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Suppose that the price per unit in dollars of a cell phone production is modeled by p=55−0.0125x, where x is in thousands of phones produced, and the revenue represented by thousands of dollars is R=x⋅p. Find the production level that will maximize revenue.

Respuesta :

Answer: At x = 2200 level of production, it will get maximum revenue.

Step-by-step explanation:

Since we have given that

p = 55-0.0125x

and Revenue function is given by

[tex]R=x.p\\\\R=x(55-0.0.125x)\\\\R(x)=55x-0.0125x^2[/tex]

We will take the first derivative of it.

[tex]R'(x)=55-0.025x[/tex]

Now,we will find the critical points :

[tex]55-0.025x=0\\\\0.025x=55\\\\x=\dfrac{55}{0.025}\\\\x=2200[/tex]

and R''(x)=-0.025<0, so it will get maximum revenue.

Hence, At x = 2200 level of production, it will get maximum revenue.

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