Newman's conjecture is a proposed mathematical conjecture concerning the distribution of the digits in the decimal expansion of the reciprocals of certain integers. More specifically, it relates to the behavior of the leading digits of the decimal expansion of the fractions formed by taking the reciprocal of integers. The conjecture states that for a given positive integer \( n \), the reciprocal \( \frac{1}{n} \) has a certain predictable pattern in the distribution of its leading digits.
Articles by others on the same topic
There are currently no matching articles.