The first line contains one number $$$n$$$ ($$$4 \le n \le 5200$$$) — the number of rows and columns in the matrix $$$A$$$. It is guaranteed that $$$n$$$ is divisible by $$$4$$$.

Then the representation of matrix follows. Each of $$$n$$$ next lines contains $$$\frac{n}{4}$$$ one-digit hexadecimal numbers (that is, these numbers can be represented either as digits from $$$0$$$ to $$$9$$$ or as uppercase Latin letters from $$$A$$$ to $$$F$$$). Binary representation of each of these numbers denotes next $$$4$$$ elements of the matrix in the corresponding row. For example, if the number $$$B$$$ is given, then the corresponding elements are 1011, and if the number is $$$5$$$, then the corresponding elements are 0101.

Elements are not separated by whitespaces.