# Code Golf: Calculating the intersection between Box and Line

## The challenge

Given you have the coordinates of a rectangle and a line in 2D space, and they may or may not intersect, write a function that calculates the intersection.

Here is an example of an intersection in glorious ASCII art:

``````    +-------------+
|             |
|             |
----*-------      |
|             |
|             |
+-------------+

intersection between line and box is at '*'
``````

The rectangle is axis aligned. So the function signature is something like this in pseudo code:

``````function calculateIntersection(Line l, Rectangle b)
``````

Where the rectangle and the line has the following data:

``````Line:
Point from
Point to
Rectangle:
Point p // upper right corner
int width
int height
``````

Here is one test, the line and rectangle should intersect:

``````Line:
from 0,0
to 2,2
Rectangle:
from 1,0
width 3
height 3

Output: intersection is at 1,1
``````
-
Is the rectangle axis-aligned? –  Martin B Sep 25 '09 at 8:09
Unclear and underspecified; not a community wiki, voted to close. –  Brian Sep 25 '09 at 8:30
@Brian: please explain why it is unclear and underspecified –  Spoike Sep 25 '09 at 8:32
Are the points integers or floating point? What is the input format (you refer to Point and Line, but this will be different in every language - give a text input specification)? "It is known the line intersects the box once" - exactly once? So all legal inputs have that form? Can the intersection be at a segment endpoint? –  Brian Sep 25 '09 at 8:42
And of course "know to intersect" contradicts the initial "may or may not intersect". You've managed to violate like every possible rule of 'how to author a good code golf question'. :) –  Brian Sep 25 '09 at 8:44

Write the line segment (not line!) as y = m*x + b

``````    y2 - y1
m = -------
x2 - x1

b = (-m * x) + y
``````

Your box is nothing more than 4 line segments. Loop through those four line segments and check if one of them intersects with your single line segement: Rough pseudo code:

``````LineSegment {

Point p1
Point p2
double m
double b

// ...

Point intersection(LineSegment that)  {

if(this.p1 == that.p1 || this.p1 == that.p2) return this.p1
if(this.p2 == that.p1 || this.p2 == that.p2) return this.p2

xIntersection = (that.b - this.b) / (this.m - that.m)
yIntersection = (this.m * xIntersection) + this.b

Point p = new Point(xIntersection, yIntersection)
if(!this.liesOnSegment(p) || !that.liesOnSegment(p)) return null
return p
}
}
``````

The 'liesOnSegment' function shouldn't pose a problem, I assume.

-

Since a rectangle is a polygon, you can just use the answer from this question: http://stackoverflow.com/questions/1119451/how-to-tell-if-a-line-intersects-a-polygon-in-c

-

I have a solution for a similar problem: does a line intersect a rectangle's area anywhere? Here's my lightly-tested solution in C++ (508 characters):

``````#include <iostream>
#define P {a=*p++-'a';b=*p++-'a';}
#define S l[8]=l[a];l[a]=l[b];l[b]=l[8];
#define s {P S}
#define c {P if (l[a]>=l[b]) {S}}
#define g if(({P l[a]>=l[b];}))
#define h(d) {g d else p+=2;}
#define m {P *i++=l[a]-l[b];}
#define t {P l[a]*=l[b];}
main(void) {double l[17],*i=l;int j=8,a,b;while (j--)std::cin >> *i++;char*p=
"aaaaegfhdbcaeagafbhbjkmnjlopmknkolplpmnoacbdgahbcedf";m m c c m m m m m m h(s)
h(s) t t t t g g {c c g g g g j=0;}printf("Line is %sin rectangle\n", j?"not ":
"");}
``````

The input format is lx0 ly0 lx1 ly0 rx0 ry0 rx1 ry1 (8 double-precision floats with whitespace in between). It can be tested with the following script:

``````#!/bin/sh
g++ line_rect_intersect.cpp -o line_rect_intersect
echo \$i | ./line_rect_intersect
done<<heredoc
-1 -1 -.1 -.1 0 0 1 2
0.9 0.8 1.4 -.2 0 0 1 2
0.1 1.9 0.9 1.1 0 0 2 1
0.1 1.9 0.9 1.1 0 0 1 2
heredoc
``````

This code is based off of a routine I wrote for my game OpenRider ( http://www.funsitelots.com/pub/openrider-0.1-win32.zip ):

``````bool LineReallyInBox(double l0x, double l0y, double l1x, double l1y, double r0x, double r0y, double r1x, double r1y)
{
double j,k,m,n,p,q;
double tmp;
#define swap(a,b) {tmp=a; a=b; b=tmp;}
if (r0x>r1x)
swap(r0x, r1x);
if (r0y>r1y)
swap(r0y, r1y);
j = l1y-l0y;
k = l1x-l0x;
m = r0x-l0x;
n = r1x-l0x;
p = r0y-l0y;
q = r1y-l0y;
if (j<0)
swap(n,m);
if (k<0)
swap(p,q);
if (j*m<=k*q && j*n>=k*p) {
//The infinite-length line parallel to the line in question intersects, but we need to
// make sure that the line terminated at the given points actually makes it to the rectangle
//We do that by checking for intersection of the box of the line and the rectangle
if (l0x>l1x)
swap(l0x, l1x);
if (l0y>l1y)
swap(l0y, l1y);
if (l0x<=r1x && l0y<=r1y && r0x<=l1x && r0y<=l1y)
return true;
return false;
}
return false;
#undef swap
}
``````
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