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Contest: Task: Related: TaskB TaskD
Score : $300$ points
Problem Statement
You are given an undirected unweighted graph with $N$ vertices and $M$ edges that contains neither self-loops nor double edges.
Here, a self-loop is an edge where $a_i = b_i (1≤i≤M)$, and double edges are two edges where $(a_i,b_i)=(a_j,b_j)$ or $(a_i,b_i)=(b_j,a_j) (1≤i<j≤M)$.
How many different paths start from vertex $1$ and visit all the vertices exactly once?
Here, the endpoints of a path are considered visited.
For example, let us assume that the following undirected graph shown in Figure 1 is given.
Figure 1: an example of an undirected graph
The following path shown in Figure 2 satisfies the condition.
Figure 2: an example of a path that satisfies the condition
However, the following path shown in Figure 3 does not satisfy the condition, because it does not visit all the vertices.
Figure 3: an example of a path that does not satisfy the condition
Neither the following path shown in Figure 4, because it does not start from vertex $1$.
Figure 4: another example of a path that does not satisfy the condition
Constraints
- $2≦N≦8$
- $0≦M≦N(N-1)/2$
- $1≦a_i<b_i≦N$
- The given graph contains neither self-loops nor double edges.
Input
The input is given from Standard Input in the following format:
$N$ $M$ $a_1$ $b_1$ $a_2$ $b_2$ $:$ $a_M$ $b_M$
Output
Print the number of the different paths that start from vertex $1$ and visit all the vertices exactly once.
Sample Input 1
3 3 1 2 1 3 2 3
Sample Output 1
2
The given graph is shown in the following figure:
The following two paths satisfy the condition:
Sample Input 2
7 7 1 3 2 7 3 4 4 5 4 6 5 6 6 7
Sample Output 2
1
This test case is the same as the one described in the problem statement.