Competitions

# July 9 - ADA Training

# Graph 1, 1/2, 1/3, 1/4

Given connected, directed graph with edge weights **1**, **1/2**, **1/3**, **1/4**. Find the shortest path from vertex **1** to all others.

#### Input

The first line contains two integers **n** and **m** (**1** ≤ **n** ≤ `10`

, ^{6}**1** ≤ **m** ≤ **8** *`10`

) - the number of vertices and edges in a graph. The edges are given on separate lines. The edges are given with three integers: ^{5}**u**, **v** и **w** (**1** ≤ **u**, **v** ≤ **n**, **u** ≤ **v**, **1** ≤ **w** ≤ **4**), meaning the directed edge from **u** to **v** with weight **1/w**.

#### Output

For each vertex from **2** to **n** print one number - the length of the shortest path from vertex **1** to it with no less than **8** digits after the decimal point.

Input example #1

4 4 1 2 1 2 3 2 3 4 4 4 1 3

Output example #1

1.00000000 0.58333333 0.33333333