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#1 2007-04-09 09:18:31
- Stanley_Marsh
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- Registered: 2006-12-13
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Set problem
Last edited by Stanley_Marsh (2007-04-09 09:18:56)
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#2 2007-04-09 09:28:16
- Stanley_Marsh
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Re: Set problem
The proof is like this :
Here is what I dont understand, When he defined
That h is positive , then q is already an interior point , why does he need to make it so complicated.Or I miss something?Last edited by Stanley_Marsh (2007-04-09 09:29:59)
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#3 2007-04-09 10:49:25
- Zhylliolom
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- Registered: 2005-09-05
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Re: Set problem
1. Just take an open ball in R² centered at some point x ∈ (a, b). No matter what the radius of the ball, it will always contain points not in (a, b). Therefore there exists no 2-ball contained entirely in (a, b), so (a, b) is not open in R². This is because the open ball in R² is (in a standard sense) a circle, while the open ball in R is just an open interval.
2. He needed to "make it more complicated" because he cannot just say that since h is positive, q is an interior point. Imagine h getting smaller and smaller so that q is closer and closer to being a boundary point, so that d(p, q) approaches r. He does the other steps to show that q is never a boundary point. How can you reason this? Well he shows that any point s in an open ball of radius h centered at q is contained in E. Since q is arbitrary, we see that for any point in E this holds. This is precisely the definition of openness; that at any point of the set E you can center an open ball B of some suitable radius such that the ball is entirely contained in the set; so B is a subset of E. The proof just shows that the suitable radius is this h.
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#4 2007-04-09 11:09:57
- Ricky
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- Registered: 2005-12-04
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Re: Set problem
1. Just take an open ball in R² centered at some point x ∈ (a, b). No matter what the radius of the ball, it will always contain points not in (a, b). Therefore there exists no 2-ball contained entirely in (a, b), so (a, b) is not open in R². This is because the open ball in R² is (in a standard sense) a circle, while the open ball in R is just an open interval.
Oddly enough, the phrase "open ball" only really makes sense in R³
But that reminds me of a joke. A mathematician and an engineer walk out of a conference, and the engineer remarks, "I find it so difficult picturing all this stuff in 11 dimensional space." to which the mathematician replies, "I just picture it in n-dimensional space, then set n equal to 11."
"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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#5 2007-04-09 13:43:31
- Zhylliolom
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Re: Set problem
I guess it's just another one of those "contradictory mathematical terminologies." Even if we revised it to be called a "open (n-1)-sphere" it isn't necessarily (n-1)-spherical region in a general n-dimensional metric space, as the metric can certainly give it a different shape. Oh well, the term has stuck with me.
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#6 2007-04-09 14:54:19
- Stanley_Marsh
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Re: Set problem
O, but that's very hard to come up with such prove.
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