# Implementing Logical Right Shift in C

I'm working on making a logical right shift function in C using only bitwise operators. Here's what I have:

``````int logical_right_shift(int x, int n)
{
int size = sizeof(int); // size of int

// arithmetic shifts to create logical shift, return 1 for true
return (x >> n) & ~(((x >> (size << 3) - 1) << (size << 3) -1)) >> (n-1);
}
``````

This actually works for all cases except if n = 0. I've been trying to figure out a way to fix it so it will work for n = 0 as well, but I'm stuck.

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You're making a logical right shift operator for a signed type? –  Ignacio Vazquez-Abrams Mar 9 '11 at 22:43
What's wrong with `if (n == 0) { return x; }` ? –  Mark Rushakoff Mar 9 '11 at 22:45
Using @Mark 's suggestion, you can change it to this (no guarantees it works): `return (n == 0 ? x : (x >> n) & ~(((x >> (size << 3) - 1) << (size << 3) -1)) >> (n-1));` –  muntoo Mar 9 '11 at 22:47
@Dan: Did you want to allow casts in the answer? –  Jeremiah Willcock Mar 9 '11 at 22:57
@Mark: The braces. ;-) –  R.. Mar 9 '11 at 23:10

Just store your `int` in an `unsigned int`, and perform `>>` upon it.

(The sign is not extended or preserved if you use unsigned int)

http://en.wikipedia.org/wiki/Logical_shift

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``````int lsr(int x, int n)
{
return (int)((unsigned int)x >> n);
}
``````
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This is the correct answer (modulo the unnecessary and ugly cast on the result). Right-shift of a negative value has implementation-defined behavior (or is it an implementation-defined value? I forget), so any implementation of your `lsr` function in terms of using the `>>` operator on a signed value is simply non-portable. –  R.. Mar 9 '11 at 23:12
One issue with this solution: strictly speaking, it has implementation-defined behavior in the case of `n==0`, since casting from an `int` to `unsigned` and back results in implementation defined behavior if the original value is negative. The first conversion must happen modulo `UINT_MAX+1`, but the conversion back to signed `int` might simply be a reinterpretation of the representation, in which case the value would be changed. –  R.. Mar 9 '11 at 23:14

As with @Ignacio's comment, I don't know why you would want to do this (without just doing a cast to `unsigned` like in the other answers), but what about (assuming two's complement and binary, and that signed shifts are arithmetic):

``````(x >> n) + ((1 << (sizeof(int) * CHAR_BIT - n - 1)) << 1)
``````

or:

``````(x >> n) ^ ((INT_MIN >> n) << 1)
``````
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I think problem is in your ">> (n-1)" part. If n is 0 then left part will be shift by -1. So,here is my solution

``````int logical_right_shift(int x, int n)
{
int mask = ~(-1 << n) << (32 - n);
}
``````
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Derived from php's implementation of logical right shifting

``````function logical_right_shift( i , shift ) {

if( i & 2147483648 ) {
return ( i >> shift ) ^ ( 2147483648 >> ( shift - 1 ) );
}

return i >> shift;
}
``````

For 32bit platforms only.

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This is what you need:

``````int logical_right_shift(int x, int n)
{
int size = sizeof(int) * 8; // usually sizeof(int) is 4 bytes (32 bits)
return (x >> n) & ~(((0x1 << size) >> n) << 1);
}
``````

Explain

`x >> n` shifts `n bits` right. However, if `x` is negative, the sign bit (left-most bit) will be copied to its right, for example:

Assume every int is 32 bits here, let
`x　　　　 =　-2147483648　(10000000 00000000 00000000 00000000)`, then
`x　>>　1　=　-1073741824　(11000000 00000000 00000000 00000000)`
`x　>>　2　=　-536870912　 (11100000 00000000 00000000 00000000)`
and so on.

So we need to erase out those sign extra sign bits when n is negative.

Assume `n = 5` here:

`0x1 << size` moves `1` to the left-most position:

(10000000 00000000 00000000 00000000)

`((0x1 << size) >> n) << 1` copies 1 to its `n-1` neighbors:

(11111000 00000000 00000000 00000000)

`~((0x1 << size) >> n) << 1!` reverses all bits:

(00000111 11111111 11111111 11111111)

so we finally obtain a mask to extract what really need from `x >> n`:

``````(x >> n) & ~(((0x1 << size) >> n) << 1)
``````

the `&` operation does the trick.

And the total cost of this function is `6` operations.

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I think this is correct. But can you do left shift by 32 times? That will be an undefined shift? –  Timothy Leung Aug 17 '13 at 5:13