Triangle of coefficients in the numerators of rational functions in tanh(1) that express the (2n)th du Bois-Reymond constants as C_0 = 0, C_2 = -4 - 1/(1-tanh(1)), for n>1, C_2n = -3 - (Sum_{k=0..n} a(n,k)*tanh(1)^k) / (2^n*n! * (1-tanh(1))^n).

A104053

Triangle of coefficients in the numerators of rational functions in tanh(1) that express the (2n)th du Bois-Reymond constants as C_0 = 0, C_2 = -4 - 1/(1-tanh(1)), for n>1, C_2n = -3 - (Sum_{k=0..n} a(n,k)*tanh(1)^k) / (2^n*n! * (1-tanh(1))^n).

Terms

    a(0) =0a(1) =1a(2) =0a(3) =1a(4) =-1a(5) =-1a(6) =-1a(7) =0a(8) =0a(9) =3a(10) =1a(11) =-5a(12) =18a(13) =-13a(14) =-7a(15) =-11a(16) =70a(17) =-135a(18) =65a(19) =-10a(20) =45a(21) =111a(22) =-609a(23) =1215a(24) =-1350a(25) =1275a(26) =-621a(27) =-141a(28) =-1009a(29) =6188

External references