Why Does a^2 + b^2 Have No Solution?

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Why people say that a^2 + b^2 has no solution?
 

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##a^2+b^2## is not an equation, “solution” is a meaningless concept.

You can write the expression as product of two factors - so what? The easiest way to do so is writing it as ##1(a^2+b^2)##. That doesn’t make it easier.
 
Anatoly said:
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Why people say that a^2 + b^2 has no solution?
The equation ##a^2 + b^2 = 0## has no solution in the real numbers. If you relax this restriction, allowing complex numbers, then there are solutions.
Edit: ##a^2 + b^2 = 0## does have a solution: a = b = 0. However, the equation ##a^2 + b^2 = -1## has no real solution, as @mfb points out in a subsequent post.

The quadratic (i.e., 2nd degree) polynomial ##a^2 + b^2## cannot be factored into the product of two linear (i.e., first degree) polynomials with real coefficients. Your factorization, with terms involving ##\sqrt{2ab}## doesn't consist of linear polynomials. In fact, ##a \pm \sqrt{2ab} + b## isn't even a polynomial of any kind.

As already mentioned, equations and inequalities have solutions, but expressions don't.
 
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Mark44 said:
The equation ##a^2 + b^2 = 0## has no solution in the real numbers. If you relax this restriction, allowing complex numbers, then there are solutions.
##a=b=0## is a solution.
##a^2 + b^2 = -1## has no real solution.