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A company produces remote-controlled helicopters. The company’s profit, in thousands of dollars, as a function of the number of helicopters produced per week can be modeled by a quadratic function. When 1 helicopter is produced per week, the company’s profit is 4 thousand dollars. The maximum profit, 22 thousand dollars, occurs when 4 helicopters are produced per week. The function that models the scenario, where h is the number of helicopters produced per week, is f(h) = –2(h – 4)2 + 22. When 6 helicopters are produced weekly, the company’s profit is ______thousand dollars.

Respuesta :

lily777
We simply substitute 6 into the equation:
f(6) = -2(6 - 4)² + 22
f(6) = 14

The company's profit is 14 thousand dollars
hope it helped :).

When 6 helicopters are produced weekly, the company’s profit is 14 thousand dollars.

How to solve a function?

A function can be solved by substituting the value of the variable given in the question. In this case, we must substitute the value of h in the function.

It is given that the function which models the scenario is:

f(h) = –2(h – 4)² + 22

It is also given that h = 6

We must substitute the value of h = 6:

f(6) = -2(6 - 4)² + 22

= (-2 * 4) + 22

= 14

Therefore, we have found that the profit that the company would make when 6 helicopters are produced is 14 thousand dollars.

Learn more about functions here: https://brainly.com/question/10283950

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