let FCPS be up-3-dimensional CollProjectiveSpace; :: thesis:
let o, a9, b9, c9, a, b, c, p, q, r be Element of FCPS; :: thesis:
assume that
A1: o <> a9 and
A2: o <> b9 and
A3: o <> c9 and
A4: a <> a9 and
A5: b <> b9 and
A6: o,a,b,c constitute_a_quadrangle and
A7: o,a,a9 is_collinear and
A8: o,b,b9 is_collinear and
A9: o,c,c9 is_collinear and
A10: a,b,p is_collinear and
A11: a9,b9,p is_collinear and
A12: b,c,q is_collinear and
A13: b9,c9,q is_collinear and
A14: a,c,r is_collinear and
A15: a9,c9,r is_collinear ; :: thesis:
A16: not o,b,c is_collinear by A6, Def2;
A17: not a,b,c is_collinear by A6, Def2;
A18: not o,c,a is_collinear by A6, Def2;
A19: not o,a,b is_collinear by A6, Def2;

A20: now

assume A21: a,b,c,o are_coplanar ; :: thesis:
then A22: b,c,a,o are_coplanar by Th11;
A23: a,c,b,o are_coplanar by A21, Th11;
consider d being Element of FCPS such that
A24: not a,b,c,d are_coplanar by A17, Th17;
A25: not a,c,b,d are_coplanar by A24, Th11;
A26: a,b,c,c are_coplanar by Th18;
A27: not b,c,a,d are_coplanar by A24, Th11;
consider d9 being Element of FCPS such that
A28: o <> d9 and
A29: d <> d9 and
A30: o,d,d9 is_collinear by ANPROJ_2:def 10;
a,o,a9 is_collinear by A7, Th1;
then consider s being Element of FCPS such that
A31: a,d,s is_collinear and
A32: a9,d9,s is_collinear by A30, ANPROJ_2:def 9;
A33: d,a,s is_collinear by A31, Th1;
b,o,b9 is_collinear by A8, Th1;
then consider t being Element of FCPS such that
A34: ( b,d,t is_collinear & b9,d9,t is_collinear ) by A30, ANPROJ_2:def 9;
c,o,c9 is_collinear by A9, Th1;
then consider u being Element of FCPS such that
A35: c,d,u is_collinear and
A36: c9,d9,u is_collinear by A30, ANPROJ_2:def 9;
A37: s,t,u,s are_coplanar by Th18;
not a,c,o is_collinear by A18, Th1;
then A38: not a,c,d,o are_coplanar by A25, A23, Th22;
then not a9,c9,d9 is_collinear by A1, A3, A7, A9, A28, A30, Th23;
then r,u,s is_collinear by A4, A7, A14, A15, A31, A32, A35, A36, A38, Th21;
then A39: s,u,r is_collinear by Th1;
not a,b,o is_collinear by A19, Th1;
then A40: not a,b,d,o are_coplanar by A21, A24, Th22;
then not d,o,a is_collinear by Th10;
then A41: not o,d,a is_collinear by Th1;
A42: s,t,u,u are_coplanar by Th18;
not b,c,o is_collinear by A16, Th1;
then A43: not b,c,d,o are_coplanar by A27, A22, Th22;
then not b9,c9,d9 is_collinear by A2, A3, A8, A9, A28, A30, Th23;
then q,u,t is_collinear by A5, A8, A12, A13, A34, A35, A36, A43, Th21;
then A44: u,t,q is_collinear by Th1;
A45: s,t,u,t are_coplanar by Th18;
d9,a9,s is_collinear by A32, Th1;
then s <> a by A4, A7, A28, A30, A41, Th8;
then A46: not a,b,c,s are_coplanar by A24, A33, Th19;
A47: a,b,c,b are_coplanar by Th18;
not a9,b9,d9 is_collinear by A1, A2, A7, A8, A28, A30, A40, Th23;
then p,t,s is_collinear by A4, A7, A10, A11, A31, A32, A34, A40, Th21;
then A48: t,s,p is_collinear by Th1;
A49: a,b,c,a are_coplanar by Th18;
A50: not s,t,u is_collinear by A1, A2, A7, A8, A21, A24, A29, A30, A31, A32, A34, A35, A40, Th24;
then t <> u by ANPROJ_2:def 7;
then A51: s,t,u,q are_coplanar by A44, A45, A42, Th14;
c <> a by A18, ANPROJ_2:def 7;
then A52: a,b,c,r are_coplanar by A14, A49, A26, Th14;
b <> c by A16, ANPROJ_2:def 7;
then A53: a,b,c,q are_coplanar by A12, A47, A26, Th14;
a <> b by A19, ANPROJ_2:def 7;
then A54: a,b,c,p are_coplanar by A10, A49, A47, Th14;
u <> s by A50, ANPROJ_2:def 7;
then A55: s,t,u,r are_coplanar by A39, A37, A42, Th14;
s <> t by A50, ANPROJ_2:def 7;
then s,t,u,p are_coplanar by A48, A37, A45, Th14;
hence p,q,r is_collinear by A17, A50, A46, A54, A53, A52, A51, A55, Th20; :: thesis:

end;

now

assume A56: not a,b,c,o are_coplanar ; :: thesis:
then not a9,b9,c9 is_collinear by A1, A2, A3, A7, A8, A9, Th23;
hence p,q,r is_collinear by A4, A7, A10, A11, A12, A13, A14, A15, A56, Th21; :: thesis:

end;

hence p,q,r is_collinear by A20; :: thesis: