Advertisements
Advertisements
प्रश्न
Choose the correct alternative:
The producer’s surplus when the supply function for a commodity is P = 3 + x and x0 = 3 is
विकल्प
`5/2`
`9/2`
`3/2`
`7/2`
Advertisements
उत्तर
`9/2`
APPEARS IN
संबंधित प्रश्न
The marginal cost function is MC = `300 x^(2/5)` and fixed cost is zero. Find out the total cost and average cost functions
The marginal revenue (in thousands of Rupees) functions for a particular commodity is `5 + 3"e"^(- 003x)` where x denotes the number of units sold. Determine the total revenue from the sale of 100 units. (Given e–3 = 0.05 approximately)
Find the revenue function and the demand function if the marginal revenue for x units is MR = 10 + 3x – x2
If the marginal cost (MC) of production of the company is directly proportional to the number of units (x) produced, then find the total cost function, when the fixed cost is ₹ 5,000 and the cost of producing 50 units is ₹ 5,625
The demand function p = 85 – 5x and supply function p = 3x – 35. Calculate the equilibrium price and quantity demanded. Also, calculate consumer’s surplus
Calculate the producer’s surplus at x = 5 for the supply function p = 7 + x
If the supply function for a product is p = 3x + 5x2. Find the producer’s surplus when x = 4
Under perfect competition for a commodity the demand and supply laws are Pd = `8/(x + 1) - 2` and Ps = `(x + 3)/2` respectively. Find the consumer’s and producer’s surplus
Choose the correct alternative:
For the demand function p(x), the elasticity of demand with respect to price is unity then
Choose the correct alternative:
The demand function for the marginal function MR = 100 – 9x2 is
