anonymous
  • anonymous
Prove or disprove that a cardinal number exists between the cardinality of the reals and the cardinality of the natural numbers.
Mathematics
  • Stacey Warren - Expert brainly.com
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SOLVED
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chestercat
  • chestercat
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anonymous
  • anonymous
heres the answer : http://www.youtube.com/watch?v=wV1FrqwZyKw&feature=feedlik
anonymous
  • anonymous
haha
anonymous
  • anonymous
no?i thought it would help

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anonymous
  • anonymous
lol
anonymous
  • anonymous
Look at the proof for continuum hypothesis. It should help you out.
anonymous
  • anonymous
That problem is currently unsolvable
anonymous
  • anonymous
well, not unsolvable. But I don't think it has been solved yet
anonymous
  • anonymous
http://www.youtube.com/watch?v=wV1FrqwZyKw&feature=feedlik
anonymous
  • anonymous
So there isn't a proof that the continuum hypothesis is true, but still. You do realize that your question is really asking about the provability of the continuum hypothesis, right?
anonymous
  • anonymous
it's proving that there is a cardinality between that of the natural numbers and that of the continuum
anonymous
  • anonymous
which yes, is the continuum hypothesis
anonymous
  • anonymous
well, the hypothesis is that one does not exist
anonymous
  • anonymous
True, but why are you worrying about this? :D

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