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Countable and Countably Infinite Sets

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Corollary: N-{0} is countable. Corollary: N-{0} is countably infinite. 2. Theorem: Let A be the set of all even integers =2, and let B be the set of all positive ... – PowerPoint PPT presentation

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Title: Countable and Countably Infinite Sets


1
Countable and Countably Infinite Sets
  • Theorem N-0 N
  • Proof
  • Define a function f from N-0 to N as f(i)
    i-1.
  • f is a function
  • f is one-to-one
  • f is onto
  • f is therefore a bijection and, by definition of
    cardinality, N-0 N.
  • Corollary N-0 is countable.
  • Corollary N-0 is countably infinite.

2
  • Theorem
  • Let A be the set of all even integers gt2, and
    let B be the set of all positive integers (i.e.,
    gt1). Then A B.
  • Proof
  • Let f(i) i/2. Then it can be easily verified
    that f is a bijection from A to B.
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