consider x1, x2, y1, y2 being Element of REAL such that
A10:
x = [*x1,x2*]
and
A11:
y = [*y1,y2*]
and
A12:
x * y = [*(+ ((* (x1,y1)),(opp (* (x2,y2))))),(+ ((* (x1,y2)),(* (x2,y1))))*]
by XCMPLX_0:def 5;
x2 = 0
by A10, Lm1;
then A13:
* (x2,y1) = 0
by ARYTM_0:14;
A14:
y2 = 0
by A11, Lm1;
then
* ((opp x2),y2) = 0
by ARYTM_0:14;
then A15:
opp (* (x2,y2)) = 0
by ARYTM_0:17;
* (x1,y2) = 0
by A14, ARYTM_0:14;
then
+ ((* (x1,y2)),(* (x2,y1))) = 0
by A13, ARYTM_0:13;
then x * y =
+ ((* (x1,y1)),0)
by A12, A15, ARYTM_0:def 7
.=
* (x1,y1)
by ARYTM_0:13
;
hence
x * y is real
by Def1; verum