# CLRS - Random search - How to calculate Expected number of picks?

It is CLRS question. The question is from third edition of CLRS book: 5-2-b.

The random search is an algorithm where you have to pick an element randomly and compare it with the searched element. If equals, we need to stop. Now, suppose you have exactly one element with index i such that A[i]=x (x is searched element in the array). What is the expected number of indices into A that we must pick before we find x? Also, how can we find the expected number of indices when we have more than 1 indices values which are equal to x?

-

Assuming there are k failures before we find element x. So Pr{k failures}=k/(n-1). now E(X)=sum of Pr{k failures} for k=1 to n. therefore, E(X)=n(n+1)/2(n-1).

-
This answer is not correct. Correct answer is: E(X) = ∑i=1∞ ((n-1)/n)i-1 . (1/n) . i = (1/(n-1)) ∑i=1∞ i . ((n-1)/n)i now assuming (n-1)/n as x and applying taylor's theorem, E(X) = 1/(n-1) . (n-1)/n / (1 - (n-1)/n)2 = n –  Anuj Jul 15 '12 at 7:46
Sorry, i thought latex will work here.. Clear answer link –  Anuj Jul 15 '12 at 8:06