Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

Assume I have the following overlapping rectangles ("a" and "b"):


I've seen lots of ideas on how to calculate the area of the inner rectangle ("c"), but how would I go about getting the actual top/left/bottom/right coordinates for it?

share|improve this question

4 Answers 4

up vote 12 down vote accepted

Call Rectangle.Intersect.

share|improve this answer
Can't believe it was that easy. Thanks! –  Chris Jul 3 '10 at 23:03

The X coordinates of the overlap area of two rectangles can be found according to the following logic.

To find the Y coordinates, substitute Y for X in the last of the four assumptions, as well as in all of the three cases.


  • A and B are rectangles (with their sides aligned along the X and Y axes),

  • each of the rectangles is defined by two points   (xmin / ymin) – (xmax / ymax)

  • where xmin < xmax   and   ymin < ymax  .

  • A.xmin < B.xmin

Case 1 — No overlap:

|A       |    
|        |    +----+
|        |    |B   |
|        |    +----+
|        |

A.xmin < A.xmax < B.xmin < B.xmax   ⇒   No overlap.

Case 2 — Some overlap:

|A       |
|     +--+-+
|     |B | |
|     +--+-+
|        |

A.xmin < B.xmin < A.xmax < B.xmax   ⇒   Overlap X coordinates: B.xminA.xmax

Case 3 — Complete overlap:

|A       |
| +----+ |
| |B   | |
| +----+ |
|        |

A.xmin < B.xmin < B.xmax < A.xmax   ⇒   Overlap X coordinates: B.xminB.xmax

P.S.: You can actually further simplify this algorithm. The overlap X coordinates are always:

max(A.xmin, B.xmin) – min(A.xmax, B.xmax)

except when the second value is less than the first; that means that there is no overlap.

share|improve this answer
static internal Rectangle intersect(Rectangle lhs, Rectangle rhs)
    Dimension lhsLeft = lhs.Location.X;
    Dimension rhsLeft = rhs.Location.X;
    Dimension lhsTop = lhs.Location.Y;
    Dimension rhsTop = rhs.Location.Y;
    Dimension lhsRight = lhs.Right;
    Dimension rhsRight = rhs.Right;
    Dimension lhsBottom = lhs.Bottom;
    Dimension rhsBottom = rhs.Bottom;

    Dimension left = Dimension.max(lhsLeft, rhsLeft);
    Dimension top = Dimension.max(lhsTop, rhsTop);
    Dimension right = Dimension.min(lhsRight, rhsRight);
    Dimension bottom = Dimension.min(lhsBottom, rhsBottom);
    Point location = new Point(left, top);
    Dimension width = (right > left) ? (right - left) : new Dimension(0);
    Dimension height = (bottom > top) ? (bottom - top) : new Dimension(0);

    return new Rectangle(location, new Size(width, height));
share|improve this answer
The above code assumes that the rectangles do intersect. –  ChrisW Jul 3 '10 at 22:17
...provided the coordinate system has right and downwards as positive directions. –  Pontus Gagge Jul 3 '10 at 22:18
@ChrisW: To Check if they intersect: In all cases where they do not NOT intersect, they intersect. They do not intersect if neither StartA > EndB (a completely after B) or EndA < StartB ( A Completely Before B). Now de morgan: Not (A Or B) <=> Not A And Not B ==> (StartA <= EndB) and (EndA >= StartB), in any other case, return the (0,0,0,0) rectangle or NULL. –  Quandary Oct 8 at 13:37


Points of   rectangle R1: R1.A(x,y), R1.B(x,y), R1.C(x,y), R1.D(x,y)   
Points of   rectangle R2: R2.A(x,y), R2.B(x,y), R2.C(x,y), R2.D(x,y)   
Overlapping rectangle RO: RO.A(x,y), RO.B(x,y), RO.C(x,y), RO.D(x,y)    
Standard cartesian coordinates (positive is right and upwards).

Overlapping rectangle RO computes as follows with C#:

RO.A.x = Math.Min(R1.A.x, R2.A.x);
RO.A.y = Math.Max(R1.A.y, R2.A.y);
RO.C.x = Math.Max(R1.C.x, R2.C.x);
RO.C.y = Math.Min(R1.C.y, R2.C.y);
RO.B(x,y) and RO.D(x,y) = ....

Inner rectangle RI:

Swap Min and Max in above solution for overlapping rectangle RO.

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.