How did Python implement the built-in function pow()?

I have to write a program to calculate `a**b % c` where `b` and `c` are both very large numbers. If I just use `a**b % c`, it's really slow. Then I found that the built-in function `pow()` can do this really fast by calling `pow(a, b, c)`.
I'm curious to know how does Python implement this? Or where could I find the source code file that implement this function?

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The cpython source repo is at hg.python.org/cpython –  Wooble Mar 9 '11 at 14:07
...under Objects/longobject.c:long_pow() (as JimB had already commented). –  smci Jul 19 '11 at 20:45

If `a`, `b` and `c` are integers, the implementation can be made more efficient by binary exponentiation and reducing modulo `c` in each step, including the first one (i.e. reducing `a` modulo `c` before you even start). This is what the implementation of `long_pow()` does indeed.

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Line 1426 of this file shows the Python code that implements math.pow, but basically it boils down to it calling the standard C library which probably has a highly optimized version of that function.

Python can be quite slow for intensive number-crunching, but Psyco can give you a quite speed boost, it won't be as good as C code calling the standard library though.

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`math.pow()` does't have the modulo argument, and isn't the same function as the builtin `pow()`. Also FYI, Psyco is getting pretty stale, and no 64-bit support. NumPy is great for serious math. –  JimB Mar 9 '11 at 14:30

I uses C math libraries for the general case and it's own logic for some of it's concepts like infinity.

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I don't know about python, but if you need fast powers, you can use exponentiation by squaring:

http://en.wikipedia.org/wiki/Exponentiation_by_squaring

It's a simple recursive method that uses the commutative property of exponents.

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yeah you are very true...

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You might consider the following two implementations for computing `(x ** y) % z` quickly.

In Python:

``````def pow_mod(x, y, z):
"Calculate (x ** y) % z efficiently."
number = 1
while y:
if y & 1:
number = number * x % z
y >>= 1
x = x * x % z
return number
``````

In C:

``````#include <stdio.h>

unsigned long pow_mod(unsigned short x, unsigned long y, unsigned short z)
{
unsigned long number = 1;
while (y)
{
if (y & 1)
number = number * x % z;
y >>= 1;
x = (unsigned long)x * x % z;
}
return number;
}

int main()
{
printf("%d\n", pow_mod(63437, 3935969939, 20628));
return 0;
}
``````
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thanks! this is helpful. –  wong2 May 11 '12 at 3:47
@Noctis, I tried running your Python implementation and got this:TypeError: ufunc 'bitwise_and' not supported for the input types, and the inputs could not be safely coerced to any supported types according to the casting rule ''safe'' ---- As I'm learning Python right now, I thought you might have an idea about this error (a search suggests it might be a bug but I'm thinking that there's a quick workaround) –  stackuser May 7 '13 at 2:24
@stackuser: It appears to be working fine in the following demonstration: ideone.com/sYzqZN –  Noctis Skytower May 7 '13 at 12:50