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Finding the overlapping area of two rectangles (in C#)

I have two areas identified by top left and bottom right corners (fig.1).

In c#, how can I test if they are in contact (fig.2)?

enter image description here

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marked as duplicate by fvu, millimoose, Sani Huttunen, LarsTech, Adi Lester Feb 2 '13 at 17:08

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

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@Burgos Rectangle.IntersectsWith is actually more specific to the problem. I would say not exactly a duplicate. –  Alvin Wong Feb 2 '13 at 14:21

2 Answers 2

up vote 8 down vote accepted

Let's say you have two Rectangles which are r1 and r2, you can check whether they intersects with each other by this:

if(r1.IntersectsWith(r2))
{
    // Intersect
}

If you need the exact area which they intersects with each other, you can do this:

Rectangle intersectArea = Rectangle.Intersect(r1, r2);

You can check the documentation: Rectangle.IntersectsWith, Rectangle.Intersect


Additional important note:

I've just checked that if the two rectangles just touch each other on an edge, Rectangle.Intersect returns a rectangle with one dimension is zero , however Rectangle.IntersectsWith will return false. So you need to note that.

For example, Rectangle.Intersect on {X=0,Y=0,Width=10,Height=10} and {X=10,Y=0,Width=10,Height=10} will return {X=10,Y=0,Width=0,Height=10}.

If you hope to get true also if they just touch each other, change the condition to:

if(Rectangle.Intersect(r1, r2) != Rectangle.Empty)
{
    // Intersect or contact (just touch each other)
}
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Thanks a lot ! This is exactly what I wanted ! –  Anatole BAUDOUIN Feb 2 '13 at 14:26
    
@AnatoleBAUDOUIN There's something important that I've just added. –  Alvin Wong Feb 2 '13 at 14:41

Let's note:

  • X1, Y1, X2, Y2 : the coordinates of the points of the first rectangle (with X1 < X2 and Y1 < Y2)
  • X1', Y1', X2', Y2' : the coordinates of the points of the second rectangle (with X1' < X2' and Y1' < Y2')

There is intersection if and only if:

(X2' >= X1 && X1' <= X2) && (Y2' >= Y1 && Y1' <= Y2)
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