Archived Math Circle Material: Difference between revisions
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=Meetings for Fall 2014 and Spring 2015= | |||
<center> | |||
All talks are at '''6pm in [http://goo.gl/maps/6k5IA Ingraham Hall] room 120''', unless otherwise noted. | |||
{| style="color:black; font-size:120%" border="1" cellpadding="14" cellspacing="0" | |||
|- | |||
! colspan="4" style="background: #ffdead;" align="center" | Fall 2014 | |||
|- | |||
! Date and RSVP links!! Speaker !! Topic !! Link for more info | |||
|- | |||
| September 8, 2014 || Philip Matchett Wood || [[#Philip Matchett Wood | Pictures and Puzzles]] || | |||
|- | |||
| September 15, 2014 || Jen Beichman || [[#TBA | Playing with geometric sums]] || | |||
|- | |||
| September 22, 2014 || DJ Bruce || [[#TBA | Is any knot the unknot?]] || | |||
|- | |||
| September 29, 2014 || Uri Andrews || [[#TBA | The games of Criss Cross and Brussels Sprouts]] || | |||
|- | |||
| October 6, 2014 || David Sondak || [[#David Sondak | Fluids, Math, and Oobleck!]] || | |||
|- | |||
| October 13, 2014 || George Craciun || [[#George Craciun | Proofs without words (but with plenty of pictures)]] || | |||
|- | |||
| October 20, 2014 || Scott Hottovy || [[#TBA | Coming soon!]] || | |||
|- | |||
| October 27, 2014 || Daniel Hast || [[#Hast | Clock arithmetic and perfect squares: a "Golden Theorem" of reciprocity]] || | |||
|- | |||
| November 3, 2014 || Alisha Zachariah || [[#TBA | Infinity]] || | |||
|- | |||
| November 10, 2014 || Marko Budisic || [[#Marko Budisic | Mathematics of epidemics ]] || | |||
|- | |||
| November 17, 2014 || Nigel Boston || [[#Nigel Boston | Same bad channel]] || | |||
|- | |||
| <strike>November 24, 2014</strike> || <strike>Daniel Erman</strike> || [[#TBA | <strike>How to catch a (data) thief </strike> Cancelled or weather]] || | |||
|- | |||
| December 1, 2014 || Daniel Erman || [[#TBA | How to catch a (data) thief]] || | |||
|- | |||
! colspan="4" style="background: #ffdead;" align="center" | Spring 2015 | |||
|- | |||
| <strike>January 26, 2015 </strike> || TBA || [[#TBA | Coming soon!]] || | |||
|- | |||
| February 2, 2015 || Soledad Benguria || [[#TBA | Exploring Palindromes]] || | |||
|- | |||
| February 9, 2015 || Jeff Linderoth|| [[#TBA | Coming soon!]] || | |||
|- | |||
| February 16, 2015 || Simon Marshall || [[#Simon Marshall | The Ant Walk]] || | |||
|- | |||
| February 23, 2015 || Uri Andrews || [[#TBA | Coming soon!]] || | |||
|- | |||
| March 2, 2015 || Jordan Ellenberg|| [[#TBA | Coming soon!]] || | |||
|- | |||
| March 9, 2015 || Ali Lynch || [[#TBA | Mathematical Games and Winning Strategies]] || | |||
|- | |||
| March 16, 2015 || Daniel Schultheis || [[#TBA | Picture Hanging and Secret Algebra]] || | |||
|- | |||
| March 23, 2015 || Betsy Stovall|| [[#Ches | Divisibility Cheats]] || | |||
|- | |||
| March 30, 2015 || No meeting|| [[#TBA | UW Spring Break]] || | |||
|- | |||
| April 6, 2015 || Julie Mitchell || [[#Julie Mitchell | Protein Folding and Robot Dances: Understanding the Basics of Kinematic Motion]] || | |||
|- | |||
| April 13, 2015 || Jessica Lin ||[[#TBA | Coming soon!]] || | |||
|- | |||
| April 20, 2015 || DJ Bruce ||[[#TBA | Coming soon!]] || | |||
|- | |||
| April 27, 2015 || David Anderson ||[[#David Anderson | Let’s make a deal!]] || | |||
|- | |||
| May 4, 2015 || Daniel Ross ||[[#TBA | Coming soon!]] || | |||
|- | |||
| May 11, 2015 || Grace Deane ||[[#TBA |Last meeting of semester!]] || | |||
|- | |||
|} | |||
</center> | |||
== Abstracts == | |||
===Philip Matchett Wood=== | |||
''Pictures and Puzzles'' | |||
When does a simple picture solve a tricky puzzle? Come and learn about how line-and-dot drawing can solve complex puzzles, and create some new puzzles besides! | |||
===DJ Bruce=== | |||
''Is any knot the unknot? | |||
