If total cost function is given by `c=a+bx+cx^(2)`, where x is the quantity of output. Show that:
`d/(dx)(AC)=1/x(MC-AC)`, where MC is the marginal cost and AC is the averenge cost.

If total cost function is given by C = a + bx + cx^2 , where x is the quantity of output. Show that: d/(dx)(AC) = 1/x (MC-AC) , where MC is the marginal cost and AC is the average cost.

If the total cost function is given by C(x), where x is the quality of the output, then (d)/(dx)(AC) =

If the total cost function is given by C= a+bx+cx^2 verify that (d)/(dx) (AC) =1/x (MC-AC)

If the total cost function is given by C(x) = 10x - 7x^(2) + 3x^(3) , then the marginal average cost

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

The total cost function for a production is given by C (x) = 3/4 x ^(2) - 7x + 27. Find th number of units produced for which M.C. = A.C. (M.C= Marginal Cost and A.C. = Average Cost)

If C(x) = 3x^(2) - 2x + 3 , the marginal cost when x = 3 is

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}

The total cost function is given by C(x) = 2x^(3) - 3 . 5 x^(2) + x . The point where MC curve cuts y-axis is

If C(x)=200x-5x^(2)+(x^(2))/(3) , then find the marginal cost (MC)