# Binary math

If I know the number number y and know that 2^x=y, how do I compute x?

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Why do you call it "Binary" math? –  Roee Adler May 15 '09 at 11:49
Because the origin of 2^ numbers is that they are essentially binary. x+1 tells me how long the binary number is (1 is 1, 2 is 2, 4 is 3, 8 is 4). –  Johan Öbrink May 15 '09 at 16:13
this is absolutely ridiculous. –  SilentGhost May 18 '09 at 14:05

Base 2 logarithm function:

``````log2(y)
``````

which is equivalent to:

``````log(y) / log(2)
``````

for arbitrary base.

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That log trick is so handy... I was always wondering how to do arbitrary base logs on calculators. –  Zifre May 15 '09 at 11:32
Thanks! I was actually on to that answer but my check on the calculator told me otherwise. I then realised the calculator uses log10. –  Johan Öbrink May 15 '09 at 11:42
BTW, I have a question : don't you have to ensure that parameters you provide to log2 are strictly positive ? –  yves Baumes May 15 '09 at 12:03
@yves: It's a math question and it's not concerned about implementation details. log is not defined for negative numbers (not considering complex numbers, of course), so yes, you might want to validate the input in real world applications. –  Mehrdad Afshari May 15 '09 at 12:09
If we add negative numbers into the picture: technick.net/public/code/… –  Mehrdad Afshari May 15 '09 at 12:11

And in case you don't have a `log` function handy, you can always see how many times you must divide y by 2 before it becomes 1. (This assumes x is positive and an integer.)

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Brute force approach, always good :) Probably quicker for small values of y than trying to take a log as well (optimisation anyone? 'if y < 1000000 do_division() else take_log()' :)) –  workmad3 May 15 '09 at 11:37
Funny, that. If you have a coprocessor, the threshold where the log is faster will be fairly low. –  Artelius May 16 '09 at 11:11

If you are sure that it is a power of 2, then you can write a loop and right shift the number until you get a 1. The number of times the loop ran will be the value of x.

Example code:

``````int power(int num)
{
if(0 == num)
{
return 0;
}

int count = 0;
do
{
++count;
num = num >> 1;
}while(! (num & 1) && num > 0);
return count;
}
``````
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Yeah, provided that x is guaranteed to be an integer of course. This would be the most efficient method in that case. –  Noldorin May 15 '09 at 11:23
Most processors have built in way for doing this in a single instruction (`bsr` in x86, for instance) –  Mehrdad Afshari May 15 '09 at 11:26

If x is a positive integer, then, following code will be more efficient..

``````   unsigned int y; // You know the number y for which you require x..
unsigned int x = 0;

while (y >>= 1)
{
x++;
}
``````