Match the truth tables to its corresponding propositional logicAnswer 1 Question 13Answer 2 Question 13Answer 3 Question 13

It appears that your question is related to matching truth tables with their corresponding propositional logic expressions. However, because there are no specific truth tables or propositional logic expressions provided in your question, I'll provide a general guide on how to approach this problem.

Step 1: Understand the Truth Tables

1. Identify the Variables: See how many variables are involved (e.g., $p, q, r$).
2. Check Output: Look at the output columns of the truth table for given combinations of the variables (true or false).

Step 2: Analyze Propositional Logic Expressions

1. Expression Review: Examine each propositional logic expression (e.g., $p \land q, p \lor q, p \implies q, \neg p$).
2. Construct Truth Tables: If you haven't already, construct truth tables for these expressions using the same variables.

Step 3: Match Tables to Expressions

1. Compare Rows: For each row of the truth tables, compare their outputs with those from the expressions’ truth tables.
2. Find Correspondence: Identify which truth table matches which expression based on the outputs.

Step 4: Verification

1. Double-Check: Ensure that each truth table only corresponds with one unique logical expression.
2. Summarize: Note down the matches clearly.

Final Answer

Without the specific truth tables or expressions, I am unable to provide exact matches. If you provide them, I can assist further in determining the correct pairs.