Question

L&T produces steel boxes at 3 different plants in amounts x,y and z respectively, producing an annual revenue of R(x,y,z)=8xyz2-200(x+y+z) the company is to produce 100 units annually how should production be distributed to maximize revenue?

Answer 1

Step-by-step explanation:

Maximize  subject to . The Lagrangian is

 

with partial derivatives (set equal to 0):

 

 

From the first two equations it follows that . Subtracting either the first or second equation from the third tells us that

 

which means either , , or .

If , then , so that . So one critical point is (0, 0, 100).

If , then . So another critical point is (50, 50, 0).

If , then . So our third critical point is (25, 25, 50).

Evaluate the revenue function for each of these three critical points. You'll find that the latter critical point achieves the maximum value of 12,480,000 in revenue.