To determine the missing values in the table, let's analyze the given data step-by-step.
1. Cost for "The Dairy":
- "The Dairy" produces 100 gallons of ice cream, but the cost is not provided.
- "Ice Cream, Inc." produces 100 gallons of ice cream at a cost of [tex]$10.
- To find the cost for "The Dairy," we can assume the cost per gallon is the same as that for "Ice Cream, Inc."
- Cost per gallon for "Ice Cream, Inc." = \(\frac{\$[/tex]10}{100 \text{ gallons}} = \[tex]$0.1 \text{ per gallon}\).
- Therefore, the cost for "The Dairy" producing 100 gallons would be:
\[
100 \text{ gallons} \times \$[/tex]0.1 \text{ per gallon} = \[tex]$10.0
\]
2. Amount Produced by "Bob & Gary's":
- "Bob & Gary's" has a production cost of $[/tex]12, but the amount produced is not provided.
- "Frozen Treats" produces 150 gallons of ice cream at a cost of [tex]$15.
- To find the amount produced by "Bob & Gary's," we can assume a similar cost per gallon for consistency.
- Cost per gallon for "Frozen Treats" = \(\frac{\$[/tex]15}{150 \text{ gallons}} = \[tex]$0.1 \text{ per gallon}\).
- Therefore, to find the amount produced by "Bob & Gary's" with a cost of $[/tex]12, we divide the total cost by the cost per gallon:
[tex]\[
\frac{\$12}{\$0.1 \text{ per gallon}} = 120 \text{ gallons}
\][/tex]
Thus, the completed table with the calculated values is:
[tex]\[
\begin{array}{|c|c|c|}
\hline \text{Manufacturer} & \text{Amount Produced} & \text{Cost} \\
\hline \text{The Dairy} & 100 \text{ gallons} & \$10.0 \\
\hline \text{Ice Cream, Inc.} & 100 \text{ gallons} & \$10 \\
\hline \text{Frozen Treats} & 150 \text{ gallons} & \$15 \\
\hline \text{Bob \& Gary's} & 120 \text{ gallons} & \$12 \\
\hline
\end{array}
\][/tex]
