1

I want to develop a kind of wheel of fortune in Java/Android. When the user touch the screen, i detect the mouvement and for each changes, i calculate the angle between the old pressure et the newest (function onScroll). I've a problem because i don't remember how i can calculate the angle between 3 points...

I develop 3 functions but each one give me a various result :

public class Test {

public static void main(String[] args) {
    Test test = new Test();

    Point center = new Point(2.26f, 2.26f);
    Point current = new Point(2.54f, 3.64f);
    Point previous = new Point(2.25f, 3.73f);

    System.out.println("1) Angle is "
            + test.function1(center, current, previous));
    System.out.println("2) Angle is "
            + test.function2(center, current, previous));
    System.out.println("3) Angle is "
            + test.function3(center, current, previous));
    System.out.println("################################");

    center = new Point(2.26f, 2.26f);
    previous = new Point(3.29f, 1.04f);
    current = new Point(0.98f, 2.25f);
    System.out.println("1) Angle is "
            + test.function1(center, current, previous));
    System.out.println("2) Angle is "
            + test.function2(center, current, previous));
    System.out.println("3) Angle is "
            + test.function3(center, current, previous));
    System.out.println("################################");

    center = new Point(226.0f, 226.0f);
    previous = new Point(225.21994f, 373.3158f);
    current = new Point(254.31085f, 364.05264f);
    System.out.println("1) Angle is "
            + test.function1(center, current, previous));
    System.out.println("2) Angle is "
            + test.function2(center, current, previous));
    System.out.println("3) Angle is "
            + test.function3(center, current, previous));
    System.out.println("################################");
}

public double function1(Point center, Point current, Point previous) {

    double ang1 = Math.atan((previous.getdY() - center.getdY())
            / (previous.getdX() - center.getdX()));
    double ang2 = Math.atan((current.getdY() - center.getdY())
            / (current.getdX() - center.getdX()));
    double rslt = ang1 - ang2;

    return Math.toDegrees(rslt) * -1;
}

private double function2(Point center, Point current, Point previous) {
    float dx = current.getdX() - center.getdX();
    float dy = current.getdY() - center.getdY();
    double a = Math.atan2(dy, dx);

    float dpx = previous.getdX() - center.getdX();
    float dpy = previous.getdY() - center.getdY();
    double b = Math.atan2(dpy, dpx);

    double diff = a - b;
    double degres = Math.toDegrees(diff);
    return degres;
}

public double function3(Point center, Point current, Point previous) {
    Point p1 = new Point(current.getdX() - center.getdX(), current.getdY()
            - center.getdY());
    Point p2 = new Point(previous.getdX() - center.getdX(),
            previous.getdY() - previous.getdY());
    double angle = Math.atan2(p1.getdY() - p2.getdY(),
            p1.getdX() - p2.getdX());

    return Math.toDegrees(angle);
}

}

I found this function on the net but i can't know which is the best.

Can you help me ?

4
  • The best answer would be to take real examples, and build unit tests out of them. Be wise, test well and pick the right ones.
    – Snicolas
    Aug 15, 2011 at 15:24
  • take a look on this: stackoverflow.com/questions/1211212/…
    – AlexR
    Aug 15, 2011 at 15:26
  • What results do you get?
    – Ted Hopp
    Aug 15, 2011 at 15:27
  • The Thomas example's seams to works perfectely. Now, i want to know if my angle is positive or negative. I'm looking the link to find the solution. Aug 15, 2011 at 15:41

3 Answers 3

9
private double angleBetween(Point center, Point current, Point previous) {

  return Math.toDegrees(Math.atan2(current.x - center.x,current.y - center.y)-
                        Math.atan2(previous.x- center.x,previous.y- center.y));
}

this first calculates the angle of center->current and center->previous against the x-axis and takes the difference between the 2

this is similar to function2

2
  • 1
    Note atan2 usually takes y as the first parameter and x as the second.
    – NateS
    May 4, 2016 at 0:23
  • @ratchet freak NateS has valid point over there. Edit your answer. It gives proper angle with direction Apr 28, 2017 at 11:02
2

Have a look here: http://www.euclideanspace.com/maths/algebra/vectors/angleBetween/index.htm

In terms of your function2:

private double function2(Point center, Point current, Point previous) {
  float v1x = current.getdX() - center.getdX(); 
  float v1y = current.getdY() - center.getdY();

  //need to normalize:
  float l1 = Math.sqrt(v1x * v1x + v1y * v1y);
  v1x /= l1;
  v1y /= l1;

  float v2x = previous.getdX() - center.getdX();
  float v2y = previous.getdY() - center.getdY();

  //need to normalize:
  float l2 = Math.sqrt(v2x * v2x + v2y * v2y);
  v2x /= l2;
  v2y /= l2;    

  double rad = Math.acos( v1x * v2x + v1y * v2y );

  double degres = Math.toDegrees(rad);
  return degres;
}

Edit: for signed values use Math.atan2(...). Quote from the linked page:

If we want a + or - value to indicate which vector is ahead, then we probably need to use the atan2 function (as explained on this page). using:

angle of 2 relative to 1= atan2(v2.y,v2.x) - atan2(v1.y,v1.x)

Thus replace double rad = Math.acos( v1x * v2x + v1y * v2y ); with double rad = Math.atan2( v2y,v2x) - Math.atan2(v1y,v1x); and you should be fine.

2
  • @FinalSpirit The page I linked give's you a hint, but to make it easier I added an edit.
    – Thomas
    Aug 15, 2011 at 15:46
  • Thanks but i don't understand these results :<br/> In first, i've this point : Previous = Point(94.78006;219.21054) Current = Point(93.37244;225.10526) Center = Point(226.0;226.0) Calculate degres = -2.575375011820518 (good degres) And for the next, i've this : Previous = Point(93.37244;225.10526) Current = Point(92.43402;227.63159) Center = Point(226.0;226.0) Calculate degres = 358.9136026239169 (It's very big !!!) Aug 15, 2011 at 15:57
0

Create two vectors out of the points and use dot product.

1
  • Indead, vectors seams to be the perfect way to find the angle signed ! Thanks. Aug 15, 2011 at 15:42

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service and acknowledge you have read our privacy policy.

Not the answer you're looking for? Browse other questions tagged or ask your own question.