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Consider the equation:

$$2\sqrt {2x}+\sqrt {2x+3}=\sqrt {3x+2}+\sqrt {6x+20}.$$

Find a trick ( if exists ) which allows to solve it elegantly i.e. with avoiding the systematic squaring.

(The systematic squaring inevitably leads to a fourth-degree equation:

$$ \begin{align} 0 &= 207x^4-12564x^3+27738x^2+231084x-40401\\[6pt] &=9\left( 23x^2-1258x-4489\right) \left( x^2-6x+1\right)\;, \end{align} $$ so the answer is $$x=\dfrac {629+\sqrt {498888}} {23}.$$

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    You announce an equation, but what you write is two different expressions for one side of the equation, the other side of which is presumably meant to be $0$?2012-07-22
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    OK, I have fixed it...2012-07-22
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    Why do you think there is a trick? Also, why just the one answer? $x^2 - 6x+1$ has two positive roots, $3 \pm \sqrt 8.$2012-07-22
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    @Will You can check with mathematica that there exist unique solution here2012-07-22
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    @Will: The squaring can introduce spurious solutions, since the squared equation is satisfied even if the unsquared one had the wrong signs. I get the same quartic when I do the squaring with Wolfram|Alpha.2012-07-22
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    Alpha http://www.wolframalpha.com/input/?i=solve+2sqrt%282x%29%2Bsqrt%282x%2B3%29-sqrt%283x%2B2%29-sqrt%286x%2B20%29%3D0 shows only the one real solution2012-07-22
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    You want an elegant way to get to $\sqrt{498888}$. I can't imagine such a thing exists.2012-07-22

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