let x, y, z be Element of REAL+ ; ( x *' y = x *' z & x <> {} implies y = z )
assume A1:
x *' y = x *' z
; ( not x <> {} or y = z )
assume
x <> {}
; y = z
then consider x1 being Element of REAL+ such that
A2:
x *' x1 = one
by ARYTM_2:14;
thus y =
(x *' x1) *' y
by A2, ARYTM_2:15
.=
x1 *' (x *' z)
by A1, ARYTM_2:12
.=
(x *' x1) *' z
by ARYTM_2:12
.=
z
by A2, ARYTM_2:15
; verum