tag:blogger.com,1999:blog-81776603346202803972024-02-21T02:08:07.253-08:00Principal of MicroeconomicAl-Mansor Abu saidhttp://www.blogger.com/profile/09355698983918954375noreply@blogger.comBlogger8125tag:blogger.com,1999:blog-8177660334620280397.post-24203666750715796962016-09-20T00:14:00.001-07:002016-09-20T00:14:29.946-07:0010 Steps to Success<div class="Style2" style="background-attachment: initial; background-clip: initial; background-image: initial; background-origin: initial; background-position: initial; background-repeat: initial; background-size: initial; break-after: avoid; margin-bottom: 0.7pt;">
<span style="line-height: 18.6667px;">Your success on the final exam will depend on your ability to use this book, your economics class, and your textbook to your best advantage. Below are the outline a strategy:</span></div>
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<span style="line-height: 18.6667px;"><b>1.<span class="Apple-tab-span" style="white-space: pre;"> </span>Take notes from the book.</b></span></div>
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<span style="line-height: 18.6667px;">Active reading is the key to effective studying. Mere highlighting is less effective than taking notes because it is too passive and therefore the material does not necessarily get "processed" through your brain. If you read about a concept and then write down a description in your own words, you create a self-contained explanation that speaks your language and will be easy to remember while studying for the exam. If you cannot explain the concept to yourself on paper, this is a clear indication that you need to study the material further. Try reading the corresponding section in this book to see if that explanation makes more sense to you than the one in your textbook.</span></div>
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<span style="line-height: 18.6667px;"><b>2.<span class="Apple-tab-span" style="white-space: pre;"> </span>Use colored pens and rulers for clarity.</b></span></div>
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<span style="line-height: 18.6667px;">Graphs drawn freehand in one color quickly become an unreadable mess as more and more curves are added and shifted. Graphs are essential to solving economic problems: Take pride in your draftsmanship and draw graphs that are so clear that they scream the answers out at you. Drawing your graphs too small can also make them unnecessarily hard for you (and test graders, come exam time) to understand. Remember the wise words of economist Erik Weissman: "If you can't solve the problem, draw a larger graph!"</span></div>
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<span style="line-height: 18.6667px;"><b>3.<span class="Apple-tab-span" style="white-space: pre;"> </span>Summarize what you've learned.</b></span></div>
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<span style="line-height: 18.6667px;">For example, you will learn about the supply curve in this book, during classroom lectures, from textbooks, and perhaps from active learning exercises and computerized tutorials. Sum-marize what you learned about each concept and curve in a central place. Summary sheets will serve you well during your final preparations for the exam.</span></div>
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<span style="line-height: 18.6667px;"><b>4.<span class="Apple-tab-span" style="white-space: pre;"> </span>Draw all of the graphs, complete with proper labels, until you know them by heart.</b></span></div>
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<span style="line-height: 18.6667px;">As we will note throughout this book, graphs can be your best friend or your worst enemy.</span></div>
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<span style="line-height: 18.6667px;">You need them on your side, so study them and draw them until you can draw them without looking at the book. On your summary sheets, explain the slopes, intercepts, and intersections to yourself in your own words. Be sure to learn the axis labels as well.</span></div>
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<span style="line-height: 18.6667px;"><b>5.<span class="Apple-tab-span" style="white-space: pre;"> </span>WORK ALL THE PROBLEMS YOU CAN FIND.</b></span></div>
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<span style="line-height: 18.6667px;">One of the most common mistakes students make when studying is to look at graphs and solutions to problems and think something like, "That's familiar to me; I can do that." Riding a bike may also look easy until you try it the first time. Then you discover that it takes a lot of practice. Economics is very much the same. Even after you feel comfortable with the material, it takes a lot of practice before you know how to correctly approach and conquer the problems. So get on that bike and practice!</span></div>
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<span style="line-height: 18.6667px;"><b>6.<span class="Apple-tab-span" style="white-space: pre;"> </span>WORK TOGETHER IN STUDY GROUPS TO ATTACK DIFFICULT PROBLEMS.</b></span></div>
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<span style="line-height: 18.6667px;">Explaining concepts to your classmates can be one of the best ways to solidify informa¬tion in your own memory bank and learn what you don't understand. Be sure that your participation in the study group is balanced between giving and receiving help. If you are spending a lot of time on the receiving end, you need to spend more time studying indepen¬dently before joining the group session. Watching others solve problems is no substitute for solving them yourself.</span></div>
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<span style="line-height: 18.6667px;"><b>7.<span class="Apple-tab-span" style="white-space: pre;"> </span>READ THE TEXTBOOK BEFORE CLASS.</b></span></div>
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<span style="line-height: 18.6667px;">By coming to class prepared, you will have a better understanding of the lecture, and you will be able to ask questions about the reading while that material is being covered in class. It is more awkward to raise questions on textbook material that was covered during a previous class.</span></div>
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<span style="line-height: 18.6667px;"><b>8.<span class="Apple-tab-span" style="white-space: pre;"> </span>TAKE GOOD NOTES IN CLASS.</b></span></div>
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<span style="line-height: 18.6667px;">You probably won't remember what you don't write down. A good teacher has gems of wisdom that you won't want to forget. This is also a chance to practice drawing graphs and rehearsing definitions.</span></div>
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<span style="line-height: 18.6667px;"><b>9.<span class="Apple-tab-span" style="white-space: pre;"> </span>ASK QUESTIONS IN CLASS ABOUT THE TEXTBOOK, HOMEWORK, AND LECTURE.</b></span></div>
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<span style="line-height: 18.6667px;">Don't let the lecture or the reading get ahead of you. New concepts will build on old con¬cepts and a little shyness early on can lead to a lot of confusion later. Most teachers would agree with the following principles:</span></div>
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<span style="line-height: 18.6667px;">•<span class="Apple-tab-span" style="white-space: pre;"> </span>Don't worry that asking questions will signal a lack of intelligence to your teachers; it typically has the opposite effect. Those who ask questions are generally the best students.</span></div>
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<span style="line-height: 18.6667px;">•<span class="Apple-tab-span" style="white-space: pre;"> </span>If one person has a question, it's likely that many people in the class have been wondering the same thing. They will be silently relieved that you had the courage to inquire.</span></div>