Abstract: You're walking home from school, and you pull out your head phones to listen to some tunes. However, inevitably they are a horribly tangled mess, but are they really a knot? We'll talk about what exactly is a knot, and how we can tell when something is not the unknot. | |||
===David Sondak=== | |||
''Fluids, Math and Oobleck!'' | |||
We will explore the magical world of fluids and their relationship to mathematics. As an example of fluids and math in the real world, we will make the living fluid oobleck and discuss some of its mathematical properties. | |||
=== George Craciun=== | |||
''Proofs without words (but with plenty of pictures)'' | |||
We will discuss mathematical proofs that can be done using only pictures or figures. If you want to see many such examples you can check out the book "Proofs without Words: Exercises in Visual Thinking" by Roger B. Nelsen. For more information also look at the wikipedia page http://en.wikipedia.org/wiki/Proof_without_words , where you can find links to Java Applets that show animations of proofs without words, such as http://usamts.org/Gallery/G_Gallery.php . | |||
=== Daniel Hast=== | |||
''Clock arithmetic and perfect squares: a "Golden Theorem" of reciprocity'' | |||
We'll explore systems of arithmetic where numbers loop back around to zero (like the hours on a clock!), called "modular arithmetic". Which numbers are perfect squares in such systems? Gauss, one of the greatest mathematicians in history, called the remarkable answer the "golden theorem". | |||
=== Alisha Zachariah=== | |||
''What is infinity anyway'' | |||
Infinity has a long history of having confounded and fascinated thinkers. We will take a look at some fundamental problems that early mathematicians grappled with and see some ways to understand infinity that have contributed to how we do math today. | |||
===Marko Budisic=== | |||
''Mathematics of epidemics'' | |||
Infectious diseases in our communities often make it into daily conversation: "There's a nasty cold going around.", "It's the flu season, get your shots.", and even, "There are news of a zombie outbreak!" Come hear how math gets applied to something as messy as spread of disease. We will use our wits, pencils, and computers to understand the progress of headaches, common cold, zombie outbreaks, and even ebola, a disease that is currently making the news. | |||
===Nigel Boston=== | |||
''Same bad channel'' | |||
How do we get such clear photos of the comet in the news? | |||
A 20 watt transmitter sends signals 500 million km through space to | |||
us and yet amazingly they survive this ordeal error-free. What's | |||
behind this is error-correcting codes. I'll give some of the basics, | |||
some related puzzles, and some challenges. | |||
===Soledad Benguria=== | |||
''Exploring Palindromes'' | |||
A Palindrome is a word or a number that reads the same forward and backwards. For example, Hannah, radar and civic are palindromic words, and 34743, 6446 are palindromic numbers. We will explore some curious properties of palindromes, and talk about what makes the number 196 special. | |||
===Simon Marshall=== | |||
''The Ant Walk'' | |||
An ant is walking on a grid in the plane, but it can only move north or east. How many ways are there for it to get from one square to another? The numbers that appear when we answer this question have a wealth of interesting properties. | |||
===Betsy Stovall=== | |||
''Divisibility Cheats'' | |||
We will discuss simple ways to determine whether one number is evenly divisible by a smaller one and also how to prove these facts. If time permits, we will also look at divisibility rules in bases other than 10. | |||
===Julie Mitchell=== | |||
''Protein Folding and Robot Dances: Understanding the Basics of Kinematic Motion'' | |||
We will learn about motion subject to constraints. Mathematics based on these principles helps us build robots, explains human motion, and helps us model the shape of proteins like enzymes and antibodies. | |||
