# plane equation from two 3D points and perpendicular distance between that plane and a point

I have three 3d points say A(x1,y1,z1), B(x2,y2,z2) and C(x3,y3,z3). How to get an equation of plane that passes through point A and B , then how to get perpendicular distance from point C to this plane. Perpendicular distance will be distance between plane passing through point C and parallel to plane b/w A and B. Is there any short way to implement these calculation, as I want these calculation to implement in code in C language with time of execution as major concern. Main aim is to find perpendicular distance b/w C and plane containing A and B.

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You need to add math tag to this. This is not a C question – mathematician1975 Jun 20 '12 at 6:14
Isnt there more than one plane passing through the two points? – jacksparrow007 Jun 20 '12 at 6:15
There is an infinite number of planes passing through two points in a 3d space... You need at least three points which are not all on a line in order to define a plane. – smichak Jun 20 '12 at 6:18
As jacksparrow007 and smichak says, there are an infinite number of planes that share points A and B. I think you perhaps need to rethink the question – mathematician1975 Jun 20 '12 at 6:20
@ParitoshBairagi: Draw a plane that goes through A, B and C (you can always draw a plane through any three points). Then perpendicular distance from the plane to C becomes 0. Nothing to calculate. '0' is one of the valid answers. What I am trying to point out is, that your question is flawed. – ArjunShankar Jun 20 '12 at 11:35

2 points define a line. You can always choose a plane including both that line and point `C`, hence the distance is always zero.

The C you're looking for is something like:

``````struct Point {
double x;
double y;
double z;
};

double perpendicular_distance(struct Point *a, struct Point *b, struct Point *c)
{
return 0.0;
}
``````

Seriously, understand the maths first.

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Your problem is underconstrained as written. There are an infinte number of planes containing the two points A and B; the distance to any third point P will be in the range [0, X] where X is the distance between P and the line connecting points A and B. So, if all you're interested in doing is finding the distance between the point P and the line connecting A and B, there's an algorithm for that. This will also uniquely define the plane containing A and B which is most distant from P.

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