%I A096964
%S A096964 3,3,0,375,3993,0,15265344,1343091375,0,210736858987743,
%T A096964 141498026224804329,0,987345386156157037417593,
%U A096964 4875797582053878382039400448,0,1562716604740038367719196682456673375
%V A096964 -3,-3,0,-375,-3993,0,-15265344,-1343091375,0,-210736858987743,-141498026224804329,
               0,
%W A096964 -987345386156157037417593,-4875797582053878382039400448,0,
%X A096964 -1562716604740038367719196682456673375
%N A096964 Wendt's determinant of n.
%C A096964 a(n) = 0 for multiples of 3.
%C A096964 See also A048954 for a different definition.
%H A096964 D. Ford and V. Jha, <a href="http://www.expmath.org/expmath/volumes/2/
               2.html">On Wendt's determinant and Sophie Germain's Theorem</a>
%o A096964 (PARI) a(n)=polresultant(x^n-1,(-1-x)^n-1,x)
%Y A096964 Sequence in context: A111843 A119537 A031438 this_sequence A123254 A119969 
               A051343
%Y A096964 Adjacent sequences: A096961 A096962 A096963 this_sequence A096965 A096966 
               A096967
%K A096964 sign
%O A096964 1,1
%A A096964 Ralf Stephan, Aug 01 2004