Q=6000-12p Determine the fee which should be changed to maximize daily beach revenues

About that much.

give me answer of this question

To determine the fee which should be charged to maximize daily beach revenues, we need to find the value of p that maximizes the revenue function R(p) = 6000 - 12p.

To find the value of p for maximum revenue, we need to find the derivative of the revenue function with respect to p, set it equal to zero, and solve for p.

Let's start by finding the derivative of R(p):

dR/dp = -12

Setting the derivative equal to zero:

-12 = 0

Since -12 is not equal to zero, there are no solutions for p when the derivative is equal to zero. This means that the revenue function does not have a maximum or minimum for p. The revenue will decrease as the fee increases.

Therefore, to maximize daily beach revenues, there is no specific fee that should be charged. The revenue will be maximized at the highest value possible (p = 0) and will decrease as the fee increases.