A college theater has a seating capacity of 2000. It reserves x tickets for students and y tickets for general admission. For parts (a)-(d) write an inequality to represent the given statement. a. The total number of seats available is at most 2000. b. The college wants to reserve at least 3 times as many student tickets as general admission tickets. c. The number of student tickets cannot be negative. d. The number of general admission tickets cannot be negative. e. Graph the solution set to the system of inequalities from parts (a) – (d).
A college theater has a seating capacity of 2000. It reserves x tickets for students and y tickets for general admission. For parts (a)-(d) write an inequality to represent the given statement. a. The total number of seats available is at most 2000. b. The college wants to reserve at least 3 times as many student tickets as general admission tickets. c. The number of student tickets cannot be negative. d. The number of general admission tickets cannot be negative. e. Graph the solution set to the system of inequalities from parts (a) – (d).
Solution Summary: The author explains how an inequality to represent the total number of seats available is x+yle 2000.
A college theater has a seating capacity of 2000. It reserves x tickets for students and y tickets for general admission. For parts (a)-(d) write an inequality to represent the given statement.
a. The total number of seats available is at most 2000.
b. The college wants to reserve at least 3 times as many student tickets as general admission tickets.
c. The number of student tickets cannot be negative.
d. The number of general admission tickets cannot be negative.
e. Graph the solution set to the system of inequalities from parts (a) – (d).
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