A carpool service has 2,000 daily riders. A one-way ticket costs $5.00. The service estimates that for each $1.00 increase to the one-way fare, 100 passengers will find other means of transportation. Let x represent the number of $1.00 increases in ticket price.

Choose the inequality to represent the values of x that would allow the carpool service to have revenue of at least $12,000. Then, use the inequality to select all the correct statements.

The maximum profit the company can make is $4,125.00.
The price of a one-way ticket that will maximize revenue is $7.50.
The maximum profit the company can make is $15,625.00.

100x^2 - 1,500 - 10,000 > 12,000
The maximum profit the company can make is $4,125.00.
The price of a one-way ticket that will maximize revenue is $7.50.
The maximum profit the company can make is $15,625.00.
100x^2 + 1,500x - 10,000 < 12,000
-100x^2 + 1,500x + 10,000 > 12,000
The price of a one-way ticket that will maximize revenue is $12.50.
The price of a one-way ticket that will maximize revenue is $12.50.