0,4

E.g.f. = Sum{n=1,2..}(n-1)!*x^n/n! = Sum{n=1,2..}x^n/n The shift law of the E.g.f.: if Sum{n=0,1,2..}a(n)*x^n/n! = f(x), then Sum{n=0,1,2..}a(n+1)*x^n/n! = d/dx f(x) and Sum{n=1,2..}a(n-1)*x^n/n! = integral f(x). E.g.f. of A000142 (= n!) is 1/(1-x), so E.g.f. of a(n)=(n-1)! is integral 1/(1-x) = -ln(1-x).

E.g.f. = -ln(1-x) = x + x^2/2 + x^3/3 + ...+ x^n/n + ...

Cf. A000142.

Adjacent sequences: A104147 A104148 A104149 this_sequence A104151 A104152 A104153

Sequence in context: A072133 A072167 A000142 this_sequence A124355 A133942 A074166

easy,nonn

Miklos Kristof (kristmikl(AT)freemail.hu), Mar 08 2005