Step 1 :Evaluate the expression \((A \land B) \lor C\) for each combination of truth values for \(A\), \(B\), and \(C\).
Step 2 :For the first row, \(A = T\), \(B = T\), \(C = T\). Evaluate \((A \land B) \lor C\). Since \(A \land B\) is true and \(C\) is true, the expression evaluates to true. Therefore, the missing value is \(T\).
Step 3 :For the second row, \(A = T\), \(B = T\), \(C = F\). Evaluate \((A \land B) \lor C\). Since \(A \land B\) is true and \(C\) is false, the expression evaluates to true. Therefore, the missing value is \(T\).
Step 4 :For the third row, \(A = T\), \(B = F\), \(C = T\). Evaluate \((A \land B) \lor C\). The expression evaluates to false. Therefore, the missing value is \(F\).
Step 5 :For the fourth row, \(A = T\), \(B = F\), \(C = F\). Evaluate \((A \land B) \lor C\). The expression evaluates to false. Therefore, the missing value is \(F\).
Step 6 :For the fifth row, \(A = F\), \(B = T\), \(C = T\). Evaluate \((A \land B) \lor C\). The expression evaluates to true. Therefore, the missing value is \(T\).
Step 7 :For the sixth row, \(A = F\), \(B = T\), \(C = F\). Evaluate \((A \land B) \lor C\). The expression evaluates to false. Therefore, the missing value is \(F\).
Step 8 :For the seventh row, \(A = F\), \(B = F\), \(C = T\). Evaluate \((A \land B) \lor C\). The expression evaluates to true. Therefore, the missing value is \(T\).
Step 9 :For the eighth row, \(A = F\), \(B = F\), \(C = F\). Evaluate \((A \land B) \lor C\). The expression evaluates to false. Therefore, the missing value is \(F\).
Step 10 :Fill in the missing values in the table.