The demand function is `x = (24 - 2p)/(3)`, where x is the number of units demanded and p is the price per unit. Find the revenue function R in terms of p.

The demand function is x=(24-2p)/(3) where x is the number of units demanded and p is the price per unit. Find : (i) The revenue function R in terms of p. (ii) The price and the number of units demanded for which the revenue is maximum.

If the demand function is x= (24-2p)/(3) where x is the number of units produced and p is the price per unit, then the revenue function R(x) is

If the demand function is p=200-4x , where x is the number of units demanded and p is the price per unit, then MR is

If the demand function is p=200-4x , where x is the number of units demand and p is the price per unit, the marginal revenue is

If the demand function for a product is p=(80-pi)/(4) , where x is the number of units and p is the price per unit, the value of x for which the revenue will be maximum is

The demand for a certain product is represented by the equation p=500+25x-x^2/3 in rupees where is the number of units and p is the price per unit Find : (i) Marginal revenue function. (ii) The marginal revenue when 10 units are sold.

The demand function of an output is x=106-2p , where x is the output and p is the price per unit and average cost per unit is 5 + (x)/(50) . Determine the number of units for maximum profit

The demand function of a certain commodity is given by p= 1000 - 25 x+x^(2) where 0le x le20 . Find the price per unit and total revenue from the sale of 5 units.

If the demand function is p(x) = 20 -(x)/(2) then the marginal revenue when x = 10 is

Find force per unit length at P