# Important Sets Functions and Groups Quiz 2

The multiple choice question about the Sets Functions and Groups Quiz from Intermediate Part-I (Chapter 2 Sets Functions and Groups Quiz). This is a Test from Chapter 2 of Intermediate Mathematics. Let us start with the Sets Functions and Groups Quiz.

Online MCQs about Intermediate mathematics Part – I from Sets Functions and Groups with Questions

1. If $B\subseteq A$ then $n(A\cup B)$ is equal to

2. If a set consists of those elements of $A$ which are not in$B$, then the set is

3. If $B \subseteq A$, $A-B\ne \phi$, then $n(A-B)$

4. If $A\cap b=\phi$ then $n(A \cap B)$ is equal to

5. Which of the following is true

6. If $A$ and $B$ are disjoint sets i.e. $A\cap B=\phi$ then $n(B-A)$

7. If $A \subseteq B$ then $n(A\cap B)$ is equal to

8. If $A \cap B \ne \phi$ then $A$ and $B$ are

9. If $A\cap B\ne \phi$ i.e. sets $A$ and $B$ are overlapping, then $n(A\cup B)$ is equal to

10. If $A \cap B=\phi$ i.e. $A$ and $B$ are overlapping sets, then $n(A\cap B)$

11. The set builder from of $B-A$ is equal to

12. Let $A$ and$B$ are two non empty sets and $U$ be a universal set, then $A-B$

13. If $A \subseteq B$ then $n(A\cup B)$ is equal to

14. In set-builder form $A^c$ is written as

15. If $A$ and $B$ are disjoint sets i.e. $A\cap B=\phi$, then $n(A\,\, B)$ is equal to

16. If $B \subseteq A$ then $n(A \cap B)$ is equal to

17. If $A \subseteq B$ then $n(A-B)$ is equal to

18. If $A\cap B = \phi$ then $A$ and $B$ are

19. If $A\cap B=\ne \phi$, i.e. sets $A$ and $B$ are disjoint, then $n(A\cup B)$ is equal to

20. If $B\subseteq A$ then $n(B-A)$ is equal to

Question 1 of 20

### Sets Functions and Groups Quiz Part – I Intermediate

• The set builder from of $B-A$ is equal to
• If $A\cap B = \phi$ then $A$ and $B$ are
• If $A \cap B \ne \phi$ then $A$ and $B$ are
• In set-builder form, $A^c$ is written as
• If a set consists of those elements of $A$ which are not in$B$, then the set is
• Let $A$ and$B$ are two non empty sets and $U$ be a universal set, then $A-B$
• If $A\cap B=\ne \phi$, i.e. sets $A$ and $B$ are disjoint, then $n(A\cup B)$ is equal to
• If $A\cap B\ne \phi$ i.e. sets $A$ and $B$ are overlapping, then $n(A\cup B)$ is equal to
• If $A \subseteq B$ then $n(A\cup B)$ is equal to
• If $B\subseteq A$ then $n(A\cup B)$ is equal to
• If $A\cap b=\phi$ then $n(A \cap B)$ is equal to
• If $A \cap B=\phi$ i.e. $A$ and $B$ are overlapping sets, then $n(A\cap B)$
• If $A \subseteq B$ then $n(A\cap B)$ is equal to
• If $B \subseteq A$ then $n(A \cap B)$ is equal to
• If $A$ and $B$ are disjoint sets i.e. $A\cap B=\phi$, then $n(A\,\, B)$ is equal to
• If $A$ and $B$ are disjoint sets i.e. $A\cap B=\phi$ then $n(B-A)$
• If $A \subseteq B$ then $n(A-B)$ is equal to
• If $B\subseteq A$ then $n(B-A)$ is equal to
• If $B \subseteq A$, $A-B\ne \phi$, then $n(A-B)$
• Which of the following is true

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