To solve this problem, let's look closely at the data presented in the chart.
The chart provides three columns:
1. Units produced per day.
2. The total revenue corresponding to each unit produced per day.
3. The marginal revenue for producing each additional unit.
We want to find out how the marginal revenue behaves as the production increases. Here is the data from the chart:
- When 0 units are produced, both the total revenue and marginal revenue are not defined.
- When 1 unit is produced, the total revenue is [tex]$10, and the marginal revenue is $[/tex]10.
- When 2 units are produced, the total revenue increases to [tex]$20, and the marginal revenue remains $[/tex]10.
- When 3 units are produced, the total revenue is [tex]$30, and the marginal revenue is $[/tex]10.
- When 4 units are produced, the total revenue is [tex]$40, and the marginal revenue is $[/tex]10.
- When 5 units are produced, the total revenue reaches [tex]$50, and the marginal revenue is $[/tex]10.
- When 6 units are produced, the total revenue climbs to [tex]$60, and the marginal revenue continues at $[/tex]10.
- When 7 units are produced, the total revenue is [tex]$70, and, again, the marginal revenue is $[/tex]10.
From this analysis, we can observe that the marginal revenue, which is the additional revenue generated from producing one more unit, stays constant at $10 as the number of units produced increases.
Thus, the correct answer to the question is:
Remains the same as production increases.
