Question

How do you simplify `sqrt(-4) - sqrt(-25)`?

Answer 1

`z=-3i orz=3i`

Explanation:

We know for the complex numbers : `i^2=-1`

Let ,

`z=sqrt(-4)-sqrt(-25)`

`=>z=sqrt(4(-1))-sqrt(25(-1))`

`=>z=sqrt(4i^2)-sqrt(25i^2)`

`=>z=sqrt((2i)^2)-sqrt((5i^2))`

`=>z=(+-2i)-(+-5i)`

`=>z=(2i)-(5i) or z=(-2i)-(-5i)`

`=>z=-3i orz=3i`

Answer 2

`pm3i`

Explanation:

Recall that `sqrt(-1)=i`. With this in mind, we can rewrite this as

`sqrt4sqrt(-1)-(sqrt(25)sqrt(-1))`

`=>+-2i-(+-5i)`

`=>2i-5i=-3i` and `-2i-(-5i)=5i-2-=3i`

Therefore, our solutions are `pm3i`.

Hope this helps!