The marginal revenue function of a commodity is `MR = 9 + 2x - 6x^(2)`, find the total revenue function.

If the marginal revenue function of a commodity is MR=2x-9x^(2) then the revenue function is

If the marginal revenue of a commodity is given by MR =20e^(-x/10)(1-x/10) , find the demand function .

The revenus function is given by R (x) = 100 x -x ^(2) -x ^(3) . Find Marginal revenue function.

If the revenue function is R(x)= (2)/(x) +x+1 , then find the marginal revenue function.

f the demand function for a monopolist is given by x = 100 - 4p, the marginal revenue function is

If the revenue function is R(x) = 3x^(3) - 8x + 2 , then the average revenue function is

The demand function of a monopolist is given by px = 100. Find the marginal revenue .

The demand function of a monopolist is p = 300 - 15 x .Find the price at which the mar-ginal revenue vanishes.

Given the total cost function for x units of a commodity as C(x) =1/3 x^3+x^(2)-8x+5 , find slope of average cost function.

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