# 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?

• Can we assume the rectangle is aligned with the axes and not tilted? Commented Oct 18, 2009 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. Commented Oct 19, 2009 at 0:00

``````/**
* Finds the intersection point between
*     * the rectangle
*       with parallel sides to the x and y axes
*     * the half-line pointing towards (x,y)
*       originating from the middle of the rectangle
*
* Note: the function works given min[XY] <= max[XY],
*       even though minY may not be the "top" of the rectangle
*       because the coordinate system is flipped.
* Note: if the input is inside the rectangle,
*       the line segment wouldn't have an intersection with the rectangle,
*       but the projected half-line does.
* Warning: passing in the middle of the rectangle will return the midpoint itself
*          there are infinitely many half-lines projected in all directions,
*          so let's just shortcut to midpoint (GIGO).
*
* @param x:Number x coordinate of point to build the half-line from
* @param y:Number y coordinate of point to build the half-line from
* @param minX:Number the "left" side of the rectangle
* @param minY:Number the "top" side of the rectangle
* @param maxX:Number the "right" side of the rectangle
* @param maxY:Number the "bottom" side of the rectangle
* @param validate:boolean (optional) whether to treat point inside the rect as error
* @return an object with x and y members for the intersection
* @throws if validate == true and (x,y) is inside the rectangle
* @author TWiStErRob
* @licence Dual CC0/WTFPL/Unlicence, whatever floats your boat
* @see <a href="http://stackoverflow.com/a/31254199/253468">source</a>
* @see <a href="http://stackoverflow.com/a/18292964/253468">based on</a>
*/
function pointOnRect(x, y, minX, minY, maxX, maxY, validate) {
//assert minX <= maxX;
//assert minY <= maxY;
if (validate && (minX < x && x < maxX) && (minY < y && y < maxY))
throw "Point " + [x,y] + "cannot be inside "
+ "the rectangle: " + [minX, minY] + " - " + [maxX, maxY] + ".";
var midX = (minX + maxX) / 2;
var midY = (minY + maxY) / 2;
// if (midX - x == 0) -> m == ±Inf -> minYx/maxYx == x (because value / ±Inf = ±0)
var m = (midY - y) / (midX - x);

if (x <= midX) { // check "left" side
var minXy = m * (minX - x) + y;
if (minY <= minXy && minXy <= maxY)
return {x: minX, y: minXy};
}

if (x >= midX) { // check "right" side
var maxXy = m * (maxX - x) + y;
if (minY <= maxXy && maxXy <= maxY)
return {x: maxX, y: maxXy};
}

if (y <= midY) { // check "top" side
var minYx = (minY - y) / m + x;
if (minX <= minYx && minYx <= maxX)
return {x: minYx, y: minY};
}

if (y >= midY) { // check "bottom" side
var maxYx = (maxY - y) / m + x;
if (minX <= maxYx && maxYx <= maxX)
return {x: maxYx, y: maxY};
}

// edge case when finding midpoint intersection: m = 0/0 = NaN
if (x === midX && y === midY) return {x: x, y: y};

// Should never happen :) If it does, please tell me!
throw "Cannot find intersection for " + [x,y]
+ " inside rectangle " + [minX, minY] + " - " + [maxX, maxY] + ".";
}

(function tests() {
var left = 100, right = 200, top = 50, bottom = 150; // a square, really
var hMiddle = (left + right) / 2, vMiddle = (top + bottom) / 2;
function intersectTestRect(x, y) { return pointOnRect(x,y, left,top, right,bottom, true); }
function intersectTestRectNoValidation(x, y) { return pointOnRect(x,y, left,top, right,bottom, false); }
function checkTestRect(x, y) { return function() { return pointOnRect(x,y, left,top, right,bottom, true); }; }
QUnit.test("intersects left side", function(assert) {
var leftOfRect = 0, closerLeftOfRect = 25;
assert.deepEqual(intersectTestRect(leftOfRect, 25), {x:left, y:75}, "point above top");
