34664
domain: N
Appears in sequences
- McKay-Thompson series of class 4C for the Monster group.at n=9A007248
- exp(arctanh(x)*sinh(x)) = 1+2/2!*x^2+24/4!*x^4+670/6!*x^6+34664/8!*x^8...at n=4A012750
- Expansion of 16/lambda(z) in powers of nome q = exp(Pi*i*z).at n=18A029845
- Expansion of Fricke's 32*tau_4(z) in powers of q = exp(2*Pi*i*z).at n=18A124972
- Binomial transform of A171372.at n=13A171373
- Numbers m such that the GCD of the x's that satisfy sigma(x) = m is 4.at n=38A241649
- Numbers n such that 13^n is the highest power of 13 dividing A240751(n).at n=16A286007
- a(n) is the number of solutions to x^y == y^x (mod p) where 0 < x,y <= p^2 - p and p is the n-th prime.at n=9A355069