I am curious on how someone would go about determining the state of a Linear Congruential Generator given its output.
X(n-1) = (aX(n) + c) mod p
Since the values returned are deterministic and the formula is well known, it should be possible to obtain state's value. What exactly is the best way to do this?
I was at work when I posted this and this isn't work related, so I didn't spend much time and should have elaborated (much) further.
Assume this is used to generate non-integer values between 0 and 1, but its only visible output is true or false with a 50/50 spread. Assume the implementation is also known, so the values of a, c and p are known, but not X.
Would it be possible, with an finite amount of output, to determine the value of X?