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Imagine you have two points in 2d space and you need to rotate one of these points by X degrees with the other point acting as a center.

float distX = Math.abs( centerX -point2X );
float distY = Math.abs( centerY -point2Y );

float dist = FloatMath.sqrt( distX*distX + distY*distY );

So far I just got to finding the distance between the two points... any ideas where should I go from that?

enter image description here

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Take a look at this.. it might help clearing things up : en.wikipedia.org/wiki/Rotation_matrix#In_two_dimensions –  Sednus Aug 28 '12 at 14:23

4 Answers 4

up vote 29 down vote accepted

The easiest approach is to compose three transformations:

  1. A translation that brings point 1 to the origin
  2. Rotation around the origin by the required angle
  3. A translation that brings point 1 back to its original position

When you work this all out, you end up with the following transformation:

newX = centerX + (point2x-centerX)*Math.cos(x) - (point2y-centerY)*Math.sin(x);

newY = centerY + (point2x-centerX)*Math.sin(x) + (point2y-centerY)*Math.cos(x);

Note that this makes the standard assumtion that the angle x is negative for clockwise rotation. If that's not the case, then you would need to reverse the sign on the terms involving sin(x).

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Sounds like an OpenGL answer –  Corey Ogburn Aug 28 '12 at 14:23
@CoreyOgburn - It's a Basic Plane Geometry answer. I learned this long before there was an OpenGL :) –  Ted Hopp Aug 28 '12 at 14:28
Surely you need to take into account the clockwise angle ??? –  mathematician1975 Aug 28 '12 at 14:34
@mathematician1975 - The angle should be positive for counter-clockwise rotation, negative for clockwise. That's pretty much a universal standard unless there's an explicit statement otherwise (which there wasn't). Nevertheless, I updated the answer to clarify. Thanks. –  Ted Hopp Aug 28 '12 at 14:36
Ok fair enough. Just thought that as the OP has maybe not done thing kind of thing before that he may not know that and wouldnt hurt to specify the convention. –  mathematician1975 Aug 28 '12 at 14:40

You need a 2-d rotation matrix http://en.wikipedia.org/wiki/Rotation_matrix

Your new point will be

 newX = centerX + ( cosX * (point2X-centerX) + sinX * (point2Y -centerY))
 newY = centerY + ( -sinX * (point2X-centerX) + cosX * (point2Y -centerY))

because you are rotating clockwise rather than anticlockwise

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Thanks, seems to work great! :) –  Roger Travis Aug 28 '12 at 14:41

Assuming you are usign the Java Graphics2D API, try this code -

    Point2D result = new Point2D.Double();
    AffineTransform rotation = new AffineTransform();
    double angleInRadians = (angle * Math.PI / 180);
    rotation.rotate(angleInRadians, pivot.getX(), pivot.getY());
    rotation.transform(point, result);
    return result;

where pivot is the point you are rotating around.

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There is also Math.toRadians() in Java ;-) –  Betlista Dec 18 '14 at 17:23
  1. Translate "1" to 0,0

  2. Rotate

    x = sin(angle) * r; y = cos(angle) * r;

  3. Translate it back

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not accurate. The OP wants to rotate around a specific point. As @Ted Hopp stated there must be a translation to the origin, apply rotation and then translate to original location again. (Without the translations the rotation will be around the 0,0 of the screen) –  giorashc Aug 28 '12 at 14:24
To be fair, the OP did post a giant picture indicating point 1 at the origin. –  Marc Bollinger Aug 28 '12 at 14:25
As you know, to rotate something around specific point, you can just translate this point to "zero", rotate, and then translate it back... –  Tutankhamen Aug 28 '12 at 14:28
@MarcBollinger - The picture shows point 1 at the center of rotation. (Yes, there are axes, but since when is the origin labeled "1"? That, plus the verbiage, should be at least a clue.) –  Ted Hopp Aug 28 '12 at 14:46

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