Let s(D) = Sum_{(a,b,c)} j((-b+sqrt(D))/(2*a)) where (a,b,c) is taken over all the primitive reduced binary quadratic forms a*x^2+b*xy+c*y^2 with b^2-4*ac = D. This sequence is s(D) as D runs through the numbers -3, -4, -7, -8, -11, -12, ... .

A305494

Let s(D) = Sum_{(a,b,c)} j((-b+sqrt(D))/(2*a)) where (a,b,c) is taken over all the primitive reduced binary quadratic forms a*x^2+b*xy+c*y^2 with b^2-4*ac = D. This sequence is s(D) as D runs through the numbers -3, -4, -7, -8, -11, -12, ... .

Terms

    a(0) =0a(1) =1728a(2) =-3375a(3) =8000a(4) =-32768a(5) =54000a(6) =-191025a(7) =287496a(8) =-884736a(9) =1264000a(10) =-3491750a(11) =4834944a(12) =-12288000a(13) =16581375a(14) =-39491307a(15) =52250000a(16) =-117964800a(17) =153542016a(18) =-331531596a(19) =425692800a(20) =-884736000a(21) =1122662608a(22) =-2257834125a(23) =2835810000a(24) =-5541101568a(25) =6896880000a(26) =-13136684625

External references