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Given the bounding box, relative rotation center, and rotation angle of a rectangle I need to find the absolute rotation center of the rectangle. Here is an image (I wouldn't mind if someone improved it): I hope that is clear enough. I need the x and y coordinates of the red dot. I've been working on this for some time now and I am lost with my trivial knowledge of trig. :/

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and what you did so far for same. –  Umesh Aawte Jun 25 '12 at 16:38
    
@UmeshA It's kind of a mess. I could tidy it up if you need it. –  MathWizz Jun 25 '12 at 16:40
    
Is what you're calling the "relative rotation CENTER" in your question really the "center" in some way, or is it just an arbitrary point? –  Beska Jun 25 '12 at 16:55
    
It's just an arbitrary point the rectangle rotates around. –  MathWizz Jun 25 '12 at 16:58
    
Is rcy = h / 2 and rcx = w / 2? –  SpacedMonkey Jun 25 '12 at 17:10

1 Answer 1

up vote 3 down vote accepted

If the angle of rotation is a shown negative above, then the coordinates of the red dot are:

rx = x + rcx*COS(a) - rcy*SIN(a)
ry = y - (w-rcx)*SIN(a) + rcy*COS(a)

and remember to convert degrees to radians before taking SIN() or COS().

Example: (x,y)=(80,60), (w,h)=(20,60) and a=-15°, with (rcx,rcy)=(15,30)

rx = 80 + 15*COS(-15°)-30*SIN(-15°)      = 102.25
ry = 60 - (20-15)*SIN(-15°)+30*COS(-15°) = 90.27

Here is an output from GeoGebra of the calculation (with negative y-axis)

GeoGebra output

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It works on the x axis, but not the y axis... Gimme a second to check my code. –  MathWizz Jun 25 '12 at 17:20
    
It works like to should if ry = y - (w-rcx)*SIN(a) + rcy*COS(a) is changed to ry = y - rcx*SIN(a) + rcy*COS(a). Why do you have it like this? –  MathWizz Jun 25 '12 at 17:34
    
I was going to the point through point F above. From (x,y) go down by w*SIN(a) to reach point F, then by h*COS(a) to reach K and then up by rcx*SIN(a) to reach I. Glad to got it working though. The idiotic left hand side coordinate system of 2D graphics always does an number on me. –  ja72 Jun 25 '12 at 17:53
    
Unfortunately it only seemed like it was working. I wasn't playing with the numbers enough. I'll setup a fiddle (jsfiddle.) –  MathWizz Jun 25 '12 at 18:01
    
I've managed to get it working: jsfiddle.net/CKxMm –  MathWizz Jun 25 '12 at 18:40

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