Question

How do you factor `P(x)= x^4 - 6x^3 - 8x^2`?

Answer 1

See explanation.

Explanation:

First you can notice that `x^2` is a common factor, so we can write that:

`P(x)=x^2*(x^2-6x-8)`

To check if the second expression can be factorized we have to calculate its discriminant:

The expression is: `x^2-6x-8`, so:

`a=1`, `b=-6`, `c=-8`,

the discriminant is:

`Delta=(-6)^2-4*1*(-8)=36+32=68`

The discriminant is greater than zero, so the equation has 2 distinct real roots:

`x_1=(6-sqrt(68))/2=3-2sqrt(17)`

and

`x_2=(6+sqrt(68))/2=3+2sqrt(17)`

So the complete factorization is:

`P(x)=x^2*(x-3+2sqrt(17))*(x-3-2sqrt(17))`