# What is the fastest algorithm to find the power of positive integers? [duplicate]

The only two methods that I know is,

1. A single for loop: extremely slow

2. Rewrite recursively calculate.

I wonder is there a faster algorithm than these two? Any bitwise technique are welcome. Thank you.

C# demos for the two algorithms:

``````     class Math {
static public Int64 recurPow( Int64 a, Int64 e ) {
if ( e == 0 )
return 1;
if ( e == 1 )
return a;
if ( ( e % 2 ) == 0 )
return recurPow( a * a, e / 2 );
else
return recurPow( a * a, ( e - 1 ) / 2 );
}

static public Int64 iterPow( Int64 a, Int64 e ) {
Int64 result = a;
for ( Int64 i = 1; i < e; ++i )
result *= a;
return result;
}
}
``````
-

## marked as duplicate by John Zwinck, Rhino, lwburk, Alexandre C., bmarguliesApr 25 '11 at 0:37

@John Zwinck: Thanks a lot. I searched 3 times but couldn't find that thread. –  Chan Apr 24 '11 at 23:42
The fastest algorithm is almost always a pre-computed table lookup :-) –  paxdiablo Apr 25 '11 at 0:01
I believe second recursive call should be like this `recurPow( a * a, ( e - 1 ) / 2 ) * a`. Test it on a = 2, e = 5 –  deniskurt Mar 5 '13 at 22:08