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IMO Shortlist 2002 problem N2

Let $n\geq2$ be a positive integer, with divisors $1=d_1<d_2<\,\ldots<d_k=n$ . Prove that $d_1d_2+d_2d_3+\,\ldots\,+d_{k-1}d_k$ is always less than $n^2$ , and determine when it is a divisor of $n^2$ .

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Lista Tekst Dva stupca

Zadaci

#	Naslov	Oznake	Rj.
1893	IMO Shortlist 1994 problem N2	1994 IMO shortlist tb	6
1953	IMO Shortlist 1996 problem N2	1996 IMO shortlist tb	3
2003	IMO Shortlist 1998 problem N1	1998 IMO shortlist tb	15
2032	IMO Shortlist 1999 problem N1	1999 IMO shortlist tb	13
2197	IMO Shortlist 2005 problem N1	2005 IMO niz shortlist tb	27
2227	IMO Shortlist 2006 problem N1	2006 IMO diofantska shortlist tb	33

Školjka

IMO Shortlist 2002 problem N2

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