As part of a study at a large university, data were collected on $n = 224$ freshmen computer science (CS) majors in a particular year. The researchers were interested in modeling $y$, a student's grade point average (GPA) after three semesters, as a function of the following independent variables (recorded at the time the students enrolled in the university):
$x _ { 1 } =$ average high school grade in mathematics (HSM)
$x _ { 2 } =$ average high school grade in science (HSS)
$x _ { 3 } =$ average high school grade in English (HSE)
$x _ { 4 } =$ SAT mathematics score (SATM)
$x _ { 5 } =$ SAT verbal score (SATV)

A first-order model was fit to data with the following results:

$\begin{array}{lrrrrr}
\hline \text { SOURCE } & \text { DF } & \text { SS } & \text { MS } & \text { F VALUE } & \text { PROB F } \
\text { MODEL } & 5 & 28.64 & 5.73 & 11.69 & .0001 \
\text { ERROR } & 218 & 106.82 & 0.49 & & \
\text { TOTAL } & 223 & 135.46 & & &
\end{array}$

$\begin{array}{lccc}
\text { ROOT MSE } & 0.700 & \text { R-SQUARE } & 0.211 \
\text { DEP MEAN } & 4.635 & \text { ADJR-SQ } & 0.193
\end{array}$
$\begin{array}{l}
\begin{array} { l r r r r }
& \text {PARAMETER }& \text {STANDARD}& \text {T FOR 0:}\
\text {VARIABLES}&\text { ESTIMATE } & \text { ERROR } & \text { PARAMETER } = 0 & \text { PROB } | T | \
\
\text { INTERCEPT } & 2.327 & 0.039 & 5.817 & 0.0001 \
\text { X1 (HSM) } & 0.146 & 0.037 & 3.718 & 0.0003 \
\text { X2 (HSS) } & 0.036 & 0.038 & 0.950 & 0.3432 \
\text { X3 (HSE) } & 0.055 & 0.040 & 1.397 & 0.1637 \
\text { X4 (SATM) } & 0.00094 & 0.00068 & 1.376 & 0.1702 \
\text { X5 (SATV) } & - 0.00041 & 0.00059 & - 0.689 & 0.4915 \
\hline
\end{array}
\end{array}$

Interpret the value under the column heading $P R O B F$.

A) Accept $H _ { 0 }$ (at $\alpha = .01$ ); at least one of the $\beta$-coefficients in the first-order model is equal to 0 .
B) Over $99 \%$ of the variation in GPAs can be explained by the model.
C) There is insufficient evidence (at $\alpha = .01$ ) to conclude that the first-order model is statistically useful for predicting GPA.
D) There is sufficient evidence (at $\alpha = .01$ ) to conclude that the first-order model is statistically useful for predicting GPA.

Question

As part of a study at a large university, data were collected on $n = 224$ freshmen computer science (CS) majors in a particular year. The researchers were interested in modeling $y$, a student's grade point average (GPA) after three semesters, as a function of the following independent variables (recorded at the time the students enrolled in the university):
$x _ { 1 } =$ average high school grade in mathematics (HSM)
$x _ { 2 } =$ average high school grade in science (HSS)
$x _ { 3 } =$ average high school grade in English (HSE)
$x _ { 4 } =$ SAT mathematics score (SATM)
$x _ { 5 } =$ SAT verbal score (SATV)

A first-order model was fit to data with the following results:

$\begin{array}{lrrrrr}
\hline \text { SOURCE } & \text { DF } & \text { SS } & \text { MS } & \text { F VALUE } & \text { PROB > F } \
\text { MODEL } & 5 & 28.64 & 5.73 & 11.69 & .0001 \
\text { ERROR } & 218 & 106.82 & 0.49 & & \
\text { TOTAL } & 223 & 135.46 & & &
\end{array}$

$\begin{array}{lccc}
\text { ROOT MSE } & 0.700 & \text { R-SQUARE } & 0.211 \
\text { DEP MEAN } & 4.635 & \text { ADJR-SQ } & 0.193
\end{array}$
 $\begin{array}{l}
\begin{array} { l r r r r } 
& \text {PARAMETER }& \text {STANDARD}& \text {T FOR 0:}\
 \text {VARIABLES}&\text { ESTIMATE } & \text { ERROR } & \text { PARAMETER } = 0 & \text { PROB } > | T |  \ 
\
\text { INTERCEPT } & 2.327 & 0.039 & 5.817 & 0.0001 \
\text { X1 (HSM) } & 0.146 & 0.037 & 3.718 & 0.0003 \
\text { X2 (HSS) } & 0.036 & 0.038 & 0.950 & 0.3432 \
\text { X3 (HSE) } & 0.055 & 0.040 & 1.397 & 0.1637 \
\text { X4 (SATM) } & 0.00094 & 0.00068 & 1.376 & 0.1702 \
\text { X5 (SATV) } & - 0.00041 & 0.00059 & - 0.689 & 0.4915 \
\hline
\end{array}
\end{array}$

Interpret the value under the column heading $P R O B > F$.

A) Accept $H _ { 0 }$ (at $\alpha = .01$ ); at least one of the $\beta$-coefficients in the first-order model is equal to 0 .
B) Over $99 \%$ of the variation in GPAs can be explained by the model.
C) There is insufficient evidence (at $\alpha = .01$ ) to conclude that the first-order model is statistically useful for predicting GPA.
D) There is sufficient evidence (at $\alpha = .01$ ) to conclude that the first-order model is statistically useful for predicting GPA.

Quizplus · Accepted Answer

The $P$-value for the model is 0.0001, which is less than $\alpha = 0.01$, indicating that the model is statistically significant and useful for predicting GPA.

As Part of a Study at a Large University, Data n=224n = 224n=224

As Part of a Study at a Large University, Data $n = 224$