36224
domain: N
Appears in sequences
- Coordination sequence for lattice D*_8 (with edges defined by l_1 norm = 1).at n=6A035473
- McKay-Thompson series of class 8D for the Monster group.at n=39A112143
- McKay-Thompson series of class 16b for the Monster group.at n=39A112151
- a(n) = n! - ceiling(n^(n/2)).at n=8A127426
- Numbers n such that (A000203(n)+28)/n is an integer.at n=16A162302
- The sum of the proper divisors of n, weighted by divisor multiplicity, equals n.at n=5A168654
- a(n) = n! - n^4.at n=8A196411
- Number of length n+5 0..4 arrays with no consecutive six elements summing to more than 3*4.at n=1A242140
- T(n,k)=Number of length n+5 0..k arrays with no consecutive six elements summing to more than 3*k.at n=11A242144
- Number of length 2+5 0..n arrays with no consecutive six elements summing to more than 3*n.at n=3A242146
- Numbers whose deficiency is a perfect number.at n=21A302125
- a(n) = 4*(n+1)*(9*n+4).at n=31A304505
- Expansion of g.f. A(x) satisfying 1 = Sum_{n=-oo..+oo} (-1)^n * x^n * (A(x) + x^(2*n-1))^(n+1).at n=12A363142
- Numbers m with deficiency 28: sigma(m) - 2*m = -28.at n=8A392382