【习题整理】计算几何基础

• bzoj1074【Scoi2007】折纸
  • 思路：考虑倒着做，每次将在折叠的直线右边的扔掉，左边的点再对称一次加入；
  • 算几知识：求向量关于法向量的对称向量
  • 点$A$关于点$B$对称的点$C = 2B - A$
  • 如果要求$vec{A}$关于法向量$vec{l}$的对称向量$vec{A'}$；
  • 可以考虑都平移到原点
  • 利用点积求出$vec{A}$在$vec{l}$上的投影点$D$， 再将点$A$关于$D$对称到$A'$；
  • $A'$的坐标就是向量$vec{A'}$

  • #include<bits/stdc++.h>
    #define db double
    #define eps 1e-6
    using namespace std;
    const int N=1<<9;
    int n,m,cnt,tmp;
    int dcmp(db x){return fabs(x)<=eps?0:x<0?-1:1;}
    struct point{
        db x,y;
        point(db _x=0,db _y=0):x(_x),y(_y){};
        point operator +(const point&A)const{return point(x+A.x,y+A.y);}
        point operator -(const point&A)const{return point(x-A.x,y-A.y);}
        point operator *(const db&a)const{return point(x*a,y*a);}
        db operator *(const point&A)const{return x*A.x+y*A.y;}
        db operator ^(const point&A)const{return x*A.y-y*A.x;}
    }p1[N],p2[N],q[N],qq[N];
    bool onleft(point A,point B,point C){
        return dcmp((C-B)^(A-B))>0;
    }
    point rev(point A,point B,point C){
        point D = C - B; 
        db l2 = D*D;
        D = B + D*((A-B)*D/l2);
        return D*2 - A;
    }
    int main(){
        #ifndef ONLINE_JUDGE
        freopen("bzoj1074.in","r",stdin);
        freopen("bzoj1074.out","w",stdout);
        #endif 
        scanf("%d", &n);
        for(int i=1;i<=n;i++)scanf("%lf%lf%lf%lf", &p1[i].x, &p1[i].y, &p2[i].x, &p2[i].y);
        scanf("%d", &m);
        for(int i=1;i<=m;i++){
            cnt=1;scanf("%lf%lf", &q[1].x, &q[1].y);
            for(int j=n;j;j--){
                tmp=0;
                for(int k=1;k<=cnt;k++)if(onleft(q[k],p1[j],p2[j])){
                    qq[++tmp] = q[k];
                    qq[++tmp] = rev(q[k],p1[j],p2[j]);
                }
                cnt=tmp;
                if(!cnt)break;
                for(int k=1;k<=cnt;k++)q[k]=qq[k];
            }
            int ans=0;
    //        puts("");
            for(int j=1;j<=cnt;j++){
    //            printf("%.2f %.2lf
    ",q[j].x, q[j].y);
                if(dcmp(q[j].x)>0&&dcmp(q[j].y)>0&&dcmp(100-q[j].x)>0&&dcmp(100-q[j].y)>0){
                    ans ++;
                }
            }
            printf("%d
    ",ans);
        }
        return 0;
    }

• bzoj1094【Zjoi207】粒子运动
  • 思路：每个例子的路径是$k$段折线，枚举每对粒子和时间段计算最近距离；
  • 算几知识：
  • 1.求变化有的轨迹直接求出和圆的交点做出法向量求对称，对称的方法同上；
  • 2.求圆和向量的交点（保证有交）：
  • 假设向量的起点$A$,方向$vec{B}$，圆C的圆心为$O$，半径为$R$
  • 所以$( (A-O) + t vec{B} )^2 = R^2$
  • 展开点积为常数，解二次方程即可；

