A running competition is going to be held soon. The stadium where the competition will be held can be represented by several segments on the coordinate plane:

• two horizontal segments: one connecting the points $$$(0, 0)$$$ and $$$(x, 0)$$$, the other connecting the points $$$(0, y)$$$ and $$$(x, y)$$$;
• $$$n + 1$$$ vertical segments, numbered from $$$0$$$ to $$$n$$$. The $$$i$$$-th segment connects the points $$$(a_i, 0)$$$ and $$$(a_i, y)$$$; $$$0 = a_0 < a_1 < a_2 < \dots < a_{n - 1} < a_n = x$$$.

For example, here is a picture of the stadium with $$$x = 10$$$, $$$y = 5$$$, $$$n = 3$$$ and $$$a = [0, 3, 5, 10]$$$:

A lap is a route that goes along the segments, starts and finishes at the same point, and never intersects itself (the only two points of a lap that coincide are its starting point and ending point). The length of a lap is a total distance travelled around it. For example, the red route in the picture representing the stadium is a lap of length $$$24$$$.

The competition will be held in $$$q$$$ stages. The $$$i$$$-th stage has length $$$l_i$$$, and the organizers want to choose a lap for each stage such that the length of the lap is a divisor of $$$l_i$$$. The organizers don't want to choose short laps for the stages, so for each stage, they want to find the maximum possible length of a suitable lap.

Help the organizers to calculate the maximum possible lengths of the laps for the stages! In other words, for every $$$l_i$$$, find the maximum possible integer $$$L$$$ such that $$$l_i \bmod L = 0$$$, and there exists a lap of length exactly $$$L$$$.

If it is impossible to choose such a lap then print $$$-1$$$.