Respuesta :
Answer:
13 people will Maximize the revenue for the tour company
Step-by-step explanation:
Data provided in the question:
Revenue function = 52n - 2n²
Now,
To find the point of maxima or minima, differentiating the revenue funtion with respect to the 'n' and equating to zero
⇒ [tex]\frac{dR}{dn}=\frac{d(52n-2n^2)}{dn}[/tex] = 0
or
⇒ 52 - 4n = 0
or
⇒ 4n = 52
or
⇒ n = 13
To check for mamixa or minima
again differentiating the revenue function
i.e
[tex]\frac{d^2R}{dn^2}[/tex] = -4 [negative value means the n = 13 is point of maxima ]
Hence,
13 people will Maximize the revenue for the tour company
13 people will maximize the revenue for the tour company.
Function defining the total Revenue 'R' generated is,
- R = 52n - 2n²
Here, n = Number of people going on the trip
For maximum revenue,
"Find the derivative of the function with respect to 'n' and equate it to zero to find the value of n"
[tex]\frac{d}{dn}(R)=\frac{d}{dn}(52n-2n^2)[/tex]
R' = 52 - 4n
Find double derivative of the function R.
R" = -4
Since, its negative so the revenue will be maximum.
For R' = 0
52 - 4n = 0
n = 13
Therefore, revenue will be maximum for 13 people.
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