===David Anderson=== | |||
''Let’s make a deal!'' | |||
We will explore a famous problem, called the Monty Hall Problem, that was inspired by a game show and became well known after a number of mathematicians incorrectly solved the problem in a very public manner. We will discuss and solve the problem, learn some probability, play the game, and invent some variants of the game that may, or may not, have similar counter-intuitive behaviors. | |||
==Previous Math Circle Meetings for Spring 2014== | ==Previous Math Circle Meetings for Spring 2014== | ||
Line 29: | Line 179: | ||
| March 31, 2014 || Reese Johnston || [[#Games Puzzles | The Mathematics of Lying, part 2]] || | | March 31, 2014 || Reese Johnston || [[#Games Puzzles | The Mathematics of Lying, part 2]] || | ||
|- | |- | ||
| April 7, 2014 || | | April 7, 2014 || Daniel Erman || [[#Games Puzzles | Josephus Problem]] || [http://en.wikipedia.org/wiki/Platonic_solid Platonic solids] | ||
|- | |- | ||
| April 14, 2014 || NO MEETING|| [[#Games Puzzles | MMSD Spring Break]] || | | April 14, 2014 || NO MEETING|| [[#Games Puzzles | MMSD Spring Break]] || | ||
Line 39: | Line 189: | ||
</center> | </center> | ||
== Abstracts == | === Abstracts === | ||
===Betsy Stovall=== | ====Betsy Stovall==== | ||
''Geometric Addition'' | ''Geometric Addition'' | ||
Abstract: We will learn some neat geometric tricks for quickly and painlessly computing some surprisingly large sums. | Abstract: We will learn some neat geometric tricks for quickly and painlessly computing some surprisingly large sums. | ||
===Jon Kane=== | ====Jon Kane==== | ||
''Rows of Roses'' | ''Rows of Roses'' | ||
Latest revision as of 17:59, 28 August 2015
Meetings for Fall 2014 and Spring 2015
All talks are at 6pm in Ingraham Hall room 120, unless otherwise noted.
Fall 2014 | |||
---|---|---|---|
Date and RSVP links | Speaker | Topic | Link for more info |
September 8, 2014 | Philip Matchett Wood | Pictures and Puzzles | |
September 15, 2014 | Jen Beichman | Playing with geometric sums | |
September 22, 2014 | DJ Bruce | Is any knot the unknot? | |
September 29, 2014 | Uri Andrews | The games of Criss Cross and Brussels Sprouts | |
October 6, 2014 | David Sondak | Fluids, Math, and Oobleck! | |
October 13, 2014 | George Craciun | Proofs without words (but with plenty of pictures) | |
October 20, 2014 | Scott Hottovy | Coming soon! | |
October 27, 2014 | Daniel Hast | Clock arithmetic and perfect squares: a "Golden Theorem" of reciprocity | |
November 3, 2014 | Alisha Zachariah | Infinity | |
November 10, 2014 | Marko Budisic | Mathematics of epidemics | |
November 17, 2014 | Nigel Boston | Same bad channel | |
|
|||
December 1, 2014 | Daniel Erman | How to catch a (data) thief | |
Spring 2015 | |||
TBA | Coming soon! | ||
February 2, 2015 | Soledad Benguria | Exploring Palindromes | |
February 9, 2015 | Jeff Linderoth | Coming soon! | |
February 16, 2015 | Simon Marshall | The Ant Walk | |
February 23, 2015 | Uri Andrews | Coming soon! | |
March 2, 2015 | Jordan Ellenberg | Coming soon! | |
March 9, 2015 | Ali Lynch | Mathematical Games and Winning Strategies | |
March 16, 2015 | Daniel Schultheis | Picture Hanging and Secret Algebra | |
March 23, 2015 | Betsy Stovall | Divisibility Cheats | |
March 30, 2015 | No meeting | UW Spring Break | |
April 6, 2015 | Julie Mitchell | Protein Folding and Robot Dances: Understanding the Basics of Kinematic Motion | |
April 13, 2015 | Jessica Lin | Coming soon! | |
April 20, 2015 | DJ Bruce | Coming soon! | |
April 27, 2015 | David Anderson | Let’s make a deal! | |
May 4, 2015 | Daniel Ross | Coming soon! | |
May 11, 2015 | Grace Deane | Last meeting of semester! |
Abstracts
Philip Matchett Wood
Pictures and Puzzles
When does a simple picture solve a tricky puzzle? Come and learn about how line-and-dot drawing can solve complex puzzles, and create some new puzzles besides!
DJ Bruce
Is any knot the unknot?
