-696
domain: Z
Appears in sequences
- Spontaneous magnetization coefficients for square lattice spin 3 Ising model.at n=60A010104
- Spontaneous magnetization coefficients for square lattice spin 5/2 Ising model.at n=50A010106
- Spontaneous magnetization coefficients for square lattice spin 5/2 Ising model.at n=50A030121
- Expansion of (1-x^2)/(1-3x+x^2+3x^3+x^4).at n=9A101498
- Difference between n and the sum of the factorials of its digits.at n=25A108911
- McKay-Thompson series of class 40d for the Monster group.at n=63A112182
- Expansion of q*psi(q^9)/psi(q) in powers of q.at n=29A124243
- Expansion of (1/3) * (c(q^2)^2 / c(q)) / (b(q^2)^2 / b(q)) in powers of q where b(), c() are cubic AGM theta functions.at n=9A128640
- Imaginary part of g.f. C(x) that satisfies: C(x) = 1 + x*C(I*x)^2.at n=9A193378
- G.f.: x^((k^2+k)/2)/(mul(1-x^i,i=1..k)*mul(1+x^r,r=1..oo)) with k = 3.at n=73A246582
- First differences of number of active (ON, black) cells in n-th stage of growth of two-dimensional cellular automaton defined by "Rule 358", based on the 5-celled von Neumann neighborhood.at n=33A271413
- First differences of number of active (ON, black) cells in n-th stage of growth of two-dimensional cellular automaton defined by "Rule 513", based on the 5-celled von Neumann neighborhood.at n=38A272704
- First differences of number of active (ON, black) cells in n-th stage of growth of two-dimensional cellular automaton defined by "Rule 742", based on the 5-celled von Neumann neighborhood.at n=39A273485
- Expansion of (1-q)^k/Product_{j=1..k} (1-q^j) for k=12.at n=9A275643
- Expansion of phi(x)^2 * chi(x^2)^4 * f(-x)^2 in powers of x where phi(), chi(), f() are Ramanujan theta functions.at n=51A280339
- Expansion of Product_{k>=1} 1/(1+x^(2*k-1))^(2*k-1).at n=15A284628
- E.g.f. A(x) satisfies: A'(x) = 1 + A(1 - exp(x)).at n=8A335986
- Expansion of e.g.f. (1 + 2*x) * exp(x) / (sec(x) + tan(x)).at n=8A337444
- G.f. satisfies A(x) = 1 + x * (1 - x)^2 * A(x * (1 - x)).at n=9A360992
- Dirichlet inverse of A341529, where A341529(n) = sigma(n) * A003961(n), and A003961 is fully multiplicative with a(prime(i)) = prime(i+1).at n=22A378229