SDOI2018 物理实验
题意:二维平面上有一条直线,直线上放置了一个激光发射器,会向导轨两侧沿导轨垂直方向发射宽度为 L 的激光束。平面上还有 n 条线段,并且线段和线段、线段和直线之间都没有公共点,线段和直线的夹角不超过 85◦,激光束不能穿透线段,你需要求出激光束能照射到的线段长度之和的最大值。
做法:先进行坐标变换,将给定直线移到x轴上,注意首先将直线的一端移到原点,然后再旋转。(样例数据全都从原点出发。。。没发现。就gg了十几发,好脑残啊。。)考虑将每个线段投影到直线上,这些点将直线分成一些线段,对于每一段,找到它上方最近的那个线段,然后计算单位长度的贡献,最后的答案就可以双指针求出了。对于查询上方最近的线段,使用set维护扫描线即可。双指针还写崩了。。。这题出出来就gg了啊。。。码力弱炸,还手残。
#include <bits/stdc++.h>
using namespace std;
#define rep(i,a,b) for(int i=(a);i<=(b);++i)
#define per(i,a,b) for(int i=(a);i>=(b);--i)
#define pb push_back
typedef long double db;
const db EPS = 0;
const db INF = 1e100;
inline int sgn(db x, db E = EPS){return x<-E?-1:x>E;}
inline int cmp(db a,db b,db E = EPS){return sgn(a-b, E);}
struct P{
db x,y;
bool operator<(P o) const { return cmp(x,o.x) != 0? cmp(x,o.x) == -1 : cmp(y,o.y) == -1; }
bool operator>(P o) const { return cmp(x,o.x) != 0? cmp(x,o.x) == 1 : cmp(y,o.y) == 1; }
bool operator==(P o) { return cmp(x,o.x) == 0 && cmp(y,o.y) == 0; }
void read(){ int _x,_y; scanf("%d%d",&_x,&_y); x=_x,y=_y; }
P operator + (P o) { return {x+o.x,y+o.y}; }
P operator - (P o) { return {x-o.x,y-o.y}; }
db det(P o) { return x*o.y-y*o.x; }
db dot(P o){ return x*o.x+y*o.y; }
db disTo(P p) { return (*this - p).abs(); }
db alpha() { return atan2(y, x); }
db abs() { return sqrt(abs2());}
db abs2() { return x * x + y * y; }
P rot(db a) {
db c = cos(a), s = sin(a);
return {c*x-s*y, s*x+c*y};
}
};
struct L {
P ps[2];
L(){}
L(P p1, P p2) { ps[0] = p1, ps[1] = p2; }
P& operator[](int i) { return ps[i]; }
P dir() { return ps[1] - ps[0]; }
bool include(P p) { return sgn((ps[1]-ps[0]).det(p-ps[0])); }
};
db nowx = 0;
int top[100010];
vector<db> scan;
int sc;
struct seg {
P u, v; int id; db k;
seg(){}
seg(P _u, P _v, int _id) {
id = _id; u = _u; v = _v;
k = (v.y - u.y) / (v.x - u.x);
}
bool operator < (const seg a) const {
db v1 = u.y + k * (nowx - u.x);
db v2 = a.u.y + a.k * (nowx - a.u.x);
if( cmp(v1, v2) == 0 ) return k < a.k;
return v1 < v2;
}
};
set< seg > S;
set< seg >::iterator it[100010];
struct Q {
P e; int id;
bool operator < (Q a) {
if(e == a.e) return id < a.id;
return e < a.e;
}
};
vector< Q > qs;
vector<db> cal(vector<L> ls) {
int n = ls.size();
qs.clear();
rep(i,0,n-1) {
if(ls[i][0].x > ls[i][1].x) swap(ls[i][0], ls[i][1]);
qs.pb({ls[i][0], -i-1});
qs.pb({ls[i][1], i+1});
}
sort(qs.begin(),qs.end());
nowx = 0; S.clear();
rep(i,0,sc-1) top[i] = -1;
for(int j = 0, i = 0; i < sc; ++ i) {
