QUESTION IMAGE
Question
complete a truth table to determine whether the negation of p→q is p∧~q
complete the truth table.
truth table with columns: p, q, ~q, p∧~q, p→q, ~(p→q); rows with t/f entries and blank cells to fill
Step1: Analyze $
eg q$ (row 3)
For $q = T$ (row 2), $
eg q = F$; for $q = F$ (row 3), $
eg q = T$; for $q = T$ (row 4), $
eg q = F$; for $q = F$ (row 5), $
eg q = T$. Wait, original table rows: row1: $p=T,q=T$; row2: $p=T,q=F$; row3: $p=F,q=T$; row4: $p=F,q=F$. So:
- Row3 ($p=F,q=T$): $
eg q = F$
- Row4 ($p=F,q=F$): $
eg q = T$
Step2: Analyze $p\land
eg q$ (row 4)
- Row3 ($p=F,
eg q=F$): $F\land F = F$
- Row4 ($p=F,
eg q=T$): $F\land T = F$
Step3: Analyze $p
ightarrow q$ (row 5)
- Row3 ($p=F,q=T$): $F
ightarrow T = T$
- Row4 ($p=F,q=F$): $F
ightarrow F = T$
Step4: Analyze $
eg(p
ightarrow q)$ (row 6)
- Row3 ($p
ightarrow q=T$): $
eg T = F$
- Row4 ($p
ightarrow q=T$): $
eg T = F$
Filling the table (rows 3 - 6, columns 3 - 4):
| $p$ | $q$ | $ |
eg q$ | $p\land
eg q$ | $p
ightarrow q$ | $
eg(p
ightarrow q)$ |
| $T$ | $T$ | $F$ | $F$ | $T$ | $F$ |
| $T$ | $F$ | $T$ | $T$ | $F$ | $T$ |
| $F$ | $T$ | $F$ | $F$ | $T$ | $F$ |
| $F$ | $F$ | $T$ | $F$ | $T$ | $F$ |
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Filled truth table as above (missing cells: $
eg q$: F, F; $p\land
eg q$: F, F; $p
ightarrow q$: T, T; $
eg(p
ightarrow q)$: F, F for rows 3 - 4).