Candy Distribution

Kids like candies, so much that they start beating each other if the candies are not fairly distributed. So on your next party, you better start thinking before you buy the candies.

If there are $K$ kids,
we of course need $K \cdot
X$ candies for a fair distribution, where $X$ is a positive natural number. But
we learned that always at least one kid looses one candy, so
better be prepared with **exactly** one spare
candy, resulting in $(K \cdot X)
+ 1$ candies.

Usually, the candies are packed into bags with a fixed number of candies $C$. We will buy some of these bags so that the above constraints are fulfilled.

The first line gives the number of test cases $t$ ($0 < t < 100$). Each test case is specified by two integers $K$ and $C$ on a single line, where $K$ is the number of kids and $C$ the number of candies in one bag ($1 \le K, C \le 10^9$). As you money is limited, you will never buy more than $10^9$ candy bags.

For each test case, print one line. If there is no such
number of candy bugs to fulfill the above constraints, print
“`IMPOSSIBLE`” instead. Otherwise print the
number of candy bags, you want to buy. If there is more than
one solution, any will do.

Sample Input 1 | Sample Output 1 |
---|---|

5 10 5 10 7 1337 23 123454321 42 999999937 142857133 |
IMPOSSIBLE 3 872 14696943 166666655 |