AP Environmental Science 2016-2017 Summer Assignment

AP Environmental Science 2016-2017 Summer Assignment Welcome to AP Environmental Science! I m looking forward to working with you next year. In order to cover all the material for APES before the AP exam next May and to set the tone for the class you will need to complete some work during the summer. There are three parts to the summer assignment, all will be collected on the first day of class. If you have any questions about the assignment, feel free to email me at coy.zerhusen@oldham.kyschools.us. The summer assignment will be counted as a grade. All work turned in must be your own work. The assignment is as follows: *Come check out a book from in room 237 before school is out. Part I: Introduction to AP Environmental Science Reading Due the 1 st day of school During the school year we will be pushed to get all of the content in by the AP test, so you will need to do a little reading before school begins (I know you are excited). You will need to read chapters 1 and 2 in the Environmental Science for AP book by Friedland and Relyea. You need to come check out a book from me! As you read answer the reading question guides (1A, 1B, 2A, 2B) these will be turned in the first day of school. Chapter 1 and Chapter 2 Reading Guides are in this document, following this page. Each reading guide has a video to watch with questions to answer and topics to respond to. Part II: APES Math and Data Analysis Review Due the 1 st day of school The packet is included in this document, following the reading guides Answer the questions on your own paper so you don t have to print off the packet (unless you want to). YOU CANNOT USE A CALCULATOR ON THE AP TEST. I don t know why, but you can t, so practice your multiplication and division by hand while doing this work. We will practice the math throughout the year, but this assignment will introduce what you will need to know. If you get stuck or have any questions, email me, ask others for help, or look up tutorials online. Don t get frustrated and quit! Part III: Environmental Quick Facts Due the 1st day of school. The assignment is the final page of this document. The AP Environmental Test has a lot of random facts that they will expect you to remember. Look up the different laws, chemicals, and disasters that are often referenced on the AP test.

Chapter 1: Introduction to Environmental Science & Sustainability Reading Questions 1A Opening Story: The Mysterious Neuse River Fish Kill Environmental science offers important insights into our world and how we influence it. Humans alter natural systems. Environmental scientists monitor natural systems for signs of stress. 1. What happened in the Neuse River, and how did it affect the local population & economy? 2. What is the importance of studying systems in environmental science? Why can t we just study isolated events or isolated individuals? 3. Environmental Science is interdisciplinary, in that it includes life sciences, natural sciences, and social sciences to study the interactions of living, nonliving and uniquely human systems to understand the world. How does this blending present both challenges and opportunities to environmental scientists? 4. Tool use and social cooperation have allowed humans to alter their environment enormously. What advantages do these traits give humans in outcompeting other species? 5. So far in history, technological development has led to both increased human well-being and increased environmental disruption. Why has this been the case? 6. List what you think are the 3 BIGGEST ways in which humanity has transformed nature, and evaluate what you think their benefits to us and their impacts on the environment have been. 1. 2. 3. Activity Benefits of Activity Environmental Impacts 1

7. What advantages do ecosystems with higher species diversity have over those with lower species diversity? 8. There are at least 2 million species on Earth, and species have been naturally evolving and going extinct for billions of years (in fact, over 99% of all species that ever existed are now extinct!). Given these facts, why do we care if human activity is driving other species extinct as we grow? 9. Although total world grain production is increasing, per capita production remains flat. What factors have contributed to this situation? 10. What do you think is a higher priority: maximizing total food production, or maximizing equality of access to food for all people? 11. What two major human activities have had the greatest impact on the increase of greenhouse gases, and why? 12. Do you think it is ethical for countries to forcefully restrict their population s growth by limiting the ability of people to have as many children as they want? Explain. 13. What is the difference between renewable and nonrenewable resources? 14. How does resource use vary between developed countries and developing ones? 2

Video Questions 1A Watch Let the Environment Guide Our Development (http://www.youtube.com/watch?v=rgqtrlixyr4) (Or www.ted.com/talks/johan_rockstrom_let_the_environment_guide_our_development.html ) Read the Focus Questions in advance to help you catch key information. Take notes while watching, then summarize and answer the questions when you finish. Take Notes as you watch: Summarize Main Ideas Focus Questions: 1. What does Rockstrom mean by the need to bend the curves? (5:05) 2. What are the planetary boundaries, and why do we need to be aware of thresholds? 3. How can a shift in mindset turn crises in to opportunities? Respond with your own thoughts, questions, connections, and conclusions: 3

