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In a small application written in C/C++, I am facing a problem with the rand function and maybe the seed :

I want to produce a sequence of random numbers that are of different orders, i.e. with different logarithm values (base 2). But it seems that all the numbers produced are of the same order, fluctuating just between 2^25 and 2^30.

Is it because rand() is seeded with Unix time which is by now a relatively big number? What am I forgetting ? I am seeding rand() only once at the beginning of the main().

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FWIW so, is it C or C++? If by C/C++ you mean you can actually use C++, and the mention of C was just random, maybe this en.cppreference.com/w/cpp/numeric/random/binomial_distribution can help. –  R. Martinho Fernandes Jun 20 '13 at 13:26
Unfortunately you were betting on the wrong horse. Seed should not be your problem. Your problem was wrong expected distribution. Since unbiased programer would expect rand() to return uniformly distributed numbers (documentation with high Google ranking explicitly says so) I don't think this question is useful for future readers. That's why down vote but don't let it discourage you from using SO. –  Emperor Orionii Jun 20 '13 at 14:16
@doug65536 "...where no number is ever repeated" -- that's not random! I could fund my retirement at the craps table if my rand() dice never returned the same number twice until every possible number was returned. –  Chris Gregg Jun 21 '13 at 8:46
@GalacticCowboy Don't mistake periodicity with a repeat of individual numbers. From the Wikipedia article you cited: "a repeated result does not imply that the end of the period has been reached, since its internal state may be larger than its output." It would be very, very bad if a PRNG produced a value and then was guaranteed not to produce that value again until all values were returned. –  Chris Gregg Jun 22 '13 at 0:23
Doug65536, nobody is picking fights. They are just stating correctly that you are wrong. A PRNG could quite happily churn out the following if I wanted a RAND between 1 and 10: 2 4 7 2 8 1 5 9 7 3 That would be entirely valid, despite the multiple 2s and 7s. I think you are getting the PRNG confused with the shuffle facility on your iPhone. –  Facebook Answers Jun 22 '13 at 12:46

10 Answers 10

up vote 467 down vote accepted

There are only 3% of numbers between 1 and 230 which are NOT between 225 and 230. So, this sounds pretty normal :)

Because 225 / 230 = 2-5 = 1/32 = 0.03125 = 3.125%

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Aye, good point ! There are 31 times more numbers between 2^25 and 2^30 than between 1 and 2^25 :) thanks for the quick answer. I need to rethink the program then. Question answered. –  Tallaron Mathias Jun 20 '13 at 9:35
@TallaronMathias Consider truncating the number through >> bitshifting -- this will give you smaller numbers. (Or taking a modulus with %.) –  Sean Allred Jun 20 '13 at 16:40
I would expect this to be obvious to most programmers: Any unsigned integer less than 2^25 must have its first 7 bits equal to 0 - and if every bit is random... –  BlueRaja - Danny Pflughoeft Jun 20 '13 at 18:46
@BlueRaja-DannyPflughoeft - if probabilities were obvious, casinos would be out of business. –  Brett Hale Jun 20 '13 at 18:56
@BrettHale - I don't think programmers are a casino's target demographic though. –  EkoostikMartin Jun 21 '13 at 15:30

The lighter green is the region between 0 and 225; the darker green is the region between 225 and 230. The ticks are powers of 2.


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You need to be more precise: you want different base 2 logarithm values but what distribution do you want for this? The standard rand() functions generate a uniform distribution, you will need to transform this output using the quantile function associated with the distribution that you want.

If you tell us the distribution then we can tell you the quantile function you need.

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+1, distribution is the crucial term. It doesn't really make sense to talk about random numbers when nothing is known about the distribution. Uniform is just a special case, albeit an important one. Might be a good place to point out various distributions from the C++11 standard library. –  leftaroundabout Jun 20 '13 at 21:43

If you want different orders of magnitude, why not simply try pow(2, rand())? Or perhaps choose the order directly as rand(), as Harold suggested?

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good idea, but you should fix your answer using pow instead of ^ (which is the logical xor operator, not power, in C language). –  kriss Jun 20 '13 at 14:20
Since rand() can go up to RAND_MAX, you really need to scale your random number so the result doesn't overflow... –  Floris Jun 22 '13 at 19:26
@Floris: but if you scale a small countable range on a very large range, you will have LOTS of holes, which is probably not what OP is expecting. –  André Caron Jun 25 '13 at 19:12

@C4stor made a great point. But, for a more general case and easier to understand for human (base 10): for the range from 1 to 10^n, ~90% of the numbers are from 10^(n-1) to 10^n, therefore, ~99% of the numbers go from 10^(n-2) to 10^n. Keep adding as many decimals as you want.

