Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

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.

share|improve this question
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

3 Answers 3

up vote 3 down vote accepted

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.

share|improve this answer

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)


(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.

share|improve this answer
/* 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) */

    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.

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.