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srand(time(null));

printf("%d", rand());

Gives a high-range random number (0-32000ish), but I only need about 0-63 or 0-127, though I'm not sure how to go about it. Any help?

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Two things to remember here: 1. Never strip off the higher bits, since the lower ones are often less random. 2. Never use the system-provided rand() unless you don't really need good random numbers. –  David Thornley Jul 29 '09 at 20:18
    
I will use a better RNG later, right now I am just toying around with generating random images. –  akway Jul 29 '09 at 20:22
    
@David: you don't need to remember both those things, just the second. If you never use rand(), you don't have to worry about which bits in it are crappy in typical implementations. If you use a good RNG, then the low bits are just as good as the high ones. –  Steve Jessop Jul 29 '09 at 23:06
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13 Answers

If you don't overly care about the 'randomness' of the low-order bits, just rand() % HI_VAL.

Also:

(double)rand() / (double)RAND_MAX;  // lazy way to get [0.0, 1.0)
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So that would give either 0 or 1? Is there anyway I could chain that together and convert the resulting number from binary into decimal? That would add a lot of randomness... I think. –  akway Jul 29 '09 at 20:09
    
@akway: No. The division gives a floating-point number between 0.0 and 1.0. (int)(HI_VAL * ( (double)rand() / (double)RAND_MAX )) generally does what you want. –  S.Lott Jul 29 '09 at 20:16
2  
Tip: Any time you do something to "add" randomness to a pseudo-random number generator, expect a high chance that you're inadvertently subtracting it...or at least not changing it. –  Brian Jul 29 '09 at 20:17
    
(double)rand() / (double)RAND_MAX gives you a double between zero and one, not either 0 or 1. You can chain these, of sorts, but remember that not all generators work well that way. Some have dependencies between adjacent values. –  David Thornley Jul 29 '09 at 20:18
    
Oh ok, that makes more sense. –  akway Jul 29 '09 at 20:24
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The naive way to do it is:

int myRand = rand() % 66; // for 0-65

This will likely be a very slightly non-uniform distribution (depending on your maximum value), but it's pretty close.

To explain why it's not quite uniform, consider this very simplified example:
Suppose RAND_MAX is 4 and you want a number from 0-2. The possible values you can get are shown in this table:

rand()   |  rand() % 3
---------+------------
0        |  0
1        |  1
2        |  2
3        |  0

See the problem? If your maximum value is not an even divisor of RAND_MAX, you'll be more likely to choose small values. However, since RAND_MAX is generally 32767, the bias is likely to be small enough to get away with for most purposes.

There are various ways to get around this problem; see here for an explanation of how Java's Random handles it.

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Needs to be rand() % 66 for 0-65.... –  Reed Copsey Jul 29 '09 at 20:05
    
I edited it twice in the time it took you guys to leave comments. ;) –  Michael Myers Jul 29 '09 at 20:05
    
How biased is it? –  akway Jul 29 '09 at 20:05
1  
@akway - it's biased towards low values. Depending on the range, it can be very skewed. See the article I reference in my answer for details on alternatives. –  Reed Copsey Jul 29 '09 at 20:11
    
From your examples it looks like I could just discard all results that end in 0 and I would be okay... or am I wrong? –  akway Jul 29 '09 at 20:16
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rand() will return numbers between 0 and RAND_MAX, which is at least 32767.

If you want to get a number within a range, you can just use modulo.

int value = rand() % 66; // 0-65

For more accuracy, check out this article. It discusses why modulo is not necessarily good (bad distributions, particularly on the high end), and provides various options.

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rand() % number_of_numbers + minimum_number

So, for 0-65:

rand() % 66 + 0

(obviously you can leave the 0 off, but it's there for completeness).

Note that this will bias the randomness slightly, but probably not anything to be concerned about if you're not doing something particularly sensitive.

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1  
number_of_numbers+1. Your code will give 0-64. –  Fred Larson Jul 29 '09 at 20:07
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no, it's still number_of_numbers, but the number of numbers in the inclusive range 0-65 is 66 not 65. –  Tyler McHenry Jul 29 '09 at 20:09
    
I think that said "rand() % 65 + 0" when I posted my comment. It looks right now. –  Fred Larson Jul 29 '09 at 20:12
4  
Modulo relies on the low-order bits which aren't as random as the high-order bits. Convert to float and multiply works better. –  S.Lott Jul 29 '09 at 20:17
1  
The low-order bits ARE less random. Further, the smaller the value of of number_of_numbers, the more apparent the bias is. Nothing to do with RAND_MAX. If number_of_numbers is 2, for example, you'll see the bias in the lowest-order bit. –  S.Lott Jul 30 '09 at 12:07
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Updated to not use a #define

double RAND(double min, double max)
{
    return (double)rand()/(double)RAND_MAX * (max - min) + min;
}
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2  
bad idea, due to all the caveats of macros. That macro fails in a number of cases because the arguments are not properly parenthesized, and even if you did do so properly, it would still evaluate the min argument twice, which would be bad if min were a function with side-effects. –  Tyler McHenry Jul 29 '09 at 20:13
    
