first two games of the season. Write a matrix containing the total number of points and rebounds for each of the starting
five.
$$\begin{array}{l}
\begin{array} { l | c | c }
\text { Game } 1 & \text { Points } & \text { Rebounds } \
\hline \text { Levy } & 20 & 3 \
\text { Cowens } & 16 & 5 \
\text { Williams } & 8 & 12 \
\text { Miller } & 6 & 11 \
\text { Jenkins } & 10 & 2
\end{array}\\
\begin{array} { l | c | c }
\text { Game } 2 & \text { Points } & \text { Rebounds } \
\hline \text { Levy } & 18 & 4 \
\text { Cowens } & 14 & 3 \
\text { Williams } & 12 & 9 \
\text { Miller } & 4 & 10 \
\text { Jenkins } & 10 & 3
\end{array}
\end{array}$$

A) $\left[ \begin{array} { l l } 5 & 62 \end{array} \right]$
В) $\left[ \begin{array} { r r } 7 & 38 \ 30 & 8 \ 21 & 20 \ 21 & 10 \ 5 & 20 \end{array} \right]$
C) $\left[ \begin{array} { r r } 38 & 7 \ 30 & 8 \ 20 & 21 \ 10 & 21 \ 20 & 5 \end{array} \right]$
D) $[ 625 ]$ Answer: C
-A bakery sells four main items: rolls, bread, cake, and pie. The amount of each of five ingredients (in cups, except for eggs) required to make a dozen rolls, a loaf of bread, a cake, or a pie is given by matrix A. The cost (in cents) per unit of ingredient when purchased in large lots or small lots is given in matrix B.
Use m Cost
Large Lot Small Lot
$\left[ \begin{array} { l } \text { Eggs } \ \text { Flour } \ \text { Sugar } \ \text { Shortening } \ \text { Milk } \end{array} \right] \left[ \begin{array} { l l } 4 & 5 \ 7 & 10 \ 12 & 12 \ 15 & 16 \ 4 & 6 \end{array} \right] = B$ atrix multiplication to find a matrix giving the comparative cost per item for the two purchase options. Give each Cost to the nearest cent.
A) These matrices cannot be multiplied.
B) ${ \left[ \begin{array} { l l } 41.75 & 53 \ 28.75 & 40 \ 82 & 101 \ 24 & 31.33 \end{array} \right] }$
C) $\left[ \begin{array} { l l } 43.75 & 53 \ 0 & 0 \ 83 & 101 \ 0 & 0 \end{array} \right]$
D) ${ \left[ \begin{array} { l l } 40.75 & 53 \ 28.75 & 39 \ 83 & 101 \ 24 & 30.33 \end{array} \right] }$

Question

first two games of the season. Write a matrix containing the total number of points and rebounds for each of the starting
five. 
$$\begin{array}{l}
\begin{array} { l | c | c } 
\text { Game } 1 & \text { Points } & \text { Rebounds } \
\hline \text { Levy } & 20 & 3 \
\text { Cowens } & 16 & 5 \
\text { Williams } & 8 & 12 \
\text { Miller } & 6 & 11 \
\text { Jenkins } & 10 & 2
\end{array}\\
\begin{array} { l | c | c } 
\text { Game } 2 & \text { Points } & \text { Rebounds } \
\hline \text { Levy } & 18 & 4 \
\text { Cowens } & 14 & 3 \
\text { Williams } & 12 & 9 \
\text { Miller } & 4 & 10 \
\text { Jenkins } & 10 & 3
\end{array}
\end{array}$$

