Hi JeffM,
I am currently studying mathematics for economics.
We have learnt calculus in this course before. I would love to share first how much I have worked through in this question, however, I am just really lost as to how to even begin tackling this one..
The straight-forward mathematical way to address this problem is first to identify the demand function, which has a constant slope of 5 / (- 10) = - 0.5. Moreover d = 20 when p = 40. So
\(\displaystyle 20 = m - 0.5(40) \implies m = 40 \implies d = 40 - 0.5p.\)
Let's check. If p = 40, then d = 20. Good. And
\(\displaystyle d + \Delta d = 40 - 0.5(p + \Delta p) \implies \Delta d = (40 - 0.5p - 0.5 \Delta p) - (40 - 0.5p) = -\ 0.5 \Delta p\).
If price goes up by 10, units sold go down by 5. If price goes down by 10, units sold go up by 5.
Follow that?
Now let's figure out the revenue function.
\(\displaystyle r = p * d = 40p - 0.5p^2.\)
Then the cost function
\(\displaystyle c = 25d = 1000 - 12.5p.\)
Finally the profit function is
\(\displaystyle \pi = r - c = 40p - 0.5x^2 - 1000 + 12.5p = -\ 0.5 p^2 + 52.5p - 1000.\)
Using calculus, you find that profit is maximized where
\(\displaystyle \dfrac{d \pi}{dp} = 0 \implies -\ p + 52.5 = 0 \implies p = 52.5\).
Because the profit function is a parabola, you can find the maximum without calculus.
However, these answers assume you can sell fractional feeders, which is absurd. At a price of 52, you will sell 14 feeders. At a price of 54, you will sell 13 feeders. How do you proceed?
