Statistical Assistant Exam Preparation Part-1

Statistical Assistant Exam Preparation, let’s crack the statistical assistant Kerala PSC exam.

Statistical Assistant Exam Preparation Part-1

Set Theory

Set is a collection of WELL-DEFINED and DISTINCT objects.

N: the set of all natural numbers

Z: the set of all integers

Q: the set of all rational numbers

R: the set of all real numbers

1. Descriptive Form

One way to specify a set is to give a verbal description of its elements

Example: Set of all odd numbers less than 20.

2. Roster Form or Tabular Form

Listing the elements of a set inside a pair of braces {} is called the roster form.

Example: {a,b,c,d}

3. Set-Builder Form or Ruler Form

Set-builder is a notation for describing a set by indicating the properties that its members must satisfy.

Example: {x: x ∈ N}<5

Different types of Set

1. NULL Set

A null set is a set that contains no elements or values. Denoted as ∅

2. FINITE and INFINITE set

• Sets with no elements or a definite number of elements are called finite sets.
• Otherwise, It is called infinite sets.

3. EQUAL sets

Two sets are equal if they have the same elements and the same cardinality. Order does not matter

Example:

A={a,b,c,d}

B={a,c,db}

C={a,b,g,h} then

A=B called Equal sets

4. SINGLETON SET

A set with exactly one element

Example: {3}, {orange}

SUBSETS

A set is A said to be a subset of a set B if every element of A is also an element of B.

Its denoted as “A c B”

Example:

B={1,2,3,4}

A={1,2,3}

A is a subset of B, at the same time ∅ is a subset of A, ∅ is a subset of B

2. Power Set

The collection of all subsets of A is called the power set of A.

Example:

A={1,2,3}

p{A)={∅, {1,2,3}, {1},{2},{3},{1,2},{2,3},{1,3}}

B={1,2}

The power set of B is denoted as p(B)

p(B)=2^2

p(B)=2*2

p(B)=4

n[P(A)]=2^m

INTERVALS

1. OPEN INTERVAL

Let a, b ∈ R and a<b, open interval (a, b) can be defined as

(a, b)= {x: a<x<b}

Example:

(2, 6)=2, 3, 4, 5, Please note 6 is not included that’s why it is called as open interval

2. CLOSED INTERVAL

Let a, b ∈ R and a<b, the closed interval [a, b] can be defined as

(a, b)= {x: a<=x<=b}

Example:

[2, 6]=2, 3, 4, 5, 6

Ordered Pair

An ordered pair consists of two objects or elements in a given fixed order.

Denoted as (a, b)

Equality of two ordered pairs

Two ordered pairs (a, b) and (c,d) are equal if a=c and b=d

(5,3) =(5, 3) ordered pair

(5, 3) = (3, 5) ordered pairs are not equal

Cartesian Product of Two Sets

For any two non-empty sets of A and B, the set of all pairs of (a, b) where a ∈ A and B ∈B is called the cartesian product of set A and B and is denoted as A x B.

Example:

A={1,2,3}

B={a, b}

A x B=(1, a), (1,b), (2, a), (2,b), (3, a), (3,b) {First element is starting from first set and second element is starting from second set}

B x A= (a, 1), (a, 2), (a, 3), (b, 1), (b, 2), (b,3) {The First element starts from the second set and the second element is starting from the first set}

A x B is not equal to B x A

If A and B are empty A x B or B x A is empty

A={1,2,3}, B={2,3}

n(A)=3, n(B)=2

Then A x B or B x A=3*2=6

Relations

A relation R from a non-empty set A to a non-empty set B is a subset of the cartesian product set A x B.

The subset is derived by describing a relationship between the first element and second element of the ordered pairs in A x B

A={1,2,3}

B={1,2}

A x B =(1,1), (1,2), (2,1),(2,2), (3,1), (3,2)

Relation R1 the first element is equal to the second element.

R1={(1,1), (2,2)}

n(A)=m, n(B)=n the n(A x B)=mn, then possible relations from set A to set B= 2^mn

n(A)=3

n(B)=2

n(A x B)=2^mn

n(A x B)=2^6

Function

A function f from a set A to a set B is a relation between A and B which satisfies two properties.

1. Every element in A is related to some element in B and
2. no element in A is related to more than one element in B

In other words, given any element a ∈ A, there is a unique element b ∈ B with (a, b) ∈ f

So if it is a unique mapping then we called a function.

Real-Valued Function

A function f: A➞B is called a real-valued function if B is a subset of R (Set of all real numbers)

The number of functions from A to B = N^M (Number of elements in B ^ Number of elements in A)

A={a, b}

B={1,2,3}

Number of functions A to B

Number of functions A to B=(Number of elements in B ^ Number of elements in A)

Number of functions A to B=3^2

Number of functions A to B=9

Notes:-

1. Every function is a relation
2. Every relation is not a function

Which of the following is a subset of every set?

• A) The set itself
• B) The empty set
• C) The universal set
• D) None of the above
• Answer: B) The empty set

If A and B are two sets, then the union of A and B is denoted by:

• A) A ∩ B
• B) A – B
• C) A ∪ B
• D) A × B
• Answer: C) A ∪ B

Which of the following intervals represents all real numbers greater than 2 and less than or equal to 5?

