Division
Description
Oleg's favorite subjects are History and Math, and his favorite branch of mathematics is division.
To improve his division skills, Oleg came up with $t$ pairs of integers $p_i$ and $q_i$ and for each pair decided to find the greatest integer $x_i$, such that:
- $p_i$ is divisible by $x_i$;
- $x_i$ is not divisible by $q_i$.
The first line contains an integer $t$ ($1 \le t \le 50$) — the number of pairs.
Each of the following $t$ lines contains two integers $p_i$ and $q_i$ ($1 \le p_i \le 10^{18}$; $2 \le q_i \le 10^{9}$) — the $i$-th pair of integers.
Print $t$ integers: the $i$-th integer is the largest $x_i$ such that $p_i$ is divisible by $x_i$, but $x_i$ is not divisible by $q_i$.
One can show that there is always at least one value of $x_i$ satisfying the divisibility conditions for the given constraints.
Input
The first line contains an integer $t$ ($1 \le t \le 50$) — the number of pairs.
Each of the following $t$ lines contains two integers $p_i$ and $q_i$ ($1 \le p_i \le 10^{18}$; $2 \le q_i \le 10^{9}$) — the $i$-th pair of integers.
Output
Print $t$ integers: the $i$-th integer is the largest $x_i$ such that $p_i$ is divisible by $x_i$, but $x_i$ is not divisible by $q_i$.
One can show that there is always at least one value of $x_i$ satisfying the divisibility conditions for the given constraints.
Samples
3
10 4
12 6
179 822
10
4
179
Note
For the first pair, where $p_1 = 10$ and $q_1 = 4$, the answer is $x_1 = 10$, since it is the greatest divisor of $10$ and $10$ is not divisible by $4$.
For the second pair, where $p_2 = 12$ and $q_2 = 6$, note that
- $12$ is not a valid $x_2$, since $12$ is divisible by $q_2 = 6$;
- $6$ is not valid $x_2$ as well: $6$ is also divisible by $q_2 = 6$.