In Exercises 1-6, determine whether each relation is a function. Give the domain and range for each relation. 1. {(2, 6), (1, 4), (2, −6)}

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Answer 1

Textbook Question

Chapter 2, Problem 1MC

In Exercises 1-6, determine whether each relation is a function. Give the domain and range for each relation.

1. {(2, 6), (1, 4), (2, −6)}

Expert Solution & Answer

To determine

To find: The domain and range of the relation; also check whether the relation is a function or not.

Answer to Problem 1MC

The domain and range of the relation is {1,2} and {−6,4,6} respectively and the relation {(2,6),(1,4),(2,−6)} does not represent a function.

Explanation of Solution

Given:

The relation is {(2,6),(1,4),(2,−6)}.

Definition used:

Relation:

“A relation is any set of ordered pairs and the set of all first component of the ordered pairs is called domain and the set of all second component of the relation is called the range of the relation.”

Function:

“A function is relation such that each element in the domain corresponds to exactly one element in the range”.

Interpretation:

Consider the relation, {(2,6),(1,4),(2,−6)}.

Clearly, the first component of the above ordered pairs are {1,2}.

By the definition of the relation, the domain of the relation is the first components of the set of ordered pairs.

That is, the domain of the function is {1,2}.

Also, the second component of the ordered pairs are {−6,4,6}.

By the definition of the relation, the range of the relation is the second component of the set of ordered pairs.

That is, the range of the function is {−6,4,6}.

Draw a circle for the domain and range that will represent the above relation as shown in the below Figure 1.

COLLEGE ALGEBRA ESSENTIALS, Chapter 2, Problem 1MC

From Figure 1, the element 2 is mapped into the elements 6 and −6.

Also, the element 1 is mapped into 4.

That is, the set of ordered pairs {(2,6),(2,−6)} in the given relation have the same first coordinate and different second coordinate.

Since the element 2 is mapped into two elements in the range.

By the definition of the function, the relation is not a function.

Thus, the relation {(2,6),(1,4),(2,−6)} is not a function.

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Answer 2

Textbook Question

Chapter 2, Problem 1MC

In Exercises 1-6, determine whether each relation is a function. Give the domain and range for each relation.

1. {(2, 6), (1, 4), (2, −6)}

Expert Solution & Answer

To determine

To find: The domain and range of the relation; also check whether the relation is a function or not.

Answer to Problem 1MC

The domain and range of the relation is {1,2} and {−6,4,6} respectively and the relation {(2,6),(1,4),(2,−6)} does not represent a function.

Explanation of Solution

Given:

The relation is {(2,6),(1,4),(2,−6)}.

Definition used:

Relation:

“A relation is any set of ordered pairs and the set of all first component of the ordered pairs is called domain and the set of all second component of the relation is called the range of the relation.”

Function:

“A function is relation such that each element in the domain corresponds to exactly one element in the range”.

Interpretation:

Consider the relation, {(2,6),(1,4),(2,−6)}.

Clearly, the first component of the above ordered pairs are {1,2}.

By the definition of the relation, the domain of the relation is the first components of the set of ordered pairs.

That is, the domain of the function is {1,2}.

Also, the second component of the ordered pairs are {−6,4,6}.

By the definition of the relation, the range of the relation is the second component of the set of ordered pairs.

That is, the range of the function is {−6,4,6}.

Draw a circle for the domain and range that will represent the above relation as shown in the below Figure 1.

COLLEGE ALGEBRA ESSENTIALS, Chapter 2, Problem 1MC

From Figure 1, the element 2 is mapped into the elements 6 and −6.

Also, the element 1 is mapped into 4.

That is, the set of ordered pairs {(2,6),(2,−6)} in the given relation have the same first coordinate and different second coordinate.

Since the element 2 is mapped into two elements in the range.

By the definition of the function, the relation is not a function.

Thus, the relation {(2,6),(1,4),(2,−6)} is not a function.

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Answer 3

Textbook Question

Chapter 2, Problem 1MC

In Exercises 1-6, determine whether each relation is a function. Give the domain and range for each relation.

1. {(2, 6), (1, 4), (2, −6)}

Expert Solution & Answer

To determine

To find: The domain and range of the relation; also check whether the relation is a function or not.

