The Ragsdale conjecture is a statement in the field of mathematics, specifically in real algebraic geometry and combinatorial geometry. Proposed by R. H. Ragsdale in 1916, the conjecture pertains to the maximum number of regions into which a certain type of hyperplane arrangement can divide Euclidean space. More specifically, the conjecture deals with the number of regions formed in three-dimensional space by the intersections of a set of hyperplanes.
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