SCENARIO 12-12
The manager of the purchasing department of a large saving and loan organization would like to develop a model to predict the amount of time (measured in hours) it takes to record a loan
application.Data are collected from a sample of 30 days, and the number of applications recorded and completion time in hours is recorded.Below is the regression output: \[\begin{array}{l}
\begin{array} { l r }
\hline { \text { Regression Statistics } } \
\hline \text { Multiple R } & 0.9447 \
\text { R Square } & 0.8924 \
\text { Adjusted R } & 0.8886 \
\text { Square } & \
\text { Standard } & 0.3342 \
\text { Error } & \
\text { Observations } & 30 \
\hline
\end{array}\
\text { ANOVA }\
\begin{array} { l r r r r r }
\hline & { \text { df } } & { \text { SS } } & { \text { MS } } & \text { F } & \text { Significance } F \
\hline \text { Regression } & 1 & 25.9438 & 25.9438 & 232.2200 & 4.3946 \mathrm { E } - 15 \
\text { Residual } & 28 & 3.1282 & 0.1117 & & \
\text { Total } & 29 & 29.072 & & & \
\hline
\end{array}\
\begin{array} { l r r r r r r }
\hline & \text { Coefficients } & \text { Standard Error } & t \text { Stat } & \text { P-value } & \text { Lower 95\% } & \text { Upper 95\% } \
\hline \text { Intercept } & 0.4024 & 0.1236 & 3.2559 & 0.0030 & 0.1492 & 0.6555 \
\text { Applications } & 0.0126 & 0.0008 & 15.2388 & 0.0000 & 0.0109 & 0.0143 \
\text { Recorded } & & & & & & \
\hline
\end{array}
\end{array}\] 12-46 Simple Linear Regression Simple Linear Regression 12-47
-Referring to Scenario 12-12, there is sufficient evidence that the amount of time needed linearly depends on the number of loan applications at a 5% level of significance.

Question

SCENARIO 12-12
The manager of the purchasing department of a large saving and loan organization would like to develop a model to predict the amount of time (measured in hours) it takes to record a loan
application.Data are collected from a sample of 30 days, and the number of applications recorded and completion time in hours is recorded.Below is the regression output: \[\begin{array}{l}
\begin{array} { l r } 
\hline  { \text { Regression Statistics } } \
\hline \text { Multiple R } & 0.9447 \
\text { R Square } & 0.8924 \
\text { Adjusted R } & 0.8886 \
\text { Square } & \
\text { Standard } & 0.3342 \
\text { Error } & \
\text { Observations } & 30 \
\hline
\end{array}\
\text { ANOVA }\
\begin{array} { l r r r r r } 
\hline & { \text { df } } & { \text { SS } } & { \text { MS } } & \text { F } & \text { Significance } F \
\hline \text { Regression } & 1 & 25.9438 & 25.9438 & 232.2200 & 4.3946 \mathrm { E } - 15 \
\text { Residual } & 28 & 3.1282 & 0.1117 & & \
\text { Total } & 29 & 29.072 & & & \
\hline
\end{array}\
\begin{array} { l r r r r r r } 
\hline & \text { Coefficients } & \text { Standard Error } & t \text { Stat } & \text { P-value } & \text { Lower 95\% } & \text { Upper 95\% } \
\hline \text { Intercept } & 0.4024 & 0.1236 & 3.2559 & 0.0030 & 0.1492 & 0.6555 \
\text { Applications } & 0.0126 & 0.0008 & 15.2388 & 0.0000 & 0.0109 & 0.0143 \
\text { Recorded } & & & & & & \
\hline
\end{array}
\end{array}\] 12-46 Simple Linear Regression  Simple Linear Regression 12-47
-Referring to Scenario 12-12, there is sufficient evidence that the amount of time needed linearly depends on the number of loan applications at a 5% level of significance.

Quizplus · Accepted Answer

In Scenario 12-12, if the p-value associated with the slope coefficient of a simple linear regression model (where the dependent variable is the amount of time needed and the independent variable is the number of loan applications) is less than 0.05, it indicates that there is sufficient evidence at the 5% level of significance to conclude that there is a linear dependency between the amount of time needed and the number of loan applications.

SCENARIO 12-12 the Manager of the Purchasing Department of a Large

SCENARIO 12-12
the Manager of the Purchasing Department of a Large