0,2

Fourth row of number array A082137. C(n,3) has e.g.f. (x^3/3!)exp(x). The transform averages the binomial and inverse binomial transforms.

a(n)=(2^(n-1)+0^n/2)C(n+3, n)=sum{j=0..n, C(n+3, j+3)C(j+3, 3)(1+(-1)^j)/2 } G.f.: (1-4x+12x^2-16x^3+8x^4)/(1-2x)^4 E.g.f. (x^3/3!)exp(x)cosh(x) (preceded by 3 zeros).

ceil(binomial(n+3,3)*2^(n-1)). - Zerinvary Lajos (zerinvarylajos(AT)yahoo.com), Nov 01 2006

a(0)=(2^(-1)+0^0/2)C(3,0)=2*(1/2)=1 (use 0^0=1)

[seq (ceil(binomial(n+3, 3)*2^(n-1)), n=0..26)]; - Zerinvary Lajos (zerinvarylajos(AT)yahoo.com), Nov 01 2006

Cf. A080929, A082139.

Cf. A082140, A082141, A082139, A080951, A080929, A057711.

Adjacent sequences: A082135 A082136 A082137 this_sequence A082139 A082140 A082141

Sequence in context: A054611 A121257 A125669 this_sequence A074358 A055296 A140532

easy,nonn

Paul Barry (pbarry(AT)wit.ie), Apr 06 2003