The binary operation □ is defined as follows
P | Q | P□Q |
---|---|---|
T | T | T |
T | F | T |
F | T | F |
F | F | T |
(A) $\neg Q□¬P$
(B) $P□¬Q$
(C) $¬P□Q$
(D) $¬P□¬Q$
If we compare column of $P□Q$ in table with $P ∨ Q$, we need both F in $3^{rd}$ row of table, and for that we need $¬Q$ instead of $Q$. So $P ∨ Q$ is equivalent to $P□¬Q$, and therefore, option (B) is correct.
The binary operation □ is defined as follows
P | Q | P□Q |
---|---|---|
T | T | T |
T | F | T |
F | T | F |
F | F | T |
(A) $\neg Q□¬P$
(B) $P□¬Q$
(C) $¬P□Q$
(D) $¬P□¬Q$
If we compare column of $P□Q$ in table with $P ∨ Q$, we need both F in $3^{rd}$ row of table, and for that we need $¬Q$ instead of $Q$. So $P ∨ Q$ is equivalent to $P□¬Q$, and therefore, option (B) is correct.