The angular resolution of a planar straight-line drawing of a graph is the smallest angle formed by two edges incident to the same vertex. Garg and Tamassia (ESA '94) constructed a family of planar graphs with maximum degree d that have angular resolution O((logd)21/d23) in any planar straight-line drawing. This upper bound has been the best known upper bound on angular resolution for a long time. In this paper, we improve this upper bound. For an arbitrarily small positive constant ε, we construct a family of planar graphs with maximum degree d that have angular resolution O((logd)ε/d23) in any planar straight-line drawing.