Chapter 1.1, Problem 51E

a.

To determine

To complete the table which is provided in the question.

Answer to Problem 51E

The complete table is obtained as:

DVDs	Cost (dollars)	Amount left (dollars)
1	$1\cdot 4=4$	$200-4=196$
2	$2\cdot 4=8$	$200-8=192$
3	$3\cdot 4=12$	$200-12=188$
4	$4\cdot 4=16$	$200-16=184$

Explanation of Solution

Given information:

The total yearly rental budget is $200 and each rental cost is $4.

Calculation:

From, the table, it can be observed that in Cost (dollars) column, total rental cost is written which is a product of number of DVDs and rental cost of each DVD and Amount left (dollars) column is obtained by subtracting the cost of DVDs from $200.

Hence, the complete table is obtained as:

DVDs	Cost (dollars)	Amount left (dollars)
1	$1\cdot 4=4$	$200-4=196$
2	$2\cdot 4=8$	$200-8=192$
3	$3\cdot 4=12$	$200-12=188$
4	$4\cdot 4=16$	$200-16=184$

b.

To determine

To write the variable expression for cost of r rentals.

Answer to Problem 51E

The variable expression for cost of r rentals is obtained as:

  $C=4\cdot r$

Explanation of Solution

Given information:

The total yearly rental budget is $200 and each rental cost is $4.

Calculation:

From, the table, it can be observed that in Cost (dollars) column, total rental costC is written which is a product of number of DVDs, r and rental cost of each DVD that is $4.

Hence,

The variable expression for cost of r rentals is obtained as:

  $C=4\cdot r$

c.

To determine

To write the variable expression for amount of the budget left after r rentals.

Answer to Problem 51E

The variable expression is obtained as:

  $A=200-4\cdot r$

Explanation of Solution

Given information:

The total yearly rental budget is $200 and each rental cost is $4.

Calculation:

From, the table, it can be observed that in Cost (dollars) column, Amount left (dollars) column is obtained by subtracting the total cost of DVDs, C from $200.

Total cost is obtained as:

  $C=4\cdot r$

Hence,

The variable expression is obtained as:

  $\begin{array}{l}A=200-C\\ A=200-4\cdot r\end{array}$

d.

To determine

Determine the number of DVD which can be rented before the $200 is spent.

Answer to Problem 51E

The number of DVD which can be rented before the $200 is spent is 50.

Explanation of Solution

Given information:

The total yearly rental budget is $200 and each rental cost is $4.

Calculation:

Therefore,

The variable expression for cost of r rentals is obtained as:

  $C=4\cdot r$

Since, $C=200$ as $200 is spent. Then r gives the total number of DVDs which can be rented before $200 is spent.

So,

  $\begin{array}{l}r=\frac{200}{4}\\ r=50\end{array}$

Hence,

The number of DVD which can be rented before the $200 is spent is 50.