# What is the most efficient way to choose a random value in a stream? [closed]

What is the most efficient way to choose a random value in a stream? Given that each of them has a chance of occurring equally.

Thanks.

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Too little information. –  Jon Apr 9 '12 at 10:08
Do you know the length of the stream? If not, is it "rewindable"? –  Thilo Apr 9 '12 at 10:09
It's all that I have –  Elnaz Shahmehr Apr 9 '12 at 10:10
xkcd.com/221 –  ta.speot.is Apr 9 '12 at 10:11
@ElnazShahmehr: If this is all they tell you then you are expected to ask more questions. Trying to answer without asking for more (relevant!) information shows that you do not understand the problem. –  Jon Apr 9 '12 at 10:15
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## closed as not a real question by Mat, sje397, ouah, Don Roby, svickApr 9 '12 at 10:15

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

There's no specific answer they're looking for. They're asking for you to ask the right questions and to see if you can reason about the problem. Asking for the answer is the worst possible thing you could do to understand a question like this.

A good answer might start like this: "Do we know how many items are in the stream? Can we count the items without fully reading them in? Can we rewind the stream? Can we assume I/O is much more expensive than anything else and minimizing I/O is our primary design consideration? ..."

They may also be looking to see if you know the 1/n algorithm. You can wind up with a random object, equally weighted, from a stream of objects by using the following algorithm:

1. When the first object streams through, hold it.

2. When the `n`'th object streams through, swap the object you are holding for it with probability `1/n`.

3. After the last object streams through, you will hold a randomly-selected object from the stream with all objects being equally likely.

If you don't see why this is, think it through. If there's only one object, we hold that object at the end. Okay, that's correct. If there are two objects, we are equally likely to hold either object because we swap with probability 1/2. If there are three objects, we hold the third object with probability 1/3 (because that's the last step), and we just proved we are equally likely to be holding the other two objects, so they must each be 1/3. And so on.

If you prefer pure math, you can prove by induction that the product of `n/n+1` as `n` goes from `1` to `p` is `1/(p+1)`.

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Thanks for your comment. –  Elnaz Shahmehr Apr 9 '12 at 10:18