assert.deepEqual(intersectTestRect(closerLeftOfRect, top), {x:left, y:80}, "point in line with top");
assert.deepEqual(intersectTestRect(leftOfRect, 70), {x:left, y:90}, "point above middle");
assert.deepEqual(intersectTestRect(leftOfRect, vMiddle), {x:left, y:100}, "point exact middle");
assert.deepEqual(intersectTestRect(leftOfRect, 130), {x:left, y:110}, "point below middle");
assert.deepEqual(intersectTestRect(closerLeftOfRect, bottom), {x:left, y:120}, "point in line with bottom");
assert.deepEqual(intersectTestRect(leftOfRect, 175), {x:left, y:125}, "point below bottom");
});
QUnit.test("intersects right side", function(assert) {
var rightOfRect = 300, closerRightOfRect = 250;
assert.deepEqual(intersectTestRect(rightOfRect, 25), {x:right, y:75}, "point above top");
assert.deepEqual(intersectTestRect(closerRightOfRect, top), {x:right, y:75}, "point in line with top");
assert.deepEqual(intersectTestRect(rightOfRect, 70), {x:right, y:90}, "point above middle");
assert.deepEqual(intersectTestRect(rightOfRect, vMiddle), {x:right, y:100}, "point exact middle");
assert.deepEqual(intersectTestRect(rightOfRect, 130), {x:right, y:110}, "point below middle");
assert.deepEqual(intersectTestRect(closerRightOfRect, bottom), {x:right, y:125}, "point in line with bottom");
assert.deepEqual(intersectTestRect(rightOfRect, 175), {x:right, y:125}, "point below bottom");
});
QUnit.test("intersects top side", function(assert) {
var aboveRect = 0;
assert.deepEqual(intersectTestRect(80, aboveRect), {x:115, y:top}, "point left of left");
assert.deepEqual(intersectTestRect(left, aboveRect), {x:125, y:top}, "point in line with left");
assert.deepEqual(intersectTestRect(120, aboveRect), {x:135, y:top}, "point left of middle");
assert.deepEqual(intersectTestRect(hMiddle, aboveRect), {x:150, y:top}, "point exact middle");
assert.deepEqual(intersectTestRect(180, aboveRect), {x:165, y:top}, "point right of middle");
assert.deepEqual(intersectTestRect(right, aboveRect), {x:175, y:top}, "point in line with right");
assert.deepEqual(intersectTestRect(220, aboveRect), {x:185, y:top}, "point right of right");
});
QUnit.test("intersects bottom side", function(assert) {
var belowRect = 200;
assert.deepEqual(intersectTestRect(80, belowRect), {x:115, y:bottom}, "point left of left");
assert.deepEqual(intersectTestRect(left, belowRect), {x:125, y:bottom}, "point in line with left");
assert.deepEqual(intersectTestRect(120, belowRect), {x:135, y:bottom}, "point left of middle");
assert.deepEqual(intersectTestRect(hMiddle, belowRect), {x:150, y:bottom}, "point exact middle");
assert.deepEqual(intersectTestRect(180, belowRect), {x:165, y:bottom}, "point right of middle");
assert.deepEqual(intersectTestRect(right, belowRect), {x:175, y:bottom}, "point in line with right");
assert.deepEqual(intersectTestRect(220, belowRect), {x:185, y:bottom}, "point right of right");
});
QUnit.test("intersects a corner", function(assert) {
assert.deepEqual(intersectTestRect(left-50, top-50), {x:left, y:top}, "intersection line aligned with top-left corner");
assert.deepEqual(intersectTestRect(right+50, top-50), {x:right, y:top}, "intersection line aligned with top-right corner");
assert.deepEqual(intersectTestRect(left-50, bottom+50), {x:left, y:bottom}, "intersection line aligned with bottom-left corner");
assert.deepEqual(intersectTestRect(right+50, bottom+50), {x:right, y:bottom}, "intersection line aligned with bottom-right corner");
});
QUnit.test("on the corners", function(assert) {
assert.deepEqual(intersectTestRect(left, top), {x:left, y:top}, "top-left corner");
assert.deepEqual(intersectTestRect(right, top), {x:right, y:top}, "top-right corner");
assert.deepEqual(intersectTestRect(right, bottom), {x:right, y:bottom}, "bottom-right corner");
