Problem

(a) Let S be the set of all real numbers in the interval (0, 1) whose decimal expansions c...

(a) Let S be the set of all real numbers in the interval (0, 1) whose decimal expansions contain only 0's, 2's, and 7's, Prove that S is uncountable.
(b) Let S' be the elements of S [defined in (a)] whose decimal expansions contain only finitely many 2's and 7's. What is the cardinality of S'?

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Solutions For Problems in Chapter 3.3

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