Let
\begin{equation} n =x^{p-1}+x^{p-2}+\dotsb + x+1
\end{equation} where $x$ and $p$ are odd primes.

If $p$ is set to $5$, it appears $x=5$ is the only prime $x$ such that $n$ is composite and $x \mid \phi(n) $ (verified up to $x \le 2\cdot 10^6$). Setting $p$ to $7$, we get only two values of $x$; $x=7$ and $x = 281$.

If $x$ is allowed to take composite values, it appears there are infinitely many $x$ such that $x \mid \phi(n)$. Therefore, the following Conjecture is reasonable. 

**Conjecture 1**

Let
\begin{equation} n =x^{p-1}+x^{p-2}+\dotsb + x+1
\end{equation} where $x$ and $p$ are odd primes.
For a fixed odd prime $p$,  there are finitely many primes $x$ such that $x \mid \phi(n) $ with $n$ composite. 

If Conjecture 1 is true, then, for a fixed prime $p$, there exists an upper bound $x_\text{max}$ such that $x \nmid \phi(n) $  for all $x>x_\text{max} $ with $n$ composite. 

 If Conjecture 1 is true, Theorem 1 gives a fast primality test for integers $x^{p-1}+x^{p-2}+\dotsb + x+1$ with $x > x_\text{max}$. 

**Theorem 1**

Assuming Conjecture 1.  Let $n =x^{p-1}+x^{p-2}+\dotsb + x+1$ where $x$ and $p$ are odd primes with $x>x_\text{max}$. If there exists a positive integer $b$ such that $b^{n-1} \equiv 1 \pmod n$ and   $b^{(n-1)/x} \not\equiv 1 \pmod n$ then $n$ is prime.

Note: As $x$ is prime then $x \mid \phi(n) $ implies $n = (ux+1)(vx+1)$ for some non negative integers $u$, $v$ with $ux+1$ prime. It can also be shown that $n = (sp+1)(tp+1)$ for some non negative integers $s$, $t$ with $sp+1$ prime. And from this post https://mathoverflow.net/questions/404875/positive-divisors-of-px-n-1xx2-cdots-xn-that-are-congruent-to-1-mo, 
if $ux+1 \mid n$  then $ux+1 \mid \frac{ u^{p}+1} {u+1}$. Perhaps these observations might be useful in proving Conjecture 1 and establishing $x_\text{max}$.