%I A096929
%S A096929 101134,101180,101642,108305,204205,216425,220145,220725,231014,271855,
%T A096929 283055,291705,300180,301205,302125,303555,330776,405555,442055,442395,
%U A096929 464255,492055,604425,621136,691865,702145,711486,723205,733585,784985
%N A096929 Numbers n for which there are exactly eight k such that n = k + (product 
               of nonzero digits of k).
%e A096929 88846, 97354, 98254, 99514, 100954, 101078, 101086 and 101131 are the 
               only eight k such that k + (product of nonzero digits of k) = 101134, 
               hence 101134 is a term.
%o A096929 (PARI) {c=8;z=800000;v=vector(z);for(n=1,z+1,k=addpnd(n);if(k<=z,v[k]=v[k]+1));
               for(j=1,length(v),if(v[j]==c,print1(j,",")))} \\for function addpnd 
               see A096922
%Y A096929 Cf. A063114, A096347, A096922 - A096928, A096930, A096931.
%Y A096929 Sequence in context: A068445 A115828 A161796 this_sequence A023077 A077760 
               A153050
%Y A096929 Adjacent sequences: A096926 A096927 A096928 this_sequence A096930 A096931 
               A096932
%K A096929 nonn,base
%O A096929 1,1
%A A096929 Klaus Brockhaus (klaus-brockhaus(AT)t-online.de), Jul 15 2004