assert.deepEqual(intersectTestRect(left, bottom), {x:left, y:bottom}, "bottom-left corner");
});
QUnit.test("on the edges", function(assert) {
assert.deepEqual(intersectTestRect(hMiddle, top), {x:hMiddle, y:top}, "top edge");
assert.deepEqual(intersectTestRect(right, vMiddle), {x:right, y:vMiddle}, "right edge");
assert.deepEqual(intersectTestRect(hMiddle, bottom), {x:hMiddle, y:bottom}, "bottom edge");
assert.deepEqual(intersectTestRect(left, vMiddle), {x:left, y:vMiddle}, "left edge");
});
QUnit.test("validates inputs", function(assert) {
assert.throws(checkTestRect(hMiddle, vMiddle), /cannot be inside/, "center");
assert.throws(checkTestRect(hMiddle-10, vMiddle-10), /cannot be inside/, "top left of center");
assert.throws(checkTestRect(hMiddle-10, vMiddle), /cannot be inside/, "left of center");
assert.throws(checkTestRect(hMiddle-10, vMiddle+10), /cannot be inside/, "bottom left of center");
assert.throws(checkTestRect(hMiddle, vMiddle-10), /cannot be inside/, "above center");
assert.throws(checkTestRect(hMiddle, vMiddle), /cannot be inside/, "center");
assert.throws(checkTestRect(hMiddle, vMiddle+10), /cannot be inside/, "below center");
assert.throws(checkTestRect(hMiddle+10, vMiddle-10), /cannot be inside/, "top right of center");
assert.throws(checkTestRect(hMiddle+10, vMiddle), /cannot be inside/, "right of center");
assert.throws(checkTestRect(hMiddle+10, vMiddle+10), /cannot be inside/, "bottom right of center");
assert.throws(checkTestRect(left+10, vMiddle-10), /cannot be inside/, "right of left edge");
assert.throws(checkTestRect(left+10, vMiddle), /cannot be inside/, "right of left edge");
assert.throws(checkTestRect(left+10, vMiddle+10), /cannot be inside/, "right of left edge");
assert.throws(checkTestRect(right-10, vMiddle-10), /cannot be inside/, "left of right edge");
assert.throws(checkTestRect(right-10, vMiddle), /cannot be inside/, "left of right edge");
assert.throws(checkTestRect(right-10, vMiddle+10), /cannot be inside/, "left of right edge");
assert.throws(checkTestRect(hMiddle-10, top+10), /cannot be inside/, "below top edge");
assert.throws(checkTestRect(hMiddle, top+10), /cannot be inside/, "below top edge");
assert.throws(checkTestRect(hMiddle+10, top+10), /cannot be inside/, "below top edge");
assert.throws(checkTestRect(hMiddle-10, bottom-10), /cannot be inside/, "above bottom edge");
assert.throws(checkTestRect(hMiddle, bottom-10), /cannot be inside/, "above bottom edge");
assert.throws(checkTestRect(hMiddle+10, bottom-10), /cannot be inside/, "above bottom edge");
});
QUnit.test("doesn't validate inputs", function(assert) {
assert.deepEqual(intersectTestRectNoValidation(hMiddle-10, vMiddle-10), {x:left, y:top}, "top left of center");
assert.deepEqual(intersectTestRectNoValidation(hMiddle-10, vMiddle), {x:left, y:vMiddle}, "left of center");
assert.deepEqual(intersectTestRectNoValidation(hMiddle-10, vMiddle+10), {x:left, y:bottom}, "bottom left of center");
assert.deepEqual(intersectTestRectNoValidation(hMiddle, vMiddle-10), {x:hMiddle, y:top}, "above center");
assert.deepEqual(intersectTestRectNoValidation(hMiddle, vMiddle), {x:hMiddle, y:vMiddle}, "center");
assert.deepEqual(intersectTestRectNoValidation(hMiddle, vMiddle+10), {x:hMiddle, y:bottom}, "below center");
assert.deepEqual(intersectTestRectNoValidation(hMiddle+10, vMiddle-10), {x:right, y:top}, "top right of center");
assert.deepEqual(intersectTestRectNoValidation(hMiddle+10, vMiddle), {x:right, y:vMiddle}, "right of center");
assert.deepEqual(intersectTestRectNoValidation(hMiddle+10, vMiddle+10), {x:right, y:bottom}, "bottom right of center");
});
})();``````
``````<link href="https://code.jquery.com/qunit/qunit-2.3.2.css" rel="stylesheet"/>
<script src="https://code.jquery.com/qunit/qunit-2.3.2.js"></script>
<div id="qunit"></div>``````