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<span style="line-height: 18.6667px;">•<span class="Apple-tab-span" style="white-space: pre;"> </span>There's no such thing as a stupid question—you're taking the course precise¬ly because you don't already know this stuff.</span></div>
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<span style="line-height: 18.6667px;"><b>10.<span class="Apple-tab-span" style="white-space: pre;"> </span>VISIT YOUR TEACHERS AFTER CLASS FOR ANSWERS TO ANY REMAINING QUESTIONS.</b></span></div>
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<span style="line-height: 18.6667px;">The above nine steps will get you far, but sometimes you will still be unclear on a few things. Do not hesitate to ask your teachers questions after class that you could not ask during class. If they cannot help you directly, they can probably help you find the answer to difficult questions using library resources, economists in the area, the Internet, or other sources of information. Remember that economics is a broad field and even the Nobel Prize winners can't answer every question on the spot. You might get a more thorough and accu¬rate answer by not always expecting an immediate response. You might ask something like, "Could you cover this in class tomorrow?"</span></div>
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Al-Mansor Abu saidhttp://www.blogger.com/profile/09355698983918954375noreply@blogger.com0tag:blogger.com,1999:blog-8177660334620280397.post-50562235610479179522016-01-14T18:32:00.000-08:002016-01-14T18:32:02.287-08:00Managerial Challenge<div style="background: white; text-align: justify;">
In the second
decade of the twenty-first century, companies all across the industrial
landscape are seeking to achieve sustainability. Sustainability is a powerful
metaphor but an elusive goal. It means much more than aligning oneself with
environmental sensitivity, though that commitment itself tests higher in
opinion polling of the latent preferences of American and European customers
than any other response. Sustainability also implies renewability and longevity
of business plans that are adaptable to changing circumstances without
uprooting the organizational strategy. But what exactly should management
pursue as a set of objectives to achieve this goal?</div>
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<span class="font01">Management
response to pollution abatement illustrates one type of sustainability
challenge. At the insistence of the Prime Minister of Canada during the Reagan
Administration, the U.S. Congress wrote a bipartisan cap-and-trade bill to
address smokestack emissions. Sulfur dioxide and nitrous oxide (SOX and NOX)
emissions precipitate out as acid rain, mist</span><span class="font01"><span style="font-size: 9.0pt;">, and ice, im</span></span><span class="font01">posing damage
downwind over hundreds of miles to painted and stone surfaces, trees, and
asthmatics. The Clean Air Act (CAA) of 1990, amended in 1997 and 2003, granted
tradable pollution allowance assets (TPAs) to known polluters. The CAA also
authorized an auction market for these TP A assets. The EPA Web site (<a href="http://www.epa.gov/">www.epa.gov</a>) displays on a daily basis the
equilibrium, market-clearing price (e.g., $250 per ton of soot) for the use of
what had previously been an unpriced common property resource—namely, acid-free
air and rainwater. Thereby, large point-source polluters like power plants and
steel mills earned an actual cost per ton for the SOX and NOX-laden soot
by-products of burning lots of high sulfur coal. These amounts were prompdy
placed in spreadsheets designed to find ways of minimizing operating costs.<sup>2</sup>
No less importantly, each polluter felt powerful incremental incentives to
mitigate compliance cost by reducing pollution. And an entire industry devoted
to developing pollution abatement technology sprang up.</span><o:p></o:p></div>
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<span class="font01"><br /></span></div>
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<span class="font01">The
TPAs granted were set at approximately 80 percent of the known pollution taking
place at each plant in 1990. For example, Duke Power's Belews Creek power plant
in northwestern North Carolina, generating 82,076 tons of sulfur dioxide acidic
soot annually from burning 400 train carloads of coal per day, was granted
62,930 tons of allowances (see Figure 1.1 displaying the 329 x 365 = 120,085
tons of nitrous oxide). Although this approach "grandfathered" a
substantial amount of</span><span class="font01"><span style="font-size: 9.0pt;"> </span></span>pollution, the gradualism of the 1990 cap-and-trade bill
was pivotally important to its widespread success. Industries like steel and
electric power were given five years of transition to comply with the regulated
emissions requirements, and then in 1997, the initial allowances were cut in
half. Duke Power initially bought 19,146 allowances for Belews Creek at prices
ranging from $131 to $480 per ton and then in 2003 built two 30-story
smokestack scrubbers that reduced the NOX emissions by 75 percent.<o:p></o:p></div>
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<span style="font-family: "Times New Roman","serif"; font-size: 12.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: MS;">Another major electric utility,
Southern Company, analyzed three compliance choices on a least-cost cash flow
basis: (1) buying allowances, (2) installing smokestack scrubbers, or (3)
adopting fuel switching technology to burn higher-priced low-sulfur coal or
even cleaner natural gas. In a widely studied case, the Southern Company's
Bowen plant in North Georgia necessitated a $657 million scrubber that after
depreciation and offsetting excess allowance revenue was found to cost $476
million. Alternatively, continuing to burn high-sulfur coal from the
Appalachian Mountain region and buying the requisite allowances was projected
to cost </span><span class="font01"><span style="font-size: 12.0pt;">$266 million.
And finally, switching to low-sulfur coal and adopting fuel switching
technology was found to cost $176 million. All these analyses were performed on
a present value basis with cost projections over 25 years.</span></span><span style="font-size: 12.0pt;"><o:p></o:p></span></div>
<div style="background: white; text-align: justify; text-indent: 12.0pt;">
<span class="font01">Southern
Company's decision to switch to low-sulfur coal was hailed far and wide as
environmentally sensitive. Today, such decisions are routinely described as a
sustainability initiative. Many electric utilities support these sustainable
outcomes of cap-and-trade policies and even seek 15 percent of their power from
renewable energy (RE). In a Case Study at the end of the chapter, we analyze
several wind power RE alternatives to burning cheap high-sulfur large carbon
footprint coal.</span><o:p></o:p></div>
<div style="background: white; text-align: justify; text-indent: 12.0pt;">
<span class="font01"><br /></span></div>
<div style="background: white; text-align: justify; text-indent: 12.0pt;">
<span class="font01">The
choice of fuel-switching technology to abate smokestack emissions was a
shareholder value-maximizing choice for Southern Company for two reasons. First,
switching to low-sulfur coal minimized projected cash flow compliance costs
but, in addition, the fuel-switching technology created a strategic flexibility
(a "real option") </span>that created
additional shareholder value for the Southern Company. In this chapter, we will
see what maximizing capitalized value of equity (shareholder value) is and what
it is not.</div>
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<b><span style="font-family: "Times New Roman","serif"; font-size: 12.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: MS;">Discussion Questions</span></b><span style="font-family: "Times New Roman","serif"; font-size: 12.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: MS;"><o:p></o:p></span></div>
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</div>
<ol>
<li><span style="font-family: 'Times New Roman', serif; font-size: 12pt;">What's the basic externality problem with acid rain?
