a. Answer ( − ∞ , ∞ ) Explanation Given: Function: f ( x ) = − 8 x x 2 + 4 Concept used: The domain of the function is the set of values, where the function is defined. Calculation: Now, finding the domain of the function, Here, the function is defined for any value of x. So, the domain of the function is R or ( − ∞ , ∞ ) . Conclusion: Hence, the domain of the function is ( − ∞ , ∞ ) . b. To determine To find the intercepts of the function f ( x ) = − 8 x x 2 + 4 . Answer (0, 0), (0, 0) Explanation Given: Function: f ( x ) = − 8 x x 2 + 4 Calculation: Consider the function f ( x ) = − 8 x x 2 + 4 , To find the y-intercept, put x = 0 in given function. ⇒ f ( 0 ) = − 0 0 + 4 = 0 So, the y-intercept is (0, 0). To find the x-intercept, put f ( x ) = y = 0 in given function. ⇒ 0 = − 8 x x 2 + 4 ⇒ 0 = − 8 x ⇒ 0 = x ⇒ x = 0 So, the x- intercept is (0, 0). Conclusion: Therefore, the x-intercept is (0, 0) and y-intercept is (0, 0). c. To determine To find the asymptotes to the function f ( x ) = − 8 x x 2 + 4 . Answer y = 0 Explanation Given: Function: f ( x ) = − 8 x x 2 + 4 Calculation: Asymptotes: Vertical asymptotes: To find vertical asymptotes, put denominator of the given function equal to zero. ⇒ x 2 + 4 = 0 ⇒ x 2 = − 4 → Roots does not exist So, there are no vertical asymptotes for given function. Horizontal asymptotes: As the degree of numerator is smaller than the degree of the denominator, the horizontal asymptote for given function is y = 0. Conclusion: Therefore, the horizontal asymptote is y = 0. d. To determine To sketch the function f ( x ) = − 8 x x 2 + 4 . Explanation Given: Function: f ( x ) = − 8 x x 2 + 4 Calculation for graph: Consider f ( x ) = − 8 x x 2 + 4 Values of x Values of f (x) 0 0 1 -1.6 -1 1.6 2 -2 -2 2 By taking different values of x, the graph can be plotted. Graph: Interpretation: The above graph represents the sketch of given function.

4th Edition

ISBN: 9781337516853

Author: Larson

Publisher: CENGAGE CO

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Question

Chapter 2, Problem 54RE

To determine

To calculate the domain of the function f(x)=−8xx2+4 .

Expert Solution

Answer to Problem 54RE

(−∞,∞)

Explanation of Solution

Given:

Function: f(x)=−8xx2+4

Concept used:

The domain of the function is the set of values, where the function is defined.

Calculation:

Now, finding the domain of the function,

Here, the function is defined for any value of x.

So, the domain of the function is R or (−∞,∞).

Conclusion:

Hence, the domain of the function is (−∞,∞) .

To determine

To find the intercepts of the function f(x)=−8xx2+4 .

Expert Solution

Answer to Problem 54RE

(0, 0), (0, 0)

Explanation of Solution

Given:

Function: f(x)=−8xx2+4

Calculation:

Consider the function f(x)=−8xx2+4 ,

To find the y-intercept, put x=0 in given function.

⇒f(0)=−00+4=0

So, the y-intercept is (0, 0).

To find the x-intercept, put f(x)=y=0 in given function.

⇒0=−8xx2+4⇒0=−8x⇒0=x⇒x=0

So, the x- intercept is (0, 0).

Conclusion:

Therefore, the x-intercept is (0, 0) and y-intercept is (0, 0).

To determine

To find the asymptotes to the function f(x)=−8xx2+4 .

Expert Solution

Answer to Problem 54RE

y=0

Explanation of Solution

Given:

Function: f(x)=−8xx2+4

Calculation:

Asymptotes:

Vertical asymptotes:

To find vertical asymptotes, put denominator of the given function equal to zero.

⇒x2+4=0⇒x2=−4→Roots does not exist

So, there are no vertical asymptotes for given function.

Horizontal asymptotes:

As the degree of numerator is smaller than the degree of the denominator, the horizontal asymptote for given function is y=0.

Conclusion:

Therefore, the horizontal asymptote is y = 0.

To determine

To sketch the function f(x)=−8xx2+4 .

Expert Solution

Explanation of Solution

Given:

Function: f(x)=−8xx2+4

Calculation for graph:

Consider f(x)=−8xx2+4

Values of x	Values of f (x)
0	0
1	-1.6
-1	1.6
2	-2
-2	2

By taking different values of x, the graph can be plotted.