Answer to Problem 1MC

The domain and range of the relation is {1,2} and {−6,4,6} respectively and the relation {(2,6),(1,4),(2,−6)} does not represent a function.

Explanation of Solution

Given:

The relation is {(2,6),(1,4),(2,−6)}.

Definition used:

Relation:

“A relation is any set of ordered pairs and the set of all first component of the ordered pairs is called domain and the set of all second component of the relation is called the range of the relation.”

Function:

“A function is relation such that each element in the domain corresponds to exactly one element in the range”.

Interpretation:

Consider the relation, {(2,6),(1,4),(2,−6)}.

Clearly, the first component of the above ordered pairs are {1,2}.

By the definition of the relation, the domain of the relation is the first components of the set of ordered pairs.

That is, the domain of the function is {1,2}.

Also, the second component of the ordered pairs are {−6,4,6}.

By the definition of the relation, the range of the relation is the second component of the set of ordered pairs.

That is, the range of the function is {−6,4,6}.

Draw a circle for the domain and range that will represent the above relation as shown in the below Figure 1.

COLLEGE ALGEBRA ESSENTIALS, Chapter 2, Problem 1MC

From Figure 1, the element 2 is mapped into the elements 6 and −6.

Also, the element 1 is mapped into 4.

That is, the set of ordered pairs {(2,6),(2,−6)} in the given relation have the same first coordinate and different second coordinate.

Since the element 2 is mapped into two elements in the range.

By the definition of the function, the relation is not a function.

Thus, the relation {(2,6),(1,4),(2,−6)} is not a function.

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Answer 4

Textbook Question

Chapter 2, Problem 1MC

In Exercises 1-6, determine whether each relation is a function. Give the domain and range for each relation.

1. {(2, 6), (1, 4), (2, −6)}

Expert Solution & Answer

To determine

To find: The domain and range of the relation; also check whether the relation is a function or not.

Answer to Problem 1MC

The domain and range of the relation is {1,2} and {−6,4,6} respectively and the relation {(2,6),(1,4),(2,−6)} does not represent a function.

Explanation of Solution

Given:

The relation is {(2,6),(1,4),(2,−6)}.

Definition used:

Relation:

“A relation is any set of ordered pairs and the set of all first component of the ordered pairs is called domain and the set of all second component of the relation is called the range of the relation.”

Function:

“A function is relation such that each element in the domain corresponds to exactly one element in the range”.

Interpretation:

Consider the relation, {(2,6),(1,4),(2,−6)}.

Clearly, the first component of the above ordered pairs are {1,2}.

By the definition of the relation, the domain of the relation is the first components of the set of ordered pairs.

That is, the domain of the function is {1,2}.

Also, the second component of the ordered pairs are {−6,4,6}.

By the definition of the relation, the range of the relation is the second component of the set of ordered pairs.

That is, the range of the function is {−6,4,6}.

Draw a circle for the domain and range that will represent the above relation as shown in the below Figure 1.

COLLEGE ALGEBRA ESSENTIALS, Chapter 2, Problem 1MC

From Figure 1, the element 2 is mapped into the elements 6 and −6.

Also, the element 1 is mapped into 4.

That is, the set of ordered pairs {(2,6),(2,−6)} in the given relation have the same first coordinate and different second coordinate.

Since the element 2 is mapped into two elements in the range.

By the definition of the function, the relation is not a function.

Thus, the relation {(2,6),(1,4),(2,−6)} is not a function.

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Answer 5

Textbook Question

Answer 6

Textbook Question

Answer 7

Expert Solution & Answer

To determine

To find: The domain and range of the relation; also check whether the relation is a function or not.

Answer to Problem 1MC

The domain and range of the relation is {1,2} and {−6,4,6} respectively and the relation {(2,6),(1,4),(2,−6)} does not represent a function.

Explanation of Solution

Given:

The relation is {(2,6),(1,4),(2,−6)}.

Definition used:

Relation:

“A relation is any set of ordered pairs and the set of all first component of the ordered pairs is called domain and the set of all second component of the relation is called the range of the relation.”

Function:

“A function is relation such that each element in the domain corresponds to exactly one element in the range”.

Interpretation:

Consider the relation, {(2,6),(1,4),(2,−6)}.

Clearly, the first component of the above ordered pairs are {1,2}.

By the definition of the relation, the domain of the relation is the first components of the set of ordered pairs.