What objectives should management serve in responding to the acid rain problem?</span></li>
<li><span style="font-family: 'Times New Roman', serif; font-size: 12pt;">How does the Clean Air Act's cap-and-trade approach
to air pollution affect the Southern Company's analysis of the previously
unpriced common property air and water resources damaged by smokestack
emissions?</span></li>
<li><span style="font-family: 'Times New Roman', serif; font-size: 12pt;">How should management comply with the Clean Air Act,
or should the Southern Company just pay the EPA's fines? Why? How would you
decide?</span></li>
<li><span style="font-family: 'Times New Roman', serif; font-size: 12pt;">Which among Southern Company's three alternatives
for compliance offered the most strategic flexibility? Explain.</span></li>
</ol>
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Al-Mansor Abu saidhttp://www.blogger.com/profile/09355698983918954375noreply@blogger.com1tag:blogger.com,1999:blog-8177660334620280397.post-68420872384479455432012-02-11T07:29:00.000-08:002012-02-11T07:34:49.358-08:00MIXED ECONOMIC SYSTEM<span style="background-color: whitesmoke; color: black; font-family: arial,sans-serif; font-size: 16px; font-style: normal; font-variant: normal; font-weight: normal; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;" title="Malaysia menduduki di bahagian tengah di antara sistem ekonomi campuran yang diamalkan oleh Amerika Syarikat dan Rusia/China."><b>Definition</b><br />Mixed economic system can be defined as an economic system that combines both a free market system and the system of planned economy.<span class="Apple-converted-space"> </span>In other words, under the system of mixed economy, most goods and services will be solved using the price mechanism and partly solved by the government.<br /><br /><b>Characteristics of mixed economy system.</b><br />There are some features of this mixed economic system.<span class="Apple-converted-space"> </span>Among these are;<br />a.<span class="Apple-converted-space"> </span>Users have the ownership on the factors of production.<br />b.<span class="Apple-converted-space"> </span>Users make economic decisions on purpose to maximize satisfaction.<br />c.<span class="Apple-converted-space"> </span>Operators for the purpose of making economic decisions to maximize profitability.<br />d.<span class="Apple-converted-space"> </span>There is government intervention in the economy, namely in the form-impose taxes on consumers and producers.<span class="Apple-converted-space"> </span>-To provide subsidies to consumers and the manufacturers are involved in the supply of goods and services-Providing control over the private sector through legislation.<br /><br /><b>Method of solving the economic base.</b><br />In the mixed economic system, there are two methods to solve the basic problems of the economy.<span class="Apple-converted-space"> </span>The first is to use the price mechanism (as in the free market system) and the second by the direct intervention by government in offering goods and services (such as the planned economy system).<span class="Apple-converted-space"> </span>Divided between the two methods of solution is dependent on the type of goods and services produced.<span class="Apple-converted-space"> </span>In the event that the goods produced are personal or economic goods, which for these goods consumers are willing to pay, the goods and services of this nature will be removed by using the price mechanism.<span class="Apple-converted-space"> </span>Second, if the goods and services that are classified as public goods, which consumers can not pay any benefits produced by the item, the goods and services shall be issued by the government.<span class="Apple-converted-space"> </span>For example, defense and security services, roads and so on.<br /><br />A.<span class="Apple-converted-space"> </span>Troubleshooting the goods and services to be produced and how much.<br />As mentioned above, if the goods are classified as personal or economic goods, it will use the price mechanism.<span class="Apple-converted-space"> </span>This means that users will create a desire in the demand curve.<span class="Apple-converted-space"> </span>In other words, consumers through the purchasing power would be willing to pay for an article is.<span class="Apple-converted-space"> </span>Then there is the demand curve D shown in the diagram above 1:11.<span class="Apple-converted-space"> </span>Second, producers will see what items are requested by users and then they will see if the item is able to be removed and would benefit him.<span class="Apple-converted-space"> </span>If they are able to and will benefit from the operation, there will be a supply curve S, as shown in the diagram above 1:11.<span class="Apple-converted-space"> </span>In the event of both the demand curve (D) and the supply curve (S) exist in the market, the goods shall be issued by the economy.<br /><br />Problem of how much these items removed will be resolved through the intersection of both demand and supply curves are.<span class="Apple-converted-space"> </span>As in figure 1.11, this economy will produce by 0Ko units, and prices available in the market by 0Po unit.<br /></span><img alt="" height="464" src="data:image/png;base64,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" width="640" /><br /><span style="background-color: whitesmoke; color: black; font-family: arial,sans-serif; font-size: 16px; font-style: normal; font-variant: normal; font-weight: normal; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;" title="Malaysia menduduki di bahagian tengah di antara sistem ekonomi campuran yang diamalkan oleh Amerika Syarikat dan Rusia/China."><br /><br />For public goods, due to interest generated by the use of the goods will be enjoyed by every one - whether they pay or not, then users will not want to pay when using the item.<span class="Apple-converted-space"> </span>The reason given is that other users who do not pay will also be able to use and will enjoy the benefits of such goods.<span class="Apple-converted-space"> </span>For example in the provision of rural roads or in town, everyone in the village or the city will use them for free.<span class="Apple-converted-space"> </span>This is because all the people in the area do not want to pay for using the road.<span class="Apple-converted-space"> </span>But if this kind of private issuers will not be willing to provide it, because they can not return from the investment made.<span class="Apple-converted-space"> </span>Since this road is vital to the public, the government will have to enter into the economy and provide the road.<span class="Apple-converted-space"> </span>Similarly, public goods such as defense services, police, schools, health and some other goods and services will be provided by the government.<span class="Apple-converted-space"> </span>In Malaysia each year, the government will present the national budget and the matter will be settled in the budget is how long the roads will be built, how many schools and hospitals and health centers will be built next year and also explained the amount of expenditure allocated to provide public goods and services.<br /><br />Two.<span class="Apple-converted-space"> </span>The solution to the problem of how goods and services at issue.<br />For personal and economic goods, such as the free market, producers will use production techniques that will produce the goods at a minimal cost.<span class="Apple-converted-space"> </span>This is because the manufacturer has the objective to maximize profits.<br /><br />For public goods, manufacturing techniques will be determined by the government.<span class="Apple-converted-space"> </span>This means that the government seems to know the efficient production techniques and better to operate.<br /><br />Three.<span class="Apple-converted-space"> </span>Solution to the problem of goods and services who are removed.<br />For personal and economic goods, this problem will be solved on the basis of the demand curve that exists in the market.<span class="Apple-converted-space"> </span>This means that to whom the goods are produced depending on the purchasing power of consumers.<span class="Apple-converted-space"> </span>But for public goods, the government will determine its own to whom the goods are released.<span class="Apple-converted-space"> </span>For example, in Malaysia the government is building schools or health centers in an area that is intended to provide such services for the population in a specific.<br /><br /><b><br />The advantage of mix of economic systems.</b><br />There are several advantages in this mixed economic system.<span class="Apple-converted-space"> </span>Among these are;</span><br />
<ol>
<li><span style="background-color: whitesmoke; color: black; font-family: arial,sans-serif; font-size: 16px; font-style: normal; font-variant: normal; font-weight: normal; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;" title="Malaysia menduduki di bahagian tengah di antara sistem ekonomi campuran yang diamalkan oleh Amerika Syarikat dan Rusia/China."><span class="Apple-converted-space"></span>Users have the freedom in owning the factors of production.</span></li>
<li><span style="background-color: whitesmoke; color: black; font-family: arial,sans-serif; font-size: 16px; font-style: normal; font-variant: normal; font-weight: normal; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;" title="Malaysia menduduki di bahagian tengah di antara sistem ekonomi campuran yang diamalkan oleh Amerika Syarikat dan Rusia/China."><span class="Apple-converted-space"></span>Users have the freedom in the use of goods and services to ensure that they will be able to maximize satisfaction.</span></li>
