let F be sequence of ExtREAL; :: thesis:
defpred S₁[ Nat] means (Ser F) . $1 in REAL ;
assume A1: for n being Element of NAT holds F . n in REAL ; :: thesis:
A2: for s being Nat st S₁[s] holds
S₁[s + 1]

let s be Nat; :: thesis:
reconsider b = F . (s + 1) as Element of REAL by A1;
reconsider y = (Ser F) . s as R_eal ;
assume (Ser F) . s in REAL ; :: thesis:
then reconsider a = y as Element of REAL ;
A3: y + (F . (s + 1)) = a + b by XXREAL_3:def 2;
(Ser F) . (s + 1) = y + (F . (s + 1)) by Def11;
hence S₁[s + 1] by A3; :: thesis:

end;