Score : $600$ points
You are given a simple undirected graph $G$ with $N$ vertices.
$G$ is given as the $N \times N$ adjacency matrix $A$. That is, there is an edge between Vertices $i$ and $j$ if $A_{i,j}$ is $1$, and there is not if $A_{i,j}$ is $0$.
Find the number of triples of integers $(i,j,k)$ satisfying $1 \le i < j < k \le N$ such that there is an edge between Vertices $i$ and $j$, an edge between Vertices $j$ and $k$, and an edge between Vertices $i$ and $k$.
Input is given from Standard Input in the following format:
$N$ $A_{1,1}A_{1,2}\dots A_{1,N}$ $A_{2,1}A_{2,2}\dots A_{2,N}$ $\vdots$ $A_{N,1}A_{N,2}\dots A_{N,N}$
Print the answer.
4 0011 0011 1101 1110
2
$(i,j,k)=(1,3,4),(2,3,4)$ satisfy the condition.
$(i,j,k)=(1,2,3)$ does not satisfy the condition, because there is no edge between Vertices $1$ and $2$.
Thus, the answer is $2$.
10 0000000000 0000000000 0000000000 0000000000 0000000000 0000000000 0000000000 0000000000 0000000000 0000000000
0