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we have to find the nth term of this series


answer should be modulo 1000000007

i have written the code but time limit exceeds when n a is huge number.

using namespace std

int main()
    long long int n;

    long long int a,b,c;

    int i;

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Any chance you could paste in a cleaner code sample than this one, using proper indentation and avoiding the excessive white space? – Robert Harvey Jul 1 '12 at 20:56
What does this have to do with dynamic programming? – Mathias Jul 1 '12 at 20:58
Two simple optimizations -- you can start out doing three steps for each iteration in your loop with no copies, doing "c=2(a+b)..." "b=2(c+a)..." "a=2(b+c)...". You can also then do the mod only once per loop, on c in the first step. That should more than double your speed. – David Schwartz Jul 1 '12 at 21:06
? sorry dude, you are misunderstand the DP meaning. Dp is about storing computed values in order to use them in futur computation and not having to compute them again. – Samy Arous Jul 1 '12 at 21:12
@lcfseth… – Jim Balter Jul 2 '12 at 0:18
up vote 9 down vote accepted

The standard technique for solving this type of problem is to rewrite it as a matrix multiplication and then use exponentiation by squaring to efficiently compute powers of the matrix.

In this case:

a(n+2) = 2 a(n+1) + 2 a(n)
a(n+1) = a(n+1)

(a(n+2)) = (2  2) * ( a(n+1) )
(a(n+1))   (1  0)   ( a(n)   )

So if we define the matrix A=[2,2 ; 1,0], then you can compute the n th term by

[1,0] * A^(n-2) * [3;1]

All of these operations can be done modulo 1000000007 so no big number library is required.

It requires O(log(n)) 2*2 matrix multiplications to compute A^N, so overall this method is O(log(n)), while your original method was O(n).


Here is a good explanation and a C++ implementation of this method.

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Here I've answered a similar question, but additionally utilising Euler's Theorem. 1000...07 is a prime number, so you don't have to compute A^N but A^(N % (p-1)) is enough. That way the method becomes O(1) (or O(p) but p is constant) instead of O(log(n)). – Unapiedra Oct 10 '14 at 14:25

When long long is not enough, you probably want to use a bignum library. For example GNU MP.

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but we have to give answer modulo 1000000007 – user1484638 Jul 1 '12 at 21:01
Not only is long long int enough but I belive unsigned long int is also sufficient since the max possible value is 4*10000007 < 4294967295. – Samy Arous Jul 1 '12 at 21:04
ok..can you suggest an approach for this problem – user1484638 Jul 1 '12 at 21:06

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