Advertisements
Advertisements
प्रश्न
If MR = 14 – 6x + 9x2, Find the demand function
उत्तर
MR = 14 – 6x + 9x2
R = `int (14 - 6x + 9x^2) "d"x + "k"`
= 14x – 3x2 + 3x3 + k
Since R = 0
When x = 0
k = 0
So revenue function R = 14x – 3x2 + 3x3
Demand function P = ``"R"/x` = 14 – 3x + 3x2
APPEARS IN
संबंधित प्रश्न
Determine the cost of producing 200 air conditioners if the marginal cost (is per unit) is C'(x) = `x^2/200 + 4`
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)
If the marginal revenue function is R'(x) = 1500 – 4x – 3x2. Find the revenue function and average revenue function
Find the revenue function and the demand function if the marginal revenue for x units is MR = 10 + 3x – x2
Calculate the producer’s surplus at x = 5 for the supply function p = 7 + x
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
The demand equation for a products is x = `sqrt(100 - "p")` and the supply equation is x = `"P"/2 - 10`. Determine the consumer’s surplus and producer’s surplus, under market equilibrium
Choose the correct alternative:
The profit of a function p(x) is maximum when
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 and supply function of a commodity are P(x) = (x – 5)2 and S(x) = x2 + x + 3 then the equilibrium quantity x0 is
