You are victim to a common misbelief about random numbers in general: a random sequence doesn't mean that a number cannot be repeated in that sequence. Quite on the contrary, it has to with a high probability. That misbelief is actually used to tell a "random" sequence generated by humans from a real one. A "random" sequence of 0's and 1's generated by a human will probably look like this:

0, 1, 0, 1, 1, 0, 1, 0, 0, 1, 0, 1, 0, ....

while a real random sequence is not shy of repeating the same number more than twice :) A good example is that statistical tests also look for repetition.

### Both kinds of generators have good "statistical properties"

It's also a common misbelief that cryptographically secure random numbers would somehow yield "much more random" values. Their statistical probabilities will probably be pretty much alike and both will perform really well in those standard statistical tests.

### Where to use which

So it actually depends on what you want to do whether your choice should be a PRNG or a cryptographically secure PRNG (CSPRNG). "Normal" PRNGs are perfectly fine for simulation purposes such as Monte-Carlo methods etc. The additional benefit of a CSPRNG will give you is that of non-predictability. Because the CSPRNG can "do more" chances are high that its performance will also be worse than that of a vanilla PRNG.

It can be shown that the concept of a "secure" PRNG is tightly coupled with the ability to predict the next bit of its output. For a CSPRNG, predicting the next bit of its output at any time is computationally infeasible. This only holds if you treat its seed value as a secret, of course. Once anyone finds out the seed, the whole thing becomes easily predictable - just recompute the values already generated by the CSPRNG's algorithm and then compute the next value. It can further be shown that being immune to "next-bit prediction" actually implies that there's no statistical test whatsoever that could distinguish the distribution of the CSPRNG from that of a real random uniform distribution. So there's another difference between PRNG and CSPRNG: While a good PRNG will perform well in many statistical tests, a CSPRNG is guaranteed to perform well in *all* tests.

The rule of thumb where to use which is that

- You use the CSPRNG in a "hostile" environment where you don't want externals to be able to guess sensitive information (session IDs, online poker where real money is won/lost, ....)
- And the PRNG in a benevolent environment where you just require good statistical properties but don't care about predictability (Monte-Carlo simulations, single player poker vs. computer, computer games in general) - i.e. no money can be won or lives will be lost should somebody be able to predict those random numbers successfully.