# How to find y at given point (x,z) on 3D triangle?

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.

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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.

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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