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
The negation of the Boolean expression $((\sim q) \wedge p) \Rightarrow((\sim p) \vee q)$ is logically equivalent to
$\sim p \wedge q$ is logically equivalent to
$\sim (p \vee q) \vee (~ p \wedge q)$ is logically equivalent to
Statement $-1$ : $ \sim \left( {p \leftrightarrow \, \sim q} \right)$ is equivalent to $p \leftrightarrow q$
Statement $-2$ : $ \sim \left( {p \leftrightarrow \, \sim q} \right)$ is a tautology.
The negation of the statement
"If I become a teacher, then I will open a school", is