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This problem is basically an algorithm optimization problem.

We have a list which has n elements. for e.g. {n1,n2,n3...nk} This list is sorted and we have to find out the number ni which is

  1. n1<=ni<=nk
  2. The sum of distance of ni from each number is minimum.

There may be total (nk-n1+1) possible numbers but our objective is to find out the number ni which is nearest to all other numbers.

Brute force approach could be iterate through n1 to nk and calculate the sum of distance from all list numbers. This way easily we can figure out the number who is closest to all other numbers in the list.

But the problem with this approach is, it is not good in terms of time complexity. The time complexity of this approach is O(n^2).

I think there could be better method to do this which can solve this problem with less time complexity.

Any approach will be appreciated.

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What definition of "distance" do you use? –  Klas Lindbäck Feb 26 '13 at 13:25
    
How about searching with binary search cos you mentioned that list is sorted? –  kamaci Feb 26 '13 at 13:26
    
yes distance(a,b)=abs(a-b) –  vicky Feb 27 '13 at 5:26

3 Answers 3

up vote 6 down vote accepted

If by "distance" you mean distance(a,b) = abs(a-b) then you simply need to find the median.

Finding the median in a sorted list is O(1).

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you might mean "medoid" (its value coincides with the median in 1d case for the given distance definition (abs(a-b)) if there are odd number of elements). –  J.F. Sebastian Feb 26 '13 at 13:56
    
@Sebastian: Yes I do. If there are an even number of elements, then either/both medoids will do. –  Klas Lindbäck Feb 26 '13 at 14:08
    
Yes if there are even number of elements . then nearest number should be average of two middle numbers. if b1 and b2 are two middle numbers then nearest number should be (b1+b2)/2. –  vicky Feb 27 '13 at 5:31

Find the average ... this takes O(n). Then walk through the list to find ni for the average (also takes O(n))... actually more like o(1/2n)

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The answer should be ROUND( SUM(n1,...,nk)/k ) .

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