complete the following truth table. use t for true and f for false. in this table, p and q are statements.

Question

Accepted Answer

# Answer:
| $p$ | $q$ | $\sim q$ | $q \lor p$ |
|-----|-----|----------|------------|
| T   | T   | F        | T          |
| T   | F   | T        | T          |
| F   | T   | F        | T          |
| F   | F   | T        | F          |
# Explanation:
## Step1: Define negation rule
$\sim q$ is opposite of $q$: if $q=T$, $\sim q=F$; if $q=F$, $\sim q=T$.
## Step2: Define disjunction rule
$q \lor p$ is T if at least one of $q,p$ is T; else F.
## Step3: Fill $\sim q$ column
For row1 ($q=T$): $\sim q=F$; row2 ($q=F$): $\sim q=T$; row3 ($q=T$): $\sim q=F$; row4 ($q=F$): $\sim q=T$.
## Step4: Fill $q \lor p$ column
Row1 ($q=T,p=T$): $T\lor T=T$; row2 ($q=F,p=T$): $F\lor T=T$; row3 ($q=T,p=F$): $T\lor F=T$; row4 ($q=F,p=F$): $F\lor F=F$.

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QUESTION IMAGE

Question

Explanation:

Step1: Define negation rule

Step2: Define disjunction rule

Step3: Fill $\sim q$ column

Step4: Fill $q \lor p$ column

Answer: