factors For example, 8 is not only 4 · 2 and 8 · 1, but also 24 · 1__ When factoring a polynomial, the goal is that the GCF of
filedownload.ashx?moduleinstanceid=195&dataid=1013&FileName=SMP08ALG-NA-TE2-C11-L04-11.pdf
A Factoring out common factors We have a linear common factor ( ? 2), thus we B Factoring Special Polynomials Forms Factored Form Example
alg_factoringpolynomials.pdf
Example 1 Use the Distributive Property Use the Distributive Property to factor each polynomial a 21xy – 18x2 First, find the GCF of 21xy and 18x2 21xy = 3
Factoring_Polynomials_GCF.pdf
So far our greatest common factors have been monomials In the next example, the greatest common factor is a binomial EXAMPLE 6 6 Factor: 3y?
Factoring-Polynomials.pdf
The first step in factoring polynomials is to factor out the greatest common factor (GCF) This is the largest integer and highest degree of each variable
GCF%20Polynomilas.pdf
So, GCF polynomial 6 Example: Find the GCF of 18 42 30 The GCF of the coefficients and each variable are shown in the box to the right The GCF of the
Factoring.pdf
polynomials that multiplied together result in the given algebraic expression Common Factoring Step 1: Find the greatest common factor of all terms in the
Common_Factoring.pdf
For example, the polynomial 2x-10 can be rewritten as 2(x-5) This is called factoring a polynomial by removing the greatest common factor (GCF)
factor_a_polynomial_by_removing_the_gcf.pdf
To verify that the GCF has been factored out correctly, multiply the factors together and see that their product is the original polynomial PRACTICE EXAMPLE 3
fcm_ch5_sec5.pdf