To prove: That ∩ α ∈ Δ A α is compact when { A α : α ∈ Δ } is non-empty collection of compact sets.

Question

Prove if {Galpha}alpha e A is a collection of closed sets in a metric space, then (Intersectionsymbol)alpha e A is a closed set in X

Answer 1

Question

Chapter 7.2, Problem 21E

(a)

To determine

To prove: That ∩α∈ΔAα is compact when {Aα:α∈Δ} is non-empty collection of compact sets.

(b)

To determine

To Find: The example of a collection {Aα:α∈Δ} of compact sets such that ∪α∈ΔAα is not compact.

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Answer 2

Question

Chapter 7.2, Problem 21E

(a)

To determine

To prove: That ∩α∈ΔAα is compact when {Aα:α∈Δ} is non-empty collection of compact sets.

(b)

To determine

To Find: The example of a collection {Aα:α∈Δ} of compact sets such that ∪α∈ΔAα is not compact.

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Answer 3

Question

Chapter 7.2, Problem 21E

(a)

To determine

To prove: That ∩α∈ΔAα is compact when {Aα:α∈Δ} is non-empty collection of compact sets.

(b)

To determine

To Find: The example of a collection {Aα:α∈Δ} of compact sets such that ∪α∈ΔAα is not compact.

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Answer 4

Question

Chapter 7.2, Problem 21E

(a)

To determine

To prove: That ∩α∈ΔAα is compact when {Aα:α∈Δ} is non-empty collection of compact sets.

(b)

To determine

To Find: The example of a collection {Aα:α∈Δ} of compact sets such that ∪α∈ΔAα is not compact.

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Answer 5

Chapter 7.2, Problem 21E

(a)

To determine

To prove: That ∩α∈ΔAα is compact when {Aα:α∈Δ} is non-empty collection of compact sets.

(b)

To determine

To Find: The example of a collection {Aα:α∈Δ} of compact sets such that ∪α∈ΔAα is not compact.

Answer 6

Chapter 7.2, Problem 21E

(a)

To determine

To prove: That ∩α∈ΔAα is compact when {Aα:α∈Δ} is non-empty collection of compact sets.

Answer 7

Chapter 7.2, Problem 21E

(a)

To determine

To prove: That ∩α∈ΔAα is compact when {Aα:α∈Δ} is non-empty collection of compact sets.

Answer 8

(b)

To determine

To Find: The example of a collection {Aα:α∈Δ} of compact sets such that ∪α∈ΔAα is not compact.

Answer 9

(b)

To determine

To Find: The example of a collection {Aα:α∈Δ} of compact sets such that ∪α∈ΔAα is not compact.

Answer 10

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Answer 11

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Answer 21

Ch. 7.1 - Prob. 1E Ch. 7.1 - Prob. 2E Ch. 7.1 - Prob. 3E Ch. 7.1 - Prob. 4E Ch. 7.1 - Prob. 5E Ch. 7.1 - Prob. 6E Ch. 7.1 - Prob. 7E Ch. 7.1 - Prob. 8E Ch. 7.1 - Prob. 9E Ch. 7.1 - Prob. 10E

To prove: That ∩ α ∈ Δ A α is compact when { A α : α ∈ Δ } is non-empty collection of compact sets.

Solution Summary: The author proves that displaystyle 'underset' alpha is compact when it is non-empty collection of compact sets.

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To prove: That ∩α∈ΔAα is compact when {Aα:α∈Δ} is non-empty collection of compact sets.

To Find: The example of a collection {Aα:α∈Δ} of compact sets such that ∪α∈ΔAα is not compact.

Chapter 7 Solutions