%I A038200
%S A038200 1,0,1,3,8,21,54,134,318,720,1560,3259,6641,13391,27107,55657,116244,245823,
%T A038200 521738,1101566,2299215,4730990,9601095,19273729,38446742,76598275,153119606,
%U A038200 308061214,624460449,1274268038,2611866713,5362888620,11003127203,22516189988
%V A038200 1,0,-1,3,-8,21,-54,134,-318,720,-1560,3259,-6641,13391,-27107,55657,-116244,
               245823,
%W A038200 -521738,1101566,-2299215,4730990,-9601095,19273729,-38446742,76598275,
               -153119606,
%X A038200 308061214,-624460449,1274268038,-2611866713,5362888620,-11003127203,22516189988
%N A038200 Row sums of triangle K(m, n), inverse to triangle T(m,n) in A020921.
%C A038200 The triangle K is A126713.
%D A038200 Temba Shonhiwa, A Generalization of the Euler and Jordan Totient Functions, 
               Fib. Quart., 37 (1999), 67-76.
%H A038200 N. J. A. Sloane, <a href="transforms.txt">Transforms</a>
%F A038200 Inverse binomial transform of tau(n) = A000005(n): Sum_{k=0..n} (-1)^(n-k)*binomial(n, 
               k)*A000005(k). - Vladeta Jovovic (vladeta(AT)eunet.rs), Oct 29 2002
%Y A038200 Cf. A126713, A020921.
%Y A038200 Sequence in context: A039671 A166287 A027930 this_sequence A030015 A103446 
               A094723
%Y A038200 Adjacent sequences: A038197 A038198 A038199 this_sequence A038201 A038202 
               A038203
%K A038200 sign
%O A038200 1,4
%A A038200 Temba Shonhiwa (Temba(AT)maths.uz.ac.zw)
%E A038200 Better description from Michael Somos