Funny mathematics, if you keep doing this for n, you can see that from 1 to 10^n, 99.9999...% = 100% of the numbers are from 10^0 to 10^n with this method.

Now about code, if you want a random number with random orders of magnitude, from 0 to 10^n, you could do:

  1. Generate a small random number from 0 to n

  2. If you know the range that n has, generate a big random number of order 10^k where k > max{n}.

  3. Cut the longer random number to get the n digits of this big random number.

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You're completely correct, but for a REALLY easy to understand answer, the OP should ask himself why 90% of the random numbers between 1 and 100 are two digits. –  kbelder Jun 20 '13 at 15:16

The basic (and correct) answer was already given and accepted above: there are 10 numbers between 0 and 9, 90 numbers between 10 and 99, 900 between 100 and 999, etc.

For a computationally efficient way to get a distribution with approximately logarithmic distribution, you want to right-shift your random number by a random number:

s = rand() & 31; // a random number between 0 and 31 inclusive, assuming RAND_MAX = 2^32-1
r = rand() >> s; // right shift

It's not perfect, but it's much faster than computing pow(2, rand()*scalefactor). It will be "lumpy" in the sense that the distribution will be uniform for numbers within a factor 2 (uniform for 128 to 255, half the density for 256 to 1023, etc).

Here is a histogram of the frequency of the numbers 0 to 31 (in 1M samples):

enter image description here

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nitpick: this encourages very small numbers more than one might expect. The probability of getting a zero is significantly higher than a 10. –  Mooing Duck Jun 25 '13 at 19:09
Well - the whole point of this is to encourage small numbers, so I'm glad it's working! I ran a Monte Carlo simulation, and this is giving me a factor 2 drop in probability as numbers double - not unlike a log distribution. Updated answer with a picture. –  Floris Jun 25 '13 at 19:21
no, I mean, with rand()>>(rand()&31);, one would intuitively expect 1/32nd of the numbers to have 32 bits, and 1/32nd of the numbers to have 31 bits, and 1/32nd of the numbers to have 30 bits, etc. But that's not the results you're getting, only about than 1/64th of the numbers would result in 32 bits, while almost half should be 0. Since my mental math disagrees with your measurements, I'll have to do my own measurements to figure this out. –  Mooing Duck Jun 25 '13 at 19:27
I don't mean to say your code is wrong. It's probably what I would do. It just deserves a warning that the results aren't quite distributed as one might expect. –  Mooing Duck Jun 25 '13 at 19:53
I think the problem comes from thinking of 0 as a 1 bit number... that's the kind of conundrum you run into when you mix integers and logarithms. It's been a good exercise though and you gave me something to think about. "Test the limits of your algorithm" - it never gets old. –  Floris Jun 25 '13 at 20:10

There are exactly equal number of numbers between 0 and 2^29 and 2^29 and 2^30.

Another way of looking at the problem: consider binary representation of the random number you generate, the probability that the highest bit is 1 equals 1/2, and, therefore, you get order 29 in half cases. What you want is to see a number that would be below 2^25, but that means 5 highest bits are all zero, which happens with a low probability of 1/32. Chances are that even if you run it for a long time you will never see the order below 15 at all (the probability is something like rolling 6 6 times in a row).

Now, the part of your question about the seed. No, the seed cannot possibly determine the range the numbers are generated from, it just determines the first, initial element. Think of rand() as a sequence of all possible numbers in the range (predetermined permutation). The seed determines where you start drawing numbers from the sequence. This is why if you want (pseudo) randomness, you use current time to initialize the sequence: you do not care that the position you start from is not uniformly distributed, all that matters is that you never start from the same position.

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use pow(2,rand()) it will give the answers in order of desired magnitude!!

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If you want to use random numbers from an online service you can use wget for that, you may want to see you can also use services like random.org for your random number generation , you can catch them using wget and then reading the numbers from the downloaded file

wget -q https://www.random.org/integers/?num=100&min=1&max=100&col=5&base=10&format=html&rnd=new -O new.txt


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Welcome to SO. please refrain from posting links as answers. You can provide a detailed sketch of an answer leaving the details to be read via links. –  Shai Nov 23 '13 at 19:52
While this link may answer the question, it is better to include the essential parts of the answer here and provide the link for reference. Link-only answers can become invalid if the linked page changes. –  IvanH Nov 23 '13 at 19:57
will take care of that , editing the answer. –  Namit Sinha Nov 24 '13 at 7:39

give the rand function a limit, try using rand() % x, where x is your upper limit

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What if the highest rand() could produce was 7 (3 bits) and my upper bound was 3? That an uneven distribution. 1, 4, and 7 would result in 1, while only 2 and 5 make 2, and only 3 and 6 make 3! –  Cole Johnson Jun 26 '13 at 1:19

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