reserve a, b, r, M2 for Real;
reserve Rseq,Rseq1,Rseq2 for Real_Sequence;
reserve k, n, m, m1, m2 for Nat;
reserve X for RealUnitarySpace;
reserve g for Point of X;
reserve seq, seq1, seq2 for sequence of X;

theorem Th10:
  for X being RealHilbertSpace, seq being sequence of X
   holds seq is summable iff for r st r > 0 ex k
st for n, m st n >= k & m >= k holds ||.(Partial_Sums(seq)).n - (Partial_Sums(
  seq)).m.|| < r
by BHSP_3:2,BHSP_3:def 4;
