# Simple line-plane intersection on a fixed z-axis?

What is, and is there, a fast way to check where in the plane my line will intersect, if i know the plane is always in the same z-axis (so it cannot be rotated), and its width/height is infinite? Also, my "line" isn't actually a line, but a 3d vector, so the "line" can go to infinite distance.

Here is the code that relies on two points: (p1 and p2 are start and end points of the line. plane_z = where the plane is)

``````k1 = -p2.z/(p1.z-p2.z-plane_z);
k2 = 1.0f-k1;
ix = k1*p1.x + k2*p2.x;
iy = k1*p1.y + k2*p2.y;
iz = plane_z; // where my plane lays
``````

Another solution which works with a vector (i made it use two points as the first example did too, "p2.x-p1.x" etc. is the vector calculation):

``````a = (plane_z-p1.z)/(p2.z-p1.z);
ix = p1.x + a*(p2.x-p1.x);
iy = p1.y + a*(p2.y-p1.y);
iz = plane_z;
``````

Edit3: added Orbling's solution which is slightly faster, and doesnt rely on two points necessarily.

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That's just the intersection between a line and a plane. –  Orbling May 26 '11 at 13:25
@Orbling, that is not the same, since i dont have a line, i only have a direction where the line is going, so im hoping this would make the calculations simpler. Plus, i dont understand those formulaes on the wikipedia... and why would i come here if i was master at maths already...? –  Rookie May 26 '11 at 13:38
@Rookie: No need for the tone. If you only have a direction and no point. Then what you have is infinitely many lines/planes, all of which have infinite points of intersection with your primary plane. There is no point of intersection, unless the line is actually bound to a specific location. –  Orbling May 26 '11 at 13:42
@Orbling, i only have one plane and one line. i was thinking if this could be calculated somehow without specifying the start and end position of my line, since those are irrelevant: i should always be able to get intersect point (except the 2 cases). And the problem is: i should be able to calculate this without the end point of the line, because how do i really get the endpoint...? i would have to calculate that somehow, and that is useless calculations since it doesnt matter for me how far i am from the plane.. well, i am not a math guy so maybe this is not even possible. thats why i asked. –  Rookie May 26 '11 at 14:05
@Rookie, you don't need the start and end position of your line. Just any point that's on it. A point it travels through. –  Orbling May 26 '11 at 14:14

You can implement a strait-forward solution like there http://paulbourke.net/geometry/planeline/, then apply your simplifications. In the algebraic solution (#2) A and B are zeros in your case (if i understand correctly this statement)

plane is always in the same z-axis (so it cannot be rotated)

Note: your line should be a point and a direction, or two points right?

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He says he doesn't have a point, only a direction - but that is not a line. So perhaps he has like a viewpoint, origin or object centre. :-/ –  Orbling May 26 '11 at 13:50
@Rookie, can you give us more about what your are trying to achieve here, context etc ... –  vrince May 26 '11 at 13:55
maybe this is not even possible, seems like i must have two points, but as i mentioned in my question comments, the annoyance is that i must calculate the end position of my line to be able to get the intersection point. i was hoping this could be optimized somehow, i have working code for the intersection point, but it still requires two points. –  Rookie May 26 '11 at 14:13
@Rookie: It sounds entirely possible, just you need a point not a start, not an end, just any given point the line runs through, otherwise the line could move about anywhere couldn't it? If it was just a direction. How is this direction described, does it come from somewhere? –  Orbling May 26 '11 at 14:20
@Orbling, oh yeah, you are right, it needs a start position of course. but not end position, as my code requires now. mind seeing my code to see if the end pos can be eliminated? (editing my question post now). –  Rookie May 26 '11 at 14:26