Can every positive rational number be written as the finite sum of distinct reciprocal primes?

Question

Inspiration for this question: Can every number be represented as a sum of different reciprocal numbers?

My question: Can every positive rational number $\frac{m}{n}\in\mathbb{Q}$ be written as the finite sum of distinct (i.e. all different) reciprocal primes:

$$\frac{m}{n} = \sum_k \frac{1}{k},\quad k \text{ is a prime number } ?$$