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Which of the following statements are true?

a. If $A$ is a dense subset of a topological space $X$, then $X \setminus A$ is nowhere dense in $X$.

b. If $A$ is a nowhere dense subset of a topological space $X$, then $X \setminus A$ is dense in $X$.

c. The set $\Bbb R$, identified with the x-axis in $\Bbb R^2$, is nowhere dense in $\Bbb R^2$.

I have tried to find out examples but could not succeed. Please Help.

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    If $A$ is a subspace of toplolgical space $X$, then what do you think $X \cap A$ is? It is A ifself, hence if A is dense in $X$ then $X \cap A$ is also dense in $X$ and if $A$ is nowhere dense then $X\cap A$ is also nowhere dense in $X$. You are only left with option C. First study some basics, then ask questions.2012-09-16
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    that was not X∩A ,it was X-A(X difference A). i think you have mistaken somewhere.so edit the question properly2012-09-16
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    poton, you wrote XnA, how is anbody supposed to figure out it is not $X \cap A$, and it is $A^c$. Post the questions correctly. And learn some latex, it's not that difficult. So edit your questions yourself, now.2012-09-16

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HINTS:

(a) Think about $\Bbb Q$.

(b) This is true; if you understand the definitions of dense and nowhere dense, the proof is trivial.

(c) This also is true, and if you understand the definition of nowhere dense, the proof is trivial.

These are pretty small hints, because this problem really is extremely easy; if you’re really having trouble with it, you should probably talk to your instructor.

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    Regarding a: is it not true in general that if a set $A$ is dense in $X$ then $A^c$ is also dense in $X$?2012-09-19
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    @Matt: Absolutely not! What if $A=X$?2012-09-19
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    Oops. Do you also have a counter example if the subset is proper? (I have an excuse: I'm allowed to say non-sense since I got food poisoning 2 days ago and I'm still sick)2012-09-19
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    Sure: $X=\Bbb R$, $A=\Bbb R\setminus\{0\}$. Or $A=\Bbb R\setminus\Bbb Z$.2012-09-19