%I A053136
%S A053136 1,36,330,1716,6435,19448,50388,116280,245157,480700,888030,1560780,
%T A053136 2629575,4272048,6724520,10295472,15380937,22481940,32224114,45379620,
%U A053136 62891499,85900584,115775100,154143080,202927725,264385836,341149446
%N A053136 Binomial coefficients C(2n+7,7).
%C A053136 Even indexed members of eighth column of Pascal's triangle A007318.
%C A053136 Number of standard tableaux of shape (2n+1,1^7) - Emeric Deutsch (deutsch(AT)duke.poly.edu), 
               May 30 2004
%H A053136 Milan Janjic, <a href="http://www.pmfbl.org/janjic/">Two Enumerative 
               Functions</a>
%F A053136 a(n)= binomial(2*n+7, 7)= A000580(2*n+7). G.f.(1+28*x+70*x^2+28*x^3+x^4)/
               (1-x)^8.
%Y A053136 Cf. A053135, A000580, A053129.
%Y A053136 Sequence in context: A014800 A067473 A068075 this_sequence A000821 A071232 
               A135828
%Y A053136 Adjacent sequences: A053133 A053134 A053135 this_sequence A053137 A053138 
               A053139
%K A053136 nonn,easy
%O A053136 0,2
%A A053136 Wolfdieter Lang (wolfdieter.lang(AT)physik.uni-karlsruhe.de)