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A2

Part of 2011 Putnam

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Putnam 2011 A2

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12/5/2011
Let a1,a2,a_1,a_2,\dots and b1,b2,b_1,b_2,\dots be sequences of positive real numbers such that a1=b1=1a_1=b_1=1 and bn=bn1an2b_n=b_{n-1}a_n-2 for n=2,3,.n=2,3,\dots. Assume that the sequence (bj)(b_j) is bounded. Prove that S=n=11a1anS=\sum_{n=1}^{\infty}\frac1{a_1\cdots a_n} converges, and evaluate S.S.
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