A988.Walking Home--Bronze

Bessie the cow is trying to walk from her favorite pasture back to her barn.
The pasture and farm are on an $N \times N$ grid ($2 \leq N \leq 50$), with
her pasture in the top-left corner and the barn in the bottom-right corner.
Bessie wants to get home as soon as possible, so she will only walk down and
to the right. There are haybales in some locations that Bessie cannot walk
through; she must walk around them.
Bessie is feeling a little tired today, so she wants to change the direction
she walks at most $K$ times ($1 \leq K \leq 3$) .
How many distinct paths can Bessie walk from her favorite pasture to the barn?
Two paths are distinct if Bessie walks in a square in one path but not in the
other.

The input for each test case contains $T$ sub-test cases, each describing a
different farm and each of which must be answered correctly to pass the full
test case. The first line of input contains $T$ ($1 \leq T \leq 50$). Each of
the $T$ sub-test cases follow.
Each sub-test case starts with a line containing $N$ and $K$.
The next $N$ lines each contain a string of $N$ characters. Each character is
either $\texttt{.}$ if it is empty or $\texttt{H}$ if it has a haybale. It is
guaranteed the top-left and bottom-right corners of the farm will not contain
haybales.

Output $T$ lines, the $i$th line containing the number of distinct paths
Bessie can take in the $i$th sub-test case.

We'll denote Bessie's possible paths as strings of D's and R's, indicating
that Bessie moved either down or right, respectively.
In the first sub-test case, Bessie's two possible walks are DDRR and RRDD.
In the second sub-test case, Bessie's four possible walks are DDRR, DRRD,
RDDR, and RRDD.
In the third sub-test case, Bessie's six possible walks are DDRR, DRDR, DRRD,
RDDR, RDRD, and RRDD.
In the fourth sub-test case, Bessie's two possible walks are DDRR and RRDD.
In the fifth and sixth sub-test cases, it is impossible for Bessie to walk
back to the barn.
In the seventh sub-test case, Bessie's six possible walks are DDRDRR, DDRRDR,
DDRRRD, RRDDDR, RRDDRD, and RRDRDD.