reserve n for Nat,
        lambda,lambda2,mu,mu2 for Real,
        x1,x2 for Element of REAL n,
        An,Bn,Cn for Point of TOP-REAL n,
        a for Real;
 reserve Pn,PAn,PBn for Element of REAL n,
         Ln for Element of line_of_REAL n;
reserve A,B,C for Point of TOP-REAL 2;
reserve x,y,z,y1,y2 for Element of REAL 2;
reserve L,L1,L2,L3,L4 for Element of line_of_REAL 2;
reserve D,E,F for Point of TOP-REAL 2;
reserve b,c,d,r,s for Real;

theorem Th13:
  REAL 2 is Element of plane_of_REAL 2
  proof
    reconsider OO=|[0,0]|,Ox=|[1,0]|,Oy=|[0,1]| as Element of REAL 2
            by EUCLID:22;
    REAL 2 = plane(OO,Ox,Oy) by Th12;
    then REAL 2 in {P where P is Subset of REAL 2 :
    ex x1,x2,x3 being Element of REAL 2 st P = plane(x1,x2,x3)};
    hence thesis by EUCLIDLP:def 11;
  end;
