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# Production and costs: Long-run Costs and economies of scale - PowerPoint PPT Presentation

Production and costs: Long-run Costs and economies of scale. AP Economics Mr. Bordelon. Short-Run vs. Long-Run Costs. We’ve been looking at fixed costs up to this point as a matter of the short-run. Now we’re looking at long-run costs.

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### Production and costs:Long-run Costs and economies of scale

AP Economics

Mr. Bordelon

• We’ve been looking at fixed costs up to this point as a matter of the short-run. Now we’re looking at long-run costs.

• All inputs are variable in the long run. In the long run, even fixed costs may change.

• In the long run, a firm’s fixed cost becomes a variable it can choose.

• Selena is considering whether to get more food-preparation equipment. This will affect total cost in two ways:

• Firm will have to either rent or buy the additional equipment. This means a higher fixed cost in the short run.

• If the workers have more equipment, then they will be more productive. Fewer workers will be needed to produce any given output. Variable cost for any given output level will be reduced.

• Why?

In the left half of the table, this gives us the VC, TC and ATC when Selena’s fixed cost was \$108. This table is graphed out on curve ATC1.

Selena decided to buy more food-prep equipment, doubling her fixed costs to \$216. The right half of the table reflects the new VC, TC and ATC, represented by ATC2.

Notice that when she’s doubled her FC, she’s reduced her VC at every level of output. Why do you think?

Let’s say Selena has not decided against the extra equipment (capital). On the graph, this represents 4 or less cases of salsa per day.

When output is small (4 cases or less), ATC is smaller as she’s maintained the lower FC of \$108.

At 3 cases, with the original equipment, ATC is \$72. But when Selena buys more equipment (capital), the ATC jumps to \$90.

But is this an indication necessarily of higher costs over all?

As output increases beyond 4 cases per day, Selena’s ATC is lower if it acquires the additional equipment.

Does this change raise fixed cost or variable cost?

As output increases beyond 4 cases per day, Selena’s ATC is lower if it acquires the additional equipment.

This extra equipment raises FC to \$216.

Beyond 4 cases per day, say for example 9, ATC is \$120 when FC is \$108, but only \$78 when FC is \$216.

Why do you think ATC changes like this when FC increases? HINT: think spreading effect.

When output is low, increase in FC from additional equipment outweighs the reduction in VC from higher worker productivity. There are too few units of output over which to spread the additional FC.

If Selena plans to produce 4 or less cases per day, she would be better off choosing the lower level of FC \$108 to get a lower ATC of production.

If she wants a higher output, she’s got to buy the additional equipment.

• For every output level, there is some choice of FC that minimizes the firm’s ATC for that level.

• When the firm has a desired output level that it expects to maintain over time, it should choose the optimal fixed cost for that level.

• The level of FC that minimizes its ATC.

• Awesome. What does that mean?

• Every time I’m planning to make something, I’ve got to make a choice about my fixed costs so I can lower my ATC to make the product.

• Once I’ve made my decision about how much to produce for a while, I should choose the fixed cost that lowers my overall costs. That’s my optimal fixed cost for however much I’m going to make.

• What we’re talking about for the first time is, well, time. I’m now taking time into account for my ATC.

• Why is this important? Namely, it’s about choosing how much I’m going to produce depending on how I can manage my fixed costs.

• Let’s take a look at my law firm back in NY. I was a solo practitioner, and let’s use labor as my fixed cost.

• For every 1 attorney, my firm can produce say 10 cases a month.

• Assuming all attorneys are created equal and paid the same, how many cases would I produce at 2 attorneys?

• 3 attorneys?

• What’s happening to my fixed cost every time?

• What’s happening to my average total cost each time?

• What’s going to help me make my decision about how many attorneys I want to hire?

• Let’s assume I was doing 10 cases per month with a fixed cost of 1 attorney, but I now decided to increase my production to 10 cases per month for the next couple of months. No issue there, per se.

• But what should I do if I make this a permanent change in my business?

• Let’s assume I was doing 10 cases per month with a fixed cost of 1 attorney, but I now decided to increase my production to 10 cases per month for the next couple of months. No issue there, per se.

• I should hire another attorney and increase my fixed cost (2 attorneys) so that my ATC is minimized at the 20 case per month level.

