Mister Geppetto got the commission to make Pinocchio. Client expressed a wish to be unknown and he left material and insisted on finding Pinocchio's nose length as a result of performing the following algorithm:

1. There's a set of N numbered blanks with integer lengths.
2. If the set consists of only one blank, then it's length can be admitted as the length of Pinocchio's nose.
3. Let's choose some 2 blanks
   1. If lengths of the blanks coincide, then one of the blanks is eliminated from the set and algorithm goes back to point 2 to be repeated.
   2. If lengths of the blanks are different, then the piece of the long blank is sawed off and its length must be equal to the length of the other blank. Then the algorithm is repeated from point 2.

Example. There are three blanks in a set with lengths: 2, 3, 4. Then the change of the blank lengths can be shown in the following table. As a result Pinocchio will get the nose with length of 1.

Length of the first blank	Length of the second blank	Length of the third blank	Comments
2	3	4	Initial blank lengths
2	1	4	Sawing off the second blank
2	1	3	Sawing off the third blank
2	1	2	Sawing off the third blank
1	1	2	Sawing off the first blank
-	1	2	The first blank is eliminated
-	1	1	Sawing off the third blank
-	-	1	The second blank is eliminated

The first line contains an integer N (1 ≤ N ≤ 1000). The other N successive lines contain integers L₁, L₂, …, L_N that are initial blank lengths (1 ≤ L_i ≤ 2³¹ − 1).

Output either Pinocchio nose length, or the word “IMPOSSIBLE” if the nose length is undefined.