Revision 5054b224-76c6-4605-9895-b21701ddd3a4

Given a integer $n$, we assume we know all prime numbers between $n$ and $2n$. If we take randomly a prime number $p$,  what is the probability that there exists a number $k$ st $k<\log(p)$ and $2kp+1$ a prime number? Same question for $ k<\log^2(p)$.

Thanks