If the marginal function for x units of output is given by `(6)/((x+2)^(2))+5`, find the total revenue function and the demand law.

If the marginal revenue function is (15-2x-x^(2)) , find total revenue function and the demand function (x being the number units sold).

The total revenue in Rupees received from the sale of x units of a product is given by R(x) = 3x^(2) + 36x + 5. Find the marginal revenue, when x = 5, where by marginal revenue we mean the rate of change of total revenue with respect to the number of items sold at an instant.

The total revenue in Rupees received from the sale of x units of a product is given by R(x) = 13x^(2) + 26x + 15. Find the marginal revenue when x = 7.

The total revenue in Rupees received from the sale of x units of a product is given by R(x) = 3x^(2) + 36x + 5. The marginal revenue, when x = 15 is

The total cost C(x) in Rupees, associated with the production of x units of an item is given by C(x) = 0.005x^(3)- 0.02 x^(2)+30x+5000 Find the marginal cost when 3 units are produced, where by marginal cost we mean the instantaneous rate of change of total cost at any level of output.

Suppose the marginal cost of a product is given by RS(10+24x-3x^(2)) , where x is the number of units produced. It the fixed cost is known to be RS 40, find the total cost function and the average cost function.

A manufacture's cost function C(x) and revenue function R(x) of x units of a product are respectively given by C(x)=3x+250 and R(x)=8x+30 Find the number of products the manufacture must sell to earn some profit.

The total cost C(x) in Rupees associated with the production of x units of an item is given by C(x) = 0.007x^(3) - 0.003x^(2)+15x+4000 . Find the marginal cost when 17 units are produced.

The marginal cost function of manufacturing x pairs of shoes is RS(6+10x-6x^(2)) . The total cost of producing a pair of shoes is RS 12. Find the total and average cost functions.

If y is the total cost of x units of output and it is given that marginal cost equals average cost, show that the average cost function is constant.