begin 

procedure EULER (FCT,SUM,EPS,TIM); value EPS,TIM; integer TIM;
real PROCEDURE FCT; real SUM,EPS;
comment EULER COMPUTES THE SUM OF FCT(I) FOR I FROM ZERO UP TO
INFINITY BY MEANS OF A SUITABLY REFINED EULER TRANSFORMATION. tHE
SUMMATION IS STOPPED AS SOON AS TIM TIMES IN SUCCESSION THE ABSOLUTE
VALUE OF THE TERMS OF THE TRANSFORMED SERIES ARE FOUND TO BE LESS THAN
EPS. hENCE, ONE SHOULD PROVIDE A FUNCTION FCT WITH ONE INTEGER ARGUMENT,
AN UPPER BOUND EPS, AND AN INTEGER TIM. tHE OUTPUT IS THE SUM SUM. EULER
IS PARTICULARLY EFFICIENT IN THE CASE OF A SLOWLY CONVERGENT OR
DIVERGENT ALTERNATING SERIES;
begin integer I,K,N,T; array M[0:15]; real MN,MP,DS;
I:=N:=T:=0; M[0]:=FCT(0); SUM:=M[0]/2;
NEXTTERM: I:=I+1; MN:=FCT(I);
        for K:=0 step 1 until N do 
            begin MP:=(MN+M[K])/2; M[K]:=MN;
                MN:=MP end;
        if (ABS(MN)<ABS(M[N])) & (N<15) then 
            begin DS:=MN/2; N:=N+1; M[N]:=MN end 
        else DS:=MN;
        SUM:=SUM+DS;
        if ABS(DS)<EPS then T:=T+1 else T:=0;
        if T<TIM then goto NEXTTERM
end;

procedure INV(V) ; INV := 1.0/((V+1)^2);

real RESULT;
EULER(INV, RESULT, 0.00005, 10);
PRINTNLN(RESULT);

end