let x be Real; :: thesis: ( x in dom ((sin ^ ) `| Z) implies ((sin ^ ) `| Z) . x = ((- ((sin ^ ) (#) cot )) | Z) . x )
A7: dom ((- 1) (#) ((sin ^ ) (#) cot )) = dom ((sin ^ ) (#) (cos / sin )) by SIN_COS:def 31, VALUED_1:def 5
.= dom ((sin ^ ) (#) (cos (#) (sin ^ ))) by RFUNCT_1:47 ;
A8: Z c= dom (cos (#) (sin ^ )) by A2, A1, VALUED_1:def 4;
dom ((sin ^ ) (#) (cos (#) (sin ^ ))) = (dom (sin ^ )) /\ (dom (cos (#) (sin ^ ))) by VALUED_1:def 4;
then A9: Z c= dom ((sin ^ ) (#) (cos (#) (sin ^ ))) by A3, A8, XBOOLE_1:19;
assume x in dom ((sin ^ ) `| Z) ; :: thesis: ((sin ^ ) `| Z) . x = ((- ((sin ^ ) (#) cot )) | Z) . x
then A10: x in Z by A5, FDIFF_1:def 8;
then ((sin ^ ) `| Z) . x = - ((cos . x) / ((sin . x) ^2 )) by A4, FDIFF_4:40
.= - ((1 * (cos . x)) / ((sin . x) * (sin . x)))
.= - ((1 / (sin . x)) * ((cos . x) / (sin . x))) by XCMPLX_1:77
.= - ((1 / (sin . x)) * ((cos . x) * (1 / (sin . x)))) by XCMPLX_1:100
.= - ((1 * ((sin . x) " )) * ((cos . x) * (1 / (sin . x)))) by XCMPLX_0:def 9
.= - (((sin . x) " ) * ((cos . x) * (1 * ((sin . x) " )))) by XCMPLX_0:def 9
.= - (((sin ^ ) . x) * ((cos . x) * ((sin . x) " ))) by A3, A10, RFUNCT_1:def 8
.= - (((sin ^ ) . x) * ((cos . x) * ((sin ^ ) . x))) by A3, A10, RFUNCT_1:def 8
.= - (((sin ^ ) . x) * ((cos (#) (sin ^ )) . x)) by A10, A8, VALUED_1:def 4
.= - (((sin ^ ) (#) (cos (#) (sin ^ ))) . x) by A10, A9, VALUED_1:def 4
.= - (((sin ^ ) (#) cot ) . x) by RFUNCT_1:47, SIN_COS:def 31
.= (- 1) * (((sin ^ ) (#) cot ) . x)
.= ((- 1) (#) ((sin ^ ) (#) cot )) . x by A10, A9, A7, VALUED_1:def 5
.= ((- ((sin ^ ) (#) cot )) | Z) . x by A10, FUNCT_1:72 ;
hence ((sin ^ ) `| Z) . x = ((- ((sin ^ ) (#) cot )) | Z) . x ; :: thesis: verum