You are given an array of $$$n$$$ integers: $$$a_1, a_2, \ldots, a_n$$$. Your task is to find some non-zero integer $$$d$$$ ($$$-10^3 \leq d \leq 10^3$$$) such that, after each number in the array is divided by $$$d$$$, the number of positive numbers that are presented in the array is greater than or equal to half of the array size (i.e., at least $$$\lceil\frac{n}{2}\rceil$$$). Note that those positive numbers do not need to be an integer (e.g., a $$$2.5$$$ counts as a positive number). If there are multiple values of $$$d$$$ that satisfy the condition, you may print any of them. In case that there is no such $$$d$$$, print a single integer $$$0$$$.

Recall that $$$\lceil x \rceil$$$ represents the smallest integer that is not less than $$$x$$$ and that zero ($$$0$$$) is neither positive nor negative.