Time Limit: Java: 2000 ms / Others: 2000 ms
Memory Limit: Java: 65536 KB / Others: 65536 KB
Here, we don't have the night sky, but can use the same theoretical basis to form an estimate for Pi:
Given any pair of whole numbers chosen from a large, random collection of
numbers, the probability that the two numbers have no common factor other than
one (1) is 6/Pi^2
For example, using the small collection of numbers: 2, 3, 4, 5, 6; there are 10 pairs that can be formed: (2,3), (2,4), etc. Six of the 10 pairs: (2,3), (2,5), (3,4), (3,5), (4,5) and (5,6) have no common factor other than one. Using the ratio of the counts as the probability we have:
6/Pi^2 = 6/10
Pi = 3.162
In this problem, you'll receive a series of data sets. Each data set contains a set of pseudo-random positive integers. For each data set, find the portion of the pairs which may be formed that have no common factor other than one (1), and use the method illustrated above to obtain an estimate for Pi. Report this estimate for each data set.
The first line of each data set contains a positive integer value, N, greater than one (1) and less than 50.
There is one positive integer per line for the next N lines that constitute the set for which the pairs are to be examined. These integers are each greater than 0 and less than 32768.
Each integer of the input stream has its first digit as the first character on the input line.
The set size designator, N, will be zero to indicate the end of data.
For some data sets, it may be impossible to estimate a value for Pi. This occurs when there are no pairs without common factors. In these cases, emit the single-line message:
No estimate for this data set.
exactly, starting with the first character, "N", as the first character on the line.