37296
domain: N
Appears in sequences
- sigma_3(n): sum of cubes of divisors of n.at n=32A001158
- Expansion of 8-dimensional cusp form.at n=33A002408
- Fourier coefficients of E_{infinity,4}.at n=33A007331
- a(n) = Sum_{ d >= 1, d divides n} (-1)^(n-d)*d^3.at n=32A008457
- a(n) is the concatenation of n and 8n.at n=36A009470
- Theta series of A*_8 lattice.at n=55A023920
- a(n) = (n-1)*(2*n-1)*(3*n-1).at n=19A033594
- Sum of cubes of unitary divisors of n.at n=32A034677
- Numbers n such that n and n+1 are differences between 2 positive cubes in at least one way.at n=24A038594
- a(n) = sigma_3(2*n+1).at n=16A045823
- Sum of cubes of odd divisors of n.at n=32A051000
- Dirichlet inverse of sigma_3 function (A001158).at n=32A053825
- a(n) = n^3*Product_{distinct primes p dividing n} (1+1/p^3).at n=32A065959
- Numbers n such that phi(sigma(n)) = 5*phi(n).at n=9A067708
- Triangle T(n,k) read by rows, where e.g.f. for T(n,k) is exp(x*y)*log(1+x)/(1-x).at n=39A073480
- a(n) = Sum_{d divides n} (-1)^(n/d+1)*d^3.at n=32A078307
- a(0)=1, a(n) = sigma_3(3n).at n=11A092341
- a(n) = Sum_{d|n} (-1)^(d-1)*d^3.at n=32A138503
- Numbers divisible by at least five of their digits, different and >1.at n=3A187533
- Expansion of (theta_2(q)^8 + 4 * theta_2(q^2)^8) / 256 in powers of q^2.at n=32A204386