%I A054375
%S A054375 0,1,0,0,4,0,1,16,64,0,0,16,0,4096,0,1,0,4096,65536,1048576,0,0,64,0,
%T A054375 262144,0,1073741824,0,1,256,16384,16777216,268435456,68719476736,
%U A054375 4398046511104,0,0,256,0,16777216,0,4398046511104,0,72057594037927936
%V A054375 0,-1,0,0,-4,0,1,16,64,0,0,-16,0,4096,0,-1,0,-4096,65536,-1048576,0,0,
               -64,0,
%W A054375 262144,0,-1073741824,0,1,256,16384,16777216,268435456,68719476736,
%X A054375 4398046511104,0,0,-256,0,16777216,0,-4398046511104,0,72057594037927936
%N A054375 Table of resultants for Chebyshev polynomials T_k(x) and T_n(x).
%H A054375 T. D. Noe, <a href="b054375.txt">Rows n=1..35 of triangle, flattened</
               a>
%H A054375 Eric Weisstein's World of Mathematics, <a href="http://mathworld.wolfram.com/
               ChebyshevPolynomialoftheFirstKind.html">Link to a section of The 
               World of Mathematics.</a>
%e A054375 {0}, {-1, 0}, {0, -4, 0}, {1, 16, 64, 0}, {0, -16, 0, 4096, 0}, ...
%t A054375 Flatten[Table[Resultant[ChebyshevT[n, x], ChebyshevT[k, x], x], {k, 20}, 
               {n, k}]]
%Y A054375 Sequence in context: A121301 A059056 A127153 this_sequence A136452 A067565 
               A010635
%Y A054375 Adjacent sequences: A054372 A054373 A054374 this_sequence A054376 A054377 
               A054378
%K A054375 sign,easy,nice,tabl
%O A054375 1,5
%A A054375 Eric Weisstein (eric(AT)weisstein.com)