Past Courses from 2018 MMSS
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Art and Mathematics  Martin Strauss
With just a little historical revisionism, we can say that Art has provided inspiration for many fields within Mathematics. Conversely, Mathematics gives techniques for analyzing, appreciating, and even creating Art, as well as the basis for gallery design, digital cameras, and processing of images. In this class we will explore the Mathematics in great works of Art as well as folk art, as a way of studying and illustrating central mathematical concepts in familiar and pleasing material. And we'll make our own art, by drawing, painting, folding origami papers, and more.
Major topics include Projection, Symmetry, Wave Behavior, and Distortion. Projection includes the depiction of threedimensional objects in two dimensions. What mathematical properties must be lost, and what can be preserved? How does an artwork evoke the feeling of threedimensional space? We'll study perspective, depictions of globes by maps, and the role of curvature. Turning to symmetry, we'll study rotational and reflective symmetry that arise in tiling and other art and math. We'll study more generalized symmetry like scaling and selfsimilarity that occurs in fractals as well as every selfportrait, and is central to mathematical concepts of dimension and un very different from the work at coarser scalesit is not selfsimilar. Describing light as waves and color as wavelength at once explains how mirrors, lenses, and prisms work and explains some uses of light and color in art. Finally, we ask about distorting fabrics and strings, and ask about the roles of cutting, gluing, and of stretching without cutting or gluing. Is a distorted human figure still recognizable, as long as it has the right number of organs and limbs, connected properly?
Background in Math and interest in Art suggested. No artistic talent is necessary, though artistically talented students are encouraged to bring art supplies if they are inexpensive and easily transportable.  Biological Oceanography – Food web dynamics in the marine world  Janice Pappas
Session 3: The oceans are vast, majestic bodies of water that harbor a myriad of life forms. The Antarctic, Arctic, Atlantic, Indian, and Pacific Oceans cover 70% of the Earth’s surface and have 80 to 99% of all life on Earth. Only 5% of our oceans have been explored, so the majority of oceanic life has yet to be discovered.
Organisms of all sizes are found throughout the oceans. We will look at examples from diatoms to viper fish to vampire squid to whales. We will examine particular kinds of organisms such as keystone species, bioluminescent animals, and organisms that are able to live in extreme environments.
We will explore marine food webs as a way to understand interdependence among the oceans’ organisms. How do environmental conditions influence what happens to the organisms in the oceans? If an animal goes extinct, what will happen to other organisms in a marine food web? These are just a couple of the many questions that we might address.
Our adventure will begin with a general overview of the physical, chemical and geological aspects of the oceans and sails on to details on the oceans’ biological inhabitants. We will navigate our way to understanding organism interactions through marine food webs. We will dock at an overall assessment of the oceans—where we have come from and where we are going at present.
Students will conduct collaborative research and use software to create marine food webs. Results will be used to produce scientific posters and presentations for a student symposium. Exercises will include microscopy, the game of krill, and learning how to read and evaluate scientific papers. Time permitting, we will visit the University of Michigan Natural History Museum and the Marine Hydrodynamics Laboratory.
Prerequisites: having had a science course is helpful, but not necessary. Just bring your interest in learning about our oceans.  Brain and Behavior  Jen Cummings
Ever wonder how that gelatinous blob in your head controls everything you do and think? What exactly are neurons? How do they talk to each other? And to the rest of your body? Have you ever wondered about things like: how does stress affect your body? Is exercise really that good for your brain? What happens if you miss a few nights of sleep? It makes sense that your brain affects your experiences… but can experiences actually change your brain??
