Question

How do you factor `(r+6)^3-216`?

Answer 1

`(r+6)^3-216=r(r^2+18r+108)`

Explanation:

The difference of cubes identity can be written:

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

We can use this with `a=(r+6)` and `b=6` as follows:

`(r+6)^3-216`

`=(r+6)^3-6^3`

`=((r+6)-6)((r+6)^2+(r+6)(6)+6^2)`

`=r((r^2+12r+36)+(6r+36)+36)`

`=r(r^2+18r+108)`

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Footnote

The remaining quadratic factor cannot be factorised further using Real coefficients.

It can be factorised by completing the square using Complex coefficients:

`r^2+18r+108`

`=(r+9)^2-81+108`

`=(r+9)^2+27`

`=(r+9)^2-(3sqrt(3)i)^2`

`=((r+9)-3sqrt(3)i)((r+9)+3sqrt(3)i)`

`=(r+9-3sqrt(3)i)(r+9+3sqrt(3)i)`