%I A128434
%S A128434 1,1,1,1,2,1,1,9,9,1,1,64,8,64,1,1,625,625,625,625,1,1,7776,243,16,243,
%T A128434 7776,1,1,117649,117649,117649,117649,117649,117649,1,1,2097152,16384,
%U A128434 2097152,128,2097152,16384,2097152,1,1,43046721,43046721,6561,43046721
%N A128434 Triangle read by rows, 0<=k<=n: T(n,k) = denominator of the maximum of 
               the k-th Bernstein polynomial of degree n; numerator is A128433.
%C A128434 For n>0: Sum(A128433(n,k)/T(n,k): 0<=k<=n) = A090878(n)/A036505(n-1);
%C A128434 T(n,n-k) = T(n,k); T(n,0) = 1;
%C A128434 for n>0: A128433(n,1)/T(n,1) = A000312(n-1)/A000169(n).
%H A128434 Eric Weisstein's World of Mathematics, <a href="http://mathworld.wolfram.com/
               BernsteinPolynomial.html">Bernstein Polynomial</a>
%F A128434 A128433(n,k)/T(n,k) = binomial(n,k) * k^k * (n-k)^(n-k) / n^n.
%Y A128434 Sequence in context: A019803 A141601 A108558 this_sequence A119731 A155718 
               A054768
%Y A128434 Adjacent sequences: A128431 A128432 A128433 this_sequence A128435 A128436 
               A128437
%K A128434 nonn,tabl,frac
%O A128434 0,5
%A A128434 Reinhard Zumkeller (reinhard.zumkeller(AT)gmail.com), Mar 03 2007