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(MON 3) Let A_k (1 \le k \le h) be n-element sets such that each two of them have a nonempty intersection. Let A be the union of all the sets A_k, and let B be a subset of A such that for each k (1\le k \le h) the intersection of A_k and B consists of exactly two different elements a_k and b_k. Find all subsets X of the set A with r elements satisfying the condition that for at least one index k, both elements a_k and b_k belong to X.

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#NaslovOznakeRj.KvalitetaTežina
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