Question

Solve 2x-x1/2-1=0 using the cuadratic formula?

Answer 1

`x=1`. See explanation.

Explanation:

Given `2x-x^(1/2)-1=0`, let `u = x^(1/2)` and the equation becomes:

`2u^2 -u - 1 =0`

Using the quadratic formula on this we have:

`u=(-(-1) pm sqrt((-1)^2-4(2)(-1)))/(2(2))`

`u=(1 pm sqrt(1+8))/(4)`

`u=(1 pm 3)/(4)`

So, `u = 1` or `u=-1/2`, where `u=x^(1/2)`, which means:

`x^(1/2)=1 rarr x =1`

`x^(1/2) ne -1/2` (think of the range of `x^(1/2)`)

So the only solution is `x=1`.