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Search: id:A134834
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| A134834 |
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Let {b_n(m)} be a sequence defined by b_n(0)=1, b_n(m) = the largest prime dividing (b_n(m-1) +n). Then a(n) is the smallest positive integer such that b_n(m+a(n)) = b_n(m), for all integers m that are greater than some positive integer M. |
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