reserve A for QC-alphabet;
reserve sq for FinSequence,
  x,y,z for bound_QC-variable of A,
  p,q,p1,p2,q1 for Element of QC-WFF(A);

theorem Th15:
  for x1,x2,y1,y2 being bound_QC-variable of A st All(x1,y1,p1) = All(
  x2,y2,p2) holds x1 = x2 & y1 = y2 & p1 = p2
proof
  let x1,x2,y1,y2 be bound_QC-variable of A such that
A1: All(x1,y1,p1) = All(x2,y2,p2);
  thus x1 = x2 by A1,Th5;
  All(y1,p1) = All(y2,p2) by A1,Th5;
  hence thesis by Th5;
end;
