i. Give brief reasons why, in any metric space, B(a; r) ≤ int B[a; r]. ii. Give an instance where B(a; r)# int B[a; r]. (b) Prove that every compact metric space is bounded. (c) Prove or disprove: If (X, dx) and (Y, dy) are connected metric spaces, and XX Y has a metric p that induces componentwise convergence, then (XxY,p) is connected.
