Talk:Circles of given radius through two points: Difference between revisions

More special cases

There may be more special cases. If p1==p2 and r==0, there is one unique answere that's a zero radius circle. If tow points are separated by exactly double the radius, there's only one answer. The latter can be treated as two identical circles, but then so can the former. <lang python>def find_center(p1, p2, r):

   if p1 == p2:
       if r == 0: return [p1] # special special case
       # maybe we can return a generator that yields random circles, eh?
       raise ValueError("infinite many answers")

   (x1,y1), (x2,y2) = p1, p2
   x, y = (x1 + x2)/2.0, (y1 + y2)/2.0
   dx, dy = x1 - x, y1 - y
   a = r*r / (dx*dx + dy*dy) - 1

   if not a: return [(x0, y0)]
   if a < 0: return []
   return [(x + a*dy, y - a*dx), (x - a*dy, y + a*dx)]

print find_center((0, 0), (1, 1), 1) # normal case print find_center((0, 0), (0, 0), 0) # special case 1 print find_center((0, 0), (0, 2), 1) # special case 2</lang>

Hi Ledrug. I have one of those covered - two points on a diameter is tested by the current second set of inputs. I'll have to adjust for the two coincident points with r == 0.0 case. Thanks.

Hmm r==0.0 might be treated as an exception too as it is the circle as a point, (If you don't want points). --Paddy3118 (talk) 05:02, 17 April 2013 (UTC)