  • #include<bits/stdc++.h>
    #define db double 
    #define il inline 
    using namespace std;
    const int N=110;
    int n,k;
    db R,t[N][N];
    struct point{
        db x,y;
        point(db _x=0,db _y=0):x(_x),y(_y){};
        point operator +(const point&A)const{return point(x+A.x,y+A.y);}
        point operator -(const point&A)const{return point(x-A.x,y-A.y);}
        point operator *(const db&a)const{return point(x*a,y*a);}
        db operator *(const point&A)const{return x*A.x+y*A.y;}
        db operator ^(const point&A)const{return x*A.y-y*A.x;}
    }O,p[N][N],v[N][N];
    il db cal(db a,db b,db c){return ( -b + sqrt(b*b-4*a*c) ) / a / 2; }
    il db len(point A){return sqrt(A*A);}
    il db solve(int i,int j,int k1,int k2,db tl,db tr){
        point v1 = v[i][k1], v2 = v[j][k2]; 
        point p1 = p[i][k1] + v1 * (tl - t[i][k1]);
        point p2 = p[j][k2] + v2 * (tl - t[j][k2]);
        point tv = v1-v2, tp = p1-p2; tr-=tl;
        db a=tv*tv,b=tv*tp*2,d=-b/a/2;
        if(fabs(a)<1e-9)return b > 0 ? len(tv*tr+tp) : len(tv*tl+tp);
        else {
            d = max(0.0, min(tr, d));
            return len(tv*d+tp);
        }
    }
    int main(){
        #ifndef ONLINE_JUDGE
        freopen("bzoj1094.in", "r", stdin);
        freopen("bzoj1094.out","w",stdout);
        #endif 
        scanf("%lf%lf%lf",&O.x,&O.y,&R);
        scanf("%d%d",&n,&k);
        for(int i=1;i<=n;i++){
            scanf("%lf%lf%lf%lf",&p[i][0].x,&p[i][0].y,&v[i][0].x,&v[i][0].y);
            for(int j=1;j<=k+1;j++){
                point tp = p[i][j-1] - O, tv = v[i][j-1]; 
                db tx = cal(tv*tv, tp*tv*2, tp*tp-R*R);
                t[i][j] = t[i][j-1] + tx;
                p[i][j] = p[i][j-1] + tv*tx;
                point l = O - p[i][j]; swap(l.x,l.y),l.x=-l.x;
                v[i][j] = l * ((tv*l)/(l*l)) * 2 - tv;
            }
        }
        db ans = 1e18;
        for(int i=1;i<=n;i++)
        for(int j=1;j<=n;j++)if(i!=j){
            int k1=0,k2=0;
            while(k1<=k&&k2<=k){
                ans = min(ans, solve(i, j, k1, k2, max(t[i][k1],t[j][k2]), min(t[i][k1+1],t[j][k2+1])));
                if(t[i][k1+1]<t[j][k2+1])k1++;else k2++;
            }
        }
        printf("%.3lf
    ",ans);
        return 0;
    }

• bzoj1043【Hnoi2008】下落的圆盘
• 思路：枚举每个圆盘后面落下的圆盘，求相交的弧度区域，分别对每个圆求弧度并之后统计没有被覆盖的部分；
• 算几知识：
  
• 1.极角：
  
• 利用$atan2(y,x)$可以求得一个点的极角(弧度)；
• 极角范围$(-pi,pi]$，大小逆时针(-x轴，-x轴]不断增大；
• x轴上半部分$+x$轴到$-x$轴不断增大，下半$-x$轴到$+x$轴不断增大；
• 特别注意的是：$+x$轴为$0$，$-x$为$pi$，$x$轴上方为正，下方为负，；
• 如果一个区间跨越了-x轴，那么需要分成两个区间处理；

• 2.求两圆交点及相交的极角弧度范围：
  
• 设小圆$O_{1}$半径$r_{1}$，大圆$O_{2}$半径$r_{2}$，圆心距$|O1O2| = d$，两个交点分别为$P_{1}$,$P_{2}$;
• 首先判断位置关系：$d > r_{1} + r_{2}$相离，$d < r_{2} - r_{1}$包含，都没有交点;
• （不考虑相切）然后：
  
• 在$ riangle O1O2P1$中用余弦定理算出$ angle P_{1}O_{1}O_{2}$，利用$vec{O_{1}O_{2}}$上下旋转调整可得$vec{O_{1}P_{1}} ,    vec{O_{1}P_{2}}$ ，由此可以算出$P_{1}P_{2}$

