let x, y, z, e be Real; ( |.(x - y).| < e / 2 & |.(y - z).| < e / 2 implies |.(x - z).| < e )
assume
( |.(x - y).| < e / 2 & |.(y - z).| < e / 2 )
; |.(x - z).| < e
then
( |.((x - y) + (y - z)).| <= |.(x - y).| + |.(y - z).| & |.(x - y).| + |.(y - z).| < (e / 2) + (e / 2) )
by COMPLEX1:56, XREAL_1:8;
hence
|.(x - z).| < e
by XXREAL_0:2; verum