let r, p, s, q be ext-real number ; :: thesis: ( r >= p & s >= q implies ].r,s.] /\ [.p,q.[ = ].r,q.[ )
assume that
A1: r >= p and
A2: s >= q ; :: thesis: ].r,s.] /\ [.p,q.[ = ].r,q.[
let t be ext-real number ; :: according to MEMBERED:def 14 :: thesis: ( ( not t in ].r,s.] /\ [.p,q.[ or t in ].r,q.[ ) & ( not t in ].r,q.[ or t in ].r,s.] /\ [.p,q.[ ) )
thus ( t in ].r,s.] /\ [.p,q.[ implies t in ].r,q.[ ) :: thesis: ( not t in ].r,q.[ or t in ].r,s.] /\ [.p,q.[ )
proof
assume t in ].r,s.] /\ [.p,q.[ ; :: thesis: t in ].r,q.[
then ( t in ].r,s.] & t in [.p,q.[ ) by XBOOLE_0:def 4;
then ( r < t & t < q ) by Th2, Th3;
hence t in ].r,q.[ by Th4; :: thesis: verum
end;
assume t in ].r,q.[ ; :: thesis: t in ].r,s.] /\ [.p,q.[
then A3: ( r < t & t < q ) by Th4;
then ( t <= s & p <= t ) by A1, A2, XXREAL_0:2;
then ( t in ].r,s.] & t in [.p,q.[ ) by A3, Th2, Th3;
hence t in ].r,s.] /\ [.p,q.[ by XBOOLE_0:def 4; :: thesis: verum