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Prove: For all integers n, if n2 is odd, then n is odd. Use a proof by contraposition, as in Lemma 1.1.

Prove: For all integers n, if n2 is odd, then n is odd. Use a proof by contraposition, as in Lemma 1.1.
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Prove: For all integers n, if n2 is odd, then n is odd. Use a proof by contraposition, as in Lemma 1.1.

User Viktor Stojanov
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1 Answer

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The contrapositive of above is "If n is not odd then n^2 is not odd" or "If n is even then n^2 is even".

So, let assume that n is even

n=2k, k\in \mathbb{Z}\\\\
then

n^2=(2k)^2=4k^2
which is even q.e.d.




User EmKay
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7.7k points
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