1,2

Second binomial transform of 'pruned' Pascal triangle Binomial(i+1,j+1), (i,j>=0). Columns include A006234, A080420, A080421, A080422, A080423.

T(n, 1)=A006234(n), T(n, k)=0, k>n, T(n, n) = 1. T(n, k)=T(n-1, k-1)+3T(n-1, k) As a square array, it is generated by T1(n, k)= (n+3k)3^n Product{j=1..(k-1), n+j}/(3k(k-1)!) (k>=1, n>=0)

Rows are {1}, {4,1}, {15,7,1}, {54,36,10,1}, {189,162,66,13,1}, ... For example, 10 = 7+3*1, 66 = 36+3*10.

Sequence in context: A164794 A107873 A156290 this_sequence A095307 A159764 A124029

Adjacent sequences: A080416 A080417 A080418 this_sequence A080420 A080421 A080422

easy,nonn,tabl

Paul Barry (pbarry(AT)wit.ie), Feb 19 2003