We will answer these questions (and more!) in Brain and Behavior, as we explore the amazing field of behavioral neuroscience. We will begin with a section on the basic functionality of the brain and nervous system, and then will go on to investigate how the system can be affected by things like stress, learning & memory, hormones, and neuropsychiatric disorders. We will leave some time for a session on studentselected topics in behavioral neuroscience, so if there’s something else you’ve been pondering with respect to the brain, don’t worry! We’ve got you covered.  Catalysis, Solar Energy and Green Chemical Synthesis  Corinna Schindler and Corey Stephenson
"The chemist who designs and completes an original and esthetically pleasing multistep synthesis is like the composer, artist or poet who, with great individuality, fashions new forms of beauty from the interplay of mind and spirit."
E.J. Corey, Nobel Laureate
Prior to Friedrich Wöhler’s 1828 synthesis of urea, organic (carboncontaining) matter from living organisms was believed to contain a “vital force” that distinguished it from inorganic material. The discovery that organic molecules can be manipulated at the hands of scientists is considered by many the birth of “organic chemistry”: the study of the structure, properties, and reactions of carboncontaining matter. Organic matter is the foundation of life as we know it, and therefore a fundamental understanding of reactivity at a molecular level is essential to all life sciences. In this class we will survey monumental discoveries in this field over the past two centuries and the technological developments that have enabled them.
“Catalysis, Solar Energy, and Green Chemical Synthesis” will provide a fun and intellectually stimulating handson experience that instills a historical appreciation for the giants whose trials and tribulations have enabled our modern understanding of chemistry and biology. Students will learn modern laboratory techniques including how to set up, monitor, and purify chemical reactions, and most importantly, how to determine what they made! Experiments include the synthesis of biomolecules using some of the most transformative reactions of the 20th century and exposure to modern synthetic techniques, such as the use of metal complexes that absorb visible light to catalyze chemical reactions, an important development in the “Green Science” movement. Finally, industrial applications of chemistry such as polymer synthesis and construction of photovoltaic devices will be performed. Daily experiments will be supplemented with exciting demonstrations by the graduate student instructors.  Climbing the Distance Ladder to the Big Bang: How Astronomers Survey the Universe  Dragan Huterer
The furthest objects that astronomers can observe are so distant that their light set out when the Universe was only 800 million years old, and has been traveling to us for about 13 billion years – most of the age of the Universe. Even the Sun's neighborhood – the local part of our Galaxy, where astronomers have successfully searched for planets around other stars – extends to hundreds of light years. How do we measure the distance to such remote objects?
Certainly not in a single step! Astronomers construct the socalled “Distance Ladder,” finding the distance to nearby objects, thus enabling those bodies to be understood and used as probes of yet more distant regions. The first steps in the ladder uses radar ranging to get the distance to the nearby planets and the Sun; and 'triangulation' to get the distances to the nearest stars. Those in turn are used to obtain distances to other stars in our Milky Way Galaxy, stars in other galaxies, and out to the furthest reaches of what is observable.
This class will explore the steps in this ladder, using lectures, discussions, field trips, demonstrations, and computer laboratory exercises. Students will learn basic computer programming for a project to model the effects of gravity, and they will get handson experience of using a small radio telescope to map the the rotation speed of the Milky Way and measure the influence of its dark matter. We will cover concepts involving space, time, and matter that go far beyond the distance ladder, and involve some of the most fascinating mysteries in cosmology and astrophysics: What is it like inside a black hole? What is the Dark Matter? What is the Dark Energy that makes the Universe expand faster and faster? Is there other life in the Universe?  Dissecting Life: Human Anatomy and Physiology  Glenn Fox
Dissecting Life will lead students through the complexities and wonder of the human body. Lecture sessions will cover human anatomy and physiology in detail. Students will gain an understanding of biology, biochemistry, histology, and use these as a foundation to study human form and function.
