Presentation is loading. Please wait.

Presentation is loading. Please wait.

Factoring out the GCF.

Published byBritney Shepherd Modified over 8 years ago

Similar presentations

Presentation on theme: "Factoring out the GCF."— Presentation transcript:

1 Factoring out the GCF

2 What does it mean to factor a number?
I can factor the number 12 in different ways… 12 = 1 x 12 12 = 2 x 6 12 = 3 x 4 12 = 2 x 2 x 3 12 = 0.5 x 24 A simple way to think of factoring is to break a “number” down into 2 or more pieces that when multiplied will give you that number back again.

3 Therefore, this is the first factor.
Example #1: Factor. 25x2 + 60x4 – 35x3 = 5x2( 5 + 12x2 – 7x) Always when asked to factor an algebraic expression, begin by looking for a GCF Now divide 5x2 into each term of the original expression… 25x2 ÷ 5x2 = 5 60x4 ÷ 5x2 = 12x2 35x3 ÷ 5x2 = 7x The GCF(25x2, 60x4, 35x3) = 5x2 Therefore, this is the first factor.

4 24x5y3 – 32x2y4 = 8x2y3( 3x3 – 4y) GCF(24x5y3, 32x2y4) = 8x2y3
Example #2: Factor 24x5y3 – 32x2y4 = 8x2y3( 3x3 – 4y) GCF(24x5y3, 32x2y4) = 8x2y3

5 Example #3: Factor 12a4b2 – 18a5b + 30a3b3 = 6a3b( 2ab – 3a2 + 5b2) GCF(12a4b2, 18a5b, 30a3b3) = 6a3b

6 14x3 – 21x5 + 7x2 = 7x2( 2x – 3x3 + 1) GCF(14x3, 21x5, 7x2) = 7x2
Example #4: Factor 14x3 – 21x5 + 7x2 = 7x2( 2x – 3x3 + 1) GCF(14x3, 21x5, 7x2) = 7x2

7 Example #5: Factor x

8 Example #6: Factor 3

Download ppt "Factoring out the GCF."

Similar presentations

Factoring and Expanding Linear Expressions .

Factoring and Expanding Linear Expressions .
Section 5.1 Prime Factorization and Greatest Common Factor.

Section 5.1 Prime Factorization and Greatest Common Factor.
Definition of a Prime Number

Definition of a Prime Number
Greatest Common Factor (GCF) and Least Common Multiple (LCM)

Greatest Common Factor (GCF) and Least Common Multiple (LCM)
Used to find the LCM and GCF to help us add and subtract fractions.

Used to find the LCM and GCF to help us add and subtract fractions.
Solving Equations Containing To solve an equation with a radical expression, you need to isolate the variable on one side of the equation. Factored out.

Solving Equations Containing To solve an equation with a radical expression, you need to isolate the variable on one side of the equation. Factored out.
 Step 1: Multiply the F IRST terms in the brackets.

 Step 1: Multiply the F IRST terms in the brackets.
INTRODUCTION TO FACTORING POLYNOMIALS MSJC ~ San Jacinto Campus Math Center Workshop Series Janice Levasseur.

INTRODUCTION TO FACTORING POLYNOMIALS MSJC ~ San Jacinto Campus Math Center Workshop Series Janice Levasseur.
Copyright © 2012, 2009, 2005, 2002 Pearson Education, Inc. Section 6.1 Removing a Common Factor.

Copyright © 2012, 2009, 2005, 2002 Pearson Education, Inc. Section 6.1 Removing a Common Factor.
Factoring FactoringFactoring- to factor an algebraic expression we change the form of an expression and put it in factored form. It is the reverse of using.

Factoring FactoringFactoring- to factor an algebraic expression we change the form of an expression and put it in factored form. It is the reverse of using.
 Millhouse squared the numbers 2 and 3, and then added 1 to get a sum of 14. ◦ 2 2 + 3 2 + 1 = 14  Lisa squared the numbers 5 and 6, and then added 1.

 Millhouse squared the numbers 2 and 3, and then added 1 to get a sum of 14. ◦ = 14  Lisa squared the numbers 5 and 6, and then added 1.
9.1 Multiplying and Dividing Rational Expressions Algebra II w/ trig.

9.1 Multiplying and Dividing Rational Expressions Algebra II w/ trig.
A.3 Objectives A. Polynomials and Factoring 1.Understand the vocabulary of polynomials 2.Add and subtract polynomials 3.Write polynomials in standard form.

A.3 Objectives A. Polynomials and Factoring 1.Understand the vocabulary of polynomials 2.Add and subtract polynomials 3.Write polynomials in standard form.
Rational Expressions rational expression: quotient of two polynomials x2 + 3x - 10 3x + 2 means (x2 + 3x - 10) ÷ (3x + 2) restrictions: *the denominator.

Rational Expressions rational expression: quotient of two polynomials x2 + 3x x + 2 means (x2 + 3x - 10) ÷ (3x + 2) restrictions: *the denominator.
INTRODUCTION TO FACTORING POLYNOMIALS MSJC ~ San Jacinto Campus Math Center Workshop Series Janice Levasseur.

INTRODUCTION TO FACTORING POLYNOMIALS MSJC ~ San Jacinto Campus Math Center Workshop Series Janice Levasseur.
8.4: Do Now: Multiply the expression. Simplify the result.

8.4: Do Now: Multiply the expression. Simplify the result.
Lesson 10-1: Factors & Greatest Common Factor (GCF)

Lesson 10-1: Factors & Greatest Common Factor (GCF)
Factoring polynomials with a common monomial factor (using GCF). **Always look for a GCF before using any other factoring method. Factoring Method #1.

Factoring polynomials with a common monomial factor (using GCF). **Always look for a GCF before using any other factoring method. Factoring Method #1.
Split the middle term to Factor Trinomials. Factoring trinomials of form: look for GCF find factors of c that add up to b Factors of -8: -1 8 2 -4 1 -8.

Split the middle term to Factor Trinomials. Factoring trinomials of form: look for GCF find factors of c that add up to b Factors of -8:
Think of a number Multiply it by 2 Add 8 Divide by 2 Subtract the number you started with What is your answer? Mind reading.

Think of a number Multiply it by 2 Add 8 Divide by 2 Subtract the number you started with What is your answer? Mind reading.

Similar presentations

Ads by Google