The demand function of a product X is given as : Dx= 12- 2px, where Px stands for price. If an individual Y has a demand of 8 units, then market price of the product is :

The demand function of a product X is given as : Dx = 12 - 2Px, where Px stands for price. The demand at price of Rs. 2 will be :

The supply function of a product X is given as: Sx 6Px+3, where Px stands for price. The sprice of 5 will be:

The demand function of a productX is given : Dx = 12- Px, where Px stands for price. If there are 5,000 costomers for the product, then demand for the product at market price of Rs. 3 will :

The supply function of a product X is given as: Sx 6Px +3, where Px stands for price. 1,000 firms in the market, then market supply for the product at market price of 4 will be:

The supply function of a product X is given as: Sx 6Px+3 , where Px stands for price. At what price the firm will be willing to supply 27 pieces in the market?

The individual demand and supply functions of a product are given as: Dx=10-2Px,Sx=20+2Px, where Px stands for price and Dx and Sx respectively stands for quantity demanded and quantity supplied. If there are 4,000 consuers and 1,000 firms in the market, then quantity demanded and supplied at the equilibrium price of rupay 2.

The individual demand and supply functions of a product are given as: Dx=10-2Px,Sx=10+2Px, where Px stands for price and Dx and Sx respectively stands for quantity demanded and quantity supplied. If there are 4,000 consumers and 1,000 firms in the market, then equilibrium price will be :

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

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.

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