7914: USACO 2016 December Contest, Platinum —— Problem 1. Lots of Triangles
[Creator : ]
Description
Farmer John is thinking of selling some of his land to earn a bit of extra income. His property contains n trees (3≤N≤300), each described by a point in the 2D plane, no three of which are collinear. FJ is thinking about selling triangular lots of land defined by having trees at their vertices; there are of course $L=(^N_3)$ such lots he can consider, based on all possible triples of trees on his property.
A triangular lot has value v if it contains exactly v trees in its interior (the trees on the corners do not count, and note that there are no trees on the boundaries since no three trees are collinear). For every v=0…N−3, please help FJ determine how many of his L potential lots have value v.
Input
The first line of input contains N.
The following N lines contain the x and y coordinates of a single tree; these are both integers in the range 0…1,000,000.
Output
Output N−2 lines, where output line i contains a count of the number of lots having value i−1.
Sample 1 Input
7
3 6
17 15
13 15
6 12
9 1
2 7
10 19
Sample 1 Output
28
6
1
0
0