You are given a set of $$$n$$$ points in a 2D plane. No three points are collinear.
A pentagram is a set of $$$5$$$ points $$$A,B,C,D,E$$$ that can be arranged as follows. 
Note the length of the line segments don't matter, only that those particular intersections exist.
Count the number of ways to choose $$$5$$$ points from the given set that form a pentagram.
The first line contains an integer $$$n$$$ ($$$5 \leq n \leq 300$$$) — the number of points.
Each of the next $$$n$$$ lines contains two integers $$$x_i, y_i$$$ ($$$-10^6 \leq x_i,y_i \leq 10^6$$$) — the coordinates of the $$$i$$$-th point. It is guaranteed that no three points are collinear.
Print a single integer, the number of sets of $$$5$$$ points that form a pentagram.
5 0 0 0 2 2 0 2 2 1 3
1
5 0 0 4 0 0 4 4 4 2 3
0
10 841746 527518 595261 331297 -946901 129987 670374 -140388 -684770 309555 -302589 415564 -387435 613331 -624940 -95922 945847 -199224 24636 -565799
85
A picture of the first sample: 
A picture of the second sample: 
A picture of the third sample: 
