In this paper, we study a family of fusion and modular systems realizing fusion categories Grothendieck equivalent to the representation category for so(2p + 1)2 . These categories describe non-abelian anyons dubbed ‘metaplectic anyons’. We obtain explicit expressions for all the F-and R-symbols. Based on these, we conjecture a classification for their monoidal equivalence classes from an analysis of their gauge invariants and define a function which gives us the number of classes.