Reading Questions 1B Human well-being depends on sustainable practices. Science is a process. 1. What happened on Easter Island, and why is it significant? 2. What does sustainable development involve? How can we determine if an individual or society is living sustainably? 3. How can we define what humans basic needs truly are? Do they differ from one person to another? 4. What does an ecological footprint measure? 5. It has been estimated that the city of London has an ecological footprint 200x the size of its physical footprint. What does this mean? 6. Humanity s ecological footprint is already overburdening the Earth, but, approximately 1/3 of the world population lives on less than $2 per day. What are some possible solutions to providing sufficient resources for everyone without causing ecological collapse? 7. Why is the scientific method necessary in order to advance human understanding of the world? 4

8. Complete the following chart regarding the purpose of each step in the scientific method: Step Purpose/Importance Observation Form Hypothesis Collect Data/Conduct Experiment Interpret Results Disseminate Findings 9. What is the purpose of a control group in an experiment? 10. Why is peer review of research so important in establishing scientific theories? 11. Why might the results of a controlled experiment differ from the results of a natural experiment when trying to answer a given question? 12. Why are both natural AND controlled experiments necessary to increasing scientific understanding, and how do their roles in the scientific process differ? 13. What factors make research in environmental science particularly difficult? 14. What are the goals of the environmental justice movement, and why are they relevant to sustainability? 5

Video Questions 1B Watch the video Route to a Sustainable Future (http://www.youtube.com/watch?v=zjcx8tr7eo4) (Or www.ted.com/talks/alex_steffen_sees_a_sustainable_future.html) Read the Focus Questions in advance to help you catch key information. Take notes while watching, then summarize and answer the questions when you finish. Take Notes as you watch: Summarize Main Ideas Focus Questions: 1. What is problematic about the Western Lifestyle that other countries want to adopt? 2. What does Steffen mean by On the one hand we have the unthinkable, and on the other hand we have the unimaginable? (3:24) 3. Which sustainable solutions that Steffen presents can make the largest positive impact? Respond with your own thoughts, questions, connections, and conclusions: 6

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Unit 2: Systems and Cycles in Nature Reading Questions 2A Opening Story: A Lake of Salt Water, Dust Storms, and Endangered Species Earth is a single interconnected system. All environmental systems consist of matter. 1. Why did Mono Lake develop large mineral structures? 2. What negative environmental consequences occurred as a result of Los Angeles building an aqueduct to transport water from the lake to the city? 3. The Earth is a single interconnected system, but it can be subdivided into many smaller systems. How does the nature of the problem to be studied determine the scale of the system chosen? 4. What is the difference between an atom, a molecule, and a compound? 5. How do different isotopes of the same element differ, and what is their significance? 6. What occurs during radioactive decay of an unstable heavy isotope? 7. How is the half-life of a radioactive element determined, and why is it important? 8. What are the distinguishing properties of covalent bonds, ionic bonds, and hydrogen bonds? 9. When scientists look for other planets that may have life, they focus on planets that contain water. How do the water s unique properties make it key for supporting biological processes?

10. Water molecules bond very strongly to other water molecules and many other molecules. Why is this? 11. Why do coastal areas near lakes and oceans tend to see smaller swings in temperature from hot to cold? 12. How can it be determined whether a substance is an acid or a base? 13. Suppose solution A has a ph of 3, solution B has a ph of 7 and solution C has a ph or 8. If solution B has 100,000 H+ ions, how many H+ ions do each of solution A and C have? 14. As a tree grows, it s mass increases. Why is this not a violation of the law of conservation of matter? 15. If matter is conserved and there is no somewhere else to which organisms can get rid of their wastes because of the law of conservation of matter, why is the world not filled with waste matter? 16. What defines organic matter? 17. Complete the following chart regarding the major types of macromolecules (organic matter): Defining Characteristics Role in Cell/Organism Examples Carbohydrates Proteins Nucleic Acids Lipids

APES Video Questions 2A Watch Crash Course Chemistry #1: The Nucleus (http://www.youtube.com/watch?v=fsyaehmdpyi) Read the Focus Questions in advance to help you catch key information. Take notes while watching, then summarize and answer the questions when you finish. Take Notes as you watch: Summarize Main Ideas Focus Questions: 1. What are atoms composed of? Describe the properties of each component. 2. What are isotopes? Why are they important? 3. What role does charge play in atomic interactions? Respond with your own thoughts, questions, connections, and conclusions:

