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Beginning Activity Beginning Activity 1: Using a Logical Equivalency

1.

Complete a truth table to show that \(\left( {P \vee Q} \right) \to R\) is logically equivalent to \(\left( {P \to R} \right) \wedge \left( {Q \to R} \right)\text{.}\)

2.

Suppose that you are trying to prove a statement that is written in the form \(\left( {P \vee Q} \right) \to R\text{.}\) Explain why you can complete this proof by writing separate and independent proofs of \(P \to R\) and \(Q \to R\text{.}\)

3.

Now consider the following proposition:

Proposition.

For all integers \(x\) and \(y\text{,}\) if \(xy\) is odd, then \(x\) is odd and \(y\) is odd.

Write the contrapositive of this proposition.

4.

Now prove that if \(x\) is an even integer, then \(xy\) is an even integer. Also, prove that if \(y\) is an even integer, then \(xy\) is an even integer.