Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

In a coordinate system where y is up/down, z is forward/backwards, x is left/right (as in Unity3D).


(Here's a bad drawing of what I mean)

y
|
|____x
\
z

(z would be going into/out of your monitor I guess)


Given coordinate (x,z) that is guaranteed to be on this triangle, how would I get y? Assume that you know the (x,y,z) coordinates of all three triangle points, as well as the normal of the face. The triangle may be slanted on any axis.

share|improve this question

1 Answer 1

up vote 2 down vote accepted

Well, given any Vector v inside your triangle, and your normal n, we know that the dot product of n and v equals 0 (true for all points on the triangle). So:

nx * vx + ny * vy + nz * vz = 0

Little algebra to solve for vy and we have:

vy = -((nz * vz) + (nx * vx)) / ny

One thing though. v must be in the plane of your triangle, so you will need to put that vector in the plane of your triangle, by subtracting one of your vertices (say t1) from v.

So:

vx = t1x - x, vz = t1z - z, and vy = t1y - y

And therefore, your final y coordinate is: y = t1y - vy where vy is defined above.

share|improve this answer
    
Could you define what you mean by Vector inside the triangle? Would that be the (x,z) coordinate, the (x,y,z) coordinate, or a vector as in a direction? I understand the basic concepts, but I'm not the most up to date with my math terms. You lost me at the t1 part. Why would I subtract one of the vertices from v? Could you explain it to me as if I was a large child? –  ATD Jan 30 '14 at 1:56
    
t1 is any of the three vertices of your triangle. v needs to be a vector orthogonal to your normal so that the dot product will be zero. You already have t1, x, z, and your normal: n. Substituting your values into the equations above will give you your desired y. –  Steven Hansen Jan 30 '14 at 3:40
    
Subtracting {x, y, z} from t1 makes sure that the resulting vector, v is orthogonal to your normal. –  Steven Hansen Jan 30 '14 at 3:41

Your Answer

 
discard

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.