Reading Questions 2B Energy is a fundamental component of environmental systems. Energy conversion underlies all ecological processes. Systems analysis shows how matter and energy flow in the environment. Natural systems change across space and over time. Working Toward Sustainability: Managing Environmental Systems in the Florida Everglades 1. How does the Sun transfer energy from millions of miles away to Earth? 2. What is the difference between power and energy? 3. Why do you think we use the term power plants instead of energy plants? 4. What is the difference between potential energy and kinetic energy? 5. Certain chemical reactions give off heat when they occur. Describe what is happening in terms of potential energy and kinetic energy in such reactions. 6. How is an object s temperature related to the energy of its molecules? 7. The first law of thermodynamics states that energy can be neither created nor destroyed; do heat-emitting (exothermic) reactions violate this law? Explain. 8. According to the second law of thermodynamics, some energy is always lost as heat during any energy conversion. Use this concept to explain why lights, engines, computers, muscles, etc. get hot. 9. How can the efficiency of an energy transformation be calculated?

10. Use the second law of thermodynamics to explain why a barrel of oil can be used only once as a fuel. In other words: why can t we recycle this high quality energy? 11. The second law of thermodynamics tells us that all systems slowly degrade towards randomness. However, life on Earth has been incredibly successful at preserving itself and growing increasingly complex over time. How has life been so successful doing this? 12. Earth is considered an open system for energy and a closed system for matter. Explain what this means. 13. What characterizes a steady state in a system? Are steady states generally a good or bad thing in environmental systems? 14. Explain the difference between a positive feedback loop and a negative feedback loop. 15. Are positive feedbacks necessarily good things? Are negative feedbacks necessarily bad things? Explain. 16. What can inputs, outputs and feedback loops tell us about the health of environmental systems?

APES Video Questions 2B Watch Crash Course Chemistry #17: Energy & Chemistry (www.youtube.com/watch?v=gqtuwydr1fg) Read the Focus Questions in advance to help you catch key information. Take notes while watching, then summarize and answer the questions when you finish. Take Notes as you watch: Summarize Main Ideas Focus Questions: 1. How can molecules contain energy in their bonds, mass and motion? 2. Heat and work are both transfers of energy what distinguishes them? 3. How do exothermic and endothermic reactions perform energy transformations? Respond with your own thoughts, questions, connections, and conclusions:

AP Environmental Science Math Prep This year in APES you will hear the two words most dreaded by high school students NO CALCULATORS! That s right, you cannot use a calculator on the AP Environmental Science exam. Since the regular tests you will take are meant to help prepare you for the APES exam, you will not be able to use calculators on regular tests all year either. The good news is that most calculations on the tests and exams are written to be fairly easy calculations and to come out in whole numbers or to only a few decimal places. The challenge is in setting up the problems correctly and knowing enough basic math to solve the problems. With practice, you will be a math expert by the time the exam rolls around. So bid your calculator a fond farewell, tuck it away so you won t be tempted, and start sharpening your math skills! You will be tested on the math skills in this packet the second week of school. Contents Decimals Averages Percentages and Percent change Metric Units Scientific Notation Dimensional Analysis Reminders 1. Write out all your work, even if it s something really simple. This is required on the APES exam so it will be required on all your assignments, labs, quizzes, and tests as well. 2. Include units in each step. Your answers always need units and it s easier to keep track of them if you write them in every step. 3. Check your work. Go back through each step to make sure you didn t make any mistakes in your calculations. Also check to see if your answer makes sense. For example, a person probably will not eat 13 million pounds of meat in a year. If you get an answer that seems unlikely, it probably is. Go back and check your work. Directions Read each section below for review. Look over the examples and use them for help on the practice problems. When you get to the practice problems, write out all your work and be sure to include units on each step. Check your work. Do on your own paper! Decimals Part I: The basics Decimals are used to show fractional numbers. The first number behind the decimal is the tenths place, the next is the hundredths place, the next is the thousandths place. Anything beyond that should be changed into scientific notation (which is addressed in another section.) 1

