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This mock test of Test: Subsets & Supersets for JEE helps you for every JEE entrance exam.
This contains 20 Multiple Choice Questions for JEE Test: Subsets & Supersets (mcq) to study with solutions a complete question bank.
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QUESTION: 1

Let X= {1,2,3}, Y= {}, Z= {1,2,3}, then which of the following is true?

Solution:

Null set is the subset of every set so Y ⊂ X and Y ⊂ Z.

Since set X is equal to set Z so, Z ⊂ X and X ⊂ Z.

QUESTION: 2

If set A is equal to set B then ______.

Solution:

If set A is equal to set B then every element of set A is in set B i.e. A ⊂ B and every element of set B is in set A i.e. B ⊂ A. Hence A ⊂ B and B ⊂ A.

QUESTION: 3

Let X be set of rational numbers. Which of the following is not subset of X?

Solution:

Set of rational numbers { x: x=p/q where p and q are integers and q≠0}.

Set of real numbers is not a subset of X. Set of natural numbers, whole numbers, integers are subset of X.

QUESTION: 4

If P = {1, 2, 3, 4}, then the number of elements in its power set will be:

Solution:

Number of elements in a power set = 2^{n}, where n = number of elements in the set P.

Hence, 2^{4 }= 16.

QUESTION: 5

If E = {a, b, c, d, e} and A = {a, b, c} then A is:

Solution:

- A subset is a set whose elements are all members of another set.
- Since all the elements of set A are the members of set E. So A is a subset of E.

QUESTION: 6

The interval (2, 4) written in set builder form is:

Solution:

(2,4) written in set builder form is:

{x : 2 < x < 4}

QUESTION: 7

How many elements does P(A) have, If A = Φ?

Solution:

If A = Ф that means A does not contain any element i.e., n = 0.

Now, number of elements in a power set is 2^{n}.

∴, n[P(A)] = 2⁰ = 1

Therefore P(A) contains 1 element.

QUESTION: 8

Given the sets P = {2, 4, 6}, Q = {3, 5, 7} and R = {1, 3, 5, 7, 9}, which of the following may be considered as universal set for all the three sets P, Q and R?

Solution:

- The set containing all objects or elements and of which all other sets are subsets is
**a Universal set.** - Here, option A has all the elements of set P, Q and R. So {1, 2, 3, 4, 5, 6, 7, 9} may be considered as universal set for all the three sets P, Q and R.

QUESTION: 9

Let a, b ∈ R and a < b, then [a, b] implies:

Solution:

Square brackets [a, b] implies that values of a and b should be included in the range of x i.e., a ≤ x ≤ b.

QUESTION: 10

Let A = {2, 3, 4} and X = {0, 1, 2, 3, 4}, then which of the following statement is correct?

Solution:

- We have, A
^{c}in X = The set of elements in X which are not in A = 0,1 - {0} ∈ A
^{c}w.r.t. X is false, because {0} is not an element of A^{c}in X. - ϕ ∈ A
^{c}in X is false because ϕ is not an element of A^{c}in X. - {0} ⊂ A
^{c}in X is**correct**because the only element of {0} namely 0 also belong to A^{c}in X. - 0 ⊂ A
^{c}in X is false because 0 is not a set.

QUESTION: 11

If A = {1, 3, 4} and B = {1, 4, 3, 2} then which of the following is true?

Solution:

All the elements in set-A are presented in set-B. So "A" is a subset of "B".

QUESTION: 12

Choose the incorrect statement:

Solution:

- A set A is a
**proper subset**of a set B if A is a subset of B and there is at least one element of B that's not an element of A. - Thus, the
**void set**is a subset of all sets, and it's a proper subset of every set except itself.

QUESTION: 13

In which of the following statements, set P is not a subset of Q:

Solution:

- P contains {0, 1, 2, 3, 4} and Q contain natural numbers which start with 1 and P = {0, 1, 2, 3, 4} Q = {1, 2, 3}
- Here P isn't a subset of Q because all the elements of P are not in Q.

QUESTION: 14

Which of the following is a null set?

Solution:

|x| < 1 ⇒ -1 < x < 1

∴ No natural number exists between (-1, 1).

QUESTION: 15

If A = {x : x is a muliple of 4} and B = {x : x is a muliple of 6}, then A ∩ B consists of all multiples of:

Solution:

L.C.M of 4 and 6 is 12.

Given, A = {x:x is a multiple of 4}

= {4,8,12,16,20,…}

and B = {x:x is a multiple of 6}

= {6,12,18,24,…}

∴A ∩ B = {12,24,…}

= {x:x is amultiple of 12}

QUESTION: 16

A is a set with 6 elements. So, the number of subsets is:

Solution:

{1, 2, 3, 4, 5, 6} is a set of 6 elements, so it has 2^{6} = **64 subsets**

QUESTION: 17

If A = {a, b, c} then the number of proper subsets of A are:

Solution:

- Number of proper subsets of a given set =
**2**, where m is the^{m }- 1**number**of elements. - Here the number of elements is 3. So the number of proper subsets of A = 2
^{3}- 1 = 7.

QUESTION: 18

For the set of all natural numbers the universal set can be ______.

Solution:

**Integers** contain all the natural numbers. So it can be a universal set for natural numbers. In other options, there are only some of the elements of natural numbers.

QUESTION: 19

A set has 7 elements. The number of elements in its power set is:

Solution:

Number of elements in power set = 2^{7 }= 128

QUESTION: 20

Let A = {1, 2, {3, 4}, 5}. Which of the following statements are incorrect?

Solution:

- Here, A = {1, 2, (3, 4}, 5}

In this set {3, 4} is treated as a single element of set A. 3, 4 are not the separate elements of set A. - So {{3, 4}} ⊂ A is correct and {3, 4} ⊂ A is the wrong representation.

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