Laboratory sessions will consist of firsthand dissections of a variety of exemplar organisms: lamprey, sharks, cats, etc. Students may also tour the University of Michigan Medical School's Plastination and Gross Anatomy Laboratories where they may observe human dissections.  Fibonacci Numbers  Mel Hochster
The Fibonacci numbers are the elements of the sequence 0, 1, 1, 2, 3, 5, 8, 13, 21, 34, 55… where every term is simply the sum of the two preceding terms. This sequence, which was originally proposed as describing the reproduction of rabbits, occurs in astonishingly many contexts in nature. It will be used as a starting point for the exploration of some very substantial mathematical ideas: recursive methods, modular arithmetic, and other ideas from number theory, and even the notion of a limit: the ratios of successive terms (e.g. 13/8, 21/13. 55/34…) approach the golden mean, already considered by the ancient Greeks, which yields what may be the most aesthetically pleasing dimensions for a rectangle.
As a byproduct of our studies, we will be able to explain how people can test certain, very special but immensely large numbers, for being prime. We'll also consider several games and puzzles whose analysis leads to the same circle of ideas, developing them further and reinforcing the motivations for their study.  Forensic Physics  Ramon TorresIsea
A fiber is found at a crime scene. Can we identify what type of fiber it is and can we match it to a suspect's fiber sample, for example from a piece of clothing? Likewise, someone claims to have valuable ancient Roman coins, a newlyfound old master painting, or a Viking map of America predating Columbus' voyage. Are they authentic or fakes? How can we determine that using some physicsbased
techniques? (These are real examples the Viking map proved to be a forgery). Also for example, how is a laserbased molecularprobing technique used to stop criminals from trading billions of dollars of counterfeit pharmaceuticals and endangering thousands of lives? These are a few among many examples of experimental physics methods applied to several areas of Forensics. In this session, students will be introduced to these methods and have opportunities to make measurements using
molecular, atomic and nuclear forensic techniques. In addition, applications to medical imaging and diagnostics will be introduced. Students will be working at our Intermediate and Advanced Physics Laboratories with the underlying physics for each method presented in detail, followed by demonstrations and laboratory activities, which include the identification of an "unknown" sample. Various crime scenes will challenge students to select and apply one or more of the methods and use
their Forensic Physics skills to conduct investigations.  Graph Theory  Doug Shaw
Ignore your previous knowledge of algebra, geometry, and even arithmetic! Start fresh with a simple concept: Take a collection of points, called vertices, and connect some of them with lines called edges. It doesn't matter where you draw the vertices or how you draw the lines  all that matters is that two vertices are either related, or not. We call that a “graph” and you’ve taken the first step on the Graph Theory road! Graphs turn up in physics, biology, computer science, communications networks, linguistics, chemistry, sociology, mathematics… you name it!
In this course we will discuss properties that graphs may or may not have, hunt for types of graphs that may or may not exist, learn about the silliest theorem in mathematics, and the most depressing theorem in mathematics, learn how to come up with good algorithms, model reality, and construct some mathematical proofs. We will go over fundamental results in the field, and also some results that were only proved in the last year or so! And, of course, we will present plenty of currently unsolved problems for you solve and publish when you get home!  Hex and the 4 Cs  Stephen DeBacker
After a very long night of homework, you finally finish your math assignment. While doublechecking your work, you realize that you have done problems from page 221, not page 212 as your teacher requested. In disgust, you rip the paper out of your notebook, wad it up, and toss it back down on your notebook. Too frustrated to begin your assignment anew, your mind begins to wander. You wonder: Is there a point in the wadded up paper that lies exactly above the location from which it started?
After you pour your parent's morning cup of Joe, the coffee comes to rest while you sleepily (because of the whole homework thing) search in the fridge for the cream. After adding and stirring the cream into the cup, you watch the pretty patterns made by the swirling coffee and cream as the contents come to rest. You wonder: Is there a point in the coffee that lies at the same point both before and after the cream was stirred in?
We shall use mathematics to model and answer the above questions. Initially, the above questions will motivate our study of four fundamental concepts in mathematics, all of which begin with the letter C: continuity (what sorts of wadding/stirring are allowed), completeness (what if our paper/coffee has “gaps”), compactness, and connectedness. Interestingly, these are also the concepts one needs in order to rigorously understand why Calculus works. Our modeling will lead us to the Brouwer fixedpoint theorem; a very nice topological result.
