TABLE 14-12
A weight-loss clinic wants to use regression analysis to build a model for weight-loss of a client (measured in pounds). Two variables thought to affect weight-loss are client's length of time on the weight loss program and time of session. These variables are described below:
Y = Weight- loss (in pounds)
X 1 = Length of time in weight-loss program (in months)
X 2 = 1 if morning session, 0 if not
X 3 = 1 if afternoon session, 0 if not (Base level = evening session)
Data for 12 clients on a weight- loss program at the clinic were collected and used to fit the interaction model:
$ Y=\beta_{0}+\beta_{1} X_{1}+\beta_{2} X_{2}+\beta_{3} X_{3}+\beta_{4} X_{1} X_{2}+\beta_{5} X_{1} X_{3}+\varepsilon $
Partial output from Microsoft Excel follows:
$$\begin{array}{l}
\text { Regression Statistics }\
\begin{array} { l c }
\hline \text { Multiple R } & 0.73514 \
\text { R Square } & 0.540438 \
\text { Adjusted R Square } & 0.157469 \
\text { Standard Error } & 12.4147 \
\text { Observations } & 12 \
\hline
\end{array}
\end{array}$$

ANOVA
$F = 5.41118 \quad\text { Significance } F = 0.040201$

$\begin{array}{lcccr}
\hline & \text {Coefficients }& \text { Standard Error }& \text { t Stat }& \text { p -value} \
\hline \text {Intercept }& 0.089744 & 14.127 & 0.0060 & 0.9951 \
\text {Length (X1)}& 6.22538 & 2.43473 & 2.54956 & 0.0479 \
\text {Morn Ses (X2)}& 2.217272 & 22.1416 & 0.100141 & 0.9235 \
\text {Aft Ses (X3)} & 11.8233 & 3.1545 & 3.558901 & 0.0165 \
\text {Length*Morn Ses} & 0.77058 & 3.562 & 0.216334 & 0.8359 \
\text {Length * Aft Ses} & -0.54147 & 3.35988 & -0.161158 & 0.8773 \
\hline
\end{array}$
-Referring to Table 14-12, the overall model for predicting weight-loss (Y) is statistically significant at the 0.05 level.

Question

TABLE 14-12 
 A weight-loss clinic wants to use regression analysis to build a model for weight-loss of a client (measured in pounds). Two variables thought to affect weight-loss are client's length of time on the weight loss program and time of session. These variables are described below:
Y = Weight- loss (in pounds)
 X 1 = Length of time in weight-loss program (in months) 
X 2 = 1 if morning session, 0 if not 
 X 3 = 1 if afternoon session, 0  if  not (Base level = evening  session) 
Data for 12 clients on a weight- loss program at the clinic were collected and used to fit the interaction model:
$ Y=\beta_{0}+\beta_{1} X_{1}+\beta_{2} X_{2}+\beta_{3} X_{3}+\beta_{4} X_{1} X_{2}+\beta_{5} X_{1} X_{3}+\varepsilon $
Partial output from Microsoft Excel follows:
  $$\begin{array}{l}
\text { Regression Statistics }\
\begin{array} { l c } 
\hline \text { Multiple R } & 0.73514 \
\text { R Square } & 0.540438 \
\text { Adjusted R Square } & 0.157469 \
\text { Standard Error } & 12.4147 \
\text { Observations } & 12 \
\hline
\end{array}
\end{array}$$

ANOVA
$F = 5.41118 \quad\text { Significance } F = 0.040201$

$\begin{array}{lcccr}
\hline &  \text {Coefficients }& \text { Standard Error }& \text { t  Stat }&  \text { p -value} \
\hline \text {Intercept }& 0.089744 & 14.127 & 0.0060 & 0.9951 \
 \text {Length (X1)}& 6.22538 & 2.43473 & 2.54956 & 0.0479 \
 \text {Morn Ses (X2)}& 2.217272 & 22.1416 & 0.100141 & 0.9235 \
 \text {Aft Ses (X3)} & 11.8233 & 3.1545 & 3.558901 & 0.0165 \
 \text {Length*Morn Ses} & 0.77058 & 3.562 & 0.216334 & 0.8359 \
 \text {Length * Aft Ses} & -0.54147 & 3.35988 & -0.161158 & 0.8773 \
\hline
\end{array}$
-Referring to Table 14-12, the overall model for predicting weight-loss (Y) is statistically significant at the 0.05 level.

Quizplus · Accepted Answer

The overall model is statistically significant at the 0.05 level because the Significance F value is 0.040201, which is less than 0.05.

TABLE 14-12 a Weight-Loss Clinic Wants to Use Y=β0+β1X1+β2X2+β3X3+β4X1X2+β5X1X3+ε Y=\beta_{0}+\beta_{1} X_{1}+\beta_{2} X_{2}+\beta_{3} X_{3}+\beta_{4} X_{1} X_{2}+\beta_{5} X_{1} X_{3}+\varepsilon Y=β0​+β1​X1​+β2​X2​+β3​X3​+β4​X1​X2​+β5​X1​X3​+ε

TABLE 14-12
a Weight-Loss Clinic Wants to Use $Y=\beta_{0}+\beta_{1} X_{1}+\beta_{2} X_{2}+\beta_{3} X_{3}+\beta_{4} X_{1} X_{2}+\beta_{5} X_{1} X_{3}+\varepsilon$