# Fast way to find exponent of nearest superior power of 2

If I have a number a, I want the value of x in b=2^x, where b is the next power of 2 greater than a.

In case you missed the tag, this is Java, and a is an int. I'm looking for the fastest way to do this. My solution thusfar is to use bit-twiddling to get b, then do (int)(log(b)/log(2)), but I feel like there has to be a faster method that doesn't involve dividing two floating-point numbers.

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What's the range of `x` values? What's the type of `a`? –  Jon Skeet Mar 9 '11 at 7:21
As I said in the question, a is an int. x is strictly non-negative. –  Andy Shulman Mar 9 '11 at 7:36
@Andy: Where did you say it in the question? You said you have a number `a`. It could have been a `short`, a `long` or even be `BigInteger`. Can it be `Integer.MAX_VALUE`, in which case `x` can be 32, but no higher? –  Jon Skeet Mar 9 '11 at 7:37
"In case you missed the tag, this is Java, and a is an int." And yes, x is from 0 to 32. –  Andy Shulman Mar 9 '11 at 7:41
I've assumed you mean "next power of 2 greater than or equal to a", and that a is unsigned, and that a is 32 bits. –  Mike Dunlavey Mar 9 '11 at 13:41
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What about `a == 0 ? 0 : 32 - Integer.numberOfLeadingZeros(a - 1)`? That avoids floating point entirely. If you know `a` is never 0, you can leave off the first part.

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I know a is nonzero, so I can just go with `32 - Integer.numberOfLeadingZeros(a - 1)`. This looks perfect. Never knew that method existed. Thank you! –  Andy Shulman Mar 9 '11 at 7:35

If anyone is looking for some "bit-twiddling" code that Andy mentions, that could look something like this: (if people have better ways, you should share!)

``````    public static int nextPowerOf2(final int a)
{
int b = 1;
while (b < a)
{
b = b << 1;
}
return b;
}
``````
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just do the following:

extract the highest bit by using this method (modified from hdcode):

``````int msb(int x) {
if (pow2(x)) return x;
x = x | (x >> 1);
x = x | (x >> 2);
x = x | (x >> 4);
x = x | (x >> 8);
x = x | (x >> 16);
x = x | (x >> 24);
return x - (x >> 1);
}

int pow2(int n) {
return (n) & (n-1) == 0;
}
``````

combining both functions into this function to get a number 'b', that is the next power of 2 of a given number 'a':

``````int log2(int x) {
int pow = 0;
if(x >= (1 << 16)) { x >>= 16; pow +=  16;}
if(x >= (1 << 8 )) { x >>=  8; pow +=   8;}
if(x >= (1 << 4 )) { x >>=  4; pow +=   4;}
if(x >= (1 << 2 )) { x >>=  2; pow +=   2;}
if(x >= (1 << 1 )) { x >>=  1; pow +=   1;}
return pow;
}
``````

kind regards, dave

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If you need an answer that works for integers or floating point, both of these should work:

I would think that `Math.floor(Math.log(a) * 1.4426950408889634073599246810019) + 1` would be your best bet if you don't want to do bit twiddling.

If you do want to bit-twiddle, you can use `Double.doubleToLongBits(a)` and then just extract the exponent. I'm thinking `((Double.doubleRawToLongBits(a) >>> 52) & 0x7ff) - 1022` should do the trick.

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``````b = 0;
if (a >= 65536){a /= 65536; b += 16;}
if (a >= 256){a /= 256; b += 8;}
if (a >= 16){a /= 16; b += 4;}
if (a >= 4){a /= 4; b += 2;}
if (a >= 2){a /= 2; b += 1;}
``````

Assuming `a` is unsigned, the divides should just be bit-shifts.

A binary IF-tree with 32 leaves should be even faster, getting the answer in 5 comparisons. Something like:

``````if (a >= (1<<0x10)){
if (a >= (1<<0x18)){
if (a >= (1<<0x1C)){
if (a >= (1<<0x1E)){
if (a >= (1<<0x1F)){
b = 0x1F;
} else {
b = 0x1E;
}
} else {
if (a >= (1<<0x1D)){
b = 0x1D;
} else {
b = 0x1C;
}
}
etc. etc.
``````
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