# How to generate large random numbers C

I'm looking for a way to generate large random numbers on the order of 2^64 in C... (100000000 - 999999999), to use in a public key encryption algorithm (as p and q).

I do not want to generate a number smaller than 2^64 (that is, smaller than 100000000).

Is there anything that could help me to do this?

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2^64 is much greater than 999999999. –  undur_gongor Oct 27 '11 at 21:16

random() returns a long which on a 64bit system should be 64 bits. If you are on a 32bit system you could do the following:

``````#include <inttypes.h>

uint64_t num;

/* add code to seed random number generator */

num = rand();
num = (num << 32) | rand();

// enforce limits of value between 100000000 and 999999999
num = (num % (999999999 - 100000000)) + 100000000;
``````

Alternatively on a NIX system you could read /dev/random into your buffer:

``````#include <sys/types.h>
#include <sys/stat.h>
#include <fcntl.h>
#include <inttypes.h>

int fd;
uint64_t num;
if ((fd = open("/dev/random", O_RDONLY) == -1)
{
/* handle error */
};
close(fd);

// enforce limits of value between 100000000 and 999999999
num = (num % (999999999 - 100000000)) + 100000000;
``````

A

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`rand()` is limited by `RAND_MAX` which not necessary `2^32`. And, you still need something to pass to `srand()`. `/dev/random` functionality is also available on other platforms. –  Banthar Oct 27 '11 at 19:21
This does not ensure the requirement "I do not want to generate number smaller than ... 100000000" is met. –  undur_gongor Oct 27 '11 at 21:14
Add the line `num = (num % (999999999 - 100000000)) + 100000000;` to generate a random number of the lower limit of 100000000 and the upper limit of 999999999. –  David M. Syzdek Oct 27 '11 at 21:24
Better, but now the numbers above 805933941 (2^64 -1 mod 899999999) are slightly less probable than the numbers below ;-) –  undur_gongor Oct 27 '11 at 21:34
On my pc `RAND_MAX` is `2^31`, not `2^32`. –  Chiel Dec 26 '14 at 19:13

You can make a large number `L` out of smaller numbers (e.g. `A` & `B`). For instance, with something like `L = (2^ n)*A + B` where ^ denotes exponentiation and `n` is some constant integer (e.g. 32). Then you code `1<<n` (bitwise left-shift) for the power-of 2 operation.

So you can make a large random number of of smaller random numbers.

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what do the letters `L, n, A, and b` mean? could you explain please? –  ameen Dec 6 '14 at 9:40

You could combine two 4-byte random integers to produce an 8-byte one:

``````#include <stdint.h>
...
uint64_t random =
(((uint64_t) rand() <<  0) & 0x00000000FFFFFFFFull) |
(((uint64_t) rand() << 32) & 0xFFFFFFFF00000000ull);
``````

Since `rand` returns `int`, and `sizeof(int) >= 4` on almost any modern platform, this code should work. I've added the `<< 0` to make the intent more explicit.

The masking with `0x00000000FFFFFFFF` and `0xFFFFFFFF00000000` is to prevent overlapping of the bits in the two numbers in case `sizeof(int) > 4`.

EDIT

Since @Banthar commented that `RAND_MAX` is not necessarily `2 ^ 32`, and I think it is guaranteed to be at least `2 ^ 16`, you could combine four 2-byte numbers just to be sure:

``````uint64_t random =
(((uint64_t) rand() <<  0) & 0x000000000000FFFFull) |
(((uint64_t) rand() << 16) & 0x00000000FFFF0000ull) |
(((uint64_t) rand() << 32) & 0x0000FFFF00000000ull) |
(((uint64_t) rand() << 48) & 0xFFFF000000000000ull);
``````
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If you use `^` to combine the numbers instead of `|`, you don't need to worry about the masking. –  caf Oct 27 '11 at 21:21

I know I'll probably get b____slapped by OliCharlesworth, but use rand() with a scale and offset. It's in stdlib.h In order to cover the whole range you should add that to another smaller rand() to fill in the gaps in the mapping.

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You're looking for a cryptographic-strength PRNG, like `openssl/rand`: http://www.openssl.org/docs/crypto/rand.html

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Or BCryptGenRandom on Windows Vista and higher. –  Alexey Frunze Oct 27 '11 at 20:30
+1: using `rand()` for this is a security hole (predicting the output of `rand()` isn't terribly challenging) –  Frank Farmer Oct 27 '11 at 21:34