The problem with using
rand() % n to get a number between 0 and n-1 is that it has some bias when n is not an exact divisor of RAND_MAX. The higher the value of n, the stronger this bias becomes.
To illustrate why this happens, let's imagine that rand() would be implemented with a six-sided die. So RAND_MAX would be 5. We want to use this die to generate random numbers between 0 and 3, so we do this:
x = rand() % 4
What's the value of x for each of the six outcomes of rand?
0 % 4 = 0
1 % 4 = 1
2 % 4 = 2
3 % 4 = 3
4 % 4 = 0
5 % 4 = 1
As you can see, the numbers 0 and 1 will be generated twice as often as the numbers 2 and 3.
When your use case doesn't permit bias, this is a better way to calculate a random number:
(int)((double)rand() / (double)RAND_MAX * (double)n)