SOLUTION: A manufacturing company makes two types of water​ skis, a trick ski and a slalom ski. The trick ski requires 9 ​labor-hours for fabricating and 1 ​labor-hour for finishing. T

Algebra ->  Coordinate Systems and Linear Equations  -> Linear Equations and Systems Word Problems -> SOLUTION: A manufacturing company makes two types of water​ skis, a trick ski and a slalom ski. The trick ski requires 9 ​labor-hours for fabricating and 1 ​labor-hour for finishing. T      Log On


   

Question 1137723: A manufacturing company makes two types of water​ skis, a trick ski and a slalom ski. The trick ski requires 9 ​labor-hours for fabricating and 1 ​labor-hour for finishing. The slalom ski requires 4 ​labor-hours for fabricating and 1 ​labor-hour for finishing. The maximum​ labor-hours available per day for fabricating and finishing are 108 and 18​, respectively. Find the set of feasible solutions graphically for the number of each type of ski that can be produced.If x is the number of trick skis and y is the number of slalom skis produced per​ day, write a system of linear inequalities that indicates appropriate restraints on x and y. Write an inequality for the constraint on fabricating time
Answer by ikleyn(52798) About Me  (Show Source):
You can put this solution on YOUR website!
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9x + 4y <= 108   hours   (fabricating time restriction)

1x + 1y <=  18   hours    (finishing time restriction)

Answered.