Score : $300$ points
We have two figures $S$ and $T$ on a two-dimensional grid with square cells.
$S$ lies within a grid with $N$ rows and $N$ columns, and consists of the cells where $S_{i,j}$ is #.
$T$ lies within the same grid with $N$ rows and $N$ columns, and consists of the cells where $T_{i,j}$ is #.
Determine whether it is possible to exactly match $S$ and $T$ by $90$-degree rotations and translations.
# and ..#.Input is given from Standard Input in the following format:
$N$
$S_{1,1}S_{1,2}\ldots S_{1,N}$
$\vdots$
$S_{N,1}S_{N,2}\ldots S_{N,N}$
$T_{1,1}T_{1,2}\ldots T_{1,N}$
$\vdots$
$T_{N,1}T_{N,2}\ldots T_{N,N}$
Print Yes if it is possible to exactly match $S$ and $T$ by $90$-degree rotations and translations, and No otherwise.
5 ..... ..#.. .###. ..... ..... ..... ..... ....# ...## ....#
Yes
We can match $S$ to $T$ by rotating it $90$-degrees counter-clockwise and translating it.
5 ##### ##..# #..## ##### ..... ##### #..## ##..# ##### .....
No
It is impossible to match them by $90$-degree rotations and translations.
4 #... ..#. ..#. .... #... #... ..#. ....
Yes
Each of $S$ and $T$ may not be connected.
4 #... .##. ..#. .... ##.. #... ..#. ....
No
Note that it is not allowed to rotate or translate just a part of a figure; it is only allowed to rotate or translate a whole figure.