• Generally, there are tons of different short-run ATC curves for my firm, each corresponding to a different choice of FC.

• Think of it as a family of short-run ATC curves.

• At any given moment in a business, the business will find itself on one of these short-run ATC curves, and it will be on the one that matches its current level of FC.

• So if there’s a change in what I produce, that change in output is going to cause my fixed cost to move along that short-run ATC curve.

• Now, here’s the key. If I ultimately expect that change to be something permanent, then my firm’s current fixed cost is no longer optimal. Over time, I am going to want to change my fixed cost to a new level that minimizes ATC for my new output level.

• If Selena had been producing 2 cases of salsa per day with a fixed cost of \$108 but found herself increasing her output to 8 cases per day for the foreseeable future, then in the long run, Selena should purchase more equipment and increase her fixed cost to a level that minimizes ATC at the 8-case per day level.

• Now let’s do something stupidly obsessive-compulsive because we have all the time in the world. Let’s calculate the lowest possible ATC that can be had for every output level if Selena were to choose her fixed cost for each output level.

The long-run ATC curve (LRATC—really, I’m not spelling it out every time) shows the relationship between output and ATC when FC has been chosen to minimize ATC for each level of output.

Assuming that there are many possible choices of FC, the LRATC will have the U-shape you see here.

In the long run, when a producer has had time to choose the FC appropriate for its desired level of output, that producer will be at some point on the LRATC.

If the output level changes, the firm will no longer be on its LRATC, and will instead be moving along its current short-run ATC (SRATC).

It will not be on the LRATC again until the business changes its FC for the new output level.

ATC3 is the SRATC if Selena chooses the level of FC that minimizes ATC at an output of 3 cases of salsa per day. Notice at 3 cases, ATC3 and LRATC intersect at the minimum ATC (point A).

ATC6 is the SRATC if Selena chooses the level of FC that minimizes ATC at an output of 6 cases of salsa per day. Notice at 6 cases, ATC6 and LRATC intersect at the minimum ATC (point C).

Hmmm, I wonder ATC9 is about.

Assume that Selena decides to produce 6 cases, and is on ATC6. If she actually produces 6 cases of salsa per day, she’ll be at point C, which is where both the SR and LRATC curves intersect, the minimal ATC for 6 cases.

What if she has an off day, and only produces 3 cases? Where will she be?

Assume that Selena decides to produce 6 cases, and is on ATC6. If she actually produces 6 cases of salsa per day, she’ll be at point C, which is where both the SR and LRATC curves intersect, the minimal ATC for 6 cases.

If Selena makes only 3 cases per day, in the SR, her ATC will be at point B, but no longer on the LRATC.

Unfortunately, this turns out to be a long-term gig. If she had known she was only going to be making 3 cases, what should she have done for her ATC?

Unfortunately, this turns out to be a long-term gig. If she had known she was only going to be making 3 cases, Selena would have been better off choosing a lower level of FC, the one that matches ATC3.

This would give her the lower ATC she’s looking for. She’d now be at point A, where the SRATC and LRATC meet for 3 cases.

Assume that Selena decides to produce 6 cases, and is on ATC6. If she actually produces 6 cases of salsa per day, she’ll be at point C, which is where both the SR and LRATC curves intersect, the minimal ATC for 6 cases.

What if she gets a massive order from Tyler for 9 cases per day, because has a taste for the hot salsa, baby? Where will she be?

Assume that Selena decides to produce 6 cases, and is on ATC6. If she actually produces 6 cases of salsa per day, she’ll be at point C, which is where both the SR and LRATC curves intersect, the minimal ATC for 6 cases.

If Selena increases her production to 9 cases per day, in the SR, her ATC will be at point Y, but no longer on the LRATC.

Unfortunately, this turns out to be a long-term gig. If she had known she was going to be making 9 cases, what should she have done for her ATC?

Unfortunately, this turns out to be a long-term gig. If she had known she was going to be making 9 cases, Selena would have been better off choosing a higher level of FC—purchasing more equipment—the one that matches ATC9.

This would give her a higher FC, which would in turn reduce her VC to get to ATC9. She’d be at point X, where the SRATC and LRATC meet for 9 cases.

• Why is this important?

• Ultimately, this is about businesses making decisions and how they operate over time.

