The Fun Number System

In a k bit 2’s complement number, where the bits are indexed from 0 to k − 1, the weight of the most significant bit (i.e., in position k − 1), is −2k−1, and the weight of a bit in any position i (0 ≤ i < k − 1) is 2i. For example, a 3 bit number 101 is evaluated as −22 +0+20 = −3 and 011 as −0+21 +20 = 3. A negatively weighted bit is called a negabit(such as the most significant bit in a 2’s complement number), and a positively weighted bit is called a posibit. A Fun number system is a positional binary number system, where each bit can be either a negabit, or a posibit. For example consider a 3-bit fun number system Fun3, where bits in positions 0, and 2 are posibits, and the bit in position 1 is a negabit. (111)F un3 is evaluated as 22 − 21 + 1 = 3. Now you are going to have fun with the Fun number systems! You are given the description of a k-bit Fun number system Funk, and an integer N (Maybe negative). You should determine the k bits of a representation of N in Funk, or report that it is not possible to represent the given N in the given Funk. For example, a representation of -1 in the Fun3 number system (defined above), is 011 (evaluated as 0 − 21 + 20), and representing 6 in Fun3 is impossible. Input The first line of the input file contains a single integer t (0 < t ≤ 100), the number of test cases, followed by the input data for each test case. Each test case is given in three consecutive lines. In the first line there is a positive integer k (1 ≤ k ≤ 64). In the second line of a test data there is a string of length k, composed only of letters n, and p, describing the Fun number system for that test data, where each n(p) indicates that the bit in that position is a negabit (posibit). The third line of each test data contains an integer N (−263 ≤ N < 263), the number to be represented in the Funk number by your program. Output For each test data, you should print one line containing either a k-bit string representing the given number N in the Funk number system, or the word ‘Impossible’, when it is impossible to represent the given number. Sample Input 2 3 pnp 6 4 ppnn 10 Sample Output Impossible 1110