let V, W be non empty ModuleStr over INT.Ring ; for a, b being Element of INT.Ring
for f being Form of V,W holds (a * b) * f = a * (b * f)
let r, s be Element of INT.Ring; for f being Form of V,W holds (r * s) * f = r * (s * f)
let f be Form of V,W; (r * s) * f = r * (s * f)
now for v being Vector of V
for w being Vector of W holds ((r * s) * f) . (v,w) = (r * (s * f)) . (v,w)let v be
Vector of
V;
for w being Vector of W holds ((r * s) * f) . (v,w) = (r * (s * f)) . (v,w)let w be
Vector of
W;
((r * s) * f) . (v,w) = (r * (s * f)) . (v,w)thus ((r * s) * f) . (
v,
w) =
(r * s) * (f . (v,w))
by BLDef3
.=
r * (s * (f . (v,w)))
.=
r * ((s * f) . (v,w))
by BLDef3
.=
(r * (s * f)) . (
v,
w)
by BLDef3
;
verum end;
hence
(r * s) * f = r * (s * f)
; verum