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Suppose you have a deck of 100 cards, with the numbers 1-100 on one side. You select a card, note the number, replace the card, shuffle, and repeat.

Question #1: How many cards (on average) must you select to have drawn the same card twice? Why?

Question #2: How many cards (on average) must you select to have drawn all of the cards at least once? Why?

(thanks, it has to do with random music playlists and making the option to not repeat the shuffle, as it were)

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homework?....... –  Mitch Wheat Jan 17 '12 at 2:18
    
no way! dammit, I've taught probability :) just want to know how effective my new strategy is and don't remember where to look... but would love an effective SO answer! –  Jimmy Jan 17 '12 at 2:31
    
but if you double-dog-dare me, I'll figure it out and post the answer already ;) –  Jimmy Jan 17 '12 at 2:33
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Q2 is the coupon collector's problem –  AakashM Jan 17 '12 at 9:00
    
I think rather than trying to solve this analytically, you write a little script to simulate it. –  frankc Jan 18 '12 at 22:32

1 Answer 1

Q1: Relates to Birthday paradox problem

As you see in the collision problem section(in wikipedia link above), your question maps exactly.

Cast as a collision problem

The birthday problem can be generalized as follows: given n random integers drawn from a discrete uniform distribution with range [1,d], what is the probability p(n;d) that at least two numbers are the same? (d=365 gives the usual birthday problem.)

You have a range [1,100] from which you select random cards. The probability of collision(two selected cards are the same) is given as p(n;d) = ...

Further down, we have formula for average/expected number of selections as

Q(100) gives your answer.

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ack, are you telling me it is that 1/e crap! I know where the answer lies now, thanks. –  Jimmy Jan 17 '12 at 2:23
    
however, i do not believe that answers question #2... –  Jimmy Jan 17 '12 at 2:24
    
now that i think about it, birthdays are all about a bunch of cards compared at the same time, mine is successive selection (with replacement!) and I do not think that can be equated to either question... –  Jimmy Jan 17 '12 at 2:27
    
edited to answer ur question –  Rajendran T Jan 17 '12 at 3:50

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