Part II: Adding or Subtracting Decimals To add or subtract decimals, make sure you line up the decimals and then fill in any extra spots with zeros. Add or subtract just like usual. Be sure to put a decimal in the answer that is lined up with the ones in the problem. Part III: Multiplying Decimals Line up the numbers just as you would if there were no decimals. DO NOT line up the decimals. Write the decimals in the numbers but then ignore them while you are solving the multiplication problem just as you would if there were no decimals at all. After you have your answer, count up all the numbers behind the decimal point(s). Count the same number of places over in your answer and write in the decimal. Part IV: Dividing Decimals Scenario One: If the divisor (the number after the / or before the ) does not have a decimal, set up the problems just like a regular division problem. Solve the problem just like a regular division problem. When you have your answer, put a decimal in the same place as the decimal in the dividend (the number before the / or under the ). Scenario Two: If the divisor does have a decimal, make it a whole number before you start. Move the decimal to the end of the number, then move the decimal in the dividend the same number of places. Then solve the problem just like a regular division problem. Put the decimal above the decimal in the dividend. (See Scenario One problem). Practice: Remember to show all your work, include units if given, and NO CALCULATORS! All work and answers go on your answer sheet. 2

1. 1.678 + 2.456 = 2. 344.598 + 276.9 = 3. 1229.078 +.0567 = 4. 45.937 13.43 = 5. 199.007 124.553 = 6. 90.3 32.679 = 7. 28.4 x 9.78 = 8. 324.45 x 98.4 = 9. 1256.93 x 12.38 = 10. 64.5 / 5 = 11. 114.54 / 34.5 = 12. 3300.584 / 34.67 = Averages To find an average, add all the quantities given and divide the total by the number of quantities. Example: Find the average of 10, 20, 35, 45, and 105. Step 1: Add all the quantities. 10 + 20 + 35 + 45 + 105 = 215 Step 2: Divide the total by the number of given quantities. 215 / 5 = 43 Practice: Remember to show all your work, include units if given, and NO CALCULATORS! All work and answers go on your answer sheet. 3 13. Find the average of the following numbers: 11, 12, 13, 14, 15, 23, and 29 14. Find the average of the following numbers: 124, 456, 788, and 343 15. Find the average of the following numbers: 4.56,.0078, 23.45, and.9872 Percentages Introduction: Percents show fractions or decimals with a denominator of 100. Always move the decimal TWO places to the right go from a decimal to a percentage or TWO places to the left to go from a percent to a decimal. Examples:.85 = 85%..008 =.8% Part I: Finding the Percent of a Given Number To find the percent of a given number, change the percent to a decimal and MULTIPLY. Example: 30% of 400 Step 1: 30% =.30 Step 2: 400 x.30 12000 Step 3: Count the digits behind the decimal in the problem and add decimal to the answer. 12000 120.00 120

Part II: Finding the Percentage of a Number To find what percentage one number is of another, divide the first number by the second, then convert the decimal answer to a percentage. Example: What percentage is 12 of 25? Step 1: 12/25 =.48 Step 2:.48 = 48% (12 is 48% of 25) Part III: Finding Percentage Change & Increase or Decrease To find percent change: (New - old)/ Old x 100 Example: The iphone has decreased from $650 to $515. What is the percent change in the price? Step 1: 515-650 = - 135 We use absolute value in this class. You can ignore the negative. Step 2: 135 / 650 =.208 Step 3:.208 X 100 =20.1% To find a percentage increase or decrease, first find the percent change, then add or subtract the change to the original number. Example: Kindles have dropped in price 18% from $139. What is the new price of a Kindle? Step 1: $139 x.18 = $25 Step 2: $139 - $25 = $114 Part IV: Finding a Total Value To find a total value, given a percentage of the value, DIVIDE the given number by the given percentage. Example: If taxes on a new car are 8% and the taxes add up to $1600, how much is the new car? Step 1: 8% =.08 Step 2: $1600 /.08 = $160,000 / 8 = $20,000 (Remember when the divisor has a decimal, move it to the end to make it a whole number and move the decimal in the dividend the same number of places..08 becomes 8, 1600 becomes 160000.) Practice: Remember to show all your work, include units if given, and NO CALCULATORS! All work and answers go on your answer sheet. 16. What is 45% of 900? 17. Thirteen percent of a 12,000 acre forest is being logged. How many acres will be logged? 18. A water heater tank holds 280 gallons. Two percent of the water is lost as steam. How many gallons remain to be used? 19. What percentage is 25 of 162.5? 20. 35 is what percentage of 2800? 21. 14,000 acres of a 40,000 acre forest burned in a forest fire. What percentage of the forest was damaged? 22. You have driven the first 150 miles of a 2000 mile trip. What percentage of the trip have you traveled? 23. Home prices have dropped 5% in the past three years. An average home in Indianapolis three years ago was $130,000. What s the average home price now? 24. Approximately 30 million mobile devices were sold in 1998 in the United States. The number sold increased to 180 million devices in 2007. Calculate the percent increase of mobile device sales from 1998 to 2007. 25. 235 acres, or 15%, of a forest is being logged. How large is the forest? 26. A teenager consumes 20% of her calories each day in the form of protein. If she is getting 700 calories a day from protein, how many calories is she consuming per day? 4

