# Find coordinate at minimum distance from list of coordinates

I have a list of coordinates in 2D space (xi, yi). How can I find a coordinate (X, Y) such that the distance between it and the other given coordinates is minimum? Is there a mathematical formula to solve for (X, Y)?

Let me give an example.. Lets say i have list of co.ordinates (0,0);(1,0);(0,1);(-1,0);(0,-1); Now i have to findout possible co.ordinate(s)(one or many) such that the resulting co.ordinate is at minimun distance from all the points. in this case (0,0).

As Voo said,This is my requirement : Find a point that minimizes the sum of the distances to the points in a given set

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@Voo: Oh, yes, that's possible. The OP hasn't mentioned "sum", but I think you could be right. Let's hope they clarify... – Oliver Charlesworth May 9 '12 at 13:45
TFool, please clarify exactly what you're looking for. – Oliver Charlesworth May 9 '12 at 13:47
@Oli I think we should stop deleting posts/comments, otherwise this is getting quite complicated ;) (I wouldn't have deleted your answer though, it was a good answer for one possible interpretation after all) To sum up the conversation: There are two ways to interpret the question: Find the point in the given set that has a minimum distance to a given point. Or: Find a point that minimizes the sum of the distances to the points in a given set. – Voo May 9 '12 at 13:47
@voo: yes u r correct.. This is my requirement : Find a point that minimizes the sum of the distances to the points in a given set – Jeevi May 10 '12 at 5:33

Assuming you're asking for the closest candidate to a given point

The simplest approach is simply too loop over every candidate coordinate, compute the Euclidean distance (assuming you want a Euclidean metric), and track the minimum. Is that sufficient?

More complex (but potentially faster) approaches involve storing your candidate points in e.g. a space-partitioning tree, e.g. a quad-tree, or a kd-tree, or one of several other variants.

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``````public Coord2D minDistance(List<Coord2D> coordinates, Coord2D someCoord) {
float minDistance = Float.MAX_VALUE;
Coord2D result;
for (Coord2D coord : coordinates) {
float distance = Math.sqrt(Math.pow((coord.x - someCoord.x), 2) + (Math.pow((coord.y - someCoord.y), 2))
if (distance < result) {
result = coord;
minDistance = distance;
}
}

return result;
}
``````
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If the list was large then you could improve performance by only doing a single sqrt outside the loop. – David Heffernan May 9 '12 at 13:48
@DavidHeffernan you mean for the power calculation for someCoord (sqrt must be calculated per coordinate) – giorashc May 9 '12 at 13:49
No, since sqrt is monotonic, you the point that minimises f(x) also minimises f(x)^2 so you can postpone the sqrt to the end. – David Heffernan May 9 '12 at 13:52

You can calculate distance between two points using euclidien distance formula: squareroot((x1-X)²+(yi-Y)²) or you can use manhattan formula: |yi-Y|+|xi-X|.

Is this a pathfinding problem?

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Requirement: Find a point that minimizes the sum of the distances to the points in a given set.

The point with the minimum euclidean distance sum to all other points, has:

x = mean average of all X in the set
y = mean average of all Y in the set

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