For the demand function `p= (a)/(x+b)-c`, where `ab gt 0`, show that the marginal revenue decreases with the increase of x.

If the demand function is p(x) = 20 -(x)/(2) then the marginal revenue when x = 10 is

A monopolist's demand function is p= 300 - 5x. At what price is the marginal revenue zero.

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

f the demand function for a monopolist is given by x = 100 - 4p, the marginal revenue function is

If the revenue function is R(x)= (2)/(x) +x+1 , then find the marginal revenue function.

If the revenue function f(x) = 1/x+2 , then what is the marginal revenue function?

A monopolist's demand function is x = 50 - (P)/4 At what price is marginal revenue zero?

if the demand functions is p= sqrt(6-x) , then x at which the revenue will be minimum is

The total cost function of x units is given by C(x) = sqrt(6 x + 5) + 2500 . Show that the marginal cost decreases as the output x increases

The demand function of a monopolist is p = 300 - 15 x .Find the price at which the mar-ginal revenue vanishes.