SOLUTION: proove that square root of 2 is irrational!

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Question 154495: proove that square root of 2 is irrational!
Answer by AnlytcPhil(1808) About Me  (Show Source):
You can put this solution on YOUR website!
prove that sqrt%282%29 is irrational!

Lemma:  If a perfect square is even, its square root is
        also even.

        For contradiction, assume that n%5E2 is even
        and n is odd:
        Then there exist positive integers k and m
        such that
        n%5E2=2k and n=2m%2B1
        Substitute n from the second equation into the first.
        %282m%2B1%29%5E2=2k
        4m%5E2%2B4m%2B1=2k
        1=2k-4m%5E2-4m
        1=2%28k-2m%5E2-2m%29
        This says 1 is an even number, so we have a contradiction.
        QED

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        For contradiction assume

        sqrt%282%29=p%2Fq where p%2Fq is reduced to lowest terms.

        %28sqrt%282%29%29%5E2=p%5E2%2Fq%5E2 

        2=p%5E2%2Fq%5E2

        2q%5E2=p%5E2

        The left side is even and the right side is a
        perfect square, so by the lemma, p is even.

        Therefore p is twice some integer, r, so let's
        substitute 2r for p

        2q%5E2=%282r%29%5E2
        2q%5E2=4r%5E2
        q%5E2=2r%5E2

        The right side is even and the left side is a
        perfect square, so by the lemma, q is even.
        
        This is a contradiction because we assumed
        p%2Fq was in lowest terms, so p and q can't
        both be even.  

        QED

Edwin