BZOJ 2732 射箭

时间:2021-10-03 17:00:51

http://www.lydsy.com/JudgeOnline/problem.php?id=2732

题意:给你n个靶子,让你求是否有一个经过原点的抛物线经过最多的前k个靶子,求出最大的k

思路:

就是这样的形式:y1<=ax^2+bx<=y2,这里y1,y2,x是已知的,有多组,我们发现,变量只有a和b了,而且都是一次,这样就转换成二元一次不等式组,这个问题就是高二学过的线性规划了

可以把它转换成半平面交,然后二分答案就可以了。

坑点:TM BZOJ上面要用longdouble,不然会WA一发,还有,考试的时候我居然在二分里面排序,导致复杂度退化到nlog^2 n T_T,这点要记住了。

 #include<cstdio>

 #include<iostream>

 #include<cmath>

 #include<cstring>

 #include<algorithm>

 #define dou long double

 const dou inf=1e15;

 int tot,n;

 struct Point{

     dou x,y;

     Point(){}

     Point(dou x0,dou y0):x(x0),y(y0){}

 };

 struct Line{

     Point s,e;

     dou slop;

     int id;

     Line(){}

     Line(Point s0,Point e0):s(s0),e(e0){}

 }l[],c[],L[];

 int read(){

     int t=,f=;char ch=getchar();

     while (ch<''||ch>''){if (ch=='-')f=-;ch=getchar();}

     while (''<=ch&&ch<=''){t=t*+ch-'';ch=getchar();}

     return t*f;

 }

 dou operator *(Point p1,Point p2){

     return p1.x*p2.y-p1.y*p2.x;

 }

 Point operator -(Point p1,Point p2){

     return Point(p1.x-p2.x,p1.y-p2.y);

 }

 bool cmp(Line p1,Line p2){

     if (p1.slop==p2.slop) return (p2.e-p1.s)*(p1.e-p1.s)>=;

     else return p1.slop<p2.slop;

 }

 Point inter(Line p1,Line p2){

     dou k1=(p2.e-p1.s)*(p1.e-p1.s);

     dou k2=(p1.e-p1.s)*(p2.s-p1.s);

     dou t=(k2)/(k1+k2);

     dou x=p2.s.x+(p2.e.x-p2.s.x)*t;

     dou y=p2.s.y+(p2.e.y-p2.s.y)*t;

     return Point(x,y);

 }

 bool jud(Line p1,Line p2,Line p3){

     Point p=inter(p1,p2);

     return (p-p3.s)*(p3.e-p3.s)>;

 }

 bool check(int mid){

     int Tot=;

     for (int i=;i<=tot;i++)

      if (l[i].id<=mid) L[++Tot]=l[i];

     int cnt=;

     for (int i=;i<=Tot;i++)

      if (L[i].slop!=L[i-].slop) L[++cnt]=L[i];

     int ll=,rr=;

     c[]=L[];c[]=L[];

     for (int i=;i<=Tot;i++){

         while (ll<rr&&jud(c[rr],c[rr-],L[i])) rr--;

         while (ll<rr&&jud(c[ll],c[ll+],L[i])) ll++;

         c[++rr]=L[i];

     }

     while (ll<rr&&jud(c[rr],c[rr-],c[ll])) rr--;

     while (ll<rr&&jud(c[ll],c[ll+],c[rr])) ll++;

     if (rr-ll+<) return ;

     else return ;

 }

 int main(){

     n=read();

     l[++tot].s=Point(-inf,inf);l[tot].e=Point(-inf,-inf);

     l[++tot].s=Point(-inf,-inf);l[tot].e=Point(inf,-inf);

     l[++tot].s=Point(inf,-inf);l[tot].e=Point(inf,inf);

     l[++tot].s=Point(inf,inf);l[tot].e=Point(-inf,inf);

     for (int i=;i<=n;i++){

         dou x=read(),y1=read(),y2=read();

         l[++tot].s.x=-;l[tot].s.y=y1/x-(-)*x;

         l[tot].e.x=;l[tot].e.y=y1/x-x;

         l[tot].id=i;

         l[++tot].s.x=;l[tot].s.y=y2/x-x;

         l[tot].e.x=-;l[tot].e.y=y2/x+x;

         l[tot].id=i;

     }

     for (int i=;i<=tot;i++) l[i].slop=atan2(l[i].e.y-l[i].s.y,l[i].e.x-l[i].s.x);

     std::sort(l+,l++tot,cmp);

     int LL=,RR=n,ans=;

     while (LL<=RR){

         int mid=(LL+RR)>>;

         if (check(mid)) ans=mid,LL=mid+;

         else RR=mid-;

     }

     printf("%d",ans);

 }

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