• Excellent answer. I just shamelessly stole your function for this question and worked like a charm.
– Mark
Commented Jan 6, 2017 at 18:43
• @Mark Attribution is never shameless, and way better than a link-only answer ;) Commented Jan 6, 2017 at 23:00
• That's neat, it's what I need ;) Commented Nov 30, 2021 at 8:14

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

Assuming the rectangle is axis-aligned, 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.

Once you know the edge it intersects you know one coordinate: x = Bx ± w/2 or y = By ± h/2 depending on which edge you hit. The other coordinate is given by y = By + s * w/2 or x = Bx + (h/2)/s.

• Thanks Joren, I'v made a fiddle of this algorithm: jsfiddle.net/524ctnfh It's seems right-left and top-bottom edges are swapped-around, so it should be: right: Ax < Bx; left: Ax > Bx; top: Ay < By; bottom: Ay > By; Commented Feb 3, 2015 at 9:33
• Sorry, I'v made some mistakes in the script, here is fixed version: jsfiddle.net/524ctnfh/1 Commented Feb 4, 2015 at 16:53
• An implementation of a similar one in JavaScript: stackoverflow.com/a/31254199/253468 Commented Jul 6, 2015 at 19:43
• @Johnner: Assuming a standard coordinate system where x increases left-to-right, then Ax < Bx definitely implies that point A is to the left of the rectangle with center B (and Ax > Bx => to the right). Top-bottom could indeed be flipped depending on your coordinate system convention. I'm using a right-handed coordinate system where y increases bottom-to-top (as is standard in mathematics), while you're probably thinking of a left-handed coordinate system where y increases top-to-bottom (as is standard in graphics & UI programming). Commented Jul 7, 2015 at 13:32
• This answer is incomplete. OP says he "need[s] to find the point in the line that intersects the rectangle" - not just which side of the rectangle it intersects. Commented Oct 25, 2016 at 21:35

You might want to check out Graphics Gems - 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.

• This is too far from what the OP asked. Commented Jul 6, 2015 at 18:37

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;
``````
• 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! Commented Sep 28, 2013 at 16:36
• i can spot couple potential divide by zeros here Commented Feb 8, 2015 at 19:45
• @gzmask It's true, but the method still appears to return the correct values for all inputs (in Java and JavaScript `x/0=Infinity` and `x/Infinity=0`). See here. Commented Feb 8, 2015 at 23:21
• I added a specialized version of this with all "trivial" stuff and "shortcuts": stackoverflow.com/a/31254199/253468 Commented Jul 6, 2015 at 19:41
• Warning: this returns false if the line crosses exactly the corner. jsfiddle.net/obgxhyku Commented Aug 27, 2021 at 21:50

Given the original question, I think that @ivanross answer is the most concise and clear so far, and I found myself using the same approach.

If we have a rectangle

• centered in B
• with sides parallel to x and y axes

we can use a bit of trigonometry to get:

• tan φ (phi) = h/w
• tan θ (theta) = (yB-yA)/(xB-xA)

and some trivial math to get in which quadrant (of the x-y plane centered in B) the point A is.

finally we compare the angles and use the tangents to calculate the coordinates of the intersection point, applying again basic trigonometry principles.

