let A be closed-interval Subset of REAL ; ( A = [.0 ,(2 * PI ).] implies integral (cos ^2 ),A = PI )
assume
A = [.0 ,(2 * PI ).]
; integral (cos ^2 ),A = PI
then
( upper_bound A = 2 * PI & lower_bound A = 0 )
by INTEGRA8:37;
then integral (cos ^2 ),A =
(((AffineMap (1 / 2),0 ) + ((1 / 4) (#) (sin * (AffineMap 2,0 )))) . (2 * PI )) - (((AffineMap (1 / 2),0 ) + ((1 / 4) (#) (sin * (AffineMap 2,0 )))) . 0 )
by Th16
.=
(((AffineMap (1 / 2),0 ) . (2 * PI )) + (((1 / 4) (#) (sin * (AffineMap 2,0 ))) . (2 * PI ))) - (((AffineMap (1 / 2),0 ) + ((1 / 4) (#) (sin * (AffineMap 2,0 )))) . 0 )
by VALUED_1:1
.=
(((AffineMap (1 / 2),0 ) . (2 * PI )) + (((1 / 4) (#) (sin * (AffineMap 2,0 ))) . (2 * PI ))) - (((AffineMap (1 / 2),0 ) . 0 ) + (((1 / 4) (#) (sin * (AffineMap 2,0 ))) . 0 ))
by VALUED_1:1
.=
((((1 / 2) * (2 * PI )) + 0 ) + (((1 / 4) (#) (sin * (AffineMap 2,0 ))) . (2 * PI ))) - (((AffineMap (1 / 2),0 ) . 0 ) + (((1 / 4) (#) (sin * (AffineMap 2,0 ))) . 0 ))
by JORDAN16:def 3
.=
(((1 / 2) * (2 * PI )) + ((1 / 4) * ((sin * (AffineMap 2,0 )) . (2 * PI )))) - (((AffineMap (1 / 2),0 ) . 0 ) + (((1 / 4) (#) (sin * (AffineMap 2,0 ))) . 0 ))
by VALUED_1:6
.=
(((1 / 2) * (2 * PI )) + ((1 / 4) * (sin . ((AffineMap 2,0 ) . (2 * PI ))))) - (((AffineMap (1 / 2),0 ) . 0 ) + (((1 / 4) (#) (sin * (AffineMap 2,0 ))) . 0 ))
by Lm4, FUNCT_1:23
.=
(((1 / 2) * (2 * PI )) + ((1 / 4) * (sin . ((2 * (2 * PI )) + 0 )))) - (((AffineMap (1 / 2),0 ) . 0 ) + (((1 / 4) (#) (sin * (AffineMap 2,0 ))) . 0 ))
by JORDAN16:def 3
.=
(((1 / 2) * (2 * PI )) + ((1 / 4) * (sin . (((2 * 2) * PI ) + 0 )))) - (0 + (((1 / 4) (#) (sin * (AffineMap 2,0 ))) . 0 ))
by JORDAN16:25
.=
(((1 / 2) * (2 * PI )) + ((1 / 4) * (sin . (((2 * 2) * PI ) + 0 )))) - ((1 / 4) * ((sin * (AffineMap 2,0 )) . 0 ))
by VALUED_1:6
.=
(((1 / 2) * (2 * PI )) + ((1 / 4) * (sin . (((2 * 2) * PI ) + 0 )))) - ((1 / 4) * (sin . ((AffineMap 2,0 ) . 0 )))
by Lm4, FUNCT_1:23
.=
(((1 / 2) * (2 * PI )) + ((1 / 4) * (sin . (0 + ((2 * PI ) * 2))))) - ((1 / 4) * (sin . 0 ))
by JORDAN16:25
.=
(((1 / 2) * (2 * PI )) + ((1 / 4) * (sin . 0 ))) - ((1 / 4) * (sin . 0 ))
by SIN_COS6:8
.=
PI
;
hence
integral (cos ^2 ),A = PI
; verum