32659200
domain: N
Appears in sequences
- Denominators of coefficients of polynomials arising from Chebyshev quadrature.at n=11A002680
- The number of permutations of n cards in which 2 is the first card hit and 3 the next hit after 2.at n=10A018931
- Number of aperiodic necklaces with n labeled beads of 3 colors.at n=7A032322
- Least k such that n! + k^2 is a square.at n=20A038202
- Expansion of e.g.f. (1-x)/(1-x-x^3).at n=10A052557
- a(n) = n! * (n-1).at n=9A062119
- Triangle T(n,k) (n >= 2, 1 <= k <= n) read by rows: number of linearly inducible orderings of n points in k-dimensional Euclidean space.at n=53A071223
- 10's complement factorial of n: a(n) = (10's complement of n)*(10's complement of n-1)*...*(10's complement of 2)*(10's complement of 1).at n=10A110396
- Number of permutations of 1..n with no adjacent pair summing to n + 9.at n=11A173849
- Number of permutations of 1..n with no adjacent pair summing to n+10.at n=11A173850
- Number of permutations of 1..n with all adjacent differences <= 9 in absolute value.at n=11A177281
- Square array A(row,col) read by antidiagonals: A(1,col) = A256450(col-1), and for row > 1, A(row,col) = A255411(A(row-1,col)); Dispersion of factorial base shift A255411 (array transposed).at n=53A257503
- Square array A(row,col): A(row,1) = A256450(row-1), and for col > 1, A(row,col) = A255411(A(row,col-1)); Dispersion of factorial base shift A255411.at n=46A257505
- Number of permutations p of [n] avoiding consecutive odd sums i+p(i), (i+1)+p(i+1) for all i in [n-1].at n=12A285672
- a(0) = 0; for n>0, a(n) = 9*n!.at n=10A295473
- Number of ways to fill a 3D matrix with n distinct values.at n=10A306656
- Irregular triangle read by rows: row n gives numerators of coefficients of polynomials arising from Chebyshev quadrature.at n=36A324123
- Expansion of e.g.f. exp( (x * (1+x))^3 ).at n=10A361571
- Denominator of the greatest probability that a particular fixed polyomino with n cells appears in the version of the Eden growth model described in A367671.at n=6A367678
- Numbers whose divisors have a mean abundancy index that is larger than 3.at n=17A374779