let V be RealLinearSpace; for u, v, y being VECTOR of V holds
( (u - y) - (v - y) = u - v & (u + y) - (v + y) = u - v )
let u, v, y be VECTOR of V; ( (u - y) - (v - y) = u - v & (u + y) - (v + y) = u - v )
thus (u - y) - (v - y) =
(u - y) + (y - v)
by RLVECT_1:33
.=
u - v
by ANALOAF:1
; (u + y) - (v + y) = u - v
thus (u + y) - (v + y) =
(u - (- y)) - (v + y)
by RLVECT_1:17
.=
(u - (- y)) - (v - (- y))
by RLVECT_1:17
.=
(u - (- y)) + ((- y) - v)
by RLVECT_1:33
.=
u - v
by ANALOAF:1
; verum