# NZEC for fibosum(spoj) in python

The code works perfectly fine on my interpreter but gives NZEC on spoj.

``````cases = int(raw_input())
for i in xrange(cases):
k = 0
sq5 = Decimal(sqrt(5))
phi = (1 + sq5)/2                          #Refer wikipedia page for calculating fibonacci numbers
print (int(Decimal(phi)**(m+2)/sq5 + Decimal(0.5)) - int(Decimal(phi)**(n+1)/sq5 + Decimal(0.5)))%1000000007
``````

What am I doing wrong?

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Wrap the line `n,m = map(int,...` inside your for loop in a `try: n,m = map(int,... except: break`. Does this work? –  halex Oct 8 '12 at 13:06
No. It still gives NZEC. –  Shiva Teja Oct 8 '12 at 17:01
The Fibonacci numbers you need for this problem are far too large to be stored accurately in a Decimal at any reasonable precision. (F(10**9) has over 200 million digits!) You need to rethink your approach to the problem. –  Mark Dickinson Oct 8 '12 at 20:04

I suspect you are getting an NZEC because there are extra white spaces in the input. However, it is simple to handle them. Read the input at once and then tokenize it by white spaces.

``````import sys
tokenizedInput = sys.stdin.read().split()    # Delimited by white spaces
cases = int(tokenizedInput[0])
for i in xrange(cases):
k = 0
sq5 = Decimal(sqrt(5))
phi = (1 + sq5)/2                          #Refer wikipedia page for calculating fibonacci numbers
print (int(Decimal(phi)**(m+2)/sq5 + Decimal(0.5)) - int(Decimal(phi)**(n+1)/sq5 + Decimal(0.5)))%1000000007
``````

If you submit this, you should get a TLE. As Mark Dickinson pointed out in the question comment, this is an inefficient algorithm.

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That's probably due to OverflowError

The built-in pow() function, i.e. ** operator, works not well as expected when the value of m in 10^9 is quite large.

``````>>> (1.1)**1000000000

Traceback (most recent call last):
File "<pyshell#0>", line 1, in <module>
1.1**(100000000)
OverflowError: (34, 'Numerical result out of range')
``````

Even math.pow() will not work.

``````>>> import math
>>> math.pow(1.1,1000000000)

Traceback (most recent call last):
File "<pyshell#2>", line 1, in <module>
math.pow(1.1,1000000000)
OverflowError: math range error
``````

Rather go through O(ln m) using Matrix method instead of Binet's Fibonacci Formula. As creating naive function for power in Binet's Formula may end up to O(m)

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