18 Properties MathScience Innovation Center Mrs. B. Davis.

Slides:

Advertisements

Similar presentations

Properties of Real Numbers. Closure Property Commutative Property.

Advertisements

Properties of Real Numbers. 2 PROPERTIES OF REAL NUMBERS COMMUTATIVE PROPERTY: Addition:a + b = b + a = = =

Properties of Real Numbers

Algebraic Properties: The Rules of Algebra Be Cool - Follow The Rules!

Properties of Real Numbers

PROPERTIES REVIEW!. MULTIPLICATION PROPERTY OF EQUALITY.

Properties of Real Numbers

Properties of Equality, Identity, and Operations.

Properties of Equality

Algebraic Properties Learning Goal: The student will be able to summarize properties and make connections between real number operations.

Chapter 2 Working with Real Numbers. 2-1 Basic Assumptions.

Properties of Real Numbers

Mathematical Properties Algebra I. Associative Property of Addition and Multiplication The associative property means that you will get the same result.

Integers and Properties

Properties of Addition and Multiplication. Commutative Property In the sum you can add the numbers in any order. a+b = b+a In the product you can multiply.

Properties and Mental Computation p. 80. Math talk What are some math properties that we use? Why do you think we have them? Do you ever use them?

Properties of Real Numbers List of Properties of Real Numbers Commutative Associative Distributive Identity Inverse.

Properties of Real Numbers 1.Objective: To apply the properties of operations. 2.Commutative Properties 3.Associative Properties 4.Identity Properties.

Properties of Real Numbers

Properties of Real Numbers The properties of real numbers help us simplify math expressions and help us better understand the concepts of algebra.

1–1: Number Sets. Counting (Natural) Numbers: {1, 2, 3, 4, 5, …}

Section 1.3 Properties. Properties of Equality Reflexive Property: a=a Symmetric Property: If 3=x, then x=3 Transitive Property: If x=y and y=4 then x=4.

Unit 2 Reasoning with Equations and Inequalities.

1.2 Field Axioms (Properties) Notes on a Handout.

2.3 Diagrams and 2.4 Algebraic Reasoning. You will hand this in P. 88, 23.

by D. Fisher (2 + 1) + 4 = 2 + (1 + 4) Associative Property of Addition 1.

(2 + 1) + 4 = 2 + (1 + 4) Associative Property of Addition.

Unit 2 Solve Equations and Systems of Equations

Properties of Algebra (aka all the rules that holds the math together!)

PROPERTIES OF REAL NUMBERS. COMMUTATIVE PROPERTY OF ADDITION What it means We can add numbers in any order Numeric Example Algebraic Example

Properties of Equality Properties are rules that allow you to balance, manipulate, and solve equations.

Properties of Real Numbers CommutativeAssociativeDistributive Identity + × Inverse + ×

by D. Fisher (2 + 1) + 4 = 2 + (1 + 4) Associative Property of Addition 1.

(2 + 1) + 4 = 2 + (1 + 4) Associative Property of Addition.

Reasoning with Properties from Algebra. Properties of Equality For all properties, a, b, & c are real #s. Addition property of equality- if a=b, then.

Properties of Real Numbers  N: Natural (1,2,3, …)  W: Whole (0,1,2,3,…)  Z: Integers (… -2,-1,0,1,2,…)  Q: Rationals (m/n; m,n integers)  I: Irrational.

Properties A property is something that is true for all situations.

2.5 Algebra Reasoning. Addition Property: if a=b, then a+c = b+c Addition Property: if a=b, then a+c = b+c Subtraction Property: if a=b, then a-c = b-c.

Section 2.2 Day 1. A) Algebraic Properties of Equality Let a, b, and c be real numbers: 1) Addition Property – If a = b, then a + c = b + c Use them 2)

PROPERTIES. ADDITIVE IDENTITY PROPERTY BOOK DEFINITION:FOR ANY NUMBER A, A + 0 = A OWN DEFINITION: THIS PROPERTY SAYS THAT WHEN YOU ADD 0 TO ANY NUMBER.

2-1 Basic Assumptions Objective: To use number properties to simplify expressions.

2-6: Algebraic Proof. Properties Reflexive property – every # equals itself; a=a, 1=1, etc. Symmetric property – You can switch the sides of the equation.

Objective The student will be able to:

Properties of Real Numbers

Properties of Real Numbers

Algebraic Properties.

Properties of Real Numbers

Real Numbers, Algebra, and Problem Solving

Real Numbers and Number Operations

Properties of Equality

Distributing, Sets of Numbers, Properties of Real Numbers

Properties of Real Numbers

Properties of Equality

Properties of Real Numbers

Properties of Real Numbers

Properties of Real Numbers

Properties of Equality

Properties of Real Numbers

PROPERTIES OF ALGEBRA.

Lesson 4-1 Using Properties Designed by Skip Tyler, Varina High School

Properties of Equality

Properties of Numbers Lesson 1-3.

Properties of Real Numbers

Warm up: Name the sets of numbers to which each number belongs: -2/9

Properties of Real Numbers

Properties of Real Numbers

2-6: Algebraic Proof.

