let r, s, p, q be ext-real number ; :: thesis: ( r < s & p <= q implies ].r,q.] \ ].p,s.] = ].r,p.] \/ ].s,q.] )
assume that
Z1:
r < s
and
Z3:
p <= q
; :: thesis: ].r,q.] \ ].p,s.] = ].r,p.] \/ ].s,q.]
let x be ext-real number ; :: according to MEMBERED:def 14 :: thesis: ( ( not x in ].r,q.] \ ].p,s.] or x in ].r,p.] \/ ].s,q.] ) & ( not x in ].r,p.] \/ ].s,q.] or x in ].r,q.] \ ].p,s.] ) )
thus
( x in ].r,q.] \ ].p,s.] implies x in ].r,p.] \/ ].s,q.] )
:: thesis: ( not x in ].r,p.] \/ ].s,q.] or x in ].r,q.] \ ].p,s.] )proof
assume
x in ].r,q.] \ ].p,s.]
;
:: thesis: x in ].r,p.] \/ ].s,q.]
then
(
x in ].r,q.] & not
x in ].p,s.] )
by XBOOLE_0:def 5;
then
(
r < x &
x <= q & ( not
p < x or not
x <= s ) )
by Th2;
then
(
x in ].r,p.] or
x in ].s,q.] )
by Th2;
hence
x in ].r,p.] \/ ].s,q.]
by XBOOLE_0:def 3;
:: thesis: verum
end;
assume
x in ].r,p.] \/ ].s,q.]
; :: thesis: x in ].r,q.] \ ].p,s.]
then
( x in ].r,p.] or x in ].s,q.] )
by XBOOLE_0:def 3;
then
( ( r < x & x <= p ) or ( s < x & x <= q ) )
by Th2;
then
( r < x & x <= q & ( x <= p or s < x ) )
by Z1, Z3, XXREAL_0:2;
then
( x in ].r,q.] & not x in ].p,s.] )
by Th2;
hence
x in ].r,q.] \ ].p,s.]
by XBOOLE_0:def 5; :: thesis: verum