To show that the Brouwer fixedpoint theorem is true, we shall also learn about the game of Hex. The game of Hex is an easy to describe board game for two players (Google "Hex game" to find a description). The game has many interesting features. For example: one of the two players must win, the first player to move should (theoretically) win, and nobody knows a strategy to guarantee that the first player wins. We will explore the mathematics required to understand why every game of Hex has a winner.
Finally, we shall stitch all of the above together by showing that the fact that there are no ties in Hex implies that there is a point in your parent’s cup of Joe which lies at the same point both before and after the cream was stirred in.  Human Identification: Forensic Anthropology Methods  Maire Malone
Forensic anthropology methods are used to aid in human identification with skeletal remains. Applications of forensic anthropology lie in the criminal justice system and mass disaster response. In this course, we will address questions such as: What are important differences between male and female skeletons? Utilizing skeletal remains, how would you tell the difference between a 20year old and an 80year old? How do you distinguish between blunt force and sharp force trauma on the skull?
In this handson, laboratorybased course, you will be become familiar with human osteology (the study of bones] and bone biology. Through our exploration of forensic and biological anthropology methods, you will learn how to develop a biological profile [estimates of age at death, sex, ancestry and stature], assess manner of death, estimate postmortem interval, investigate skeletal trauma and pathology, and provide evidence for a positive identification from skeletal remains. Additionally, we will explore various forensic recovery techniques as they apply to an outdoor complex, including various mapping techniques. Towards the end of the course, you will work in small groups in a mock recovery of human remains and analyze the case utilizing the forensic anthropological methods learned throughout the course.  Life, Death and Change: Landscapes and Human Impact  David Michener
You’ll never see the same world quite the same way after this course – which is important if you want to make a difference with your life. All environmental studies presume a landscape – yet what seems to be a simple landscape is often far from uniform or stable. A great deal of information critical to anyone entering the “green” sciences can be detected for analysis – including factors that may fundamentally control species diversity, habitat richness, and animal (let alone human) behavior. Resolving human from nonhuman agency is an engaging and important challenge, too – one scientists and “green professionals” grapple with repeatedly. This outdoor class immerses students in realworld landscapes, ranging from the nearlypristine to the highly humanized, to solve problems which may initially appear impossible to address. You can!
Your critical thinking skills are essential rather than prior biological course and field work. Come prepared to look, measure, analyze, discus and learn how the interaction of plants, soils, climate and time (and humans) influences landscape development. Develop basic skills in plant recognition and identification – skills that you can transfer to other terrestrial communities. Address questions about the current vegetation, its stability over time and its future prospects. Gain practical insights into the realities of biological conservation as we address how we can manage species and landscapes for future generations. By the end you’ll have a conceptual skill set that helps you assess how stable and disturbed are the “natural” areas near your home – and prepares you to put instructors on the spot in college classes to come.  Mathematical Modeling in Biology  Trachette Jackson and Patrick Nelson
Mathematical biology is a relatively new area of applied mathematics and is growing with phenomenal speed. For the mathematician, biology opens up new and exciting areas of study, while for the biologist, mathematical modeling offers another powerful research tool commensurate with a new instrumental laboratory technique. Mathematical biologists typically investigate problems in diverse and exciting areas such as the topology of DNA, cell physiology, the study of infectious diseases, population ecology, neuroscience, tumor growth and treatment strategies, and organ development and embryology.
This course will be a venture into the field of mathematical modeling in the biomedical sciences. Interactive lectures, group projects, computer demonstrations, and laboratory visits will help introduce some of the fundamentals of mathematical modeling and its usefulness in biology, physiology and medicine.
