Park for 6 weeks 40 hours per week which is a total

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Job Slope=m Y-intercept = (x, y) Point-slope form Amusement Park 9 100 y-100=9(x-0) Tech Internship 11.5 0 y-0=11.50(x-0)
4. For each job, write an inequality that represents the number of hours Alex could work before the trip. (1 point)
5. Write an inequality that represents the amount of money Alex needs to earn. (1 point)
park for 6 weeks (40 hours per week) which is a total of 240 hours and he will have 2,260 which is enough for the plane ticket, and if Alex decides to work for the full 8 weeks (320 hours in total) he will earn a total of 2,980 which is more than what he needs. However on the other hand if Alex works at the Tech part-time job, he will not earn enough for the plane ticket. If he works part-time at the Tech internship job for 8 weeks (20 hours a week) he will only earn 1,840 which is 360 short of what the plane ticket costs. Alex would have to work at the Tech Internship Job for a total of 10 weeks which is a total of 200 hours (2,300) to a ff ord the plane ticket.
6. On the graph below, sketch your equation from question 2 that represents the money Alex could earn at the job at the amusement park. (2 points) 0. 100. 200. 300. 400. 500. 6000 5500 5000 4500 4000 3500 3000 2500 2000 1500 1000 500 0 600.

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