Announcing Stack Overflow Documentation

We started with Q&A. Technical documentation is next, and we need your help.

Whether you're a beginner or an experienced developer, you can contribute.

Sign up and start helping → Learn more about Documentation →

If I have two vector coordinates representing positions on the surface of the earth where the center of the earth is (0,0,0) and the Up vector is (0,0,1); What is the best way to calculate a 3d plane that is running along the two vectors (the direction v2 - v1) but back by a set number of meters (just imagine a virtual clip plane that is behind the two vectors and running parallel to them).

share|improve this question
The question, as it is, isn't perfectly clear. The main thing is: how do you want to describe the plane? Could you add a sketch? (I'll attempt an answer nonetheless) – DarenW Jun 30 '10 at 4:22
As others say, choose a point guaranteed to be on your plane. In your case, choose a point at a distance j along the line in the direction of the normal vector. – maxwellb Jun 30 '10 at 4:52
How do you want to represent your plane? As a mathematical equality? (ie, 2x + 3y - z = 3) – Justin L. Jun 30 '10 at 5:46
up vote 0 down vote accepted

well, you do the cross product of v1 and v2 to get the normal of your plane (don't forget to normalize if you want to), then the 4th element of your plane would just be 0 (because it crosses 0,0,0).

and then you want to project the plane in a certain direction based on the UP vector, not the plane's normal?

in that case I think you would just get the dot product of the normal and the up vector, then multiply the inverse of the dot (1/dot) by the number of units you want to project along the up vector and set that as your 4th element?

to clarify, that creates a plane where the two vectors, and the center of the earth are points on the plane, the plane can then be projected up or down by a certain amount in the UP direction.

share|improve this answer
I think his up vector is extraneous information. So just adjust the d term in the plane equation (ax+by+cz+d=0) by the offset amount. Since the d term will be zero, just stuff the offset in there. – phkahler Jun 30 '10 at 21:29

Planes are usually described by a normal vector N, and as all points x,y,z fitting the equation Ax + By + Cz + D = 0. (A,B,C) is the normal vector. It doesn't even need to be normalized (unit length) if you choose D. Sounds like you want a plane to which v1 and v2 are parallel (and v2-v1 too). For that, make N perpendicular to v1 and v2 by setting it to the cross product of v2 x v1. Then pick a point in (x,y,z) coordinates that you know the plane should pass through. Plug N and (x,y,z) into the equation and compute D.

share|improve this answer

1- Find the Normal vector N = V1 X V2

2-Select a point that you want your plane tuch P0 ==>R0

3- All the other points(P==>R) in the plane follow N(R-R0)=0

See the link

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.