#include<iostream>

#include<cstdio>

#include<cstring>

#include<cmath>

using namespace std;

const double eps = 1e-;

const double inf = 1e9;

const int MAXN = ;

int m;//保存多边形的点数

double r;//保存内移距离

int cCnt, curCnt;//此时cCnt为最终切割得到的多边形的顶点数、暂存顶点个数

struct point

{

    double x, y;

};

point points[MAXN], p[MAXN], q[MAXN];//读入的多边形的顶点（顺时针）、p为存放最终切割得到的多边形顶点的数组、暂存核的顶点

void getline(point x, point y, double &a, double &b, double   &c) //两点x、y确定一条直线a、b、c为其系数

{

    a = y.y - x.y;

    b = x.x - y.x;

    c = y.x * x.y - x.x * y.y;

}

void initial()

{

    for (int i = ; i <= m; ++i)p[i] = points[i];

    p[m + ] = p[];

    p[] = p[m];

    cCnt = m;

}

point intersect(point x, point y, double a, double b, double c)        //定比分点法，求两条直线的交点

{

    double u = fabs(a * x.x + b * x.y + c);

    double v = fabs(a * y.x + b * y.y + c);

    point pt;

    pt.x = (x.x * v + y.x * u) / (u + v);

    pt.y = (x.y * v + y.y * u) / (u + v);

    return  pt;

}

void cut(double a, double b, double c)               //利用半平面交求出切割后多边形的所有顶点

{

    curCnt = ;

    for (int i = ; i <= cCnt; ++i)

    {

        if (a*p[i].x + b * p[i].y + c >= )q[++curCnt] = p[i];     // c因为精度问题，可能会偏小。所以有些点本应在右側而没在。

        else

        {

            if (a*p[i - ].x + b * p[i - ].y + c > )

            {

                q[++curCnt] = intersect(p[i], p[i - ], a, b, c);

            }

            if (a*p[i + ].x + b * p[i + ].y + c > )

            {

                q[++curCnt] = intersect(p[i], p[i + ], a, b, c);

            }

        }

    }

    for (int i = ; i <= curCnt; ++i)p[i] = q[i];

    p[curCnt + ] = q[];

    p[] = p[curCnt];

    cCnt = curCnt;

}

int dcmp(double x)    //控制精度

{

    if (fabs(x)<eps) return ;

    else return x< ? - : ;

}

void solve()

{

    initial();        //初始化存放多边形顶点的p数组

    for (int i = ; i <= m; ++i) {

        point ta, tb, tt;                   //得到平移后的直线

        tt.x = points[i + ].y - points[i].y;

        tt.y = points[i].x - points[i + ].x;

        double k = r / sqrt(tt.x * tt.x + tt.y * tt.y);

        tt.x = tt.x * k;

        tt.y = tt.y * k;

        ta.x = points[i].x + tt.x;

        ta.y = points[i].y + tt.y;

        tb.x = points[i + ].x + tt.x;

        tb.y = points[i + ].y + tt.y;

        double a, b, c;           //接下来用这些平移后的直线去切割原多边形

        getline(ta, tb, a, b, c);

        cut(a, b, c);

    }

}

void Reverse() { //规整化方向，逆时针变顺时针，顺时针变逆时针

    for (int i = ; i < (m + ) / ; i++)

        swap(points[i], points[m - i]);

}

int main()

{

    while (scanf("%d", &m) != EOF) {

        if (m == ) break;

        for (int i = ; i <= m; i++)

            scanf("%lf%lf", &points[i].x, &points[i].y);

        Reverse();          //由于点的顺序是逆时针输入，所以要将它改成顺时针

        points[m + ] = points[];

        double left = , right = inf, mid;

        while ((right - left) >= eps) {        //二分求半径,eps控制二分的精度

            mid = (left + right) / 2.0;

            r = mid;                           //r为内切圆半径

            solve();

            if (cCnt <= ) right = mid;     //如果将该多边形顶点向内平移r的距离后，半平面交所得多边形为空，则说明r过大，应当适当缩小

            else left = mid;

        }

        printf("%.6f\n", left);

    }

    return ;

}