# nth term for Fibonacci series for enormous data input(Without Recursion or loop) [duplicate]

Possible Duplicate:
nth fibonacci number in sublinear time

I was creating a program which is related to the stair problem i.e u have n stairs and the player can climb on the stairs using them one by one or skiping one ...

Now to solve this problem I needed nth (n+1)th term for the Fibonacci for n number of stairs, But the problem is my input range is 1<= n <=1000000.

and for that much greater value of n if i use the loop based method or recursion to calculate the Fibonacci the method takes very much time and space. that i donot have ..

So please can you tell me some method in the Java or C to handle Fibonacci series upto that range with correct output ...

Note: Please i do not need any solution which has recursion or loop.

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## marked as duplicate by amit, ecatmur, Oliver Charlesworth, Daniel Fischer, LundinFeb 4 '13 at 15:43

You need some form of recursion or loop, but you can do it in `O(log n)` steps. Is that good enough? –  Daniel Fischer Feb 4 '13 at 14:59
It's trivial, select your favourite closed form for `Fn`, perhaps start reading here: mathworld.wolfram.com/FibonacciNumber.html –  High Performance Mark Feb 4 '13 at 15:01
Note that Fn(1,000,000) is ~ e^(480,400) ... a very large number. Take care not to hit overflow problems. –  Mikeb Feb 4 '13 at 15:05
@HighPerformanceMark While closed form is neat mathematically, when it comes to computing it is also `O(logN)` because it requires invoking exponent (which is O(logN) AFAIK), and is very numerically unstable because it involves real numebrs which are approximated using floating points (or fixed point - it will still be an approximation) –  amit Feb 4 '13 at 15:08
It's very simple... just tell me (n-1)th & (n-2)th terms ;) –  anishsane Feb 4 '13 at 15:10