A manufacturing company makes two types of water skis, a trick ski and a slalom ski. The trick ski requires 12 labor-hours for fabricating and 1 labor-hour for finishing. The slalom ski requires 6 labor-hours for fabricating and 1 labor-hour for finishing. The maximum labor-hours available per day for fabricating and finishing are 204 and 22, 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. Complete the inequality below. ▼204 35 30 25 20 15 10 Av

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
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A manufacturing company makes two types of water skis, a trick ski and a slalom ski. The
trick ski requires 12 labor-hours for fabricating and 1 labor-hour for finishing. The slalom ski
requires 6 labor-hours for fabricating and 1 labor-hour for finishing. The maximum
labor-hours available per day for fabricating and finishing are 204 and 22, 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. Complete the inequality below.
▼204
35
30
25
20
15
10
Av
Transcribed Image Text:A manufacturing company makes two types of water skis, a trick ski and a slalom ski. The trick ski requires 12 labor-hours for fabricating and 1 labor-hour for finishing. The slalom ski requires 6 labor-hours for fabricating and 1 labor-hour for finishing. The maximum labor-hours available per day for fabricating and finishing are 204 and 22, 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. Complete the inequality below. ▼204 35 30 25 20 15 10 Av
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