let IPP be 2-dimensional Desarguesian IncProjSp; for a, b being POINT of IPP
for A, B, C, O, Q being LINE of IPP st not a on A & not b on B & not a on C & not b on C & not A,B,C are_concurrent & A,C,Q are_concurrent & not b on Q & A <> Q & a <> b & a on O & b on O holds
ex q being POINT of IPP st
( q on O & not q on A & not q on Q & (IncProj (C,b,B)) * (IncProj (A,a,C)) = (IncProj (Q,b,B)) * (IncProj (A,q,Q)) )
let a, b be POINT of IPP; for A, B, C, O, Q being LINE of IPP st not a on A & not b on B & not a on C & not b on C & not A,B,C are_concurrent & A,C,Q are_concurrent & not b on Q & A <> Q & a <> b & a on O & b on O holds
ex q being POINT of IPP st
( q on O & not q on A & not q on Q & (IncProj (C,b,B)) * (IncProj (A,a,C)) = (IncProj (Q,b,B)) * (IncProj (A,q,Q)) )
let A, B, C, O, Q be LINE of IPP; ( not a on A & not b on B & not a on C & not b on C & not A,B,C are_concurrent & A,C,Q are_concurrent & not b on Q & A <> Q & a <> b & a on O & b on O implies ex q being POINT of IPP st
( q on O & not q on A & not q on Q & (IncProj (C,b,B)) * (IncProj (A,a,C)) = (IncProj (Q,b,B)) * (IncProj (A,q,Q)) ) )
assume A1:
( not a on A & not b on B & not a on C & not b on C & not A,B,C are_concurrent & A,C,Q are_concurrent & not b on Q & A <> Q & a <> b & a on O & b on O )
; ex q being POINT of IPP st
( q on O & not q on A & not q on Q & (IncProj (C,b,B)) * (IncProj (A,a,C)) = (IncProj (Q,b,B)) * (IncProj (A,q,Q)) )
then
( not B,C,O are_concurrent implies ex q being POINT of IPP st
( q on O & not q on A & not q on Q & (IncProj (C,b,B)) * (IncProj (A,a,C)) = (IncProj (Q,b,B)) * (IncProj (A,q,Q)) ) )
by Lm1;
hence
ex q being POINT of IPP st
( q on O & not q on A & not q on Q & (IncProj (C,b,B)) * (IncProj (A,a,C)) = (IncProj (Q,b,B)) * (IncProj (A,q,Q)) )
by A1, Lm2; verum