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I have the following problem: I should compute a fibonacci number mod another given number. I know about the Pisano period and i am trying to implement it here. This is the code:

#include <iostream>
#include <cstdlib>
long long get_fibonaccihuge(long long n, long long m) {
    long long period = 0;
    if (m % 2 == 0) {
        if(m / 2 > 1)
        period = 8 * (m / 2) + 4;
        else
        period = 3; 
    }
    else{
        if(((m + 1) / 2) > 1)
        period = 4 * ((m + 1) / 2);
        else
        period = 1;
    }

    long long final_period = n % period;



    long long array_fib[final_period];
    array_fib[0] = 1;
    array_fib[1] = 1;
    for (long long i = 2; i < final_period; ++i) {
        array_fib[i] = (array_fib[i-1] + array_fib[i-2]) % m;
    }

    return array_fib[final_period - 1];
}

int main() {
    long long n, m;
    std::cin >> n >> m;
    std::cout << get_fibonaccihuge(n, m) << '\n';
}

It works well for small tests but the problem is that it fails the following test:

281621358815590 30524

I do not know why. Any suggestions about the algorithm, I referred to this page. When I was constructing it.

The error which I receive is: wrong result.

Expected: 11963 My result: 28651

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  • 2
    long long array_fib[final_period] uses a g++ language extension (namely C99 variadiac arrays). In standard C++ use std::vector<long long> array_fib(final_period). This is not your logic problem but I thought I should mention it: better post standard code that everyone can try. Apr 17, 2016 at 10:16
  • I know that the mistake should be at the moment when I obtain the number mod period,
    – StefanL19
    Apr 17, 2016 at 10:26
  • What fails? Run time error? Wrong result? What is your output?
    – Ely
    Apr 17, 2016 at 10:39
  • 2
    What is your result? What is the expected result?
    – Ely
    Apr 17, 2016 at 10:41
  • Add that to your question, I'd suggest.
    – Ely
    Apr 17, 2016 at 10:42

1 Answer 1

2

Unless your task is to use Pisano periods, I would suggest you to use a more common known way to calculate n-th Fibonacci number in log2(n) steps (by computing powers of 2*2 matrix: https://en.wikipedia.org/wiki/Fibonacci_number#Matrix_form).

There are two reasons:

  1. It's a simpler algorithm and that means that it will be easier to debug the program
  2. For the numbers you mentioned as an example it should be faster (log2(n) is somewhere about 50 and m/2 is significantly more).
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  • Does this approach keep the numbers within 64 bits integer size? Apr 17, 2016 at 11:55
  • @Cheersandhth.-Alf: All intermediate numbers will be less that m*m, so 64-bit numbers will be enough. The biggest number will be the n itself but it's within 64-bit range too.
    – maxim1000
    Apr 17, 2016 at 18:21

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