Algebra 1 Notes: Lesson 1-6: Commutative and Associative Properties

1. Algebra 1 Notes:Lesson 1-6:Commutative and Associative Properties

2. Vocabulary Commutative Property

3. Vocabulary Commutative Property - The order in which you add or multiply numbers does not change their sum or product.

4. Vocabulary Commutative Property - The order in which you add or multiply numbers does not change their sum or product. a + b = b + aa b = b  a

5. Vocabulary Commutative Property - The order in which you add or multiply numbers does not change their sum or product. a + b = b + a a  b = b  a Associative Property

6. Vocabulary Commutative Property - The order in which you add or multiply numbers does not change their sum or product. a + b = b + a a  b = b  a Associative Property - The way you group three or more numbers when adding or multiplying does not change their sum or product. (a + b) + c = a + (b + c) (a  b)  c = a (b  c)

7. Evaluate 2 8 5 7

8. Evaluate 2 8 5 7 2  5 8 7

9. Evaluate 2 8 5 7 2  5 8 7 10 56

10. Evaluate 2 8 5 7 2  5 8 7 10 56 560

11. Evaluate 2 25 7 4

12. Evaluate 2 25 7 4 25 4 2 7

13. Evaluate 2 25 7 4 25 4 2 7 100 14

14. Evaluate 2 25 7 4 25 4 2 7 100 14 1,400

15. Example 1 Simplify 8(2b + 4) + 7b. 8(2b + 4) + 7b

16. Example 1 Simplify 8(2b + 4) + 7b. 8(2b + 4) + 7b

17. Example 1 Simplify 8(2b + 4) + 7b. 8(2b + 4) + 7b = 8(2b)+ 8(4) + 7b

18. Example 1 Simplify 8(2b + 4) + 7b. 8(2b + 4) + 7b = 8(2b) + 8(4) + 7b

19. Example 1 Simplify 8(2b + 4) + 7b. 8(2b + 4) + 7b = 8(2b)+ 8(4) + 7b = 16b

20. Example 1 Simplify 8(2b + 4) + 7b. 8(2b + 4) + 7b = 8(2b) + 8(4) + 7b = 16b +

21. Example 1 Simplify 8(2b + 4) + 7b. 8(2b + 4) + 7b = 8(2b) + 8(4) + 7b = 16b + 32

22. Example 1 Simplify 8(2b + 4) + 7b. 8(2b + 4) + 7b = 8(2b) + 8(4) + 7b = 16b + 32 + 7b

23. Example 1 Simplify 8(2b + 4) + 7b. 8(2b + 4) + 7b = 8(2b) + 8(4) + 7b = 16b + 32 + 7b

24. Example 1 Simplify 8(2b + 4) + 7b. 8(2b + 4) + 7b = 8(2b) + 8(4) + 7b = 16b + 32 + 7b = 23b

25. Example 1 Simplify 8(2b + 4) + 7b. 8(2b + 4) + 7b = 8(2b) + 8(4) + 7b = 16b + 32 + 7b = 23b + 32

26. Example 1 Simplify 8(2b + 4) + 7b. 8(2b + 4) + 7b = 8(2b) + 8(4) + 7b = 16b + 32 + 7b = 23b + 32

27. Example 2 • Use the expression three times the sum of 3x and 2y increased by five times the sum of x and 4y. • Write an algebraic expression for the verbal expression.

28. Example 2 • Use the expression three times the sum of 3x and 2y increased by five times the sum of x and 4y. • Write an algebraic expression for the verbal expression. • 3( + )

29. Example 2 • Use the expression three times the sum of 3x and 2y increased by five times the sum of x and 4y. • Write an algebraic expression for the verbal expression. • 3( + )

30. Example 2 • Use the expression three times the sum of 3x and 2y increased by five times the sum of x and 4y. • Write an algebraic expression for the verbal expression. • 3(3x + 2y)

31. Example 2 • Use the expression three times the sum of 3x and 2y increased by five times the sum of x and 4y. • Write an algebraic expression for the verbal expression. • 3(3x + 2y)

32. Example 2 • Use the expression three times the sum of 3x and 2y increased by five times the sum of x and 4y. • Write an algebraic expression for the verbal expression. • 3(3x + 2y) +

33. Example 2 • Use the expression three times the sum of 3x and 2y increased by five times the sum of x and 4y. • Write an algebraic expression for the verbal expression. • 3(3x + 2y) +

34. Example 2 • Use the expression three times the sum of 3x and 2y increased by five times the sum of x and 4y. • Write an algebraic expression for the verbal expression. • 3(3x + 2y) + 5(+)

35. Example 2 • Use the expression three times the sum of 3x and 2y increased by five times the sum of x and 4y. • Write an algebraic expression for the verbal expression. • 3(3x + 2y) + 5( + )

36. Example 2 • Use the expression three times the sum of 3x and 2y increased by five times the sum of x and 4y. • Write an algebraic expression for the verbal expression. • 3(3x + 2y) + 5(x + 4y)

37. Example 2 • Use the expression three times the sum of 3x and 2y increased by five times the sum of x and 4y. • Write an algebraic expression for the verbal expression. • 3(3x + 2y) + 5(x + 4y)

38. Example 2 b) Simplify the expression and indicate the properties used. 3(3x + 2y) + 5(x + 4y)

39. Example 2 b) Simplify the expression and indicate the properties used. 3(3x + 2y) + 5(x + 4y) = 3(3x)

40. Example 2 b) Simplify the expression and indicate the properties used. 3(3x + 2y) + 5(x + 4y) = 3(3x) + 3(2y)

41. Example 2 b) Simplify the expression and indicate the properties used. 3(3x + 2y) + 5(x + 4y) = 3(3x) + 3(2y)+ 5(x)

42. Example 2 b) Simplify the expression and indicate the properties used. 3(3x + 2y) + 5(x + 4y) = 3(3x) + 3(2y)+ 5(x) + 5(4y)

43. Example 2 b) Simplify the expression and indicate the properties used. 3(3x + 2y) + 5(x + 4y) = 3(3x) + 3(2y)+ 5(x) + 5(4y) Distributive Property

44. Example 2 b) Simplify the expression and indicate the properties used. 3(3x + 2y) + 5(x + 4y) = 3(3x) + 3(2y)+ 5(x) + 5(4y) Distributive Property

45. Example 2 b) Simplify the expression and indicate the properties used. 3(3x + 2y) + 5(x + 4y) = 9x + 6y + 5x + 20y Distributive

46. Example 2 b) Simplify the expression and indicate the properties used. 3(3x + 2y) + 5(x + 4y) = 9x + 6y + 5x + 20y Distributive

47. Example 2 b) Simplify the expression and indicate the properties used. 3(3x + 2y) + 5(x + 4y) = 9x + 6y + 5x + 20y Distributive

48. Example 2 b) Simplify the expression and indicate the properties used. 3(3x + 2y) + 5(x + 4y) = 9x+ 6y+ 5x+ 20y Distributive Property = 14x

49. Example 2 b) Simplify the expression and indicate the properties used. 3(3x + 2y) + 5(x + 4y) = 9x + 6y + 5x + 20y Distributive Property = 14x

50. Example 2 b) Simplify the expression and indicate the properties used. 3(3x + 2y) + 5(x + 4y) = 9x+ 6y+ 5x+ 20yDistributive Property = 14x