Question

Determine if x^2-100 is a difference of 2 squares, if so factor it. ?

Answer 1

`(x+10)*(x-10)`

Explanation:

We know that we can write `100` as `10^2`.
Therefore we get `x^2-10^2`.

And we apply our known rule :
`a^2-b^2 = (a+b)*(a-b)`

`x^2-10^2 = (x+10)*(x-10)`

Answer 2

`(x-10)(x+10)`

Explanation:

Given: `x^2-100`.

We know that `100=10^2`. The equation becomes:

`=x^2-10^2`

The difference of squares rule states that: `a^2-b^2=(a-b)(a+b)`.

Here `a=x,b=10`. So we get:

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