%I A058940
%S A058940 1,1,2,0,1,1,1,0,6,4,0,1,0,2,1,1,0,5,0,5,2,0,3,0,5,0,3,1,17,0,84,0,70,
               0,
%T A058940 28,8,0,17,0,28,0,14,0,4,1,31,0,153,0,126,0,42,0,9,2,0,155,0,255,0,126,
               0,30,0,
%U A058940 5,1,691,0,3410,0,2805,0,924,0,165,0,22,4,0,2073,0,3410,0,1683,0,396,0,
               55,0,6
%V A058940 1,-1,2,0,-1,1,1,0,-6,4,0,1,0,-2,1,-1,0,5,0,-5,2,0,-3,0,5,0,-3,1,17,0,
               -84,0,70,0,
%W A058940 -28,8,0,17,0,-28,0,14,0,-4,1,-31,0,153,0,-126,0,42,0,-9,2,0,-155,0,255,
               0,-126,0,30,0,
%X A058940 -5,1,691,0,-3410,0,2805,0,-924,0,165,0,-22,4,0,2073,0,-3410,0,1683,0,
               -396,0,55,0,-6
%N A058940 Triangle of coefficients of Euler polynomials rescaled to integers by 
               multiplication with 2^(binary carry sequence = A007814).
%C A058940 Sums of even rows are A002425, sums of odd rows are 0, first element 
               of even rows is -row sum, first element of row[2^p]= second element 
               of row[1+2^p], LCM of numerators of Euler-polynomial coefficients 
               is A007814.
%F A058940 Table[CoefficientList[EulerE[n, x]2^A007814[n+1], x], {n, 0, 12}]
%Y A058940 Cf. A007814, A002425.
%Y A058940 Sequence in context: A131341 A074169 A099362 this_sequence A141684 A152492 
               A075446
%Y A058940 Adjacent sequences: A058937 A058938 A058939 this_sequence A058941 A058942 
               A058943
%K A058940 tabl,nice,sign
%O A058940 0,3
%A A058940 Wouter Meeussen (wouter.meeussen(AT)pandora.be), Jan 12 2001