I have a rectangle which is rotated (in this case 45 degrees) and looks like this:

My rectangle

And I know that X is from the top left corner of the rectangle (if it were unrotated, in this case the point at the top of the picture). Y is also from the top left corner. I have the width and the height and the bounding box. I want to find out what the other points of this rectangle are. The top left (technically the X position in this case), the top right, the bottom right and the bottom left. I was trying to use a transformation matrix but I can't seem to wrap my head around it.

How would one find the other points of this rectangle? Technically I am working in JavaScript but any language should be able to deal with this problem.

2 Answers 2


for anybody else looking for this. Here is a function to do so.

x,y,height and width are as shown in the picture below. ang is the angle between the x,y point and the Y-Axis. if you want the one between the x,y point and the X-Axis simply do so: ang = 90 - ang before sending it to the function

isDeg is simply whether you are sending the ang in Radians or Degrees.

function getRectFourPoints(x,y, width, height, ang, isDeg = false) {
	if(isDeg) ang = ang * (Math.PI / 180)

	const points = {first: {x,y}}
	const sinAng = Math.sin(ang)	
	const cosAng = Math.cos(ang)
	let upDiff = sinAng * width
	let sideDiff = cosAng * width
	const sec = {x: x + sideDiff, y: y + upDiff}
	points.sec = sec
	upDiff = cosAng * height
	sideDiff = sinAng * height
	points.third = {x: x + sideDiff, y: y - upDiff}
	const fourth = {x: sec.x + sideDiff, y: sec.y - upDiff}
	points.fourth = fourth
	return points
example triangle


The rotation matrix can help to calculate its current position based on its previous one. If it's rotating clockwise, the 2D rotation matrix is as follows:

enter image description here

which makes

enter image description here enter image description here

  • So is x' the original x or is x the original x?
    – Johnston
    Jul 11, 2016 at 0:33
  • @Johnston Former coordinates (x,y). New coordinates (x',y'). Note that this formula is for rotation about coordinate origin (0,0)
    – MBo
    Jul 11, 2016 at 3:23
  • @MBo is correct, (x', y') is the new coordinate transformed from (x, y). Sorry for the confusion. Jul 11, 2016 at 6:18

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