Question

How do you evaluate `\sqrt { - 81} + \sqrt { 49}`?

Answer 1

`sqrt(-81)+sqrt49=9i+7`

Explanation:

Here we are dealing with square roots of negative numbers i.e. imaginary and / or complex numbers are involved. Hence recall that `i^2=-1`

Therefore `sqrt(-81)+sqrt49`

= `sqrt(-1xx9xx9)+sqrt(7xx7)`

= `sqrt(i^2xx9^2)+sqrt(7^2)`

= `9i+7`

Answer 2

`sqrt(-81)+sqrt(49) = 9i+7`

Explanation:

A square root `a` of a number `n` is a number such that `a^2=n`.

Every non-zero number `n` has two square roots `sqrt(n)` and `-sqrt(n)`.

The `sqrt` symbol denotes the principal square root which is defined as follows:

If `n > 0` then `sqrt(n)` is the positive square root.

If `n < 0` then `sqrt(n) = i sqrt(-n)` where `i` is the imaginary unit.

In our example:

`sqrt(-81)+sqrt(49) = sqrt(-9^2)+sqrt(7^2)`

`color(white)(sqrt(-81)+sqrt(49)) = i sqrt(9^2)+sqrt(7^2)`

`color(white)(sqrt(-81)+sqrt(49)) = 9i+7`

`color(white)()`
Square roots of complex numbers

Every non-zero complex number `z` can be uniquely represented in the form:

`z = r(cos theta + i sin theta)`

for some `r > 0` and `-pi < theta <= pi`

Then the principal square root is:

`sqrt(z) = sqrt(r)(cos (theta/2) + i sin (theta/2))`

This is consistent with the definitions of square roots of real numbers described above.