Score : $2400$ points
Takahashi and Aoki love calculating things, so they will play with numbers now.
First, they came up with one positive integer each. Takahashi came up with $X$, and Aoki came up with $Y$. Then, they will enjoy themselves by repeating the following operation $K$ times:
However, it turns out that even for the two math maniacs this is just too much work. Could you find the number that would be kept by Takahashi and the one that would be kept by Aoki eventually?
Note that input and output are done in binary.
Especially, $X$ and $Y$ are given as strings $S$ and $T$ of length $N$ and $M$ consisting of 0
and 1
, respectively, whose initial characters are guaranteed to be 1
.
1
.Input is given from Standard Input in the following format:
$N$ $M$ $K$ $S$ $T$
In the first line, print the number that would be kept by Takahashi eventually; in the second line, print the number that would be kept by Aoki eventually.
Those numbers should be represented in binary and printed as strings consisting of 0
and 1
that begin with 1
.
2 3 3 11 101
10000 10010
The values of $X$ and $Y$ after each operation are as follows:
5 8 3 10101 10101001
100000 10110100
10 10 10 1100110011 1011001101
10000100000010001000 10000100000000100010