• In the short run, a company that has to increase output suddenly to meet an increase in demand will find that the ATC increases sharply because it’s difficult to get more out of what they already have.

• In the long run, if they can build new factories or add more machinery (increase capital), SRATC decreases.

• The shape of the LRATC is due to the influence of scale, the size of a firm’s operations, on its LRATC of production.

• Firms that experience scale effects in production find that their LRATC changes substantially depending on the quantity of output increases.

Economies of scale. When LRATC decreases as output increases.

Looking at the graph, Selena gets economies of scale over output levels from 0 to 6 cases per day—the output levels over which the LRATC is declining.

Increasing returns to scale. When output increases more than in proportion to an increase in all inputs.

For example, if Selena doubled her inputs and makes more than twice as much salsa, she’d be experiencing increasing returns to scale.

With twice the inputs (and costs) and more than twice the salsa, she would be enjoying decreasing LRATC, and thus economies of scale.

Increasing returns to scale implies economies of scale.

Economies of scale exist whenever LRATC decreases, regardless whether all inputs are increasing by same proportion.

Diseconomies of scale. When LRATC increases as output increases.

Looking at the graph, Selena gets diseconomies of scale over output levels above 6 cases per day—the output levels over which the LRATC is increasing.

Decreasing returns to scale. When output increases less than in proportion to an increase in all inputs.

For example, if Selena doubled her inputs and makes less salsa than what she had put in, she’d be experiencing decreasing returns to scale.

With twice the inputs (and costs) and less than twice the salsa, she would have increasing LRATC, and thus diseconomies of scale.

Decreasing returns to scale implies diseconomies of scale.

Diseconomies of scale exist whenever LRATC increases, regardless whether all inputs are decreasing by same proportion.

Constant returns to scale. When output increases directly in proportion to an increase in all inputs.

For example, if Selena doubled her inputs and receives double the salsa, she’d be experiencing constant returns to scale.

With twice the inputs (and costs) and twice the salsa, she would have constant LRATC.

• What causes economies of scale effects in production?

• Specialization. Economies of scale come from increased specialization that larger output levels allow.

• Larger operations mean that individual workers can limit themselves to more specific tasks, becoming more efficient at doing them.

• Large initial setup cost. In large industries, companies have to pay a high FC in the form of plant and equipment (capital) before producing any output.

• AP Examples: automobiles, electricity, oil refineries.

• Network externalities. This topic will be covered later.

• What causes diseconomies of scale effects in production?

• Coordination and communication. Typically found in large firms. When firms grow in size, it becomes more difficult costly to communicate and organize.

• Economies of scale help firms grow larger, but diseconomies of scale limit their size.

• Sunk cost. Cost that has already been incurred and not recoverable. Sunk costs should be ignored in a decision about future actions.

• Once something can’t be recovered, it is irrelevant in making decisions about what to do in the future.

• Regardless of how much has been spent on a project in the past, if the future costs exceed the future benefits, the project should not continue.

• Travis has an old Ford Pinto, and he just replaced the brakes for \$250.

• Afterwards, he finds that the entire brake system is defective and has to be replaced for an additional \$1,500.

• Or he could sell his beloved Ford Pinto and buy an AMC Gremlin with no brake problems for \$1,600.

• What should Travis do?

• If Travis repairs the car, he will have spent \$1,750. \$1,500 for the brake system, and \$250 for the brakes.

• If he sells the Pinto and gets the Gremlin, he only has to spend \$1,600.

• Or does he…?

• The problem is that this reasoning ignores the fact Travis has already spent \$250 on the brakes and that the \$250 is not recoverable.

• The \$250 should be ignored and should not affect whether Travis should repair or trade in the trusty Pinto.

• The real cost of repair is \$1,500, not \$1,750.

• So what should Travis do?

• Let’s say Travis knew from the beginning that it would cost \$1,750 to repair the Pinto. What would be the right choice then?

• Let’s say Travis knew from the beginning that it would cost \$1,750 to repair the Pinto.

• Travis should get the Gremlin for \$1,600.