• A) (2, 5]
• B) [2, 5)
• C) (2, 5)
• D) [2, 5]
• Answer: A) (2, 5]

A relation R on a set A is called reflexive if:

• A) (a, a) ∈ R for all a ∈ A
• B) (a, b) ∈ R implies (b, a) ∈ R
• C) (a, b) ∈ R and (b, c) ∈ R implies (a, c) ∈ R
• D) None of the above
• Answer: A) (a, a) ∈ R for all a ∈ A

Which of the following is a function?

• A) A relation where each element of the domain is related to exactly one element of the codomain
• B) A relation where each element of the domain is related to at least one element of the codomain
• C) A relation where each element of the domain is related to at most one element of the codomain
• D) None of the above
• Answer: A) A relation where each element of the domain is related to exactly one element of the codomain

If f(x) = x^2, then f is:

• A) A one-to-one function
• B) An onto function
• C) Both one-to-one and onto
• D) Neither one-to-one nor onto
• Answer: D) Neither one-to-one nor onto

Which of the following represents the intersection of sets A and B?

• A) A ∪ B
• B) A – B
• C) A ∩ B
• D) A × B
• Answer: C) A ∩ B

If A = {1, 2, 3} and B = {3, 4, 5}, what is A ∩ B?

• A) {1, 2}
• B) {3}
• C) {4, 5}
• D) {1, 2, 3, 4, 5}
• Answer: B) {3}

Set Theory

Question: What is the cardinality of the set {a, b, c, d}?

Answer: 4

Question: If A = {1, 2, 3} and B = {3, 4, 5}, what is A ∩ B? Answer: {3}

Subsets

Question: How many subsets does the set {1, 2, 3} have?

Answer: 8

Question: If A is a subset of B, which of the following is true?

a) A ∪ B = A

b) A ∩ B = A

c) A ∩ B = B

d) A ∪ B = B

Answer: b) A ∩ B = A

Intervals

Question: Which of the following represents an open interval?

a) [a, b] b) (a, b) c) [a, b) d) (a, b]

Answer: b) (a, b)

Question: What is the interval notation for all real numbers greater than 5?

Answer: (5, ∞)

Relations

Question: A relation R on a set A is called reflexive if:

a) (a, a) ∈ R for all a ∈ A

b) (a, b) ∈ R implies (b, a) ∈ R

c) (a, b) ∈ R and (b, c) ∈ R implies (a, c) ∈ R

d) None of the above

Answer: a) (a, a) ∈ R for all a ∈ A

Question: Which of the following is an example of a symmetric relation?

a) Less than b) Greater than c) Equality d) None of the above

Answer: c) Equality

Functions

Question: A function f: A → B is called injective if:

a) f(a) = f(b) for all a, b ∈ A

b) f(a) = f(b) implies a = b for all a, b ∈ A

c) f(a) ≠ f(b) for all a, b ∈ A

d) None of the above

Answer: b) f(a) = f(b) implies a = b for all a, b ∈ A

Question: Which of the following is a surjective function?

a) f(x) = x^2 from R to R

b) f(x) = x + 1 from R to R

c) f(x) = sin(x) from R to R

d) None of the above

Answer: b) f(x) = x + 1 from R to R

Set Theory

Question: What is the power set of {1, 2}?

Answer: {{}, {1}, {2}, {1, 2}}

Question: If A = {x | x is a prime number less than 10}, what is A?

Answer: {2, 3, 5, 7}

Subsets

Question: If A = {1, 2, 3} and B = {1, 2, 3, 4, 5}, which of the following is true?

a) A ⊆ B b) A ⊇ B c) A ∩ B = ∅ d) A ∪ B = ∅

Answer: a) A ⊆ B

Question: How many proper subsets does the set {a, b, c} have? Answer: 7

Intervals

Question: Which of the following represents a closed interval?

a) [a, b] b) (a, b) c) [a, b) d) (a, b]

Answer: a) [a, b]

Question: What is the interval notation for all real numbers less than or equal to 3?

Answer: (-∞, 3]

Relations

Question: A relation R on a set A is called transitive if:

a) (a, a) ∈ R for all a ∈ A b) (a, b) ∈ R implies

(b, a) ∈ R c) (a, b) ∈ R and (b,

c) ∈ R implies (a, c) ∈ R

d) None of the above

Answer: c) (a, b) ∈ R and (b, c) ∈ R implies (a, c) ∈ R

Question: Which of the following is an example of an antisymmetric relation? a) Less than b) Greater than c) Equality d) None of the above Answer: a) Less than

Functions

Question: A function f: A → B is called a bijective if:

a) f is injective b) f is surjective c) f is both injective and surjective d) None of the above

Answer: c) f is both injective and surjective

Question: Which of the following is an example of a non-injective function?

a) f(x) = x^2 from R to R b) f(x) = x + 1 from R to R c) f(x) = 2x from R to R d) None of the above

Answer: a) f(x) = x^2 from R to R

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