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Fibonacci Lore (Posted on 2005-06-10)

The Fibonacci sequence goes F(0)=0, F(1)=1, and for n>1, F(n)=F(n-1)+F(n-2).

Show that for every positive integer m there exists an integer n>0 such that m divides F(n).

See The Solution Submitted by McWorter

Rating: 4.0000 (3 votes)

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Modulo solution

| Comment 10 of 15 |

This proof to another Fibonacci puzzle also solves the current puzzle. Substitute m for 10⁶ and m² > m for 10¹². Then stop at a₀ = a_n.

Posted by Nick Hobson on 2005-06-12 22:39:38

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