# Find the Bounding Rectangle of Rotated Rectangle [duplicate]

I have rectangle with co-ordinates(x1,y1) and (x2,y2) and I have to rotate the rectangle an amount of θ about it centre using Rotation Matrix

`````` |  cosθ  sinθ |
| -sinθ  cosθ |
``````

I need to find the co-ordinates of bounding rectangle after rotation.

Before rotation

``````0,0
|"""""""""""""""""""""""""""""""""""""""""""|
|                                           |
|  x1,y1                                    |
|       |"""""""""""""|                     |
|       |             |                     |
|       |             |                     |
|       |             |                     |
|       """""""""""""" x2,y2                |
|                                           |
|                                           |
""""""""""""""""""""""""""""""""""""""""""" W,H
``````

After rotation

`````` 0,0
|"""""""""""""""""""""""""""""""""""""""""""|
|           ?,?                             |
|            |""""/\"""""|                  |
|            |   /   \   |                  |
|            |  /      \ |                  |
|            | /        /|                  |
|            |/        / |                  |
|            |\       /  |                  |
|            |  \    /   |                  |
|            |    \ /    |                  |
|             """""""""""  ?,?              |
|                                           |
|                                           |
""""""""""""""""""""""""""""""""""""""""""" W,H
``````

Is there any general equation for finding the co-ordinates of bounding rectangle?.

Thanks....

Haris.

• +1 for the ASCII drawings :) – nispio Nov 7 '13 at 7:51

Point (x1, y1) rotates to (x1 cos θ - y1 sin θ, x1 sin θ + y1 cos θ), while point (x2, y2) rotates to (x2 cos θ - y2 sin θ, x2 sin θ + y2 cos θ). The other two points can be calculated accordingly.

The coordinates of the bounding reactangle are (x3, y3) and (x4, y4), where x3 is the smallest of all new x coordinates, y3 the smallest of all new y coordinates, x4 the greatest of all new x coordinates and y4 the greatest of all new y coordinates.

Which of the corners produces the smallest x (and so on) depends on your angle or rotation. For angles from 0° to 90°, x3 will come from (x1, y1), so x3 = x1 cos θ - y1 sin θ. For angles from 90° to 180°, it will come from (x2, y1), and so on. So either you decide which points to use based on your angle of rotation, or you just take the smallest and greatest of all x's and y's.

But I think you should probably ask this on https://math.stackexchange.com/

Just mark all Fi angles on your drawing, and you can see that

``````Old_Width = X2_Old - X1_Old, Old_Height = Y2_Old - Y1_Old
New_Height = Old_Width * Abs(Sin(Fi)) + Old_Height * Abs(Cos(Fi))
New_Width = Old_Width * Abs(Cos(Fi)) + Old_Height * Abs(Sin(Fi))
X1_New = X1_Old - (New_Width - OldWidth) / 2 =
(X1_Old + X2_Old - New_Width) / 2
`````` Delphi test:

``````procedure TForm1.DrawRotatedRectWithFrame(X0, Y0, X1, Y1: Integer; Fi: Double);
var
P: array[0..3] of TPoint;
CX, CY, WX, WY, NW, NH : Integer;
CF, SF: Double;
begin
CX := (X0 + X1) div 2;  //Center point
CY := (Y0 + Y1) div 2;
WX := (X1 - X0) div 2;  //Half-width
WY := (Y1 - Y0) div 2;
SinCos(Fi, SF, CF);
//calculate vertices of rotated rectangle
P := Point(Round(CX  -WX*CF + WY * SF), Round(CY - WX * SF - WY * CF));
P := Point(Round(CX  +WX*CF + WY * SF), Round(CY + WX * SF - WY * CF));
P := Point(Round(CX  +WX*CF - WY * SF), Round(CY + WX * SF + WY * CF));
P := Point(Round(CX  -WX*CF - WY * SF), Round(CY - WX * SF + WY * CF));
Canvas.Polygon(P); //draw rotated rectangle

Canvas.Rectangle(CX - 2, CY - 2, CX + 3, CY + 3); //mark center point
NH := Round(Abs(WX * SF) + Abs(WY * CF));  //boundrect half-height
NW := Round(Abs(WX * CF) + Abs(WY * SF));  //boundrect half-width
Canvas.Brush.Style := bsClear;
Canvas.Rectangle(CX - NW, CY - NH, CX + NW, CY + NH); //draw bound rectangle
end;
``````

Output example: • Does that work for a rotation of more than 90 degrees? – SQB Nov 7 '13 at 10:15
• @SQB Yes, it works for all angles (tested) – MBo Nov 7 '13 at 10:43