theorem
  (for n holds rseq1.n = n-root (|.seq.|.n)) & rseq1 is convergent & lim
  rseq1 > 1 implies seq is not absolutely_summable
proof
  assume
A1: ( for n holds rseq1.n = n-root (|.seq.|.n))& rseq1 is convergent &
  lim rseq1 > 1;
  for n holds |.seq.|.n >=0 by Lm3;
  hence |.seq.| is not summable by A1,SERIES_1:30;
end;
