Answer:
Q = 216 - 0.5P
Explanation:
One approach to modeling the demand as a function of the cost is to use a linear demand equation of the form:
Q = a - bP
where Q is the quantity demanded, P is the price, and a and b are constants. To find these constants, we can use the two points given:
When P = $180, Q = 8 portraits, so 8 = a - b * 180
When P = $100, Q = 24 portraits, so 24 = a - b * 100
Solving the system of equations gives us:
a = 216
b = 0.5
So, the demand equation is:
Q = 216 - 0.5P
This represents the demand for portraits as a function of the price, where the demand decreases linearly as the price increases.