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I had the impression that there might be proofs of the irrationality of $\sqrt{2}$ that showed that $ \left|\frac a b - \sqrt{2} \right| \ge (\text{something possibly depending on $a$ or $b$}) >0 $ where $a,b\in\mathbb{Z}$. But the one I saw in Wikipedia's article on the square root of $2$ spoke of whether the multiplicity of $2$ as a factor of $a$ or $b$ is even or odd, and that makes it seem not all that different from the old-fashioned proof that we all learned in childhood (you know, in 500 BC when we were children). Is there a short and simple proof of that kind to which this last criticism will not apply?

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Hint: $|\sqrt2 - \frac{a}{b}| > \frac{1}{3b^2}$ for all rational $a/b$

Opp, sorry, I do not think there is a proof of irrationality of $\sqrt2$ that uses the inequality. I saw 5,6 proofs of the irrationality of $\sqrt2$ on the first day of my class but most proofs are in the article that Nbubis posted, and this inequality above on the next day, is to study how well rational, irrational and transcendental numbers are approximated.

PS: One cute proof for the rationality of $\sqrt{2}$ is to use the fundamental theorem of arithmetic, ie: every integer can be factored into product of prime numbers. For a square, every prime will appear an even number of times. $a^2 = 2 b^2$ The prime $2$ appears even times for the right and odd times for left sides, contradiction.

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    The uniqueness of prime factorizations seems like a far stronger result than what is needed. Here one needs only its application to the number $2,$ which can be proved very simply without proving uniqueness in general. It really only amounts to the fact that a product of odd numbers is odd.2017-02-13
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You might like the geometric proof posted here: http://blog.plover.com/math/sqrt-2-new.html

I think it can be converted into the form you presented.

Edit: 20 proofs of the irrationality of $\sqrt{2}$ can be found here, but none with the exact form you mentioned.

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    I saw that one, and presented it in classrooms, before Tom Apostol published it. I learned it from a book by Otto Toeplitz, published maybe around 1960 or so.2012-04-28
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You can use that if $a^2=2b^2$ then $(2b-a)^2=2(a-b)^2$ to show that if $\frac ab $ is a square root of 2 then so is $\frac {2b-a}{a-b}$. So there is not a fraction with smallest denominator.

Also if $\frac ab$ is an approximation to $\sqrt 2$, then $\frac {a+2b}{a+b}$ is in general a better one, which may be what you are remembering.

If $2-\frac{a^2}{b^2}=\epsilon$ then

$\frac{(a+2b)^2}{(a+b)^2}-2 = \frac{2b^2-a^2}{(a+b)^2}=\epsilon \left(\frac b{a+b}\right)^2$