[USACO12OPEN] Tied Down G

题目描述

As we all know, Bessie the cow likes nothing more than causing mischief on the farm. To keep her from causing too much trouble, Farmer John decides to tie Bessie down to a fence with a long rope. When viewed from above, the fence consists of N posts (1 <= N <= 10) that are arranged along vertical line, with Bessie's position (bx, by) located to the right of this vertical line. The rope FJ uses to tie down Bessie is described by a sequence of M line segments (3 <= M <= 10,000), where the first segment starts at Bessie's position and the last ends at Bessie's position. No fence post lies on any of these line segments. However, line segments may cross, and multiple line segments may overlap at their endpoints. Here is an example of the scene, viewed from above: ![](https://cdn.luogu.com.cn/upload/pic/41461.png) To help Bessie escape, the rest of the cows have stolen a saw from the barn. Please determine the minimum number of fence posts they must cut through and remove in order for Bessie to be able to pull free (meaning she can run away to the right without the rope catching on any of the fence posts). All (x,y) coordinates in the input (fence posts, Bessie, and line segment endpoints) lie in the range 0..10,000. All fence posts have the same x coordinate, and bx is larger than this value. 牛被拴着。平面上有n个柱子,x坐标相等,且都小于牛的x坐标。牛在由m条边形成的闭合多边形组成的绳子上。问最少要锯掉几个柱子牛才能逃脱。

输入输出格式

输入格式


\* Line 1: Four space-separated integers: N, M, bx, by. \* Lines 2..1+N: Line i+1 contains the space-separated x and y coordinates of fence post i. \* Lines 2+N..2+N+M: Each of these M+1 lines contains, in sequence, the space-separated x and y coordinates of a point along the rope. The first and last points are always the same as Bessie's location (bx, by).

输出格式


\* Line 1: The minimum number of posts that need to be removed in order for Bessie to escape by running to the right.

输入输出样例

输入样例 #1

2 10 6 1 
2 3 
2 1 
6 1 
2 4 
1 1 
2 0 
3 1 
1 3 
5 4 
3 0 
0 1 
3 2 
6 1

输出样例 #1

1

说明

There are two posts at (2,3) and (2,1). Bessie is at (6,1). The rope goes from (6,1) to (2,4) to (1,1), and so on, ending finally at (6,1). The shape of the rope is the same as in the figure above. Removing either post 1 or post 2 will allow Bessie to escape.