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Possible Duplicate:
Calculate Bounding box coordinates from a rotated rectangle, Picture inside.

I have a rotated rectangle, So how do i calculate the size of axis-aligned bounding box for the rotated rectangle in 2D Coordinates?

Attach Image

i know x, y, o (angle) but how do i get a, b

Thank you

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marked as duplicate by pkaeding, Jim Lewis, Bart Kiers, SilentGhost, Graviton Jul 13 '10 at 0:41

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.

3 - it's the same area as it was before you rotated it? – ire_and_curses Jul 12 '10 at 18:38
Same way you'd calculated it non-rotated. Rotation doesn't change the size :p – Mark H Jul 12 '10 at 18:38
Do you mean "the area it occupies", as in getting the coordinates for the corners or something? – integer Jul 12 '10 at 18:40
@integer yes, how to calculate i known rectangle's width / height / angle. – Northern Jul 12 '10 at 18:47
Hope my edit clarified the situation... – Jim Lewis Jul 12 '10 at 18:58
up vote 20 down vote accepted
a = abs(x * sin(o)) + abs(y * cos(o))
b = abs(x * cos(o)) + abs(y * sin(o))
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This isn't working for me... Given: O=75, Y=39, X=105, the results are A=-4.76877, B=81.66039 which are obviously incorrect! – Campbeln May 2 '12 at 4:02
It is in radians.. so convert the degrees to radians. (Google's calculator does this) – Souleiman Dec 24 '12 at 1:49
Sorry, not correct - even in radians. I have added abs() terms to your answer now - with that change it should really be correct. (Original version was a = x * sin(o) + y * cos(o) and b = x * cos(o) + y * sin(o), which leads to the miscalculation that Campbeln describes above.) – Jpsy Oct 22 '13 at 23:02

To construct an axis-aligned bounding box, one must find the extreme points of the rotated box. i.e.,

given a rectangle 'P', given by points P1=(0,0), P2=(x,0), P3(x,y), P4(0,y), rotated 'R' degrees; find minX, maxX, minY, maxY, such that the box [(minX,minY),(maxX,maxY)] completely bounds the rotated 'P'.

                          |     /    \   |
  P4------P3              |   /        \ |
   |      |    rotate     | /            P2'
   |      | => by 'R' =>  P4'           /|
   |      |    degrees    | \         /  |
  P1------P2              |   \     /    |
                          |     \ /      |
                         minX           maxX

The values for the bounding box are the minimum/maximum of the components of the rotated points P1'..P4'; thus,


For a discussion of 2D rotations, see

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Well you didn't give a whole lot of detail. I'm assuming you know that the height and width of the rectangle will give you the area no matter the rotation. If you only have the x,y data points then you use the sqrt((x1-x1)^2 + (y1-y2)^2). To get the length of a side.

You clarified your question so if you have a rectangle and you know the angle from the top left corner is rotated away from the top so the left side looks like this.
a = sine(alpha)*width
b = cosine(alpha)*width
c = sine(alpha)*height
d = cosine(alpha)*height

width = a + d
height = b + c
Be sure you get the angle right it is kind of hard to clarify it on here. If you get the other angle then it will come out to
width = b + c
height = a + d

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i want to u this fomula too thanks – Northern Jul 12 '10 at 19:07
@Northern - According to your attached image, you wouldn't use this formula. You would use Area = x * y. – mbeckish Jul 12 '10 at 19:10
mbeckish is right if you want a and b you need my second forumla not the first. – qw3n Jul 12 '10 at 19:25
shouldnt it be "x1-x2"? i would edit it but it requires >5 chars – Nande Nov 14 '15 at 8:06

For the axis aligned box of the rotated rectangle, you find the minimum and maximum of each of the 4 rotated coordintates. The minX and minY becomes 1 corner and the maxX and maxY becomes the other corner.

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Calculate the area of the original rectangle. Area doesn't change under rotation.

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It's a bit complicated, but for a rectangle, Area = b * h = length * width.

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Use [Heron's Formula Triangle Area Calculator] s = (a + b + c) / 2 or 1/2 of the perimeter of the triangle

A = SquareRoot(s * (s - a) * (s - b) * (s - c))


a=SquareRoot((X1-X2)^2+(Y1-Y2)^2)  [Side 1 Length]
b=SquareRoot((X1-X3)^2+(Y1-Y3)^2)  [Side 2 Length]
c=SquareRoot((X2-X3)^2+(Y2-Y3)^2)  [Side 3 Length]

X1,Y1,X2,Y2,X3,Y3 are the coordinations of any three points (Corners)


Or Direct without [Heron's Formula Triangle Area Calculator], sequence of points are important here.

|     |

 a=SquareRoot((X1-X2)^2+(Y1-Y2)^2)  [Side 1 Length]
 b=SquareRoot((X1-X3)^2+(Y1-Y3)^2)  [Side 2 Length]
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