362881
domain: N
Appears in sequences
- Numerator of (1 + Gamma(n))/n.at n=9A005450
- a(n) = n! + 1.at n=9A038507
- Numbers formed from binomial coefficients (mod 2) interpreted as digits in factorial base.at n=8A051256
- Sum of factorials of the digits of n.at n=19A061602
- Integers of the form m! + n!, m and n = positive integers.at n=36A066847
- Number of digits in n^{(n-1)!}.at n=9A067084
- Least squarefree number > n!.at n=8A092983
- Triangle, read by rows, T(n, k) = T(n, k-1) + (k+1)*n!, T(n, 0) = 1.at n=39A105064
- a(n) = smallest composite which is > n! and is coprime to n!.at n=9A118069
- Triangle read by rows: (A000012 * A136572 + A136572 * A000012) - A000012.at n=47A136573
- a(n) = (n!+10)/10.at n=5A139157
- Triangle T(n,k) = binomial(n, k)*(k! + (n-k)!), read by rows.at n=45A155162
- Triangle T(n,k) = binomial(n, k)*(k! + (n-k)!), read by rows.at n=54A155162
- Triangle T(n, k) = A143491(n+2, k+2) + A143491(n+2, n-k+2), read by rows.at n=36A155755
- Triangle T(n, k) = A143491(n+2, k+2) + A143491(n+2, n-k+2), read by rows.at n=44A155755
- T(n,m) = Sum_{j=0..m} (-1)^(j + m)*(j + 1)^n*binomial(m, j) + Sum_{j=0..(n-m)} (-1)^(j - m + n )*(1 + j)^n*binomial(n-m, j).at n=45A156820
- Triangle T(n, k) = n!*Sum_{j=k..n} (-1)^(j+k)*binomial(k+j, j)/j!, read by rows.at n=46A156984
- Expansion of e.g.f. exp(x)+log(1/(1-x)).at n=10A185387
- Composite squarefree numbers k such that p+1 divides k-1 for any prime p dividing k.at n=23A225711
- a(n) = Sum_{k = 0..n} Product_{j = 0..8} C(n+j*k,k).at n=1A229676