Question

How do you factor `8a^3-27`?

Answer 1

`(2x-3)(2x^2+6x+9)`

Explanation:

1) Decide factoring method

In the equation both `8` and `27` are cubes so we can use the Difference of Cubes method of factoring

2) Solve for variables

The formula for the Difference of Cubes method is:
`a^3-b^3=(a-b)(a^2+ab+b^2)`

First we find `a`:
`a^3=8a^3`
`root(3)(a^3)=root(3)(8a^3)`
`a=2a`

Then we find `b`:
`b^3=27`
`root(3)(b^3)=root(3)(27)`
`b=3`

3) Fill in formula

`a^3-b^3=(a-b)(a^2+ab+b^2)`

`(2x)^3-3^3=(2x-3)(2x^2+(2x*3)+3^2)`

4) Simplify

`(2x-3)(2x^2+6x+9)`