``````/**
* Finds the intersection point between
*     * a rectangle centered in point B
*       with sides parallel to the x and y axes
*     * a line passing through points A and B (the center of the rectangle)
*
* @param width: rectangle width
* @param height: rectangle height
* @param xB; rectangle center x coordinate
* @param yB; rectangle center y coordinate
* @param xA; point A x coordinate
* @param yA; point A y coordinate
* @author Federico Destefanis
* @see <a href="https://stackoverflow.com/a/31254199/2668213">based on</a>
*/

function lineIntersectionOnRect(width, height, xB, yB, xA, yA) {

var w = width / 2;
var h = height / 2;

var dx = xA - xB;
var dy = yA - yB;

//if A=B return B itself
if (dx == 0 && dy == 0) return {
x: xB,
y: yB
};

var tan_phi = h / w;
var tan_theta = Math.abs(dy / dx);

//tell me in which quadrant the A point is
var qx = Math.sign(dx);
var qy = Math.sign(dy);

if (tan_theta > tan_phi) {
xI = xB + (h / tan_theta) * qx;
yI = yB + h * qy;
} else {
xI = xB + w * qx;
yI = yB + w * tan_theta * qy;
}

return {
x: xI,
y: yI
};

}

var coords = lineIntersectionOnRect(6, 4, 0, 0, 1, 0);
console.log(coords);``````

• It works fine. Intersection point is correct Commented Jan 5, 2022 at 7:32

Here is a solution that works for me. I assume that the rect is aligned to the axes.

Data:

``````// Center of the Rectangle
let Cx: number
let Cy: number
// Width
let w: number
// Height
let h: number

// Other Point
let Ax: number
let Ay: number
``````

Now translate point A by the center of the rectangle so the rect is centered in O(0,0) and consider the problem in the first quarter (i.e. x > 0 and y > 0).

``````// Coordinates Translated
let Px = Math.abs(Ax - Cx)
let Py = Math.abs(Ay - Cy)

// Slope of line from Point P to Center
let Pm = Py / Px

// Slope of rectangle Diagonal
let Rm = h / w

// If the point is inside the rectangle, return the center
let res: [number, number] = [0, 0]

// Check if the point is inside and if so do not calculate
if (!(Px < w / 2 && Py < h / 2)) {

// Calculate point in first quarter: Px >= 0 && Py >= 0
if (Pm <= Rm) {
res[0] = w / 2
res[1] = (w * Pm) / 2
} else {
res[0] = h / (Pm * 2)
res[1] = h / 2
}

// Set original sign
if (Ax - Cx < 0) res[0] *= -1
if (Ay - Cy < 0) res[1] *= -1
}

// Translate back
return [res[0] + Cx, res[1] + Cy]
``````

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

Let's make some assumptions :

Points `A` and `C` are given, such that they define a rectangle `ABCD` aligned with the traditional axes. Assume that `A` is the bottom-left corner, and `C` is the top-right (i.e. `xA < xC` and `yA < yC`).

Assume that `X` and `Y` are two points given such that `X` lies inside the rectangle (ie `xA < xX < xC && yA < yX < yC`) and Y lies outside (i.e. `not(xA < xY < xC && yA < yY < yC)`.

This allows us to define a unique intersection point `E` between the segment `[X,Y]` and the rectangle `∂ABCD`.

