let R be Ring; for V being RightMod of
for a being Scalar of
for v, u, w being Vector of holds (Sum <*v,u,w*>) * a = ((v * a) + (u * a)) + (w * a)
let V be RightMod of ; for a being Scalar of
for v, u, w being Vector of holds (Sum <*v,u,w*>) * a = ((v * a) + (u * a)) + (w * a)
let a be Scalar of ; for v, u, w being Vector of holds (Sum <*v,u,w*>) * a = ((v * a) + (u * a)) + (w * a)
let v, u, w be Vector of ; (Sum <*v,u,w*>) * a = ((v * a) + (u * a)) + (w * a)
thus (Sum <*v,u,w*>) * a =
((v + u) + w) * a
by RLVECT_1:63
.=
((v + u) * a) + (w * a)
by VECTSP_2:def 23
.=
((v * a) + (u * a)) + (w * a)
by VECTSP_2:def 23
; verum