Multiply (x + 3) (x + 6) (x + 2) (x + 9) (x + 1) (x + 18) Warm-Up Multiply (x + 3) (x + 6) (x + 2) (x + 9) (x + 1) (x + 18)

Warm-Up #2 GCF Factor 6x + 18 3x2 + 12x 45x4 + 60x2

Factoring Trinomials and Difference of Two Perfect Squares

Sign Rule for Factoring Trinomials: When the last term is POSITIVE… The signs inside the parenthesis will be the SAME as the middle number’s sign

Figuring out the Numbers Check to see… What multiplies to give you the last number AND adds to give you the middle number?

x2 +7x + 6 ( )( ) x x + 6 + 1

x2 + 9x + 14 ( )( ) x x + 7 + 2

x2 – 6x + 8 ( )( ) x x – 4 – 2

x2 – 10x + 16 ( )( ) x x – 8 – 2

Sometimes you can factor out a GCF 1st!

2x2 – 16x + 24 2(x2 – 8x +12) 2( )( ) x x – 6 – 2

You Try... 3y2 + 36y + 60 3(y +10)(y +2) 4x2 +24x + 32 4(x + 2)(x + 4)

Sign Rule for Factoring Trinomials: When the last term is NEGATIVE… The parenthesis will have DIFFERENT SIGNS. The larger factor will have the SAME sign as the middle number

n2 + 2n – 48 ( )( ) n n + 8 – 6

x2 + 8x – 20 ( )( ) x x – 2 + 10

x2 – 4x – 21 ( )( ) x x + 3 – 7

x2 – 9x – 36 ( )( ) x x + 3 – 12

2x3 + 18x2 + 28x

c4 + 2c3 – 80c2

3x2 + 6x – 24

5x2 + 5x – 10

3x3 – 6x2 – 45x

3x3 – 39x2 + 120x

Difference of Two Perfect Squares

Factoring Difference of Two Squares Both terms must be Perfect Squares and have a MINUS between them Check the binomial for GCF Use two sets of parenthesis (one’s a plus, one’s a minus) Split up what it takes to make the 1st a perfect square and what it takes the 2nd to be a perfect square

Difference of Two Squares Factor

Difference of Two Squares Factor

2x3 – 162x

16x2 – 36

Classwork Finish Worksheet