# Creating and rotating ellipses in python, whilst checking for collisions

I've managed to create a bit of code that creates various discs and checks for collisions, but how would I go about doing it for ellipses instead?

``````height = 100
width= 100
circles = 15
xL = []
yL = []
count = 0
print("Placing ", circles, "circles on a" , width,\
"x", height, "grid...")
for j in range(circles):
x = randint(0,width-1)
y = randint(0,height-1)
if len(xList)>0:
for i in range(len(xL)):
distance = sqrt((xL[i] - x)**2 + (yL[i] - y)**2)
print("Circle ", j, "collides with circle ", i)
count += 1
xL.append(x)
yL.append(y)
print("Complete.", count, "collisions.")
``````

Would I need to go about re-writing the code completely? Also as a follow up I've been able to implement an algorithm that moves the discs ever so slightly and then accept or reject the move if they've come closer together. With ellipses its a bit different, as I'm going to need to rotate them. How would I do that?

-
With ellipses it's a lot different, the math is much more involved, so plan on a rewrite. The first thing you need to determine is a way to detect intersections (if that's what you mean by "collisions") between two arbitrarily sized and rotated ellipses. This will be tricky because ellipses can intersect one another in multiple time and in multiple ways. –  martineau Apr 12 '13 at 2:36
Detecting is the only problem I'm going to have problems with I think. I think I can create ellipses by having 5 lists, one for its x co-ordinate, y co-ordinate, small radius, big radius and the angle. I want to be able work out the intersection/collisions without using something like pygame, pymunk –  user2268798 Apr 12 '13 at 19:34
In theory you should be able to determine the intersection of two arbitrary ellipses analytically given the equation of each obtained from the information about each one you're keeping. However be aware the answer can be 0-4, or an ∞ number of points (the latter case occurring when they're exactly the same ellipse). In your sample code all the circles are the same radius, will that be true of the radii and angles of your ellipses? –  martineau Apr 12 '13 at 20:10
Yeah all the ellipses have the same major and minor axis, all that is different is the angle they're rotated on –  user2268798 Apr 12 '13 at 20:14
Although it doesn't deal with rotated ellipses, the article Find the Points of Intersection of Two Ellipses looks like a good place to start. –  martineau Apr 12 '13 at 20:26