# Time Complexity of an Algorithm

Here is problem in which we have to calculate the time complexity of given function

``````f(i) = 2*f(i+1) + 3*f(i+2)
For (int i=0; i < n; i++)
F[i] = 2*f[i+1]
``````

What i think is the complexity of this algorithm is O(2^n) + O(n) which ultimately is O(2^n). Please correct me if i am wrong?

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What exactly do you want to calculate?. What is the input and the output? Any way here I can only see a simple loop, so it looks like O(n) Please, clarify the problem. –  jbaylina Aug 31 '13 at 10:14
The way you presented the your question is not clear: `2 * f(i + 1)` means two recursive calls of `f(i + 1)` or literally `2` times the value returned by `f(i + 1)`? –  Mohamed Ennahdi El Idrissi Mar 14 '14 at 3:30

Firstly, all the information you required to work these out in future is here.

To answer your question. Because you have not provided a definition of f(i) in terms of I itself it is impossible to determine the actual complexity from what you have written above. However, in general for loops like

``````for (i = 0; i < N; i++) {
sequence of statements
}
``````

executes N times, so the sequence of statements also executes N times. If we assume the statements are O(1), the total time for the for loop is N * O(1), which is O(N) overall. In your case above, if I take the liberty of re-writing it as

``````f(0) = 0;
f(1) = 1;
f(i+2) = 2*f(i+1) + 3*f(i)
for (int i=0; i < n; i++)
f[i] = 2*f[i+2]
``````

Then we have a well defined sequence of operations and it should be clear that the complexity for the n operations is, like the example I have given above, n * O(1), which is O(n).

I hope this helps.

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