#D8138. Leaving the Bar
Leaving the Bar
Leaving the Bar
For a vector \vec{v} = (x, y), define |v| = √{x^2 + y^2}.
Allen had a bit too much to drink at the bar, which is at the origin. There are n vectors \vec{v_1}, \vec{v_2}, ⋅⋅⋅, \vec{v_n}. Allen will make n moves. As Allen's sense of direction is impaired, during the i-th move he will either move in the direction \vec{v_i} or -\vec{v_i}. In other words, if his position is currently p = (x, y), he will either move to p + \vec{v_i} or p - \vec{v_i}.
Allen doesn't want to wander too far from home (which happens to also be the bar). You need to help him figure out a sequence of moves (a sequence of signs for the vectors) such that his final position p satisfies |p| ≤ 1.5 ⋅ 10^6 so that he can stay safe.
Input
The first line contains a single integer n (1 ≤ n ≤ 10^5) — the number of moves.
Each of the following lines contains two space-separated integers x_i and y_i, meaning that \vec{v_i} = (x_i, y_i). We have that |v_i| ≤ 10^6 for all i.
Output
Output a single line containing n integers c_1, c_2, ⋅⋅⋅, c_n, each of which is either 1 or -1. Your solution is correct if the value of p = ∑_{i = 1}^n c_i \vec{v_i}, satisfies |p| ≤ 1.5 ⋅ 10^6.
It can be shown that a solution always exists under the given constraints.
Examples
Input
3 999999 0 0 999999 999999 0
Output
1 1 -1
Input
1 -824590 246031
Output
1
Input
8 -67761 603277 640586 -396671 46147 -122580 569609 -2112 400 914208 131792 309779 -850150 -486293 5272 721899
Output
1 1 1 1 1 1 1 -1
inputFormat
Input
The first line contains a single integer n (1 ≤ n ≤ 10^5) — the number of moves.
Each of the following lines contains two space-separated integers x_i and y_i, meaning that \vec{v_i} = (x_i, y_i). We have that |v_i| ≤ 10^6 for all i.
outputFormat
Output
Output a single line containing n integers c_1, c_2, ⋅⋅⋅, c_n, each of which is either 1 or -1. Your solution is correct if the value of p = ∑_{i = 1}^n c_i \vec{v_i}, satisfies |p| ≤ 1.5 ⋅ 10^6.
It can be shown that a solution always exists under the given constraints.
Examples
Input
3 999999 0 0 999999 999999 0
Output
1 1 -1
Input
1 -824590 246031
Output
1
Input
8 -67761 603277 640586 -396671 46147 -122580 569609 -2112 400 914208 131792 309779 -850150 -486293 5272 721899
Output
1 1 1 1 1 1 1 -1
样例
3
999999 0
0 999999
999999 0
-1 -1 1