A1: [.(PI / 4),(PI / 2).] c= ].0 ,(PI / 2).] by Lm8, XXREAL_2:def 12;
rng (cosec | [.(PI / 4),(PI / 2).]) c= rng (cosec | ].0 ,(PI / 2).])
proof
let y be set ; :: according to TARSKI:def 3 :: thesis: ( not y in rng (cosec | [.(PI / 4),(PI / 2).]) or y in rng (cosec | ].0 ,(PI / 2).]) )
assume y in rng (cosec | [.(PI / 4),(PI / 2).]) ; :: thesis: y in rng (cosec | ].0 ,(PI / 2).])
then y in cosec .: [.(PI / 4),(PI / 2).] by RELAT_1:148;
then ex x being set st
( x in dom cosec & x in [.(PI / 4),(PI / 2).] & y = cosec . x ) by FUNCT_1:def 12;
then y in cosec .: ].0 ,(PI / 2).] by A1, FUNCT_1:def 12;
hence y in rng (cosec | ].0 ,(PI / 2).]) by RELAT_1:148; :: thesis: verum
end;
hence [.1,(sqrt 2).] c= dom arccosec2 by Th44, FUNCT_1:55; :: thesis: verum