example 1Solve a Two-Step Equation Example 2Solve a Two-Step Equation Example 3Use an Equation to Solve a Problem

44. Example 5-1a

45. Answer: The solution is –3.

46. Example 5-1b Answer: 2

47. Example 5-2a Check your solution. Write the equation. Add 2 to each side. Simplify. Divide each side by 4. Simplify. Answer: The solution is 2. Check this solution.

48. Example 5-2b Answer: 4

49. Example 5-3a MOVIE NIGHT Three friends went to the movies. The tickets cost $6 each. They bought 2 large popcorns to share. If they spent a total of $24 at the movies, how much did a large popcorn cost? The cost of 2 large popcorns plus 3 tickets is $24. Two popcorns at $p each plus tickets costs $24 Words Variable Equation 2p2p

50. Example 5-3b Write the equation. Subtract 18 from each side. Simplify. Divide each side by 2. Simplify. Answer: A large popcorn cost $3. Is this answer reasonable?

51. Example 5-3c SHOPPING Jen went to her favorite store at the mall. She bought 3 t-shirts which cost $12 each. She also bought 2 pairs of the same jeans. If Jen spent a total of $80 at the store, how much did each pair of jeans cost? Answer: $22

52. Lesson 6 Contents Example 1Complete a Function Table Example 2Find a the Rule for a Function Table Example 3Solving a Problem Using a Function

53. Example 6-1a Complete the function table. The function rule is 3n. Multiply each input by 3. Input Output –1 –3 0 0 1 3 1 0 –1 Output (3n) Input (n) Answer: –3 1 0

54. Example 6-1c Complete the function table. 3 2 1 Output Input Answer: 3 5 4

55. Example 6-2a Find the rule for the function table. 25 58 710 Output Input Input Output 10 7 8 5 5 2 The output is three less than the input. Answer: So, the function rule is n – 3. Study the relationship between each input and output.

56. Example 6-2b Find the rule for the function table. 29 310 411 Output Input Answer:

57. Example 6-3a COFFEE Nina buys a refillable mug for $4.50 on her first day at a new job. Starting with her second day, she gets a refill of coffee costing $2.00 every day on the way to work. How much does she spend on coffee in her first 8 workdays? First, determine the function rule. The function rule is Then, replace d in the rule with the number of workdays after Nina’s first day, 7.

58. Example 6-3b Replace d with 7. Multiply 2 and 7. Add 14 and 4.50. Answer: Nina spends $18.50 on coffee in her first 8 workdays.

59. Example 6-3c MOVIE RENTAL A video store offers a deal where the first movie rented costs $5.25 and each movie rented after the first costs $2.50. Find the total cost to rent 6 movies. Answer: $17.75

60. Lesson 7 Contents Example 1Graph a Function Example 2Make a Function Table for a Graph

61. Example 7-1a Step 1 Record the input and output in a function table. List the input and output as ordered pairs. Make a function table for the rule Use input values of –4, 0, and 4. Then graph the function. 4 0 –4 (x, y)(y)( )(x) Ordered Pairs OutputFunction RuleInput –2 (–4, –2) 2 (0, 2) 6(4, 6)

62. Example 7-1b Step 2 Graph the ordered pairs on the coordinate plane. Step 3 The points appear to lie on a line. Draw the line that contains these points. The line is the graph of For any point on this line

63. Example 7-1c Answer:

64. Example 7-1d Make a function table for the rule Use input values of –2, 1, and 5. Then graph the function. (5, 2)25 – 35 (1, –2)–21 – 31 (–2, –5)–5–2 – 3–2 (x, y)(y)(x – 3)(x) Ordered Pairs OutputFunction RuleInput Answer:

65. Example 7-1e Answer:

66. Example 7-2a Make a function table for the graph. Then determine the function rule. Use the ordered pairs to make a function table.

67. Example 7-2b Study the input and output. Look for a rule. Input (x)Output (y)(x, y) –48(–4, 8) –24(–2, 4) 00(0, 0) 2–4(2, –4) Input Output –4 8 –2 4 0 0 2–4 Each input is multiplied by –2 to get the output. Answer: The function rule is

68. Example 7-2d Make a function table for the graph. Then determine the function rule. Answer: