How can I find perfect power of two between two numbers? Sample input: 0 and 10 Output: 2, 4, 8
Well the interesting part is "How do I get the greatest power of 2 that is less than or equal to my upper bound" and the same for the lowest power of 2 that is greater or equal to the lower bound. And well, that's easily done without loops. For unsigned 32bit numbers:
You won't get around the loop for outputting the numbers though, but oh well. 


Find the highest bit set to 1 in first number, say it is at position x counting from lowest bit. Then find the highest bit set to 1 in the second number, say it is at position y. The numbers 2^{x+1}, 2^{x+2}..., 2^{y} are the numbers you're looking for 


You can use the binary representations of the numbers and output all the numbers between where only one bit is set:
So your problem is reduced to finding the first power of two larger than the minimum and then shifting left while you're smaller than the maximum. Alternatively, unset all the set bits in the maximum value except the highest one and then shift right while you're larger than the minimum. 


How many times can you bitshift before getting to 0? 


Steps :
Sample python code :






2
divides a number with the log, base 2. round(lg(B)  lg(A)) is what you need. – Nick Dandoulakis Mar 31 '11 at 11:55