<li><span style="background-color: whitesmoke; color: black; font-family: arial,sans-serif; font-size: 16px; font-style: normal; font-variant: normal; font-weight: normal; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;" title="Malaysia menduduki di bahagian tengah di antara sistem ekonomi campuran yang diamalkan oleh Amerika Syarikat dan Rusia/China."><span class="Apple-converted-space"></span>Producers also can act independently in making the decision to remove an item or service, and their decisions are based on the objective to maximize profits.</span></li>
<li><span style="background-color: whitesmoke; color: black; font-family: arial,sans-serif; font-size: 16px; font-style: normal; font-variant: normal; font-weight: normal; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;" title="Malaysia menduduki di bahagian tengah di antara sistem ekonomi campuran yang diamalkan oleh Amerika Syarikat dan Rusia/China."><span class="Apple-converted-space"></span>This economic system can ensure that public goods are always on offer in the economy and this responsibility will be implemented by the government.</span></li>
<li><span style="background-color: whitesmoke; color: black; font-family: arial,sans-serif; font-size: 16px; font-style: normal; font-variant: normal; font-weight: normal; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;" title="Malaysia menduduki di bahagian tengah di antara sistem ekonomi campuran yang diamalkan oleh Amerika Syarikat dan Rusia/China."><span class="Apple-converted-space"></span>The government will provide subsidies in certain sectors deemed essential to the welfare of the people of the country.</span></li>
<li><span style="background-color: whitesmoke; color: black; font-family: arial,sans-serif; font-size: 16px; font-style: normal; font-variant: normal; font-weight: normal; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;" title="Malaysia menduduki di bahagian tengah di antara sistem ekonomi campuran yang diamalkan oleh Amerika Syarikat dan Rusia/China."><span class="Apple-converted-space"></span>Government can play a role as a stabilizer to the unstable economic conditions such as inflation and recession, which is to carry out the policies of fiscal and monetary.</span></li>
<li><span style="background-color: whitesmoke; color: black; font-family: arial,sans-serif; font-size: 16px; font-style: normal; font-variant: normal; font-weight: normal; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;" title="Malaysia menduduki di bahagian tengah di antara sistem ekonomi campuran yang diamalkan oleh Amerika Syarikat dan Rusia/China."><span class="Apple-converted-space"></span>Government can create conditions more equilibrated distribution of income among its citizens, namely through tax policies and subsidies.</span></li>
</ol>
<span style="background-color: whitesmoke; color: black; font-family: arial,sans-serif; font-size: 16px; font-style: normal; font-variant: normal; font-weight: normal; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;" title="Malaysia menduduki di bahagian tengah di antara sistem ekonomi campuran yang diamalkan oleh Amerika Syarikat dan Rusia/China."><br />The weakness of mixed economic systems.<br />There are several disadvantages of this mixed economic system.<span class="Apple-converted-space"> </span>Among these are;<br />a.<span class="Apple-converted-space"> </span>The tax system implemented by the government would interfere with people's welfare level in the country, especially for rolls rich.<br />b.<span class="Apple-converted-space"> </span>The tax system will also affect the course of trade flows that exist in a country.<br /><br /><b>THE REALITY.</b><br />In the 21st century, the economic system adopted by all governments in the world is more focused on mixed economic system.<span class="Apple-converted-space"> </span>If the practice is usually a country that is free market economic system in countries such as the United States, England and several European countries, and examples of countries that have a system of planned economy is like Russia and China.<span class="Apple-converted-space"> </span>But in the 21st century all these countries have not adopted the economic system mentioned above.<span class="Apple-converted-space"> </span>For example, the United States, England, Germany and others have already intervened in determining their economic activities.<span class="Apple-converted-space"> </span>This intervention is in the form of a levy on people and companies operating in these countries.<span class="Apple-converted-space"> </span>In the recession year of 2009, all governments in these countries have already taken over some of the major industries, such as the United States government has already taken over several car manufacturers like General Motors, and some of the country's largest bank.<br /><br />Similarly, in Russia and China, which used to practice the economic system that is related to the planned economy system, but now they have been encouraging foreign companies to invest in these countries.<span class="Apple-converted-space"> </span>In other words, in the 21st century is all communist countries has been changing economic policies of the planned economy system to a system of mixed economy.<br /><br />Malaysia is a country that mixed economic system.<span class="Apple-converted-space"> </span>In Malaysia the economic activities carried out by two groups, the first is a group of entrepreneurs who carry out production activities of goods and services demanded by Malaysians as well as for exports.<span class="Apple-converted-space"> </span>At the same time the government has carried out economic activities in providing public goods like roads, schools, health and others.<span class="Apple-converted-space"> </span>Besides the state-owned companies such as Khazanah Berhad, is also actively involved in economic activities.<span class="Apple-converted-space"> </span>The government also impose taxes and provide subsidies to ensure that the activities and welfare of its citizens guaranteed.<br /><br />At the same time the government carries out economic activities based on Islamic economic system, namely by providing Islamic banking system.<span class="Apple-converted-space"> </span>In the year 2010 in Malaysia, there are three major Islamic bank, Bank Islam, Bank Transactions and Bank Al-Rajhi.<span class="Apple-converted-space"> </span>IN addition to the conventional banks (banks that operate based on usury or interest rate) has been offering Islamic banking.<span class="Apple-converted-space"> </span>However, the Islamic banking system in Malaysia is very small compared with the conventional banking system.<span class="Apple-converted-space"> </span>Thus we can classify that the economic system practiced in Malaysia is more like a conventional banking economic system.<span class="Apple-converted-space"> </span>Thus we can classify that the economic system practiced in Malaysia is more like a system of mixed economy.<span class="Apple-converted-space"> </span>But differences between countries in the world in the course of this economic system can be summarized as in figure 1.<span class="Apple-converted-space"> </span>12.<br /></span><img alt="" height="315" src="data:image/png;base64,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width="640" /><br /><span style="background-color: whitesmoke; color: black; font-family: arial,sans-serif; font-size: 16px; font-style: normal; font-variant: normal; font-weight: normal; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;" title="Malaysia menduduki di bahagian tengah di antara sistem ekonomi campuran yang diamalkan oleh Amerika Syarikat dan Rusia/China.">Figure 1.12 shows the difference in per cent of government intervention in the economic system adopted by some countries in the sample.<span class="Apple-converted-space"> </span>For example, the United States have a system of mixed economy but the government's role is much smaller compared with the government's intervention in countries such as Russia and China.<span class="Apple-converted-space"> </span>Malaysia was ranked in the middle of the mixed economic system adopted by the United States and Russia / China.</span>Al-Mansor Abu saidhttp://www.blogger.com/profile/09355698983918954375noreply@blogger.com2tag:blogger.com,1999:blog-8177660334620280397.post-72735543907090940032011-05-23T09:45:00.000-07:002011-05-23T16:35:47.480-07:00TOPIC 1: HUMAN RESOURCE ECONOMICS AND REQUIREMENTS LEARNING OUTCOMESTOPIC 1: HUMAN RESOURCE ECONOMICS AND REQUIREMENTS
<br />LEARNING OUTCOMES
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<br />At the end of this topic you should be able to:
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<br /><ol><li>Definition describes the economy;</li><li>State economic resources and human requirements;</li><li>Describes the basic concepts of economics;</li><li>Relevance of the concept of economic-base kosep production possibilities frontier and</li><li>Stating the impact of technological change, the quantity of resources and population of the production possibilities frontier. </li></ol>
<br />Did you learn the importance of economics? Have you ever wondered what would happen to the world economy if oil resources run out? Is the rate of inflation will increase? The public knows that rising inflation will affect the price of goods. Assume the income did not change, when the price of goods more expensive, our purchasing power will decrease. As consumers, what will happen to us? Hence, it is important for us to learn economics as it relates to our lives.
