let h, x be Real; :: thesis: ( x in dom tan & x - h in dom tan implies (bD (((tan (#) tan) (#) cos),h)) . x = ((tan (#) sin) . x) - ((tan (#) sin) . (x - h)) )
set f = (tan (#) tan) (#) cos;
assume A1: ( x in dom tan & x - h in dom tan ) ; :: thesis: (bD (((tan (#) tan) (#) cos),h)) . x = ((tan (#) sin) . x) - ((tan (#) sin) . (x - h))
( x in dom ((tan (#) tan) (#) cos) & x - h in dom ((tan (#) tan) (#) cos) ) then (bD (((tan (#) tan) (#) cos),h)) . x = (((tan (#) tan) (#) cos) . x) - (((tan (#) tan) (#) cos) . (x - h)) by DIFF_1:38
.= (((tan (#) tan) . x) * (cos . x)) - (((tan (#) tan) (#) cos) . (x - h)) by VALUED_1:5
.= (((tan . x) * (tan . x)) * (cos . x)) - (((tan (#) tan) (#) cos) . (x - h)) by VALUED_1:5
.= (((tan . x) * (tan . x)) * (cos . x)) - (((tan (#) tan) . (x - h)) * (cos . (x - h))) by VALUED_1:5
.= (((tan . x) * (tan . x)) * (cos . x)) - (((tan . (x - h)) * (tan . (x - h))) * (cos . (x - h))) by VALUED_1:5
.= ((((sin . x) * ((cos . x) ")) * (tan . x)) * (cos . x)) - (((tan . (x - h)) * (tan . (x - h))) * (cos . (x - h))) by A1, RFUNCT_1:def 1
.= ((((sin . x) * ((cos . x) ")) * (tan . x)) * (cos . x)) - ((((sin . (x - h)) * ((cos . (x - h)) ")) * (tan . (x - h))) * (cos . (x - h))) by A1, RFUNCT_1:def 1
.= (((sin . x) * (tan . x)) * ((cos . x) * (1 / (cos . x)))) - (((sin . (x - h)) * (tan . (x - h))) * ((cos . (x - h)) * (1 / (cos . (x - h)))))
.= (((sin . x) * (tan . x)) * 1) - (((sin . (x - h)) * (tan . (x - h))) * ((cos . (x - h)) * (1 / (cos . (x - h))))) by A1, FDIFF_8:1, XCMPLX_1:106
.= (((sin . x) * (tan . x)) * 1) - (((sin . (x - h)) * (tan . (x - h))) * 1) by A1, FDIFF_8:1, XCMPLX_1:106
.= ((tan (#) sin) . x) - ((tan . (x - h)) * (sin . (x - h))) by VALUED_1:5
.= ((tan (#) sin) . x) - ((tan (#) sin) . (x - h)) by VALUED_1:5 ;
hence (bD (((tan (#) tan) (#) cos),h)) . x = ((tan (#) sin) . x) - ((tan (#) sin) . (x - h)) ; :: thesis: verum