let g1, g2 be Real; :: thesis: ( ( for seq being Real_Sequence st seq is divergent_to-infty & rng seq c= dom f holds
( f /* seq is convergent & lim (f /* seq) = g1 ) ) & ( for seq being Real_Sequence st seq is divergent_to-infty & rng seq c= dom f holds
( f /* seq is convergent & lim (f /* seq) = g2 ) ) implies g1 = g2 )
assume that
A2: for seq being Real_Sequence st seq is divergent_to-infty & rng seq c= dom f holds
( f /* seq is convergent & lim (f /* seq) = g1 ) and
A3: for seq being Real_Sequence st seq is divergent_to-infty & rng seq c= dom f holds
( f /* seq is convergent & lim (f /* seq) = g2 ) ; :: thesis: g1 = g2
defpred S1[ Element of NAT , real number ] means ( $2 < - $1 & $2 in dom f );
A4: for n being Element of NAT ex r being Real st S1[n,r] by A1, Def9;
consider s1 being Real_Sequence such that
A6: for n being Element of NAT holds S1[n,s1 . n] from FUNCT_2:sch 3(A4);
 deffunc H1( Element of NAT ) -> Element of REAL = - $1;
consider s2 being Real_Sequence such that
A7: for n being Element of NAT holds s2 . n = H1(n) from SEQ_1:sch 1();
now
let n be Element of NAT ; :: thesis: s1 . n <= s2 . n
s1 . n < - n by A6;
hence s1 . n <= s2 . n by A7; :: thesis: verum
end;
then A9: s1 is divergent_to-infty by A7, Th48, Th70;
A10: rng s1 c= dom f
proof
let x be real number ; :: according to MEMBERED:def 9 :: thesis: ( not x in rng s1 or x in dom f )
assume x in rng s1 ; :: thesis: x in dom f
then ex n being Element of NAT st x = s1 . n by FUNCT_2:190;
hence x in dom f by A6; :: thesis: verum
end;
then lim (f /* s1) = g1 by A2, A9;
hence g1 = g2 by A3, A9, A10; :: thesis: verum