We propose a new 3d \( \mathcal{N}=2 \) Seiberg-like duality of adjoint SQCD (Kim-Park duality) with linear monopole superpotential terms which encompasses known monopole deformed Kim-Park dualities. Equipped with this, we classify all the monopole deformed Kim-Park dualities up to quadratic powers of monopole deformations, and find all are equivalent either to the original Kim-Park, or to the proposed duality. With the recently developed deconfined perspective, this means all the working monopole deformed Kim-Park dualities up to quadratic terms are assembled by the Aharony and Benini-Benvenuti-Pasquetti dualities.