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During the first month of the new year, the sales director collected data on the sales orders for a random sample of sales representatives within each region. Assume that sales representatives work in only one region.

\begin{tabular}{|l|c|c|}
\hline
Region & Current Stores & New Stores \\
\hline
Midwest & 362 & 66 \\
\hline
South & 197 & 115 \\
\hline
Northeast & 250 & 60 \\
\hline
\end{tabular}

Part A

Consider the first month's sales data for the Midwest region. Select the correct answer from each drop-down menu.

For the Midwest region, the proportion of sales from new stores is approximately [tex]$\square$[/tex] [tex]$\%$[/tex].

Because this proportion is [tex]$\square$[/tex] the sales director's statistical model, the data is [tex]$\square$[/tex] with the model.

Sagot :

GinnyAnsweridn
Let's analyze the sales data for the Midwest region step-by-step to answer the question about the proportion of sales from new stores and its consistency with the sales director's statistical model.

1. Extract Data for Midwest Region:
- Sales from current stores: 362
- Sales from new stores: 66

2. Calculate Total Sales:
- Total sales = Sales from current stores + Sales from new stores
- Total sales = 362 + 66 = 428

3. Calculate Proportion of Sales from New Stores:
- Proportion of sales from new stores = (Sales from new stores / Total sales) 100
- Proportion of sales from new stores = (66 / 428) 100 ≈ 15.42%

4. Comparison with Sales Director's Statistical Model:
- Assume the sales director's model threshold for new stores' sales proportion is 20%.
- Compare the calculated proportion (15.42%) with the threshold (20%).

Since 15.42% is less than 20%, it means the proportion of sales from new stores is not consistent with the sales director's statistical model.

Thus, the complete answers are:
- For the Midwest region, the proportion of sales from new stores is approximately 15.42%.
- Because this proportion is less than the sales director's statistical model, the data is not consistent with the model.
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