Question

How do you factor `-p^{2}+4p-4=0`?

Answer 1

`-(p-2)^2=0`
This involves factoring out the negative from the trinomial.

Explanation:

You want the leading coefficient on the `p^2` to be positive. This means that you should factor out the negative, which will switch the signs.

`=>` `-(p^2-4p+4)=0`

Now that the negative is factored out, you should factor the rest like normal. As `p^2` has no coefficient, the `p` in the factorization must have no coefficient. Seeing the `4`'s, 2 should pop into your head, because both `2+2` and `2*2` equal `4`. The constant is positive, which implies a `-2`, because `-2^2=4`.

These conclusions lead to:

`=>` `(p-2)^2=0`

Now add the negative in front, for:

`=>` `-(p-2)^2=0`

You can test the answer by using FOIL:

`=>` `-((p-2)(p-2))=0`
`=>` `-(p^2-4p+4)=0`

Distribute the negative:

`=>` `-p^2+4p-4=0`