题目描述
You are playing a coin puzzle. The rule of this puzzle is as follows:
There are N coins on a table. The i-th coin is a circle with ri radius, and its center is initially placed at (sxi,syi). Each coin also has a target position: you should move the i-th coin so that its center is at (txi,tyi). You can move coins one by one and can move each coin at most once. When you move a coin, it must move from its initial position to its target position along the straight line. In addition, coins cannot collide with each other, including in the middle of moves.
The score of the puzzle is the number of the coins you move from their initial position to their target position. Your task is to write a program that determines the maximum score for a given puzzle instance.
There are N coins on a table. The i-th coin is a circle with ri radius, and its center is initially placed at (sxi,syi). Each coin also has a target position: you should move the i-th coin so that its center is at (txi,tyi). You can move coins one by one and can move each coin at most once. When you move a coin, it must move from its initial position to its target position along the straight line. In addition, coins cannot collide with each other, including in the middle of moves.
The score of the puzzle is the number of the coins you move from their initial position to their target position. Your task is to write a program that determines the maximum score for a given puzzle instance.
输入
The input consists of a single test case formatted as follows.
N
r1 sx1 sy1 tx1 ty1
:
rN sxN syN tx1 tyN
The first line contains an integer N (1≤N≤16), which is the number of coins used in the puzzle. The i-th line of the following N lines consists of five integers: ri,sxi,syi,txi, and tyi (1≤ri≤1,000,−1,000≤sxi,syi,txi,tyi≤1,000,(sxi,syi)≠(txi,tyi)). They describe the information of the i-th coin: ri is the radius of the i-th coin, (sxi,syi) is the initial position of the i-th coin, and (txi,tyi) is the target position of the i-th coin.
You can assume that the coins do not contact or are not overlapped with each other at the initial positions. You can also assume that the maximum score does not change even if the radius of each coin changes by 10−5.
N
r1 sx1 sy1 tx1 ty1
:
rN sxN syN tx1 tyN
The first line contains an integer N (1≤N≤16), which is the number of coins used in the puzzle. The i-th line of the following N lines consists of five integers: ri,sxi,syi,txi, and tyi (1≤ri≤1,000,−1,000≤sxi,syi,txi,tyi≤1,000,(sxi,syi)≠(txi,tyi)). They describe the information of the i-th coin: ri is the radius of the i-th coin, (sxi,syi) is the initial position of the i-th coin, and (txi,tyi) is the target position of the i-th coin.
You can assume that the coins do not contact or are not overlapped with each other at the initial positions. You can also assume that the maximum score does not change even if the radius of each coin changes by 10−5.
输出
Print the maximum score of the given puzzle instance in a line.
样例输入
3
2 0 0 1 0
2 0 5 1 5
4 1 -10 -5 10
样例输出
2
题意: 给你n(n<=16)个圆的圆心坐标和半径,以及他们目的地的圆心坐标 问最多有多少个圆可以不和其他圆相交到达目的地 圆只能走直线且只能移动到目的地 思路: 直接bfs,2^16的int记录当前局面,看哪个圆可以移动到目的地而不和其他圆相交就可以扩展到下一个状态 主要问题就是判断一个圆去目的地的路上会不会和其他圆相交 将其他圆的半径加上当前圆的半径,问题就转化成了求圆心线(线段)和其他圆会不会相交的问题 如果线段端点有一个在圆内则一定相交 如果圆心到线段所在直线的距离大于半径一定不相交 否则圆心到两端点的角度都为锐角,则一定相交 (早知道就用double了,炸int调了我两晚上
#include<bits/stdc++.h> #define ll long long using namespace std; const int N=200; int n,ans; struct Point{ ll x,y; Point() {} Point(ll _x,ll _y) { x=_x; y=_y; } Point operator -(const Point &b) const { return Point(x-b.x,y-b.y); } ll operator *(const Point &b) const { return x*b.x+y*b.y; } }p1[N],p2[N]; struct orz{ int s,d;}; ll r[N]; queue<orz>q; bool vis[1<<20]; ll dis(Point a,Point b) { return (a-b)*(a-b); } bool Inter(int i,int j,int op) { Point O; if (op==1) O=p2[j]; else O=p1[j]; Point O1=p1[i],O2=p2[i]; int R=r[j]+r[i]; if (dis(O1,O)<R*R || dis(O2,O)<R*R) return 0; ll a,b,c,dis1,dis2,ang1,ang2; if (O1.x==O2.x) a=1,b=0,c=-O1.x; else if (O1.y==O2.y) a=0,b=1,c=-O1.y; else a=O1.y-O2.y,b=O2.x-O1.x,c=O1.x*O2.y-O1.y*O2.x; dis1=a*O.x+b*O.y+c; dis1*=dis1; dis2=(a*a+b*b)*(R*R); if (dis1>=dis2) return 1; ang1=(O.x-O1.x)*(O2.x-O1.x)+(O.y-O1.y)*(O2.y-O1.y); ang2=(O.x-O2.x)*(O1.x-O2.x)+(O.y-O2.y)*(O1.y-O2.y); if (ang1>0 && ang2>0)return 0; return 1; } bool check(int x,int s) { bool flag=1; for (int i=0;i<n;i++) { if (i==x) continue; if (s&(1<<i)) flag&=Inter(x,i,1); else flag&=Inter(x,i,2); if (!flag) break; } return flag; } void bfs() { ans=0; q.push({0,0}); vis[0]=1; while (!q.empty()) { orz now=q.front(); q.pop(); //for (int i=0;i<n;i++) cout<<((now.s>>i)&1); cout<<endl; ans=max(ans,now.d); for (int i=0;i<n;i++) { if ((now.s&(1<<i))==0 && !vis[now.s|(1<<i)] && check(i,now.s) ) { q.push({now.s|(1<<i),now.d+1}); vis[now.s|(1<<i)]=1; } } } } int main() { scanf("%d",&n); for (int i=0;i<n;i++) scanf("%lld%lld%lld%lld%lld",&r[i],&p1[i].x,&p1[i].y,&p2[i].x,&p2[i].y); bfs(); printf("%d ",ans); return 0; }