I have an integer input that is power of 2 (1, 2, 4, 8 etc). I want the function to return bit position without using log(). For example, for inputs above will return {0, 1, 2, 3} respectively This for C#. Plus if this can be done in SQL.
Thanks!
I have an integer input that is power of 2 (1, 2, 4, 8 etc). I want the function to return bit position without using log(). For example, for inputs above will return {0, 1, 2, 3} respectively This for C#. Plus if this can be done in SQL. Thanks! 

The fastest code I found to do this is from the Bit Twiddling Hacks site. Specifically, the lookup based on the DeBruijn sequence. See http://graphics.stanford.edu/~seander/bithacks.html#IntegerLogDeBruijn I tested a naive method, a switchbased method, and two of the Bit Twiddling Hacks methods: the DeBruijn sequence, and the other that says, "if you know your value is a power of two." I ran all of these against an array of 32 million powers of two. That is, integers of the form 2^N, where N is in the range 0..30. A value of 2^31 is a negative number, which causes the naive method to go into an infinite loop. I compiled the code with Visual Studio 2010 in release mode and ran it without the debugger (i.e. Ctrl+F5). On my system, the averages over several dozen runs are:
It's clear that the DeBruijn sequence method is much faster than any of the others. The other Bithack method is inferior here because the conversion from C to C# results in some inefficiencies. For example, the C statement Here's the code.
If I optimize the Bithack code by unrolling the loop and using constants instead of array lookups, its time is the same as the time for the switch statement method.



This is a CPU friendly way to do it:
For SQL, use 


Verbose code, but probably the fastest:
This involves no division, nor conversion tofrom double. It requires only comparisons, which are very speedy. See Code Complete, 2nd edition, page 633, for a discussion. If you know that the input will always be a power of two, you might get better performance from a switch block:
I tested the performance on 10 million random ints, and on 10 million randomlyselected powers of two. The results:
I increased the number of iterations by ten times, and got these results:
Now I didn't do any profiling to see if I did something stupid in translating the bit hacks to C# code, nor to see how much of the execution time is spent in the function that computes the log. So this is just a backoftheenvelope kind of calculation, but it does suggest that the if approach is about the same as the bit hacks algorithms, and switch is a bit faster. Additionally, the if and switch approaches are far easier to understand and maintain. 


I don't have VS on my Mac to test this out, but did you want something like this?



0] if number is zero or negative, return/throw error 1] In your language, find the construct that converts a number to base 2. 2] convert the base2 value to string 3] return the length of the string minus 1. 


Math.Log
from C#? – Ritch Melton Apr 13 '12 at 23:10