27. In a small oak tree, the biomass of insects makes up 3000 kilograms. This is 4% of the total biomass of the tree. What is the total biomass of the tree? Metric Units Kilo-, centi-, and milli- are the most frequently used prefixes of the metric system. You need to be able to go from one to another without a calculator. You can remember the order of the prefixes by using the following sentence: King Henry Died By Drinking Chocolate Milk. Since the multiples and divisions of the base units are all factors of ten, you just need to move the decimal to convert from one to another. Example: 55 centimeters =? kilometers Step 1: Figure out how many places to move the decimal. King Henry Died By Drinking that s six places. (Count the one you are going to, but not the one you are on.) Step 2: Move the decimal five places to the left since you are going from smaller to larger. 55 centimeters =.00055 kilometers Example: 19.5 kilograms =? milligrams Step 1: Figure out how many places to move the decimal. Henry Died By Drinking Chocolate Milk that s six places. (Remember to count the one you are going to, but not the one you are on.) Step 2: Move the decimal six places to the right since you are going from larger to smaller. In this case you need to add zeros. 19.5 kilograms = 19,500,000 milligrams Practice: Remember to show all your work, include units if given, and NO CALCULATORS! All work and answers go on your answer sheet. 5 28. 1200 kilograms =? milligrams 29. 14000 millimeters =? meters 30. 670 hectometers =? centimeters

31. 6544 liters =? milliliters 32..078 kilometers =? meters 33. 17 grams =? kilograms Scientific Notation Introduction: Scientific notation is a shorthand way to express large or tiny numbers. Since you will need to do calculations throughout the year WITHOUT A CALCULATOR, we will consider anything over 1000 to be a large number. Writing these numbers in scientific notation will help you do your calculations much quicker and easier and will help prevent mistakes in conversions from one unit to another. Like the metric system, scientific notation is based on factors of 10. A large number written in scientific notation looks like this: 1.23 x 10 11 The number before the x (1.23) is called the coefficient. The coefficient must be greater than 1 and less than 10. The number after the x is the base number and is always 10. The number in superscript (11) is the exponent. Part I: Writing Numbers in Scientific Notation To write a large number in scientific notation, put a decimal after the first digit. Count the number of digits after the decimal you just wrote in. This will be the exponent. Drop any zeros so that the coefficient contains as few digits as possible. Example: 123,000,000,000 Step 1: Place a decimal after the first digit. 1.23000000000 Step 2: Count the digits after the decimal there are 11. Step 3: Drop the zeros and write in the exponent. 1.23 x 10 11 Writing tiny numbers in scientific notation is similar. The only difference is the decimal is moved to the left and the exponent is a negative. A tiny number written in scientific notation looks like this: 4.26 x 10-8 To write a tiny number in scientific notation, move the decimal after the first digit that is not a zero. Count the number of digits before the decimal you just wrote in. This will be the exponent as a negative. Drop any zeros before or after the decimal. Example:.0000000426 Step 1: 00000004.26 Step 2: Count the digits before the decimal there are 8. Step 3: Drop the zeros and write in the exponent as a negative. 4.26 x 10-8 Part II: Adding and Subtracting Numbers in Scientific Notation To add or subtract two numbers with exponents, the exponents must be the same. You can do this by moving the decimal one way or another to get the exponents the same. Once the exponents are the same, add (if it s an addition problem) or subtract (if it s a subtraction problem) the coefficients just as you would any regular addition problem (review the previous section about decimals if you need to). The exponent will stay the same. Make sure your answer has only one digit before the decimal you may need to change the exponent of the answer. Example: 1.35 x 10 6 + 3.72 x 10 5 =? 6