Lose the macro approach and convert to double. rand()/RAND_MAX is normally 0. –  David Thornley Jul 29 '09 at 20:21
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Or you can use this:

rand() / RAND_MAX * 65

But I'm not sure if it's the most random or fastest of all the answers here.

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2  
Won't this always give 0? –  Brian Jul 29 '09 at 20:13
    
@Brian You can solve that problem with (rand() * 1.0)/RAND_MAX * 65, but still... –  Brian Postow Jul 29 '09 at 20:37
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Taking the modulo of the result, as the other posters have asserted will give you something that's nearly random, but not perfectly so.

Consider this extreme example, suppose you wanted to simulate a coin toss, returning either 0 or 1. You might do this:

isHeads = ( rand() % 2 ) == 1;

Looks harmless enough, right? Suppose that RAND_MAX is only 3. It's much higher of course, but the point here is that there's a bias when you use a modulus that doesn't evenly divide RAND_MAX. If you want high quality random numbers, you're going to have a problem.

Consider my example. The possible outcomes are:

rand()  freq. rand() % 2
0       1/3   0
1       1/3   1
2       1/3   0

Hence, "tails" will happen twice as often as "heads"!

Mr. Atwood discusses this matter in this Coding Horror Article

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2  
So a better solution is... ? –  Sean Bright Jul 29 '09 at 20:11
    
There is a better answer. I'm investigating now. I think that Mr. Atwood discussed this in Coding Horror a year or so back. –  Bob Kaufman Jul 29 '09 at 20:14
2  
Better options here: azillionmonkeys.com/qed/random.html –  Reed Copsey Jul 29 '09 at 20:15
    
@Sean: Store value of rand() in a temporary value. If it's high enough to have be in the error range, reroll. For the example mmyers gives, you would reroll if rand() is 3. –  Brian Jul 29 '09 at 20:20
    
I wasn't asking for me, but thanks for the clarification. –  Sean Bright Jul 29 '09 at 20:25
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I think the following does it semi right. It's been awhile since I've touched C. The idea is to use division since modulus doesn't always give random results. I added 1 to RAND_MAX since there are that many possible values coming from rand including 0. And since the range is also 0 inclusive, I added 1 there too. I think the math is arranged correctly avoid integer math problems.

#define MK_DIVISOR(max) ((int)((unsigned int)RAND_MAX+1/(max+1)))

num = rand()/MK_DIVISOR(65);
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check here

http://c-faq.com/lib/randrange.html

For any of these techniques, it's straightforward to shift the range, if necessary; numbers in the range [M, N] could be generated with something like

M + rand() / (RAND_MAX / (N - M + 1) + 1)
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You want one of those 1s to be 1.0 to ensure a float, otherwise you just get 0 + M... –  Brian Postow Jul 29 '09 at 20:42
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double scale = 1.0 / ((double) RAND_MAX + 1.0);
int min, max;
...
rval = (int)(rand() * scale * (max - min + 1) + min);
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As others have noted, simply using a modulus will skew the probabilities for individual numbers so that smaller numbers are preferred.

A very ingenious and good solution to that problem is used in Java's java.util.Random class:

public int nextInt(int n) {
    if (n <= 0)
        throw new IllegalArgumentException("n must be positive");

    if ((n & -n) == n)  // i.e., n is a power of 2
        return (int)((n * (long)next(31)) >> 31);

    int bits, val;
    do {
        bits = next(31);
        val = bits % n;
    } while (bits - val + (n-1) < 0);
    return val;
}

It took me a while to understand why it works and I leave that as an exercise for the reader but it's a pretty concise solution which will ensure that numbers have equal probabilities.

The important part in that piece of code is the condition for the while loop, which rejects numbers that fall in the range of numbers which otherwise would result in an uneven distribution.

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if you care about the quality of your random numbers don't use rand()

use some other prng like http://en.wikipedia.org/wiki/Mersenne_twister or one of the other high quality prng's out there

then just go with the modulus.

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int random(int min, int max){
   return min + rand() / (RAND_MAX / (max - min + 1) + 1);
}

Reference http://c-faq.com/lib/randrange.html

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