(a) Explanation Given information: The options are: A) S ( x ) = C − 133 e − 0.0131 x B) S ( x ) = C + 133 e − 0.0131 x C) S ( x ) = C + 133 e 0.0131 x D) S ( x ) = C − 133 e 0.0131 x In the graph the math SAT score is increasing to the limit of 500 s exponentially, over the intervals representing family household income. Consider the function B, In the graph, the average rate of change in SAT score over the interval is decreasing with respect to house hold income up to the limit of C , such as the average rate of change of e − x = − e − x and the result is subtracted from the constant C. Hence, option B, is not correct (b) To determine The prediction for the effect on the math SAT score of the student if the income of parents earning $ 45000 is increased by a $ 1000 using S ′ ( x ) Where S ( x ) is the average math SAT score of students with household income x in thousand dollars per year. (c) To determine Whether S ′ ( x ) is increasing or decreasing as x increases and also interpret the result if S ( x ) is the average math SAT score of students with household income x in thousand dollars per year and the graph shows math SAT scores as a function of household income where C is a constant.

7th Edition

ISBN: 9781337291248

Author: Waner, Stefan.

Publisher: Cengage Learning,

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Chapter 4.5, Problem 97E

(a)

To determine

The correct option that models the data in the graph showing math SAT scores as a function of household income where C is a constant out of the following options.

A) S(x)=C−133e−0.0131x

B) S(x)=C+133e−0.0131x

C) S(x)=C+133e0.0131x

D) S(x)=C−133e0.0131x

Where S(x) is the average math SAT score of students with household income x in thousand dollars per year.

(b)

To determine

The prediction for the effect on the math SAT score of the student if the income of parents earning $45000 is increased by a $1000 using S′(x) Where S(x) is the average math SAT score of students with household income x in thousand dollars per year.

(c)

To determine

Whether S′(x) is increasing or decreasing as x increases and also interpret the result if S(x) is the average math SAT score of students with household income x in thousand dollars per year and the graph shows math SAT scores as a function of household income where C is a constant.

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Chapter 4.5, Problem 96E

Chapter 4.5, Problem 98E

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Solution Summary: The author explains that the function S(x)=C-133e-0.0131x models the data in the graph showing math SAT scores as a function of household income.

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The prediction for the effect on the math SAT score of the student if the income of parents earning $45000 is increased by a $1000 using S′(x) Where S(x) is the average math SAT score of students with household income x in thousand dollars per year.

Whether S′(x) is increasing or decreasing as x increases and also interpret the result if S(x) is the average math SAT score of students with household income x in thousand dollars per year and the graph shows math SAT scores as a function of household income where C is a constant.

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