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Jadacki CRN: 40447
Rahban Gebremedhin
07/28/24 11:16 PM
Question 11, 3.3.93-BE
HW Score: [tex]$82.87\%$[/tex], 20.72 of 25 points
Pertad5
Points: 0 of 1
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The total sales [tex]\( S \)[/tex] (in thousands of DVDs) of a certain movie are given by the following formula where [tex]\( t \)[/tex] is the number of months since the release of the DVD. Use the formula to answer the questions.

[tex]\[
S(t) = \frac{40t^2}{t^2 + 150}
\][/tex]

a) Find [tex]\( S'(t) \)[/tex].

[tex]\[
S'(t) = \frac{-80t^3}{(t^2 + 150)^2} + \frac{80t}{(t^2 + 150)}
\][/tex]

b) Find [tex]\( S(10) \)[/tex] and [tex]\( S'(10) \)[/tex].

The value of [tex]\( S(10) \)[/tex] rounded to the nearest hundredth is 16.0.
The value of [tex]\( S'(10) \)[/tex] rounded to the nearest hundredth is 1.92.

What do the values for [tex]\( S(10) \)[/tex] and [tex]\( S'(10) \)[/tex] indicate?

A. After 10 months, the total sales are 19,200 DVDs and the sales are increasing at the rate of 1600 DVDs per month.
B. After 10 months, the total sales are 1920 DVDs and the sales are increasing at the rate of 16 DVDs per month.
C. After 10 months, the total sales are 16,000 DVDs and the sales are increasing at the rate of 1.92 DVDs per month.
D. After 10 months, the total sales are 16,000 DVDs and the sales are increasing at the rate of 1920 DVDs per month.

Sagot :

GinnyAnsweridn
Let's analyze the given problem step by step:

### Given:
The total sales function [tex]\( S(t) \)[/tex] (in thousands of DVDs) is described by:
[tex]\[ S(t) = \frac{40 t^2}{t^2 + 150} \][/tex]

### Part (a): Finding the derivative [tex]\( S'(t) \)[/tex]

We are given the derivative:
[tex]\[ S'(t) = \frac{-80 t^3}{(t^2 + 150)^2} + \frac{80 t}{t^2 + 150} \][/tex]

### Part (b): Finding [tex]\( S(10) \)[/tex] and [tex]\( S'(10) \)[/tex]

Substitute [tex]\( t = 10 \)[/tex] into the original function [tex]\( S(t) \)[/tex]:
[tex]\[ S(10) = \frac{40 \cdot 10^2}{10^2 + 150} = \frac{40 \cdot 100}{100 + 150} = \frac{4000}{250} = 16.0 \, \text{(in thousands of DVDs)} \][/tex]

Then, substitute [tex]\( t = 10 \)[/tex] into the derivative [tex]\( S'(t) \)[/tex]:
[tex]\[ S'(10) = \frac{-80 \cdot 10^3}{(10^2 + 150)^2} + \frac{80 \cdot 10}{10^2 + 150} = \frac{-80 \cdot 1000}{(100 + 150)^2} + \frac{800}{250} = \frac{-80000}{62500} + \frac{800}{250} \][/tex]
Calculating the above expressions step-by-step:
[tex]\[ \frac{-80000}{62500} = -1.28 \][/tex]
[tex]\[ \frac{800}{250} = 3.20 \][/tex]
Combining these together:
[tex]\[ S'(10) = -1.28 + 3.20 = 1.92 \, \text{(in thousands of DVDs per month)} \][/tex]

### Interpretation of the values:

- [tex]\( S(10) = 16.0 \)[/tex] thousand DVDs means that after 10 months, the total sales are:
[tex]\[ 16.0 \times 1000 = 16000 \][/tex] DVDs
- [tex]\( S'(10) = 1.92 \)[/tex] thousand DVDs per month means the rate at which sales are increasing after 10 months is:
[tex]\[ 1.92 \times 1000 = 1920 \][/tex] DVDs per month

### Choosing the correct interpretation:
From the given choices:
- A: Incorrect, the total sales after 10 months are not 19,200 DVDs.
- B: Incorrect, the total sales after 10 months are not 1,920 DVDs, and the rate of increase is not 16 DVDs per month.
- C: Incorrect, the total sales are correct at 16,000 DVDs, but the rate of increase is not 1.92 DVDs per month.
- D: Correct, after 10 months, the total sales are 16,000 DVDs, and the sales are increasing at the rate of 1920 DVDs per month.

Thus, the correct interpretation of the values is:
[tex]\[ \text{D. After 10 months, the total sales are 16,000 DVDs and the sales are increasing at the rate of 1920 DVDs per month.} \][/tex]
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