let r, s, p, q be ext-real number ; [.r,s.[ /\ [.p,q.[ = [.(max r,p),(min s,q).[
let t be ext-real number ; MEMBERED:def 14 ( ( not t in [.r,s.[ /\ [.p,q.[ or t in [.(max r,p),(min s,q).[ ) & ( not t in [.(max r,p),(min s,q).[ or t in [.r,s.[ /\ [.p,q.[ ) )
thus
( t in [.r,s.[ /\ [.p,q.[ implies t in [.(max r,p),(min s,q).[ )
( not t in [.(max r,p),(min s,q).[ or t in [.r,s.[ /\ [.p,q.[ )proof
assume A1:
t in [.r,s.[ /\ [.p,q.[
;
t in [.(max r,p),(min s,q).[
then A2:
t in [.r,s.[
by XBOOLE_0:def 4;
A3:
t in [.p,q.[
by A1, XBOOLE_0:def 4;
A4:
r <= t
by A2, Th3;
A5:
t < s
by A2, Th3;
A6:
p <= t
by A3, Th3;
A7:
t < q
by A3, Th3;
A8:
max r,
p <= t
by A4, A6, XXREAL_0:28;
t < min s,
q
by A5, A7, XXREAL_0:21;
hence
t in [.(max r,p),(min s,q).[
by A8, Th3;
verum
end;
assume A9:
t in [.(max r,p),(min s,q).[
; t in [.r,s.[ /\ [.p,q.[
then A10:
max r,p <= t
by Th3;
A11:
t < min s,q
by A9, Th3;
A12:
r <= t
by A10, XXREAL_0:30;
A13:
p <= t
by A10, XXREAL_0:30;
A14:
t < s
by A11, XXREAL_0:23;
A15:
t < q
by A11, XXREAL_0:23;
A16:
t in [.r,s.[
by A12, A14, Th3;
t in [.p,q.[
by A13, A15, Th3;
hence
t in [.r,s.[ /\ [.p,q.[
by A16, XBOOLE_0:def 4; verum