I have another question, On the prime divisor of $n=(p^{2}-1)/2$, where $p$ is prime, please tell me your idea. Let $p\neq 3$ be Merssen prime. Is it true $n$ has a prime divisor $r$ such that $r^{2}$ does not divide $n$?

Let $p\neq 3$ be a Mersenne prime. Is it true that $(p^2-1)/2$ has a prime divisor $r$ such that $r^{2}$ does not divide $n$?

Ahmad gave a question on the maximal prime divisor of $n=(p^{2}-1)/2$, where $p$ is prime. I have another question, please tell me your idea. Let $p\neq 3$ be Merssen prime. Is it true $n$ has a prime divisor $r$ such that $r^{2}$ does not divide $n$?

I have another question, On the prime divisor of $n=(p^{2}-1)/2$, where $p$ is prime, please tell me your idea. Let $p\neq 3$ be Merssen prime. Is it true $n$ has a prime divisor $r$ such that $r^{2}$ does not divide $n$?

Ahmad gave a question on the maximal prime divisor of $n=(p^{2}-1)/2$, where $p$ is prime. I have another question, please tell me your idea. Let $p$ be Merssen prime. Is it true $n$ has a prime divisor $r$ such that $r^{2}$ does not divide $n$?

Ahmad gave a question on the maximal prime divisor of $n=(p^{2}-1)/2$, where $p$ is prime. I have another question, please tell me your idea. Let $p\neq 3$ be Merssen prime. Is it true $n$ has a prime divisor $r$ such that $r^{2}$ does not divide $n$?