Step 1: Make sure both exponents are the same. It s usually easier to go with the larger exponent so you don t have to change the exponent in your answer, so let s make both exponents 6 for this problem. 3.72 x 10 5.372 x 10 6 Step 2: Add the coefficients just as you would regular decimals. Remember to line up the decimals. 1.35 +.372 1.722 Step 3: Write your answer including the exponent, which is the same as what you started with. 1.722 x 10 6 Part III: Multiplying and Dividing Numbers in Scientific Notation To multiply exponents, multiply the coefficients just as you would regular decimals. Then add the exponents to each other. The exponents DO NOT have to be the same. Example: 1.35 x 10 6 X 3.72 x 10 5 =? Step 1: Multiply the coefficients. Step 2: Add the exponents. Step 3: Write your final answer. 1.35 x 3.72 270 9450 40500 50220 5.022 5 + 6 = 11 5.022 x 10 11 To divide exponents, divide the coefficients just as you would regular decimals, then subtract the exponents. In some cases, you may end up with a negative exponent. Example: 5.635 x 10 3 / 2.45 x 10 6 =? Step 1: Divide the coefficients. 5.635 / 3.45 = 2.3 Step 2: Subtract the exponents. Step 3: Write your final answer. 3 6 = -3 2.3 x 10-3 7

Practice: Remember to show all your work, include units if given, and NO CALCULATORS! All work and answers go on your answer sheet. Write the following numbers in scientific notation: 34. 145,000,000,000 35. 13 million 36..000348 37. 135 trillion 38. 24 thousand Complete the following calculations: 39. 3 x 10 3 + 4 x 10 3 40. 4.67 x 10 4 + 323 x 10 3 41. 7.89 x 10-6 + 2.35 x 10-8 42. 9.85 x 10 4 6.35 x 10 4 43. 2.9 x 10 11 3.7 x 10 13 44. 1.278 x 10-13 1.021 x 10-10 45. three hundred thousand plus forty-seven thousand 46. 13 million minus 11 thousand 47. 1.32 x 10 8 X 2.34 x 10 4 48. 3.78 x 10 3 X 2.9 x 10 2 49. three million times eighteen thousand 50. one thousandth of seven thousand 51. eight ten-thousandths of thirty-five million 52. 3.45 x 10 9 / 2.6 x 10 3 53. 1.98 x 10-4 / 1.72 x 10-6 54. twelve thousand divided by four thousand Dimensional Analysis Introduction Dimensional analysis is a way to convert a quantity given in one unit to an equal quantity of another unit by lining up all the known values and multiplying. It is sometimes called factor-labeling. The best way to start a factorlabeling problem is by using what you already know. In some cases you may use more steps than a classmate to find the same answer, but it doesn t matter. Use what you know, even if the problem goes all the way across the page! In a dimensional analysis problem, start with your given value and unit and then work toward your desired unit by writing equal values side by side. Remember you want to cancel each of the intermediate units. To cancel a unit on the top part of the problem, you have to get the unit on the bottom. Likewise, to cancel a unit that appears on the bottom part of the problem, you have to write it in on the top. Once you have the problem written out, multiply across the top and bottom and then divide the top by the bottom. Example: 3 years =? seconds 8

Step 1: Start with the value and unit you are given. There may or may not be a number on the bottom. 3 years Step 2: Start writing in all the values you know, making sure you can cancel top and bottom. Since you have years on top right now, you need to put years on the bottom in the next segment. Keep going, canceling units as you go, until you end up with the unit you want (in this case seconds) on the top. 3 years 365 days 24 hours 60 minutes 60 seconds 1 year 1 day 1 hour 1 minute Step 3: Multiply all the values across the top. Write in scientific notation if it s a large number. Write units on your answer. 3 x 365 x 24 x 60 x 60 = 9.46 x 10 7 seconds Step 4: Multiply all the values across the bottom. Write in scientific notation if it s a large number. Write units on your answer if there are any. In this case everything was cancelled so there are no units. 1 x 1 x 1 x 1 = 1 Step 5: Divide the top number by the bottom number. Remember to include units. 9.46 x 10 7 seconds / 1 = 9.46 x 10 7 seconds Step 6: Review your answer to see if it makes sense. 9.46 x 10 7 is a really big number. Does it make sense for there to be a lot of seconds in three years? YES! If you had gotten a tiny number, then you would need to go back and check for mistakes. In lots of APES problems, you will need to convert both the top and bottom unit. Don t panic! Just convert the top one first and then the bottom. Example: 50 miles per hour =? feet per second Step 1: Start with the value and units you are given. In this case there is a unit on top and on bottom. Step 2: Convert miles to feet first. 50 miles 1 hour 50 miles 5280 feet 1 hour 1 mile Step 3: Continue the problem by converting hours to seconds. 50 miles 5280 feet 1 hour 1 minute 1 hour 1 mile 60 minutes 60 seconds 9

