Question

How do you factor `x ^ { 3} + 5x ^ { 2} - x - 5`?

Answer 1

`(x+5)(x+1)(x-1)`

Explanation:

We have the following:

`color(purple)(x^3+5x^2)color(steelblue)(-x-5)`

We can factor a `x^2` out of the purple terms, and a `-1` out of the blue terms. We will get

`color(purple)(x^2(x+5))color(steelblue)(-1(x+5))`

Since both terms have an `x+5` in common, we can factor that out:

`(x+5)color(red)((x^2-1))`

What I have in red is a classic difference of squares, which can be factored as `(x+1)(x-1)`. We now have:

`(x+5)(x+1)(x-1)`

Hope this helps!

Answer 2

`(x-1)(x+1)(x+5)`

Explanation:

The sum of coefficients of given cubic polynomial: `x^3+5x^2-x-5` is `1+5-1-5=0` hence `x=1` is a root of polynomial i.e. `(x-1)` is a factor of cubic polynomial: `x^3+5x^2-x-5` which can be factorized as follows

`x^3+5x^2-x-5`

`=x^2(x-1)+6x(x-1)+5(x-1)`

`=(x-1)(x^2+6x+5)`

`=(x-1)(x^2+5x+x+5)`

`=(x-1)(x(x+5)+(x+5))`

`=(x-1)((x+5)(x+1))`

`=(x-1)(x+1)(x+5)`

Answer 3

`(x-1)(x+1)(x+5)`

Explanation:

The sum of coefficients of given cubic polynomial: `x^3+5x^2-x-5` is `1+5-1-5=0` hence `x=1` is a root of polynomial i.e. `(x-1)` is a factor of cubic polynomial: `x^3+5x^2-x-5` which can be factorized as follows

`x^3+5x^2-x-5`

`=x^2(x-1)+6x(x-1)+5(x-1)`

`=(x-1)(x^2+6x+5)`

`=(x-1)(x^2+5x+x+5)`

`=(x-1)(x(x+5)+(x+5))`

`=(x-1)((x+5)(x+1))`

`=(x-1)(x+1)(x+5)`