Answer :
Answer:
Each factory should supply 100 units
x = 100 units
y = 100 units
Step-by-step explanation:
Since the total production must be 200 units, then x + y = 200.
The cost function can be rewritten as a function of 'x' as follows:
[tex]y=200-x\\C=f(x,y) =2x^2+xy+2y^2+500\\C= f(x) = 2x^2+x(200-x)+2(200-x)^2+500\\C= f(x) = x^2+200x+500+2(x^2-400x+40,000)\\C= f(x) = 3x^2-600x+80,500[/tex]
The value of 'x' for which the derivate of the cost function is zero, is the production level that minimizes cost:
[tex]C= f(x) = 3x^2-600x+80,500\\C'= f'(x)=0 = 6x-600\\x=100\ units\\y = 200 -x = 100\ units[/tex]
In order to minimize production costs, each factory should supply 100 units