In a town of 120,000 potential "football fans," the football team draws the following attendees per game, at the various prices shown:
| P |
Q(in thousands)
|
Q (male) (1'000s)
|
Q (female) (1'000s)
|
Revenue (1'000s)
|
|
0
|
120
|
60
|
60
|
0
|
|
10
|
90
|
50
|
40
|
900
|
|
20
|
60
|
40
|
20
|
1200
|
|
30
|
30
|
30
|
0
|
900
|
|
|
|
|
|
|
If the team can charge ANY prices it wants (including different prices to men and women), what price(s) should it charge to make the largest amount of revenue?