Question

How do you factor `x^6 - 64`?

Answer 1

(x+2)(x-2)(`x^4` +4`x^2`+16)

Rewrte the given terms as perfect cubes as follows and use the algebraic identity for the factorisation of difference of two cubes.

`x^6` -64 = `(x^2)^3` - `(4)^3`

=(`x^2` -4) (`x^4` +4`x^2`+16)

=(x+2)(x-2)(`x^4` +4`x^2`+16)

Answer 2

This is a bit of a tricky question.

If you write `x^6-64 = (x^2)^3 - 4^3` you can factor it into:

`(x+2)(x-2)(x^4 +4x^2+16)`

If you write:
`x^6-64 = (x^3)^2 - 8^2` , then you factor as

`(x^3+8)(x^3-8)` which can be further factored as:

`(x+2)(x^2-2x+4)(x-2)(x^2+2x+4)`

The second answer is factored into irreducibles (over `RR`).