# Getting x raised to the nth power

I'm a newbie and I know that this C program which I got somewhere on the Internet (credits: http://www.geeksforgeeks.org/archives/28) works properly.

``````#include<stdio.h>
``````
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this is a recursive function - google "recursion" –  Jason Jun 29 '12 at 3:40
you should learn debug/breakpoint/watch/step over/step into etc. debugging techniques. and then go debug the code. –  Kinjal Dixit Jun 29 '12 at 3:48

Note that the `y/2` used to calculate temp is integer division. So in your commented questions, the result of 5/2 will be 2, not 2.5.

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It is hard to compete with Wikipedia's explanation of exponentiation by squaring, but here is my take.

The key to the answer is in this formula:

``````a^(b*c) == ((a^b)^c)
``````

This immediately answers the "what to do when the power is even" question: if `y=2*k`, then you could first square `x`, and then raise the result to the power of `k`.

The case of the odd power is a bit more complex: let's rewrite

``````x ^ (2*k+1)
``````

as

``````(x ^ 2*k) * x
``````

Now you see what happens in that `else` branch: they subtract one from the odd number making it even, get `x ^ (y-1)`, and multiply it by `x` in the end.*

Now for the time complexity: each step reduces the `y` by half, so the number of times the recursive call is made is `O(Log2(N))`.

* The implementation does not subtract `1` from `y` explicitly. Rather, it performs an integer division of `y/2`, which discards the remainder of the division.

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``````/* if y is even and positive, e.g., 5, then floor of y/2 is (y-1)/2, e.g. 4/2
then x^((y-1)/2 + (y-1)/2 + 1) = x^y, e.g., x * x^2 * x^2 = x^(1+2+2) = x^5) */
if(y > 0)
return x*temp*temp;

/* if y is even and negative, e.g., -5, then floor of y/2 is (y+1)/2, e.g. -4/2
then x^((y+1)/2 - (y+1)/2 - 1) = x^y, e.g., x^-1 * x^-2 * x^-2 = x^(-1-2-2) = x^-5) */

else
return (temp*temp)/x;
``````

As for the complexity O(lgn), since you are dividing by 2 before each recursive power call, you will do lg(n) calls at most.

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