bnuoj 1053 EASY Problem (计算几何)

http://www.bnuoj.com/bnuoj/problem_show.php?pid=1053
【题意】：基本上就是求直线与圆的交点坐标
【题解】：这种题我都比较喜欢用二分，三分做，果然可以完爆，哈哈，特有成就感的说。。。
【code】：
 #include <iostream>

 #include <stdio.h>

 #include <math.h>

 #include <algorithm>

 using namespace std;

 #define eps 1e-12

 struct Point

 {

     double x,y;

     Point(){}

     Point(double dx,double dy)

     {

         x = dx;

         y = dy;

     }

 };

 double distance(double x1,double y1,double x2,double y2) //求距离

 {

     return sqrt((x1-x2)*(x1-x2)+(y1-y2)*(y1-y2));

 }

 double distance2(double x1,double y1,double x2,double y2) //求距离的平方

 {

     return ((x1-x2)*(x1-x2)+(y1-y2)*(y1-y2));

 }

 double area2(double x1, double y1, double x2, double y2, double x3,double y3)  //两倍三角形面积

 {

     double area;

     area = fabs(x1*y2+x2*y3+x3*y1-x3*y2-x1*y3-x2*y1);

     return area;

 }

 int isEqual(double a,double b)  //判断两浮点数是否相等

 {

     if(fabs(a-b)>1e-)  return ;

     return ;

 }

 Point bs(double x1,double y1,double x2,double y2,double x3,double y3,double R)  //二分查找交点

 {

     double l=,r=,mid,x,y;

     while(l<=r)

     {

         mid = (l+r)/;

         x = x1 + mid*(x2-x1);

         y = y1 + mid*(y2-y1);

         double temp =distance(x,y,x3,y3);

         if(temp<R) //与半径的距离为二分点

         {

             l=mid+eps;

         }

         else

         {

             r=mid-eps;

         }

     }

     return Point(x,y);

 }

 int main()

 {

     double Cx,Cy,R;

     double Px,Py;

     double Qx,Qy;

     scanf("%lf%lf%lf",&Cx,&Cy,&R);

     scanf("%lf%lf",&Px,&Py);

     scanf("%lf%lf",&Qx,&Qy);

     double area = area2(Px,Py,Qx,Qy,Cx,Cy);

     double disPQ = distance(Px,Py,Qx,Qy);

     double dis = area/disPQ;  //用面积除以底求得三角形的高，即点到直线的距离

     if(dis>R||isEqual(dis,R))

     {

         puts("-1");

         return ;

     }

     double x1,y1;

     x1 = Px-Qx;

     y1 = Py-Qy;

     double x=,y=,k=,lx,rx,ry,ly;

     if(isEqual(Px,Qx))  //如果px==qx，不存在斜率

     {

         x = Px;

         y = (Cx-x)*x1/y1+Cy;

         lx = x;

         ly = Cy-R;

         rx = x;

         ry = Cy+R;

     }

     else if(isEqual(Py,Qy))  //存在斜率为1

     {

         y = Py;

         x = (Cy-y)*y1/x1+Cx;

         ly = Py;

         lx = Px-R;

         ry = Py;

         rx = Px+R;

     }

     else //斜率在0-1之间

     {

         y = (Cy*y1/x1+Cx-Px+Py*(Qx-Px)/(Qy-Py))/(y1/x1+(Qx-Px)/(Qy-Py));

         x = (Cy-y)*y1/x1+Cx;

         lx = Cx - R;

         ly = (Qy-Py)/(Qx-Px)*(lx-Px)+Py;

         rx = Cx + R;

         ry = (Qy-Py)/(Qx-Px)*(rx-Px)+Py;

     }

     Point p1 = bs(x,y,lx,ly,Cx,Cy,R);

     Point p2 = bs(x,y,rx,ry,Cx,Cy,R);

     double ans = distance2(p1.x,p1.y,Px,Py)+distance2(p2.x,p2.y,Px,Py);

     printf("%.3lf\n",ans);

     return ;

 }