-396

Appears in sequences

• Triangle of coefficients of Euler polynomials E_2n(x) (exponents in increasing order).at n=43A004172
• Triangle of coefficients of Euler polynomials E_2n(x) (exponents in decreasing order).at n=41A004173
• McKay-Thompson series of class 15b for Monster.at n=44A058513
• Triangle of coefficients of Euler polynomials rescaled to integers by multiplication with 2^(binary carry sequence (A007814)).at n=85A058940
• Triangle giving numerators of coefficients of Euler polynomials, highest powers first.at n=83A059341
• Coefficients of even-indexed Euler polynomials (falling powers without zeros).at n=24A060082
• Coefficients of even-indexed Euler polynomials (rising powers without zeros).at n=24A060083
• Numerator of coefficients of Euler polynomials (rising powers).at n=85A060096
• McKay-Thompson series of class 18D for the Monster group.at n=70A062242
• McKay-Thompson series of class 36B for the Monster group.at n=70A062244
• Sum_{k=1..2*n-1} J(n,k)*k where J(i,j) is the Jacobi symbol.at n=57A097540
• Sum_{k=1..2*n-1} J(4*n,k)*k, where J(i,j) is the Jacobi symbol.at n=57A097542
• a(n) = coefficient of x in (1+x)^n mod (1+x^4).at n=11A099587
• Coefficient of x^2 in (1+x)^n mod 1+x^4.at n=11A099588
• Odd triangle !n. This table read by rows gives the coefficients of sum formulas of n-th Left factorials (A003422). The k-th row (6>=k>=1) contains T(i,k) for i=1 to k+1, where k=[2*n+3+(-1)^n]/4 and T(i,k) satisfies !n = Sum_{i=1..k+1} T(i,k) * n^(i-1) / (2*k-2)!.at n=6A102412
• Coefficients of the A-Rogers-Selberg identity.at n=45A104408
• Coefficients of the A-Bailey Mod 9 identity.at n=65A104467
• McKay-Thompson series of class 16f for the Monster group.at n=37A112153
• McKay-Thompson series of class 16h for the Monster group.at n=37A112155
• G.f.: 1/(1 - x^3 - 2 x^4 + x^5).at n=45A122517