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Test: Set Theory- 1 - CAT MCQ


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10 Questions MCQ Test Logical Reasoning (LR) and Data Interpretation (DI) - Test: Set Theory- 1

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Test: Set Theory- 1 - Question 1

Let R be a non-empty relation on a collection of sets defined by ARB if and only if A  ∩ B = Ø
Then (pick the TRUE statement) 

Detailed Solution for Test: Set Theory- 1 - Question 1

The correct answer is B 

Let, A={1,2,3}
B={4,5} 
C={1,6,7}

now, A∩B=∅ 
B∩C=∅ but  A∩C≠∅
Relation R is not transitive.

A∩A=A
R is not reflexive.

A∩B=B∩A
R is symmetric

So, 
A is false as R is not reflexive or transitive
B is true.
C is false because R is not transitive or reflexive
D is false because R is symmetric

Test: Set Theory- 1 - Question 2

The binary relation S =  Φ (empty set) on set A = {1, 2,3}  is

Detailed Solution for Test: Set Theory- 1 - Question 2

Option D is correct.

  • Reflexive : A relation is reflexive if every element of set is paired with itself. Here none of the element of A is paired with themselves, so S is not reflexive.
  • Symmetric : This property says that if there is a pair (a, b) in S, then there must be a pair (b, a) in S. Since there is no pair here in S, this is trivially true, so S is symmetric.
  • Transitive : This says that if there are pairs (a, b) and (b, c) in S, then there must be pair (a,c) in S. Again, this condition is trivially true, so S is transitive.

Set A is Irreflexive, Symmetric, Anti Symmetric, Asymmetric, Transitive.
But it is not Reflexive.

Thus, option (D) is correct.

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Test: Set Theory- 1 - Question 3

Which of the following sets are null sets ?

Detailed Solution for Test: Set Theory- 1 - Question 3

There are some sets that do not contain any element at all. For example, the set of months with 32 days. We call a set with no elements the null or empty set. It is represented by the symbol { } or Ø.

Test: Set Theory- 1 - Question 4

Number of subsets of a set of order three is

Detailed Solution for Test: Set Theory- 1 - Question 4

A set with 'n' elements in it can have '2n' subsets.

eg: Let us consider a set A = {1,2,3}

The possible subsets are:

{1}, {2}, {3}, {1, 2}, {1, 3}, {2, 3}, {1, 2, 3} and {}

Where, {} is the empty set.

Number of subset = 2n
order 3 = 2⇒ 8

Therefore, the number of subsets is 8.

Test: Set Theory- 1 - Question 5

"n/m" means that n is a factor of m, then the relation T is

Detailed Solution for Test: Set Theory- 1 - Question 5

′/′ is reflexive since every natural number is a factor of itself that in n/n for n∈N.
′/′ is transitive if n is a factor of m and m is a factor of P, then n is surely a factor of P.
However, ′/′ is not symmetric.
example, 2 is a factor of 4 but 4 is not a factor of 2. 

Test: Set Theory- 1 - Question 6

The number of elements in the Power set P(S) of the set S = {{1,2}, {2,3}, {2,4}} is given by

Detailed Solution for Test: Set Theory- 1 - Question 6

The power set of any set S is the set of all subsets of S, including the empty set and S itself, various denoted as p(S).

Let A = {{1,2}, {2,3}, {2,4}}

Power set of A =  {Φ, {{1, 2}}, {{2,3}}, {{2,4}}, {{1,2}, {2,3}}, {{1,2}, {2,4}}, {{2,3}, {2,4}}, {{1,2}, {2,3}, {2,4}}}

Let power set of S = x

Number of elements of power set of x

P(x) = 2n = 23 = 8.

Test: Set Theory- 1 - Question 7

If A and B are sets and A∪ B = A  ∩ B, then

Detailed Solution for Test: Set Theory- 1 - Question 7

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Test: Set Theory- 1 - Question 8

Let S be an infinite set and S1, S2, S3, ..., Sn be sets such that S1 ∪S2 ∪S3∪ .......Sn = S then

Detailed Solution for Test: Set Theory- 1 - Question 8

Let S = S1 ∪ S2 ∪ S3 ∪ .... Sn . 
For S to be infinite set, atleast one of sets Si must be infinite, 
if all Si were finite, then S will also be finite.

Test: Set Theory- 1 - Question 9

If X and Y are two sets, then X  ∩ (Y  ∪ X) C equals

Detailed Solution for Test: Set Theory- 1 - Question 9

We have X ∩ (Y∪X)C = X ∩ (Y'∩X') = X ∩ X' ∩ Y' =  Ø ∩ Y = Ø 

Hence Option C.

Test: Set Theory- 1 - Question 10

If  f : X -> Y and a, b  ⊆ X, then f (a  ∩ b) is equal to

Detailed Solution for Test: Set Theory- 1 - Question 10

The only requirement to answer the above question is to know the definition of function- a relation becomes a function if every element in domain is mapped to some element in co-domain and no element is mapped to more than one element.

Now, we have a,b⊆ X. Their intersection can be even empty set. So, lets try out options:

Options a and d don't even need a check.

Lets take a case where a∩b = φ. Now, f(a∩b)=φ, but f(a) ∩ f(b) can be non empty. So, option B can be false.

Option C is always true provided "proper subset" is replaced by "subset". This is because no element in domain of a function can be mapped to more than one element. And the subset needn't be "proper" as for a one-one mapping, we get

f(a∩b) = f(a) ∩ f(b) ,Hence option C

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