The trick is to look for a certain `0 < t < 1` such that `t*Y+(1-t)*X` is on the rectangle `∂ABCD`. By re-writing the condition `Γ(t) ∈ ABCD` as :

`(xY - xX) * t ∈ [xA - xX, xC - xX]` and `(yY - yX) * t ∈ [yA - yX, yC - yX]`,

it is now possible to unwind all the scenarios. This yields :

``````var t = 0;

if(xY == xX) {
t =  max((yA - yX)/(yY - yX), (yC - yX)/(yY - yX));
} else {
if(yY == yX) {
t = max((xA - xX)/(xY - xX), (xC - xX)/(xY - xX));
} else {
if(xY > xX) {
if(yY > yX) {
t = min((xC - xX)/(xY - xX), (yC - yX)/(yY - yX));
} else {
t = min((xC - xX)/(xY - xX), (yA - yX)/(yY - yX));
}
} else {
if(yY > yX) {
t = min((xA - xX)/(xY - xX), (yC - yX)/(yY - yX));
} else {
t = min((xA - xX)/(xY - xX), (yA - yX)/(yY - yX));
}
}
}
}

xE = t * xY + (1 - t) * xX;
yE = t * yY + (1 - t) * yX;
``````
• There is an error I cannot track inside the `(xY > xX)`
– user1908746
Commented May 21, 2021 at 7:12
• @Lara wdym by and error you "cannot track" ? Do you mean an error upon compilation, or an error regarding the result yielded ? Have you c/p'ed the code, or have you translated to your language of choice ? Are you sure your points are all in positions compatible with the assumptions I made to the problem ? Commented May 21, 2021 at 8:30
• The code works when the line crosses above and below but not when the line crosses from the left or right of the rectangle. In that case, `yE` is correctly calculated but `xE` is not (it becomes displaced increasingly away). I cannot figure out why, i.e., cannot track down the error other than it is at that `if`. My mistake somehow, no doubt. Here is my implementation of your algorithm: pastebin.com/6xPnKMAB
– user1908746
Commented May 21, 2021 at 22:02
• There is a lot of duplication in this code, which makes it harder to understand. Subexpressions "(xY - xX)" and "(yY - yX)" seem to appear in every code path (or could easily be made to). I recommend assigning these to variables (e.g. dx and dy) before the main 'if' statements, and simplifying the code inside the 'if' statements to use these variables (also, "if (xY == xX)" becomes "if (dx == 0)", etc.). Also, you would not need the various "t =" assignments if you put the 'if' statements in a function and assigned t one time to be the function's result. That way, t could be 'const'. Commented Apr 15 at 20:04
• @SomeGuy I don't think the issues you address are genuine issues. I gave a proof-of-concept with an explanation, and the code does the job of illustrating that approach. Anyhow, feel free to edit my answer with improvements if you feel like the need to. Commented Apr 16 at 5:46

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

Hope It works 100%

I am also had this same problem. So after two days of hard effort finally I created this method,

