= -(9) + -(-10) = 77 11
(-1/2)(1 3/5)(10/-9) write answer as a fraction Rewrite mixed numbers as improper fractions (-1/2)(8/5)(10/-9) Cross cancel (-1/2)(8/5)(10/-9) (-1/1)(4/1)(2/-9) Count the number of negative signs (-1/2)(8/5)(10/-9) 2 neg odd positive
(-1/2)(1 3/5)(10/-9) write answer as a fraction Answer 8/9 Count the number of negative signs (-1/1)(4/1)(2/-9) Mult tops then bottoms
Go over homework Worksheet +-/* integers
1-5 Properties of Numbers C3
Properties of Numbers 1. Commutative of Addition & Multiplication 2. Associative of Addition & Multiplication 3. Identity of Addition & Multiplication 4. Zero of Multiplication 5. Distributive
The Commutative Property Background The word commutative comes from the verb “to commute.” Definition on dictionary.comdictionary.com Commuting means changing, replacing, or exchanging People who travel back and forth to work are called commuters. Traffic Reports given during rush hours are also called commuter reports.
Here are two families of commuters. Commuter A Commuter B Commuter A Commuter B Commuter A & Commuter B changed lanes. Remember… commute means to change. A + B = B + A A x B = B x A
The Commutative Property A + B = B + A A x B = B x A A + B = B + A A x B = B x A
Commutative Property of Addition Changing the order of the addends does not change the sum A + B = B + A = =
Commutative Property of Multiplication Changing the order of the factors does not change the product A x B = B x A 1 x 2 x 3 = 3 x 1 x 2 4 x 5 x 6 = 5 x 6 x 4
Properties of Multiplication and Addition 1. Commutative of Addition & Multiplication 2. Associative of Addition & Multiplication 3. Identity of Addition & Multiplication 4. Zero of Multiplication 5. Distributive
The Associative Property Background The word associative comes from the verb “to associate.” Definition on dictionary.comdictionary.com Associate means connected, joined, or related People who work together are called associates. They are joined together by business, and they do talk to one another.
Let’s look at another hypothetical situation Three people work together. Associate B needs to call Associates A and C to share some news. Does it matter who he calls first?
ACB Here are three associates. B calls A firstHe calls C last If he called C first, then called A, would it have made a difference? NO!
(The Role of Parentheses) In math, we use parentheses to show groups. In the order of operations, the numbers and operations in parentheses are done first. (PEMDAS) So….
The Associative Property (A x B) x C = A x (B x C) AC B AC B THEN The parentheses identify which two associates talked first. (A + B) + C = A + (B + C)
Associative Property of Addition Changing the grouping of the addends does not change the sum (1 + 2) + 3 = 1 +( 2 + 3) (4 + 5) + 6 = 4 + ( ) (A + B) + C = A +( B + C)
Associative Property of Multiplication Changing the grouping of the factors does not change the product (1 x 2) x 3 = 1 x( 2 x 3) (4 x 5) x 6 = 4 x ( 5 x 6 ) (A x B) x C = A x ( B x C)
Properties of Multiplication and Addition 1. Commutative of Addition & Multiplication 2. Associative of Addition & Multiplication 3. Identity of Addition & Multiplication 4. Zero of Multiplication 5. Distributive
The Identity Property of Addition I am me! You cannot change My identity!
Identity Property of Addition A + 0 = A + 0 =
Identity Property of Addition The sum of zero and anything is anything 0+ 3 = = C = C
Identity Property of Multiplication A x 1 = A x 1 =
Identity Property of Multiplication The product of one and anything is anything 1 x 3 = 3 18 x 1 = 18 1 x C = C
Properties of Multiplication and Addition 1. Commutative of Addition & Multiplication 2. Associative of Addition & Multiplication 3. Identity of Addition & Multiplication 4. Zero of Multiplication 5. Distributive
Zero Property of Multiplication A x 0 = 0 x 0 = 0
Zero Property of Multiplication The product of zero and anything is zero 3 x 0 = 0 18 x 0 =0 0 x C = 0
Properties of Multiplication and Addition 1. Commutative of Addition & Multiplication 2. Associative of Addition & Multiplication 3. Identity of Addition & Multiplication 4. Zero of Multiplication 5. Distributive
Distributive Property Think of a teacher distributing something to every student in the class. and
The Distributive Property Four is multiplying the quantity “x + 3” That means four will multiply both the x and the 3! Multiply 4 times x PROBLEM: 4(x + 3) Copy the operation sign Multiply 4 times 3 4(x + 3) 4 times x4 times 3 4x4x+12 Answer:
Distributive Property You take the number on the outside of the parentheses and give it to everything on the inside of parentheses by way of multiplication. 3(a +b) = 3a + 3b = 2(7 + 5) ac + bc = (a + b)c
Let’s practice ! Look at the problem. Identify which property it represents.
12 x 0 = 0 Zero Property of Multiplication (9 + 8) + 7 = 9 + (8 + 7) The Associative Property of Addition
3 x1 = 3 The Identity Property of Multiplication a + b = b + a The Commutative Property of Addition
9 x 7 = 7 x 9 The Commutative Property of Multiplication (a + b) + c = a + (b + c) The Associative Property of Addition
4 x1 = 4 Identity Property of Multiplication a + 0 = a The Identity Property of Addition
(4 x 3) x 2 = 4 x (3 x 2) The Associative Property of Multiplication 4(x + 3) = 4x + 12 The Distributive Property of Multiplication
a x b = b x a The Commutative Property of Multiplication Moving numbers! 6(5a)=(6 ∙ 5)a The Associative Property of Multiplication
a x 0 = 0 Zero Property of Multiplication ac + bc = (a + b)c Distributive Property
(a x b) x c = a x (b x c) The Associative Property of Multiplication A Parentheses! C B 16 + ½ = ½ + 16 The Communtative Property of Addition
Find the product: 1.) 5(a+6) = 2.) (v-2)9= 3.) -4(t+3)=4.) (-11+w)(-2)= 5.) -2(34)(50)=6.) –(4)*6*-25= 5a + 309v t w w+22
Homework Distributive and property worksheet