• #include<bits/stdc++.h>
  #define db double 
  #define eps 1e-9 
  using namespace std;
  const int N=1010;
  const db pi = acos(-1);
  int n,tot1[N],tot2[N],vis[N];
  db sub2[N][N<<2],cnt[N<<2];
  struct point{
      db x,y; 
      point(db _x=0,db _y=0):x(_x),y(_y){}; 
      point operator +(const point&A)const{return point(x+A.x,y+A.y);}
      point operator -(const point&A)const{return point(x-A.x,y-A.y);}
      db operator *(const point&A)const{return x*A.x+y*A.y;}
      db operator ^(const point&A)const{return x*A.y-y*A.x;}
      point operator *(const db&a)const{return point(x*a,y*a);}
  }sub1[N][N<<2];
  struct circle{point o;db r;}c[N];
  int dcmp(db x){return fabs(x)<eps?0:x<0?-1:1;}
  db len(point A){return sqrt(A*A);}
  point rotate(point A,db cos,db sin){return point(A.x*cos-A.y*sin, A.y*cos+A.x*sin);}
  void ins(int i,point p1,point p2){
      db l = atan2(p1.y,p1.x), r = atan2(p2.y,p2.x);
      sub2[i][++tot2[i]] = l;
      sub2[i][++tot2[i]] = r;
      if(dcmp(l-r)>0){
          sub1[i][++tot1[i]]=point(-pi,r);
          sub1[i][++tot1[i]]=point(l,pi);
      }else sub1[i][++tot1[i]]=point(l,r);
  } 
  void solve(int i,int j){
      if(dcmp(c[i].r-c[j].r)>0)swap(i,j);
      point td = c[j].o - c[i].o,p0,p1,p2;
      db d = len(td), r1=c[i].r, r2=c[j].r;
      if(dcmp(d-r1-r2)>=0)return ;
      if(dcmp(d-r2+r1)<=0){if(i<j)vis[i]=1;return ;}
      db Cos = (td*td + r1*r1 - r2*r2) /d /r1 /2  ;
      db Sin = sqrt(1-Cos*Cos);
      p0 = td * (r1/d);
      p1 = c[i].o + rotate(p0,Cos,-Sin);//
      p2 = c[i].o + rotate(p0,Cos,Sin);
      if(i<j)ins(i,p1-c[i].o, p2-c[i].o);
      else ins(j,p2-c[j].o, p1-c[j].o);
  }
  int main(){
      freopen("bzoj1043.in","r",stdin);
      freopen("bzoj1043.out","w",stdout);
      scanf("%d",&n);
      for(int i=1;i<=n;i++){
          scanf("%lf%lf%lf",&c[i].r,&c[i].o.x,&c[i].o.y);
          for(int j=i-1;j;j--)solve(j,i);
      } 
      db ans = 0;
      for(int i=1;i<=n;i++){
          if(vis[i])continue;
          sub2[i][++tot2[i]]=-pi;
          sub2[i][++tot2[i]]=pi;
          sort(sub2[i]+1,sub2[i]+tot2[i]+1);
          for(int j=1;j<=tot2[i];j++)cnt[j]=0; 
          for(int j=1;j<=tot1[i];j++){
              int p1 = lower_bound(sub2[i]+1,sub2[i]+tot2[i]+1,sub1[i][j].x) - sub2[i];    
              int p2 = lower_bound(sub2[i]+1,sub2[i]+tot2[i]+1,sub1[i][j].y) - sub2[i];
              cnt[p1]--,cnt[p2]++;
          }
          db all = 0;
          for(int j=1;j<tot2[i];j++){
              cnt[j]+=cnt[j-1];
              if(!cnt[j])all += sub2[i][j+1]-sub2[i][j];
          } 
          ans += all * c[i].r;
      }
      printf("%.3lf
  ", ans);
  }

•  bzoj2433【Noi2011】智能车比赛
• 思路：处理相邻两个矩形的y坐标并$[l,r]$，可以通过的是这段，由于只会向右移动，所以利用斜率判断是否可走，直接dp即可；
• 也没有什么知识，注意使用到了斜率的话一定要注意在x坐标相同的特判，这题主要是s和t点的位置：
• 
• 所以在同一x坐标上的[l,r]意义可能不同，特判s，t的位置再调整一下dp边界；

