Question

How do you factor `x^{2}-16x-96`?

Answer 1

`(x-\frac{16 + 8sqrt(10)}{2})(x-\frac{16 -8sqrt(10)}{2})`

Explanation:

You can use the standard formula

`x_{1,2} = \frac{-b \pm \sqrt(b^2-4ac)}{2a}`

if the equation is

`ax^2+bx+c=0`

to find its roots. In your case, we have

`x_{1,2} = \frac{16 \pm \sqrt(256-4*1*96)}{2*1}`

`=\frac{16 \pm \sqrt(256+384)}{2}`

`=\frac{16 \pm \sqrt(640)}{2}`

As a side note, we can write

`\sqrt(640) = \sqrt(64*10) = \sqrt(64)*\sqrt(10) = 8sqrt(10)`

So, the solutions become

`x_{1,2} = \frac{16 \pm 8sqrt(10)}{2}`

So, we can factor the polynomial as

`(x-\frac{16 + 8sqrt(10)}{2})(x-\frac{16 -8sqrt(10)}{2})`