$$\left \{b, c, f, h, i, j\right \}$$

$$\left \{b, c, d, h, i, j\right \}$$

$$\left \{b, c, d, g, i, j\right \}$$

$$\left \{b, c, f, g, i, j\right \}$$

MCQ Questions for Class 11 Engineering Maths Sets Quiz 2

Which of the following sets is finite?

0%
$$\{x:x\:is\:an\:odd\:number\}$$
0%
$$\{x:3 < x < 6,x\in R\}$$
0%
Set of all prime numbers
0%
Set of all sand particles on earth

Which of the following has only one subset?

0%
$$\{0,1\}$$
0%
$$\{1\}$$
0%
$$\{0\}$$
0%
$$\{\}$$

If $$S$$ and $$T$$ are two sets such that $$S$$ has $$21$$ elements, $$T$$ has $$32$$ elements and $$\displaystyle S\cap T$$ has $$11$$ elements, then
find the number of elements in $$\displaystyle S\cup T$$.

0%
$$47$$
0%
$$42$$
0%
$$37$$
0%
$$52$$

In a community of $$ 175$$ persons, $$40$$ read TOI, $$50$$ read the Samachar Patrika and $$100$$ do not read either. How many persons read both the papers?

0%
$$16$$
0%
$$17$$
0%
$$15$$
0%
$$14$$

$$P\cap Q\cup R$$

0%
$$\left \{b, c, d, h, i, j\right \}$$
0%
$$\left \{b, c, d, g, i, j\right \}$$
0%
$$\left \{b, c, f, h, i, j\right \}$$
0%
$$\left \{b, c, f, g, i, j\right \}$$

State whether following statement is true or false.

Given $$\mu = \left \{x / x \text {is an integer}, -4\leq x \leq 6\right \}$$,

$$P' = \left \{-4, -3, 0, 1, 2, 4, 6\right \}$$

$$Q' = \left \{-3, -2, 1, 3, 6\right \}$$

The elements of the set $$P$$ are $$P = \left \{-2, -1, 3, 5\right \}$$.

0%
True
0%
False

Given $$P(A \cup B)=0.6, P(A\cap B)=0.2$$, the probability of exactly one of the event occurs is

0%
$$0.4$$
0%
$$0.2$$
0%
$$0.6$$
0%
$$0.8$$

If $$A, B$$ and $$C$$ are any three set, then $$A \cup (B\cap C) =$$

0%
$$ (A \cup B) \cup (A\cup C)$$
0%
$$ (A \cup B) \cap (A\cup C)$$
0%
$$ (A \cap B) \cap (A\cap C)$$
0%
none

The set $$\displaystyle A=\left\{ x:x\in { x }^{ 2 }=16\quad and\quad 2x=6 \right\} $$ equals:

0%
Null set
0%
Singleton set
0%
Infinite set
0%
Not a Well Defined Collection

$$A - (B\cup C)$$

0%
$$\left \{1,6,7,8\right \}$$
0%
$$\left \{3,4,5\right \}$$
0%
$$\left \{2\right \}$$
0%
none

If $$A = \left \{1, 2, 3, 4\right \}$$, what is the number of subsets of A with at least three elements?

0%
$$3$$
0%
$$4$$
0%
$$5$$
0%
$$10$$

For any two sets A and B, $$A = B$$ is equivalent to

0%
$$A - B = B - A$$
0%
$$A\cup B = A\cap B$$
0%
$$A\cup C = B\cup C$$ and $$A\cap C = B\cap C$$ for any set C
0%
$$A\cap B = \oslash$$

If $$A - B = \phi$$, then relation between A and B is

0%
$$A\neq B$$
0%
$$B\subset A$$
0%
$$A\subset B$$
0%
$$A = B$$

The set of integers is closed with respect to which one of the following?

0%
Addition only
0%
Multiplication only
0%
By addition and multiplication
0%
Division

In the Venn diagram, the numbers represent the number of elements in the subsets. Given that $$\xi = F\cup G\cup H$$ and $$n(\xi) = 42$$, find $$n(G'\cup H)$$

0%
$$18$$
0%
$$28$$
0%
$$30$$
0%
$$38$$

$$(P\cap Q)\cup (Q\cap R)$$

0%
$$\left \{b, c, f\right \}$$
0%
$$\left \{b, c, d\right \}$$
0%
$$\left \{b, c, d, f\right \}$$
0%
$$\left \{b, c, f, g\right \}$$

In a school with an envolment of $$950$$ students, each student must join either the lions club or the country club or both. Given that $$646$$ students are members of the lions club and $$532$$ are members of the country club, calculate the number of students who are members of both clubs

0%
$$228$$
0%
$$230$$
0%
$$232$$
0%
$$234$$

If A and B be two sets containing $$4$$ and $$8$$ elements respectively, what can be the maximum number of elements in $$A\cup B$$? Find also, the minimum number of elements in $$(A\cup B)$$?

