The Lorenz-Mie formulation of electromagnetic scattering by a homogeneous, isotropic, dielectricmagnetic sphere was extended to incorporate topologically insulating surface states characterized by a surface admittance γ. Closed-form expressions were derived for the expansion coefficients of the scattered field phasors in terms of those of the incident field phasors. These expansion coefficients were used to obtain analytical expressions for the total scattering, extinction, forward scattering, and backscattering efficiencies of the sphere. Resonances exist for relatively low values of γ, when the sphere is either nondissipative or weakly dissipative. For large values of γ, the scattering characteristics are close to that of a perfect electrically conducting sphere, regardless of whether the sphere is composed of a dissipative or nondissipative material, and regardless of whether that material supports planewave propagation with positive or negative phase velocity.