A) $\left[ \begin{array} { l l } 5 & 62 \end{array} \right]$
В) $\left[ \begin{array} { r r } 7 & 38 \ 30 & 8 \ 21 & 20 \ 21 & 10 \ 5 & 20 \end{array} \right]$
C) $\left[ \begin{array} { r r } 38 & 7 \ 30 & 8 \ 20 & 21 \ 10 & 21 \ 20 & 5 \end{array} \right]$
D) $[ 625 ]$ Answer: C
-A bakery sells four main items: rolls, bread, cake, and pie. The amount of each of five ingredients (in cups, except for eggs) required to make a dozen rolls, a loaf of bread, a cake, or a pie is given by matrix A.  The cost (in cents) per unit of ingredient when purchased in large lots or small lots is given in matrix B.
Use m Cost
Large Lot Small Lot
$\left[ \begin{array} { l } \text { Eggs } \ \text { Flour } \ \text { Sugar } \ \text { Shortening } \ \text { Milk } \end{array} \right] \left[ \begin{array} { l l } 4 & 5 \ 7 & 10 \ 12 & 12 \ 15 & 16 \ 4 & 6 \end{array} \right] = B$ atrix multiplication to find a matrix giving the comparative cost per item for the two purchase options. Give each Cost to the nearest cent. 
A) These matrices cannot be multiplied. 
B) ${ \left[ \begin{array} { l l } 41.75 & 53 \ 28.75 & 40 \ 82 & 101 \ 24 & 31.33 \end{array} \right] }$ 
C) $\left[ \begin{array} { l l } 43.75 & 53 \ 0 & 0 \ 83 & 101 \ 0 & 0 \end{array} \right]$ 
D) ${ \left[ \begin{array} { l l } 40.75 & 53 \ 28.75 & 39 \ 83 & 101 \ 24 & 30.33 \end{array} \right] }$

Quizplus · Accepted Answer

The Answer of first two games of the season. Write a matrix containing the total number of points and rebounds for each of the starting
five. 
$$\begin{array}{l}
\begin{array} { l | c | c } 
\text { Game } 1 & \text { Points } & \text { Rebounds } \
\hline \text { Levy } & 20 & 3 \
\text { Cowens } & 16 & 5 \
\text { Williams } & 8 & 12 \
\text { Miller } & 6 & 11 \
\text { Jenkins } & 10 & 2
\end{array}\\
\begin{array} { l | c | c } 
\text { Game } 2 & \text { Points } & \text { Rebounds } \
\hline \text { Levy } & 18 & 4 \
\text { Cowens } & 14 & 3 \
\text { Williams } & 12 & 9 \
\text { Miller } & 4 & 10 \
\text { Jenkins } & 10 & 3
\end{array}
\end{array}$$

A) $\left[ \begin{array} { l l } 5 & 62 \end{array} \right]$
В) $\left[ \begin{array} { r r } 7 & 38 \ 30 & 8 \ 21 & 20 \ 21 & 10 \ 5 & 20 \end{array} \right]$
C) $\left[ \begin{array} { r r } 38 & 7 \ 30 & 8 \ 20 & 21 \ 10 & 21 \ 20 & 5 \end{array} \right]$
D) $[ 625 ]$ Answer: C
-A bakery sells four main items: rolls, bread, cake, and pie. The amount of each of five ingredients (in cups, except for eggs) required to make a dozen rolls, a loaf of bread, a cake, or a pie is given by matrix A.  The cost (in cents) per unit of ingredient when purchased in large lots or small lots is given in matrix B.
Use m Cost
Large Lot Small Lot
$\left[ \begin{array} { l } \text { Eggs } \ \text { Flour } \ \text { Sugar } \ \text { Shortening } \ \text { Milk } \end{array} \right] \left[ \begin{array} { l l } 4 & 5 \ 7 & 10 \ 12 & 12 \ 15 & 16 \ 4 & 6 \end{array} \right] = B$ atrix multiplication to find a matrix giving the comparative cost per item for the two purchase options. Give each Cost to the nearest cent. 
A) These matrices cannot be multiplied. 
B) ${ \left[ \begin{array} { l l } 41.75 & 53 \ 28.75 & 40 \ 82 & 101 \ 24 & 31.33 \end{array} \right] }$ 
C) $\left[ \begin{array} { l l } 43.75 & 53 \ 0 & 0 \ 83 & 101 \ 0 & 0 \end{array} \right]$ 
D) ${ \left[ \begin{array} { l l } 40.75 & 53 \ 28.75 & 39 \ 83 & 101 \ 24 & 30.33 \end{array} \right] }$

First Two Games of the Season A) [562]\left[ \begin{array} { l l } 5 & 62 \end{array} \right][5​62​]

First Two Games of the Season A) $\left[ \begin{array} { l l } 5 & 62 \end{array} \right]$