Question

How do you factor by grouping `x^6 + 12x^2y^2 +64y^6 - 1`?

Answer 1

`x^6+12x^2y^2+64y^6-1`

`=(x^2+4y^2-1)(x^4+16y^4+1-4x^2y^2+4y^2+x^2)`

Explanation:

We can at least partially factor this as follows:

Let `u=x^2`, `v=4y^2` and `w=-1`

Then

`x^6+12x^2y^2+64y^6-1 = u^3+v^3+w^3-3uvw`

This symmetric polynomial is a little easier to work with:

`u^3+v^3+w^3-3uvw`

`= (u+v+w)(u^2+v^2+w^2-uv-vw-wu)`

`=(x^2+4y^2-1)(x^4+16y^4+1-4x^2y^2+4y^2+x^2)`

You can then reconstruct this answer as factoring by grouping, but that would not explain how you found the splits.

By the way, `u^2+v^2+w^2-uv-vw-wu` has linear factors with Complex coefficients:

`u^2+v^2+w^2-uv-vw-wu`

`= (u+omega v + omega^2 w)(u+omega^2 v + omega w)`

where `omega = -1/2+sqrt(3)/2 i` is the primitive cube root of `1`.