The nonzero difference between the Pascal {1,8,1} level triangle sequence and the {1,8,1} Catalan generalized triangle: t0(n,m)=Binomial[n, m]*Product[k!*(n + k)!/((m + k)!*(n - m + k)!), {k, 1, 7}]. A(n,k)=(3*n - 3*k + 1)A(n - 1, k - 1) + (3*k - 2)A(n - 1, k); t(n,m)=A(n,m)-t0(n,m). The first three levels and the external columns are zero and extracted.

A142469

The nonzero difference between the Pascal {1,8,1} level triangle sequence and the {1,8,1} Catalan generalized triangle: t0(n,m)=Binomial[n, m]*Product[k!*(n + k)!/((m + k)!*(n - m + k)!), {k, 1, 7}]. A(n,k)=(3*n - 3*k + 1)A(n - 1, k - 1) + (3*k - 2)A(n - 1, k); t(n,m)=A(n,m)-t0(n,m). The first three levels and the external columns are zero and extracted.

Terms

    a(0) =3a(1) =3a(2) =46a(3) =6a(4) =46a(5) =347a(6) =532a(7) =532a(8) =347a(9) =1932a(10) =14505a(11) =740a(12) =14505a(13) =1932a(14) =9199a(15) =203925a(16) =152405a(17) =152405a(18) =203925a(19) =9199a(20) =40250a(21) =2087884a(22) =6882086a(23) =-86372a(24) =6882086a(25) =2087884a(26) =40250a(27) =168318a(28) =17968725a(29) =152844537

External references