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**This problem statement differs from that of Leapfrog Ch. 1 in only one spot, highlighted in bold below.**
A colony of frogs peacefully resides in a pond. The colony is led by a single
Alpha Frog, and also includes 0 or more Beta Frogs. In order to be a good
leader, the Alpha Frog diligently studies the high art of fractions every day.
There are **N** lilypads in a row on the pond's surface, numbered 1 to **N**
from left to right, each of which is large enough to fit at most one frog at a
time. Today, the Alpha Frog finds itself on the leftmost lilypad, and must
leap its way to the rightmost lilypad before it can begin its fractions
practice.
The initial state of each lilypad _i_ is described by a character **Li**,
which is one of the following:
* "`A`": Occupied by the Alpha Frog (it's guaranteed that **Li** = "`A`" if and only if _i_ = 1)
* "`B`": Occupied by a Beta Frog
* "`.`": Unoccupied
At each point in time, one of the following things may occur:
1) The Alpha Frog may leap over one or more lilypads immediately to either its
left or right which are occupied by Beta Frogs, and land on the next
unoccupied lilypad past them, if such a lilypad exists. The Alpha Frog must
leap over at least one Beta Frog; it may not just leap to an adjacent lilypad.
**Note that, unlike in Leapfrog Ch. 1, the Alpha Frog may leap to either its
left or right.**
2) Any Beta Frog may leap to the next lilypad to either its left or right, if
such a lilypad exists and is unoccupied.
Assuming the frogs all cooperate, determine whether or not it's possible for
the Alpha Frog to ever reach the rightmost lilypad and begin its daily
fractions practice.
### Input
Input begins with an integer **T**, the number of days on which the Alpha Frog
studies fractions. For each day, there is a single line containing the
length-**N** string **L**.
### Output
For the _i_th day, print a line containing "Case #_i_: " followed by a single
character: "`Y`" if the Alpha Frog can reach the rightmost lilypad, or "`N`"
otherwise.
### Constraints
1 ≤ **T** ≤ 500
2 ≤ **N** ≤ 5,000
### Explanation of Sample
In the first case, the Alpha Frog can't leap anywhere.
In the second case, the Alpha Frog can leap over the Beta Frog to reach the
rightmost lilypad.
In the third case, neither the Alpha Frog nor either of the Beta Frogs can
leap anywhere.
In the fourth case, if the first Beta Frog leaps one lilypad to the left, and
then the second Beta Frog also leaps one lilypad to the left, then the Alpha
Frog can leap over both of them to reach the rightmost lilypad.
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