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Online MCQs about Sets and Functions Class 11 First Year Quiz with Answers. The multiple-choice questions are for chapter 2 (“Sets Functions and Groups”) of the First Year Mathematics book. Let us start with the Sets and Functions Class 11 Quiz.

Online MCQs about Sets Functions and Groups from First Year Mathematics Book.

1. If $p$ is a proposition $4<5$, $q$ is a proposition $2+5>8$ then truth value of $p \rightarrow q$ is

 F

 Neither T nor F

 T

 Either T or F

2. The words or symbols which convey the idea of quantity or numbers is called

 Truth table

 Negation

 Conditional

 Quantifier

3. The logical form of $(A \cap B)’=A’\cup B’$ is

 $\sim (p \wedge q) = \sim p \wedge \sim q$

 $\sim (p \wedge q) = \sim p \vee \sim q$

 $\sim (p \vee q) = \sim p \vee \sim q$

 $\sim (p \vee q) = \sim p \wedge \sim q$

4. If $p$ and $q$ are two propositions then truth set of $p\wedge q$ is

 $Q-P$

 $P \cap Q$

 $P \cup Q$

 $P-Q$

5. If $p$ and $q$ are two propositions then truth set of $p \vee q$ is

 $P \cup Q$

 $P \cap Q$

 $P-Q$

 $Q-P$

6. If $p$ and $q$ be two propositions then truth set of $p\rightarrow q$ is

 $P \cap Q’$

 $P’ \cup Q$

 $P’\cap Q$

 $P=Q$

7. If $p$ is a proposition $4<5$, $q$ is a proposition $2+5=8$ then truth value of $p \vee q$ is

 Either T or F

 T

 F

 Neither T nor F

8. If $\sim p \rightarrow q$ is a conditional then its central positive is

 $p \rightarrow \sim q$

 $\sim q \rightarrow p$

 $\sim q \rightarrow \sim p$

 $q\rightarrow \sim p$

9. Truth set of $p\leftrightarrow q$ is

 $P’\cup Q’$

 $P=Q$

 $P’\cap q’$

 $P \cup Q$

10. For the propositions $p$ and $q$, $(p \wedge q) \rightarrow p$ is

 Absurdity

 Tautology

 Contingency

 None of these

11. A compound proposition which is always wrong is called

 Tautology

 Absurdity

 Equivalence

 Contingency

12. The logical form of $(A \cup B)’ = A’ \cap B’$ is

 $\sim (p \wedge q) \sim p \vee \sim q$

 $\sim (p \vee q) \sim p \wedge \sim q$

 $\sim (p \vee q) \sim p \vee \sim q$

 $\sim (p \wedge q) \sim p \wedge \sim q$

13. If $p$ is a proposition $4<5$ is a proposition $2+5=8$ then truth value of $p \wedge q$ is

 T

 Neither T nor F

 Either T or F

 F

14. If $\sim p \rightarrow q$ is a conditional then its converse is

 $\sim q \rightarrow p$

 $\sim q \rightarrow \sim p$

 $p\rightarrow \sim q$

 $q \rightarrow \sim p$

15. If $p$ be proposition then $p \vee \sim p$ is

 Absurdity

 Tautology

 Contingency

 Equivalence

16. The symbol which is used to convey the idea of all objects under consideration is called

 None of these

 Universal set

 Existential Quantifier

 Universal quantifier

17. If $p$ be any proposition then $p\wedge \sim p$ is

 Absurdity

 Tautology

 Equivalence

 Contingency

18. If $p$ is a proposition $4<5$, $q$ is a proposition $2+5 \ne 8$ then truth value of $p\leftrightarrow q$ is

 Either T or F

 F

 Neither T nor F

 T

19. If $\sim p \rightarrow q$ is a conditional then its inverse is

 $q\rightarrow \sim p$

 $\sim q \rightarrow p$

 $p \rightarrow \sim q$

 $\sim q \rightarrow \sim p$

20. For the propositions $p$ and $q$, $p\rightarrow (p \vee q)$ is

 Tautology

 None of these

 Contingency

 Absurdity

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Sets and Functions Class 11 Mathematics Quiz

• A compound proposition which is always wrong is called
• If $p$ be proposition then $p \vee \sim p$ is
• If $p$ be any proposition then $p\wedge \sim p$ is
• If $\sim p \rightarrow q$ is a conditional then its converse is
• If $\sim p \rightarrow q$ is a conditional then its inverse is
• If $\sim p \rightarrow q$ is a conditional then its central positive is
• If $p$ is a proposition $4<5$ is a proposition $2+5=8$ then truth value of $p \wedge q$ is If $p$ is a proposition $4<5$, $q$ is a proposition $2+5=8$ then truth value of $p \vee q$ is If $p$ is a proposition $4<5$, $q$ is a proposition $2+5>8$ then truth value of $p \rightarrow q$ is
• If $p$ is a proposition $4<5$, $q$ is a proposition $2+5 \ne 8$ then truth value of $p\leftrightarrow q$ is
• For the propositions $p$ and $q$, $(p \wedge q) \rightarrow p$ is
• For the propositions $p$ and $q$, $p\rightarrow (p \vee q)$ is
• The words or symbols which convey the idea of quantity or numbers is called
• The symbol which is used to convey the idea of all objects under consideration is called
• The logical form of $(A \cap B)’=A’\cup B’$ is
• The logical form of $(A \cup B)’ = A’ \cap B’$ is
• If $p$ and $q$ are two propositions then truth set of $p \vee q$ is
• If $p$ and $q$ are two propositions then truth set of $p\wedge q$ is
• If $p$ and $q$ be two propositions then truth set of $p\rightarrow q$ is
• Truth set of $p\leftrightarrow q$ is

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