let F be real-valued FinSequence; ( ( for i being Nat st i in dom F holds
0 <= F . i ) implies 0 <= Sum F )
reconsider F1 = F as FinSequence of REAL by Lm2;
set i = len F;
set R1 = (len F) |-> 0;
reconsider R2 = F1 as Element of (len F) -tuples_on REAL by FINSEQ_2:92;
A1:
Seg (len F) = dom F
by FINSEQ_1:def 3;
assume A2:
for i being Nat st i in dom F holds
0 <= F . i
; 0 <= Sum F
for j being Nat st j in Seg (len F) holds
((len F) |-> 0) . j <= R2 . j
by A2, A1;
then
Sum ((len F) |-> 0) <= Sum R2
by Th82;
hence
0 <= Sum F
by Th81; verum