let x be Real; :: thesis: ( x in Z implies (((sin + cos) / exp_R) `| Z) . x = - ((2 * (sin . x)) / (exp_R . x)) )
reconsider xx = x as Element of REAL by XREAL_0:def 1;
A5: (sin + cos) . xx = (sin . xx) + (cos . xx) by VALUED_1:1;
A6: exp_R . x <> 0 by SIN_COS:54;
assume A7: x in Z ; :: thesis: (((sin + cos) / exp_R) `| Z) . x = - ((2 * (sin . x)) / (exp_R . x))
then ( exp_R is_differentiable_in x & sin + cos is_differentiable_in x ) by A2, FDIFF_1:9, SIN_COS:65;
then diff (((sin + cos) / exp_R),x) = (((diff ((sin + cos),x)) * (exp_R . x)) - ((diff (exp_R,x)) * ((sin + cos) . x))) / ((exp_R . x) ^2) by A6, FDIFF_2:14
.= (((((sin + cos) `| Z) . x) * (exp_R . x)) - ((diff (exp_R,x)) * ((sin + cos) . x))) / ((exp_R . x) ^2) by A2, A7, FDIFF_1:def 7
.= ((((cos . x) - (sin . x)) * (exp_R . x)) - ((diff (exp_R,x)) * ((sin + cos) . x))) / ((exp_R . x) ^2) by A1, A7, Th38
.= ((((cos . x) - (sin . x)) * (exp_R . x)) - ((exp_R . x) * ((sin . x) + (cos . x)))) / ((exp_R . x) ^2) by A5, SIN_COS:65
.= ((- (2 * (sin . x))) * (exp_R . x)) / ((exp_R . x) * (exp_R . x))
.= (- (2 * (sin . x))) * ((exp_R . x) / ((exp_R . x) * (exp_R . x))) by XCMPLX_1:74
.= (- (2 * (sin . x))) * (((exp_R . x) / (exp_R . x)) / (exp_R . x)) by XCMPLX_1:78
.= (- (2 * (sin . x))) * (1 / (exp_R . x)) by A6, XCMPLX_1:60
.= (- (2 * (sin . x))) / (exp_R . x) by XCMPLX_1:99
.= - ((2 * (sin . x)) / (exp_R . x)) by XCMPLX_1:187 ;
hence (((sin + cos) / exp_R) `| Z) . x = - ((2 * (sin . x)) / (exp_R . x)) by A4, A7, FDIFF_1:def 7; :: thesis: verum