For example, the cell division cycle is a sequence of regulated events which describes the passage of a single cell from birth to division. There is an elaborate cascade of molecular interactions that function as the mitotic clock and ensures that the sequential changes that take place in a dividing cell take place on schedule. What happens when the mitotic clock speeds up or simply stops ticking? These kinds of malfunctions can lead to cancer and mathematical modeling can help predict under what conditions a small population of cells with a compromised mitotic clock can result in a fully developed tumor. This course will study many interesting problems in cell biology, physiology, and immunology.  Mathematics and Music Theory  Lon Mitchell
Mathematicians can create complex and beautiful theorems from relatively basic assumptions, while Music Theorists often try to identify basic patterns and “rules” in complex and beautiful music. In this course, we will explore some of the recent attempts to meet in the middle, connecting mathematical patterns and structures to music from the ancient to the modern.
In Mathematics, we will explore topics such as group theory, graph theory, geometry, and metric spaces, encountering some of the most important structures in the modern discipline. Fundamental results of these areas will be discussed, and students will construct and explore examples and related patterns.
In Music Theory, we will take existing music by composers such as Bach and Beethoven and use mathematical structures to provide a possible explanation of what they were thinking as they composed. In addition, we will investigate the techniques of modern composers such as Arnold Schoenberg who advocated composition based on prescribed axioms. Students will be given the chance to write music using these different techniques.
Although we will use the modern (Western) twelvetone scale as a reference, our explorations will take us into discussions of tuning, temperament, and the physics of sound. We will investigate mathematical theories of what makes the best scale, how some of those scales occur in the music of other cultures, and how modern composers have engineered exotic scales to suit their aesthetics.
Software allowing students to experiment with creating their own musical systems will be provided.
Prospective students should have a good command of (highschool) algebra and experience with reading music in some form.  Mathematics and the Internet  Mark Conger
How can gigabytes of information move over unreliable airwaves using unreliable signaling, and arrive perfectly intact? How can I have secure communication with a website run by a person I've never met? How can a large image or sound file be transferred quickly? Why is Google so good at finding what I'm looking for? How do computers work, anyway?
The answers to all these questions involve applications of abstract mathematics. In Mathematics and the Internet, we'll develop the math on its own, but also show how it is essential to making the Internet operate as it does. Our journey will take us through logic, probability, group theory, finite fields, calculus, number theory, and any other areas of math that might come up. We'll apply our results to coding theory, cryptography, search engines, and compression. We'll also spend several days building primitive computers out of transistors, logic gates, and lots of wire. If all goes well, we'll connect them to the Internet!  Mathematics of Cryptography  Anton Lukyanenko
Ever since humans first developed the ability to write there has been an ongoing battle between codemakers and codebreakers. The armies of ancient Sparta and Rome both used ciphers to relay secret battle plans, and the ancient Mesopotamians developed encryption techniques in order to protect commercially valuable techniques for glazing pottery. From a modern perspective, the codes used by the ancients are laughably insecure. Indeed, much of what made them secure was that they were being used during a period when most people were illiterate.
Because of the advent of computers, codemakers today need to use far more sophisticated techniques in order to create secure codes. Many of these techniques are mathematical in nature. One of the cryptography systems that we will discuss in this class is called RSA and is used to ensure the security of your credit card information when you make a purchase on the internet. We'll see that at its heart, what makes the RSA system secure is that it is very hard to factor a big number. The numbers used in the RSA system are actually so big that factoring them would take you millions of years. Even if you were using a supercomputer!
This class will give an historical introduction to the mathematics of cryptography, beginning with codes used by the Roman legions and building up to the RSA cryptography system discussed above. What will really make the class unique is that there won't be any lecturing. You will discover the mathematics of cryptography by working on problems and sharing your solutions with your classmates.  Mathematics of Decisions, Elections and Games  Michael A. Jones
You make decisions every day, including whether or not to sign up for this course. The decision you make under uncertainty says a lot about who you are and how you value risk. To analyze such decisions and provide a mathematical framework, utility theory will be introduced and applied to determine, among other things, a student’s preference for desserts and for the offer the banker makes to a contestant in the television show Deal or No Deal. Our analysis will touch on behavioral economics, including perspectives of 2017 Nobel Prize winner Richard Thaler.
