reserve x,y,X,Y for set;
reserve C for non empty set;
reserve c for Element of C;
reserve f,f1,f2,f3,g,g1 for PartFunc of C,COMPLEX;
reserve r1,r2,p1 for Real;
reserve r,q,cr1,cr2 for Complex;

theorem Th61:
  f^ is total iff f"{0} = {} & f is total
proof
  thus f^ is total implies f"{0} = {} & f is total
  proof
    assume f^ is total;
    then
A1: dom (f^) = C;
    f"{0c} c= C;
    then f"{0c} c= dom f \ f"{0c} by A1,Def2;
    hence f"{0} = {} by XBOOLE_1:38;
    then C = dom f \ {} by A1,Def2;
    hence dom f = C;
  end;
  assume
A2: f"{0} = {} & f is total;
  thus dom (f^) = dom f \ f"{0c} by Def2
    .= C by A2;
end;
