description
analysis
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二分一个角度,首先假设该弧度角( heta in[{pi over 2},pi]),要找的直线斜率(kin(-∞, an heta])
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要找这种直线,两个点((x_i,y_i),(x_j,y_j))构成一条直线,先钦定(x_i≤x_j)
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直线斜率({{y_j-y_i}over{x_j-x_i}}≤ an heta),转化后变成(y_j-x_j an heta≤y_i-x_i an heta)
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因为两边分别只和(i,j)有关,可以把(y_k-x_k an heta)记做(yy_k),((x_i,y_i))映射到((x_i,yy_i))
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此时就是要求有多少对点(x_i≤x_j,yy_i≥yy_j),二维偏序,用树状数组解决
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这种情况少计算了斜率为正的直线条数,需要把算少的这部分加起来
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那么对于( hetain[0,{pi over 2})),计算斜率小于( an heta)的直线条数过程是完全一样的
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这种情况又多计算了斜率为负的直线条数,需要把算多的这部分减掉
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经过一个点有多少条直线斜率为正,就是一个点右上角的点个数;斜率为负就是左上角的点个数
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这个可以一开始用两次树状数组求出(sum)右上角点个数和(sum)左上角点个数
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由于二分区间不同,这里左上角右上角求的范围有一点点差别,左上角必须严格高于该点,右上角则否
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二分的时候判断当前在直线右手边的直线条数是否大于等于比较数,是则(r)右移,否则(l)左移
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注意取开闭区间和计算的小细节
code
#pragma GCC optimize("O3")
#pragma G++ optimize("O3")
#include<stdio.h>
#include<string.h>
#include<algorithm>
#include<math.h>
#define eps 1e-10
#define MAXN 100005
#define db double
#define ll long long
#define reg register ll
#define lowbit(x) ((x)&(-x))
#define pi 3.1415926535897932384626
#define fo(i,a,b) for (reg i=a;i<=b;++i)
#define fd(i,a,b) for (reg i=a;i>=b;--i)
using namespace std;
ll tr[MAXN],sum[MAXN];
ll n,m,tot,summ1,summ2;
struct node
{
ll x,y;
}a[MAXN];
struct node1
{
db x;ll y,val;
}b[MAXN];
inline ll read()
{
ll x=0,f=1;char ch=getchar();
while (ch<'0' || '9'<ch){if (ch=='-')f=-1;ch=getchar();}
while ('0'<=ch && ch<='9')x=x*10+ch-'0',ch=getchar();
return x*f;
}
inline bool cmp(node a,node b){return a.x<b.x || (a.x==b.x && a.y>b.y);}
inline bool cmp1(node1 a,node1 b){return a.x<b.x;}
inline bool cmp2(node1 a,node1 b){return a.y<b.y;}
inline void insert(ll x){while (x<=n)++tr[x],x+=lowbit(x);}
inline ll query(ll x){ll y=0;while (x)y+=tr[x],x-=lowbit(x);return y;}
inline ll get(ll x,ll y){return query(y)-query(x-1);}
inline db binary(db m)
{
db l=0,r=pi,mid,tann;
while (r-l>eps)
{
mid=(l+r)/2.0,tann=tan(mid);
memset(tr,0,sizeof(tr)),memset(sum,0,sizeof(sum));
fo(i,1,n)b[i].x=1.0*(a[i].y-a[i].x*tann),b[i].y=i;
sort(b+1,b+n+1,cmp1),tot=0;
fo(i,1,n)
{
b[i].val=++tot;
while (i<n && fabs(b[i].x-b[i+1].x)<eps)b[++i].val=tot;
}
sort(b+1,b+n+1,cmp2);ll total=0;
fd(i,n,1)total+=(sum[i]=get(1,b[i].val)),insert(b[i].val);
total+=(mid*2>pi?summ1:-summ2);
if (total>=m)r=mid;else l=mid;
}
return r;
}
int main()
{
//freopen("T2.in","r",stdin);
freopen("line.in","r",stdin);
freopen("line.out","w",stdout);
n=read(),m=n*(n-1)/2;
fo(i,1,n)a[i].x=read(),a[i].y=read();
sort(a+1,a+n+1,cmp);
fo(i,1,n)b[i].x=a[i].y,b[i].y=i;
sort(b+1,b+n+1,cmp1),tot=0;
fo(i,1,n)
{
b[i].val=++tot;
while (i<n && b[i].x==b[i+1].x)b[++i].val=tot;
}
sort(b+1,b+n+1,cmp2);
fd(i,n,1)summ1+=get(b[i].val,tot),insert(b[i].val);
memset(tr,0,sizeof(tr));
sort(a+1,a+n+1,cmp);
fo(i,1,n)b[i].x=a[i].y,b[i].y=i;
sort(b+1,b+n+1,cmp1),tot=0;
fo(i,1,n)
{
b[i].val=++tot;
while (i<n && b[i].x==b[i+1].x)b[++i].val=tot;
}
sort(b+1,b+n+1,cmp2);
fo(i,1,n)summ2+=get(b[i].val+1,tot),insert(b[i].val);
printf("%.13lf
",m&1?binary((m+1)/2):(binary(m/2)+binary(m/2+1))/2);
return 0;
}