let CPS be CollProjectiveSpace; :: thesis: ( ( for o, p1, p2, p3, q1, q2, q3, r1, r2, r3 being Point of CPS st 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 holds
r1,r2,r3 are_collinear ) implies for o, a1, a2, a3, b1, b2, b3, c1, c2, c3 being POINT of (IncProjSp_of CPS)
for A1, A2, A3, B1, B2, B3, C1, C2, C3 being LINE of (IncProjSp_of CPS) st o,a1,a2,a3 are_mutually_distinct & o,b1,b2,b3 are_mutually_distinct & A3 <> B3 & o on A3 & o on B3 & {a2,b3,c1} on A1 & {a3,b1,c2} on B1 & {a1,b2,c3} on C1 & {a1,b3,c2} on A2 & {a3,b2,c1} on B2 & {a2,b1,c3} on C2 & {b1,b2,b3} on A3 & {a1,a2,a3} on B3 & {c1,c2} on C3 holds
c3 on C3 )
assume A1: for o, p1, p2, p3, q1, q2, q3, r1, r2, r3 being Point of CPS st 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 holds
r1,r2,r3 are_collinear ; :: thesis: for o, a1, a2, a3, b1, b2, b3, c1, c2, c3 being POINT of (IncProjSp_of CPS)
for A1, A2, A3, B1, B2, B3, C1, C2, C3 being LINE of (IncProjSp_of CPS) st o,a1,a2,a3 are_mutually_distinct & o,b1,b2,b3 are_mutually_distinct & A3 <> B3 & o on A3 & o on B3 & {a2,b3,c1} on A1 & {a3,b1,c2} on B1 & {a1,b2,c3} on C1 & {a1,b3,c2} on A2 & {a3,b2,c1} on B2 & {a2,b1,c3} on C2 & {b1,b2,b3} on A3 & {a1,a2,a3} on B3 & {c1,c2} on C3 holds
c3 on C3
let o, a1, a2, a3, b1, b2, b3, c1, c2, c3 be POINT of (IncProjSp_of CPS); :: thesis: for A1, A2, A3, B1, B2, B3, C1, C2, C3 being LINE of (IncProjSp_of CPS) st o,a1,a2,a3 are_mutually_distinct & o,b1,b2,b3 are_mutually_distinct & A3 <> B3 & o on A3 & o on B3 & {a2,b3,c1} on A1 & {a3,b1,c2} on B1 & {a1,b2,c3} on C1 & {a1,b3,c2} on A2 & {a3,b2,c1} on B2 & {a2,b1,c3} on C2 & {b1,b2,b3} on A3 & {a1,a2,a3} on B3 & {c1,c2} on C3 holds
c3 on C3
let A1, A2, A3, B1, B2, B3, C1, C2, C3 be LINE of (IncProjSp_of CPS); :: thesis: ( o,a1,a2,a3 are_mutually_distinct & o,b1,b2,b3 are_mutually_distinct & A3 <> B3 & o on A3 & o on B3 & {a2,b3,c1} on A1 & {a3,b1,c2} on B1 & {a1,b2,c3} on C1 & {a1,b3,c2} on A2 & {a3,b2,c1} on B2 & {a2,b1,c3} on C2 & {b1,b2,b3} on A3 & {a1,a2,a3} on B3 & {c1,c2} on C3 implies c3 on C3 )
assume that
A2: o,a1,a2,a3 are_mutually_distinct and
A3: o,b1,b2,b3 are_mutually_distinct and
A4: A3 <> B3 and
A5: o on A3 and
A6: o on B3 and
A7: {a2,b3,c1} on A1 and
A8: {a3,b1,c2} on B1 and
A9: {a1,b2,c3} on C1 and
A10: {a1,b3,c2} on A2 and
A11: {a3,b2,c1} on B2 and
A12: {a2,b1,c3} on C2 and
A13: {b1,b2,b3} on A3 and
A14: {a1,a2,a3} on B3 and
A15: {c1,c2} on C3 ; :: thesis: c3 on C3
reconsider o9 = o, a19 = a1, a29 = a2, a39 = a3, b19 = b1, b29 = b2, b39 = b3, c19 = c1, c29 = c2, c39 = c3 as Point of CPS ;
A16: b1 on A3 by A13, INCSP_1:2;
A17: c3 on C1 by A9, INCSP_1:2;
( a1 on C1 & b2 on C1 ) by A9, INCSP_1:2;
