Question

How do you factor completely `12x^3 - 3xy^2`?

Answer 1

`3x(2x+y)(2x-y)`

Explanation:

`12x^3-3xy^2`

take out all common factors

`3x(4x^2-y^2)`

use difference of squares

`3x(2x+y)(2x-y)`

Answer 2

To factor, we have to divide out common factors in each term. Let's first write out the factors:

`12x^3` = `4*3*x*x*x`

`-3xy^2` = `3*-1*x*y*y`

Now look for the factors that each term share. We see that there is a `3` and an `x` that is found in each list. Now we have to take this out of each list.

`(3*x)(4*x*x)`

`(3*x)(-1*y*y)`

Remember that these were being subtracted, so rewrite:

`(3*x)[(4*x*x) -(1*y*y)]`

Simplify.

`(3x)(4x^2-y^2)`

Use difference of squares to simplify further.

`(3x)(2x-y)(2x+y)`