Explanation Given: The following rule : ∼ ( ∀ x ∈ D ( ∀ y ∈ E ( P ( x , y ) ) ) ) ≡ ∃ x ∈ D ( ∃ y ∈ E ( ∼ P ( x , y ) ) ) Calculation: We have the rule as follows: ∼ ( ∀ x ∈ D ( ∀ y ∈ E ( P ( x , y ) ) ) ) ≡ ∃ x ∈ D ( ∃ y ∈ E ( ∼ P ( x , y ) ) ) . We have, the left-hand side statement as follows: ∼ ( ∀ x ∈ D ( ∀ y ∈ E ( P ( x , y ) ) ) ) To determine (b) Whether the following statement is true or false and provide counter example if the statement is false.

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ISBN: 9781337694193

Author: EPP, Susanna S.

Publisher: Cengage Learning,

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Chapter 3.3, Problem 24ES

To determine

(a)

Using the laws for negating universal and existential statements to derive the following rule.

To determine

(b)

Whether the following statement is true or false and provide counter example if the statement is false.

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Chapter 3.3, Problem 23ES

Chapter 3.3, Problem 25ES

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(a) Using the laws for negating universal and existential statements to derive the following rule.