reserve G for Group;
reserve A,B for non empty Subset of G;
reserve N,H,H1,H2 for Subgroup of G;
reserve x,a,b for Element of G;
reserve N1,N2 for Subgroup of G;

theorem Th49:
  for x being Element of G st x in N ` H holds x * N c= carr(H)
proof
  let x be Element of G;
  assume x in N ` H;
  then ex x1 being Element of G st x1 = x & x1 * N c= carr(H);
  hence thesis;
end;
