1. Turn in HW Date Page # Assignment Name Poss. Pts. 3/1 70
Distributive Property 10
Turn in HW

2. Distributive Property
Distributive Property: To multiply a sum or difference, multiply each number within the parentheses by the number outside the parentheses.
a(b + c) = ab + ac
(b + c)a = ba + ca
a(b - c) = ab – ac
(b – c) a = ba – ca
Distribute the following:

3. Distributive Property) ( +

4. Distributive Property) ( + +

5. Distributive Property
Distributive Property: To multiply a sum or difference, multiply each number within the parentheses by the number outside the parentheses.
a(b + c) = ab + ac
3(x + 4) =3x +34 = 3x + 12
(b + c)a = ba + ca
a(b - c) = ab – ac
(b – c) a = ba – ca
Distribute the following:

6. Distributive Property
Distributive Property: To multiply a sum or difference, multiply each number within the parentheses by the number outside the parentheses.
a(b + c) = ab + ac
3(x + 4) = 3x +34 = 3x + 12
(b + c)a = ba + ca
(x + 5)6 = 5x +56 = 5x + 30
a(b - c) = ab – ac
(b – c) a = ba – ca
Distribute the following:

7. Distributive Property
Distributive Property: To multiply a sum or difference, multiply each number within the parentheses by the number outside the parentheses.
a(b + c) = ab + ac
3(x + 4) = 3x +34 = 3x + 12
(b + c)a = ba + ca
(x + 5)6 = 5x +56 = 5x + 30
a(b - c) = ab – ac
6(5 – 2x) = 65 – 2x 6 = 30-12x
(b – c) a = ba – ca
Distribute the following:

8. Distributive Property
Distributive Property: To multiply a sum or difference, multiply each number within the parentheses by the number outside the parentheses.
a(b + c) = ab + ac
3(x + 4) = 3x +34 = 3x + 12
(b + c)a = ba + ca
(x + 5)6 = 5x +56 = 5x + 30
a(b - c) = ab – ac
6(5 – 2x) = 65 – 2x 6 = 30-12x
(b – c) a = ba – ca
(3 – 6x)4 = 34 – 6x4 = 12 – 24x
Distribute the following:

9. Distributive Property
Distributive Property: To multiply a sum or difference, multiply each number within the parentheses by the number outside the parentheses.
a(b + c) = ab + ac
3(x + 4) = 3x +34 = 3x + 12
(b + c)a = ba + ca
(x + 5)6 = 5x +56 = 5x + 30
a(b - c) = ab – ac
6(5 – 2x) = 65 – 2x 6 = 30-12x
(b – c) a = ba – ca
(3 – 6x)4 = 34 – 6x4 = 12 – 24x
Distribute the following:
5(4x + 2) =
-7(2x + 5)=
(6m + 1)2 =
-3(5t – 2) =

10. Distributive Property
Distributive Property: To multiply a sum or difference, multiply each number within the parentheses by the number outside the parentheses.
a(b + c) = ab + ac
3(x + 4) = 3x +34 = 3x + 12
(b + c)a = ba + ca
(x + 5)6 = 5x +56 = 5x + 30
a(b - c) = ab – ac
6(5 – 2x) = 65 – 2x 6 = 30-12x
(b – c) a = ba – ca
(3 – 6x)4 = 34 – 6x4 = 12 – 24x
Distribute the following:
5(4x + 2) =20x +10
-7(2x + 5) =
(6m + 1)2 = 12m + 2
-3(5t – 2) = -15t + 6

12. Date
Page #
Assignment Name
Poss. Pts.
3/7 71
Warm Up 15 72
Algebraic Terms 10

13. Write the learning target for today
What is −3 𝑚 3 −n if m = − 1 and n = − 2
Distribute the following
a. 3(4x − 9) b. 4(−6x + 4) c. −3(4h − 8)
4.− 2 9 − − 3 4 −
3/7

14. Algebraic Terms
-5x x - 2
Vocabulary
Definition
Example
Variable
A symbol, usually a letter, used to represent a number in mathematical expressions or sentences x

15. Algebraic Terms
-5x x - 2
Vocabulary
Definition
Example
Coefficient
Number next to variable -5 1

16. Algebraic Terms
-5x x - 2
Vocabulary
Definition
Example
Constant
Terms with no variables
They are constant because their value is constant – it never changes 12 -2

17. There are 4 terms in the above example
Algebraic Terms
-5x x - 2
Vocabulary
Definition
Example
Term
A number, a variable, or a product or quotient
There are 4 terms in the above example
-5x 12 x -2

18. Algebraic Terms
-5x x - 2
Vocabulary
Definition
Example
Expression
Made up of one or more algebraic term
Does not have = sign
-5x x -2