let A, B, C be Point of (TOP-REAL 2); ( A <> B & A <> C implies |.(A - B).| + |.(A - C).| <> 0 )
assume
( A <> B & A <> C )
; |.(A - B).| + |.(A - C).| <> 0
then
( |.(A - B).| <> 0 & |.(A - C).| <> 0 )
by EUCLID_6:42;
hence
|.(A - B).| + |.(A - C).| <> 0
; verum