本文介绍了一个涉及几何计算的优化问题,使用二分查找算法求解特定几何形状中路径长度的最小值。通过调整搜索范围和精度,实现了有效的解决方案。
此题严格证明方法确实暂时不会,一开始想象成凹函数和单调函数的和但是没法严格证明,因为多元函数不知道是否涉及偏导数,回去翻翻高数书要是证明了来填坑。
说说这个题的坑在于一开始三分的时候用点来判断三分结束,但是发现sqrt精度丢失问题似乎比较严重,后来用mid_v和midmid_v来判断就1A了,精度问题果然还是搞不懂。
被精度卡了很多次现在至今学不会,蒟蒻真是伤不起啊。下面贴代码。
#include <iostream>
#include <cmath>
#include <algorithm>
using namespace std;
const double EPS=1e-8;
double R,Q,P,ans;
double L1,L2;
struct Point{
double x,y;
};
Point A,B,C,D;
double dis(Point p1,Point p2){
return sqrt((p1.x-p2.x)*(p1.x-p2.x)+(p1.y-p2.y)*(p1.y-p2.y)+1e-9);
}
double BSolve(Point MIN,Point MAX,Point AA){
Point Left,Right;
Point mid, midmid;
double mid_value=999, midmid_value=0;
Left.x = MIN.x;
Left.y = MIN.y;
Right.x = MAX.x;
Right.y = MAX.y;
while (abs(mid_value - midmid_value)>EPS )
{
mid.x = (Left.x + Right.x) / 2.0;
mid.y = (Left.y + Right.y) / 2.0;
midmid.x = (mid.x + Right.x) / 2.0;
midmid.y = (mid.y + Right.y) / 2.0;
mid_value = dis(mid,D)/Q+dis(AA,mid)/R;
midmid_value = dis(midmid,D)/Q+dis(AA,midmid)/R;
// 假设求解最大极值.
if (mid_value <= midmid_value) Right = midmid;
else Left = mid;
}
return mid_value;
}
double ACalc(Point a)
{
return BSolve(C,D,a);
}
void ASolve(Point MIN,Point MAX){
Point Left,Right;
Point mid, midmid;
double mid_value=999, midmid_value=0;
Left.x = MIN.x;
Left.y = MIN.y;
Right.x = MAX.x;
Right.y = MAX.y;
while (abs(mid_value - midmid_value)>EPS )
{
mid.x = (Left.x + Right.x) / 2;
mid.y = (Left.y + Right.y) / 2;
midmid.x = (mid.x + Right.x) / 2;
midmid.y = (mid.y + Right.y) / 2;
mid_value = dis(mid,A)/P+ACalc(mid);
midmid_value = dis(midmid,A)/P+ACalc(midmid);
// 假设求解最大极值.
if (mid_value <= midmid_value) Right = midmid;
else Left = mid;
//cout<<mid_value<<endl;
}
printf("%.2f\n",mid_value);
}
int main()
{
int t;
cin>>t;
while(t--){
cin>>A.x>>A.y>>B.x>>B.y>>C.x>>C.y>>D.x>>D.y>>P>>Q>>R;
ASolve(A,B);
}
return 0;
}
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