#include<cmath>

#include<cstdio>

#include<cstring>

#include<algorithm>

#define N 100003

using namespace std;

struct Point {

	double x, y;

	Point(double _x = 0, double _y = 0) : x(_x), y(_y) {}

};

inline int dcmp(double a) {

	return (fabs(a) < 1e-6) ? 0 : (a < 0 ? -1 : 1);

}

Point operator - (Point a, Point b) {

	return Point(a.x - b.x, a.y - b.y);

}

bool operator == (Point a, Point b) {

	return dcmp(a.x - b.x) == 0 && dcmp(a.y - b.y) == 0;

}

inline double Cross(Point a, Point b) {

	return a.x * b.y - a.y * b.x;

}

inline double Dot(Point a, Point b) {

	return a.x * b.x + a.y * b.y;

}

inline bool jiao(Point d1, Point d2, Point d3, Point d4) {

	return (dcmp(Cross(d4 - d3, d1 - d3)) ^ dcmp(Cross(d4 - d3, d2 - d3))) == -2 &&

			(dcmp(Cross(d2 - d1, d3 - d1)) ^ dcmp(Cross(d2 - d1, d4 - d1))) == -2;

}

inline int bjiao(Point d1, Point d2, Point d3) {

	if (d1 == d2 || d1 == d3)

		return 1;

	if (dcmp(Cross(d2 - d1, d3 - d1)) == 0 && dcmp(Dot(d2 - d1, d3 - d1)) == -1)

		return 1;

	return 0;

}

inline double dis(Point d1, Point d2) {

	return sqrt((d2.y - d1.y) * (d2.y - d1.y) + (d2.x - d1.x) * (d2.x - d1.x));

}

struct nodeline {

	Point a, b;

	nodeline(Point _a = (0, 0) , Point _b = (0, 0)) : a(_a), b(_b) {}

} line[N];

struct node {

	int nxt, to;

	double w;

} E[N << 1];

Point a[N];

int n, cnt, lcnt, point[N], dd, q[N];

double nowx, nowy, nowy2, dist[N];

bool vis[N];

inline void ins(int x, int y, double z) {++dd; E[dd].nxt = point[x]; E[dd].to = y; E[dd].w = z; point[x] = dd;}

inline double spfa(int S, int T) {

	memset(dist, 127, sizeof(dist));

	memset(vis, 0, sizeof(vis));

	int head = 0, tail = 1;

	q[1] = S;

	vis[S] = 1;

	dist[S] = 0;

	while (head != tail) {

		++head; if (head >= N) head %= N;

		int u = q[head];

		vis[u] = 0;

		for(int tmp = point[u]; tmp; tmp = E[tmp].nxt) {

			int v = E[tmp].to;

			if (dist[u] + E[tmp].w < dist[v]) {

				dist[v] = dist[u] + E[tmp].w;

				if (!vis[v]) {

					++tail; if (tail >= N) tail %= N;

					q[tail] = v;

					vis[v] = 1;

				}

			}

		}

	}

	return dist[T];

}

inline bool check(Point d1, Point d2) {

	for(int i = 1; i <= lcnt; ++i)

		if (jiao(d1, d2, line[i].a, line[i].b))

			return 0;

	return 1;

}

int main() {

	scanf("%d", &n);

	while (n != -1) {

		cnt = 2;

		lcnt = 0;

		a[1].x = 0;

		a[1].y = 5;

		a[2].x = 10;

		a[2].y = 5;

		for(int i = 1; i <= n; ++i) {

			scanf("%lf", &nowx);

			scanf("%lf", &nowy);

			a[++cnt] = Point(nowx, nowy);

			line[++lcnt] = nodeline(Point(nowx, 0), a[cnt]);

			scanf("%lf", &nowy);

			a[++cnt] = Point(nowx, nowy);

			scanf("%lf", &nowy2);

			a[++cnt] = Point(nowx, nowy2);

			line[++lcnt] = nodeline(a[cnt - 1], a[cnt]);

			scanf("%lf", &nowy);

			a[++cnt] = Point(nowx, nowy);

			line[++lcnt] = nodeline(a[cnt], Point(nowx, 10));

		}

		memset(point, 0 , sizeof(point));

		dd = 0;

		for(int i = 1; i <= cnt; ++i)

			for(int j = i + 1; j <= cnt; ++j)

				if (check(a[i], a[j]))

					ins(i, j, dis(a[i], a[j]));

		for(int i = 1; i <= cnt; ++i)

			if (i != 2 && check(a[i], a[2]))

				ins(i, 2, dis(a[i], a[2]));

		printf("%.2lf\n", spfa(1,2));

		scanf("%d", &n);

	}

	return 0;

}