62476
domain: N
Appears in sequences
- Triangle with T(n,k) = k*E(n,k) where E(n,k) are Eulerian numbers A008292.at n=31A065826
- a(n) = 49n^2 - 28n - 20.at n=35A118058
- Coefficients of the derivatives of the Eulerian polynomials (with indexing as in A173018).at n=24A142706
- a(n) = Hermite(n,8).at n=4A158531
- The 4th Hermite Polynomial evaluated at n: H_4(n) = 16n^4 - 48n^2 + 12.at n=8A163323
- a(n) is the least number such that k = n*a(n) has sum of digits n and ends with the digit string n, or 0 if no such number exists.at n=47A175690
- 8-step Fibonacci sequence starting with 0,0,0,0,1,0,0,0.at n=24A251741
- Number of vertices in a "frame" of size n X n (see Comments in A331776 for definition).at n=17A332598
- T(n, k) = A343277(n)*[x^k] p(n, x) where p(n, x) = (1/(n+1))*Sum_{k=0..n} (-1)^k*E1(n, k)*x^(n - k) / binomial(n, k), and E1(n, k) are the Eulerian numbers A123125. Triangle read by rows, for 0 <= k <= n.at n=40A342321
- a(n) = H(n, 2*n), where H(n,x) is n-th Hermite polynomial.at n=4A349068
- Triangle read by rows. The Hadamard product of A173018 and A349203.at n=40A363154