114912
domain: N
Appears in sequences
- Theta series of lattice D3 tensor D3* (dimension 9, det. 262144, min. norm 6).at n=40A033694
- Order of n-th stable homotopy group of spheres.at n=34A048648
- Sum of divisors of those numbers n such that n and n+1 have the same sum of divisors.at n=19A053215
- Integers i such that 41*i = 105 X i.at n=36A115876
- Numbers with prime factorization pqr^3s^5.at n=12A190475
- Numbers n with property that n and 2n are sums of two distinct positive cubes.at n=24A191345
- Triangle T(n,m) = coefficient of x^n in expansion of [x*(x+1)^(x+1)]^m = sum(n>=m, T(n,m) x^n*m!/n!).at n=37A202190
- Number of partitions p of n such that (number of even numbers in p) <= 2*(number of odd numbers in p).at n=47A241642
- Consider numbers n = concat(w,x,y,z) such that w*x*y*z | n. Leading zeros in x, y and z allowed. Sequence lists numbers that admit at least two such concatenations.at n=20A257172
- Numbers n such that antisigma(n) divides Fibonacci(n).at n=7A286125
- Values of bsigma(k) = bsigma(k+1), where bsigma is the sum of the bi-unitary divisors (A188999).at n=35A294029
- Triangular array read by rows: T(n,k) is the number of endofunctions f:{1,2,...,n}-> {1,2,...,n} whose smallest connected component has exactly k nodes; n >= 0, 0 <= k <= n.at n=30A347999
- a(n) is 2^(2*n) times the derivative of order 2*n of the logarithm of I_0(x) (the modified Bessel function of the first kind of order zero) evaluated at zero.at n=5A352284
- a(n) is -2^(2n) times the derivative of order 2n of the logarithm of J_0(x) (the Bessel function of the first kind of order zero) evaluated at zero.at n=5A352313