We investigate the multisigns of Hamiltonian circles in the multisigned complete graph \(Σ_n := (K_n, σ, \mathbb{F}_2^m)\). The \emph{multisign} of a circle \(C\) is defined as the sum \[ σ(C) := \sum_{e \in E(C)} σ(e). \] For a fixed \(m\) and sufficiently large \(n\), we show that the set of multisigns of Hamiltonian circles \[ \{σ(H) : H \text{ is a Hamiltonian circle of } Σ_n)\} \] forms either a subspace, an affine subspace, or the entire space \(\mathbb{F}_2^m\), except in certain exceptional cases.