1. Splash Screen

2. Over Lesson 1–2 5-Minute Check 1 A.naturals (N), wholes (W), integers (Z) B.wholes (W), integers (Z), reals (R) C.naturals (N), wholes (W), rationals (Q), reals (R) D.naturals (N), wholes (W), integers (Z), rationals (Q), reals (R)

3. Over Lesson 1–2 5-Minute Check 2 A.naturals (N), wholes (W) B.reals (R) C.rationals (Q), reals (R) D.integers (Z), reals (R)

4. Over Lesson 1–2 5-Minute Check 4 A.Associative Property of Addition B.Identity Property C.Distributive Property D.Substitution Property Name the property illustrated by 3(4 + 0.2) = 3(4) + 3(.02).

5. Over Lesson 1–2 5-Minute Check 6 Which equation illustrates the Additive Identity Property? A.5 + 0 = 5 B.5(1) = 5 C.5 + (–5) = 0 D.

6. Example 1 Verbal to Algebraic Expression A. Write an algebraic expression to represent the verbal expression 7 less than a number. Answer: n – 7

7. Example 1 Verbal to Algebraic Expression B. Write an algebraic expression to represent the verbal expression the square of a number decreased by the product of 5 and the number. Answer: x 2 – 5x

8. Example 1a A.6x B.x + 6 C.x 6 D.x – 6 A. Write an algebraic expression to represent the verbal expression 6 more than a number.

9. Example 1b A.x 3 – 2 B.2x 3 C.x 2 – 2 D.2 + x 3 B. Write an algebraic expression to represent the verbal expression 2 less than the cube of a number.

10. Example 2 Algebraic to Verbal Sentence A. Write a verbal sentence to represent 6 = –5 + x. Answer: Six is equal to –5 plus a number.

11. Example 2 Algebraic to Verbal Sentence B. Write a verbal sentence to represent 7y – 2 = 19. Answer: Seven times a number minus 2 is 19.

12. Example 2a A.The difference of a number and 3 is 7. B.The sum of a number and 3 is 7. C.The difference of 3 and a number is 7. D.The difference of a number and 7 is 3. A. What is a verbal sentence that represents the equation n – 3 = 7?

13. Example 2b A.Five is equal to the difference of 2 and a number. B.Five is equal to twice a number. C.Five is equal to the quotient of 2 and a number. D.Five is equal to the sum of 2 and a number. B. What is a verbal sentence that represents the equation 5 = 2 + x?

14. Concept

15. Example 3 Identify Properties of Equality A.Name the property illustrated by the statement. a – 2.03 = a – 2.03 Answer: Reflexive Property of Equality

16. Example 3 Identify Properties of Equality B.Name the property illustrated by the statement. If 9 = x, then x = 9. Answer: Symmetric Property of Equality

17. Example 3a A.Reflexive Property of Equality B.Symmetric Property of Equality C.Transitive Property of Equality D.Substitution Property of Equality A. What property is illustrated by the statement? If x + 4 = 3, then 3 = x + 4.

18. Example 3b A.Reflexive Property of Equality B.Symmetric Property of Equality C.Transitive Property of Equality D.Substitution Property of Equality B. What property is illustrated by the statement? If 3 = x and x = y, then 3 = y.

19. Concept

20. Example 4 Solve One-Step Equations A. Solve m – 5.48 = 0.02. Check your solution. m – 5.48=0.02Original equation m – 5.48 + 5.48=0.02 + 5.48Add 5.48 to each side. m=5.5Simplify. Checkm – 5.48=0.02Original equation Answer: The solution is 5.5. 0.02=0.02Simplify. 5.5 – 5.48=0.02Substitute 5.5 for m. ?

21. Example 4 Solve One-Step Equations Original equation Simplify.

22. Example 4 Solve One-Step Equations Answer: The solution is 36. Substitute 36 for t. Simplify. CheckOriginal equation ?

23. Example 4a A.–8 B.–2 C.2 D.8 A. What is the solution to the equation x + 5 = 3?

24. Example 4b B. What is the solution to the equation A.5 B. C.15 D.30

25. Example 5 Solve a Multi-Step Equation Solve 53 = 3(y – 2) – 2(3y – 1). 53=3(y – 2) – 2(3y – 1)Original equation 53=3y – 6 – 6y + 2Apply the Distributive Property. 53=–3y – 4Simplify the right side. 57=–3yAdd 4 to each side. –19=yDivide each side by –3. Answer: The solution is –19.

26. Example 5 What is the solution to 25 = 3(2x + 2) – 5(2x + 1)? A.–6 B. C. D.6

27. Example 6 Solve for a Variable Surface area formula Subtract πr 2 from each side. Simplify.

28. Example 6 Solve for a Variable Divide each side by πr. Simplify.

29. Example 6a GEOMETRY The formula for the perimeter of a rectangle is where P is the perimeter, and w is the width of the rectangle. What is this formula solved for w? A. B. C. D.

30. Example 7 ABCDABCD Read the Test Item You are asked to find the value of the expression 4g – 2. Your first thought might be to find the value of g and then evaluate the expression using this value. Notice that you are not required to find the value of g. Instead, you can use the Subtraction Property of Equality.

31. Example 7 Solve the Test Item Answer: C Original equation Subtract 7 from each side. Simplify.

32. Example 7 A.12 B.6 C.–6 D.–12 If 2x + 6 = –3, what is the value of 2x – 3?

33. Assignment: pg 22 #22-28, 30-33, 35- 42, 45, 46