How many time I need to pick random number [1,N] to get specific number k

I'm working on proving something regarding probability and statistics.

How many time I need to pick a random number from [1,N] to get specific number k, where k in [1,N]

``````start = random(1,N);
count = 1;
do
{
end = random(1,N);
count++;
}while (start!=end);
``````

My experiments concluded that if I repeat above program for 100 time for the same N value then average value of count ~ N. I don't know how to prove that theoretically.

Any one can help me to prove it. Any help would be appreciated.

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Each time you pick a random number between `1` and `N`, you have a probability of getting `k` which is equal to `1/N`, and a probability of getting something different which is equal to `(N-1)/N`.

Once you know this, you can compute the probability of getting `k` in :

• 1 shot : `P1 = 1/N`
• 2 shots : `P2 = (N-1)/N * 1/N`
• 3 shots : `P3 = (N-1/N * (N-1)/N * 1/N`
• ...

The expected number of times you have to pick a random number in order to get `k` is:

``````1 * P1 + 2 * P2 + 3 * P3 + 4 * P4...
``````

This is a series that converges to the value `N`.

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Thanks for replying. I got the answer. If X is the expected number of trials required to randomly generate k until k= target value then, X = (1/N)*1 + ((N-1)/N)*(X+1) Solving this equation gives X=N. – Jiten Patel Oct 21 '12 at 22:58