let x be Real; :: thesis: ( x in dom ((r (#) F) | A) & - x in dom ((r (#) F) | A) implies ((r (#) F) | A) . (- x) = - (((r (#) F) | A) . x) )
assume that
A6: x in dom ((r (#) F) | A) and
A7: - x in dom ((r (#) F) | A) ; :: thesis: ((r (#) F) | A) . (- x) = - (((r (#) F) | A) . x)
A8: x in dom (F | A) by A2, A4, A6, RELAT_1:91;
A9: - x in dom (F | A) by A2, A4, A7, RELAT_1:91;
((r (#) F) | A) . (- x) = ((r (#) F) | A) /. (- x) by A7, PARTFUN1:def 8
.= (r (#) F) /. (- x) by A3, A4, A7, PARTFUN2:35
.= (r (#) F) . (- x) by A3, A4, A7, PARTFUN1:def 8
.= r * (F . (- x)) by A3, A4, A7, VALUED_1:def 5
.= r * (F /. (- x)) by A2, A4, A7, PARTFUN1:def 8
.= r * ((F | A) /. (- x)) by A2, A4, A7, PARTFUN2:35
.= r * ((F | A) . (- x)) by A9, PARTFUN1:def 8
.= r * (- ((F | A) . x)) by A5, A8, A9, Def6
.= - (r * ((F | A) . x))
.= - (r * ((F | A) /. x)) by A8, PARTFUN1:def 8
.= - (r * (F /. x)) by A2, A4, A6, PARTFUN2:35
.= - (r * (F . x)) by A2, A4, A6, PARTFUN1:def 8
.= - ((r (#) F) . x) by A3, A4, A6, VALUED_1:def 5
.= - ((r (#) F) /. x) by A3, A4, A6, PARTFUN1:def 8
.= - (((r (#) F) | A) /. x) by A3, A4, A6, PARTFUN2:35
.= - (((r (#) F) | A) . x) by A6, PARTFUN1:def 8 ;
hence ((r (#) F) | A) . (- x) = - (((r (#) F) | A) . x) ; :: thesis: verum