Negation of the statement : - $\sqrt{5}$ is an integer or $5$ is irrational is
$\sqrt{5}$ is an integer or $5$ is irrational is
$\sqrt{5}$ is not an integer and $5$ is not irrational
$\sqrt{5}$ is an integer and $5$ is irrational
$\sqrt{5}$ is not an integer or $5$ is not irrational
Negation of the Boolean statement $( p \vee q ) \Rightarrow((\sim r ) \vee p )$ is equivalent to
The statement $(p \Rightarrow q) \vee(p \Rightarrow r)$ is NOT equivalent to.
The proposition $\left( { \sim p} \right) \vee \left( {p\, \wedge \sim q} \right)$
The false statement in the following is
$(p\; \wedge \sim q) \wedge (\sim p \vee q)$ is