1.05 Factoring GCF

The expression with the lowest power of each of the variables is x^{5}yz^{4}.

Therefore, the GCF of x^{5} y^{3} z^{6} and w^{2} x^{7} y z^{4} is x^{5}yz^{4}.

Another way to find the GCF of the monomials is by expanding the terms and determining the highest number of common factors.

x^5y^3z^6=x \cdot x \cdot x \cdot x \cdot x \cdot y \cdot y \cdot y \cdot z \cdot z \cdot z \cdot z \\ w^{2} x^{7} y z^{4}= w \cdot w \cdot x \cdot x \cdot x \cdot x \cdot x \cdot x \cdot x \cdot y \cdot z \cdot z \cdot z \cdot z

There are no common factors of w between the terms. There are 5 common x factors, 1 common y, and 4 common z factors.

The GCF of 8x^2 and 4x is 4x. So we have:

Although the term 4x is in the original expression when it is factored out the second term does not become zero. Otherwise, when we check the answer by distributing the multiplication, 4x will be lost altogether.

This time, the expressions are already factored. We can use this to help identify the GCF.

In particular, notice that both terms 3x\left(x-4\right) and 7\left(x-4\right) have a factor of \left(x-4\right).

Furthermore the remaining parts of each expression, 3x and 7, have no factors in common. So the GCF is \left(x - 4\right), which we can use to factor the expression:

We will first find the GCF of 8 x y^{4} z^{3}, - 16 x^{3} y^{2} z, and 4 x y^{3} z^{5}. We can then rewrite each expression as a product of the GCF and any remaining factors and then factor out the GCF.

The GCF of 8 x y^{4} z^{3}, - 16 x^{3} y^{2} z \text{ and } 4 x y^{3} z^{5} is 4xy^{2} z. So we will divide each term by 4xy^{2} z:

We can check the answer by distributing the multiplication and using the product of powers rule for exponents:

Notice that, if no mistakes have been made, these are the same steps, just in reverse.