# Translation coordinates for a circle under a certain angle

I have 2 circles that collide in a certain collision point and under a certain collision angle which I calculate using this formula :

C1(x1,y1) C2(x2,y2)

and the angle between the line uniting their centre and the x axis is

X = arctg (|y2 - y1| / |x2 - x1|)

and what I want is to translate the circle on top under the same angle that collided with the other circle. I mean with the angle X and I don't know what translation coordinates should I give for a proper and a straight translation!

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A picture says more than a thousand words... – Rody Oldenhuis Oct 23 '12 at 12:31
Could you put a bit more structure into describing what you have got, what the formula (or function?) C(x, y) does, and what exactly it is you want to achieve? I don't quite get what translation you're looking for. – Yellow Oct 23 '12 at 12:32
This doesn't have anything to do with OpenGL, or programming in general. I think this should be moved to http://programmers.stackexchange.com instead. – TheAmateurProgrammer Oct 23 '12 at 12:35
imagebin.org/232970 – user1768288 Oct 23 '12 at 12:37
@TheAmateurProgrammer it probably isn't a good idea to suggest migration to sites you aren't familiar with; not least with this question, which would be a poor fit for Programmers – AakashM Oct 23 '12 at 13:23

## 1 Answer

For what I think you mean, here's how to do it cleanly.

Think in vectors.

Suppose the centre of the bottom circle has coordinates (x1,y1), and the centre of the top circle has coordinates (x2,y2). Then define two vectors

support   = (x1,y1)
direction = (x2,y2) - (x1,y1)

now, the line between the two centres is fully described by the parametric representation

line = support + k*direction

with k any value in (-inf,+inf). At the initial time, substituting k=1 in the equation above indeed give the coordinates of the top circle. On some later time t, the value of k will have increased, and substituting that new value of k in the equation will give the new coordinates of the centre of the top circle.

How much k increases at value t is equal to the speed of the circle, and I leave that entirely up to you :)

Doing it this way, you never need to mess around with any angles and/or coordinate transformations etc. It even works in 3D (provided you add in z-coordinates everywhere).

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