TL;DR: It "breaks" on lists with over 2080 elements, but don't worry too much :)
First of all, notice that "shuffling" a list can be understood (conceptually) as generating all possible permutations of the elements of the lists, and picking one of these permutations at random.
Then, you must remember that all self-contained computerised random number generators are actually "pseudo" random. That is, they are not actually random, but rely on a series of factors to try and generate a number that is hard to be guessed in advanced, or purposefully reproduced. Among these factors is usually the previous generated number. So, in practice, if you use a random generator continuously a certain number of times, you'll eventually start getting the same sequence all over again (this is the "period" that the documentation refers to).
Finally, the docstring on Lib/random.py (the random module) says that "The period [of the random number generator] is
So, given all that, if your list is such that there are
2**19937 or more permutations, some of these will never be obtained by shuffling the list. You'd (again, conceptually) generate all permutations of the list, then generate a random number x, and pick the xth permutation. Next time, you generate another random number y, and pick the yth permutation. And so on. But, since there are more permutations than you'll get random numbers (because, at most after
2**19937-1 generated numbers, you'll start getting the same ones again), you'll start picking the same permutations again.
So, you see, it's not exactly a matter of how long your list is (though that does enter into the equation). Also,
2**19937-1 is quite a long number. But, still, depending on your shuffling needs, you should bear all that in mind. On a simplistic case (and with a quick calculation), for a list without repeated elements, 2081 elements would yield
2081! permutations, which is more than