1,1

p divides a(p-1) and a(p-2) for prime p=5,11,17,23,29,41,47,53,59,71..=A007528[n] Primes of form 6n-1. p divides a([(2p-1)/2]) for prime p=5,11,17,23,29,41,47,53,59,71..=A007528[n] Primes of form 6n-1. p divides a((p-5)/2) for prime p=17,29,41,53,89,101.. =A040115[n] Primes of form 12n+5. Primes congruent to 5 (mod 12) excluding 5. p divides a((p-5)/3) for prime p=11,17,23,29,41,47,53,59,71..=A007528[n] Primes of form 6n-1 excluding 5 p divides a([(p-3)/3]) for prime p=11,17,23,29,41,47,53,59,71..=A007528[n] Primes of form 6n-1 excluding 5.

a(n) = Sum[Sum[(i+j)!/i!/j!,{i,1,j}],{j,1,n}]. a(n) = A079309(n+1) - (n+1). a(n) = A066796(n+1)/2 - (n+1).

Table[Sum[Sum[(i+j)!/i!/j!, {i, 1, j}], {j, 1, n}], {n, 1, 50}]

Cf. A007528, A007528, A040115, A048775, A079309, A079309, A066796.

Sequence in context: A110679 A127109 A054208 this_sequence A037751 A037639 A000176

Adjacent sequences: A120276 A120277 A120278 this_sequence A120280 A120281 A120282

nonn

Alexander Adamchuk (alex(AT)kolmogorov.com), Jul 05 2006