for x0 being Real st x0 in ].0 ,(PI / 2).[ holds
diff sec ,x0 > 0
proof
let x0 be
Real;
:: thesis: ( x0 in ].0 ,(PI / 2).[ implies diff sec ,x0 > 0 )
assume A1:
x0 in ].0 ,(PI / 2).[
;
:: thesis: diff sec ,x0 > 0
].0 ,(PI / 2).[ c= ].0 ,PI .[
by COMPTRIG:21, XXREAL_1:46;
then A2:
sin . x0 > 0
by A1, COMPTRIG:23;
].0 ,(PI / 2).[ c= ].(- (PI / 2)),(PI / 2).[
by XXREAL_1:46;
then
cos . x0 > 0
by A1, COMPTRIG:27;
then
(cos . x0) ^2 > 0
;
then
(sin . x0) / ((cos . x0) ^2 ) > 0 / ((cos . x0) ^2 )
by A2;
hence
diff sec ,
x0 > 0
by A1, Th5;
:: thesis: verum
end;
then
rng (sec | ].0 ,(PI / 2).[) is open
by Th5, X1, FDIFF_2:41;
hence
sec .: ].0 ,(PI / 2).[ is open
by RELAT_1:148; :: thesis: verum