Main method,

``````    enum Line
{
// Inside the Rectangle so No Intersection Point(Both Entry Point and Exit Point will be Null)
InsideTheRectangle,

// One Point Inside the Rectangle another Point Outside the Rectangle. So it has only Entry Point
Entry,

// Both Point Outside the Rectangle but Intersecting. So It has both Entry and Exit Point
EntryExit,

// Both Point Outside the Rectangle and not Intersecting. So doesn't has both Entry and Exit Point
NoIntersection
}

// Tuple<entryPoint, exitPoint, lineStatus>
private Tuple<Point, Point, Line> GetIntersectionPoint(Point a, Point b, Rectangle rect)
{
if (IsWithinRectangle(a, rect) && IsWithinRectangle(b, rect))
{
// Can't set null to Point that's why I am returning just empty object
return new Tuple<Point, Point, Line>(new Point(), new Point(), Line.InsideTheRectangle);
}
else if (!IsWithinRectangle(a, rect) && !IsWithinRectangle(b, rect))
{
if (!LineIntersectsRectangle(a, b, rect))
{
// Can't set null to Point that's why I am returning just empty object
return new Tuple<Point, Point, Line>(new Point(), new Point(), Line.NoIntersection);
}

Point entryPoint = new Point();
Point exitPoint = new Point();

bool entryPointFound = false;

// Top Line of Chart Area
if (LineIntersectsLine(a, b, new Point(0, 0), new Point(rect.Width, 0)))
{
entryPoint = GetPointFromYValue(a, b, 0);
entryPointFound = true;
}
// Right Line of Chart Area
if (LineIntersectsLine(a, b, new Point(rect.Width, 0), new Point(rect.Width, rect.Height)))
{
if (entryPointFound)
exitPoint = GetPointFromXValue(a, b, rect.Width);
else
{
entryPoint = GetPointFromXValue(a, b, rect.Width);
entryPointFound = true;
}
}
// Bottom Line of Chart
if (LineIntersectsLine(a, b, new Point(0, rect.Height), new Point(rect.Width, rect.Height)))
{
if (entryPointFound)
exitPoint = GetPointFromYValue(a, b, rect.Height);
else
{
entryPoint = GetPointFromYValue(a, b, rect.Height);
}
}
// Left Line of Chart
if (LineIntersectsLine(a, b, new Point(0, 0), new Point(0, rect.Height)))
{
exitPoint = GetPointFromXValue(a, b, 0);
}

return new Tuple<Point, Point, Line>(entryPoint, exitPoint, Line.EntryExit);
}
else
{
Point entryPoint = GetEntryIntersectionPoint(rect, a, b);
return new Tuple<Point, Point, Line>(entryPoint, new Point(), Line.Entry);
}
}
``````

Supporting methods,

``````    private Point GetEntryIntersectionPoint(Rectangle rect, Point a, Point b)
{
// For top line of the rectangle
if (LineIntersectsLine(new Point(0, 0), new Point(rect.Width, 0), a, b))
{
return GetPointFromYValue(a, b, 0);
}
// For right side line of the rectangle
else if (LineIntersectsLine(new Point(rect.Width, 0), new Point(rect.Width, rect.Height), a, b))
{
return GetPointFromXValue(a, b, rect.Width);
}
// For bottom line of the rectangle
else if (LineIntersectsLine(new Point(0, rect.Height), new Point(rect.Width, rect.Height), a, b))
{
return GetPointFromYValue(a, b, rect.Height);
}
// For left side line of the rectangle
else
{
return GetPointFromXValue(a, b, 0);
}
}

public bool LineIntersectsRectangle(Point p1, Point p2, Rectangle r)
{
return LineIntersectsLine(p1, p2, new Point(r.X, r.Y), new Point(r.X + r.Width, r.Y)) ||
LineIntersectsLine(p1, p2, new Point(r.X + r.Width, r.Y), new Point(r.X + r.Width, r.Y + r.Height)) ||
LineIntersectsLine(p1, p2, new Point(r.X + r.Width, r.Y + r.Height), new Point(r.X, r.Y + r.Height)) ||
LineIntersectsLine(p1, p2, new Point(r.X, r.Y + r.Height), new Point(r.X, r.Y)) ||
(r.Contains(p1) && r.Contains(p2));
}

private bool LineIntersectsLine(Point l1p1, Point l1p2, Point l2p1, Point l2p2)
{
float q = (l1p1.Y - l2p1.Y) * (l2p2.X - l2p1.X) - (l1p1.X - l2p1.X) * (l2p2.Y - l2p1.Y);
float d = (l1p2.X - l1p1.X) * (l2p2.Y - l2p1.Y) - (l1p2.Y - l1p1.Y) * (l2p2.X - l2p1.X);

if (d == 0)
{
return false;
}

float r = q / d;

q = (l1p1.Y - l2p1.Y) * (l1p2.X - l1p1.X) - (l1p1.X - l2p1.X) * (l1p2.Y - l1p1.Y);
float s = q / d;

if (r < 0 || r > 1 || s < 0 || s > 1)
{
return false;
}

return true;
}

// For Large values, processing with integer is not working properly
// So I here I am dealing only with double for high accuracy
private Point GetPointFromYValue(Point a, Point b, double y)
{
double x1 = a.X, x2 = b.X, y1 = a.Y, y2 = b.Y;
double x = (((y - y1) * (x2 - x1)) / (y2 - y1)) + x1;
return new Point((int)x, (int)y);
}

// For Large values, processing with integer is not working properly
// So here I am dealing only with double for high accuracy
private Point GetPointFromXValue(Point a, Point b, double x)
{
double x1 = a.X, x2 = b.X, y1 = a.Y, y2 = b.Y;
double y = (((x - x1) * (y2 - y1)) / (x2 - x1)) + y1;
return new Point((int)x, (int)y);
}

// rect.Contains(point) is not working properly in some cases.
// So here I created my own method
private bool IsWithinRectangle(Point a, Rectangle rect)
{
return a.X >= rect.X && a.X <= rect.X + rect.Width && a.Y >= rect.Y && a.Y <= rect.Y + rect.Height;
}
``````
• Note that the question specifically being asked here is only a special case of case (I) in your list ( specifically when the endpoint of the line is at the center of the rectangle). It's possible that the rest of your code might be useful to other people reading this question who have different needs, however. Commented Apr 15 at 20:12

