1994-1995 ACM International Collegiate Programming Contest
Western European Regional
Problem C - Divisors
Mathematicians love all sorts of odd properties of numbers. For instance,
they consider 945 to be an interesting number, since it is the first odd
number for which the sum of its divisors is larger than the number itself.
To help them search for interesting numbers, you are to write a program
that scans a range of numbers and determines the number that has the
largest number of divisors in the range. Unfortunately, the size of the
numbers, and the size of the range is such that a too simple-minded
approach may take too much time to run. So make sure that your algorithm
is clever enough to cope with the largest possible range in just a few
seconds.
Input Specification
The first line of input specifies the number N of ranges, and each of the
N following lines contains a range, consisting of a lower bound L and an
upper bound U, where L and U are included in the range. L and U are
chosen such that (1<=L<=U<=1.000.000.000) and (0<=U-L<=10.000).
Output Specification
For each range, find the number P which has the largest number of divisors
(if several numbers tie for first place, select the lowest), and the
number of positive divisors D of P (where P is included as a divisor).
Print the text 'Between L and H, P has a maximum of D divisors.', where L,
H, P, and D are the numbers as defined above.
Sample Input
3
1 10
1000 1000
999999900 1000000000
Output for the Sample Input
Between 1 and 10, 6 has a maximum of 4 divisors.
Between 1000 and 1000, 1000 has a maximum of 16 divisors.
Between 999999900 and 1000000000, 999999924 has a maximum of 192 divisors.