MathDB

8

Part of 1996 Romania Team Selection Test

Problems(1)

very beautiful problem

Source: Romanian IMO Team Selection Test TST 1996, problem 8

9/6/2005
Let p1,p2,,pk p_1,p_2,\ldots,p_k be the distinct prime divisors of n n and let an=1p1+1p2++1pk a_n=\frac {1}{p_1}+\frac {1}{p_2}+\cdots+\frac {1}{p_k} for n2 n\geq 2 . Show that for every positive integer N2 N\geq 2 the following inequality holds: k=2Na2a3ak<1 \sum_{k=2}^{N} a_2a_3 \cdots a_k <1 Laurentiu Panaitopol
inequalitiesnumber theory unsolvednumber theory