a(1) = 1, a(n) is the smallest integer > a(n-1) such that the largest element in the simple continued fraction for S(n) = 1/a(1) + 1/a(2) + ... + 1/a(n) equals n^4.
A070904
a(1) = 1, a(n) is the smallest integer > a(n-1) such that the largest element in the simple continued fraction for S(n) = 1/a(1) + 1/a(2) + ... + 1/a(n) equals n^4.
Terms
- a(0) =1a(1) =16a(2) =20976a(3) =50649a(4) =51933a(5) =86768a(6) =99857a(7) =442973a(8) =547720a(9) =1374279a(10) =6529369a(11) =15997726a(12) =16615151a(13) =18691278a(14) =30371349a(15) =43665242a(16) =75220431
External references
- oeis: A070904