let o, p1, p2, p3, q1, q2, q3, r1, r2, r3 be Element of (ProjectiveSpace (TOP-REAL 3)); :: thesis: ( o <> p2 & o <> p3 & p2 <> p3 & p1 <> p2 & p1 <> p3 & o <> q2 & o <> q3 & q2 <> q3 & q1 <> q2 & q1 <> q3 & not o,p1,q1 are_collinear & o,p1,p2 are_collinear & o,p1,p3 are_collinear & o,q1,q2 are_collinear & o,q1,q3 are_collinear & p1,q2,r3 are_collinear & q1,p2,r3 are_collinear & p1,q3,r2 are_collinear & p3,q1,r2 are_collinear & p2,q3,r1 are_collinear & p3,q2,r1 are_collinear & p1,q1,r1 are_collinear implies r1,r2,r3 are_collinear )
assume that
A1: ( o <> p2 & o <> p3 & p2 <> p3 & p1 <> p2 & p1 <> p3 & o <> q2 & o <> q3 & q2 <> q3 & q1 <> q2 & q1 <> q3 & not o,p1,q1 are_collinear & o,p1,p2 are_collinear & o,p1,p3 are_collinear & o,q1,q2 are_collinear & o,q1,q3 are_collinear ) and
A2: ( p1,q2,r3 are_collinear & q1,p2,r3 are_collinear & p1,q3,r2 are_collinear & p3,q1,r2 are_collinear & p2,q3,r1 are_collinear & p3,q2,r1 are_collinear ) and
A3: p1,q1,r1 are_collinear ; :: thesis: r1,r2,r3 are_collinear
per cases ( not p2,q2,r2 are_collinear or p2,q2,r2 are_collinear ) ;
suppose A4: not p2,q2,r2 are_collinear ; :: thesis: r1,r2,r3 are_collinear
( o <> p1 & o <> q1 & o <> p3 & p1 <> p3 & p2 <> p1 & p2 <> p3 & o <> q3 & q1 <> q3 & q2 <> q1 & q2 <> q3 & not o,p2,q2 are_collinear & o,p2,p1 are_collinear & o,p2,p3 are_collinear & o,q2,q1 are_collinear & o,q2,q3 are_collinear & p2,q1,r3 are_collinear & q2,p1,r3 are_collinear & p2,q3,r1 are_collinear & p3,q2,r1 are_collinear & p1,q3,r2 are_collinear & p3,q1,r2 are_collinear ) by A1, A2, Th8, ANPROJ_2:24;
then r2,r1,r3 are_collinear by A4, Lm5;
hence r1,r2,r3 are_collinear by ANPROJ_2:24; :: thesis: verum
end;
suppose A5: p2,q2,r2 are_collinear ; :: thesis: r1,r2,r3 are_collinear
per cases ( not p3,q3,r3 are_collinear or p3,q3,r3 are_collinear ) ;
suppose A6: not p3,q3,r3 are_collinear ; :: thesis: r1,r2,r3 are_collinear
( o <> p2 & o <> p1 & p2 <> p1 & p3 <> p2 & p3 <> p1 & o <> q2 & o <> q1 & q2 <> q1 & q3 <> q2 & q3 <> q1 & not o,p3,q3 are_collinear & o,p3,p2 are_collinear & o,p3,p1 are_collinear & o,q3,q2 are_collinear & o,q3,q1 are_collinear & p3,q2,r1 are_collinear & q3,p2,r1 are_collinear & p3,q1,r2 are_collinear & p1,q3,r2 are_collinear & p2,q1,r3 are_collinear & p1,q2,r3 are_collinear ) by A1, Th8, A2, COLLSP:4;
then r3,r2,r1 are_collinear by A6, Lm5;
hence r1,r2,r3 are_collinear by ANPROJ_2:24; :: thesis: verum
end;
end;
end;
end;