let V, W be non empty ModuleStr over INT.Ring ; :: thesis: for f being Form of V,W
for w being Vector of W holds FunctionalSAF ((- f),w) = - (FunctionalSAF (f,w))
let f be Form of V,W; :: thesis: for w being Vector of W holds FunctionalSAF ((- f),w) = - (FunctionalSAF (f,w))
let w be Vector of W; :: thesis: FunctionalSAF ((- f),w) = - (FunctionalSAF (f,w))
now :: thesis: for v being Vector of V holds (FunctionalSAF ((- f),w)) . v = (- (FunctionalSAF (f,w))) . v
let v be Vector of V; :: thesis: (FunctionalSAF ((- f),w)) . v = (- (FunctionalSAF (f,w))) . v
thus (FunctionalSAF ((- f),w)) . v = (- f) . (v,w) by BLTh9
.= - (f . (v,w)) by BLDef4
.= - ((FunctionalSAF (f,w)) . v) by BLTh9
.= (- (FunctionalSAF (f,w))) . v by HAHNBAN1:def 4 ; :: thesis: verum
end;
hence FunctionalSAF ((- f),w) = - (FunctionalSAF (f,w)) by FUNCT_2:63; :: thesis: verum