Question

How do you simplify `-sqrt338-sqrt200+sqrt162`?

Answer 1

`-14sqrt{2}`

Explanation:

You could try using the Fundamental Theorem of Arithmetic to express all those integers as the product of their primes.

`338 = 2^1 times 13^2`
`200 = 2^3 times 5^2`
`162 = 2^1 times 3^4`

What this tells us is that they all have a common factor of 2
`gcd(338,200,162)=2`

Since the expression contains the square root of each that means the entire expression has a factor of `sqrt{2}`, so we can rewrite it as

`sqrt{2} (-sqrt{13^2}-sqrt{2^2 5^2}+sqrt{3^4} )`
As we can see these all contain even powers and can thus be simplified!

`sqrt{2} (-13-10+9 )`

`sqrt{2} (-14)`

`-14sqrt{2}`