• #include<bits/stdc++.h>
  #define inf 1e18 
  #define db double 
  #define eps 1e-8
  using namespace std;
  const int N=2010;
  int n;
  db f[N][2],pv,qx[N],qy1[N],qy2[N];
  int dcmp(db x){return fabs(x)<eps?0:x<0?-1:1;}
  struct point{
      db x,y;
      point(db _x=0,db _y=0):x(_x),y(_y){};
  }s,t,p[N][2];
  db calk(point x,point y){
      if(!dcmp(x.x-y.x))return dcmp(x.y-y.y)*inf;
      return (y.y-x.y)/(y.x-x.x);
  }
  db dis(point x,point y){return sqrt((x.x-y.x)*(x.x-y.x)+(x.y-y.y)*(x.y-y.y));}
  void relax(point&tp,int&pos,int typ){
      if(tp.x==qx[pos]){
          if(tp.y==p[pos][0].y)tp.y+=eps;
          if(tp.y==p[pos][1].y)tp.y-=eps;
          int tmp = typ>0?pos:pos-1;
          if(dcmp(tp.y-qy1[tmp])>=0&&dcmp(tp.y-qy2[tmp])<=0)pos+=typ; 
      }
  } 
  int main(){
      #ifndef ONLINE_JUDGE
      //freopen("bzoj2433.in","r",stdin);
      //freopen("bzoj2433.out","w",stdout);
      #endif
      scanf("%d",&n);
      for(int i=1;i<=n;i++)scanf("%lf%lf%lf%lf",&qx[i],&qy1[i],&qx[i+1],&qy2[i]);
      scanf("%lf%lf%lf%lf%lf",&s.x,&s.y,&t.x,&t.y,&pv);
      if(s.x>t.x)swap(s,t);
      qy1[0]=-inf,qy2[0]=inf;
      for(int i=1;i<=n;i++){
          p[i][0] = point(qx[i],max(qy1[i],qy1[i-1]));
          p[i][1] = point(qx[i],min(qy2[i],qy2[i-1]));
          for(int j=0;j<2;j++)f[i][j]=inf;
      }
      int ps = lower_bound(qx+1,qx+n+1,s.x-eps)-qx;
      int pt = lower_bound(qx+1,qx+n+1,t.x+eps)-qx-1;
      db l,r,t1,t2;
      relax(s,ps,1);
      relax(t,pt,-1); 
      for(int i=ps;i<=pt;i++)
      for(int j=0;j<2;j++){
          l=-inf,r=inf;
          point now = p[i][j];
          for(int k=i-1;k>=ps;k--){
              l = max(l, t1=calk(now,p[k][1]));
              r = min(r, t2=calk(now,p[k][0]));
              if(dcmp(t2-l)>=0&&dcmp(t2-r)<=0){
                  f[i][j] = min(f[i][j], f[k][0] + dis(now,p[k][0]));
              }
              if(dcmp(t1-l)>=0&&dcmp(t1-r)<=0){
                  f[i][j] = min(f[i][j], f[k][1] + dis(now,p[k][1]));
              }
          }
          t1=calk(s,now);
          if(dcmp(t1-l)>=0&&dcmp(t1-r)<=0)f[i][j]=min(f[i][j],dis(s,now));
      }
      db ans=inf;
      l=-inf;r=inf;
      for(int i=pt;i>=ps;i--){
          l=max(l,t1=calk(t,p[i][1]));
          r=min(r,t2=calk(t,p[i][0]));
          if(dcmp(t2-l)>=0&&dcmp(t2-r)<=0){
              ans = min(ans, f[i][0]+dis(p[i][0],t)); 
          }
          if(dcmp(t1-l)>=0&&dcmp(t1-r)<=0){
              ans = min(ans, f[i][1]+dis(p[i][1],t));
          }
      }
      t1=calk(s,t);
      if(dcmp(t1-l)>=0&&dcmp(t1-r)<=0){
          ans = min(ans,dis(s,t));
      }
      ans /= pv; 
      printf("%.8lf
  ",ans);
      return 0;
  }

   
• bzoj2864战火星空
  • 做网络流的时候做的，写下面了；
  • https://www.cnblogs.com/Paul-Guderian/p/10128831.html
  • 算几知识：求圆和一条直线的交点；
  • 先求出垂足，在用勾股定理算出底边长，向量加减可得两个交点；

