Final answer:
The domain of the revenue function is [0, 76867], representing the possible tickets sold from none to full capacity. The range is [0, 12381587], representing the possible revenue from $0 to a full house multiplied by the ticket price of $161.
Step-by-step explanation:
The question involves finding the domain and range of the revenue function of Everbank Field, home of the Jacksonville Jaguars when each ticket costs $161. The domain of this function represents the possible number of tickets sold, which would range from 0 to the stadium's full capacity of 76,867 fans. Therefore, the domain is [0, 76867]. The range represents the potential revenue, which can be calculated by multiplying the number of tickets sold by the price per ticket, that is, the function R(x) = 161x. The minimum revenue would be $0 (if no tickets are sold) and the maximum revenue would be $12,381,587 (if all 76,867 tickets are sold), so the range is [0, 12,381,587].