Question

How do you solve `sqrt(2x-2) - sqrtx + 3 = 4`?

Answer 1

`x=9`

Explanation:

First thing, determine the dominion:

`2x-2>0 and x>=0`

`x>=1 and x>=0`

`x>=1`

The standard way is to put one root in each side of the equality and calculate the squares:

`sqrt(2x-2)-sqrt(x)+3=4`

`sqrt(2x-2)=1+sqrt(x)`,

squaring:

`(sqrt(2x-2))^2=(1+sqrt(x))^2`

`2x-2=1+2sqrt(x) +x`

Now, you have only one root. Isolate it and square it again:

`x-3=2sqrt(x)`,
We must remember that `2sqrt(x)>=0` then `x-3>=0` also.

This means the dominion has changed to `x>=3`

squaring:

`x^2-6x+9=4x`

`x^2-10x+9=0`

`x=(10+-sqrt(10^2-4*9))/2`

`x=(10+-sqrt(64))/2`

`x=(10+-8)/2`

`x=5+-4`

`x=9 or x=1`,

Only the solution `x=9` is valid.