Rings and Glue
Little John is in big trouble. Playing with his different-sized (and colored!) rings and glue seemed such a good idea. However, the rings now lay on the floor, glued together with some-thing that will definitely not come off with water. Surprisingly enough, it seems like no rings are actually glued to the floor, only to other rings. How about that!
You must help Little John to pick the rings off the floor before his mom comes home from work. Since the glue is dry by now, it seems like an easy enough task. This is not the case. Little John is an irrational kid of numbers, and so he has decided to pick up the largest component (most rings) of glued-together rings first. It is the number of rings in this largest component you are asked to find. Two rings are glued together if and only if they overlap at some point but no rings will ever overlap in only a single point. All rings are of the doughnut kind (with a hole in them). They can however, according to Little John, be considered “infinitely thin”.
Input
Consists of a number of problems. Each problem starts with the number of rings n (0 ≤ n < 100). After that n rows follow, each containing a ring’s physical attributes. That is, 3 floating point numbers, with an arbitrary number of spaces between them, describing the x coordinate and y coordinate for its center and its radius. Input ends with a single row with the integer -1.
Output
Output consists of as many grammatically correct answers as there were problems, each answer, on a separate line, being "The largest component contains X ring(s)." where X is the number of rings in the largest component.