# Round to the nearest power of two

Is there a one line expression (possibly boolean) to get the nearest 2^n number for a given integer??

Example: 5,6,7 must be 8

Thanks

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"One line" in a programming language? Or mathematically? – Sven Marnach Dec 9 '10 at 13:33
What language are you trying to do this in? What have you tried? – Rowland Shaw Dec 9 '10 at 13:33
duplicate of stackoverflow.com/questions/466204/… – Josh Dec 9 '10 at 13:33
In your example, the nearest power of two for 5 is actually 4 (or 2^2). For 6, the answer is ambiguous (may be either 2^2 or 2^3). Can you specify the question a little further? – Gerco Dries Dec 9 '10 at 13:34
@ Gerco Dries: It's legitimate to use a logarithmic scale when considering the nearest power of 2 to a number. On that basis 6 is closer to 2^3 than 2^2. Not saying you are wrong, just an alternate view point. – JeremyP Dec 9 '10 at 14:01

Round up to the next higher power of two: see bit-twiddling hacks.

In C:

``````unsigned int v; // compute the next highest power of 2 of 32-bit v

v--;
v |= v >> 1;
v |= v >> 2;
v |= v >> 4;
v |= v >> 8;
v |= v >> 16;
v++;
``````
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Good solution.... but I wonder why it works?? – Betamoo Dec 9 '10 at 19:50
Because it decrements, then sets all bits below its least significant bit to 1, then it increments. – Jason S Dec 9 '10 at 22:36
er, typo there: it sets all bits below its most significant bit to 1, (not below its least significant bit) – Jason S Dec 10 '10 at 20:47
Becareful when using signed int. Values > 0x4000_0000 will return 0x8000_0000. – Nathan Oct 18 '12 at 23:23
Incidentally, you can right shift by one place at the end to get the next lowest power of 2. – Polynomial Aug 5 '13 at 10:35

I think you mean next nearest 2^n number. You can do a log on the mode 2 and then determine next integer value out of it.

It will depend on which language you are working in. For java it can be:

``````Math.ceil(Math.log(x)/Math.log(2))
``````
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Your requirements are a little confused, the nearest power of 2 to 5 is 4. If what you want is the next power of 2 up from the number, then the following Mathematica expression does what you want:

``````2^Ceiling[Log[2, 5]] => 8
``````

From that it should be straightforward to figure out a one-liner in most programming languages.

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This is roughly equivalent to counting leading zeros.

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Or trailing zeros ? – High Performance Mark Dec 9 '10 at 13:35
No, you're interested in the first non-zero bit. What comes after that doesn't matter. – Ringding Dec 9 '10 at 13:39
D'ohhhhhhhhhhhh – High Performance Mark Dec 9 '10 at 14:02

For next power of two up from a given integer `x`

`2^(int(log(x-1,2))+1)`

or alternatively (if you do not have a `log` function accepting a base argument

`2^(int(log(x-1)/log(2))+1)`

Note that this does not work for x < 2

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This can be done by right shifting on the input number until it becomes 0 and keeping the count of shifts. This will give the position of the most significant 1 bit. Getting 2 to the power of this number will give us the next nearest power of 2.

``````public int NextPowerOf2(int number) {
int pos = 0;

while (number > 0) {
pos++;
number = number >> 1;
}
return (int) Math.pow(2, pos);
}
``````
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``````for(i=0;i<10000;i++)
{
if(2^i>number)
{
number=2^i
break;
}
}
``````
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That's not a power of two, it's a square... – Matthieu M. Dec 9 '10 at 13:44
that's an iterative integer square root which isn't what the OP is asking. also your for loop is missing a term. – Jason S Dec 9 '10 at 13:45