# Algo for finding power i.e. n^p [closed]

An algorithm for finding n^p is:

``````unsigned long long power(unsigned n, unsigned p)
{
unsigned long long x=1, y=n;
while(p > 0)
{
if(p&1) x *= y;
y *= y;
p >>= 1;
}
return x;
}
``````

Can somebody explain the logic/math behind this algorithm. I know it works and worked it out for a few test cases (dry run). I mean how does it work and how is this efficient from the general naive method.

-
This is O(log n) compared to O(n) of naive method. It will halves the exponent in every iteration. –  nhahtdh Dec 24 '12 at 14:29
IITian asking a question, then it must be difficult :p –  Anoop Vaidya Dec 24 '12 at 14:30
Why don't you printf x, y & p, per iteration? That will easily help you understand. This code basically would find iterate through the individual bits of p, instead of running loop for i=0 to p. –  anishsane Dec 24 '12 at 14:30
Gopi you should try printing each variable in the loop, then you will know how shift operator with 1 bit is changed...and the resultant is formed in x. –  Anoop Vaidya Dec 24 '12 at 14:31
btw, +1 for the algorithm... I was not aware of this algo. Seems easy after reading it :-) –  anishsane Dec 24 '12 at 14:37

## closed as too localized by WhozCraig, H2CO3, Andrew Barber♦, Tristram Gräbener, Praveen KumarDec 24 '12 at 17:46

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This is exponentiation by squaring: the `>>= 1` is a fancy way to write `/= 2`.
The idea behind it is that if `p` is even, you can take `n^(p/2)` and square it; when `p` is odd, `p-1` must be even, so you can take `n^((p-1)/2)`, square it, and then multiply the result by `n` to compensate for the `1` that you subtracted from `p` before squaring.
Yep, I know its `/=2` and that `(p&1)` checks if its odd, but I wanted to know the logic behind it and its complexity –  gopi1410 Dec 24 '12 at 14:30