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<br />We start with the first discussion of this topic see the definition of economic production, followed by economic resources and its relationship to the requirements to be fulfilled in life. Then, we'll see why economics is important? Next, we will explore basic concepts such as economic deprivation, choice and opportunity cost. Relevance of these concepts will be explained later using production possibility curve. Finally, we will discuss the impact of technological change, the quantity of resources and population of the Production Possibility Curve. In short, this topic will get us acquainted with the study of economics.
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<br /><span style="font-weight: bold;">1.1 DEFINITION OF ECONOMICS </span>
<br />The word economy comes from the Greek word "oikou" and "nomos" ("oikounomos'). "Oikou" means that the household while the "nomos" means the regulations. In other words, economic regulation of household means, which is studying how households allocate income earned (albeit limited) efficiently.
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<br />One of human nature is the will to achieve a higher welfare. In other words, human beings are never satisfied with what was achieved. When the old requirements have been met, then came the new requirements. For example, when we already have a motorcycle, we will require a car while we can not afford (the lack of financial resources).
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<br />Thus, the knowledge economy exists because of human requirements has not been limited, while the economic resources available is limited. Due to economic resources (land, labor, capital and producers) is limited, so the goods and services produced is limited and fails to meet all human needs.
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<br />As a result of the imbalance that exists between the requirements of people who have never limited the economic resources are limited, so we can define the economy as a social science that studies the social behavior, which is how people use the resources limited for economic meet the requirements of those who have not been limited.
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<br /><span style="font-weight: bold;">Self Check 1.1 </span>
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<br /><span style="font-style: italic;">1. In your opinion, what are the the household? </span>
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<br /><span style="font-style: italic;">2. What economic resources? How does it differ from the will of man? </span>
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<br /><span style="font-style: italic;">3. Discuss the main reasons for the commencement of study in economics.
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<br />1.2 ECONOMIC RESOURCES (FACTORS OF PRODUCTION)
<br />Generally, we can categorize the economic resources to the four in terms of land, labor, capital, and producers. Please refer to Figure 1.1. Economic resources was also identified as factors of production. These resources are used in the production process to produce the goods and services. However, the economic resources available is limited and can only meet part of the human requirements.
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<br />1.2 ECONOMIC RESOURCES (FACTORS OF PRODUCTION)
<br />Generally, we can categorize the economic resources to the four in terms of land, labor, capital, and producers. Please refer to Figure 1.1. Economic resources was also identified as factors of production. These resources are used in the production process to produce the goods and services. However, the economic resources available is limited and can only meet part of the human requirements.
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<br />Figure 1.1: Sources of economic
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<br />Information about economic resources are given as follows:
<br />Al-Mansor Abu saidhttp://www.blogger.com/profile/09355698983918954375noreply@blogger.com0tag:blogger.com,1999:blog-8177660334620280397.post-81719764128332541822010-09-13T06:07:00.001-07:002010-09-13T06:12:02.032-07:00Microeconomics Could Serve You Well<a onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}" href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhofspB-ah0W6gzFfh3VEcbNNocXcIslC53JpRj9aH00EoCBKr6gekxyYrWZNeTVWfXVGSy9EMu_Yd1kFv6qANVPfCnKXSuvyxkhlZLIwcijYq6THLRjR7dXnOxfPBr46ajjki4GM-_OOs/s1600/index.jpg"><img style="float: left; margin: 0pt 10px 10px 0pt; cursor: pointer; width: 218px; height: 171px;" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhofspB-ah0W6gzFfh3VEcbNNocXcIslC53JpRj9aH00EoCBKr6gekxyYrWZNeTVWfXVGSy9EMu_Yd1kFv6qANVPfCnKXSuvyxkhlZLIwcijYq6THLRjR7dXnOxfPBr46ajjki4GM-_OOs/s320/index.jpg" alt="" id="BLOGGER_PHOTO_ID_5516385179951595362" border="0" /></a>Well, it looks like many small towns and communities throughout the United States now take bull by the horns, and work with associations of local economic development, city analysts, and trading rooms. They want to get their economy cooking again, and they are tired sigh and moan, and complain about the global economic downturn, the price of real estat, and all the "For Rent signs" in the center of the shopping-center business is no longer in LB.<br /><br />City government know they need the tax receipt to those small businesses want less regulation, and those who wish to work openly. But before you go and join one of the organizations or start installing two cents, I believe you need to know a little about the micro economy. Now, you may be able to go online, or go to the bookstore and take a book on the topic. However, if you really want to learn the basic principles of micro economics, I suggest you read some of the older text books until you have a good working knowledge base.<br /><br />I realize of course many who have not read the book since economics courses or high school, but when you pull out one of your old text books, or can go online and buy a micro-economic books to help you refresh your memory. Let me suggest a few books as I have in my personal library has helped me very much, not only with the knowledge of my own personal work, and my writing, but also my ability to describe the micro economy to others when I was sitting at the Symposium , conference, or talk with other business leaders;<br /><br />1. "Micro Economics," by Edwin G. Dolan and Lindsay D. David, 1986<br />2. "Micro Economic Theory," by Dominick Salvatore, 1974<br /><br /><br />Of course, I recommend two books, or books like them. Many of the books of the new economy is too politically correct, and a little bit tired in their view of capitalism. Capitalism and free market system is very simple and at the micro economic level you can see the things that happen in real-time, as long as you understand what's happening, you can help increase sales, increase income tax, and get your city moving again . Please consider this.