The cost function at American Gadgety is ` C(x)=x^(3)-6x^(2)+15x` (x is thousands of units and ` x gt 0`) . The production level at which average cost is minimum is

The cost function at American Gadget is C(x)=x^(3)-6x^(2)+15x ( x is in thousands of units and x gt 0 ) . The production level at which average cost is minimum is:

The total cost function is given by C(x) = 2x^(3)-3.5x^(2) +x . Find the marginal average cost function.

A firm has the following total cost and demand functions : C(x) = (x^(3))/(3) - 10x^(2) + 300 x , where x stand for output. Calculate output at which the Average cost is minimum

The cost function of a product is given by C(x)=(x^(3))/(3)-45x^(2)-900x+36 where x is the number of units produced. How many units should be produced to minimise the marginal cost ?

If the cost function C(x)= x^(3)-5x^(2) + 3x+1 , then find the marginal cost function.

If the cost function of a certain commodity is C(x)=2000+ 50x-(1)/(5)x^(2) then the average cost of producing 5 units is

If C(x)=3x ((x+7)/(x+5))+5 is the total cost of production of x units a certain product, then then marginal cost

Given that the total cost function for x units of a commodity is : C(x) =(x^(3))/(3) + 3x^(2) -7 x + 16 Find: (i) The Marginal Cost (MC) (ii) Find the Average Cost (AC) (iii) Prove th at: Marginal Average Cost (MAC) (Mc(x)-c(x))/(x^(2))

A firm has the following total cost and demand functions : C(x) = (x^(3))/(3) - 10x^(2) + 300 x , where x stand for output. Calculate output at which the Average cost is equal to the marginal cost.

The total cost function for a production is given by C(x)=3/(4)x^(3)-7x+27 . Find the number of units produced for which M.C. = A.C. {M.C. = Marginal Cost and A.C. = Average Cost}