[" A firm has the following total cost and demand function: "],[C(x)=(x^(3))/(3)-7x^(2)+111x+50" and "p=100-x." Find the profit maximising "],[" output."]

A firm has the following total cost and demand function: C(x)=x^3/3-7x^2+11x+50,x=100-p Find the profit function.

A firm has the following total cost and demand functions : C(x) = (x^(3))/(3) - 10x^(2) + 300 x , where x stand for output. Calculate output at which the Average cost is minimum

A firm has the following total cost and demand functions : C(x) = (x^(3))/(3) - 10x^(2) + 300 x , where x stand for output. Calculate output at which the Average cost is equal to the marginal cost.

A firm has the cost function C=(x^(3))/(3)-7x^(2)+111x+50 and demand function x=100-p (i) Write the total revenue function in terms of x (ii) Formulate the total profit function P in terms of x.

The total cost function is given by C(x) = 2x^(3)-3.5x^(2) +x . Find the marginal average cost function.

Find the marginal cost function (MC) if the total cost function is: C (x) = (x ^(3))/(3) + 5x ^(2) - 16 x + 2

If the cost function C(x)= x^(3)-5x^(2) + 3x+1 , then find the marginal cost function.

Given that the total cost junction for x units of a commodity is: C(x) = x^(3)/3 + 3x^(2) - 7x + 16 . Find the Marginal Cost (MC) .

If the total cost function for a manufacturer is given by C=(5x^(2))/(sqrt(x^(2)+3))+500 . Find the marginal cost.

The total cost function C(x) = 2x^(3) - 5x^(2) + 7x . Check whether the MAC increases or decreases with increase in outputs .