# Using bit manipulation to tell if an unsigned integer can be expressed in the form 2^n-1

To test if an unsigned integer is of the form `2^n-1` we use:

``````x&(x+1)
``````

What is that supposed to equal? That is,

``````x&(x+1) == ?
``````
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In complement to the existing answers, here is a short explanation of why numbers `x` that are not of the form `0b00000` (zero) or `0b0111..11` (all lowest digits set, these are all the numbers 2^n-1 for n>0) do not have the property `x&(x+1) == 0`.

For a number `x` of the form `0b????1000..00`, `x+1` has the same digits as `x` except for the least significant bit, so `x & (x+1)` has at least one bit set, the bit that was displayed as being set in `x`. By way of shorter explanation:

``````x       0b????1000..00
x+1     0b????1000..01
x&(x+1) 0b????10000000
``````

For a number `x` of the form `0b????10111..11`:

``````x       0b????10111..11
x+1     0b????110000000
x&(x+1) 0b????10000..00
``````

In conclusion, if `x` is not either zero or written in binary with all lowest digits set, then `x&(x+1)` is not zero.

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+1 because both sides of the explanation are important! –  psmears Jun 20 '10 at 20:58

A number of the form `2^n-1` will have all of the bits up to the nth bit set. For example, `2^3-1` (7) is:

``````0b0111
``````

If we add one to this, we get 8:

``````0b1000
``````

Then, performing a bitwise and, we see that we get zero, because no bit is set on in both numbers. If we start with a number not of the form `2^n+1`, then the result will be nonzero.

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I think you meant `2^n-1` at the beginning –  Michael Mrozek Jun 20 '10 at 19:08
@Michael: Quite right. Thank you. –  James McNellis Jun 20 '10 at 19:10
thanks everybody –  dato datuashvili Jun 20 '10 at 19:29
While you and the other answerer do a good job of explaining why it's necessary that `x&(x+1)==0` for `x` to be of the form `2^n-1`, neither of you even allude to the sufficiency of the property. Or in other terms, why can't a number `x` that is not written `0b0111..11` not have the property `x&(x+1)==0` ? –  Pascal Cuoq Jun 20 '10 at 19:53
@Pascal: If you'd like to answer and go into greater detail, I'd be happy to upvote such an answer. :-) –  James McNellis Jun 20 '10 at 20:07

Zero. If X is 2^N-1, it is an unbroken string of 1's in binary. One more than that is a 1 followed by a string of zeroes same length as X, so the two numbers have no 1 bits in common in any location, so the AND of the two is zero.

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