  • #include<bits/stdc++.h>
    #define inf 1e18
    #define ld long double 
    #define eps 1e-9
    using namespace std;
    const int N=400010;
    struct point{
        ld x,y;
        point(ld _x=0,ld _y=0):x(_x),y(_y){};
        point operator +(const point&A){return point(x+A.x,y+A.y);}
        point operator -(const point&A){return point(x-A.x,y-A.y);}
        point operator *(const ld&A){return point(x*A,y*A);}
        ld operator ^(const point&A){return x*A.y-y*A.x;}
        ld operator *(const point&A){return x*A.x+y*A.y;}
    }A[21];
    struct line{point s,t;ld v,r,e;}B[21]; 
    int T,n,m,tot,o,hd[N],cur[N],vis[N],dis[N];
    ld s[21][21],t[21][21],sub[N];
    struct Edge{int v,nt; ld f;}E[N<<1];
    queue<int>q; 
    int dcmp(ld x){return fabs(x)<eps?0:x<0?-1:1;}
    point cross(point P,point v,point Q,point w){
        point u=P-Q;
        ld tmp=(w^u)/(v^w); 
        return P+v*tmp;
    }
    void cal(int i,int j){
        point P,Q,C,v,w; ld d,dt,t0,t1,t2,tl,tr;
        P=A[i];Q=B[j].s;
        w=B[j].t-B[j].s;
        v=point(-w.y,w.x); 
        C=cross(P,v,Q,w);
        v=C-P;
        d=(B[j].r*B[j].r)-(v*v);
        if(dcmp(d)<0)return;
        d=sqrt(d);
        dt=d/B[j].v;
        tl=0;tr=sqrt(w*w)/B[j].v;
        v=C-Q;
        if(dcmp(v.x*w.x)>0)t0=sqrt(v*v)/B[j].v;
        else t0=-sqrt(v*v)/B[j].v;
        t1=t0-dt,t2=t0+dt;
        s[i][j]=max(t1,tl);
        t[i][j]=min(t2,tr);
        if(dcmp(s[i][j]-t[i][j])<0){
            sub[++tot]=s[i][j];
            sub[++tot]=t[i][j];
        }
    }
    void adde(int u,int v,ld f){
    //    printf("%d %d %Lf
    ",u,v,f);
        E[o]=(Edge){v,hd[u],f};hd[u]=o++;
        E[o]=(Edge){u,hd[v],0};hd[v]=o++;
    } 
    bool in(ld s1,ld t1,ld s2,ld t2){return dcmp(s1-s2)<=0&&dcmp(t1-t2)>=0;}
    bool bfs(){
        for(int i=0;i<=T;i++)vis[i]=dis[i]=0;
        vis[0]=dis[0]=1;q.push(0);
        while(!q.empty()){
            int u=q.front();q.pop();
            for(int i=hd[u],v;~i;i=E[i].nt)if(dcmp(E[i].f)>0){
                if(!vis[v=E[i].v])vis[v]=1,q.push(v),dis[v]=dis[u]+1;
            } 
        }
        return vis[T];
    }
    ld dfs(int u,ld F){
        if(u==T||!dcmp(F))return F;
        ld flow=0,f;
        for(int i=cur[u];~i;i=E[i].nt){
            int v=E[cur[u]=i].v;
            if(dis[v]==dis[u]+1&&dcmp(f=dfs(v,min(F,E[i].f)))>0){
                flow+=f,F-=f;
                E[i].f-=f,E[i^1].f+=f;
                if(!dcmp(F))break;
            }
        }
        return flow;
    }
    ld dinic(){
        ld flow=0;
        while(bfs()){
            for(int i=0;i<=T;i++)cur[i]=hd[i];
            flow+=dfs(0,inf);
        }
        return flow;
    }
    int main(){
        freopen("bzoj2864.in","r",stdin);
        freopen("bzoj2864.out","w",stdout);
        memset(hd,-1,sizeof(hd));
        scanf("%d%d",&n,&m);
        for(int i=1;i<=n;i++)scanf("%Lf%Lf",&A[i].x,&A[i].y);
        for(int i=1;i<=m;i++){
            scanf("%Lf%Lf%Lf%Lf",&B[i].s.x,&B[i].s.y,&B[i].t.x,&B[i].t.y);
            scanf("%Lf%Lf%Lf",&B[i].v,&B[i].r,&B[i].e);
        }
        for(int i=1;i<=n;i++)
        for(int j=1;j<=m;j++){
            cal(i,j);
        }
        sort(sub+1,sub+tot+1);
        if(tot)tot--;T=tot*n+m+1;
        for(int i=1;i<=m;i++)adde(0,i,B[i].e);
        for(int i=1;i<=tot;i++)
        for(int j=1;j<=n;j++){
            adde((i-1)*n+j+m,T,sub[i+1]-sub[i]);
        }
        /*
        for(int i=1;i<=tot;i++)printf("%.6Lf ",sub[i]);
        puts("");
        */
        /*
        for(int i=1;i<=n;i++)
        for(int j=1;j<=m;j++){
            printf("%.6Lf %.6Lf %6Lf
    ",s[i][j],t[i][j],t[i][j]-s[i][j]);
        }*/
        for(int i=1;i<=n;i++)
        for(int j=1;j<=m;j++)
        for(int k=1;k<=tot;k++)if(in(s[i][j],t[i][j],sub[k],sub[k+1])){
            ld tmp=t[i][j]-s[i][j]; 
            if(dcmp(tmp)>0)adde(j,(k-1)*n+m+i,inf);
        }
        ld ans = dinic();
        printf("%.6Lf
    ",ans);
        return 0;
    }

