Find the cost of increasing from 100 to 200 units if the marginal cost in Rs per units is given by the dunction `MC= .003x^2-0.01x+2.5`

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

The fixed cost of new product is Rs 35,000 and the variable cost per unit is Rs.500 If the demand function is p=5000-100x. Find the break even value

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

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.

IF the marginal cost is defined as the rate of change of total cost with respect to the number of units of the product, The marginal cost of producing x units of a product is given by marginal cost =2xsqrt(x+5) . The cost of producing 4 units of the product is Rs 314.40 . Find the cost function.

Find the average cost of production ( in Rs per unit ) in factories in two states.

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.

The marginal cost of a product is given by MC = 2x + 30 and the fixed cost is Rs. 120. Find (i) the total cost of producing 100 units. (ii) the cost of increasing output from 100 to 200 units.

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) - 0.003 x^(2) + 15x + 4000 . Find the marginal cost when x = 17 units are produced.