0%
Maximum number of elements $$= 12$$
Minimum number of elements $$= 8$$
0%
Maximum number of elements $$= 14$$
Minimum number of elements $$= 8$$
0%
Maximum number of elements $$= 12$$
Minimum number of elements $$= 9$$
0%
Maximum number of elements $$= 14$$
Minimum number of elements $$= 7$$

How many of these students are taking physics?

0%
$$n(P) = 45$$
0%
$$n(P) = 40$$
0%
$$n(P) = 50$$
0%
$$n(P) = 55$$

A survey was carried out to find out the types of shampoo that a group of $$150$$ women have tried. It was found that $$84$$ women have used brand A shampoo, $$93$$ have used brand B, and $$69$$ have used brand C of these women, $$45$$ have tried brands A and B, $$25$$ have tried brands A and C and $$40$$ have tried brand B and C. Determine the number of women who have tried (a) all three brands, (b) only brand A

0%
(a) $$14$$ (b) $$28$$
0%
(a) $$15$$ (b) $$28$$
0%
(a) $$14$$ (b) $$29$$
0%
(a) $$16$$ (b) $$29$$

Which one of the following is incorrect?

0%
Every subset of a finite set is finite
0%
$$P=\left \{ x:x-8=-8 \right \}$$ is a singleton set
0%
Every set has a proper set
0%
Every non-empty set has at least two subsets, $$\phi$$ and the set itself

The number of elements of the set $$\left \{ x:x\in Z,x^{2}=1 \right \}$$ is :

0%
$$3$$
0%
$$2$$
0%
$$1$$
0%
$$0$$

Let $$A_1, A_2$$ and $$A_3$$ be subsets of a set $$X$$. Which one of the following is correct?

0%
$$A_1\cup{A_2}\cup{A_3}$$ is the largest subset of $$X$$ containing elements of each of $$A_1, A_2$$ and $$A_3$$
0%
$$A_1\cup{A_2}\cup{A_3}$$ is the smallest subset of $$X$$ containing either $$A_1$$ or $$A_2\cup{A_3}$$ but not both
0%
The smallest subset of $$X$$ containing $$A_1\cup{A_2}$$ and $$A_3$$ equals the smallest subset of $$X$$ containing both $$A_1$$ and $$A_2\cup{A_3}$$ only if $$A_2=A_3$$
0%
None of these

State whether the following statement is True or False
If $$U=\left\{1,2,3,4,5,6,7\right\}$$ and $$A=\left\{5,6,7\right\}$$, then $$U$$ is the subset of $$A$$.

0%
True
0%
False

From among the given alternatives select the one in which the set of numbers is most like the set of numbers given in the question.
Given set $$:$$ $$(7, 15, 31)$$

0%
$$7, 13, 28$$
0%
$$5, 13, 28$$
0%
$$9, 13, 26$$
0%
$$5, 13, 29$$

If $$A \subset B$$, then $$A \cap B$$ is

0%
$$B$$
0%
$$A\setminus B$$
0%
$$A$$
0%
$$B \setminus A$$

Let $$A = \{1, 2, 3, 4, 5, 6, 7, 8, 9, 10\}$$. Then the number of subsets of $$A$$ containing exactly two elements is

0%
$$20$$
0%
$$40$$
0%
$$45$$
0%
$$90$$

State the following statement is True or False.
If we have two sets, $$A$$ and $$B$$ and every element of the set $$A$$ is also the element of the set $$B$$. then we can say $$A$$ is subset of the set $$B$$.

0%
True
0%
False

In a class of $$60$$ students, $$45$$ students like music, $$50$$ students like dancing, $$5$$ students like neither. Then the number of students in the class who like both music and dancing is

0%
$$35$$
0%
$$40$$
0%
$$50$$
0%
$$55$$

Statements:
I. Some Politicians are social workers.
II. All Doctors are social workers.
Conclusions:
I. Some Doctors are Politicians.
II. Some social workers are Doctors as well as Politicians.

0%
Both conclusion (I) and (II) follow
0%
Only conclusion (II) follow
0%
Neither conclusion (I) nor (II) follow
0%
Only conclusion (I) follow

CBSE Questions for Class 11 Engineering Maths Sets Quiz 2 - MCQExams.com

0:0:1

Practice Class 11 Engineering Maths Quiz Questions and Answers

CBSE Questions for Class 11 Engineering Maths Sets Quiz 2 - MCQExams.com

0:0:1

Practice Class 11 Engineering Maths Quiz Questions and Answers

Support mcqexams.com by disabling your adblocker.