The type of functions that have inverses.

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Answer 1

Question

Chapter 7, Problem 1GYR

To determine

To explain: The type of functions that have inverses.

Expert Solution

Explanation of Solution

If the graph of a function y=f(x) is intersects each horizontal line at most one. Then the function has an inverse.

The function is one-to-one on domain. Then the function has an inverse.

To determine

To describe: The method to find if two function having inverse of one another and provide examples of function that are (are not) inverses of one another.

Expert Solution

Explanation of Solution

In algebraically:

Two functions f and g are inverses of one another if f(g(x))=g(f(x))=x.

In graphically:

If the functions f and g must be symmetric with about the line y = x, then the two functions f and g are inverses of one another.

Example:

Consider the functions f(x)=3x−2 and g(x)=x+23.

Now check f(g(x))=g(f(x)):

f(g(x))=g(f(x))f(x+23)=g(3x−2)3(x+23)−2=3x−2+23x=x

This two functions are inverses of one another.

Consider the functions f(x)=3x−2 and g(x)=13x+2.

Now check f(g(x))=g(f(x)):

f(g(x))=g(f(x))f(13x+2)=g(3x−2)3(13x+2)−2=13(3x−2)+2x+4≠x+43

Thus, the two functions are not inverses of one another.

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Answer 2

Question

Chapter 7, Problem 1GYR

To determine

To explain: The type of functions that have inverses.

Expert Solution

Explanation of Solution

If the graph of a function y=f(x) is intersects each horizontal line at most one. Then the function has an inverse.

The function is one-to-one on domain. Then the function has an inverse.

To determine

To describe: The method to find if two function having inverse of one another and provide examples of function that are (are not) inverses of one another.

Expert Solution

Explanation of Solution

In algebraically:

Two functions f and g are inverses of one another if f(g(x))=g(f(x))=x.

In graphically:

If the functions f and g must be symmetric with about the line y = x, then the two functions f and g are inverses of one another.

Example:

Consider the functions f(x)=3x−2 and g(x)=x+23.

Now check f(g(x))=g(f(x)):

f(g(x))=g(f(x))f(x+23)=g(3x−2)3(x+23)−2=3x−2+23x=x

This two functions are inverses of one another.

Consider the functions f(x)=3x−2 and g(x)=13x+2.

Now check f(g(x))=g(f(x)):

f(g(x))=g(f(x))f(13x+2)=g(3x−2)3(13x+2)−2=13(3x−2)+2x+4≠x+43

Thus, the two functions are not inverses of one another.

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Answer 3

Question

Chapter 7, Problem 1GYR

To determine

To explain: The type of functions that have inverses.

Expert Solution

Explanation of Solution

If the graph of a function y=f(x) is intersects each horizontal line at most one. Then the function has an inverse.

The function is one-to-one on domain. Then the function has an inverse.

To determine

To describe: The method to find if two function having inverse of one another and provide examples of function that are (are not) inverses of one another.

Expert Solution

Explanation of Solution

In algebraically:

Two functions f and g are inverses of one another if f(g(x))=g(f(x))=x.

In graphically:

If the functions f and g must be symmetric with about the line y = x, then the two functions f and g are inverses of one another.

Example:

Consider the functions f(x)=3x−2 and g(x)=x+23.

Now check f(g(x))=g(f(x)):

f(g(x))=g(f(x))f(x+23)=g(3x−2)3(x+23)−2=3x−2+23x=x

This two functions are inverses of one another.

Consider the functions f(x)=3x−2 and g(x)=13x+2.

Now check f(g(x))=g(f(x)):

f(g(x))=g(f(x))f(13x+2)=g(3x−2)3(13x+2)−2=13(3x−2)+2x+4≠x+43

Thus, the two functions are not inverses of one another.

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Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 4

Question

Chapter 7, Problem 1GYR

To determine

To explain: The type of functions that have inverses.

Expert Solution

Explanation of Solution

If the graph of a function y=f(x) is intersects each horizontal line at most one. Then the function has an inverse.

The function is one-to-one on domain. Then the function has an inverse.

To determine

To describe: The method to find if two function having inverse of one another and provide examples of function that are (are not) inverses of one another.

Expert Solution

Explanation of Solution

In algebraically:

Two functions f and g are inverses of one another if f(g(x))=g(f(x))=x.

In graphically:

If the functions f and g must be symmetric with about the line y = x, then the two functions f and g are inverses of one another.

Example:

Consider the functions f(x)=3x−2 and g(x)=x+23.

