a. Show that B is a basis for a topology of R2. Is this topology equivalent to the usual one of R² ?. b. Does this topology satisfy Frechet's property? does it satisfy the Hausdorff property? Why? c. Are the usual open balls of R² open sets in this new topology? d. Under the topology generated by B What is the lock, the interior and the boundary of the set {(x,y) ER ja ≤x

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SOLVE STEP BY STEP IN DIGITAL FORMAT 2. Consider the set of vertical segments of R², that is B = {(x, y) = R² a<y <b } | a, b, XE R,a <b }. a. Show that B is a basis for a topology of R2. Is this topology equivalent to the usual one of R² ?. b. Does this topology satisfy Frechet's property? does it satisfy the Hausdorff property? Why? c. Are the usual open balls of R² open sets in this new topology? d. Under the topology generated by B What is the lock, the interior and the boundary of the set {(x,y) ER la ≤x <b,a <y <b} ?