reserve p,p1,p2,q,r,F,G,G1,G2,H,H1,H2 for ZF-formula,
  x,x1,x2,y,y1,y2,z,z1,z2,s,t for Variable,
  a,X for set;

theorem
  Free All(x,y,z,p) = Free p \ {x,y,z}
proof
  thus Free All(x,y,z,p) = Free All(y,z,p) \ {x} by Th62
    .= (Free p \ {y,z}) \ {x} by Th67
    .= Free p \ ({x} \/ {y,z}) by XBOOLE_1:41
    .= Free p \ {x,y,z} by ENUMSET1:2;
end;
