Search: id:A074825
Results 1-1 of 1 results found.

%I A074825
%S A074825 5,4,2,2,10,16,4,46,142,250,262,4,652,1530,1818,38,5662,14760,22028,15014,
%T A074825 22490,95846,172434,154740,110500,733134,1556206,1875238,365334,4306496,
%U A074825 11734244,17112802,9496002,25050298,90586134,157886356,142006676,87803882
%V A074825 5,4,2,-2,-10,-16,-4,46,142,250,262,4,-652,-1530,-1818,38,5662,14760,22028,
               15014,
%W A074825 -22490,-95846,-172434,-154740,110500,733134,1556206,1875238,365334,-4306496,
%X A074825 -11734244,-17112802,-9496002,25050298,90586134,157886356,142006676,-87803882
%N A074825 Binomial transform of reflected pentanacci numbers A074062: a(n)=Sum(Binomial(n,
               k)*A074062(k),(k=0,..,n)).
%H A074825 N. J. A. Sloane, <a href="transforms.txt">Transforms</a>
%F A074825 a(n)=4a(n-1)-7a(n-2)+6a(n-3)-3a(n-4)+2a(n-5), a(0)=5, a(1)=4, a(2)=2, 
               a(3)=-2, a(4)=-10. G.f.: (5-16x+21x^2-12x^3+3x^4)/(1-4x+7x^2-6x^3+3x^4-2x^5).
%t A074825 CoefficientList[Series[(5-16x+21x^2-12x^3+3x^4)/(1-4x+7x^2-6x^3+3x^4-2x^5), 
               {x, 0, 40}], x]
%Y A074825 Cf. A074062.
%Y A074825 Sequence in context: A102593 A090462 A081749 this_sequence A094778 A097960 
               A019712
%Y A074825 Adjacent sequences: A074822 A074823 A074824 this_sequence A074826 A074827 
               A074828
%K A074825 easy,sign
%O A074825 0,1
%A A074825 Mario Catalani (mario.catalani(AT)unito.it), Sep 09 2002

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