That is, the domain of the function is {1,2}.

Also, the second component of the ordered pairs are {−6,4,6}.

By the definition of the relation, the range of the relation is the second component of the set of ordered pairs.

That is, the range of the function is {−6,4,6}.

Draw a circle for the domain and range that will represent the above relation as shown in the below Figure 1.

COLLEGE ALGEBRA ESSENTIALS, Chapter 2, Problem 1MC

From Figure 1, the element 2 is mapped into the elements 6 and −6.

Also, the element 1 is mapped into 4.

That is, the set of ordered pairs {(2,6),(2,−6)} in the given relation have the same first coordinate and different second coordinate.

Since the element 2 is mapped into two elements in the range.

By the definition of the function, the relation is not a function.

Thus, the relation {(2,6),(1,4),(2,−6)} is not a function.

Answer 8

Expert Solution & Answer

To determine

To find: The domain and range of the relation; also check whether the relation is a function or not.

Answer to Problem 1MC

The domain and range of the relation is {1,2} and {−6,4,6} respectively and the relation {(2,6),(1,4),(2,−6)} does not represent a function.

Explanation of Solution

Given:

The relation is {(2,6),(1,4),(2,−6)}.

Definition used:

Relation:

“A relation is any set of ordered pairs and the set of all first component of the ordered pairs is called domain and the set of all second component of the relation is called the range of the relation.”

Function:

“A function is relation such that each element in the domain corresponds to exactly one element in the range”.

Interpretation:

Consider the relation, {(2,6),(1,4),(2,−6)}.

Clearly, the first component of the above ordered pairs are {1,2}.

By the definition of the relation, the domain of the relation is the first components of the set of ordered pairs.

That is, the domain of the function is {1,2}.

Also, the second component of the ordered pairs are {−6,4,6}.

By the definition of the relation, the range of the relation is the second component of the set of ordered pairs.

That is, the range of the function is {−6,4,6}.

Draw a circle for the domain and range that will represent the above relation as shown in the below Figure 1.

COLLEGE ALGEBRA ESSENTIALS, Chapter 2, Problem 1MC

From Figure 1, the element 2 is mapped into the elements 6 and −6.

Also, the element 1 is mapped into 4.

That is, the set of ordered pairs {(2,6),(2,−6)} in the given relation have the same first coordinate and different second coordinate.

Since the element 2 is mapped into two elements in the range.

By the definition of the function, the relation is not a function.

Thus, the relation {(2,6),(1,4),(2,−6)} is not a function.

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

To determine

To find: The domain and range of the relation; also check whether the relation is a function or not.

Answer 12

Answer to Problem 1MC

The domain and range of the relation is {1,2} and {−6,4,6} respectively and the relation {(2,6),(1,4),(2,−6)} does not represent a function.

Answer 13

Explanation of Solution

Given:

The relation is {(2,6),(1,4),(2,−6)}.

Definition used:

Relation:

“A relation is any set of ordered pairs and the set of all first component of the ordered pairs is called domain and the set of all second component of the relation is called the range of the relation.”

Function:

“A function is relation such that each element in the domain corresponds to exactly one element in the range”.

Interpretation:

Consider the relation, {(2,6),(1,4),(2,−6)}.

Clearly, the first component of the above ordered pairs are {1,2}.

By the definition of the relation, the domain of the relation is the first components of the set of ordered pairs.

That is, the domain of the function is {1,2}.

Also, the second component of the ordered pairs are {−6,4,6}.

By the definition of the relation, the range of the relation is the second component of the set of ordered pairs.

That is, the range of the function is {−6,4,6}.

Draw a circle for the domain and range that will represent the above relation as shown in the below Figure 1.

COLLEGE ALGEBRA ESSENTIALS, Chapter 2, Problem 1MC

From Figure 1, the element 2 is mapped into the elements 6 and −6.

Also, the element 1 is mapped into 4.

That is, the set of ordered pairs {(2,6),(2,−6)} in the given relation have the same first coordinate and different second coordinate.

Since the element 2 is mapped into two elements in the range.

By the definition of the function, the relation is not a function.

Thus, the relation {(2,6),(1,4),(2,−6)} is not a function.

Answer 14

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In Exercises 1-6, determine whether each relation is a function. Give the domain and range for each relation. 1. {(2, 6), (1, 4), (2, −6)}

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