Question

How do you combine `\sqrt { 27} + 3\sqrt { 12} - 9\sqrt { 8}`?

Answer 1

`9(sqrt(3)-2sqrt(2))`

Explanation:

With roots, the best way to approach the simplification is to look for factors that are squares. Let's look at `sqrt(27)`

`sqrt(27)=sqrt(9*3)`

9 has a square root, so we can pull its root out from under the radical.

`sqrt(27)=sqrt(9*3)=3sqrt(3)`

So now let's simplify the other roots the same way:

`3sqrt(3)+3sqrt(4*3)-9sqrt(4*2)`

`3sqrt(3)+(3*2)sqrt(3)-(9*2)sqrt(2)`

`3sqrt(3)+6sqrt(3)-18sqrt(2)`

We can combine the two `sqrt(3)` terms.

`9sqrt(3)-18sqrt(2)`

Last, if you want, you can pull the common factor of 9 out:

`9(sqrt(3)-2sqrt(2))`