Abstract: You're walking home from school, and you pull out your head phones to listen to some tunes. However, inevitably they are a horribly tangled mess, but are they really a knot? We'll talk about what exactly is a knot, and how we can tell when something is not the unknot.
David Sondak
Fluids, Math and Oobleck!
We will explore the magical world of fluids and their relationship to mathematics. As an example of fluids and math in the real world, we will make the living fluid oobleck and discuss some of its mathematical properties.
George Craciun
Proofs without words (but with plenty of pictures)
We will discuss mathematical proofs that can be done using only pictures or figures. If you want to see many such examples you can check out the book "Proofs without Words: Exercises in Visual Thinking" by Roger B. Nelsen. For more information also look at the wikipedia page http://en.wikipedia.org/wiki/Proof_without_words , where you can find links to Java Applets that show animations of proofs without words, such as http://usamts.org/Gallery/G_Gallery.php .
Daniel Hast
Clock arithmetic and perfect squares: a "Golden Theorem" of reciprocity
We'll explore systems of arithmetic where numbers loop back around to zero (like the hours on a clock!), called "modular arithmetic". Which numbers are perfect squares in such systems? Gauss, one of the greatest mathematicians in history, called the remarkable answer the "golden theorem".
Alisha Zachariah
What is infinity anyway
Infinity has a long history of having confounded and fascinated thinkers. We will take a look at some fundamental problems that early mathematicians grappled with and see some ways to understand infinity that have contributed to how we do math today.
Marko Budisic
Mathematics of epidemics
Infectious diseases in our communities often make it into daily conversation: "There's a nasty cold going around.", "It's the flu season, get your shots.", and even, "There are news of a zombie outbreak!" Come hear how math gets applied to something as messy as spread of disease. We will use our wits, pencils, and computers to understand the progress of headaches, common cold, zombie outbreaks, and even ebola, a disease that is currently making the news.
Nigel Boston
Same bad channel
How do we get such clear photos of the comet in the news? A 20 watt transmitter sends signals 500 million km through space to us and yet amazingly they survive this ordeal error-free. What's behind this is error-correcting codes. I'll give some of the basics, some related puzzles, and some challenges.
Soledad Benguria
Exploring Palindromes
A Palindrome is a word or a number that reads the same forward and backwards. For example, Hannah, radar and civic are palindromic words, and 34743, 6446 are palindromic numbers. We will explore some curious properties of palindromes, and talk about what makes the number 196 special.
Simon Marshall
The Ant Walk
An ant is walking on a grid in the plane, but it can only move north or east. How many ways are there for it to get from one square to another? The numbers that appear when we answer this question have a wealth of interesting properties.
Betsy Stovall
Divisibility Cheats
We will discuss simple ways to determine whether one number is evenly divisible by a smaller one and also how to prove these facts. If time permits, we will also look at divisibility rules in bases other than 10.
Julie Mitchell
Protein Folding and Robot Dances: Understanding the Basics of Kinematic Motion
We will learn about motion subject to constraints. Mathematics based on these principles helps us build robots, explains human motion, and helps us model the shape of proteins like enzymes and antibodies.
David Anderson
Let’s make a deal!
We will explore a famous problem, called the Monty Hall Problem, that was inspired by a game show and became well known after a number of mathematicians incorrectly solved the problem in a very public manner. We will discuss and solve the problem, learn some probability, play the game, and invent some variants of the game that may, or may not, have similar counter-intuitive behaviors.
Previous Math Circle Meetings for Spring 2014
All talks are at 6pm in Ingraham Hall room 120, unless otherwise noted.
Date and RSVP links | Speaker | Topic | Link for more info |
---|---|---|---|
January 27, 2014 | Cancelled for weather | ||
February 3, 2014 | Daniel Ross | Encryption | |
February 10, 2014 | Betsy Stovall | Geometric addition | |
February 17, 2014 | Mimansa Vahia | Origami and Mathematics | Origami video |
February 24, 2014 | Jon Kane | Rows of Roses | |
March 3, 2014 | Matthew Johnston | Surprising results in games of chance | |
March 10, 2014 | Jordan Ellenberg | Why the card game Set should actually be called Line, and other comments on finite geometry | Set |
March 17, 2014 | NO MEETING | UW Spring Break | |
March 24, 2014 | Reese Johnston | The Mathematics of Lying | |
March 31, 2014 | Reese Johnston | The Mathematics of Lying, part 2 | |
April 7, 2014 | Daniel Erman | Josephus Problem | Platonic solids |
April 14, 2014 | NO MEETING | MMSD Spring Break | |
April 21, 2014 | Chris Janjigian | Pirates and prisoners: an introduction to game theory (with candy!) |
Abstracts
Betsy Stovall
Geometric Addition
Abstract: We will learn some neat geometric tricks for quickly and painlessly computing some surprisingly large sums.
