Many works have investigated the problem of reparameterizing rational Bézier curves or surfaces via Möbius transformation to adjust their parametric distribution as well as weights, such that the maximal ratio of weights becomes smaller,that some algebraic and computational properties of the curves or surfaces can be improved in a way. In consequence it is an indication of veracity and optimization of the reparameterization do prior to judge whether the maximal ratio of weights reaches minimum, and verify the new weights after Möbius transformation. What’s more the users of computer aided design soft wares may require some guidelines for designing rational Bézier curves or surfaces with the smallest ratio of weights. In this paper we present the necessary and sufficient conditions that the maximal ratio of weights of the curves or surfaces reaches minimum and also describe it by using weights succinctly and straightway. The weights satisfied these conditions are called being in the stable state. Applying such conditions, any giving rational Bézier curve or surface can automatically be adjusted to come into the stable state by CAD system, that is, the curve or surface possesses its optimal parametric distribution. Finally, we give some numerical examples for demonstrating our results in important applications of judging the stable state of weights of the curves or surfaces and designing rational Bézier surfaces with compact derivative bounds.