Objective Factor polynomials by using the greatest common factor.

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Presentation transcript:

Objective Factor polynomials by using the greatest common factor.

Example 1A: Factoring by Using the GCF Factor each polynomial. Check your answer. 2x2 – 4 2x2 = 2  x  x Find the GCF. 4 = 2  2 2 The GCF of 2x2 and 4 is 2. Write terms as products using the GCF as a factor. 2x2 – (2  2) 2(x2 – 2) Use the Distributive Property to factor out the GCF. Multiply to check your answer. Check 2(x2 – 2) The product is the original polynomial.  2x2 – 4

Example 1B: Factoring by Using the GCF Factor each polynomial. Check your answer. 8x3 – 4x2 – 16x 8x3 = 2  2  2  x  x  x Find the GCF. 4x2 = 2  2  x  x 16x = 2  2  2  2  x The GCF of 8x3, 4x2, and 16x is 4x. 2  2  x = 4x Write terms as products using the GCF as a factor. 2x2(4x) – x(4x) – 4(4x) Use the Distributive Property to factor out the GCF. 4x(2x2 – x – 4) Check 4x(2x2 – x – 4) Multiply to check your answer. The product is the original polynomials. 8x3 – 4x2 – 16x 

Example 1C: Factoring by Using the GCF Factor each polynomial. Check your answer. –14x – 12x2 – 1(14x + 12x2) Both coefficients are negative. Factor out –1. 14x = 2  7  x 12x2 = 2  2  3  x  x Find the GCF. The GCF of 14x and 12x2 is 2x. 2  x = 2x –1[7(2x) + 6x(2x)] Write each term as a product using the GCF. –1[2x(7 + 6x)] Use the Distributive Property to factor out the GCF. –2x(7 + 6x)

Example 1D: Factoring by Using the GCF Factor each polynomial. Check your answer. 3x3 + 2x2 – 10 3x3 = 3  x  x  x Find the GCF. 2x2 = 2  x  x 10 = 2  5 There are no common factors other than 1. 3x3 + 2x2 – 10 The polynomial cannot be factored further.

 Check It Out! Example 1a Factor each polynomial. Check your answer. 6b + 9b3 5b = 5  b Find the GCF. 9b = 3  3  b  b  b The GCF of 5b and 9b3 is b. b Write terms as products using the GCF as a factor. 5(b) + 9b2(b) Use the Distributive Property to factor out the GCF. b(5 + 9b2) Multiply to check your answer. b(5 + 9b2) Check The product is the original polynomial. 5b + 9b3 

Check It Out! Example 1c Factor each polynomial. Check your answer. –18y3 – 12y2 – 1(18y3 + 7y2) Both coefficients are negative. Factor out –1. 18y3 = 2  3  3  y  y  y Find the GCF. 7y2 = 7  y  y y  y = y2 The GCF of 18y3 and 7y2 is y2. Write each term as a product using the GCF. –1[18y(y2) + 7(y2)] –1[y2(18y + 7)] Use the Distributive Property to factor out the GCF.. –y2(18y + 7)

Sometimes the GCF of terms is a binomial Sometimes the GCF of terms is a binomial. This GCF is called a common binomial factor. You factor out a common binomial factor the same way you factor out a monomial factor.

Example 3: Factoring Out a Common Binomial Factor Factor each expression. A. 5(x + 2) + 3x(x + 2) The terms have a common binomial factor of (x + 2). 5(x + 2) + 3x(x + 2) (x + 2)(5 + 3x) Factor out (x + 2). B. –2b(b2 + 1)+ (b2 + 1) The terms have a common binomial factor of (b2 + 1). –2b(b2 + 1) + (b2 + 1) –2b(b2 + 1) + 1(b2 + 1) (b2 + 1) = 1(b2 + 1) (b2 + 1)(–2b + 1) Factor out (b2 + 1).

Check It Out! Example 3 Factor each expression. c. 3x(y + 4) – 2y(x + 4) There are no common factors. 3x(y + 4) – 2y(x + 4) The expression cannot be factored. d. 5x(5x – 2) – 2(5x – 2) The terms have a common binomial factor of (5x – 2 ). 5x(5x – 2) – 2(5x – 2) (5x – 2)(5x – 2) (5x – 2)2 (5x – 2)(5x – 2) = (5x – 2)2

Example 4A: Factoring by Grouping Factor each polynomial by grouping. Check your answer. 6h4 – 4h3 + 12h – 8 Group terms that have a common number or variable as a factor. (6h4 – 4h3) + (12h – 8) 2h3(3h – 2) + 4(3h – 2) Factor out the GCF of each group. 2h3(3h – 2) + 4(3h – 2) (3h – 2) is another common factor. (3h – 2)(2h3 + 4) Factor out (3h – 2).

Example 4B: Factoring by Grouping Factor each polynomial by grouping. Check your answer. 5y4 – 15y3 + y2 – 3y (5y4 – 15y3) + (y2 – 3y) Group terms. Factor out the GCF of each group. 5y3(y – 3) + y(y – 3) 5y3(y – 3) + y(y – 3) (y – 3) is a common factor. (y – 3)(5y3 + y) Factor out (y – 3).

Check It Out! Example 4a Factor each polynomial by grouping. Check your answer. 6b3 + 8b2 + 9b + 12 (6b3 + 8b2) + (9b + 12) Group terms. 2b2(3b + 4) + 3(3b + 4) Factor out the GCF of each group. (3b + 4) is a common factor. 2b2(3b + 4) + 3(3b + 4) (3b + 4)(2b2 + 3) Factor out (3b + 4).