Consider all non-empty subsets of the set {1,2⋯,n}. For every such subset, we find the product of the reciprocals of each of its elements. Denote the sum of all these products as Sn. For example,
S3=11+21+31+1⋅21+1⋅31+2⋅31+1⋅2⋅31
(i) Show that Sn=n1+(1+n1)Sn−1.(ii) Hence or otherwise, deduce that Sn=n.