Let G be a digraph with n vertices and let A(G) be its
adjacency matrix. A monic polynomial f(x) of degree at most n is called an annihilating polynomial of G if f(A(G))=0. G is said to be annihilatingly unique if it possesses a unique
annihilating polynomial. Difans and diwheels are two classes of
annihilatingly unique digraphs. In this paper, it is shown that
the complete product of difan and diwheel is annihilatingly unique.