let FdSp be FanodesSp; for a, b, c, d, x being Element of FdSp st not a,b,c is_collinear & a,b '||' c,d & c <> d & a,b,x is_collinear holds
not c,d,x is_collinear
let a, b, c, d, x be Element of FdSp; ( not a,b,c is_collinear & a,b '||' c,d & c <> d & a,b,x is_collinear implies not c,d,x is_collinear )
assume A1:
( not a,b,c is_collinear & a,b '||' c,d & c <> d )
; ( not a,b,x is_collinear or not c,d,x is_collinear )
now assume
c,
d,
x is_collinear
;
( not a,b,x is_collinear or not c,d,x is_collinear )then
c,
d '||' c,
x
by Def2;
hence
( not
a,
b,
x is_collinear or not
c,
d,
x is_collinear )
by A1, Th22, PARSP_1:43;
verum end;
hence
( not a,b,x is_collinear or not c,d,x is_collinear )
; verum