871782912000
domain: N
Appears in sequences
- a(n) = n!/24.at n=12A001720
- Denominators of coefficients for central differences M_{4}^(2*n).at n=6A002676
- State assignments for n-state machine.at n=13A007041
- State assignments for n-state machine.at n=14A007041
- Denominator of expected length of longest increasing subsequence of a permutation of length n.at n=15A054677
- Triangle A(n,m) of numbers of n-element T_0-antichains on a labeled m-set, m=0,...,2^n.at n=34A059080
- Triangle A(n,m) of numbers of n-element T_0-antichains on a labeled m-set, m=0,...,2^n.at n=35A059080
- Triangle T(n,m) of number of labeled m-node T_0-hypergraphs with n hyperedges (empty hyperedges and multiple hyperedges included), m=0,1,...,2^n.at n=34A059584
- Triangle T(n,m) of number of labeled m-node T_0-hypergraphs with n hyperedges (empty hyperedges and multiple hyperedges included), m=0,1,...,2^n.at n=35A059584
- Square array read by descending antidiagonals of number of ways of dividing n*k labeled items into k unlabeled orders with n items in each order.at n=24A066991
- a(n)=2*n!/d(n!); d(m)=A000005(m) is the number of divisors of m.at n=18A125721
- a(n) = (n^2)!/n!.at n=4A127223
- a(n) = (4*n)!/n!.at n=4A166338
- a(n) is the period k such that binomial(m, n) (mod 10) = binomial(m + k, n) (mod 10).at n=14A174183
- a(n) = (2^n)! / n!.at n=4A262032
- Number of 7-ary heaps on n elements.at n=17A273694
- a(n) = (n - 4)*n! for n>=0.at n=14A282822
- Triangle read by rows: coefficients in the sum of odd powers as expressed by Faulhaber's theorem, T(n, k) for n >= 1, 1 <= k <= n.at n=29A303675
- Denominator of 24*Stirling_2(n,4)/n!.at n=12A324004
- Numbers k such that A008480(k) > k.at n=3A340155