let CLSP be CollSp; :: thesis: for a, b, c being Point of CLSP st a,b,c is_collinear holds
( b,a,c is_collinear & a,c,b is_collinear )
let a, b, c be Point of CLSP; :: thesis: ( a,b,c is_collinear implies ( b,a,c is_collinear & a,c,b is_collinear ) )
assume A1:
a,b,c is_collinear
; :: thesis: ( b,a,c is_collinear & a,c,b is_collinear )
thus
b,a,c is_collinear
:: thesis: a,c,b is_collinear proof
(
a = b or (
a <> b &
a,
b,
b is_collinear &
a,
b,
a is_collinear &
a,
b,
c is_collinear ) )
by A1, Th7;
hence
b,
a,
c is_collinear
by Th7, Th8;
:: thesis: verum
end;
thus
a,c,b is_collinear
:: thesis: verumproof
(
a = b or (
a <> b &
a,
b,
a is_collinear &
a,
b,
c is_collinear &
a,
b,
b is_collinear ) )
by A1, Th7;
hence
a,
c,
b is_collinear
by Th7, Th8;
:: thesis: verum
end;