# Reciprocal Fibonacci Constant

I am working on a program that calculates the Reciprocal Fibonacci Constant (the infinite summation of the Fibonacci numbers.) It calculates every term upto it's error:

I have an program but it only goes to 1474 terms and I need to get to about 10000 terms. It returns an error:

``````Traceback (most recent call last):
File "/Users/jaddvirji/Desktop/PapaTechChallenges/Challenge2/Part1/main.py", line 23, in        <module>
curf.write(str(Decimal(fibConstant(x))))
File "/Users/jaddvirji/Desktop/PapaTechChallenges/Challenge2/Part1/main.py", line 18, in     fibConstant
return (1.0 / fib(n)) + fibConstant(n - 1.0)
File "/Users/jaddvirji/Desktop/PapaTechChallenges/Challenge2/Part1/main.py", line 12, in   fib
return long(((phi**n) - (1-phi)**n) / 5**0.5)

OverflowError: (34, 'Result too large')
``````

And my code is:

``````#!/usr/bin/env python

from decimal import *
import time as t
import sys
sys.setrecursionlimit(10000)

phi = (1+(5**0.5))/2

def fib(n):
return long(((phi**n) - (1-phi)**n) / 5**0.5)

def fibConstant(n):
if(n == 1):
return (1.0 / fib(n))
else:
return (1.0 / fib(n)) + fibConstant(n - 1.0)

x = 1
while True:
curf = open(str(x)+" term.txt","w")
curf.write(str(Decimal(fibConstant(x))))
curf.close()
x = x+1
print Decimal(x)

print "DONE. THANKS FOR USING."
``````

Also, Every result from about 200 terms above is the same (and wrong.)

Does anybody know how to fix these problems?

EDIT: I have a feeling that the problems after ~200 terms are because of floating point errors with the Binet Fibonacci calculation. How do I make these decimals go on forever?

-
In Python you should convert your algorithm from recursive to iterative. –  Paulo Scardine Jun 26 '13 at 17:16
see stackoverflow.com/questions/494594/… for generator-expressions. –  Fredrik Pihl Jun 26 '13 at 17:18
Why would you do `while True` when you could do `for x in xrange(1,10001)`? A `while True` loop would go forever - not your only problem, but... –  2rs2ts Jun 26 '13 at 18:14

Try storing the values of `fibConstant` in a list. Then for each subsequent calculation, you only need to call the last value of the list instead of recalculating. For example:

``````from math import sqrt

phi = (1 + sqrt(5)) / 2.

def fib(n):
return (phi**n - (1-phi)**n) / sqrt(5)

fib_constant_list = [1./fib(1)]
def fib_constant(n):
new_fib_c = (1./fib(n) + fib_constant_list[-1])
fib_constant_list.append(new_fib_c)
return new_fib_c

n = 2
N_MAX = 1000
while n < N_MAX:
print fib_constant(n)
``````
-
not working, please give code which works out of the box! :-) –  ultimatetechie Jun 26 '13 at 17:46
I gave you some pseudocode with all the relevant parts you needed to implement your own solution. However, this code does now work. –  Bill Jun 26 '13 at 18:08
Thanks. Sorry for being thick! –  ultimatetechie Jun 27 '13 at 5:27