178200
domain: N
Appears in sequences
- Denominators of coefficients in the series for inverf(2x/sqrt(Pi)).at n=5A092677
- Coefficients of square root of theta series of D_4 (see A004011).at n=5A108096
- For each nonnegative integer n, a(n) is the smallest positive integer j whose primal code characteristic is n, that is, the smallest j such that A108352(j) = n.at n=5A108353
- Integers that can be expressed as a product of triangular numbers in 3 different ways.at n=8A110904
- Triangle T(n, k) = ( (k+2)/(2*binomial(k+2, 2)^2) )*binomial(n, k)^2*binomial(n+1, k)*binomial(n+2, k), read by rows.at n=47A142470
- Triangle T(n, k) = ( (k+2)/(2*binomial(k+2, 2)^2) )*binomial(n, k)^2*binomial(n+1, k)*binomial(n+2, k), read by rows.at n=52A142470
- Sum of n consecutive cubes starting from n^3.at n=15A240137
- Triangle used for the integral of even powers of the sine and cosine functions.at n=16A254933
- Number T(n,k) of redundant binary trees with n inner nodes of exactly k different dimensions used for the partition of the k-dimensional hypercube by hierarchical bisection; triangle T(n,k), n>=3, 2<=k<=n-1, read by rows.at n=14A258427
- a(n) = ((n + 1)/2)*(n + 2)*Pochhammer(n, 5) / 4!.at n=8A293476
- Total volume of all cubes with side length q such that n = p + q and p <= q.at n=29A303383
- Numbers with exactly four distinct exponents in their prime factorization, or four distinct parts in their prime signature.at n=8A323025
- a(1) = 27846; thereafter a(n+1) = a(n) # n, where # is an operation that cycles through division, addition, subtraction and multiplication.at n=8A327962
- Number of ways to write n as an ordered sum of ten powers of 2.at n=37A342254
- Coefficient triangle of generalized Laguerre polynomials n!*L(n,n,x) (rising powers of x).at n=23A343861