The title says it all, Ive been searching around and couldnt find anything that was straight and to the point. How would I take a line with points (x1,y1) & (x2, y2) and check its intersection between a rectangle (xR,yR)? I saw in the Line2D package that there were some intersection methods but not sure how to set it all up. Can someone show me a correct way of setting it up to check for an intersection (collision)?
3 Answers
Using the available classes from the 2D Graphics API.
Rectangle r1 = new Rectangle(100, 100, 100, 100);
Line2D l1 = new Line2D.Float(0, 200, 200, 0);
System.out.println("l1.intsects(r1) = " + l1.intersects(r1));
What this doesn't tell you, is where...

Thank you, I dont need to know where, just need to know if they do or dont. Commented Mar 20, 2013 at 4:13
A rectangle is 4 lines. You could compute the intersect between your line and the 4 lines of the rectangle.
given the equations of two lines, they would intersect when x and y are equal.
y = m1x + b1 y = m2x + b2
solving the equation you should get:
x = b2  b1 / (m1  m2);
Note that if m1 == m2, the lines are parallel and will never intersect, watch out for the divided by 0 in this case.
Then, since you are dealing with segments ratter than infinite lines, check if the intersect falls off within your segments (check if both X and Y are within each segment's boundaries).


It's a little more tricky than this  the y = mx + c representation can't handle vertical lines. Commented Aug 19, 2013 at 13:46
Returns null if lines do not intersect. Modified some c code from another response to similar question to make it Java. Haven't bothered to look into how/why it works, but does the job I needed it to.
static Point get_line_intersection(Line2D.Double pLine1, Line2D.Double pLine2)
{
Point
result = null;
double
s1_x = pLine1.x2  pLine1.x1,
s1_y = pLine1.y2  pLine1.y1,
s2_x = pLine2.x2  pLine2.x1,
s2_y = pLine2.y2  pLine2.y1,
s = (s1_y * (pLine1.x1  pLine2.x1) + s1_x * (pLine1.y1  pLine2.y1)) / (s2_x * s1_y + s1_x * s2_y),
t = ( s2_x * (pLine1.y1  pLine2.y1)  s2_y * (pLine1.x1  pLine2.x1)) / (s2_x * s1_y + s1_x * s2_y);
if (s >= 0 && s <= 1 && t >= 0 && t <= 1)
{
// Collision detected
result = new Point(
(int) (pLine1.x1 + (t * s1_x)),
(int) (pLine1.y1 + (t * s1_y)));
} // end if
return result;
}

1it is line to line intersection, not rectangle to line intersection Commented Oct 17, 2018 at 3:15

This is probably the best answer I have found for getting the intersection points. Just test each side of the rectangle. I used this to find the midpoint of the line inside of a rectangle. I was too lazy to figure it out myself. This was an easy solution. Thanks. Commented Apr 8, 2023 at 8:43
Area
objects can be done relatively easily. Here is an example.