In　this　paper,　we　study　the　quasi-neutral　limit　for　the　compressible　two-fluid　Euler-Maxwell　equations　for　well-prepared　initial　data.　Precisely,　we　proved　the　solution　of　the　three-dimensional　compressible　two-fluid　Euler-Maxwell　equations　converges　locally　in　time　to　that　of　the　compressible　Euler　equation　as　E　tends　to　zero.　This　proof　is　based　on　the　formal　asymptotic　expansions,　the　iteration　techniques,　the　vector　analysis　formulas　and　the　Sobolev　energy　estimates.