• Problem 4: Let (M, d) be a metric space and let AC M be non-empty. Prove that the following are equivalent: (1) A is bounded. (2) There exists a D >0 so that, for every a, b e A, we have d(a, b) < D.

solve problem 4 with explanation asa and get multiple upvotes.

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• Problem 1. Let (V, (·|·)) be an inner product space. Show, for all v, w E V, that |(v|w)| < (v|v)!/2(w\w)'/2. (Hint: Let t e R be arbitrary and consider (v + tw|v+tw)). • Problem 2. Let a, b e R, with a < b. Consider the set B[a,b] of all bounded functions from the interval [a, b] into R. Show that B[a,b] is a vector space over R when endowed with pointwise addition and scalar multiplication. • Problem 3. Let a, b e R, with a < b. With B[a,b] as above, define ||f | := sup{|f(s)| : s € [a,b]} Show that || · |∞ is a norm on B[a,b]. (ƒ € B[a, b). • Problem 4: Let (M, d) be a metric space and let ACM be non-empty. Prove that the following are equivalent: (1) A is bounded. (2) There exists a D >0 so that, for every a,b ɛ A, we have d(a, b) < D.