Instruction 12.17
A computer software developer would like to use the number of downloads (in thousands) for the trial version of his new shareware to predict the amount of revenue (in thousands of dollars) he can make on the full version of the new shareware. Following is the output from a simple linear regression along with the residual plot and normal probability plot obtained from a data set of 30 different sharewares that he has developed:
$\text { Regression statistics }$
$\begin{array}{|l|l|}
\hline \text { MultipleR } & 0.8691 \
\hline \text { R Square } & 0.7554 \
\hline \begin{array}{l}
\text { Adjusted R } \
\text { Square }
\end{array} & 0.7467 \
\hline \text { Standard Error } & 44.4765 \
\hline \text { Observations } & 30.0000\
\hline
\end{array}$

$\text { ANOVA }$
$\begin{array}{|l|l|l|l|l|l|}
\hline & d f & S S & M S & F & \begin{array}{l}
\text { Significance } \
F
\end{array} \
\hline \text { Regression } & 1 & 171062.9193 & 171062.9193 & 86.4759 & 0.0000 \
\hline \text { Residual } & 28 & 55388.4309 & 1978.1582 & & \
\hline \text { Total } & 29 & 226451.3503 & & & \
\hline
\end{array}$

$\begin{array}{|l|l|l|l|l|l|l|}
\hline & \text { Coefficients } & \begin{array}{l}
\text { Standard } \
\text { Error }
\end{array} & \text { t Stat } & p \text {-value } & \text { Lower 95\% } & \text { Upper 95\% } \
\hline \text { Intercept } & -95.0614 & 26.9183 & -3.5315 & 0.0015 & -150.2009 & -39.9218 \
\hline \text { Download } & 3.7297 & 0.4011 & 9.2992 & 0.0000 & 2.9082 & 4.5513 \
\hline
\end{array}$

-Referring to Instruction 12.17,which of the following is the correct interpretation for the coefficient of determination?
A) 74.67% of the variation in revenue can be explained by the variation in the number of downloads.
B) 75.54% of the variation in revenue can be explained by the variation in the number of downloads.
C) 75.54% of the variation in the number of downloads can be explained by the variation in revenue.
D) 74.67% of the variation in the number of downloads can be explained by the variation in revenue.

Question

Instruction 12.17
A computer software developer would like to use the number of downloads (in thousands) for the trial version of his new shareware to predict the amount of revenue (in thousands of dollars) he can make on the full version of the new shareware. Following is the output from a simple linear regression along with the residual plot and normal probability plot obtained from a data set of 30 different sharewares that he has developed:
 $\text { Regression statistics }$
$\begin{array}{|l|l|}
\hline \text { MultipleR } & 0.8691 \
\hline \text { R Square } & 0.7554 \
\hline \begin{array}{l}
\text { Adjusted R } \
\text { Square }
\end{array} & 0.7467 \
\hline \text { Standard Error } & 44.4765 \
\hline \text { Observations } & 30.0000\
\hline 
\end{array}$

$\text { ANOVA }$
$\begin{array}{|l|l|l|l|l|l|}
\hline & d f & S S & M S & F & \begin{array}{l}
\text { Significance } \
F
\end{array} \
\hline \text { Regression } & 1 & 171062.9193 & 171062.9193 & 86.4759 & 0.0000 \
\hline \text { Residual } & 28 & 55388.4309 & 1978.1582 & & \
\hline \text { Total } & 29 & 226451.3503 & & & \
\hline
\end{array}$

$\begin{array}{|l|l|l|l|l|l|l|}
\hline & \text { Coefficients } & \begin{array}{l}
\text { Standard } \
\text { Error }
\end{array} & \text { t Stat } & p \text {-value } & \text { Lower 95\% } & \text { Upper 95\% } \
\hline \text { Intercept } & -95.0614 & 26.9183 & -3.5315 & 0.0015 & -150.2009 & -39.9218 \
\hline \text { Download } & 3.7297 & 0.4011 & 9.2992 & 0.0000 & 2.9082 & 4.5513 \
\hline
\end{array}$
  
-Referring to Instruction 12.17,which of the following is the correct interpretation for the coefficient of determination?
A) 74.67% of the variation in revenue can be explained by the variation in the number of downloads. 
B) 75.54% of the variation in revenue can be explained by the variation in the number of downloads. 
C) 75.54% of the variation in the number of downloads can be explained by the variation in revenue. 
D) 74.67% of the variation in the number of downloads can be explained by the variation in revenue.

Quizplus · Accepted Answer

The coefficient of determination is a measure of the proportion of variation in the dependent variable (revenue) that is explained by the independent variable (number of downloads). Given that the coefficient of determination is 0.7554, we can interpret this as 75.54% of the variation in revenue can be explained by the variation in the number of downloads. Therefore, the correct answer is option B.

Instruction 12 Regression statistics \text { Regression statistics } Regression statistics ANOVA \text { ANOVA } ANOVA

Instruction 12 $\text { Regression statistics }$ $\text { ANOVA }$