The code is in Objective C but it should be understandable if you look it over even if you don't know Objective C. Basically its a RNG object, you instantiate a new instance, set the seed if you want and start grabbing random numbers.

So is it possible to backtrack a given series of numbers to determine the seed used to generate the numbers? I'm guessing any given algorithm can't generate just any random set of numbers though, or can it?

Say I do the following:

```
rng.seed = 1024;
for (int i=1; i<11; i++)
DLog(@"%lu", [rng randomBetween:0 and:10]);
```

Which gives me the sequence `10, 10, 8, 10, 2, 10, 9, 9, 7, 4`

. Is there some method or algorithm I could use, given the sequence, to get the number 1024? I know thats the valid sequence for the seen 1024, but what is I just make up a sequence... `10, 1, 9, 6, 3, 9, 10, 3, 5, 2`

. Is there a way to know if that is a valid sequence for this algorithm and if so what the seed is?

RNG.h:

```
@interface RNG : NSObject
@property (assign) unsigned long seed;
- (unsigned long)random;
- (long)randomBetween: (long)min and: (long)max;
@end
```

RNG.m:

```
#define A 16807 /* a relatively prime number -- also M div Q */
#define M 2147483647L /* 0xFFFFFFFF / 2 */
#define Q 127773L /* M div A */
#define R 2836 /* M mod A */
@implementation RNG
@synthesize seed = _seed;
- (id)init {
self = [super init];
if (self) {
self.seed = 0;
}
return self;
}
- (unsigned long)random {
self.seed = A * (self.seed % Q) - R * (self.seed / Q);
if (self.seed > M)
return (self.seed -= M);
else if (self.seed)
return (self.seed);
else
return (self.seed = 1L);
}
- (long)randomBetween: (long)min and: (long)max {
return ([self random] % (max - min + 1) + min);
}
- (void)seed: (unsigned long)new_seed {
if (new_seed == 0)
new_seed = 1;
while (new_seed > M)
new_seed -= M;
self.seed = new_seed;
}
@end
```

`unsigned long`

... a lot of possibilities. I'm not worried about collisions at all, if there are two or more seeds that fit the sequence, I just need the 1st one found. – Justin808 Aug 16 '12 at 8:26