$$ x = \sqrt { x + \sqrt { x + \sqrt { x + \sqrt { x + \sqrt { x + \sqrt { x \ldots \ldots } } } } } } $$

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We start by letting
$$
y = \sqrt{x+\sqrt{x+\sqrt{x+\sqrt{x+\cdots}}}}
$$
Because the nested radical continues indefinitely, the expression inside the square root is the same as $$y$$. Hence, we have
$$
y = \sqrt{x+y}.
$$
The given equation is
$$
x = y.
$$
Substitute $$y=x$$ into the equation:
$$
x = \sqrt{x+x} = \sqrt{2x}.
$$
Square both sides to eliminate the square root:
$$
x^2 = 2x.
$$
Subtract $$2x$$ from both sides:
$$
x^2 - 2x = 0.
$$
Factor the expression:
$$
x(x-2)=0.
$$
This gives two solutions:
$$
x=0 \quad \text{or} \quad x=2.
$$

Finally, we check both solutions in the original equation.

For $$x=0$$:
$$
\sqrt{0+\sqrt{0+\sqrt{0+\cdots}}} = \sqrt{0} = 0,
$$
so $$x=0$$ is a valid solution.

For $$x=2$$, substitute back into the recursive equation for $$y$$:
$$
y = \sqrt{2+y}.
$$
This can be rearranged to:
$$
y^2 - y - 2 = 0.
$$
Using the quadratic formula,
$$
y = \frac{1\pm \sqrt{1+8}}{2} = \frac{1\pm 3}{2}.
$$
Since $$y$$ must be non-negative, we take
$$
y = \frac{1+3}{2} = 2.
$$
Then the equation $$x=y$$ gives $$x=2$$, so this solution is valid as well.

Thus, the solutions are
$$
x=0 \quad \text{and} \quad x=2.
$$
The solutions are $$ x = 0 $$ and $$ x = 2 $$.

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