# selection of numbers from a set with equal probability

Got this question from algorithms design manual by Steven Skiena.

It is required to select k (value given) numbers to form a subset S' from a given set S having n numbers, such that selection probability for each number is equal (k/n). n is unknown (i was thinking of taking S as a link-list for this). also, we can have only pass through the set S.

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Essentially the same as stackoverflow.com/questions/5416567/random-selection/… –  Michael J. Barber Dec 15 '11 at 8:18

Something like this

``````for elem in S
if random() < (k - S'.size)/S.size // This is float division
``````

The first element is chosen with probability `k/n`, the second one with `(n-k)/n * k/(n-1) + k/n * (k-1)/(n-1)` which reduces to `k/n`, etc.

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According to the formula you've provided you should take into account the index i of elem (starting with 1), hence having random() < (k - S'.size)/(S.size - i) // Float division –  Alec May 4 '12 at 13:22

When n is unknown you'd rather need an on-line algorithm for so-called Reservoir sampling.

The good explanation & proof sketches are provided here http://propersubset.com/2010/04/choosing-random-elements.html

I mean this algorithm implemented in Python (taken from the link above)

``````import random
def random_subset( iterator, K ):
result = []
N = 0

for item in iterator:
N += 1
if len( result ) < K:
result.append( item )
else:
s = int(random.random() * N)
if s < K:
result[ s ] = item

return result
``````
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You should choose an algorithm that can truly simulate the real activity "Randomly choose k numbers from n numbers".Your algorithm should has two properties

(1) It must return k numbers at end.

(2) It must truly simulate that properties of target activity : each number is selected with probability k/n.

Oborok`s answer is wrong because it hasn`t first property.

``````for i = 0 to n
randomly choose an integer number between [1,n-i+1]
if [randomValue <= (k - S'.size)/(S.size - i + 1)] then