Elections are instances in which more than one person’s decision is combined to arrive at a collective choice. But how are votes tallied? Naturally, the best election procedures should be used. But Kenneth Arrow was awarded the Nobel Prize in Economics in 1972, in part, because he proved that there is no best election procedure. Because there is no one best election procedure, once the electorate casts its ballots, it is useful to know what election outcomes are possible under different election procedures – and this suggests mathematical and geometric treatments to be taught in the course. Oddly, the outcome of an election often stays more about which election procedure was used, rather than the preferences of the voters! Besides politics, this phenomenon is present in other settings that we’ll consider which include: the Professional Golfers’ Association tour which determines the winner of tournaments under different scoring rules (e.g. stroke play and the modified Stableford system), the method used to determine rankings of teams in the NCAA College Football Coaches poll, and Major League Baseball MVP balloting.
Anytime one person’s decisions can affect another person, that situation can be modeled by game theory. That there is still a best decision to make that takes into account that others are trying to make their best decisions is, in part, why John F. Nash was awarded the Nobel Prize in Economics in 1994 (see the movie A Beautiful Mind, 2002). Besides understanding and applying Nash’s results in settings as diverse as the baseball mind games between a pitcher and batter and bidding in auctions, we’ll examine how optimal play in a particular game is related to a proof that there are the same number of counting numbers {1, 2, 3, …} as there are positive fractions. We will also examine the GaleShapley algorithm, which is used, for example, to match physicians to residency programs and to match students to colleges (the college admissions problem). Lloyd S. Shapley and Alvin E. Roth were awarded the Nobel Prize in Economics in 2012 for their work on matching.  Organic Chemistry 101: Orgo Boot Camp  Kathleen Nolta
This course will introduce you to the techniques and concepts taught in the first term of organic chemistry at the University of Michigan. The emphasis is on lecturebased learning, small group learning, and independent presentation of problems that you have solved. While laboratory exercises will be done, they are not the main focus of the course. Topics to be covered include nomenclature and how molecules are organized structurally, including their connectivity, options for stereochemistry, and conformational manipulation. We will also explore chemical transformation by learning how to draw complete curved arrow mechanisms for some of the most fundamental reactions in organic chemistry: acidbase chemistry, nucleophilic substitutions, electrophilic additions, eliminations, and electrophilic aromatic substitutions. The emphasis will be on exploring concepts through problem solving (there will be lots of practice problems to do!), and you will have an opportunity to take examinations given to college students. Students will be able to explore the chemistry in various laboratory applications; we will also be covering the basics of infrared spectroscopy and NMR. By focusing on the concepts and trying some of the techniques, students will gain a better understanding of what organic chemistry is and how to enjoy it.  Paleobiology  Biodiversity and mass extinctions through deep time  Janice Pappas
Session 2 (FULL): The 3.5billionyear history of life on Earth has many tales to tell. The diversity of life over deep time has taken many forms from the mysterious stromatolites to strange and amazing creatures such as the formidable predator Anomalocaris and the wheeltoothed Helicoprion to the more recent familiar artiodactyls. Five mass extinction events—The OrdovicianSilurian, Late Devonian, PermianTriassic, TriassicJurassic, and CretaceousPaleogene—produced devastating losses of many life forms. However, biodiversity also proliferated during the Cambrian Explosion, The Great Ordovician Biodiversification Event, and the Mesozoic Marine Revolution. The focus of this course will be on studies of biodiversity before and after the five mass extinction events.
What were the causes of mass extinctions? What factors are common to all mass extinctions? What conditions enabled biodiversity to recover and even increase? These are just three of the many questions that we might address.
