A farmer has 100 acres of land. He wants to plant corn and wheat. Each acre of corn requires 2 hours of labor, and each acre of wheat requires 1 hour of labor. If he has a total of 120 hours of labor available, write a system of inequalities to represent the situation and graph the feasible region.

A school is organizing a field trip and has a budget of $500. The cost per student for the trip is $20, and the cost for the bus is a flat fee of $200. Write a system of inequalities to represent the number of students that can attend the trip and graph the solution set.

A bakery sells two types of cakes: chocolate and vanilla. Each chocolate cake requires 3 eggs and each vanilla cake requires 2 eggs. If the bakery has 30 eggs available, write a system of inequalities to represent the maximum number of cakes that can be made and graph the feasible region.

A gym offers two types of memberships: basic and premium. The basic membership costs $30 per month, while the premium membership costs $50 per month. If the gym wants to make at least $1,000 in membership fees each month, write a system of inequalities and graph the solution set.

A company produces two products, A and B. Each product A requires 4 hours of labor and each product B requires 2 hours of labor. If the company has 40 hours of labor available, write a system of inequalities to represent the production limits and graph the feasible region.

A concert venue has a seating capacity of 500. Tickets for the front row cost $100 each, and tickets for the back row cost $50 each. If the venue wants to make at least $30,000 from ticket sales, write a system of inequalities and graph the solution set.

A charity event is selling two types of tickets: VIP and regular. VIP tickets cost $75 each, and regular tickets cost $25 each. If the charity wants to raise at least $2,000, write a system of inequalities to represent the ticket sales and graph the feasible region.