Question

How do you solve `x^2 + 2x - 120 = 0`?

Answer 1

See explanation for a couple of ways...

Explanation:

Find two factors of `120` which differ by `2`. The pair `12`, `10` works.

Hence:

`0 = x^2+2x-120 = (x+12)(x-10)`

So `x = -12` or `x=10`

Alternatively, complete the square then use the difference of squares identity:

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

as follows:

`0 = x^2+2x-120`

`=x^2+2x+1-1-120`

`=(x+1)^2-121`

`=(x+1)^2-11^2`

`=((x+1)-11)((x+1)+11)`

`=(x-10)(x+12)`

Hence `x=10` or `x=-12`