<br /><br />Lance Winslow is the founder retired from Nationwide Franchise Chain, and now run line Think Tank. Lance Winslow believes the U.S. economy.Al-Mansor Abu saidhttp://www.blogger.com/profile/09355698983918954375noreply@blogger.com0tag:blogger.com,1999:blog-8177660334620280397.post-28626314899386224462010-09-08T06:48:00.000-07:002010-09-08T06:53:01.155-07:00Micro Economics - Understanding the Law of Demand and Supply<a onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}" href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjxVUuc7RJe-hM4rd8wCM0aeZUFCeIg3ikAFDrfu-wzIY7loQzRDgVxAM3WC5WCb-2_rUV6X79PgJGf6OjDjWzZ8XhOOr9riQaYZgQ1RiqtZzOV_cPn91-aHDB1wW66cTa0m85BfIlJbR0/s1600/supply_and_demand.gif"><img style="float: left; margin: 0pt 10px 10px 0pt; cursor: pointer; width: 320px; height: 304px;" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjxVUuc7RJe-hM4rd8wCM0aeZUFCeIg3ikAFDrfu-wzIY7loQzRDgVxAM3WC5WCb-2_rUV6X79PgJGf6OjDjWzZ8XhOOr9riQaYZgQ1RiqtZzOV_cPn91-aHDB1wW66cTa0m85BfIlJbR0/s320/supply_and_demand.gif" alt="" id="BLOGGER_PHOTO_ID_5514540022048434002" border="0" /></a>Micro-economy is a concern with<br /><ol><li>Determining the price we pay for products and services.</li><li>What is the output required by the market.</li><li>The effects of government intervention in market forces.</li></ol>Understanding the micro-economy will help us to analyze the nature of the offer and demand concepts and how they affect the operation of a market economy.<br /><br />A. Request<br />In the case of the micro economy, demand is defined as the relationship between product prices and customers' desire to buy a certain quality.The laws also demand to price and quality of the sale, if such price increase in the quality of product sold decrease and the price, the quality of reduction products sold increased.<br /><br />B. Supply<br />Supply results reflect the readiness of suppliers to produce and sell at market prices that occurred and these factors affect all high supplier. provided. For most products, the amount offered will be increased by increasing the price level, all other factors remain constant.<br />Supply law determines as a) the amount offered to increase the price.<br />b) Quantities offered smaller with lower prices.<br />c) manufacturers increase their product price increase supply.<br /><br />C. Demand and supply Equilibrium<br />When prices fell to the buyer willing to pay, it resulted in a balance. But the effect occurs when the price is too low. In fact, the strength of demand and supply leading to equilibrium price and quantity.<br />a) Because the demand is greater than supply, price level increases.<br />b) A greater supply than demand, price level fell.<br />c) Only one equilibrium price guarantee<br /><br />D. Other influences have four fundamental change we can learn, any changes affecting the supply or demand:<br />a) a positive demand trends will increase demand.<br />b) a negative demand shift will decrease demand.<br />c) positive supply shift will increase demand.<br />s) negative supply shift will decrease demand.<br /><br />E. Government intervention<br />Government intervention designed to achieve:<br />a) the fair distribution of income among individuals and regions.<br />b) To promote the employment and income growth.<br />c) To protect low-income recipients.<br />and include:<br />a) the minimum wage.<br />b) rent control.<br />c) The Council Farm marketing.<br />d) Tax.Al-Mansor Abu saidhttp://www.blogger.com/profile/09355698983918954375noreply@blogger.com0tag:blogger.com,1999:blog-8177660334620280397.post-66618366661137512322010-03-23T06:28:00.000-07:002010-03-23T06:38:54.588-07:00Monopoly, Monopolistic and Oligopoly5) Monopolies, oligopolies, and monopolistic competitive industries all<br />A) earn positive profits in the long run.<br />B) have market power.<br />C) are completely unconstrained in their pricing.<br />D) raise price and quantity over what would occur in perfect competition in order to maximize their profits.<br />Answer:B<br /><br />7)A monopoly is an industry with<br />A)a single firm in which the entry of new firms is blocked.<br />B)a small number of firms each large enough to impact the market price of its output.<br />C)many firms each able to differentiate their product.<br />D)many firms each too small to impact the market price of its output.<br />Answer:A<br /><br />8)An oligopoly is an industry market structure with<br />A)a single firm in which the entry of new firms is blocked.<br />B)a small number of firms each large enough to impact the market price of its output.<br />C)many firms each able to differentiate their product.<br />D)many firms each too small to impact the market price.<br />Answer:B<br /><br />9) Monopolistic competition is an industry market structure with<br />A) single firm in which the entry of new firms is blocked.<br />B) small number of firms each large enough to impact the market price of its output.<br />C) many firms each able to differentiate their products.<br />D) many firms each too small to impact the market price of its output.<br />Answer:C<br /><br />13)When ________ substitutes exist, a monopolist has ________ power to raise price.<br />A) more; more<br />B) more; less<br />C) fewer; less<br />D) no; infinite<br />Answer:B<br /><br />17)In a monopolistic industry there is(are)<br />A) many firms and free entry of new firms.<br />B) many firms and entry of new firms is blocked.<br />C) a single firm and free entry of new firms.<br />D) a single firm and entry of new firms is blocked.<br />Answer:D<br /><br />Refer to the information provided in Figure 13.1 below to answer the question that follows.