let s, t, r be ext-real number ; :: thesis: ( s < t implies ].r,t.] \ ].s,t.] = ].r,s.] )
assume A1: s < t ; :: thesis: ].r,t.] \ ].s,t.] = ].r,s.]
let p be ext-real number ; :: according to MEMBERED:def 14 :: thesis: ( ( not p in ].r,t.] \ ].s,t.] or p in ].r,s.] ) & ( not p in ].r,s.] or p in ].r,t.] \ ].s,t.] ) )
thus ( p in ].r,t.] \ ].s,t.] implies p in ].r,s.] ) :: thesis: ( not p in ].r,s.] or p in ].r,t.] \ ].s,t.] )
proof
assume p in ].r,t.] \ ].s,t.] ; :: thesis: p in ].r,s.]
then ( p in ].r,t.] & not p in ].s,t.] ) by XBOOLE_0:def 5;
then ( r < p & p <= t & ( p <= s or t < p ) ) by Th2;
hence p in ].r,s.] by Th2; :: thesis: verum
end;
assume p in ].r,s.] ; :: thesis: p in ].r,t.] \ ].s,t.]
then ( r < p & p <= s ) by Th2;
then ( r < p & p <= t & ( p <= s or t < p ) ) by A1, XXREAL_0:2;
then ( p in ].r,t.] & not p in ].s,t.] ) by Th2;
hence p in ].r,t.] \ ].s,t.] by XBOOLE_0:def 5; :: thesis: verum