IMO 1983 SL 24

Let dn be the last nonzero digit of the decimal representation

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IMO 1983 SL 24

Origin: USS

Problem

Let dn be the last nonzero digit of the decimal representation of n!. Prove that dn is aperiodic; that is, there do not exist T and n0 such that for all n \geqn0, dn+T = dn.

Solution

See the solution of (SL91-15).