# Bit twiddling in C: how to convert from 2^N to N?

What is a good bit-twiddling routine to convert a number in the range [2^N,2^(N-1)-1] to N?

Some examples:

• f(1) -> 0
• f([2-3]) -> 1
• f([4-7]) -> 2
• f([8-15]) -> 3

Here is one implementation:

``````uint f(uint num)
{
for (uint shifts = 0; num; shifts++)
num >>= 1;
return (shifts - 1);
}
``````
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possible duplicate of How to get lg2 of a number that is 2^k –  KennyTM Nov 13 '10 at 18:27
do you mean "range [2^N-1, 2^(N-1)]"? –  pmg Nov 13 '10 at 18:31
I'd guess `[2^N,2^(N+1)-1]` is the more appropriate range –  Jeff Mercado Nov 13 '10 at 18:35

Depending on how wide your data-type is, and how much memory you have available, a lookup-table is one possibility. It's almost certainly the fastest approach.

For other approaches, see http://www-graphics.stanford.edu/~seander/bithacks.html#IntegerLogObvious, and the subsequent sections.

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As most general approach, binary search may help. For values 0..31 it need only 5 stages.

``````y = 0;
if(x >= 0x10000<<y) y += 0x10;
if(x >= 0x100<<y) y += 0x08;
if(x >= 0x10<<y) y += 0x04;
if(x >= 0x4<<y) y += 0x02;
if(x >= 0x2<<y) y += 0x01;
``````
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Take a look at hacks for computing base 2 logarithm (or leading zero count, they are the same) on this page: http://www-graphics.stanford.edu/~seander/bithacks.html

You could also find useful the function `__builtin_clz` (or `_BitScanReverse` for VS) for x86.

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