There is a sheet of paper consisting of a grid with $N$ rows $M$ and columns. Two players participate in a game with this paper.
Each player alternates moves, performing exactly one of the following actions on their turn.
The player who is unable to make a move loses, while the other player wins. Given the size of the paper, determine the winner, assuming both players play optimally.
You have $T$ test cases to solve.
The input consists of a multiple test case of the following format.
$T$ $case_1$ $\vdots$ $case_T$
The first line contains an integer $T$ between $1$ and $200,000$, inclusive.
The $(i+1)$-th line corresponds to the $i$-th test case. Each line contains two integers, $N$ and $M$, representing the height and width of the paper, respectively. Both $N$ and $M$ are between $1$ and $10^{18}$, inclusive.
Print $T$ lines. For each test case, the $i$-th line should contain First if the first player wins in the $i$-th test case, and Second otherwise.
5 1 1 1 2 3 3 7 3 999999999999999999 1000000000000000000
Second First Second Second First