If quantity demanded #Q=6000-3P#, where #P# is the price and total cost is given by #5000+2Q#, will the revenue be maximized at a price #202#?

1 Answer
Oct 28, 2017

There is something wrong with the question, but following should explain you how to approach the problem.

Explanation:

#Q=6000-30P# shows the shows the quantity demanded in the market at a price #P#. Observe that greater the price smaller the quantity demanded.

#TC = 5000+ 2Q#, shows the cost function of the commodity for the company. Observe that #5000# is fixed cost and #2# is the variable cost per unit.

If company manufactures the product exactly as demanded (i.e. no surplusses or shortages),

At a price of #202#, quantity demanded is #6000-30xx202=-60#, which cannot be supplied (it really means #60# units are purchased by the company from market) and hence, there appears to be something wrong with the question.

If price is #22#, quantity demanded would be #6000-30xx22=5340# and

revenue would be #22xx5340=117480#

and total cost to company would be #5000+2xx5340=15680# and hence a profit of #101800#.

Further toatl revenue when #Q# is demanded is #Pxx(6000-30P)=6000P-30P^2# and

total cost for company is #TC=5000+2(6000-30P)# or #17000-60P#.

Profit to company would be #6000P-30P^2-17000+60P#

or #-30P^2+6060P-17000#

and this will be maximised when #P=6060/(2xx30)=101#

which is #-30xx101^2+6060xx101-17000=584859#