# In a spherical condition, given 3 points and their respective distances to a 4th point, how do a find its geolocation? [duplicate]

Possible Duplicate:
Trilateration using 3 latitude and longitude points, and 3 distances

This is more of a math question than programming question. Basically, I have P1:(lat1, lon1), P2:(lat2, lon2), P3:(lat3, lon3) and D1, D2, D3, and a 4th unknown point Px:(latx, lonx); also P1, P2, P3 do not lie in the same path of Great Circle, and D1 is the distance between P1 and Px, and D2 is the distance betwwen P2 and Px, etc.

How do I figure out the coordinates of Px?

Thanks a lot!

PS. If you are going to point to any API, I would like it to be in JavaScript.

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## marked as duplicate by Bergi, x3ro, Jeremy Banks, sachleen, JMaxJul 19 '12 at 9:13

How far will the points be away from each other, will a plane-projection and 2d-triangulation satisfy your needs? –  Bergi Jul 16 '12 at 11:02
The known points are a few km away from each other and the unknonwn point can vary from a few hundred meters to a few hundred kilometers –  Steve Jul 16 '12 at 18:39
I have found some answers here: gis.stackexchange.com/questions/66/… –  Steve Jul 17 '12 at 8:20
stackoverflow.com/questions/2813615/… answers my questions. Thanks! –  Steve Jul 17 '12 at 17:10

You have to understand that there will be multiple points that satisfy the mathematical constraint here. Think clearly, if you have two points on a sphere (ignore the geodesic form for now), P1 and P2, and you have another point T1, at distance x from P1 and distance y from P2, then you will have another symmetric (mirrored) point T1' which will satisfy the same distance conditions, on the other side, so to speak.

Even worse: Consider the case of a sphere with a diameter D. Your P1 is at the North Pole, and your P2 is at the South pole. Do you see that the all points on the equator will satisfy your condition?

Apply this to your example: Consider P1 at the North Pole. Consider P2 at the South Pole. Consider distance to Px, i.e. D1 = D2 = (2.pie.r)/4. See the problem? All points on the equator satisfy this, not a single unique point. In fact, for this case, even if D1 != D2, then you have smaller concentric lines (concentric to the equator) whose points satisfy these constraints.

Too many Px's in your case, not one. To come to a singularity point on a spherical surface, the description constraints would be more specific.

Lastly, establishing correctness of the context is important. Should your algorithm support all points that meet the criteria? Or should your criteria be altered such that the algorithm evaluates to a singular point, always. Be careful.

Again, there can be multiple points satisfying your criteria. What if P1, P2, P3 lie on the same arc? See the diagram below. Even with three points, there is no guarantee that there will be a single fourth point satisfying the distance criteria. Even with n points, there is no such guarantee.

In mathematical language, for a set of n random points, and a set of distances from these individual points, the set of resulting points that satisfy the distance criteria MAY have more than one elements.

You may be fooled into thinking: Oh, this guy is always assuming points lying on the same arc. Well, you are not making a special algorithm, are you? Your algo will be a generalized solution, won't it?

You need to guarantee that the points are not on the same arc (in a set of n points, I think at least 1 point cannot be on the same arc).

For keeping source points to a bare minimum : You need to establish traingular relations between points, because then, using ONLY two points, the triangle relation will yield exactly one point.

What triangle? Visualize this: You have two points, and a third unknown point. All distance you mention are SPHERICAL, i.e. curved surface distances. Do you see that there are also flat distances between these points? Can you visualize, that there will be a plane passing through these points, slicing the sphere, right? I say this to emphasize that you do not need to worry about surface curvature (hence 3d steradian angles). You can see the underlying 2d triangle, whose unknown vertex will also be the third point on the sphere surface.

I know this maybe very hard for you to visualize, I'll try making a diagram for this. (Can't find any good online tools!).