# “Programming Pearls”: Sampling m elements from a sequence

From Programming Pearls: Column 12: A Sample Problem:

The input consists of two integers m and n, with m < n. The output is a sorted list of m random integers in the range 0..n-1 in which no integer occurs more than once. For probability buffs, we desire a sorted selection without replacement in which each selection occurs with equal probability.

The author provides one solution:

``````initialize set S to empty
size = 0
while size < m do
t = bigrand() % n
if t is not in S
insert t into S
size++
print the elements of S in sorted order
``````

In the above pseudocode, `bigrand()` is a function returns a large random integer (much larger than m and n).

Can anyone help me prove the correctness of the above algorithm?

According to my understanding, every output should have the probability of 1/C(n, m). How to prove the above algorithm can guarantee the output with the probability of 1/C(n, m)?

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## 1 Answer

Each solution this algorithm yields is valid.

How many solutions are there? Up to last line there (sorting) are `n*(n-1)*(n-2)*..*(n-m)` different permutations or
`n!/(n-m)!` and each result has same probability

When you sort you reduce number of possible solutions by m!.

So number of possible outputs is `n!/((n-m)!*m!)` and this is what you asked for.

`n!/((n-m)!m!) = C(n,m)`

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