Step 4: Multiply across the top and bottom. Divide the top by the bottom. Be sure to include units on each step. Use scientific notation for large numbers. 50 x 5280 feet x 1 x 1 = 264000 feet 1 x 1 x 60 x 60 seconds = 3600 seconds 264000 feet / 3600 seconds = 73.33 feet/second Practice: Remember to show all your work, include units if given, and NO CALCULATORS! All work and answers go on your answer sheet. Use scientific notation when appropriate. Non-metric Conversions: 1 hectare (Ha) = 10000 square meters 1 barrel of oil = 159 liters 55. 1200 cm per hour =? km per week 56. Approximately 30 million mobile devices were sold in 1998 in the United States. Each mobile device sold in 2007 contained an average of 0.03 gram of gold. Calculate the number of kilograms of gold that were used in the production of the mobile devices sold in 1998. 57. The U.S. consumes approximately 20 million barrels of oil per day. How many liters of oil does the U.S. consume in one year? 58. The Roe family of four showers once a day with an average of 10 minutes per shower. The shower has a flow rate of 5 gallons per minute. How many gallons of water does the family use in one year? 59. A 340 million square meters of forest is how many hectares? 60. Termites live in the tropical rainforest breaking down dead and decaying plant material. As they break down the plant material they release methane, a greenhouse gas. Annually, 1,000 termites release approximately 500 grams of methane. Given a density of 3.5 X 10 6 termites per hectare, what is the annual amount of methane released, in kilograms, by the termites inhabiting a 3,000 hectare of tropical rain forest? 10

AP Environmental Science Graph Prep Practice Interpreting Data: The following questions are to help you practice reading information shown on a graph. Answer each question on the separate answer sheet. 1. Identify the graph that matches each of the following stories: a. I had just left home when I realized I had forgotten my books so I went back to pick them up. b. Things went fine until I had a flat tire. c. I started out calmly, but sped up when I realized I was going to be late. 2. The graph at the right represents the typical day of a teenager. Answer these questions: a. What percent of the day is spent watching TV? b. How many hours are spent sleeping? c. What activity takes up the least amount of time? d. What activity takes up a quarter of the day? e. What two activities take up 50% of the day? f. What two activities take up 25% of the day? 3. Answer these questions about the graph at the right: a. How many sets of data are represented? b. On approximately what calendar date does the graph begin? c. In what month does the graph reach its highest point? 11

4. Answer these questions about the graph on the right: a. How many total miles did the car travel? b. What was the average speed of the car for the trip? c. Describe the motion of the car between hours 5 and 12? d. What direction is represented by line CD? e. How many miles were traveled in the first two hours of the trip? f. Which line represents the fastest speed? 5. Answer these questions about the graph at the right: a. What is the dependent variable on this graph? b. Does the price per bushel always increase with demand? c. What is the demand when the price is 5$ per bushel? 6. The bar graph below represents the declared majors of freshman enrolling at a university. Answer the following questions: a. What is the total freshman enrollment of the college? b. What percent of the students are majoring in physics? c. How many students are majoring in economics? d. How many more students major in poly sci than in psych? 7. This graph represents the number of A's earned in a particular college algebra class. Answer the following questions: a. How many A's were earned during the fall and spring of 2009? 12

b. How many more A's were earned in the fall of 2010 than in the spring of 2010? c. In which year were the most A's earned? d. In which semester were the most A's earned? e. In which semester and year were the fewest A's earned? 2009 2010 8. Answer these questions about the graph below: a. How much rain fell in Mar of 1989? b. How much more rain fell in Feb of 1990 than in Feb of 1989? c. Which year had the most rainfall? d. What is the wettest month on the graph? 9. Answer these questions about the data table: a. What is the independent variable on this table? b. What is the dependent variable on this table? c. How many elements are represented on the table? d. Which element has the highest ionization energy? e. Describe the shape of the line graph that this data would produce? Atomic Number Ionization Energy (volts) 2 24.46 4 9.28 6 11.22 8 13.55 10 21.47 10. Answer the following using the solar system data table: a. How many planets are represented? b. How many moons are represented? c. Which moon has the largest mass? d. Which planet has a radius closest to that of Earth? e. How many moons are larger than the planet Pluto? f. Which of Jupiter's moons orbits closest to the planet? g. Which planet is closest to Earth? 13

