Mertens Conjecture is a hypothesis in number theory that proposes an upper bound on the product of the reciprocals of the prime numbers. Specifically, it suggests that the infinite product $$rac{1}{p}$$, where $$p$$ runs over all prime numbers, is bounded by a logarithmic function. This conjecture is significant because it relates to the distribution of prime numbers and has consequences tied to the Riemann Hypothesis.
congrats on reading the definition of Mertens Conjecture. now let's actually learn it.