Now check f(g(x))=g(f(x)):

f(g(x))=g(f(x))f(x+23)=g(3x−2)3(x+23)−2=3x−2+23x=x

This two functions are inverses of one another.

Consider the functions f(x)=3x−2 and g(x)=13x+2.

Now check f(g(x))=g(f(x)):

f(g(x))=g(f(x))f(13x+2)=g(3x−2)3(13x+2)−2=13(3x−2)+2x+4≠x+43

Thus, the two functions are not inverses of one another.

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Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 5

Chapter 7, Problem 1GYR

To determine

To explain: The type of functions that have inverses.

Expert Solution

Explanation of Solution

If the graph of a function y=f(x) is intersects each horizontal line at most one. Then the function has an inverse.

The function is one-to-one on domain. Then the function has an inverse.

To determine

To describe: The method to find if two function having inverse of one another and provide examples of function that are (are not) inverses of one another.

Expert Solution

Explanation of Solution

In algebraically:

Two functions f and g are inverses of one another if f(g(x))=g(f(x))=x.

In graphically:

If the functions f and g must be symmetric with about the line y = x, then the two functions f and g are inverses of one another.

Example:

Consider the functions f(x)=3x−2 and g(x)=x+23.

Now check f(g(x))=g(f(x)):

f(g(x))=g(f(x))f(x+23)=g(3x−2)3(x+23)−2=3x−2+23x=x

This two functions are inverses of one another.

Consider the functions f(x)=3x−2 and g(x)=13x+2.

Now check f(g(x))=g(f(x)):

f(g(x))=g(f(x))f(13x+2)=g(3x−2)3(13x+2)−2=13(3x−2)+2x+4≠x+43

Thus, the two functions are not inverses of one another.

Answer 6

Chapter 7, Problem 1GYR

To determine

To explain: The type of functions that have inverses.

Expert Solution

Explanation of Solution

If the graph of a function y=f(x) is intersects each horizontal line at most one. Then the function has an inverse.

The function is one-to-one on domain. Then the function has an inverse.

Answer 7

Chapter 7, Problem 1GYR

To determine

To explain: The type of functions that have inverses.

Answer 8

Expert Solution

Explanation of Solution

If the graph of a function y=f(x) is intersects each horizontal line at most one. Then the function has an inverse.

The function is one-to-one on domain. Then the function has an inverse.

Answer 9

Expert Solution

Answer 10

Expert Solution

Answer 11

Expert Solution

Answer 12

To determine

To describe: The method to find if two function having inverse of one another and provide examples of function that are (are not) inverses of one another.

Expert Solution

Explanation of Solution

In algebraically:

Two functions f and g are inverses of one another if f(g(x))=g(f(x))=x.

In graphically:

If the functions f and g must be symmetric with about the line y = x, then the two functions f and g are inverses of one another.

Example:

Consider the functions f(x)=3x−2 and g(x)=x+23.

Now check f(g(x))=g(f(x)):

f(g(x))=g(f(x))f(x+23)=g(3x−2)3(x+23)−2=3x−2+23x=x

This two functions are inverses of one another.

Consider the functions f(x)=3x−2 and g(x)=13x+2.

Now check f(g(x))=g(f(x)):

f(g(x))=g(f(x))f(13x+2)=g(3x−2)3(13x+2)−2=13(3x−2)+2x+4≠x+43

Thus, the two functions are not inverses of one another.

Answer 13

To determine

To describe: The method to find if two function having inverse of one another and provide examples of function that are (are not) inverses of one another.

Answer 14

Expert Solution

Explanation of Solution

In algebraically:

Two functions f and g are inverses of one another if f(g(x))=g(f(x))=x.

In graphically:

If the functions f and g must be symmetric with about the line y = x, then the two functions f and g are inverses of one another.

Example:

Consider the functions f(x)=3x−2 and g(x)=x+23.

Now check f(g(x))=g(f(x)):

f(g(x))=g(f(x))f(x+23)=g(3x−2)3(x+23)−2=3x−2+23x=x

This two functions are inverses of one another.

Consider the functions f(x)=3x−2 and g(x)=13x+2.

Now check f(g(x))=g(f(x)):

f(g(x))=g(f(x))f(13x+2)=g(3x−2)3(13x+2)−2=13(3x−2)+2x+4≠x+43

Thus, the two functions are not inverses of one another.

Answer 15

Expert Solution

Answer 16

Expert Solution

Answer 17

Expert Solution

Answer 18

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The type of functions that have inverses.

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To explain: The type of functions that have inverses.

Explanation of Solution

To describe: The method to find if two function having inverse of one another and provide examples of function that are (are not) inverses of one another.

Explanation of Solution

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