let S be IncProjStr ; :: thesis: for L being LINE of S
for A, B, C being POINT of S holds
( {A,B,C} on L iff ( A on L & B on L & C on L ) )
let L be LINE of S; :: thesis: for A, B, C being POINT of S holds
( {A,B,C} on L iff ( A on L & B on L & C on L ) )
let A, B, C be POINT of S; :: thesis: ( {A,B,C} on L iff ( A on L & B on L & C on L ) )
thus
( {A,B,C} on L implies ( A on L & B on L & C on L ) )
:: thesis: ( A on L & B on L & C on L implies {A,B,C} on L )proof
A1:
C in {A,B,C}
by ENUMSET1:def 1;
A2:
(
A in {A,B,C} &
B in {A,B,C} )
by ENUMSET1:def 1;
assume
{A,B,C} on L
;
:: thesis: ( A on L & B on L & C on L )
hence
(
A on L &
B on L &
C on L )
by A2, A1, Def4;
:: thesis: verum
end;
assume A3:
( A on L & B on L & C on L )
; :: thesis: {A,B,C} on L
let D be POINT of S; :: according to INCSP_1:def 4 :: thesis: ( D in {A,B,C} implies D on L )
assume
D in {A,B,C}
; :: thesis: D on L
hence
D on L
by A3, ENUMSET1:def 1; :: thesis: verum