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Countable and uncountable sets

Authors
  • avatar
    Name
    Vu Hung
    Twitter

Problem Statement

  • Explain why positive rationals are countable by diagonal listing.
  • Use Cantor's diagonal argument to show reals in [0,1)[0,1) are uncountable.

Hints

Construct a new decimal differing from the nnth listed decimal at position nn.


Solutions

Rationals can be arranged in an infinite grid pq\frac{p}{q} and traversed by diagonals, skipping duplicates after simplification; this yields a sequence listing all positive rationals. For reals in [0,1)[0,1), assume a list T1,T2,T_1,T_2,\dots exists. Build xx so its nnth digit differs from the nnth digit of TnT_n. Then xTnx\neq T_n for every nn, contradicting completeness of the list. Hence uncountable.


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