The demand function for a particular commodity is `y=15e^(-x/3)," for "0 le x le 8`, where y is the price per unit and x is the number of units demanded. Determine the price and quantity for which revenue is maximum.

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

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

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

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

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.

A company is selling a certain product. The demand function of the product is linear. The company can sell 2000 units, when the price is Rs8 per unit and when the price is Rs4 per unit, it can sell 3000 units. Determine: (i) the demand function (ii) the total revenue function.

p=(150)/(x^(2)+2)-4 represents the demand function for a product where p is the price per unit for x units. Determine the marginal revenue.