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Practice Making Graphs: Use the following steps to create graphs and answer questions for each of the problems below. All your work will go on the separate answer sheet. 1. Identify the variables. The independent variable is controlled by the experimenter. The dependent variable changes as the independent variable changes. The independent variable will go on the X axis and the dependent on the Y axis. 2. Determine the variable range. Subtract the lowest data value from the highest data value. 3. Determine the scale of the graph. The graph should use as much of the available space as possible. Each line of the scale must go up in equal increments. For example, you can go 0, 5, 10, 15, 20, etc. but you cannot go 1, 3, 9, 34, 50, etc. Increments of 1, 2, 5, 10, or 100 are commonly used but you should use what works best for the given data. 4. Number and label each axis. 5. Plot the data. If there are multiple sets of data on one graph, use a different color for each. 6. Draw a smooth, best-fit line for each data set. 7. Title the graph. Titles should explain exactly what the graph is showing and are sometimes long. Don t be afraid of a long title! 8. Create a key to the graph if there is more than one set of data. Problem 1 Age of the tree in years Average thickness of the annual rings in cm. Forest A Average thickness of the annual rings in cm. Forest B 10 2.0 2.2 20 2.2 2.5 30 3.5 3.6 35 3.0 3.8 50 4.5 4.0 60 4.3 4.5 The thickness of the annual rings indicate what type of environmental situation was occurring at the time of its development. A thin ring, usually indicates a rough period of development. Lack of water, forest fires, or a major insect infestation. On the other hand, a thick ring indicates just the opposite. A. Make a line graph of the data. B. What is the dependent variable? C. What is the independent variable? D. What was the average thickness of the annual rings of 40 year old trees in Forest A? E. Based on this data, what can you conclude about Forest A and Forest B? 15

Problem 2 ph of water Number of tadpoles 8.0 45 7.5 69 7.0 78 6.5 88 6.0 43 5.5 23 A. Make a line graph of the data. B. What is the dependent variable? C. What is the independent variable? D. What is the average ph in this experiment? E. What is the average number of tadpoles per sample? F. What is the optimum water ph for tadpole development? G. Between what two ph readings is there the greatest change in tadpole number? H. How many tadpoles would you expect to find in water with a ph reading of 5.0? Problem 3 Amount of ethylene in ml/m 2 Wine sap Apples: Days to Maturity Golden Apples: Days to Maturity Gala Apples: Days to Maturity 10 14 14 15 15 12 12 13 20 11 9 10 25 10 7 9 30 8 7 8 35 8 7 7 Ethylene is a plant hormone that causes fruit to mature. The data above concerns the amount of time it takes for fruit to mature from the time of the first application of ethylene by spraying a field of trees. A. Make a line graph of the data. B. What is the dependent variable? C. What is the independent variable? 16

Part III: Environmental Quick Facts Environmental Law: For the following list, state the main objective of each law. 1. Clean Air Act (CAA) of 1970, 1990 2. Clean Water Act (CWA) of 1972 3. Comprehensive Environmental Response, Compensation, and Liability Act (CERCLA or Superfund), 1980 4. Endangered Species Act (ESA) of 1973 5. Federal Insecticide, Fungicide and Rodenticide Act (FIFRA), 1947 6. Hazardous and Solid Waste Amendments (HSWA) of 1984 7. Occupational Safety and Health Act of 1970 (OSH Act) 8. Resource Conservation and Recovery Act (RCRA) of 1976 9. Safe Drinking Water Act (SDWA) of 1974 10. Solid Waste Disposal Act (SWDA) of 1965 11. Toxic Substances Control Act (TSCA) of 1976 13. Montreal Protocol Write the full name of each of these chemical abbreviations: CO2 CO C6H12O6 CH4 H2 H2O N2 NOx NO3- NH3 O2 O3 P PO4 3- S K SO2 Cl Pb U NaCl Hg Rn H 2SO 4 Environmental Disasters: Provide a brief description for the following environmental disasters and include the location, chemical of concern, and year it occurred. Chernobyl Bhopal Deepwater Horizon Minimata Love Canal Seveso Baia Mare Fukushima You will have a quiz on this information during the first week of school.