let r be Real; for V being RealLinearSpace
for u, w, v being VECTOR of V st r <> 1 & (r * u) + ((1 - r) * w) = v holds
w = ((1 / (1 - r)) * v) + ((1 - (1 / (1 - r))) * u)
let V be RealLinearSpace; for u, w, v being VECTOR of V st r <> 1 & (r * u) + ((1 - r) * w) = v holds
w = ((1 / (1 - r)) * v) + ((1 - (1 / (1 - r))) * u)
let u, w, v be VECTOR of V; ( r <> 1 & (r * u) + ((1 - r) * w) = v implies w = ((1 / (1 - r)) * v) + ((1 - (1 / (1 - r))) * u) )
assume that
A1:
r <> 1
and
A2:
(r * u) + ((1 - r) * w) = v
; w = ((1 / (1 - r)) * v) + ((1 - (1 / (1 - r))) * u)
A3:
(1 - r) * w = v - (r * u)
by A2, RLVECT_4:1;
A4:
1 - r <> 1 - 1
by A1;
then A5:
(1 / (1 - r)) * (1 - r) = 1
by XCMPLX_1:107;
A6: (1 / (1 - r)) * (r * u) =
((1 / (1 - r)) * r) * u
by RLVECT_1:def 10
.=
((1 - (1 - r)) / (1 - r)) * u
by XCMPLX_1:100
.=
((1 / (1 - r)) - ((1 - r) / (1 - r))) * u
by XCMPLX_1:121
.=
((1 / (1 - r)) - 1) * u
by A4, XCMPLX_1:60
;
thus w =
1 * w
by RLVECT_1:def 11
.=
(1 / (1 - r)) * ((1 - r) * w)
by A5, RLVECT_1:def 10
.=
((1 / (1 - r)) * v) - ((1 / (1 - r)) * (r * u))
by A3, RLVECT_1:48
.=
((1 / (1 - r)) * v) + (- (((1 / (1 - r)) - 1) * u))
by A6, RLVECT_1:def 14
.=
((1 / (1 - r)) * v) + (((1 / (1 - r)) - 1) * (- u))
by RLVECT_1:39
.=
((1 / (1 - r)) * v) + ((- ((1 / (1 - r)) - 1)) * u)
by RLVECT_1:38
.=
((1 / (1 - r)) * v) + ((1 - (1 / (1 - r))) * u)
; verum