#include<bits/stdc++.h>
using namespace std;
const int M = 1e5+10 ;
const double pi = acos(-1.0) ;
int n ;
double sx , sy ;//源点
double X[M] , Y[M] ;
double minn = 1e18 , maxn = -1 ;
double dist (int id) { return sqrt((X[id]-sx)*(X[id]-sx)+(Y[id]-sy)*(Y[id]-sy));}
double segdist (int id1 , int id2) {//源点到多边形上两点id1,id2的最短距离
double a = Y[id2] - Y[id1] ;
double b = X[id1] - X[id2] ;
double c = X[id2]*Y[id1]-Y[id2]*X[id1] ;
if ((X[id1]-X[id2])*(sx-X[id2])+(Y[id1]-Y[id2])*(sy-Y[id2]) < 0) return 1e18 ;//如果垂足落在线段外,返回无穷
if ((X[id2]-X[id1])*(sx-X[id1])+(Y[id2]-Y[id1])*(sy-Y[id1]) < 0) return 1e18;//利用点积钝角<0
return fabs(c+sy*b+sx*a) / sqrt(a*a+b*b) ; //利用叉积和面积法
}
int main () {
cin >> n >> sx >> sy ;
for (int i = 0 ; i < n ; i ++) {
scanf ("%lf%lf" , &X[i],&Y[i]) ;
}
for (int i = 0 ; i < n ; i ++) {
maxn = max (maxn , dist(i)) ;
minn = min (minn , dist(i)) ;//垂足落在线段外时,源点到线段的最短距离
minn = min (minn , segdist(i,(i+1)%n)) ;
}
cout.precision(12) ;
cout << pi*(maxn*maxn-minn*minn) << endl ;
return 0 ;
}