Properties of Real Numbers

Presentation transcript:

18 Properties MathScience Innovation Center Mrs. B. Davis

18 Properties B. Davis MathScience Innovation Center Properties of Real Numbers

18 Properties B. Davis MathScience Innovation Center Properties of Real Numbers PropertyAdditionMultiplication

18 Properties B. Davis MathScience Innovation Center Properties of Real Numbers PropertyAdditionMultiplication Closure Commutative Associative Identity Inverse

18 Properties B. Davis MathScience Innovation Center Properties of Real Numbers PropertyAdditionMultiplication Closure If a, b are R, Then a+b is R Commutative Associative Identity Inverse

18 Properties B. Davis MathScience Innovation Center Properties of Real Numbers PropertyAdditionMultiplication Closure If, Then Commutative Associative Identity Inverse

18 Properties B. Davis MathScience Innovation Center Properties of Real Numbers PropertyAdditionMultiplication Closure If, Then If, Then Commutative Associative Identity Inverse

18 Properties B. Davis MathScience Innovation Center Properties of Real Numbers PropertyAdditionMultiplication Closure If, Then If, Then Commutative a + b = b + a Associative Identity Inverse

18 Properties B. Davis MathScience Innovation Center Properties of Real Numbers PropertyAdditionMultiplication Closure If, Then If, Then Commutative a + b = b + a ab = ba Associative Identity Inverse

18 Properties B. Davis MathScience Innovation Center Properties of Real Numbers PropertyAdditionMultiplication Closure If, Then If, Then Commutative a + b = b + a ab = ba Associativea+(b+c)= (a+b)+c Identity Inverse

18 Properties B. Davis MathScience Innovation Center Properties of Real Numbers PropertyAdditionMultiplication Closure If, Then If, Then Commutative a + b = b + a ab = ba Associativea+(b+c)= (a+b)+c a(bc)=(ab)c Identity Inverse

18 Properties B. Davis MathScience Innovation Center Properties of Real Numbers PropertyAdditionMultiplication Closure If, Then If, Then Commutative a + b = b + a ab = ba Associativea+(b+c)= (a+b)+c a(bc)=(ab)c Identitya + ? = a a * ? =a Inverse

18 Properties B. Davis MathScience Innovation Center Properties of Real Numbers PropertyAdditionMultiplication Closure If, Then If, Then Commutative a + b = b + a ab = ba Associativea+(b+c)= (a+b)+c a(bc)=(ab)c Identitya + 0 = a a * 1=a Inverse

18 Properties B. Davis MathScience Innovation Center Properties of Real Numbers PropertyAdditionMultiplication Closure If, Then If, Then Commutative a + b = b + a ab = ba Associativea+(b+c)= (a+b)+c a(bc)=(ab)c Identitya + 0 = a a * 1=a Inverse a + ? = 0 a * ? = 1

18 Properties B. Davis MathScience Innovation Center Properties of Real Numbers PropertyAdditionMultiplication Closure If, Then If, Then Commutative a + b = b + a ab = ba Associativea+(b+c)= (a+b)+c a(bc)=(ab)c Identitya + 0 = a a * 1=a Inverse a + -a = 0 a * = 1

18 Properties B. Davis MathScience Innovation Center One more property of real numbers… Distributive Property a(b+c) = ab + ac Or ab+ac = a(b + c)

18 Properties B. Davis MathScience Innovation Center Properties of Equality You may Add Subtract Multiply Divide ( by anything except 0) As long as you operate on both sides !

18 Properties B. Davis MathScience Innovation Center Properties of Equality Addition If a = 5, then a + 1 = Subtraction If a = 5, then a - 3 = Multiplication If a = 5, then a x 9 = 5 x 9 Division If a = 5, then a /2 = 5 /2

18 Properties B. Davis MathScience Innovation Center Properties of Equality Reflexive Symmetric Transitive

18 Properties B. Davis MathScience Innovation Center Properties of Equality Reflexive 1 Symmetric 2 Transitive 3

18 Properties B. Davis MathScience Innovation Center Properties of Equality Reflexive 1 a= a Symmetric 2 Transitive 3

18 Properties B. Davis MathScience Innovation Center Properties of Equality Reflexive 1 a= a Symmetric 2 If a = b, then b = a. Transitive 3

18 Properties B. Davis MathScience Innovation Center Properties of Equality Reflexive 1 a= a Symmetric 2 If a = b, then b = a. Transitive 3 If a = b, and b = c, then a = c.

18 Properties B. Davis MathScience Innovation Center Properties of Equality Reflexive a= a Transitive If a = b, and b = c, then a = c. Symmetric If a = b, then b = a.

18 Properties B. Davis MathScience Innovation Center Which property is it? Distributive Property a(b+c) = ab + ac Or ab+ac = a(b + c)

18 Properties B. Davis MathScience Innovation Center Which property is it? Commutative Property of Multiplication a(b+c) = (b+c)a

18 Properties B. Davis MathScience Innovation Center Which property is it? Reflexive Property of Equality a(b+c) = a(b+c)

18 Properties B. Davis MathScience Innovation Center Which property is it? Identity Property of Multiplication 1(b+c) = b+ c

18 Properties B. Davis MathScience Innovation Center Which property is it? Symmetric Property of Equality If 2 + 3x = 5 Then 5 = 2 + 3x

18 Properties B. Davis MathScience Innovation Center Which is an example for the property? Transitive Property of Equality If 2 + 3x = 5, and 5 = 6b Then 2 + 3x= 6b If 2 + 3x = 5, and 5 = 6b Then 2 + 3x= 6b If 2 + 3x = 5y, and x= 2 Then 2 + 3(2)= 5y Substitution property If 2 + 3x = 5y, and x= 2 Then 2 + 3(2)= 5y

18 Properties B. Davis MathScience Innovation Center Which example for the property? Property of Additive Inverses = 0 And = = 4 And = = 0 And = 0 Identity Property of Addition = 4 And = 4

18 Properties B. Davis MathScience Innovation Center Which is an example for the property? Commutative Property for Multiplication 4(x + y)=(x+y)4 4(x+y)=4(y+x) 4(x+y)=(x+y)4 Commutative Property for Addition 4(x+y)=4(y+x)