How to get minor bit turned on?

Let be `a` an `unsigned int`:

``````unsigned int a = 188; // 10111100
``````

Is there a built-in function to get minor bit that is turn on? For example: in `a` case should return `2`because first and second bits are zero's but the third is one.

``````// 10111100
//      ^
//      |-- Minor bit turn on
``````

I'm using GCC and C99 standard.

• Try using `a&-a` – R.. Sep 23 '13 at 19:37
• @R.. what should that do? looks for me not like c syntax, at least jsut maybe c++? Or did you just type your sample tooo short? – dhein Sep 24 '13 at 11:22

Yes. Since you're using GCC, you may use the __builtin_ctz family of built-in functions for trailing zero count,

``````int __builtin_ctz (unsigned int x);
``````

as taken from http://gcc.gnu.org/onlinedocs/gcc/Other-Builtins.html .

For instance,

``````2 == __builtin_ctz(188)
``````

A word of warning: For the input 0, the result is undefined. Therefore its use may need to be guarded, thus:

``````int safe_ctz(unsigned int x){
return x ? __builtin_ctz(x) : 32;
}
``````

The advantage of this builtin is that for some targets, GCC turns this to a single instruction, such as BSF on x86.

Simple and clean solution:

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

int minor_bit(unsigned int x);

int main() {
unsigned int a = 188;
printf("%d\n", minor_bit(a));
return 0;
}

int minor_bit(unsigned int x) {
unsigned int i;
if (x == 0)
return -1;
for (i = 0; !(x & 1U << i); i++);
return i;
}
``````
• That's ok, but it fails if `x` is zero, so it require a previous validation to avoid zero values. – Israel Sep 23 '13 at 19:57
• For sizeof(int) --> 4, Is `1 << 31` well defined? Maybe `1u`. – chux Sep 23 '13 at 20:21
• @Israel I edited my code to consider that case. – Filipe Gonçalves Sep 23 '13 at 20:50
• @chux Good point. Actually, I checked in the standard right now, and when i == 31, it's undefined behavior because 2^31 is not representable in an int. I'm going to edit and change i to unsigned. Thanks for the insight! – Filipe Gonçalves Sep 23 '13 at 20:55

This is not built in, but works though...

Trailing Zero Count (from aggregate MAGIC algorithms)

Given the Least Significant 1 Bit and Population Count (Ones Count) algorithms, it is trivial to combine them to construct a trailing zero count (as pointed-out by Joe Bowbeer):

``````unsigned int
tzc(register int x)
{
return(ones((x & -x) - 1));
}
``````

Where ones can be for 32 bit:

``````unsigned int
ones32(register unsigned int x)
{
/* 32-bit recursive reduction using SWAR...
but first step is mapping 2-bit values
into sum of 2 1-bit values in sneaky way
*/
x -= ((x >> 1) & 0x55555555);
x = (((x >> 2) & 0x33333333) + (x & 0x33333333));
x = (((x >> 4) + x) & 0x0f0f0f0f);
x += (x >> 8);
x += (x >> 16);
return(x & 0x0000003f);
}
``````
• Watch your formatting there. H1 is seldom needed in answers, and it's semantically incorrect anyway. – Robert Harvey Sep 23 '13 at 19:46
• @RobertHarvey Thanks, I had a happy trigger finger (had major parts of content still missing...) – ppeterka Sep 23 '13 at 19:48
• As this solution is geared for a 32-bit integer, consider `ones32(register uint32_t x)` – chux Sep 23 '13 at 19:53

I believe this will do the trick. Partial credit goes to the solution.

``````int validate(unsigned value) {
int count = 0;

for (int i = 0; i < 8*sizeof(value); i++) { // 32 bits in unsigned int
int bit = (value >> i) & 1;
if (bit == 1) {
break;
} else {
count++;
}
}

return count;
}
``````
• Rather than `int value`, `unsigned value` is better behaved and matches OP. Also consider `i < 8*sizeof(value)`. – chux Sep 23 '13 at 19:55
• Thanks, I was trying to remember the sizeof() function. – LeMazing Sep 23 '13 at 19:57

Good for up to 64 bits.

``````static signed char f(uint64_t x)
{
static const signed char p[] = { -1, 0, 1, 39, 2, 15, 40, 23, 3, 12,
16, 59, 41, 19, 24, 54, 4, 0, 13, 10, 17, 62, 60, 28, 42, 30, 20,
51, 25, 44, 55, 47, 5, 32, 0, 38, 14, 22, 11, 58, 18, 53, 63, 9,
61, 27, 29, 50, 43, 46, 31, 37, 21, 57, 52, 8, 26, 49, 45, 36, 56,
7, 48, 35, 6, 34, 33, };

return p[(x & -x) % 67];
}
``````

It is not clear what should be returned from 0, so I used -1. That can be changed, obviously.

Robert, I think this is more correct (you have to AND the variable to test with the counter, not the shifted counter with itself, I think)

``````int minor(int value){
int i=0;

//Edge case (but could be fairly common)
if (value == 0) {
return -1;
}

//Continuously left-shifts 1  and ANDs it with input value
//in order to find the first occurrence of the rightmost bit != 0
while ((value & ( 1 << i )) == 0) {
i++;
}

return i;

}
``````
• Good point, it does. What value it makes sense to return in this case ? – vinaut Sep 23 '13 at 20:04
• I'd says minor(0) should return -1 or INT_MAX, but OP has not provided guidance on this issue. – chux Sep 23 '13 at 20:15

A modest, yet highly portable solution.
Max 16 loops when `unsigned` is 64-bit. Less than N shifts with N-bit `int`.

``````int MinorBit(unsigned x) {
if (x == 0)
return -1;  // special case, adjust as needed.
int m = 0;
// Search by char
while ((x & ((1u << CHAR_BIT) - 1)) == 0) {
x >>= CHAR_BIT;
m += CHAR_BIT;
}
// Search by bit
while ((x & 1) == 0) {
x >>= 1;
m++;
}
return m;
}
``````