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Let S be a dense set in the reals. Prove that every real number is the limit of a sequence in S. I know I am supposed to consider S intersected with $(x-$ $1 \over n$, $x)$ for $n\in \mathbb N$, for a given $x \in \mathbb R$.

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    So for $x \in \mathbb{R}$ and each $n$ there's a point $x_n$ in $S$ satisfying x - \frac{1}{n} < x_n < x. Then $\lim_{n \to \infty} x_n$ = ?2012-12-09

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Take any sequence $s_n \in S$ with $s_n \in (x-\frac{1}{n},x)$ for each n. What does $s_n$ tend to?

S being dense means that there is always some element of $S$ in any interval, so certainly there's an element of $S$ in $(x-\frac{1}{n},x)$ so we know that we can make such a sequence.

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    Great, glad to help!2012-12-09