In　this　paper,　we　consider　the　vanishing　viscosity　limit　for　the　incompressible　non-resistive　magneto-micropolar　equations　on　the　half-space　with　no-slip　boundary　condition　(3).　We　prove　that　the　vanishing　viscosity　limit　is　uniform　over　a　time　interval,　which　indicates　that　the　incompressible　non-resistive　magneto-micropolar　equations　with　the　no-slip　boundary　condition　have　a　strong　solution　and　the　solution　is　uniformly　bounded　in　both　the　conormal　Sobolev　norm　and　L-infinity　norm.　As　a　direct　result,　we　obtain　the　vanishing　viscosity　limit　for　the　incompressible　non-resistive　magneto-micropolar　equations　by　a　strong　compactness　argument.