let K be non empty addLoopStr ; :: thesis: for V, W being non empty VectSpStr of K
for f, g being Form of V,W
for w being Vector of W holds FunctionalSAF (f - g),w = (FunctionalSAF f,w) - (FunctionalSAF g,w)
let V, W be non empty VectSpStr of K; :: thesis: for f, g being Form of V,W
for w being Vector of W holds FunctionalSAF (f - g),w = (FunctionalSAF f,w) - (FunctionalSAF g,w)
let f, g be Form of V,W; :: thesis: for w being Vector of W holds FunctionalSAF (f - g),w = (FunctionalSAF f,w) - (FunctionalSAF g,w)
let w be Vector of W; :: thesis: FunctionalSAF (f - g),w = (FunctionalSAF f,w) - (FunctionalSAF g,w)
now let v be
Vector of
V;
:: thesis: (FunctionalSAF (f - g),w) . v = ((FunctionalSAF f,w) - (FunctionalSAF g,w)) . vthus (FunctionalSAF (f - g),w) . v =
(f - g) . v,
w
by Th10
.=
(f . v,w) - (g . v,w)
by Def8
.=
((FunctionalSAF f,w) . v) - (g . v,w)
by Th10
.=
((FunctionalSAF f,w) . v) - ((FunctionalSAF g,w) . v)
by Th10
.=
((FunctionalSAF f,w) . v) + (- ((FunctionalSAF g,w) . v))
by RLVECT_1:def 12
.=
((FunctionalSAF f,w) . v) + ((- (FunctionalSAF g,w)) . v)
by HAHNBAN1:def 7
.=
((FunctionalSAF f,w) - (FunctionalSAF g,w)) . v
by HAHNBAN1:def 6
;
:: thesis: verum end;
hence
FunctionalSAF (f - g),w = (FunctionalSAF f,w) - (FunctionalSAF g,w)
by FUNCT_2:113; :: thesis: verum