Abstract
In this article we study the topological structure of an intuitionistic fuzzy n-normed linear space (IFnNLS). We establish necessary and sufficient conditions for a sequence of functions having values in an IFnNLS to be uniformly convergent. Further, using the vector topological structure of the space, derivative and Riemann integration of a function having values in an IFnNLS are defined and basic results related to these concepts are studied.