196884
domain: N
Appears in sequences
- Coefficients of modular function j as power series in q = e^(2 Pi i t). Another name is the elliptic modular invariant J(tau).at n=2A000521
- McKay-Thompson series of class 1A for the Monster group with a(0) = 24.at n=2A007240
- Coefficients of the modular function J = j - 744.at n=2A014708
- Sum of the next n members of the list of twin primes.at n=25A038345
- Bisection of A000521.at n=1A099818
- Divisors of 196884.at n=23A199014
- Partial sums of dimensions of irreducible representations of Monster group M.at n=1A247242
- Coefficients in expansion of E_6^2/Product_{k>=1} (1-q^k)^24.at n=2A289063
- Expansion of 256/(lambda(z)*(1 - lambda(z)))^2 in powers of nome q = exp(Pi*i*z) where lambda(z) is the elliptic modular function (A115977).at n=4A290403
- Euler transform is q*(j - 744) where j is j-function (A000521).at n=1A302407
- Expansion of Sum_{k>0} x^(2*k)/(1 - k*x^k)^2.at n=32A363641