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#1 2007-05-21 18:56:17
- Stanley_Marsh
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Interval
Prove that every closed set in R^1 is the intersection of a countable collection of open sets.
I know that
but I don't exactly know how to do it.
Last edited by Stanley_Marsh (2007-05-21 18:56:52)
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#2 2007-05-21 19:25:04
- Stanley_Marsh
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Re: Interval
Maybe
Can I use induction , assuming S can be the intersection of n open sets , then consider n+1 ?
Oh , I think I have a better idea , since every open sets can be a intersection of a collection of countable open set. right?
Last edited by Stanley_Marsh (2007-05-21 19:41:01)
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#3 2007-05-21 22:39:55
- JaneFairfax
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Re: Interval
A finite intersection of open sets will only result in an open set. (This is part of the definition of a topological space.) In
the only sets that both open and closed are Ø and (as is a connected space). So if your closed S is not Ø or it must be the intersection of an infinite collection of open sets.I cant see how induction is going to help here. 
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#4 2007-05-22 00:01:10
- JaneFairfax
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Re: Interval
Well, Im as much stumped by the question as you so here is the outline of a proof I found by Googling. 
Last edited by JaneFairfax (2007-05-22 00:05:06)
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#5 2007-05-22 01:41:44
- George,Y
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Re: Interval
First, [a2,a1] is included in or a subset of the two.
Second, any number out of [a1,a2] is doom to fail to fall into both two of the original intervals.
Done.
Last edited by George,Y (2007-05-22 01:43:44)
X'(y-Xβ)=0
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#6 2007-05-22 02:31:13
- Ricky
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Re: Interval
Stan, one thing you must stop doing is thinking about everything in intervals. Intervals are not the only closed sets in R. In fact, they are extremely boring. Instead, always go to the definitions.
"In the real world, this would be a problem. But in mathematics, we can just define a place where this problem doesn't exist. So we'll go ahead and do that now..."
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#7 2007-05-22 04:46:33
- Stanley_Marsh
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Re: Interval
Thanks , I am studying the proof , I used to do maths like Geometry , Calculus . I havent really gotten used to Abstract maths.
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#8 2007-05-22 11:49:33
- George,Y
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Re: Interval
A logic book may help you.
X'(y-Xβ)=0
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#9 2007-05-22 11:50:34
- George,Y
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Re: Interval
Intervals are not that humble, Ricky. Probability theory depends on them.
X'(y-Xβ)=0
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#10 2007-05-22 13:12:42
- Ricky
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Re: Interval
Probably so. But we are talking about analysis here George. When it comes to analysis, intervals are boring.
"In the real world, this would be a problem. But in mathematics, we can just define a place where this problem doesn't exist. So we'll go ahead and do that now..."
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#11 2007-05-22 14:38:38
- Stanley_Marsh
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Re: Interval
Logic book? there is this kinda stuff? thanks
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