Another option that you can consider especially if you are planning on testing many lines with the same rectangle is to transform your coordinate system to have the axes align with diagonals of the rectangle. Then since your line or ray starts at the center of the rectangle you can determine the angle then you can tell which segment it will intersect by the angle (i.e. <90deg seg 1, 90deg< <180deg seg 2 etc...). Then of course you have to transform back to the original coordinate system

Although this seems like more work the transformation matrix and its inverse can be calculated once and then reused. This also extends to higher dimensional rectangles more easily where you would have to consider quadrants and intersections with faces in 3D and so on.

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.

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`.

With a little math, you can solve this problem in a much easier fashion than most of these answers suggest.

Strategy:

1. Transform the line and rectangle so that the center of the rectangle is at the origin (0,0).
2. Scale both line and rectangle by the width/2 and height/2 of the rectangle (called xradius and yradius in my code sample below), so the problem becomes essentially "find the intersection point of [a line between point p and the origin] with [a square of size 2 which is centered on the origin]".
3. We can now find the intersection point on the nearest side of the square by scaling down the coordinates of point p so that it lies on the square (by making either of the coordinates equal to +1 or -1).
4. Since the problem is now symmetrical, if we take the absolute value of x and y, we can transform (mirror) the problem into only "Quadrant 1" of the grid, where x and y are both positive. This avoids having to handle each side of the box individually.
5. In Quadrant 1, find the intersection point. If p is above the line x==y, we need to divide by y to put the point on the nearest line, and if it's below that line we need to divide by x instead. Note that even though the scaling factor was calculated with the absolute values of the x and y coordinates, it can be used to scale the original coordinates also.
6. Now that we have the intersection point, inverse-transform it to undo the transformations from step 2 and step 1.

In C++, this looks something like:

``````struct point { double x, y; };
point intersect(const point& p, const rect& r) {
// Steps 1 and 2: Transform to origin and scale by xradius and yradius.
point q{ (p.x - r.center.x) / r.xradius, (p.y - r.center.y) / r.yradius };
// Steps 3 and 4: Transform to Quadrant 1 and find scaling factor.
double f = max(abs(q.x), abs(q.y));
// Step 5: Divide by scaling factor to find intersection point on square.
point intersect{ q.x/f, q.y/f };
// Step 6: Inverse transformations from steps 1 and 2.
``````point intersect(const point& p, const rect& r) {
Warning: This code doesn't handle the case where `p.x==r.centerx && p.y==r.centery` which will result in a divide-by-zero error in step 5. Handling that error condition will be left as an exercise to the reader. :-)