If the total cost of producing and marketing x units of a certain commodity is given by `C ( x) = 3ae^((x)/(3)) . ` Verify `(d)/(dx) (AC) = ( MC - AC)/(x)`

If C (x) = a + bx + cx^2 , Verify that (d)/(dx) (AC) = (1)/(x) (MC - AC)

If the total cost of producing x units of a commodity is given by C(x)=(1)/(3)x^(2)+x^(2)-15x+300 , then the marginal cost when x=5 is

The average cost function associated with producing and marketing x units of an item is given by AC = 3x - 11+ (10)/(x) . Then MC at x = 2 is

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 for a production of x units of a commodity is given by 3/4x^(2)–7x+27 , then the number of units produced for which MC = AC is

Given the total cost function for x units of a commodity as C(x) = (1)/(3) x^(3) + 2x^(2) - 5x + 10 .

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

Given that the total cost junction for x units of a commodity is: C(x) = x^(3)/3 + 3x^(2) - 7x + 16 . Find the Marginal Cost (MC) .

If the total cost function of producing x units of a commodity is given by 360 – 12x +2x^(2) , then the level of output at which the total cost is minimum is

The average cost function associated with producing and marketing x units of an items is given by AC=2x-11+(50)/(x) . Find the range of value of the output x, for which AC is increasing.