Factoring Quadratic Expressions of two terms by taking a common factor

The Method:

When a quadratic expression contains two terms, it can be factored by taking a common factor. A common factor is a number, variable, or a term that is present in both the terms of the quadratic expression. The common factored is taken outside of parenthesis, and the quadratic expression is written inside the parenthesis.


Examples:


Example 1:  x² + 3x



The common factor of the above quadratic expression is x because x is present in both the terms of the quadratic expression: In 'x²', there are two x's multiplying each other, and in '3x', there is an 'x'. Now when we can take 'x' as the common factor, 'x²' becomes 'x', and '3x' becomes '3'. This is because we have taken away one 'x' from each term. The resulting expression will be as follows:

x(x + 3)

Notice that taking out a common factor is the opposite process of FOIL method. So you can call it unFOILing as well.


Example 2:  4x² + 4


The common factor in the above expression is 4, because 4 is present in both the terms. So you can factor out 4 as follows:

4(x² + 1)

You might want to see the solved examples or the practice by a worksheet on factoring (by the method of taking a common factor).