👉 The ending math revolves around the concept of the Riemann Hypothesis, a conjecture proposed by Bernhard Riemann in 1859. It deals with the distribution of prime numbers and their relationship to the zeros of the Riemann zeta function. The hypothesis posits that all non-trivial zeros of this function lie on the critical line where the real part equals 1/2. Despite extensive numerical evidence supporting the hypothesis, a formal proof or counterexample remains elusive. The resolution of this problem has profound implications for number theory, cryptography, and our understanding of the fundamental structure of integers. If proven true, it would provide deep insights into the distribution of primes, potentially revolutionizing fields reliant on prime number theory. Conversely, if disproven, it could lead to new mathematical discoveries and insights into the nature of prime numbers.
