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It's been 10 years since I did any math like this... I am programming a game in 2D and moving a player around. As I move the player around I am trying to calculate the point on a circle 200 pixels away from the player position given a positive OR negative angle(degree) between -360 to 360. The screen is 1280x720 with 0,0 being the center point of the screen. The player moves around this entire Cartesian coordinate system. The point I am trying trying to find can be off screen.

I tried the formulas on article Find the point with radius and angle but I don't believe I am understanding what "Angle" is because I am getting weird results when I pass Angle as -360 to 360 into a Cos(angle) or Sin(angle).

So for example I have...

  • 1280x720 on a Cartesian plane
  • Center Point (the position of player):
    • let x = a number between minimum -640 to maximum 640
    • let y = a number between minimum -360 to maximum 360
  • Radius of Circle around the player: let r always = 200
  • Angle: let a = a number given between -360 to 360 (allow negative to point downward or positive to point upward so -10 and 350 would give same answer)

What is the formula to return X on the circle?

What is the formula to return Y on the circle?

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This is a GOOD question!!! +1 –  JABFreeware Dec 31 '12 at 0:24

4 Answers 4

up vote 16 down vote accepted

The simple equations you've linked to give the X and Y coordinates of the point on the circle relative to the center of the circle.

X = r * cosine(angle)
Y = r * sine(angle)

This tells you how far the point is offset from the center of the circle. Since you have the coordinates of the center (xcircle, ycircle), simply add the calculated offset.

The coordinates of the point on the circle are:

X = xcircle + (r * sine(angle))
Y = ycircle + (r * cosine(angle))

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My confusion was first in the difference between ANGLE and DEGREE. I thought they were the same thing. Then I thought I was getting the point (x,y) on the plane but I was actually getting the length of the sides of x and y. I drew it out on paper then plopped it in excel to cover the range of degrees to check the formulas. It works now in my code. –  Kyle Anderson Dec 31 '12 at 7:55

I highly suggest using matrices for this type of manipulations. It is the most generic approach, see example below:

// The center point of rotation
var centerPoint = new Point(0, 0);
// Factory method creating the matrix                                        
var matrix = new RotateTransform(angleInDegrees, centerPoint.X, centerPoint.Y).Value;
// The point to rotate
var point = new Point(100, 0);
// Applying the transform that results in a rotated point                                      
Point rotated = Point.Multiply(point, matrix); 
  • Side note, the convention is to measure the angle counter clockwise starting form (positive) X-axis
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I am getting weird results when I pass Angle as -360 to 360 into a Cos(angle) or Sin(angle).

I think the reason your attempt did not work is that you were passing angles in degrees. The sin and cos trigonometric functions expect angles expressed in radians, so the numbers should be from 0 to 2*M_PI. For d degrees you pass M_PI*d/180.0. M_PI is a constant defined in math.h header.

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I figured angle and degree were probably not the same thing so am I correct in saying Angle = M_PI*d/180.0 where d can be a number from -360 to 360 or do I need another step? –  Kyle Anderson Dec 31 '12 at 0:40
@Kyle d is from 0 to 360 or from -180 to 180 (a complete circle), not from -360 to 360 (two complete circles). –  dasblinkenlight Dec 31 '12 at 0:42
thanks I mapped it out in Excel. I'm a lot closer now. –  Kyle Anderson Dec 31 '12 at 6:41

You should post the code you are using. That would help identify the problem exactly.

However, since you mentioned measuring your angle in terms of -360 to 360, you are probably using the incorrect units for your math library. Most implementations of trigonometry functions use radians for their input. And if you use degrees instead...your answers will be weirdly wrong.

x_oncircle = x_origin + 200 * cos (degrees * pi / 180)
y_oncircle = y_origin + 200 * sin (degrees * pi / 180)

Note that you might also run into circumstance where the quadrant is not what you'd expect. This can fixed by carefully selecting where angle zero is, or by manually checking the quadrant you expect and applying your own signs to the result values.

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This should really be a comment rather than an answer. However, nice catch on radians vs. degrees. –  Jim Dec 31 '12 at 0:29
You're right, I should actually answer the guy's question. –  Seth Battin Dec 31 '12 at 0:30

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