-384

Appears in sequences

• Specific heat coefficients for square lattice spin 2 Ising model.at n=8A010112
• Expansion of eta(q^2)^12 / theta_3(q)^3 in powers of q.at n=31A029769
• McKay-Thompson series of class 16B for the Monster group.at n=39A029839
• Generalized Stirling number triangle of first kind.at n=6A051142
• a(n) = n!*Sum_{k=1..n} mu(k)/k, where mu(k) is the Möbius function.at n=7A068337
• Alternating sum sigma(1)-sigma(2)+sigma(3)-sigma(4)+...+((-1)^(n+1))*sigma(n).at n=46A068762
• a(n) = A023194 - A062700(n). Negative values of A071166(m) = m-A006530(A000203(m)) differences. In these cases m is square number from A023194.at n=23A071167
• Triangle read by rows. T(n, m) are the coefficients of Sidi polynomials.at n=22A075513
• A076341(A000290(n)), imaginary part of squares mapped as defined in A076340, A076341.at n=43A076350
• Expansion of 1/(1+2*x^2-2*x^3).at n=20A077964
• Expansion of 1/(1+2*x^2+2*x^3).at n=20A077968
• Coefficients of the polynomials in the numerator of the generating function f(x)=(x-x^2)/(x^3-2x^2-2x+1) for F(n)^2, (where F(n) is the Fibonacci sequence) and its successive derivatives starting with the constant.at n=18A079045
• Coefficients of the polynomials in the numerator of the generating function f(x)=(x-x^2)/(x^3-2x^2-2x+1) for F(n)^2, (where F(n) is the Fibonacci sequence) and its successive derivatives starting with the highest power of x.at n=20A079046
• Expansion of g.f. 1/(1 - 2*x + 8*x^2).at n=7A090591
• Expansion of eta(q)^8 / eta(q^2)^4 in powers of q.at n=35A096727
• Expansion of eta(q)^8 / eta(q^2)^4 in powers of q.at n=33A096727
• Expansion of eta(q)^8 / eta(q^2)^4 in powers of q.at n=47A096727
• Coefficient list of ChebyshevU(n, 1-x).at n=26A100551
• E.g.f.: 2*x*(1-log(1+2*x))/(2-log(1+2*x)).at n=6A109589
• Expansion of (1-x^2)/(1+2x).at n=9A110164