let F be XFinSequence; ( F is real-valued implies Sum F = addreal "**" F )
assume A1:
F is real-valued
; Sum F = addreal "**" F
then
rng F c= REAL
by VALUED_0:def 3;
then A3:
F is REAL -valued
by RELAT_1:def 19;
rng F c= COMPLEX
by MEMBERED:1, A1;
then A4:
F is COMPLEX -valued
by RELAT_1:def 19;
per cases
( len F = 0 or len F >= 1 )
by NAT_1:14;
suppose A6:
len F >= 1
;
Sum F = addreal "**" FA7:
REAL = REAL /\ COMPLEX
by XBOOLE_1:28, MEMBERED:1;
now let x,
y be
set ;
( x in REAL & y in REAL implies ( addreal . x,y = addcomplex . x,y & addreal . x,y in REAL ) )assume
(
x in REAL &
y in REAL )
;
( addreal . x,y = addcomplex . x,y & addreal . x,y in REAL )then reconsider X =
x,
Y =
y as
Element of
REAL ;
addreal . x,
y = X + Y
by BINOP_2:def 9;
hence
(
addreal . x,
y = addcomplex . x,
y &
addreal . x,
y in REAL )
by BINOP_2:def 3;
verum end; hence
Sum F = addreal "**" F
by Th60, A6, A7, A3;
verum end;