82365
domain: N
Appears in sequences
- a(n) = (n+1)*binomial(n+4, 4).at n=16A027800
- a(n) = n^3+n for odd n, (n^3+n)*3/2 for even n: Row sums of A093915.at n=37A093917
- Number of walks of length n between two nodes at distance 3 in the cycle graph C_9.at n=17A095368
- n*(1+3*n+6*n^2)/2.at n=30A115519
- Coordination sequence for 8-dimensional cyclotomic lattice Z[zeta_15].at n=7A126898
- Numbers n such that n^4 is a sum of 4th powers of four nonzero integers whose sum is n.at n=15A138760
- a(n) = (8*n+5)*(8*n+9).at n=35A146302