Multiply (x+3)(2x-7) Factor 3. 42x – 7 Opener Multiply (x+3)(2x-7) Factor 3. 42x – 7
Homework Check
Skills Check
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 Look at b for the sign Front are factors of a Last factors of c that will add to get b.
x2 +7x + 6 ( )( ) x x + 6 + 1
x2 + 9x + 14 ( )( ) x x + 7 + 2
x2 – 6x + 8 ( )( ) x x – 4 – 2
Sometimes you can factor out a GCF 1st!
x2 – 10x + 16 ( )( ) x x – 8 – 2
2x2 – 16x + 24 2(x2 – 8x +12) 2( )( ) x x – 6 – 2
Opener.. 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
c4 + 2c3 – 80c2
3x2 + 6x – 24
Opener Match the problems with the signs of the factors. x2 - 6x + 8 i. Both signs are positive. x2 + 6x + 8 ii. Both signs are negative. C. x2 - 7x - 8 iii. They have different signs.
2x3 + 18x2 + 28x
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 Worksheet