# How do you calculate direction of velocity of a circle bouncing off another static circle?

I've got code for two moving circles to bounce off each other properly, but when applying the same code for the situation where one of the two moving circles is static and does not move, the moving circle seems to orbit the static one. How can I fix this?

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I don't think anyone can be realistically expected to answer you unless you give more information, enough to make this question answerable. –  Hovercraft Full Of Eels Mar 28 '11 at 1:05
Can you post a sample of your code? –  Albert Perrien Mar 28 '11 at 1:05
@Hovercraft it's actually pretty straightforward if you've ever written a 2D physics engine. :-) –  corsiKa Mar 28 '11 at 1:06
@glowcoder there is no way to understand why the OP's code results in one circle orbiting the other without seeing the code ... –  belisarius Mar 28 '11 at 1:38
@belisarius what his code is is irrelevant because it doesn't work. What's probably happening is he is constantly bouncing off the static circle (it's still within collision threshold, probably) which causes it to bounce again, and again, and again. Seen it happen myself designing a 2d top down game. Granted that's just an educated guess at why it's broken. But the solution I outline below is (in my experience) superior. –  corsiKa Mar 28 '11 at 1:41

If you have code for a circle bouncing off a wall, you can approximate it by finding the line that would be tangent to the static circle at the point of contact between the circles and pretending the moving circle bounced off a wall that runs along that line.

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The line would be tangent to both circles, wouldn't it? –  Paŭlo Ebermann Mar 28 '11 at 1:09
It seems that it would be yes. I'd have to double check the math on that, to be certain. –  corsiKa Mar 28 '11 at 1:11
Im pretty certain that if you know the impact point on either circle you can calculate the tangent from that and it will be the same for either circles. that is, they will always collide at a point where their tangents are equal (or is that inverse)? –  Dunderklumpen Mar 28 '11 at 1:26
It seems to me that any collision between circles would occur at a point where they are tangent to each other. I don't have the theorem or proof in front of me but I believe that's the case. –  corsiKa Mar 28 '11 at 1:29
@glowcoder two circles touching each other are always tangent. –  belisarius Mar 28 '11 at 1:37

The article 2-Dimensional Elastic Collisions offers a vector approach to the problem. In particular, "The tangential components of the velocities are not changed by the collision because there is no force along the line tangent to the collision surface. The normal components of the velocities undergo a one-dimensional collision," which conserves momentum and kinetic energy. There's a Java implementation here.

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