nowx = scan[i];
for( ; j < qs.size() && qs[j].e.x <= nowx ; ++j) {
if(qs[j].id < 0) {
int ID = (-qs[j].id)-1;
it[ID] = S.insert(seg(ls[ID][0],ls[ID][1],ID)).first;
}
else {
int ID = qs[j].id-1;
S.erase(it[ID]);
}
}
if(!S.empty()) top[i] = (*S.begin()).id;
}
function<db(int)> cost = [&](int tp) -> db {
return abs( ls[tp][0].disTo(ls[tp][1]) / (ls[tp][1].x - ls[tp][0].x) );
};
vector<db> V;
rep(i, 0, sc-2) {
if(top[i] != -1) V.pb(cost(top[i])); else V.pb(0);
}
return V;
}
db pv[100010], pc[100010];
db cala(vector< pair<db,db> > &V, db Len) {
function<db(db,int,int)> MX = [&](db LL, int p1, int p2) -> db {
db tmp = 0;
if(0 <= p1 && p1 <= sc-2) tmp = max(tmp, V[p1].second * min(LL, V[p1].first) );
if(0 <= p2 && p2 <= sc-2) tmp = max(tmp, V[p2].second * min(LL, V[p2].first) );
return tmp;
};
db ans = 0;
int p1 = 0, p2 = 0; db tC = 0, tL = 0;
do {
if(Len >= tL) ans = max(ans, tC + MX(Len-tL, p1-1, p2 ) );
if(p2 < sc-1 && cmp(tL + V[p2].first, Len) <= 0) {
tL += V[p2].first;
tC += V[p2].first * V[p2].second;
++ p2;
}
else if(p1 <= p2) {
tL -= V[p1].first;
tC -= V[p1].first * V[p1].second;
++ p1;
}
else {
if(p2 < sc-1) {
tL += V[p2].first;
tC += V[p2].first * V[p2].second;
++ p2;
}
if(p1 <= p2) {
tL -= V[p1].first;
tC -= V[p1].first * V[p1].second;
++ p1;
}
}
if(Len >= tL) ans = max(ans, tC + MX(Len-tL, p1-1, p2 ) );
} while(p1 < sc-1 || p2 < sc-1);
return ans;
}
int n;
L line[100010];
P p1, p2;
db Len;
vector<L> UP, LW;
void init() {
UP.clear(); LW.clear();
if(p1 > p2) swap(p1, p2);
db a = -(p2-p1).alpha();
rep(i,0,n-1) {
line[i][0] = (line[i][0]-p1).rot(a);
line[i][1] = (line[i][1]-p1).rot(a);
if( sgn(line[i][0].y) == 1 ) UP.pb(line[i]);
else LW.pb( L( {line[i][0].x, -line[i][0].y} , {line[i][1].x, -line[i][1].y} ) );
}
scan.clear();
rep(i,0,(int)UP.size()-1) { scan.pb(UP[i][0].x), scan.pb(UP[i][1].x); }
rep(i,0,(int)LW.size()-1) { scan.pb(LW[i][0].x), scan.pb(LW[i][1].x); }
sort(scan.begin(),scan.end()); scan.erase( unique(scan.begin(),scan.end()), scan.end());
sc = scan.size();
}
int main() {
int _; scanf("%d",&_);
while(_--) {
scanf("%d",&n);
rep(i,0,n-1) {
line[i][0].read();
line[i][1].read();
}
p1.read(), p2.read();
int t; scanf("%d",&t), Len = t;
init();
vector<db> V1 = cal(UP);
vector<db> V2 = cal(LW);
vector<pair<db,db>> V;
rep(i, 0, (int)V1.size()-1) {
V.pb({scan[i+1]-scan[i], V1[i] + V2[i]});
}
db ans = cala(V, Len);
printf("%.12Lf
",ans);
}
return 0;
}