32799
domain: N
Appears in sequences
- Expansion of (2-2*x-x^2)/((1-2*x^2)*(1-x)^2).at n=30A016724
- Number of isomorphism classes of simple quadrangulations of the sphere having n vertices and n-2 faces, minimal degree 3, with orientation-reversing isomorphisms forbidden.at n=13A113203
- Number of irreducible polynomials (counted with multiplicity) dividing A036284(n), when it is considered as a GF(2)[X]-polynomial.at n=15A136379
- 8^n+2^n-1^n.at n=5A155592
- a(n) = 62*n^2 + 1.at n=23A158676
- a(n) = 2^n + 2*n + 1.at n=15A176691
- Minimal number (in decimal representation) with n nonprime substrings in base-8 representation (substrings with leading zeros are considered to be nonprime).at n=17A217108
- a(n) = (2n-2)^3 + (2n-2) - 1.at n=16A255877
- Sum over all partitions of n of the number of distinct parts i of multiplicity i - 1.at n=44A277101
- Expansion of 1/((1-x)^2*(1-2*x+2*x^2)).at n=28A279230
- a(n) = A343046(n, n).at n=45A343047
- a(n) = n * Sum_{d|n} sigma(d)^3 / d.at n=30A344043
- Expansion of Sum_{k>0} k * x^k / (1 - 2*x^(2*k)).at n=30A364035
- Numbers k such that A163511(k) is an eleventh power.at n=6A366391
- Numbers k such that A372692(k) = A372692(k+1) > 1.at n=6A372693
- a(n) is the graph corresponding to A076184(n), encoded as in A382754.at n=34A382756