<br /><br /><a onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}" href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEioVevAZBEMkDV2YXBA_Wg1gL_hXQdsXsKzsR7bpsxG_gmTIWH5xSD0ttlacvCeLDjNEhWgDtZ-lJXA9J04PF0HqYVp6DDkEkZtp4ctrFlm11Mfi2IkWGzeTg7AKYTh5wPsDGL6_KxPqPs/s1600-h/Untitled.jpg"><img style="float: left; margin: 0pt 10px 10px 0pt; cursor: pointer; width: 315px; height: 320px;" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEioVevAZBEMkDV2YXBA_Wg1gL_hXQdsXsKzsR7bpsxG_gmTIWH5xSD0ttlacvCeLDjNEhWgDtZ-lJXA9J04PF0HqYVp6DDkEkZtp4ctrFlm11Mfi2IkWGzeTg7AKYTh5wPsDGL6_KxPqPs/s320/Untitled.jpg" alt="" id="BLOGGER_PHOTO_ID_5451821066932378018" border="0" /></a>18)Refer to Figure 13.1. The demand curve facing an individual producer of wheat is most likely represented by<br />A) Panel A.<br />B) Panel B.<br />C) Panel C.<br />D) Panel D.<br />Answer:B<br /><br />19)Refer to Figure 13.1. The demand curve facing an electric company is most likely represented by<br />A) Panel A.<br />B) Panel B.<br />C) Panel C.<br />D) Panel D.<br />Answer:A<br /><br />20)Refer to Figure 13.1. The demand curve facing Microsoft is most likely represented by<br />A) Panel A.<br />B) Panel B.<br />C) Panel C.<br />D) Panel D.<br />Answer:A<br /><br />21)Refer to Figure 13.1. The demand curve for insulin is most likely represented by<br />A) Panel A.<br />B) Panel B.<br />C) Panel C.<br />D) Panel D.<br />Answer:C<br /><br />22)Firms with market power must decide all of the following EXCEPT<br />A) how much to supply in each input market.<br />B) how much to produce.<br />C) how to produce it.<br />D) what price to charge for their output.<br />Answer:A<br /><br />1) The music production industry is an example of a(n) ________ industry. <br />A) perfectly competitive <br />B) monopolistic <br />C) monopolistically competitive <br />D) oligopolistic <br />Answer:D<br /> <br />2)Of the four oligopolistic markets below, in which is there considerable price competition? <br />A)music production industry <br />B)stent industry <br />C)airline industry <br />D)high-definition DVD industry <br />Answer: A <br /><br />3)In general, oligopolists compete <br />A)on price alone. <br />B)on many dimensions except for price. <br />C)on price, R&D, and marketing and advertising. <br />D)on quality alone. <br />Answer:C<br /> <br />4)To determine their optimal strategy, oligopolists must ________ to their strategy. <br />A)anticipate the reaction of their customers <br />B)anticipate the reaction of their rivals <br />C)anticipate the reaction of government <br />D)both (A) and (B) are correct. <br />Answer:D<br /> <br />6)A(n) ________ industry has a single, unique product and blocked entry. <br />A)perfectly competitive <br />B)monopolistically competitive <br />C)monopolistic <br />D)oligopolistic <br />Answer:C<br /> <br />7) A few firms each large enough to influence market price characterizes the ________ market structure. <br />A) perfect competition <br />B) monopolistic competition <br />C) oligopoly <br />D) monopoly <br />Answer:C<br /> <br />8) Which of the following is the best example of an oligopolistic industry? <br />A) grocery stores <br />B) automobiles <br />C) electric power <br />D) designer clothes <br />Answer:B<br /> <br />9)Products may be homogeneous or differentiated in the ________ market structure. <br />A)perfectly competitive <br />B)monopolistic <br />C)monopolistically competitive <br />D)oligopolistic <br />Answer:D<br /> <br />11)Oligopoly is difficult to analyze because <br />A) there is no price competition among oligopolistic firms. <br />B) of the complex interdependence that usually exists among oligopolistic firms. <br />C) price is NOT a decision variable for oligopolistic firms. <br />D) there is price competition among oligopolistic firms but no competition on product quality. <br />Answer:B <br /><br />12) The four largest firms account for approximately 90% of U.S. beer sales. The U.S. beer industry would be best classified as a(n) <br />A) perfectly competitive industry. <br />B) monopolistically competitive industry. <br />C) oligopoly. <br />D) monopoly. <br />Answer:C<br /> <br />14)Oligopolistic firms are <br />A) able to influence price only if the oligopolist's products are standardized. <br />B) able to influence price only if the oligopolist's products are differentiated. <br />C) able to influence price regardless of whether or not the product is differentiated or standardized by virtue of their size. <br />D) unable to influence price regardless of whether or not the product is differentiated or standardized. <br />Answer:CAl-Mansor Abu saidhttp://www.blogger.com/profile/09355698983918954375noreply@blogger.com0tag:blogger.com,1999:blog-8177660334620280397.post-9903171944321663662010-03-23T05:52:00.000-07:002010-03-23T06:39:54.513-07:00Cost1) Assume firms in an industry break even. New investors ________ attracted to the industry and current ones ________ running away from it.<br />A) are not; are not<br />B) are not; are<br />C) are; are not<br />D) are; are<br />Answer:A<br /><br />2) Firms that are "breaking even" are<br />A) earning zero economic profits.<br />B) earning less than a normal rate of return.<br />C) shutting down in the short run.<br />D) All of the above are correct.<br />Answer:A<br /><br />3) Firms earning a profit will want to ________ their profits in the short run while firms suffering losses will want to ________ their losses.<br />A) maximize; maximize<br />B) maximize; minimize<br />C) minimize; maximize<br />D) minimize; minimize<br />Answer:B<br /><br />4)In the short run,<br />A)all firms that earn a loss will shut down.<br />B)if current firms are earning a profit, new firms will enter the industry.<br />C)firms act such that they minimize losses or maximize profits.<br />D)All of the above are correct.<br />Answer:C<br /><br />Refer to the information provided below in Figure 9.1 to answer the questions that follow.<br /><br /><a onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}" href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEggzL0aeBdoF7vDP1elutF3_7tuIwBw3ESIFtGADj77R5EgQqX1a4Yr9Blc2izjazJodxFZOucUv4lJxMhGI2TY7Z5wF-nK50fX6aLSI6FqKRReaKUIlLy0mK3ewzNPqY4MjVdofStBAdE/s1600-h/Untitled.jpg"><img style="float: left; margin: 0pt 10px 10px 0pt; cursor: pointer; width: 320px; height: 263px;" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEggzL0aeBdoF7vDP1elutF3_7tuIwBw3ESIFtGADj77R5EgQqX1a4Yr9Blc2izjazJodxFZOucUv4lJxMhGI2TY7Z5wF-nK50fX6aLSI6FqKRReaKUIlLy0mK3ewzNPqY4MjVdofStBAdE/s320/Untitled.jpg" alt="" id="BLOGGER_PHOTO_ID_5451813273467713362" border="0" /></a>25) Refer to Figure 9.1. This farmer maximizes profits by producing ________ bushels of wheat.<br />A) 6<br />B) 9<br />C) 12<br />D) 16<br />Answer:C<br /><br />26)Refer to Figure 9.1. If this farmer maximizes profits, his total costs will be<br />A) $11.<br />B) $66.<br />C) $90.<br />D) $132.