i know that if number is power of two,then it must satisfy (x&(x1))=0;
for example let's take x=16 or 10000
x16=100001=01111
and (x&(x1))=0; for another non power number 7 for example, 7=0111
,71=0110
7&(71)=0110
which is not equal 0,my question how can i determine if number is some power of another number k? for example 625 is 5^4,and also how can i find in which power is equal k to n?i am interested using bitwise operators,sure i can find it by brute force methods(by standard algorithm,thanks a lot



For arbitrary
When And if computational speed is important and your



I doubt you're going to find a bitwise algorithm for determining that a number is a power of 5. In general, given
If 


I'm afraid, you can't do that with just simple bit magic. Bits are typically good for powers of 2. For powers of, say, 5 you'd probably need to operate in base5 system, where 1_{5}=1_{10}, 10_{5}=5_{10}, 100_{5}=25_{10}, 1000_{5}=125_{10}, 10000_{5}=625_{10}, etc. In base5 system you can recognize powers of 5 just as easily as powers of 2 in binary. But you'd first need to convert your numbers to that base. 

