Question
The revenue and cost functions for the housing developer are:
C(n) = 8 + 0.065n
R(n) = 1.6 √n
Suppose that the developer found a way to reduce her variable cost to $58 000 per house. How would this affect:
i) the minimum and maximum number of houses she could build?
ii) her maximum potential profit?
C(n) = 8 + 0.065n
R(n) = 1.6 √n
Suppose that the developer found a way to reduce her variable cost to $58 000 per house. How would this affect:
i) the minimum and maximum number of houses she could build?
ii) her maximum potential profit?