` p to q` is logically equivalent to

STATEMENT-1 : (p rArr q) hArr (~q rArr~p) and STATEMENT-2 : p rArr q is logically equivalent to ~q rArr ~p

Using truth table show that - (p vv q) vv (~ p ^^ q ) is logically equivalent to ~ p.

The incorrect statement is (a) p vec -q is logically equivalent to ~ pvvqdot (b) If the truth-values of p ,q, r are T , F , T respectively, then the truth value of (pvvq)^^(qvvr) is Tdot (c) ~(pvvqvvr)-= ~p^^~ q^^ ~r (d) The truth value of p^^~(p^^q) is always Tdot

The proposition ~(p vv ~q) vv ~(p vv q) is logically equivalent to

The negation of the compound propositions p harr ~q is logically equivalent to

The incorrect statement is (A) p →q is logically equivalent to ~p ∨ q. (B) If the truth-values of p, q r are T, F, T respectively, then the truth value of (p ∨ q) ∧ (q ∨ r) is T. (C) ~(p ∨ q ∨ r) = ~p ∧ ~q ∧ ~r (D) The truth-value of p ~ (p ∧ q) is always T

The compound statement (phArr q)vv(p hArr ~q) is logically equivalent to

Using truth table, prove that : ~[(~p) wedge q] is logically equivalent to p vee (~q) .

(~pvv~q) is logically equivalent to

p ^^ ( q ^^ r) is logically equivalent to