Is it possible to reverse a pseudo random number generator? For example, take an array of generated numbers and get the original seed. If so, how would this be implemented?

i would think that there is always more than one seed that can generate a sequence of numbers no matter what the length...you can probably find a seed but there should be more than one...and even if you find one it might not be right since the next number in the sequence is unknown– Logan MurphyNov 4 '14 at 20:03

Let's assume that the equation to get the next pseudorandom number is invertible. Given a number generated by the formula, you can then apply the inverse to get the previous pseudorandom number. Is this the seed? How do you know? If you apply the inverse formula once more, is that the seed? Or should you apply the inverse 12,842 more times?– beakerNov 4 '14 at 20:31
This is absolutely possible  you just have to create a PRNG which suits your purposes. It depends on exactly what you need to accomplish  I'd be happy to offer more advice if you describe your situation in more detail.
For general background, here are some resources for inverting a Linear Congruential Generator: Reversible pseudorandom sequence generator
pseudo random distribution which guarantees all possible permutations of value sequence  C++
And here are some for inverting the mersenne twister: http://www.randombit.net/bitbashing/2009/07/21/inverting_mt19937_tempering.html http://b10l.com/reversingthemersennetwisterrngtemperfunction/
In general, no. It should be possible for most generators if you have the full array of numbers. If you don't have all of the numbers or know which numbers you have (do you have the 12th or the 300th?), you can't figure it out at all, because you wouldn't know where to stop.
You would have to know the details of the generator. Decoding a linear congruential generator is going to be different from doing so for a counterbased PRNG, which is going to be different from the Mersenne twister, which is going to be different with a Fibonacci generator. Plus you would probably need to know the parameters of the generator. If you had all of that AND the equation to generate a number is invertible, then it is possible. As to how, it really depends on the PRNG.

Are there any of these for which if you knew the index and a few characters you would still not be able to reverse it?– AndrewAug 30 '19 at 13:50

Ah: en.wikipedia.org/wiki/… "CSPRNG requirements fall into two groups: first, that they pass statistical randomness tests; and secondly, that they hold up well under serious attack, even when part of their initial or running state becomes available to an attacker."– AndrewAug 30 '19 at 13:56