We will start from the advent of the earliest life forms and work our way throughout deep time to examine the demise or flourishing of various life forms. We will use phylogenetic trees to understand how biodiversity changed over deep time. We will take stock of life on Earth in the past and what extinction and biodiversification events tell us about the present and potentially about the future.
Students will conduct collaborative research and use software to create phylogenetic trees of biodiversity before and after a mass extinction event. Results will be used to produce scientific posters and presentations for a student symposium. There will also be exercises in fossil identification and 3D digital sculptural modeling of fossils such as ammonites or skulls and bones of the notorious T. rex or the rhinolike Arsinotherium. Time permitting, we will visit the University of Michigan Museum of Natural History. During this course, students will learn how to read and evaluate scientific papers.
Prerequisites: having had a science course is helpful, but not necessary. Just bring your enthusiasm for learning about past and present life on Earth.  Relativity: A Journey through Warped Space and Time  Daniel Mayerson
Einstein forever altered our understanding of the nature of space and time with his theories of relativity. These theories tell us that the speed of light is a universal constant, declare that the fabric of space and time is warped by matter, and demand that matter moves through spacetime by following its curvature. Introduced 100 years ago, these concepts clash mightily with our everyday physical intuition, but are nevertheless cornerstones of modernday physics.
In this course we will explore the exciting world of relativity (both the special and general theories). After briefly reviewing classical mechanics (Newton’s laws), we will use thought experiments to understand the ideas behind relativity and see how they are actually ultimately simpler and more natural than classical mechanics. Along the way we will encounter strange paradoxes that push the limits of our understanding and learn powerful mathematics that will allow us to quantify our relativistic understanding of the universe. Using our new knowledge, we will delve into black holes, learn how GPS systems work, and debate the possibility of time machines and wormholes.
Prerequisites: basic concepts in geometry (e.g. coordinates, distance formulae) and working knowledge of elementary calculus (e.g. what a derivative is and how to take one). We will introduce some multivariable calculus (e.g. partial differentiation) and integration techniques, so prior knowledge of those is a bonus. An open, curious and interested mind is absolutely necessary; you must be willing to think deeply about physics and the nature of our universe!  Roller Coaster Physics  David Winn
Session 1(FULL) What are the underlying principles that make roller coasters run? By studying the dynamics of roller coasters and other amusement park rides in the context of Newtonian physics and human physiology, we will begin to understand these complex structures. Students first review Newtonian mechanics, a = f/m in particular, with some handson experiments using airtables. This will then be followed by digitalvideo analysis of motion of some reallife objects (humans, cars, and toy rockets) and studentdevised roller coaster models.
Then, a field trip to Cedar Point Amusement Park (outside of the regularly scheduled weekend trip) where students, riding roller coasters and other rides, will provide real data for analysis back at UM. Students will carry portable data loggers and 3axis accelerometers to provide onsite, and later offsite, analysis of the motion and especially, the "gforces" experienced. The information collected will then be analyzed in terms of human evolution and physiology; we shall see why these limit the designs of rides.
In addition to exploring the physics of roller coasters, cuttingedge topics in physics will be introduced: high energy physics, nuclear astrophysics, condensedmatter theory, biophysics and medical physics. Students will then have a chance to see the physics in action by touring some of UM's research facilities. Students will have the opportunity to see scientists doing research at the Solid State Electronics Laboratory, the Michigan Ion Beam Laboratory, and the Center for Ultrafast Optical Science.
By the end of the twoweek session, students will gain insight and understanding in physics and take home the knowledge that physics is an exciting, reallife science that involves the objects and motions surrounding us on a daily basis.  Sampling, Monte Carlo and Problem Solving: How Analyzing Statistics Helps us Improve  Edward Rothman
Session 1: Political candidates drop out of elections for the U.S. Senate and New York Governorship because their poll numbers are low, while Congress fights over whether and how much statistics can be used to establish the meaning of the U.S. Census for a host of apportionment purposes influencing all our lives.