then A18: a19,b29,c39 are_collinear by A17, Th10;
A19: c1 on A1 by A7, INCSP_1:2;
A20: ( o9 <> b39 & b29 <> b39 ) by A3, ZFMISC_1:def 6;
A21: ( a29 <> a39 & a19 <> a29 ) by A2, ZFMISC_1:def 6;
A22: ( b3 on A2 & c2 on A2 ) by A10, INCSP_1:2;
A23: a1 on A2 by A10, INCSP_1:2;
then A24: a19,b39,c29 are_collinear by A22, Th10;
A25: ( b19 <> b29 & b19 <> b39 ) by A3, ZFMISC_1:def 6;
A26: b3 on A1 by A7, INCSP_1:2;
A27: a1 on B3 by A14, INCSP_1:2;
A28: not o9,a19,b19 are_collinear
proof
A29: o <> a1 by A2, ZFMISC_1:def 6;
assume o9,a19,b19 are_collinear ; :: thesis: contradiction
then consider K being LINE of (IncProjSp_of CPS) such that
A30: o on K and
A31: a1 on K and
A32: b1 on K by Th10;
o <> b1 by A3, ZFMISC_1:def 6;
then K = A3 by A5, A16, A30, A32, Th8;
hence contradiction by A4, A6, A27, A30, A31, A29, Th8; :: thesis: verum
end;
A33: c3 on C2 by A12, INCSP_1:2;
( a2 on C2 & b1 on C2 ) by A12, INCSP_1:2;
then A34: b19,a29,c39 are_collinear by A33, Th10;
A35: a3 on B1 by A8, INCSP_1:2;
A36: b2 on A3 by A13, INCSP_1:2;
then A37: o9,b19,b29 are_collinear by A5, A16, Th10;
A38: ( a3 on B2 & c1 on B2 ) by A11, INCSP_1:2;
A39: b2 on B2 by A11, INCSP_1:2;
then A40: a39,b29,c19 are_collinear by A38, Th10;
A41: b3 on A3 by A13, INCSP_1:2;
then A42: o9,b19,b39 are_collinear by A5, A16, Th10;
A43: ( a19 <> a39 & o9 <> b29 ) by A2, A3, ZFMISC_1:def 6;
A44: ( o9 <> a29 & o9 <> a39 ) by A2, ZFMISC_1:def 6;
A45: c2 on B1 by A8, INCSP_1:2;
A46: a2 on A1 by A7, INCSP_1:2;
then A47: a29,b39,c19 are_collinear by A26, A19, Th10;
A48: b1 <> b2 by A3, ZFMISC_1:def 6;
A49: a1 <> a2 by A2, ZFMISC_1:def 6;
A50: o <> b3 by A3, ZFMISC_1:def 6;
A51: b1 on B1 by A8, INCSP_1:2;
then A52: a39,b19,c29 are_collinear by A35, A45, Th10;
A53: a3 on B3 by A14, INCSP_1:2;
then A54: o9,a19,a39 are_collinear by A6, A27, Th10;
A55: a2 on B3 by A14, INCSP_1:2;
then o9,a19,a29 are_collinear by A6, A27, Th10;
then c19,c29,c39 are_collinear by A1, A44, A21, A43, A20, A25, A28, A54, A37, A42, A18, A34, A24, A52, A47, A40;
then A56: ex K being LINE of (IncProjSp_of CPS) st
( c1 on K & c2 on K & c3 on K ) by Th10;
A57: o <> a3 by A2, ZFMISC_1:def 6;
A58: c1 <> c2
proof
assume A59: not c1 <> c2 ; :: thesis: contradiction
not a3 on A3 by A4, A5, A6, A57, A53, Th8;
then B1 <> B2 by A48, A35, A51, A39, A16, A36, Th8;
then A60: c1 = a3 by A35, A45, A38, A59, Th8;
not b3 on B3 by A4, A5, A6, A50, A41, Th8;
then A1 <> A2 by A49, A46, A26, A23, A27, A55, Th8;
then c1 = b3 by A26, A19, A22, A59, Th8;
hence contradiction by A4, A5, A6, A50, A41, A53, A60, Th8; :: thesis: verum
end;
( c1 on C3 & c2 on C3 ) by A15, INCSP_1:1;
hence c3 on C3 by A58, A56, Th8; :: thesis: verum