1. Assume that a competitive firm has the total cost function: TC=1q3−40q2+840q+1800TC=1q3-40q2+840q+1800 Suppose the price of...

Suppose a competitive firm has as its total cost function: TC=29+2q2 Suppose the firm's output can...

Suppose a competitive firm has as its total cost function: TC=29+2q2 Suppose the firm's output can be sold (in integer units) at $77 per unit. Using calculus and formulas (don't just build a table in a spreadsheet as in the previous lesson), what is the total profit at the optimal integer output level? Please specify your answer as an integer. In the case of equal profit from rounding up and down for a non-integer initial solution quantity, proceed with the...

Assume that a competitive firm has the total cost function: TC=1q3−40q2+710q+1700TC= Suppose the price of the...

Assume that a competitive firm has the total cost function: TC=1q3−40q2+710q+1700TC= Suppose the price of the firm's output (sold in integer units) is $550 per unit. By creating tables (but not using calculus) with columns representing cost, revenue, and profit to find a solution, what is the total profit at the optimal output level? Please specify your answer as an integer

Suppose a firm's total cost function is TC = 80+9Q-0.75Q^2+0.03Q^3T C ( Q ) = 80...

Suppose a firm's total cost function is TC = 80+9Q-0.75Q^2+0.03Q^3T C ( Q ) = 80 + 9 Q − 0.75 Q 2 + 0.03 Q 3. Suppose the competitive market price P is $12.48/unit. To the nearest $0.01, what is the firm's profit? To solve, you must use the fact that to maximize profit, the firm will set its output to satisfy P = M R = MC ( Q ) = d T C ( Q ) d...

Monopolistically competitive firm with a demand of Q = 630 – 3P a total cost function...

Monopolistically competitive firm with a demand of Q = 630 – 3P a total cost function of C(Q) = 25,000 + 10Q. 1. What is the profit-maximizing output level 2. What is the profit or loss from producing at the optimal level and charging the optimal price 3. At the optimal price and quantity combination, what is your firm's marginal revenue 4. If your firm's advertising elasticity is 0.02, what is the optimal amount for you to advertise

1. Suppose a perfectly competitive firm has a cost function described by TC = 200Q +...

1. Suppose a perfectly competitive firm has a cost function described by TC = 200Q + Q^2 + 225 Each firm’s marginal revenue is $240. a. Find the profit maximizing level of output. b. Is this a short-run or long-run situation? How do you know? c. Assuming that this firm’s total cost curve is the same as all other producers, find the long-run price for this good.

Given Q = 300 – 5P and TC = 100 + 10Q for an oligopolistic firm,...

Given Q = 300 – 5P and TC = 100 + 10Q for an oligopolistic firm, determine mathematically the price and output at which the firm maximizes its: A. Total profits and calculate those profits B. Total revenues and calculate the profits are that price and quantity C. Total revenue in the presence of a $2980 profit constraint TO HELP SOLVE: Part (a) is the standard MR = MC procedure. For part (b) you are looking for the turning point...

The total cost function for a firm in a perfectly competitive market is TC = 350...

The total cost function for a firm in a perfectly competitive market is TC = 350 + 15q + 5q2. At its profit maximizing quantity in the short-run, each firm is making a loss but chooses to stay open. Which of the following is/are necessarily true at the profit maximizing quantity? MR = 15 + 5q P>15 AR > 350/q + 15 + 5q Both A and B are true. Both B and C are true. All of the above...

Consider a firm with the demand function P(Q)=(50-2Q), and the total cost function TC(Q)=10,000+10Q. Find the...

Consider a firm with the demand function P(Q)=(50-2Q), and the total cost function TC(Q)=10,000+10Q. Find the profit maximizing quantity. Calculate the profit maximizing price (or the market price). Hint: MR(Q)=(50-4Q),

Each firm in a competitive market has a cost function​ of: Upper C equals 36 plus...

Each firm in a competitive market has a cost function​ of: Upper C equals 36 plus q squaredC=36+q2​, so its marginal cost function is MC equals 2 qMC=2q. The market demand function is Upper Q equals 48 minus pQ=48−p. Determine the​ long-run equilibrium​ price, quantity per​ firm, market​ quantity, and number of firms. The output per firm is nothing. ​(round your answer to the nearest​ integer)

(a) Suppose the total revenue (TR) and total cost (TC) curves of the perfectly competitive firm...

(a) Suppose the total revenue (TR) and total cost (TC) curves of the perfectly competitive firm are given by the following set of equations: TR = 100Q and TC = Q2 + 4Q + 5, where Q is the output. Derive the firm’s profit maximizing output and calculate the total and average profit earned by the firm at this level of output. (b) How do you know that the equations above could not be referring to a monopoly?