Let u(1) = x and u(n+1) = (n^2/u(n)) + 1 for n >= 1; then a(n) is such that u(n) =(b(n)*x + a(n))/(c(n)*x + d(n)) (in lowest terms) and a(n), b(n), c(n), d(n) are positive integers.

A075828

Let u(1) = x and u(n+1) = (n^2/u(n)) + 1 for n >= 1; then a(n) is such that u(n) =(b(n)*x + a(n))/(c(n)*x + d(n)) (in lowest terms) and a(n), b(n), c(n), d(n) are positive integers.

Terms

    a(0) =0a(1) =1a(2) =1a(3) =10a(4) =13a(5) =138a(6) =101a(7) =1228a(8) =1923a(9) =8930a(10) =7303a(11) =115356a(12) =97249a(13) =1721846a(14) =1484475a(15) =388760a(16) =681971a(17) =14725926a(18) =13093585a(19) =308430212a(20) =1386466053a(21) =1685280806a(22) =1529091919a(23) =42052434936a(24) =38450390845a(25) =226713176794a(26) =208661769963

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