Assume you have a square of size n that is divided into n × n positions just as a checkerboard. Two positions (x1,y1) and (x2,y2), where 1 ≤ x1,y1,x2,y2 ≤ n, are called “independent” if they occupy different rows and different columns, that is, x1 ̸= x2 and y1 ̸= y2. More generally, n positions are called independent if they are pairwise independent. It follows that there are n! different ways to choose n independent positions. Assume further that a number is written in each position of such an n × n square. This square is called “homogeneous” if the sum of the numbers written in n independent positions is the same, no matter how the positions are chosen. Write a program to determine if a given square is homogeneous! Input The input contains several test cases. The first line of each test case contains an integer n (1 ≤ n ≤ 1000). Each of the next n lines contains n numbers, separated by exactly one space character. Each number is an integer from the interval [-1000000,1000000]. The last test case is followed by a zero. Output For each test case output whether the specified square is homogeneous or not. Adhere to the format shown in the sample output. Sample Input 2 12 34 3 134 8 6 -2 -3 4 0 0 Sample Output homogeneous not homogeneous