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How to solve this geometry problem? Let ( P ) be a polyhedron. A polyhedron ( Q ) is called the dual of ( P ) if it satisfies the following conditions: (i) The number of faces of ( Q ) is equal to the number of vertices of ( P ). (ii) The number of vertices of ( Q ) is equal to the number of faces of ( P ). (iii) \( P \) and \( Q \) have the same number of edges. (a) Find the number of faces, vertices and edges of the dual of Snub Cube. [4 M] (b) Find the sum of interior angles of all faces of the dual of Snub Cube. [6 M]