1. Solving Polynomials 22 11 Review of Previous Methods Factoring Cubic Expressions

2. Basic Steps  Set the polynomial equal to zero  Factor  Set each factor equal to zero  Solve each factor  CHECK THE ANSWERS!  Substitute the answer into the original equation & verify you get the same value on both sides of the equal sign 2

3. Greatest Common Factor (GCF)  Look for the largest common number and/or variables in each term  Divide each term by the common terms Factor: 3

4. Rainbow Method (2 nd degree Polynomial) 4

5. Grouping  Solve as you would the last 3 steps of the “Rainbow” Method  Only works with 4 terms that GCF does not apply to  Steps:  Write polynomial in standard form  Use GCF on the first 2 terms  Use GCF on the last 2 terms Note: You MUST have repeated expressions in parenthesis  Otherwise, it’s prime or was factored incorrectly  Rewrite the factors outside the parenthesis inside their own parenthesis  Write the repeated expression once in parenthesis 5

6. Grouping Example  Factor 6

7. Special Cases 7 Factoring FormulasExample Difference of two Squares:9a 2 – 16 =(3a) 2 – (4) 2 = (3a + 4)(3a – 4) Difference of two Cubes: x 3 – y 3 = (x - y)(x 2 + xy + y 2 ) 8a 3 – 27 = (2a) 3 – (3) 3 = (2a – 3)[(2a) 2 + (2a)(3) + (3) 2 ] =(2a – 3)(4a 2 + 6a + 9) Sum of two Cubes: x 3 + y 3 = (x + y)(x 2 – xy + y 2 ) 125a 3 + 1 = (5a) 3 + (1) 3 = (5a + 1)[(5a) 2 – (5a)(1) + (1) 2 ]

8. Difference of Squares 8  Must have a “-”

9. Difference of Cubes  Must have a “-” 9

10. Sum of Cubes  Must have a “+” 10