The negation of $\sim s \vee (\sim r \wedge s)$ is equivalent to
- A$s \wedge r$
- B$\sim r \wedge s$
- C$s \wedge (r \wedge \sim s)$
- D$s \wedge (r \vee \sim s)$
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Similar Questions
Rewrite the following statement in the form "$p$ if and only if $q$":
$p:$ If you watch television,then your mind is free and if your mind is free,then you watch television.
$p:$ If you watch television,then your mind is free and if your mind is free,then you watch television.
Easy
View SolutionNegation of $p \wedge (\sim q \vee \sim r)$ is -
The negation of the statement pattern $\sim s \vee (\sim r \wedge s)$ is equivalent to
The negation of the statement: "Getting above $95 \%$ marks is a necessary condition for Hema to get admission in a good college."
If $Statement-I$: If the work is not finished on time,the contractor is in trouble. $Statement-II$: Either the work is finished on time or the contractor is in trouble. Then:
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