Russia | A Nice Algebra Problem | Math Olympiad

I HAVE A easier way to solve this
To solve the equation x+√(x²+√x³)+1=1, we can start by simplifying the square root terms.
Let's first simplify √x³:
√x³ = x^(3/2)
Now, let's substitute this back into the equation:
x + √(x² + x^(3/2)) + 1 = 1
Next, we can simplify the square root inside the parentheses:
√(x² + x^(3/2)) = √(x^2 + x^(3/2))
We can rewrite x^2 as x^(4/2) to simplify the square root:
√(x^2 + x^(3/2)) = √(x^(4/2) + x^(3/2))
Now, we have a common base x in the terms inside the square root, so we can combine them:
√(x^(4/2) + x^(3/2)) = √(x^(4/2)*(1 + x^(1/2)))
√(x^(4/2)*(1 + x^(1/2))) = √(x^2*(1 + x^(1/2)))
Now, substituting this back into the equation, we get:
x + √(x^2*(1 + x^(1/2))) + 1 = 1
This simplification shows that the original equation is not solvable as presented, as the expression x^2*(1 + x^(1/2)) within the square root cannot lead to a solution with x.

√( x² + √(x³ + 1) ) = 1 - x
x² + √(x³ + 1) = x² - 2x + 1
√(x³ + 1) = 1 - 2x
x³ + 1 = 4x² - 4x + 1
x³ - 4x² + 4x = 0
x( x² - 4x + 4 ) = 0
*x = 0*
x² - 4x + 4 = 0
x = 4/2 => x = 2 (not valid)

If 2 is not an answer, why does it appear?? Would be any mistake?!?!