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#1 2010-04-18 17:54:17
- cxc001
- Member
- Registered: 2010-04-09
- Posts: 17
Cardinalities of Sets: Prove |(0, 1)| = |(0, 2)| and |(0, 1)| = |(a, b
How to prove the open intervals (0,1) and (0,2) have the same cardinalities? |(0, 1)| = |(0, 2)|
Let a, b be real numbers, where a<b. Prove that |(0, 1)| = |(a, b)|
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|(0,1)| = |R| = c by Theorem
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I know that we need to construct a function f: (0,1)->(0,2) and prove f is bijection so that |(0, 1)| = |(0, 2)|
same process of proving |(0, 1)| = |(a, b)|
but how to construct a function f: (0,1)->(0,2)
and how to construct a function g: (0,1)->(a,b) where a<b and a,b are real numbers?
I know how to construct a function f: (0,1)->R
by define a function f(x)=(1-2x)/[x(x-1)] where x cannot be 0 and 1 and when the middle domain(f)=1/2, f(1/2)=0
How can I expand this knowledge and to define a function that the domain(f) is within (0,1) and the range(f) falls into (0,2) or any close interval (a,b)?
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#2 2010-04-18 19:53:20
- JaneFairfax
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- Registered: 2007-02-23
- Posts: 6,868
Re: Cardinalities of Sets: Prove |(0, 1)| = |(0, 2)| and |(0, 1)| = |(a, b
is a bijection.
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#3 2010-04-19 07:23:36
- cxc001
- Member
- Registered: 2010-04-09
- Posts: 17
Re: Cardinalities of Sets: Prove |(0, 1)| = |(0, 2)| and |(0, 1)| = |(a, b
Thanks!
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