What is the best way to construct a bit mask in C with `m` set bits preceded by `k` unset bits, and followed by `n` unset bits:

``````00..0 11..1 00..0
k     m     n
``````

For example, k=1, m=4, n=3 would result in the bit mask:

``````01111000
``````
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For answers to many bit twiddling hacks, such as this, a very good online source is Bit Twiddling Hacks. –  Jonathan Leffler Dec 29 '13 at 18:55

~(~0 << m) << n

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Both these work, and they're both good, so I'm upvoting two for the first time ever. –  paxdiablo Nov 25 '08 at 6:28
Thanks for the answers guys. –  grigy Nov 25 '08 at 6:34
This is slick. However, It would be a good idea to comment this line, for the -next- programmer to work on it. –  mkClark Nov 25 '08 at 23:41
If this was coded as a function (the set_mask_n functions in @quinmar's answer), there'd be a one-line comment saying what the function does (and no argument 'k'), and users of the function would have the name as documentation. As a random expression in a bit of code, it would indubitably be BAD! –  Jonathan Leffler Nov 27 '08 at 5:55
The `~(~0 << m)` is in paragraph 2.9 "Bitwise Operators" of "The C Programming Language, second edition" by Brian Kernighan and Dennis Ritchie. It is also in paragraph 7.5 "Space Efficiency" of "The Practice of Programming" by Brian W. Kernighan and Rob Pike. –  Alessandro Jacopson Jul 22 '11 at 6:57

So, you are asking for m set bits prefixed by k reset bits and followed by n reset bits? We can ignore k since it will largely be constrained by the choice of integer type.

``````mask = ((1 << m) - 1) << n;
``````
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Both these work, and they're both good, so I'm upvoting two for the first time ever. –  paxdiablo Nov 25 '08 at 6:29
They both work but I find Jonathan's answer to be simpler and clearer. Darius' answer is a little too backwards to me. –  Robert Gamble Nov 25 '08 at 6:34
Thanks for the answers guys. –  grigy Nov 25 '08 at 6:35
Robert, I like the ~0 idiom for bitmasks because it doesn't depend on 2's-complement, and is in that sense simpler, but it's true it's less well-known. Just doing my bit to change that! –  Darius Bacon Nov 25 '08 at 7:10
@Darius: if you are using unsigned arithmetic/types, as you should in these contexts, isn't the difference between 2's-complement, 1's-complement and sign-magnitude arithmetic immaterial? –  Jonathan Leffler Nov 25 '08 at 7:18

I like both solutions. Here is another way that comes to my mind (probably not better).

``` ((~((unsigned int)0) << k) >> (k + n)) << n ```

EDIT: There was a bug in my previous version (it was without the unsigned int cast). The problem was that `~0 >> n` adds 1s at the front and not 0s.

And yes this approach has one big downside; it assumes that you know the number of bits of the default integer type or in other words it assumes that you really know k, whereas the other solutions are independent of k. This makes my version less portable, or at least harder to port. (It also uses 3 shifts, and addition and a bitwise negation operator, which is two extra operations.)

So you would do better to use one of the other examples.

Here is a little test app, done by Jonathan Leffler, to compare and verify the output of the different solutions:

``````#include <stdio.h>
#include <limits.h>

enum { ULONG_BITS = (sizeof(unsigned long) * CHAR_BIT) };

static unsigned long set_mask_1(int k, int m, int n)
{
return ~(~0 << m) << n;
}

static unsigned long set_mask_2(int k, int m, int n)
{
return ((1 << m) - 1) << n;
}

static unsigned long set_mask_3(int k, int m, int n)
{
return ((~((unsigned long)0) << k) >> (k + n)) << n;
}

static int test_cases[][2] =
{
{ 1, 0 },
{ 1, 1 },
{ 1, 2 },
{ 1, 3 },
{ 2, 1 },
{ 2, 2 },
{ 2, 3 },
{ 3, 4 },
{ 3, 5 },
};

int main(void)
{
size_t i;
for (i = 0; i < 9; i++)
{
int m = test_cases[i][0];
int n = test_cases[i][1];
int k = ULONG_BITS - (m + n);
printf("%d/%d/%d = 0x%08lX = 0x%08lX = 0x%08lX\n", k, m, n,