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 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 marginal cost of a product is given by MC = (14000)/(sqrt(7x+ 4)) and the fixed cost is 18000. Find the total cost and the average cost of producing 3 units of output.

The average cost function associated with producing and marketing units of an item is given by AC = 2x - 11 + (50)/x Find: the total cost function and marginal cost function

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 marginal cost of a product is given by MC = 2x + 30 and the fixed cost is Rs. 120. Find (i) the total cost of producing 100 units. (ii) the cost of increasing output from 100 to 200 units.

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

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 marginal cost function of manufacturing x units of a product is given by MC = 3x^(2) - 10x +3 , then the total cost for producing one unit of the product is Rs. 7. Find the total cost function.