The average cost function AC for a commodity is given by AC `= x+5+x/36` in terms of output x. Find the :
Output for which AC increases.

The average cost function AC for a commodity is given by AC = x+5+x/36 in terms of output x. Find the : Total cost and the marginal cost as the function of x.

The average cost function, AC for a commodity is given by AC = x + 5+ (36)/(x) , in terms of output x. Find : (i) The total cost, C and marginal cost, MC as a function of x. (ii) The outputs for which AC increases.

The average cost function, AC for a commodity is given by AC = x + 5 + (36)/(x) ,in terms of output x Find: (i) The total cost, C and marginal cost, MC as a function of x (ii) The outputs for which AC increases.

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)

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.

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

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 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 of x units is given by C(x) = sqrt(6 x + 5) + 2500 . Show that the marginal cost decreases as the output x increases

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