Find the cost function for the marginal cost function. C′(x)=0.03e^0.05x fixed cost is $9

Find the marginal cost for the cost function c(x)=(3x-2)^4. Find C'(5). explain the value. please show...

Find the marginal cost for the cost function c(x)=(3x-2)^4. Find C'(5). explain the value. please show all work.

3) The marginal cost for producing x items can be given by the formula: C ′...

3) The marginal cost for producing x items can be given by the formula: C ′ ( x ) = 350 − 0.18 x. Find the total cost function if the cost of making 300 items is known to be $97,400. a) What are the fixed costs? b) How much would it cost to make 500 items?

7. Suppose the cost, in dollars, of producing x items is given by the function C(x)...

7. Suppose the cost, in dollars, of producing x items is given by the function C(x) = 1/6x3+ 2x2+ 30. Current production is at x = 9 units. (a) (3 points) Use marginal analysis to find the marginal cost of producing the 10th unit. (b) (3 points) Find the actual cost of producing the 10th unit.

a) The Cost of selling widgets is given by the cost function c(x)= 4x+10. The price...

a) The Cost of selling widgets is given by the cost function c(x)= 4x+10. The price of each widget is given by the function p= 50-0.05x. A) How many widgets must be sold to maximize profit? B) What will be the Maximum Profit? C) What price per widget must be charged in order to maximize profit.

Suppose that the cost of producing x units, C(x), is a linear function. Furthermore, it is...

Suppose that the cost of producing x units, C(x), is a linear function. Furthermore, it is known the marginal cost is $1.50 and that the cost of producing 50 units is $2,275. a) Determine a formula for C(x) b) Determine the fixed cost

If C(x) = 14000 + 600x − 0.6x2 + 0.004x3 is the cost function and p(x)...

If C(x) = 14000 + 600x − 0.6x2 + 0.004x3 is the cost function and p(x) = 1800 − 6x is the demand function, find the production level that will maximize profit. (Hint: If the profit is maximized, then the marginal revenue equals the marginal cost.)

If the total cost function for a product is C(x) = 9(x + 3)^3 dollars, where...

If the total cost function for a product is C(x) = 9(x + 3)^3 dollars, where x represents the number of hundreds of units produced, producing how many units will minimize average cost? a) x= ? b) Find the minimum average cost per hundred units.

3) Suppose a firm’s cost function is C(q) = 3q2 (2 squared) + 15. a. Find...

3) Suppose a firm’s cost function is C(q) = 3q2 (2 squared) + 15. a. Find variable cost, fixed cost, average cost, average variable cost, and average fixed cost.(Hint: Marginal cost is given by MC = 6q.) b. Find the output that minimizes average cost. :4) Suppose that a firm’s production function is q = x0.5 in the short run, where there are fixed costs of $1,000, and x is the variable input whose cost is $1,000 per unit. What...

Suppose the total cost TC=10000+0.5Q. Find the fixed cost and marginal cost. Draw the marginal cost...

Suppose the total cost TC=10000+0.5Q. Find the fixed cost and marginal cost. Draw the marginal cost curve. Give examples of industries that will face a marginal cost curve like one you have identified in your graph.

For the given cost function C(x)=57600+300x+x2C(x)=57600+300x+x2 find: a) The cost at the production level 1500      b)...

For the given cost function C(x)=57600+300x+x2C(x)=57600+300x+x2 find: a) The cost at the production level 1500      b) The average cost at the production level 1500     c) The marginal cost at the production level 1500     d) The production level that will minimize the average cost     e) The minimal average cost