let x be ext-real number ; :: according to XXREAL_2:def 12 :: thesis: for s being ext-real number st x in ].r,s.] & s in ].r,s.] holds
[.x,s.] c= ].r,s.]
let y be ext-real number ; :: thesis: ( x in ].r,s.] & y in ].r,s.] implies [.x,y.] c= ].r,s.] )
assume x in ].r,s.] ; :: thesis: ( not y in ].r,s.] or [.x,y.] c= ].r,s.] )
then A1: r < x by XXREAL_1:2;
assume y in ].r,s.] ; :: thesis: [.x,y.] c= ].r,s.]
then A2: y <= s by XXREAL_1:2;
let z be ext-real number ; :: according to MEMBERED:def 8 :: thesis: ( not z in [.x,y.] or z in ].r,s.] )
assume z in [.x,y.] ; :: thesis: z in ].r,s.]
then ( x <= z & z <= y ) by XXREAL_1:1;
then ( r < z & z <= s ) by A1, A2, XXREAL_0:2;
hence z in ].r,s.] by XXREAL_1:2; :: thesis: verum