Definition:Mirror Property of Primes

Definition
Let $p_n$ denote the $n$th prime number.

Let $\map {\operatorname {rev} } {p_n}$ denote the reversal of $p_n$.

$p_n$ satisfies the mirror property :
 * $(1): \quad \map {\operatorname {rev} } {p_n}$ is also a prime number


 * $(2): \quad$ the product of the digits of the base $10$ representation of $\map {\operatorname {rev} } {p_n}$ equals $\map {\operatorname {rev} } n$.

Also see

 * Definition:Product Property of Primes