nhikieu0391
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Margaret runs a business. This year’s revenue is given by the function
R = −0.5x2 − 200x. Can her revenue be at least $25,000 this year?
Quadratic Math

Respuesta :

abidemiokin

Answer:

No, she can make less than $25000 according to the calculation

Step-by-step explanation:

Given the revenue function expressed as R = −0.5x2 − 200x, Margaret revenue will be at the maximum if dR/dx = 0

dR/dx = -2(0.5)x -200

dR/dx = -x -200

Since dR/dx = 0

-x-200 = 0

x = -200

Substitute x = -200 into the function.

R = −0.5x^2 − 200x

R = −0.5(-200)^2 − 200(-200)

R = -0.5(40000)+40000

R = -20000+40000

R = 20000

This means that the revenue for the year is $20,000 which shows that her revenue cannot be at least $25000 for that year but she could make less than $25000

shristiparmar1221

This can be determined by using first derivative test.Therefore, her revenue  cannot be at least $25,000 this year.

Given :

Revenue  is given by the function as  R = [tex]\bold{-0.5x^{2} -200x}[/tex]                            ...(1)

By using of  first derivative test, Margaret revenue will be at the maximum if

[tex]\bold{\dfrac{dR}{dx} =0}[/tex]

 

By first derivative test,

[tex]\dfrac{dR}{dx} =-2(0.5)x -200\\\dfrac{dR}{dx}= -x -200\\[/tex]                                              ...(2)

As we know that ,

[tex]\dfrac{dR}{dx} =0[/tex]

Now, calculate further  from equation (2),

[tex]\begin{aligned}-&x-200=0\\\bold{&x=-200}\end{aligned}[/tex]

Now, put the value of [tex]\bold{x=-200}[/tex]  in equation (1) and solve it further,

[tex]R&=0.5x^{2} -200x\\R&=0.5(-200)^{2}-200(-200)\\R &= -0.5(40000)+40000R = -20000+40000R = 20000[/tex]

Therefore,it  means that the revenue for the year is $20,000. From this we have to show that her revenue cannot be at least $25000 for that year,but she could make less than $25000.

For further details, please refer this link:

https://brainly.com/question/16882582

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