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I need to solve the following problem:

Suppose $f$ has the intermediate value property, i.e. if $f(a), then there exists a value $d$ between $a$ and $b$ for which $f(d)=c$, and also has the additional property that $f^{-1}(a)$ is closed for every $a$ in a dense subset of $\mathbb{R}$, then $f$ is continuous.

I can see plenty of counterexamples when the second property is not added, but I can't seem to bridge the gap between adding the property and proving $f$ is continuous. I can't get there either directly or by contradiction, because the additional property doesn't seem directly relevant to the property of continuity, so could anyone please tell me how to go about doing this? Thanks!

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    I am confused by "for every $A$ in a dense subset of $\mathbb{R}$". Do you mean every dense subset $A \subset \mathbb{R}$?2011-01-07
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    When I first saw this I remembered the following: preimages of closed sets are closed for continuity. Perhaps you could used this fact to prove your statement.2011-01-07
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    @Brandon: Oops; sorry, *I* messed that up.2011-01-07
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    This is a slightly more general version of Chapter 4 # 19 in Rudin's POA2011-08-08
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    Related question: http://math.stackexchange.com/q/83786/2012-06-30

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