Suppose we need to learn reliably how many people have a certain disease? How safe is a new drug? How much air pollution is given off by industry in a certain area? Or even how many works someone knows?
For any of these problems we need to develop ways of figuring out how many or how much of something will be found without actually tallying results from a large portion of the population, which means we have to understand how to count this by sampling.
And Monte Carlo? Sorry, no field trips to the famous casino! But, Monte Carlo refers to a way of setting up random experiments to which one can compare real data: does the data tell us anything significant, or it is just random noise? Did you know you can even calculate the number ? This way?!?!The survey and sampling techniques that allow us to draw meaningful conclusions about the whole, but based on the analysis of a small part, will be the main subject of this course.  Surface Chemistry  Zhan Chen
This course will be divided into three units: applications, properties, and techniques. The first unit will introduce students to surface science that exists within the human body, surfaces in modern science and technology, and surfaces found in everyday life. Our bodies contain many different surfaces that are vital to our wellbeing. Surface reactions are responsible for protein interaction with cell surfaces, hormone receptor interactions, and ling function. Modern science has explored and designed surfaces for many applications: antibiofouling surfaces are being researched for marine vessels; high temperature resistant surfaces are important for space shuttles; and heterogeneous catalysis, studies by surface reactions, is important in industry and environmental preservation. The usefulness of many common items is determined by surface properties; contact lenses must remain wetted; while raincoats are deigned to be nonwetting; and coatings are applied to cookware for easy cleanup.
The second unit will examine the basic properties of surfaces. Lectures will focus on the concepts of hydrophobicity, friction, lubrication, adhesion, wearability, and biocompatibility. The instrumental methods used to study surfaces will be covered in the last unit. Traditional methods, such as contact angle measurements will be covered first. Then vacuum techniques will be examined. Finally, molecular level in situ techniques such as AFM and SFG will be covered, and students will be able to observe these techniques in the lab.
Multimedia PowerPoint presentations will be used for all lectures. By doing this, it's hoped to promote high school students' interest in surface science, chemistry, and science in general. A website introducing modern analytical chemistry in surface and interfacial sciences will be created.  Sustainable Polymers  Anne McNeil
From grocery bags and food packaging to contact lenses and therapeutics, there is no doubt that polymers have had a positive impact in our lives. Most of these polymers are made from petroleumbased feedstocks, which are dwindling in supply. And although some plastics are recycled, most of them end up contaminating our lands and oceans. Through handson lab work and interactive lessons, this class will introduce the future of polymer science – that is…polymers made from sustainable materials that ultimately biodegrade! Students will conduct research experiments to make, analyze, and degrade renewable plastics. We will also examine commercial biodegradable materials and plastics used for energy and environmental remediation, and practice science communication through a creative stopmotion animation project.  The Physics of Magic and the Magic of Physics  Georg Raithel
Rabbits that vanish; objects that float in air defying gravity; a tiger that disappears and then reappears elsewhere; mind reading, telepathy and xray vision; objects that penetrate solid glass; steel rings that pass through each other: these are some of the amazing tricks of magic and magicians. Yet even more amazing phenomena are found in nature and the world of physics and physicists: matter than can vanish and reappear as energy and viceversa; subatomic particles that can penetrate steel; realistic 3D holographic illusions; objects that change their dimensions and clocks that speed up or slow down as they move (relativity); collapsed stars that trap their own light (black holes); xrays and lasers; fluids that flow uphill (liquid helium); materials without electrical resistance (superconductors.)
In this class students will first study the underlying physics of some classical magic tricks and learn to perform several of these (and create new ones.) The "magic" of corresponding (and real) physical phenomena will then be introduced and studied with handson, mindson experiments. Finally, we will visit a number of research laboratories where students can meet some of the "magicians" of physics  physics students and faculty  and observe experiments at the forefront of physics research. 
