Question

How do you simplify `\frac { a ^ { 2} - a - 21} { a - 5}`?

Answer 1

`a + 4 - 1/(a-5)`

Explanation:

The numerator cannot be factored, since there are no two factors of `-21` which add up to `-1`. Therefore, the only way to simplify this is through long division:

`(a^2-a-21)/(a-5)`

First, separate the `-a` into `-5a + 4a`.

`(a^2 - 5a + 4a - 21)/(a-5)`

Now, the first two terms can be removed and simplified:

`(a^2-5a)/(a-5) + (4a-21)/(a-5)`

`a + (4a-21)/(a-5)`

Next, we need to do the same 'splitting' technique with the ones term, in order to be able to factor it out along with the `4a`:

`a + (4a - 20 - 1) / (a-5)`

`a + (4a - 20)/(a-5) - 1/(a-5)`

`a + 4 - 1/(a-5)`

There aren't any more terms to "split" and factor out, so this is as simple as we can get.

Final Answer