• bzoj2458【Beijing2011】最小三角形
  • 平面最近点对：
  • https://www.luogu.org/blog/user277/solution-p1429
  • 这题依旧求解分治:
    
  • 先按照$x$排序，以$L = p[mid].x$为轴划分，求解$[l,mid]$和$[mid+1,r]$，假设现在的最小答案为$ans$；
  • 需要计算跨越两边的答案；
  • 根据三角形边的关系，顶点间的距离不会超过$frac{ans}{2}$；
  • 所以我们可以对每个点维护一个$d*2d$的矩形；
  • 具体每次按$y$归并，将$L$沿x轴左右$ans/2$的点都加进来，双指针扫描维护$y$;
  • 由于不能比答案更小，在每个$d*2d$的矩形内的点的个数大约为$O(1)$
  • 这样就是$n log n$
  • 注意双指针的维护不能取$abs$

  • #include<bits/stdc++.h>
    #define db long double 
    using namespace std;
    const int N=200010;
    int n;
    db ans=1e18;
    struct point{
        db x,y;
        bool operator <(const point&A)const{return x<A.x;}
    }p[N],pl[N],pr[N],tmp[N];
    db dis(point A,point B){return sqrt((A.x-B.x)*(A.x-B.x)+(A.y-B.y)*(A.y-B.y));}
    void solve(int l,int r){
        if(l==r){return;}
        int mid=(l+r)>>1;
        db txl=p[mid].x,txr=p[mid].x;
        solve(l,mid);solve(mid+1,r);
        int totl=0,totr=0;
        db mx = ans/2;
        for(int i=l;i<=mid;i++)if(txl-p[i].x<=mx)pl[++totl]=p[i];
        for(int i=mid+1;i<=r;i++)if(p[i].x-txr<=mx)pr[++totr]=p[i];
        for(int i=1,t1=1,t2=0;i<=totl;i++){
            while(t1<=totr&&/*abs*/pl[i].y-pr[t1].y/*)*/>mx)t1++;
            while(t2<totr&&/*abs*/pr[t2+1].y-pl[i].y/*)*/<=mx)t2++; 
            for(int j=t1;j<=t2;j++)
            for(int k=j+1;k<=t2;k++){
                ans = min(ans, dis(pl[i],pr[j]) + dis(pl[i],pr[k]) + dis(pr[j],pr[k]));
            }
        } 
        for(int i=1,t1=1,t2=0;i<=totr;i++){
            while(t1<=totl&&/*abs(*/pr[i].y-pl[t1].y/*)*/>mx)t1++;
            while(t2<totl&&/*abs(*/pl[t2+1].y-pr[i].y/*)*/<=mx)t2++;
            for(int j=t1;j<=t2;j++)
            for(int k=j+1;k<=t2;k++){
                ans = min(ans, dis(pr[i],pl[j]) + dis(pr[i],pl[k]) + dis(pl[j],pl[k]));
            }
        }
        int t=l,j=mid+1;
        for(int i=l;i<=mid;i++){
            while(j<=r&&p[j].y<p[i].y)tmp[t++]=p[j++];
            tmp[t++]=p[i];
        }
        for(;j<=r;j++)tmp[t++]=p[j];
        for(int i=l;i<=r;i++)p[i]=tmp[i];
    }
    int main(){
        #ifndef ONLINE_JUDGE 
    //    freopen("bzoj2458.in","r",stdin);
    //    freopen("bzoj2458.out","w",stdout);
        #endif
        scanf("%d",&n);
        for(int i=1;i<=n;i++)scanf("%Lf%Lf",&p[i].x,&p[i].y);
        sort(p+1,p+n+1);
        solve(1,n);
        printf("%.6Lf
    ",ans);
        return 0;
    }