A manufacturing company makes two types of water skis, a trick ski and a slalom ski. The trick ski requires labor-hours for fabricating and labor-hour for finishing. The slalom ski requires labor-hours for fabricating and labor-hour for finishing. The maximum labor-hours available per day for fabricating and finishing are and , 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.

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step-by-step explanation:

we have the parent function given by,

1. the function is translated 5 units to the left.

so, we get,   becomes

2. the function is translated 5 units to the right.

so, we get,   becomes

3. the function is translated 5 units upwards.

so, we get,   becomes

4. the function is translated 5 units downwards.

so, we get,   becomes

5. the function is reflected across x-axis.

so, we get,   becomes

6. the function is reflected across y-axis.

so, we get,   becomes .

step-by-step explanation:

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answer: i could not see part the question so ill explain how to get the answer

step-by-step explanation: for instance the distance she travele d is 10 and she traveled the same amout each mile so do 10 divided by how many miles she drove each time and you ge your answer.

can i know which language is this?