<br />Answer:D<br /><br />27) Refer to Figure 9.1. If this farmer maximizes profits, his TVC will be<br />A) $24.<br />B) $42.<br />C) $108.<br />D) $255.<br />Answer:C<br /><br />28)Refer to Figure 9.1. If this farmer maximizes profits, his fixed costs will be<br />A) $0.<br />B) $24.<br />C) $45.<br />D) indeterminate unless we know the level of output the firm is producing.<br />Answer:B<br /><br />29)Refer to Figure 9.1. If this farmer maximizes profits, his total revenue will be<br />A) $90.<br />B) $135.<br />C) $180.<br />D) $240.<br />Answer:C<br /><br />30) Refer to Figure 9.1. If this farmer maximizes profits, his profits will be<br />A) -$24.<br />B) $45.<br />C) $48.<br />D) $72.<br />Answer:C<br /><br />31)Refer to Figure 9.1. If this farmer maximizes profits, his operating profit (or loss) will be<br />A) -$24.<br />B) $48.<br />C) $72.<br />D) $156.<br />Answer:C<br /><br />32)Refer to Figure 9.1. This farmer will earn zero operating profit if price will be<br />A) $7.<br />B) $9.<br />C) $10.<br />D) $11.<br />Answer:A<br /><br />33) Refer to Figure 9.1. This farmer will earn zero economic profit if price will be<br />A) $7.<br />B) $9.<br />C) $10.<br />D) $11.<br />Answer:C<br /><br />34)Refer to Figure 9.1. This farmer's shutdown point price is<br />A) $0.<br />B) $4.<br />C) $7.<br />D) $10.<br />Answer:C<br /><br />Refer to the information provided in Figure 9.7 below to answer the questions that follow.<br /><br /><a onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}" href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgfUPJutFKeaW22rL747HFjuDnqbSqyddyDsxB2i8KQP9WiCTb5IwmFBb75P4Tm2cA5pqW0AyB9iVFR1gBgR5J_1sWirkIajjPIO7d9MorziqvIout-uceIz98DG-aiaUrCOpG9TXGSW1U/s1600-h/Untitled.jpg"><img style="float: left; margin: 0pt 10px 10px 0pt; cursor: pointer; width: 320px; height: 131px;" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgfUPJutFKeaW22rL747HFjuDnqbSqyddyDsxB2i8KQP9WiCTb5IwmFBb75P4Tm2cA5pqW0AyB9iVFR1gBgR5J_1sWirkIajjPIO7d9MorziqvIout-uceIz98DG-aiaUrCOpG9TXGSW1U/s320/Untitled.jpg" alt="" id="BLOGGER_PHOTO_ID_5451814941608771730" border="0" /></a>35) Refer to Figure 9.7. In which of the following price ranges will the firm continue to operate but at a loss?<br />A) $5-$6<br />B) $6-$7<br />C) $7-$8<br />D) $8-$9<br />Answer:B<br /><br />36)Refer to Figure 9.7. The firm's shut down point is at a price of<br />A) $5<br />B) $6<br />C) $7<br />D) $8<br />Answer:B<br /><br />37)Refer to Figure 9.7. Suppose demand for wheat is initially D2. If consumer incomes increase, then demand for wheat will shift to ________. This will ________ the equilibrium price of wheat and individual profit maximizing firms will produce ________ bushels of wheat.<br />A) D3; increase; 15<br />B) D1; increase; 10<br />C) D3; decrease; 7<br />D) D1; decrease; 0<br />Answer:A<br /><br />38)Refer to Figure 9.7. Suppose demand for wheat is initially D2. If the price of rice (a substitute for wheat) falls, then demand for wheat will shift to ________. This will ________ the equilibrium price of wheat and individual profit maximizing firms will produce ________ bushels of wheat.<br />A) D3; increase; 15<br />B) D1; increase; 13<br />C) D3; decrease; 10<br />D) D1; decrease; 0<br />Answer:D<br /><br />39) Refer to Figure 9.7. If demand for wheat is D2, then a profit maximizing firm will produce ________ units and earn a profit of ________.<br />A) 13; $0<br />B) 7; $0<br />C) 13; $91<br />D) 15; $30<br />Answer: B<br /><br />40)Refer to Figure 9.7. If demand for wheat is D3, then a profit maximizing firm will produce ________ units and earn ________.<br />A) 15; positive profits<br />B) 9; positive profits<br />C) 12; negative profits<br />D) 13; exactly a normal return<br />Answer:A<br /><br />41) Refer to Figure 9.7. If demand for wheat is D3, then in the long run<br />A) the firm will shut down.<br />B) the firm will exit the industry.<br />C) new firms will enter the industry and the current firms will expand production.<br />D) None of the above is correct.<br />Answer:C<br /><br />42)Refer to Figure 9.7. If demand for wheat is D1, then a profit maximizing firm will produce ________ units and earn ________.<br />A) 0; negative profits<br />B) 5; zero profits<br />C) 10; negative profits<br />D) 12; positive profits<br />Answer: A<br /><br />43) Refer to Figure 9.7. If demand for wheat is D1, then in the long run<br />A) the firm will increase its price and output.<br />B) the firm will exit the industry.<br />C) new firms will enter the industry and the current firms will expand production.<br />D) firms will increase their output so that their average fixed cost per unit falls.<br />Answer: B<br /><br />44)Operating profit is<br />A) TR - TC.<br />B) TR - TFC.<br />C) TR - TVC.<br />D) TVC - TFC.<br />Answer:C<br /><br />45)Economic profit is<br />A) TR - TC.<br />B) TR - TFC.<br />C) TR - TVC.<br />D) TVC - TFC.<br />Answer:A<br /><br />46)A firm earns an operating profit if<br />A) revenues exceed variable costs of production.<br />B) revenues equal fixed costs.<br />C) price is less than average variable costs of production.<br />D) price equals marginal cost.<br />Answer: A<br /><br />47) A firm suffers an operating loss if<br />A) price exceeds average variable cost but is less than average total cost.<br />B) price exceeds marginal cost.<br />C) revenues are smaller than total variable costs of production.<br />D) revenues are greater than total variable costs of production but less than total costs.<br />Answer:C<br /><br />21) Under perfect competition, <br />A) resources are allocated among firms efficiently.<br />B) final products are distributed among households efficiently.<br />C) the system produces the goods and services consumers want.<br />D) All of the above are correct.<br />Answer:D<br /><br />22)Which assumption leads to an efficient allocation of resources among firms?<br />A) Factor markets are open and competitive.<br />B) All firms pay the same prices for identical inputs.<br />C) Firms behave so as to maximize their profits.<br />D) All of the above are correct.<br />Answer:D<br /><br />26) In perfect competition, ________ is the condition that ensures that firms produce the right things.<br />A) MUX = PX.<br />B) P = MC.<br />C) P = ATC.<br />D) MRPL = ATC.<br />Answer: B<br /><br />9) The following market structure is an example of an imperfect market:<br />A) monopoly.<br />B) oligopoly.<br />C) monopolistic competition.<br />D) All of the above are correct.<br />Answer:DAl-Mansor Abu saidhttp://www.blogger.com/profile/09355698983918954375noreply@blogger.com0