# Find perpendicular line and its intersection to a rectangle

I have three points A, B & C and a rectangle as shown below. I want to know the x,y coordinate where a ray from A would intersect the rectangle given that it must also be perpendicular to a line from BC. I know how to find the point on BC that the ray would intercept but I can't seem to figure out how to extend from there to find the point it would intercept the rectangle. Illustration:

Here is the code I'm using to find the BC intercept.

``````double k = ((By - Cy) * (Ax - Cx) - (Bx - Cx) * (Ay - Cy)) / ((By - Cy) * (By - Cy) + (Bx - Cx) * (Bx - Cx));
double Dx = Ax - k * (By - Cy);
double Dy = Ay + k * (Bx - Cx);
``````

How can I extend Dx and Dy out to intercept the rectangle?

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This is homework. You should figure it out yourself. –  DaveDev Jul 25 '12 at 13:05
anyway you don't give any information how the rectangle is expressed relative to the points. How do you someone may have a concrete solution about this problem? As far as I'm concerned it's just a matter of guessing the slope of A-B segment, then calculate the perpendicular = m, make a linear function y=mx+a where a is the deltaY from the rectangle lower side. In the end get the deltaX in the same way (from the right side) to make the rect function y=deltaX and find the intersection between the two –  Diego De Vita Jul 25 '12 at 13:08
I should have added, the points are always inside the rectangle. –  Justin Brown Jul 25 '12 at 13:10
Off the top of my head, if point `D` is your rectangle intercept, if you have the point-angle (or point-slope) equation of your general line AD, sub in the X and Y values of the various sides of your rectangle. Of the 4 answers, 2 will be in the same direction as your original angle (the other 2 will be the opposite direction). Of the remaining two, take the line segment of shortest length. That shortest line will be your intercept. EDIT: You may have to check for the corner case scenario where your `AD` line is horizontal/vertical which actually simplifies the problem even more. –  Chris Sinclair Jul 25 '12 at 13:11
@JustinBrown Depending on your algorithm, you might also need to consider the "corner case" where the line exactly intercepts at a corner. Please, hold your applause. –  Chris Sinclair Jul 25 '12 at 13:23