Problem E: Valentine's Day

Problem E: Valentine's Day

Time Limit: 1 Sec  Memory Limit: 128 MB
Submit: 3646  Solved: 692
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Description

Today is Valentine’s day, and Pisces is going to date with the beautiful princess in the neighboring kingdom. There are \(n\) cities numbered from \(1\) to \(n\) on the mainland, with Pisces in city \(1\) and the princess in city \(n\). There are \(m\) unidirectional roads among these \(n\) cities. Usually, it takes Pisces \(1\) unit of time to travel from one city to another, but due to the probable existence of thorns, rivers or even robbers, some of the roads will take \(2\) units of time to travel. In other words, the cost of traveling from one city to another is either \(1\) unit or \(2\) units of time. Pisces wants to know the minimum time that he can meet the princess.

Input

The first line contains \(2\) integers \(n\) \((2\le n\le 2*10^5)\) and \(m\) \((1\le m\le4*10^5)\).

In each of the next \(m\) lines, there are \(3\) integers \(u\), \(v\) \((1\le u,v\le n)\) and \(w\) \((1\le w\le 2)\), which means there is a road from \(u\) to \(v\), and it takes \(w\) unit(s) of time for Pisces to go through.

Output

Print the minimum time in one line. Or, if he cannot reach the destination, print "-1" (without quotes).

Sample Input

4 5
1 2 1
2 4 1
2 3 2
3 4 1
1 3 1

Sample Output

2

HINT

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