# Calculate vertices of a bounding box

I am stumped by this problem which looks very simple. I have a 2D bounding box of which I have two corner points. I wish to determine the remaining two corner points. An important constraint: the bounding box can be oriented in any way and not necessarily aligned to the horizontal and vertical axes (i.e. x and y axes).

I wish to do this as I want to raster scan the bounding box.

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They are diagonally opposite, yes. –  dr_rk Feb 12 '12 at 11:58
If the box is not aligned in space then two diagonal points are simply not enough to determine its geometry. What extra information do you have? –  Konrad Rudolph Feb 12 '12 at 11:59
Two points isn't enough to define the orientation of a rectangle in space. Consider rotating the "correct" rectangle on the axis defined by the line between those two points. –  perelman Feb 12 '12 at 12:00
Note the two points are diagonally opposite. Since I have the diagonal, surely there can only be one box that can be drawn from this. –  dr_rk Feb 12 '12 at 12:02
A 2d axis aligned box has 4 degrees of freedom: width, height, x pos, y pos. Such a box can be defined with 4 values x1,y1,x2,y2. A non aligned box has one more degree of freedom: rotation. You need more information. –  hansmaad Feb 12 '12 at 12:26

I'm sure this is not an answer you want to hear, however, as mentioned here before, two diagonally opposite points are not enough to define a rectangle on a 2D surface. As a picture is worth a thousand words, here's a picture of two different rectangles sharing the same diagonally opposite points.

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