275562
domain: N
Appears in sequences
- McKay-Thompson series of class 11A for the Monster group with a(0) = -5.at n=18A003295
- Place n distinguishable balls in n boxes (in n^n ways); let f(n,k) = number of ways that max in any box is k, for 1 <= k <= n; sequence gives f(n,n-2)/n.at n=25A019579
- a(n) = n*(n - 1)^3/2.at n=28A019582
- McKay-Thompson series of class 11A for the Monster Group.at n=18A058205
- Number of meaningful differential operations of the n-th order on the space R^8.at n=19A090993
- McKay-Thompson series of class 11A for the Monster Group with a(0) = 6.at n=18A128525
- McKay-Thompson series of class 11A for the Monster group with a(0) = 2.at n=18A134784
- a(n) = n^9*(n^3 + 1)/2.at n=3A170785
- Sixth partial sums of sixth powers (A001014).at n=5A254472
- a(n) = 4*36^n*Gamma(n+3/2)/(sqrt(Pi)*(n+2)!).at n=4A260655
- a(n) = Product_{k=0..n} (2^k + 5^(n-k)).at n=3A369677
- Numbers k such that k, A001414(k) and A083345(k) are all multiples of 3, where A001414 is fully additive with a(p) = p, and A083345 is the numerator of the fully additive function with a(p) = 1/p.at n=2A373476