Factoring Polynomials

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Factoring Polynomials

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Presentation transcript:

Factoring Polynomials

The Greatest Common Factor Part 1 The Greatest Common Factor

Greatest Common Factor Greatest common factor – largest quantity that is a factor of all the integers or polynomials involved. Finding the GCF of a List of Integers or Terms Prime factor the numbers. Identify common prime factors. Take the product of all common prime factors. If there are no common prime factors, GCF is 1.

Greatest Common Factor Example Find the GCF of each list of numbers. 12 and 8 7 and 20

Greatest Common Factor Example Find the GCF of each list of numbers. 3) 6, 8 and 46 4) 144, 256 and 300

Greatest Common Factor Example Find the GCF of each list of terms. x3 and x7 6x5 and 4x3

Greatest Common Factor Example Find the GCF of the following list of terms. 3) a3b2, a2b5 and a4b7 Notice that the GCF of terms containing variables will use the smallest exponent found amongst the individual terms for each variable.

Factoring Polynomials The first step in factoring a polynomial is to find the GCF of all its terms. Then we write the polynomial as a product by factoring out the GCF from all the terms. The remaining factors in each term will form a polynomial.

Factoring out the GCF Example Factor out the GCF in each of the following polynomials. 1) 6x3 – 9x2 + 12x = 2) 14x3y + 7x2y – 7xy =

Factoring out the GCF Example Factor out the GCF in each of the following polynomials. 3) 6(x + 2) – y(x + 2) = 4) xy(y + 1) – (y + 1) =

Factoring Trinomials of the Form x2 + bx + c Part 1 Factoring Trinomials of the Form x2 + bx + c

Factoring Trinomials Recall by multiplying two binomials F O I L (x + 2)(x + 4) =.

Factoring Polynomials Example Factor the polynomial x2 + 13x + 30.

Factoring Polynomials Example Factor the polynomial x2 – 11x + 24.

Factoring Polynomials Example Factor the polynomial x2 – 2x – 35.

Prime Polynomials Example Factor the polynomial x2 – 6x + 10.

Prime Polynomials Example Factor the polynomial x2 – 10x + 25.

Check Your Result! You should always check your factoring results by multiplying the factored polynomial to verify that it is equal to the original polynomial. Many times you can detect computational errors or errors in the signs of your numbers by checking your results.