# Get endpoints of the line segment defined by the intersection of two rectangles

I tried the algorithms in Intersection between two planes

but all not return correct results

I have two rectangle in 3D each defined by three points , I want to get the two points on the line of intersection such that the two points at the end of the intersection I do the following steps:

• convert each rectangle to two planes , using three points
• get the line direction by do the cross product of the normal of each plane

I want to get the actual end points of line that lie on the boundary of the plane

Best regards

-
Can you show some test results, code, test cases? Maybe it's a bug in a code, nobody can tell without checking it, maybe you are misunderstanding the idea. Are you sure that you are not dealing with special case when your planes have infinite number of intersection points or none at all? (same a,b,c, same or different d) – Marcin Deptuła Aug 9 '11 at 8:51
Do you just need the line segment that constitutes the intersection of the 2 rectangles? – Rafał Dowgird Aug 9 '11 at 8:57
@Rafal yes I need the line segment – AMH Aug 9 '11 at 9:19
@jean , I cannot understand u , what the problem – AMH Aug 9 '11 at 9:30
I said that I have two rectangles, I converted them to planes – AMH Aug 9 '11 at 11:22

## 1 Answer

The link you provided most probably has the correct solution :) Did you correctly transform your three points info the Ax+By+Cz+D = 0 form? Check if all those points satisfy this formula. If you have the correct {A, B, C, D} then it's easy to calculate the rest as described in the link..

Here is a link which explains how to get this formula using 3 points.

Ok, here a simple summary:

• Given three points in space (x1,y1,z1), (x2,y2,z2), (x3,y3,z3), calculate this:

A = y1 (z2 - z3) + y2 (z3 - z1) + y3 (z1 - z2)

B = z1 (x2 - x3) + z2 (x3 - x1) + z3 (x1 - x2)

C = x1 (y2 - y3) + x2 (y3 - y1) + x3 (y1 - y2)

D = -(x1 (y2 z3 - y3 z2) + x2 (y3 z1 - y1 z3) + x3 (y1 z2 - y2 z1))

for both planes. Which means you have A1, B1, C1, D1 and A2, B2, C2, D2.

• Using A, B, C, D calculate this:

x1 = 0

z1 = (B2/B1)*D1 - D2)/(C2 - C1*B2/B1)

y1 = (-C1 * z1 - D1) / B1

• Then this:

x2 = some value..

z2 = (B2/B1)*(A1 * x2 + D1) - A2 * x2 - D2)/(C2 - C1*B2/B1)

y2 = (-C1 * z2 -A1 * x2 - D1) / B1

Basically just combine both ways described in those two links..

-
the problem is the two planes represent two rectangles , so I need to get them correctly, I get y,z correctly, but x value fail – AMH Aug 9 '11 at 9:08
what do you mean by that? I think you're problem is how to convert your rectangle (or 3 points) into Ax+By+Cz+D=0, right? – duedl0r Aug 9 '11 at 9:11
No I got the line direction by the cross product , I want to get the two points on the line and I successfully got it , the problem is to get the x value , do u have skype account to chat, what's the need to get the Ax+Bc+Cz+D = 0 – AMH Aug 9 '11 at 9:16
This is not a real answer... belongs in comments. – Jean-François Corbett Aug 9 '11 at 9:22
@AMH: I think you should clarify what you really have and what not, now I don't really see your problem anymore :) Since you don't have {A,B,C,D}, you can't use the solution you provided in your link.. – duedl0r Aug 9 '11 at 9:31