# Calculating degrees between 2 points with inverse Y axis

I'm creating a simple 2D game in javascript/canvas. I need to figure out the angle of a certain object relative to my position.

So: say I'm at (10,10) and the object is at (10,5) - that would result in 90 degrees (as positive Y is down, negative Y is up) (10,10) vs (10,15) would be 270 degrees.

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Angle viewed from where? –  Christopher Creutzig Jul 22 '10 at 14:01
I'm confused as to how you're determining the angle...are you facing in a certain direction the entire time? –  rownage Jul 22 '10 at 14:02
@rownage: Unless I've misunderstood, the point is to determine the orientation of the vector that points from one position to the other. –  Tim Goodman Jul 22 '10 at 14:33
@Tim: Yeah I was lost there, I understood what was going on after seeing KennyTM's answer (nothing like a good answer to help make sense of a question) –  rownage Jul 22 '10 at 14:40

Suppose you're at (a, b) and the object is at (c, d). Then the relative position of the object to you is (x, y) = (c - a, d - b).

Then you could use the `Math.atan2()` function to get the angle in radians.

``````var theta = Math.atan2(-y, x);
``````

note that the result is in the range [-π, π]. If you need nonnegative numbers, you have to add

``````if (theta < 0)
theta += 2 * Math.PI;
``````

and convert radians to degrees, multiply by `180 / Math.PI`.

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If your coordinates are (xMe, yMe) and their coordinates are (xThem, yThem), then you can use the formula:

`arctan((yMe-yThem)/(xThem-xMe))`

Normally it'd be `arctan((yThem-yMe)/(xThem-xMe))`, but in this case the sign of the y-axis is reversed.

To convert the result from radians to degrees multiply by 180/pi.

So in JavaScript, this would look like: `Math.atan((yThem-yMe)/(xThem-xMe))*180/Math.PI`

atan gives a value between -pi/2 and pi/2 (that is, between -90 and 90 degrees). But you can look at what quadrant your (xThem - xMe, yMe - yThem) vector is in and adjust accordingly.

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I actually like KennyTM's answer better. Math.atan2 will know which quadrant you're in already, so you're spared the last step. –  Tim Goodman Jul 22 '10 at 14:19
I still found this answer useful, it's a nice alternative because I want to control the quadrants my self. –  Partack Jun 25 at 19:39