Jon Kane
Rows of Roses
Abstract: Let’s talk about the sine and cosine functions. One does not need to use very much information about these commonly seen functions in order to understand a large number of curves which can be drawn by graphing sine and cosine in Cartesian and polar coordinates. We will see sine curves, sums of sine curves, Lissajous figures, cycloids, hypocycloids, epicyclodes, and, of course, many rows of roses.
Previous Math Circle Meetings Fall 2013
All talks are at 6pm in Ingraham Hall room 120, unless otherwise noted.
Date and RSVP links | Speaker | Topic (click for more info) |
---|---|---|
October 7, 2013 | Gheorghe Craciun | Games Puzzles and Theorems in Geometry |
October 14, 2013 | Gheorghe Craciun | Games Puzzles and Theorems in Geometry |
October 21, 2013 | Uri Andrews | King Chicken Theorems |
October 28 2013 | Uri Andrews | King Chicken Theorems |
November 4 2013 | Jean-Luc Thiffeault | The Mathematics of Juggling |
November 11 2013 | Theodora Hinkle | TBA |
November 18 2013 | Theodora Hinkle | TBA |
November 25 2013 | TBA | TBA |
Previous Math Circle Meetings Spring 2013
More details about each talk to follow soon. All talks are at 6pm in Van Vleck Hall, room B231, unless otherwise noted.
Date and RSVP links | Speaker | Topic (click for more info) |
---|---|---|
February 4, 2013 Register! | Jonathan Kane | Infinitely Often |
February 11, 2013 Register! | Jean-Luc Thiffeault | Making taffy with the Golden mean |
February 18, 2013 Register! | Alison Gordon Lynch | Guarding an Art Gallery |
February 25, 2013 Register! | Mimansa Vahia | Origami |
Wed., Feb. 27, 2013 (Public Lecture, 5pm, B239) | David Perry | The Coming of Enigma |
March 4, 2013 Register! | Betsy Stovall | The Game of Nim |
March 11, 2013 Register! | Greg Shinault | Pythagorean Triples: A Personal Interview |
March 18, 2013 Register! | Elaine Brow | Doodling and Graph Theory |
March 25, 2013 Register! | Spring Break | No Meeting |
April 1, 2013 Register! | Uri Andrews | A Mathematician's April Fools |
April 8, 2013 Register! | Daniel Ross | String puzzles |
April 15, 2013 Register! | Silas Johnson | How to Win (or not) at Tic-Tac-Toe |
April 22, 2013 Register! | Lalit Jain | Playing with Zomes |
Infinitely Often
February 4th, 2013, 6pm, Van Vleck Hall room B231, UW-Madison campus
Infinitely Often
So you think you can add two numbers, three number, even a lot of numbers together? Well, can you add an infinite number of numbers together? See how thinking about infinite processes can be used to add infinite sums, evaluate repeating decimals, understand infinite continued fractions, and calculate areas and volumes. Also see what strange things can go wrong when dealing with infinity.
Making taffy with the Golden mean
February 11th, 2013, 6pm, Van Vleck Hall room B231, UW-Madison campus
Making taffy with the Golden mean
Taffy pullers are devices used to make candy or bread. They are very interesting mathematically: we can relate the number of folds of dough to some famous mathematical sequences. Some surprising numbers pop up, like the Golden mean but also its lesser-known cousins. We can use this knowledge to improve existing devices. (Warning: no actual taffy will be made. Sorry.)
Guarding an Art Gallery
February 18th, 2013, 6pm, Van Vleck Hall room B231, UW-Madison campus
Guarding an Art Gallery
How many guards does it take to guard an art gallery so that every spot in the gallery can be seen by at least one guard? We will explore this question and find an upper bound on the number of necessary guards based only on the number of walls in the gallery.
