Largest Fence Farmer Geoff (while on sabbatical in New Zealand) has decided to purchase N (5 <= N <= 250) fence posts in order to build a very nice-looking fence. Everyone knows the best fences are convex polygons where fence posts form vertices of a polygon. The pasture is represented as a rectilinear grid; fencepost i is at integer coordinates (x_i, y_i) (1 <= x_i <= 1,000; 1 <= y_i <= 1000). Given the locations of N fence posts (which, intriguingly, feature no set of three points which are collinear), what is the largest number of fence posts FG can use to create a fence that is convex? PROBLEM NAME: lfence INPUT FORMAT: * Line 1: A single integer: N * Lines 2..N+1: Line i+1 describes fence post i's location with two space-separated integers: x_i and y_i SAMPLE INPUT: 6 5 5 2 3 3 2 1 5 5 1 1 1 INPUT DETAILS: A square with two points inside. OUTPUT FORMAT: * Line 1: A single integer, the maximum possible number of fence posts that form a convex polygon. SAMPLE OUTPUT: 5 OUTPUT DETAILS: The largest convex polygon is the pentagon (2,3), (3,2), (5,1), (5,5), (1,5).