Find the cost of increasing from 100 to 200 units if the marginal cost in rupees per unit is given by the function MC= `0.003x^(2) - 0.01x + 2.5`

If the cost function C(x) =x^2+ 2x + 5 , find the average cost function.

The fixed cost of a new product is Rs 18000 and the variable cost is Rs 550 per unit. If the demand function p(x)= 4000-150x , find break even points

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.

The manufacturing cost of an item consists of rupes 100 as overheads , material cost rupes 2 per item and the labour cost ( x^(2))/(90) for x items , produced . Find the average cost.

The fixed cost of a new product is Rs. 30,000 and the variable cost per unit is Rs. 800. If the demand function is x=45-(p)/(100) , find break-even values.

The total cost associated with provision of free mid-day meals to x students of a school in primary classes is given by C(x)= 0.005x^(3)- 0.02x^(2) + 30x + 50 . If the marginal cost is given by rate of change (dC)/(dx) total cost, write the marginal cost of food for 300 students.

If C(x) = 3x^(2) - 2x + 3 , the marginal cost when x = 3 is

A profit making company wants to launch a new product. It observes that the fixed cost of the new product is Rs 35,000 and the variable cost per unit is Rs500. The revenue received on the sale of x units is given by 5000x-100x^2 . Find : (a) profit function (b) breakeven point (c) the values of that results in a loss.

If the marginal cost function a product is given by MC=10-4x+3x^(2) and fixed cost is Rs 500, then the cost function is