Graph:

EBK PRECALCULUS W/LIMITS, Chapter 2, Problem 54RE

Interpretation:

The above graph represents the sketch of given function.

Chapter 2, Problem 53RE

Chapter 2, Problem 55RE

Chapter 2 Solutions

EBK PRECALCULUS W/LIMITS

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Prob. 64E Ch. 2.6 - Prob. 65E Ch. 2.6 - Prob. 66E Ch. 2.6 - Prob. 67E Ch. 2.6 - Prob. 68E Ch. 2.6 - Prob. 69E Ch. 2.6 - Prob. 70E Ch. 2.6 - Prob. 71E Ch. 2.6 - Prob. 72E Ch. 2.6 - Prob. 73E Ch. 2.6 - Prob. 74E Ch. 2.6 - Prob. 75E Ch. 2.6 - Prob. 76E Ch. 2.6 - Prob. 77E Ch. 2.6 - Prob. 78E Ch. 2.6 - Prob. 79E Ch. 2.6 - Prob. 80E Ch. 2.6 - Prob. 81E Ch. 2.6 - Prob. 82E Ch. 2.7 - Prob. 1E Ch. 2.7 - Prob. 2E Ch. 2.7 - Prob. 3E Ch. 2.7 - Prob. 4E Ch. 2.7 - Prob. 5E Ch. 2.7 - Prob. 6E Ch. 2.7 - Prob. 7E Ch. 2.7 - Prob. 8E Ch. 2.7 - Prob. 9E Ch. 2.7 - Prob. 10E Ch. 2.7 - Prob. 11E Ch. 2.7 - Prob. 12E Ch. 2.7 - Prob. 13E Ch. 2.7 - Prob. 14E Ch. 2.7 - Prob. 15E Ch. 2.7 - Prob. 16E Ch. 2.7 - Prob. 17E Ch. 2.7 - Prob. 18E Ch. 2.7 - Prob. 19E Ch. 2.7 - Prob. 20E Ch. 2.7 - Prob. 21E Ch. 2.7 - Prob. 22E Ch. 2.7 - Prob. 23E Ch. 2.7 - Prob. 24E Ch. 2.7 - Prob. 25E Ch. 2.7 - Prob. 26E Ch. 2.7 - Prob. 27E Ch. 2.7 - Prob. 28E Ch. 2.7 - Prob. 29E Ch. 2.7 - Prob. 30E Ch. 2.7 - Prob. 31E Ch. 2.7 - Prob. 32E Ch. 2.7 - Prob. 33E Ch. 2.7 - Prob. 34E Ch. 2.7 - Prob. 35E Ch. 2.7 - Prob. 36E Ch. 2.7 - Prob. 37E Ch. 2.7 - Prob. 38E Ch. 2.7 - Prob. 39E Ch. 2.7 - Prob. 40E Ch. 2.7 - Prob. 41E Ch. 2.7 - Prob. 42E Ch. 2.7 - Prob. 43E Ch. 2.7 - Prob. 44E Ch. 2.7 - Prob. 45E Ch. 2.7 - Prob. 46E Ch. 2.7 - Prob. 47E Ch. 2.7 - Prob. 48E Ch. 2.7 - Prob. 49E Ch. 2.7 - Prob. 50E Ch. 2.7 - Prob. 51E Ch. 2.7 - Prob. 52E Ch. 2.7 - Prob. 53E Ch. 2.7 - Prob. 54E Ch. 2.7 - Prob. 55E Ch. 2.7 - Prob. 56E Ch. 2.7 - Prob. 57E Ch. 2.7 - Prob. 58E Ch. 2.7 - Prob. 59E Ch. 2.7 - Prob. 60E Ch. 2.7 - Prob. 61E Ch. 2.7 - Prob. 62E Ch. 2.7 - Prob. 63E Ch. 2.7 - Prob. 64E Ch. 2.7 - Prob. 65E Ch. 2.7 - Prob. 66E Ch. 2.7 - Prob. 67E Ch. 2.7 - Prob. 68E Ch. 2.7 - Prob. 69E Ch. 2.7 - Prob. 70E Ch. 2.7 - Prob. 71E Ch. 2.7 - Prob. 72E Ch. 2.7 - Prob. 73E Ch. 2.7 - Prob. 74E Ch. 2.7 - Prob. 75E Ch. 2.7 - Prob. 76E Ch. 2.7 - Prob. 77E Ch. 2.7 - Prob. 78E Ch. 2.7 - Prob. 79E Ch. 2.7 - Prob. 80E Ch. 2.7 - Prob. 81E Ch. 2.7 - Prob. 82E Ch. 2.7 - Prob. 83E Ch. 2.7 - Prob. 84E Ch. 2.7 - Prob. 85E Ch. 2.7 - Prob. 86E Ch. 2.7 - Prob. 87E Ch. 2.7 - Prob. 88E Ch. 2.7 - Prob. 89E Ch. 2.7 - Prob. 90E Ch. 2 - Prob. 1RE Ch. 2 - Prob. 2RE Ch. 2 - Prob. 3RE Ch. 2 - Prob. 4RE Ch. 2 - Prob. 5RE Ch. 2 - Prob. 6RE Ch. 2 - Prob. 7RE Ch. 2 - Prob. 8RE Ch. 2 - Prob. 9RE Ch. 2 - Prob. 10RE Ch. 2 - Prob. 11RE Ch. 2 - Prob. 12RE Ch. 2 - Prob. 13RE Ch. 2 - Prob. 14RE Ch. 2 - Prob. 15RE Ch. 2 - Prob. 16RE Ch. 2 - Prob. 17RE Ch. 2 - Prob. 18RE Ch. 2 - Prob. 19RE Ch. 2 - Prob. 20RE Ch. 2 - Prob. 21RE Ch. 2 - Prob. 22RE Ch. 2 - Prob. 23RE Ch. 2 - Prob. 24RE Ch. 2 - Prob. 25RE Ch. 2 - Prob. 26RE Ch. 2 - Prob. 27RE Ch. 2 - Prob. 28RE Ch. 2 - Prob. 29RE Ch. 2 - Prob. 30RE Ch. 2 - Prob. 31RE Ch. 2 - Prob. 32RE Ch. 2 - Prob. 33RE Ch. 2 - Prob. 34RE Ch. 2 - Prob. 35RE Ch. 2 - Prob. 36RE Ch. 2 - Prob. 37RE Ch. 2 - Prob. 38RE Ch. 2 - Prob. 39RE Ch. 2 - Prob. 40RE Ch. 2 - Prob. 41RE Ch. 2 - Prob. 42RE Ch. 2 - Prob. 43RE Ch. 2 - Prob. 44RE Ch. 2 - Prob. 45RE Ch. 2 - Prob. 46RE Ch. 2 - Prob. 47RE Ch. 2 - Prob. 48RE Ch. 2 - Prob. 49RE Ch. 2 - Prob. 50RE Ch. 2 - Prob. 51RE Ch. 2 - Prob. 52RE Ch. 2 - Prob. 53RE Ch. 2 - Prob. 54RE Ch. 2 - Prob. 55RE Ch. 2 - Prob. 56RE Ch. 2 - Prob. 57RE Ch. 2 - Prob. 58RE Ch. 2 - Prob. 59RE Ch. 2 - Prob. 60RE Ch. 2 - Prob. 61RE Ch. 2 - Prob. 62RE Ch. 2 - Prob. 63RE Ch. 2 - Prob. 64RE Ch. 2 - Prob. 65RE Ch. 2 - Prob. 66RE Ch. 2 - Prob. 67RE Ch. 2 - Prob. 68RE Ch. 2 - Prob. 1CT Ch. 2 - Prob. 2CT Ch. 2 - Prob. 3CT Ch. 2 - Prob. 4CT Ch. 2 - Prob. 5CT Ch. 2 - Prob. 6CT Ch. 2 - Prob. 7CT Ch. 2 - Prob. 8CT Ch. 2 - Prob. 9CT Ch. 2 - Prob. 10CT Ch. 2 - Prob. 11CT Ch. 2 - Prob. 12CT Ch. 2 - Prob. 13CT Ch. 2 - Prob. 14CT Ch. 2 - Prob. 15CT Ch. 2 - Prob. 16CT Ch. 2 - Prob. 17CT Ch. 2 - Prob. 18CT Ch. 2 - Prob. 1PS Ch. 2 - Prob. 2PS Ch. 2 - Prob. 3PS Ch. 2 - Prob. 4PS Ch. 2 - Prob. 5PS Ch. 2 - Prob. 6PS Ch. 2 - Prob. 7PS Ch. 2 - Prob. 8PS Ch. 2 - Prob. 9PS Ch. 2 - Prob. 10PS Ch. 2 - Prob. 11PS Ch. 2 - Prob. 12PS Ch. 2 - Prob. 13PS

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