Prove using a proof by contradiction: There is no smallest positive real number
Let us assume the contradiction: There is a smallest positive real number.
How do I continue?
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You continue by constructing a smaller positive real number from it. – Daniel Fischer Oct 05 '14 at 21:44
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Can you please elaborate? I'm new to proofs and I've got a midterm tomorrow – user178415 Oct 05 '14 at 21:45
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Given $x > 0$, you probably can think of hundreds of ways to obtain an $y$ with $0 < y < x$ from $x$ within minutes, can't you? – Daniel Fischer Oct 05 '14 at 21:47
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So can I just say: Assume there exists a smallest positive real number,x and x/2 is also real but its smaller. Therefore its a contradiction – user178415 Oct 05 '14 at 21:48
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Just here to point out that "contraction" isn't the word to use here. Should say "Let us assume the contradiction" although I recommend "we proceed toward contradiction" or "For the sake of contradiction, suppose..." – graydad Oct 05 '14 at 21:51
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Almost. You also need to say that $x/2$ is positive too. – Daniel Fischer Oct 05 '14 at 21:53
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Let's suppose there is a smallest positive number, say $s$. So what is $\frac{s}{2}?$
graydad
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