Description
We say that a set S = {x1, x2, ..., xn} is factor closed if for any xi ∈ S and any divisor d of xi we have d ∈ S. Let’s build a GCD matrix (S) = (sij), where sij = GCD(xi, xj) – the greatest common divisor of xi and xj. Given the factor closed set S, find the value of the determinant:
D_n = \left|{\begin{array}{ccccc}gcd(x_1,x_1)&gcd(x_1,x_2)&gcd(x_1,x_3)&\cdots&gcd(x_1,x_n)\gcd(x_2,x_1)&gcd(x_2,x_2)&gcd(x_2,x_3)&\cdots&gcd(x_2,x_n)\gcd(x_3,x_1)&gcd(x_3,x_2)&gcd(x_3,x_3)&\cdots&gcd(x_3,x_n)\\cdots&\cdots&\cdots&\cdots&\cdots\gcd(x_n,x_1)&gcd(x_n,x_2)&gcd(x_n,x_3)&\cdots&gcd(x_n,x_n)\end{array}}\right|
Input
The input file contains several test cases. Each test case starts with an integer n (0 < n < 1000), that stands for the cardinality of S. The next line contains the numbers of S: x1, x2, ..., xn. It is known that each xi is an integer, 0 < xi < 2*109. The input data set is correct and ends with an end of file.
Output
For each test case find and print the value Dn mod 1000000007.
Sample Input
2
1 2
3
1 3 9
4
1 2 3 6
Sample Output
1
12
4
http://blog.csdn.net/love_acm_love_mm/article/details/8957143