What I am trying to do is to generate some random numbers (not necessarily single digit) like

```
29106
7438
5646
4487
9374
28671
92
13941
25226
10076
```

and then count the number of digits I get:

```
count[0] = 3 Percentage = 6.82
count[1] = 5 Percentage = 11.36
count[2] = 6 Percentage = 13.64
count[3] = 3 Percentage = 6.82
count[4] = 6 Percentage = 13.64
count[5] = 2 Percentage = 4.55
count[6] = 7 Percentage = 15.91
count[7] = 5 Percentage = 11.36
count[8] = 3 Percentage = 6.82
count[9] = 4 Percentage = 9.09
```

This is the code I am using:

```
#include <stdio.h>
#include <time.h>
#include <stdlib.h>
int main() {
int i;
srand(time(NULL));
FILE* fp = fopen("random.txt", "w");
// for(i = 0; i < 10; i++)
for(i = 0; i < 1000000; i++)
fprintf(fp, "%d\n", rand());
fclose(fp);
int dummy;
long count[10] = {0,0,0,0,0,0,0,0,0,0};
fp = fopen("random.txt", "r");
while(!feof(fp)) {
fscanf(fp, "%1d", &dummy);
count[dummy]++;
}
fclose(fp);
long sum = 0;
for(i = 0; i < 10; i++)
sum += count[i];
for(i = 0; i < 10; i++)
printf("count[%d] = %7ld Percentage = %5.2f\n",
i, count[i], ((float)(100 * count[i])/sum));
}
```

If I generate a large number of random numbers (1000000), this is the result I get:

```
count[0] = 387432 Percentage = 8.31
count[1] = 728339 Percentage = 15.63
count[2] = 720880 Percentage = 15.47
count[3] = 475982 Percentage = 10.21
count[4] = 392678 Percentage = 8.43
count[5] = 392683 Percentage = 8.43
count[6] = 392456 Percentage = 8.42
count[7] = 391599 Percentage = 8.40
count[8] = 388795 Percentage = 8.34
count[9] = 389501 Percentage = 8.36
```

Notice that 1, 2 and 3 have too many hits. I have tried running this several times and each time I get very similar results.

I am trying to understand what could cause 1, 2 and 3 to appear much more frequently than any other digit.

Taking hint from what Matt Joiner and Pascal Cuoq pointed out,

I changed the code to use

```
for(i = 0; i < 1000000; i++)
fprintf(fp, "%04d\n", rand() % 10000);
// pretty prints 0
// generates numbers in range 0000 to 9999
```

and this is what I get (similar results on multiple runs):

```
count[0] = 422947 Percentage = 10.57
count[1] = 423222 Percentage = 10.58
count[2] = 414699 Percentage = 10.37
count[3] = 391604 Percentage = 9.79
count[4] = 392640 Percentage = 9.82
count[5] = 392928 Percentage = 9.82
count[6] = 392737 Percentage = 9.82
count[7] = 392634 Percentage = 9.82
count[8] = 388238 Percentage = 9.71
count[9] = 388352 Percentage = 9.71
```

What can be the reason that 0, 1 and 2 are favored?

Thanks everyone. Using

```
int rand2(){
int num = rand();
return (num > 30000? rand2():num);
}
fprintf(fp, "%04d\n", rand2() % 10000);
```

I get

```
count[0] = 399629 Percentage = 9.99
count[1] = 399897 Percentage = 10.00
count[2] = 400162 Percentage = 10.00
count[3] = 400412 Percentage = 10.01
count[4] = 399863 Percentage = 10.00
count[5] = 400756 Percentage = 10.02
count[6] = 399980 Percentage = 10.00
count[7] = 400055 Percentage = 10.00
count[8] = 399143 Percentage = 9.98
count[9] = 400104 Percentage = 10.00
```

`rand() % 10000`

is still biased: numbers from 0 to 9999 cover one slice uniformly, 10000 to 19999 another, … and the numbers from 30000 to 32767 create bias — assuming 32767 is the limit of your function rands(). I am sure there are existing questions on StackOverflow on how to get a uniformly distributed number between 0 and 9999. The simplest solution is to discard the numbers above 30000 by calling rands() again. – Pascal Cuoq Aug 1 '10 at 10:37checkto see whether your random number generator is "random enough" (whatever that means)? As many have answered here, that's not necessarily a good check, as some ranges of numbers have different occurences of certain digits. Or do you have some specific reason for wanting an even distribution of digits? – BradC Aug 5 '10 at 14:19