Just out of curiosity, how can you tell if a number x is a power of two (x = 2^n) without using recursion.
Thanks
Just out of curiosity, how can you tell if a number x is a power of two (x = 2^n) without using recursion. Thanks 


One way is to use bitwise AND. If a number
Note: This will give a false positive for $x == 0. 


Subtract 1 from the number, then and it with the original number. If the result is zero, it was a power of two.
(sorry, my PHP is rusty...) 


For completeness, if the number is a float, you can test if it's a power of two by chacking if the mantissa is all zeros:
Exercise for the reader: corner cases and bigendian machines. 


If it's a power of 2? Well, one way is to convert it to binary, and verify the presence of only 1





