# Get intersection points of line and shape

I have a custom shape as shown in image. Suppose the blue rectangle covering the shape in the image depicts the bounding box of that shape.

If I draw line at one of the diagonal of the bounding rectangle, how can I get the intersection points (in image they were drawn using green color)?

I am using Java2D, I have a GeneralPath with all the coordinates from which I draw the shape on the screen.

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BTW based on comments I recommend you to check out basic geometry, I don't want to blame you because of lack of memories, but if you work with geometry, it really saves a lot of time if you repeat things. Here is a good site to start: wolfram.com –  CsBalazsHungary Mar 21 '13 at 12:06
@CsBalazsHungary i will refresh. –  Mihir Mar 21 '13 at 12:08

## Idea

You can deconstruct the GenenralPath into its segments (move-to, line-to, quad-to, cubic-to, close) by using the getPathIterator() method. Now you can search per segment for intersections with the line.

public static Point[] getIntersections(Path path, Line line) {
List<Point> intersections = new ArrayList<Point>();
PathIterator it = path.getPathIterator();
double[] coords = new double[6];
double[] pos = new double[2];
while (!it.isDone()) {
int type = it.currentSegment(coords);
switch (type) {
case PathIterator.SEG_MOVETO:
pos[0] = coords[0];
pos[1] = coords[1];
break;
case PathIterator.SEG_LINETO:
Line l = new Line(pos[0], pos[1], coords[0], coords[1]);
pos[0] = coords[0];
pos[1] = coords[1];
Point intersection = getIntersection(line, l);
if (intersection != null)
break;
//...
default:
throw new IllegalStateException("unknown PathIterator segment type: " + type);
}
it.next();
}
return intersections.toArray(new Point[] {});
}


## Line/Line intersections

Line/Line intersections can be computed directly, for example, using vector algebra:

• a 2d point/line is represented by a 3d vector (x, y, w)
• the point (x, y) is represented by (x, y, 1)
• the line through the points p1 and p2 is given by p1 x p2 (cross-product)
• for two lines l1 = (a, b, c) and l2 = (d, e, f) the intersection is given by l1 x l2 (cross-product)
• to project the intersection into 2d you have to divide x and y coordinates by w
• if w = 0 then there is no single point of intersection

## Line/Bezier intersections

A Path can contain quadratic and cubic Bezier curves. To find points of intersection between a line and a Bezier curve, there are several algorithms available, for example:

• de Casteljau subdivision
• Bezier clipping
• Newton's method
• polynomial root finding

De Casteljau subdivision is easy to implement but has some issues in relatively rare cases. If you do not want to use a math library which can compute the intersections for you, I recommend implementing de Casteljau subdivision.

Edit: Another alternative would be to approximate the Bezier curve segments of the Path by a number of line segments. Then you only need to find line/line intersections.

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i will test and let you know tomorrow. thanks –  Mihir Mar 22 '13 at 17:15
where is the getIntersection method ? –  Mihir Mar 24 '13 at 4:43
@Mihir, you have to write that method yourself. It should compute the intersection point of two line segments. –  Matthias Apr 2 '13 at 12:11
OK, I will do it. –  Mihir Apr 5 '13 at 6:28

Iterate through the list of points defining the shape. Place the (x,y) in the equation of the line, and see if it 'solves'. Pseudocode -

int threshold = 0.01
for point in points:
if (point.y - m * point.x + c)^2 < threshold :
print "solution found"

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here m and c represents the line points ? –  Mihir Mar 21 '13 at 11:48
@Mihir Those are the parameters of the line. en.wikipedia.org/wiki/Line_%28geometry%29 –  CsBalazsHungary Mar 21 '13 at 11:49
@CsBalazsHungary i don;t remember the maths much , i have line x1,y1 and x2,y2 can you give me an example how can i convert this 2 line points to line parameter ? –  Mihir Mar 21 '13 at 11:51
@Mihir sure: you need to use it like this: x1*x + y1*y = x2 + y2 then you go for explain y. y1*y = x2 + y2 - x1*x then you just divide by y1 so the final answer: y = (x2/y1 + y2/y1) - (x1/y1)*x there you go, in the first () you find c, in the second () you find m –  CsBalazsHungary Mar 21 '13 at 11:58
I don't think this answer is very helpful. Testing all points of the shape is expensive. –  Matthias Mar 21 '13 at 11:58