Advertisements
Advertisements
प्रश्न
Revenue function ‘R’ and cost function ‘C’ are R = 14x – x2 and C = x(x2 – 2). Find the
- average cost
- marginal cost
- average revenue and
- marginal revenue.
Advertisements
उत्तर
R = 14x – x2 and C = x(x2 – 2)
C = x3 – 2x
(i) Average Cost (AC) = `"Total cost"/"Output" = ("C"(x))/x`
`= (x^3 - 2x)/x`
`= x^3/x - (2x)/x`
= x2 – 2
(ii) Marginal Cost (MC) = `"dC"/"dx"`
`= "d"/"dx" (x^3 - 2x)`
`= "d"/"dx" (x^3) - 2 "d"/"dx" (x)`
= 3x2 – 2
(iii) Average Revenue R = 14x – x2
Average Revenue (AR) =`"Total Revenue"/"Output" = ("R"(x))/x`
`= (14x - x^2)/x`
`= (14x)/x - x^2/x`
= 14 - x
(iv) Marginal Revenue (MR) = `"dR"/"dx"`
`= "d"/"dx" (14x - x^2)`
`= 14 "d"/"dx" (x) - "d"/"dx" (x^2)`
= 14(1) – 2x
= 14 – 2x
APPEARS IN
संबंधित प्रश्न
The total cost of x units of output of a firm is given by C = `2/3x + 35/2`. Find the
- cost when output is 4 units
- average cost when output is 10 units
- marginal cost when output is 3 units
Find the elasticity of demand in terms of x for the following demand laws and also find the value of x where elasticity is equal to unity.
p = (a – bx)2
Find the elasticity of demand in terms of x for the following demand laws and also find the value of x where elasticity is equal to unity.
p = a – bx2
Find the elasticity of supply for the supply function x = 2p2 + 5 when p = 3.
Show that MR = p`[1 - 1/eta_"d"]` for the demand function p = 400 – 2x – 3x2 where p is unit price and x is quantity demand.
For the demand function p = 550 – 3x – 6x2 where x is quantity demand and p is unit price. Show that MR =
Find the values of x, when the marginal function of y = x3 + 10x2 – 48x + 8 is twice the x.
Find out the indicated elasticity for the following function:
p = `10 e^(- x/3)`, x > 0; ηs
Relationship among MR, AR and ηd is:
The demand function is always
