Abstract
In this article, we survey a geometric property, called Bade-property, originally introduced by William Bade. First, we review Bade's work in normed linear spaces. Next, we illustrate various interesting results of Bade-property in the spaces of convergent sequences established by Aizpuru. Then, we investigate Bade-property in comparison with some other geometric properties, such as lambda-property due to Aron and Lohman, Russo-Dye Theorem and extremally richness in C*-algebras, JB*-algebrs/triples and JBW*-triples.