• Katie and Dagny are considering investing in new capital and expanding the lemonade stand. They have been squeezing lemons by their teeny tiny hands, but they could buy a new mechanical squeezer. They’ve also been locked into the small shack behind Dagny’s house which serves as their erstwhile factory, but they could rent a spot out on 17-92. Investment and expansion are expensive so fixed costs will increase, but this would give workers the ability to be more productive so variable costs will fall.

• Katie and Dagny’s fixed costs double from \$50 to \$100, but variable costs are cut in half at all levels of output.

At low levels of output, ATC2 > ATC1. The more FC spending on expensive equipment and expansion is outweighing the savings in VC.

If the lemonade stand can’t produce more than 32 cups of lemonade, expansion does not make sense.

Once the higher FC is spread out over more units, ATC2 < ATC1.

If the lemonade stand can sell more than 32 cups, expansion will provide per-unit cost savings.

Both ATC1 and ATC2 are SRATCs. They represent the two sizes of the firm, one small and one large, but at each of those sizes the fixed inputs are fixed.

For such a firm, many possible SRATCs will exist, each corresponding to a different choice of FC and so giving rise to the “family” of SRATCs.

At any given moment, a firm will find itself on one of its SRATCs, the one corresponding to its current level of FC. Changes in output will cause it to move along the curve.

If the firm expects that change in output to be long-standing, then it is likely that the firm’s current level of FC is no longer optimal.

Given sufficient time, it will want to adjust its FC to a new level that minimizes ATC for its new output level.

If the firm finds the lowest possible ATC that can be had for each output level when fixed inputs are free to change, then you can draw out the LRATC.

LRATC shows the relationship between output and ATC when FC has been chosen to minimize ATC for each level of output.

Economies of scale. LRATCdecreases as the firm expands. In this range, the firm is benefiting from expansion due to increasing returns to scale.

“Economies of scale” is used to describe the downward sloping LRATC.

The phrase “returns to scale” refers to the production function. These are essentially synonymous and can be described as also meaning that output is increasing at a faster rate than production costs.

You might imagine the lemonade stand that increases total costs by 50% but this allows the firm to increase output by 100%.

Enjoying Economies of Scale

Specialization.The firm expands and finds ways to give labor and capital opportunities to perform tasks that are best suited to their talents.

For example a firm could purchase a machine that is both a copier and a fax. When the firm expands output, this become inefficient because Katie needs to make copies, but this requires Dagnyto wait 30 minutes to send a fax to the lemon supplier requesting more lemons.

This is inefficient. The firm buys a new fax machine that allows both Katie and the machine to be more specialized.

Enjoying Economies of Scale

High set-up costs.A large piece of capital is expensive when it is initially purchased, but if the firm can produce many many units, the per-unit costs fall and economies of scale exist.

Enjoying Economies of Scale

Buying inputs in bulk.Larger firms need lots of raw materials and when they are bought in large quantities, the per-unit costs are lower.

Think of buying 24 single cans of Coke from a vending machine versus buying a case of 24 cans from the grocery store.

Diseconomies of Scale. LRATCincreases as the firm expands.

In this range, the firm is not benefiting from expansion due to decreasing returns to scale.

This simply means that output is increasing at a slower rate than production costs.

You might imagine the lemonade stand that increases total costs by 100% but this allows the firm to increase output by only 50%.

Disenjoying Diseconomies of Scale

Problems with coordination and communication. Vast firms have offices and subsidiaries spread across the globe. It takes time, effort, and money to coordinate production, marketing, and sales activities within large firms.

At some point, the firm becomes so large that per-unit costs actually begin to rise.

• You purchased a ticket to the Justin Bieber concert for \$100 and accidentally drop the ticket in the sewer, losing it forever. FOREVER. Should you buy another ticket or cry cry cry?

• The loss of the ticket is pointless. You can’t get the \$100 back, it’s gone. Whether or not you buy another ticket depends upon whether you can afford another \$100. The first \$100 is a sunk cost.

• Sunk cost. Cost that has been incurred in the past and cannot be recovered.

• Joey pays \$10,000 in tuition. Should he attend as many classes as possible, so that those dollars are not wasted?

• Joey pays \$10,000 in tuition. Should he attend as many classes as possible, so that those dollars are not wasted?

• Nope. Those dollars are sunk. Joey goes to class on a daily basis only if he believes the benefits from attendance outweigh the costs. Those costs do not include any of the \$10,000.