# Python billiards collision response some angle problems with my formula

This is my collision response code for a billiards simulation of 2 moving balls colliding. I used newton's laws of equation and then parametrised the components of the velocity vectors,

Alpha is the trajectory of ball 1
Beta is the trajectory of ball 2
Theta is the angle of the line of centres with respect to the axis

My idea was to come up with a general formula for collision response in the local frame of the 2 balls then reproject it back into my fixed frame, but I noticed that there are some angle problems, I can't figure out for my life what conditions should be for i.e. alpha

the last bit is just to make sure the balls aren't overlapping after the collision and get stuck in an infinite loop of colliding

``````    def collision(b1,b2):

dx=b1.x-b2.x
dy=b1.y-b2.y
Theta = atan2(dy,dx)
Vx1=b1.speedx
Vy1=b1.speedy

Vx2=b2.speedx
Vy2=b2.speedy

V1 = sqrt((Vx1)**2+(Vx1)**2)
V2 = sqrt((Vx2)**2+(Vx1)**2)
Alpha = asin(Vx1/V1)
Beta = asin(Vx2/V2)

b1.speedx = (((1-e)/2)*V1*sin(Alpha-Theta) - ((1+e)/2)*V2*sin(Beta-Theta))*sin(Theta) - V1*cos(Alpha-Theta)*cos(Theta)
b1.speedy = (((1-e)/2)*V1*sin(Alpha-Theta) - ((1+e)/2)*V2*sin(Beta-Theta))*cos(Theta) + V1*cos(Alpha-Theta)*sin(Theta)
b2.speedx = (((1+e)/2)*V1*sin(Alpha-Theta) - ((1-e)/2)*V2*sin(Beta-Theta))*sin(Theta) + V2*cos(Beta-Theta)*cos(Theta)
b2.speedy = (((1+e)/2)*V1*sin(Alpha-Theta) - ((1-e)/2)*V2*sin(Beta-Theta))*cos(Theta) - V2*cos(Beta-Theta)*sin(Theta)
``````
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also, is there a way to represent vectors on python ? would it be more effecient than this? –  user1998184 Jan 22 '13 at 23:29
So if `b2` is initially stationary, then `V2` is zero, so after the collision `b1.speedx` = `b1.speedy`, in other words `b1` winds up traveling in the direction (1,1) no matter how it hit `b2`. Your physics is just wrong. –  Beta Jan 23 '13 at 0:54