Question

How do you simplify `sqrt(-5) + sqrt(-20)`?

Answer 1

`3sqrt(-5)" "`, or `" "3isqrt(5)`

Explanation:

The trick here is to try and rewrite `-20` as

`-20 = -5 * 4`

This means that `sqrt(-20)` can be written as

`sqrt(-20) = sqrt(-5 * 4) = sqrt(-5) * sqrt(4) = 2 * sqrt(-5)`

The expression becomes

`sqrt(-5) + 2sqrt(-5)`

These radical terms can be combined to give

`sqrt(-5) + 2sqrt(-5) = sqrt(-5) * (1 + 2) = 3sqrt(-5)`

If you're familiar with complex numbers, you can further simplify this expression by using

`i^2 = -1 implies sqrt(-1) = i`

This will get you

`3sqrt(-5) = 3sqrt(-1 * 5) = 3sqrt(-1) * sqrt(5) = 3 * i * sqrt(5)`