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# Dynamic Programming of Median Location

I am stuck on this problem and was wondering if anyone could help me out: There are n houses on the x-axis {x_1, x_2,...x_n}, I need to find the location on the x-axis that gives me the smallest sum of distances between the houses and the location.

This is trivial of course, but I also need to be able to do it in O(n) time, and I am stuck on the dynamic algorithm.

Edit: Apparently it did not need to be a DP algorithm, which as I said makes it trivial, sorry for the confusion, and thanks for the responses.

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i don't think your question makes sense... if you are anywhere on the line (in between the houses) and you add up your distance to all the other houses - then that will be the same number no matter where you are... – Randy Jan 10 '12 at 19:21
@Randy: That's not true. Consider {1,3,5}. By your argument, 2 would solve the problem, but it doesn't (3 is better). – NPE Jan 10 '12 at 19:26
yes - thanks this is really a median calculation question.. – Randy Jan 10 '12 at 22:33

I know median finding reasonably well, and I know dynamic programming reasonably well, but I don't know of any median finding algorithms that I could reasonably construe as DP.

If your x's were sorted and you didn't know the median was the answer, I could see computing partial sums from the right and left of a given index as DP-ish sub problems. The optimal solution then minimizes the sum of the right and left partial sums.

But of course, I strongly dislike problems that say, "Solve X with Y", especially when Y doesn't really fit. "Solve X, you might want to consider using Y", is a much better form of problem.

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The problem doesn't specifically say solve using DP, but it is strongly implied that that is how they want it solved. I will probably just do it another way. Thanks for reaffirming my thoughts. – NominSim Jan 10 '12 at 20:04

Solving the problem amounts to finding the median of {xi}.

There are well-known linear-time algorithms for finding the median. See, for example, Wikipedia.

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Yeah I know that the median is the answer, rather is one possible answer, but I believe I need a dynamic algorithm to solve it in order to get credit, which is where I am blanking. – NominSim Jan 10 '12 at 19:32
@GordonSimpson: you might want to try to set up a simple equation and see if it works. If it doesn't, post it here. You know we love it when folks who ask questions first show their own attempts. – Hovercraft Full Of Eels Jan 10 '12 at 19:38
Is the median really the answer? I would have thought the average was the answer. Consider {1,2,9}. The sum of distances from the median is (1-2)+(2-2)+(9-2)=6. The sum of distances from the average is (1-4)+(2-4)+(9-4)=0. (By definition it always equals zero.) Perhaps I am seriously misinterpreting the question. – emory Jan 10 '12 at 19:45
@emory: I think the misunderstanding is that you need to take absolute values (since the distances are not signed): |1-4|+|2-4|+|9-4|=10. On the other hand |1-2|+|2-2|+|9-2|=8. – NPE Jan 10 '12 at 19:46
@aix I see your point. The median is the answer. – emory Jan 10 '12 at 19:54