You are given an array $a$ of $n$ ($n \geq 2$) positive integers and an integer $p$. Consider an undirected weighted graph of $n$ vertices numbered from $1$ to $n$ for which the edges between the vertices $i$ and $j$ ($i<j$) are added in the following manner:

• If $gcd(a_i, a_{i+1}, a_{i+2}, \dots, a_{j}) = min(a_i, a_{i+1}, a_{i+2}, \dots, a_j)$, then there is an edge of weight $min(a_i, a_{i+1}, a_{i+2}, \dots, a_j)$ between $i$ and $j$.
• If $i+1=j$, then there is an edge of weight $p$ between $i$ and $j$.

Here $gcd(x, y, \ldots)$ denotes the greatest common divisor (GCD) of integers $x$, $y$, ....

Note that there could be multiple edges between $i$ and $j$ if both of the above conditions are true, and if both the conditions fail for $i$ and $j$, then there is no edge between these vertices.

The goal is to find the weight of the minimum spanning tree of this graph.