# How to find the intersection point between a line and a rectangle?

I have a line that goes from points A to B; I have (x,y) of both points. I also have a rectangle that's centered at B and the width and height of the rectangle.

I need to find the point in the line that intersects the rectangle. Is there a formula that gives me the (x,y) of that point?

PS: I'm working with C# but a solution in a similar language would be fine.

Thanks

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Can we assume the rectangle is aligned with the axes and not tilted? –  Grandpa Oct 18 '09 at 18:00
To those voting to close: traditionally we have allowed these kind of math questions as being close enough to programming problems and common enough in both real life programming and programming education. The thing I would look for on this questions is the real possibility that it is a duplicate. –  dmckee Oct 19 '09 at 0:00

You might want to check out Graphics Gems (http://tog.acm.org/resources/GraphicsGems/gemsii/xlines.c) - this is a classic set of routines for graphics and includes many of the algorithms required. Although it's in C and slightly dated the algorithms still sparkle and it should be trivial to transfer to other languages.

For your current problem the just create the four lines for the rectangle and see which intersect your given line.

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I ported it to ActionScript: pastebin.com/Hr1MbsGj –  Veehmot Jan 25 '13 at 7:51

The point A is always outside of the rectangle and the point B is always at the center of the rectangle

This makes things pretty simple:

The slope of the line is s = (Ay - By)/(Ax - Bx).

• If -h/2 <= s * w/2 <= h/2 then the line intersects:
• The right edge if Ax > Bx
• The left edge if Ax < Bx.
• If -w/2 <= (h/2)/s <= w/2 then the line intersects:
• The top edge if Ay > By
• The bottom edge if Ay < By.
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I'll not give you a program to do that, but here is how you can do it:

• calculate the angle of the line
• calculate the angle of a line from the center of the rectangle to one of it's corners
• based on the angles determine on which side does the line intersect the rectangle
• calculate intersection between the side of the rectangle and the line
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Here is a solution in Java that returns true if a line segment (the first 4 parameters) intersects an axis aligned rectangle (the last 4 parameters). It would be trivial to return the intersection point instead of a boolean. It works by first checking if completely outside, else using the line equation `y=m*x+b`. We know the lines that make up the rectangle are axis aligned, so the checks are easy.

``````public boolean aabbContainsSegment (float x1, float y1, float x2, float y2, float minX, float minY, float maxX, float maxY) {
// Completely outside.
if ((x1 <= minX && x2 <= minX) || (y1 <= minY && y2 <= minY) || (x1 >= maxX && x2 >= maxX) || (y1 >= maxY && y2 >= maxY))
return false;

float m = (y2 - y1) / (x2 - x1);

float y = m * (minX - x1) + y1;
if (y > minY && y < maxY) return true;

y = m * (maxX - x1) + y1;
if (y > minY && y < maxY) return true;

float x = (minY - y1) / m + x1;
if (x > minX && x < maxX) return true;

x = (maxY - y1) / m + x1;
if (x > minX && x < maxX) return true;

return false;
}
``````

It is possible to shortcut if the start or end of the segment is inside the rectangle, but probably it is better to just do the math, which will always return true if either or both segment ends are inside. If you want the shortcut anyway, insert the code below after the "completely outside" check.

``````// Start or end inside.
if ((x1 > minX && x1 < maxX && y1 > minY && y1 < maxY) || (x2 > minX && x2 < maxX && y2 > minY && y2 < maxY)) return true;
``````
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Great thanks!, this is what I was looking for. I moved it to javascript, here is the fiddle I used to test it jsfiddle.net/pjnovas/fPMG5 cheers! –  pjnovas Sep 28 '13 at 16:36

I don't know if this is the best way, but what you could do is to figure out the proportion of the line that is inside the rectangle. You can get that from the width of the rectangle and the difference between the x coordinates of A and B (or height and y coordinates; based on the width and height you can check which case applies, and the other case will be on the extension of a side of the rectangle). When you have this, just take that proportion of the vector from B to A and you have your intersection point's coordinates.

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I am not a math fan nor do I particularly enjoy translating stuff from other languages if others have already done so, so whenever I complete a boring translation task, I add it to the article that led me to the code. To prevent anyone doing double work.

So if you want to have this intersection code in C#, have a look here http://dotnetbyexample.blogspot.nl/2013/09/utility-classes-to-check-if-lines-andor.html

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Here is a slightly verbose method that returns the intersection intervals between an (infinite) line and a rectangle using only basic math:

``````// Line2      - 2D line with origin (= offset from 0,0) and direction
// Rectangle2 - 2D rectangle by min and max points
// Contacts   - Stores entry and exit times of a line through a convex shape

Contacts findContacts(const Line2 &line, const Rectangle2 &rect) {
Contacts contacts;

// If the line is not parallel to the Y axis, find out when it will cross
// the limits of the rectangle horizontally
if(line.Direction.X != 0.0f) {
float leftTouch = (rect.Min.X - line.Origin.X) / line.Direction.X;
float rightTouch = (rect.Max.X - line.Origin.X) / line.Direction.X;
contacts.Entry = std::fmin(leftTouch, rightTouch);
contacts.Exit = std::fmax(leftTouch, rightTouch);
} else if((line.Offset.X < rect.Min.X) || (line.Offset.X >= rect.Max.X)) {
return Contacts::None; // Rectangle missed by vertical line
}

// If the line is not parallel to the X axis, find out when it will cross
// the limits of the rectangle vertically
if(line.Direction.Y != 0.0f) {
float topTouch = (rectangle.Min.Y - line.Offset.Y) / line.Direction.Y;
float bottomTouch = (rectangle.Max.Y - line.Offset.Y) / line.Direction.Y;

// If the line is parallel to the Y axis (and it goes through
// the rectangle), only the Y axis needs to be taken into account.
if(line.Direction.X == 0.0f) {
contacts.Entry = std::fmin(topTouch, bottomTouch);
contacts.Exit = std::fmax(topTouch, bottomTouch);
} else {
float verticalEntry = std::fmin(topTouch, bottomTouch);
float verticalExit = std::fmax(topTouch, bottomTouch);

// If the line already left the rectangle on one axis before entering it
// on the other, it has missed the rectangle.
if((verticalExit < contacts.Entry) || (contacts.Exit < verticalEntry)) {
return Contacts::None;
}

// Restrict the intervals from the X axis of the rectangle to where
// the line is also within the limits of the rectangle on the Y axis
contacts.Entry = std::fmax(verticalEntry, contacts.Entry);
contacts.Exit = std::fmin(verticalExit, contacts.Exit);
}
} else if((line.Offset.Y < rect.Min.Y) || (line.Offset.Y > rect.Max.Y)) {
return Contacts::None; // Rectangle missed by horizontal line
}

return contacts;
}
``````

This approach offers a high degree of numerical stability (the intervals are, in all cases, the result of a single subtraction and division) but involves some branching.

For a line segment (with start and end points), you'd need to provide the segment's start point as the origin and for the direction, `end - start`. Calculating the coordinates of the two intersections is a simple as `entryPoint = origin + direction * contacts.Entry` and `exitPoint = origin + direction * contacts.Exit`.

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