The Coming of Enigma
Special Public Lecture: Wednesday, February 27th, 2013, 5pm, Van Vleck Hall room B239, UW-Madison campus
The Enigma machine was a cryptodevice used by the Germans before and during World War II and was considered to provide unbreakable security. This belief was founded on very solid principles which will be outlined in this talk. Taking a two-millennia tour through the history of cryptology, we will come to understand the design principles that went into the Enigma and understand how it worked and how it was used. We will also touch on how espionage, treason, and sibling rivalry provided Polish mathematicians the necessary ingredients to break the unbreakable. This talk is geared towards the general public, with no specific expertise in mathematics assumed.
Origami
February 25th, 2013, 6pm, Van Vleck Hall room B231, UW-Madison campus
Origami is the art of folding paper, and it involves some cool math, too. Come to find out more!
The Game of Nim
March 4th, 2013, 6pm, Van Vleck Hall room B231, UW-Madison campus
Nim is a two-player game wherein the players alternate taking one or more stones from a pile (there are two or more piles at the beginning). The player who takes the last stone wins. We will spend most of the time playing and trying to come up with winning strategies. At the end, we will talk a little about the history a general strategy to win the game.
Pythagorean Triples: A Personal Interview
March 11th, 2013, 6pm, Van Vleck Hall room B231, UW-Madison campus
We all know the Pythagorean theorem from geometry, which tells us the relationship between the side lengths of any right triangle: a^2 + b^2 = c^2, where c is the length of the hypotenuse. Sometimes we are very lucky, when a, b, and c are natural numbers such as 3, 4, and 5. That is called a Pythagorean triple. We're going take a close look at these characters and figure out a few of their less-than-obvious traits.
Doodling and Graph Theory
March 18th, 2013, 6pm, Van Vleck Hall room B231, UW-Madison campus
Some of the pencil-and-paper games we play in notebook margins use more math than meets the eye. We'll try out a few fun and simple doodling puzzles, and see how they translate to some basic questions in graph theory. Then we'll harness our new theory to find quick solutions to whole groups of puzzles.
A Mathematician's April Fools
April 1st, 2013, 6pm, Van Vleck Hall room B231, UW-Madison campus
A paradox is a seemingly logically valid argument that leads to absurd conclusions. Mathematicians are always very careful to avoid accidentally using one, but they can be useful and fun to play with.
String puzzles
April 8th, 2013, 6pm, Van Vleck Hall room B231, UW-Madison campus
They may be familiar from novelty shops or even your mantlepiece--a bit of string wound around and through some configuration of objects, asking you to accomplish some apparently impossible rearrangement or removal. Part of their difficulty comes from hopelessly infinite array of available moves--do you perhaps tie a clever knot here? Maybe pass a bight through there? We'll look at a few examples and see how to distill them to something more manageable, and even turn some into puzzles that can be solved instead only on paper (no drawing skills required).
How to Win (or not) at Tic-Tac-Toe
April 15th, 2013, 6pm, Van Vleck Hall room B231, UW-Madison campus
Playing with Zomes
April 22nd, 2013, 6pm, Van Vleck Hall room B231, UW-Madison campus
This week we will and study the symmetric and magic of 3 dimensional shapes. Be ready to get your hands dirty and make your own stellated icosahedron!
Previous Math Circle Meetings Fall 2012
Date and RSVP links | Speaker | Topic (click for more info) | Event and poster links |
---|---|---|---|
October 1, 2012: Register | Richard Askey | Counting: to and then beyond the binomial theorem | Combined High School Math Night & Math Circle (Poster) |
October 8, 2012: Register | Philip Matchett Wood | Proofs with Parity | Math Circle |
October 15, 2012: Register | Philip Matchett Wood | Fun Flipping Coins | Math Circle (Poster) |
October 22, 2012: Register | Saverio Spagnolie | Random walks: how gamblers lose and microbes diffuse | Combined High School Math Night & Math Circle (Poster) |
October 29, 2012: Register | Beth Skubak | non-Euclidean geometry | Math Circle (Poster) |
November 5, 2012: Register | Mihai Stoiciu | Rubik's Cubes | Combined High School Math Night & Math Circle (Poster) |
November 12, 2012: Register | Alison Gordon | Curious Catalan Numbers | Math Circle (Poster) |
November 19, 2012: Register | Gregory Shinault | Tiling Problems | Math Circle |
November 26, 2012: Register | Claire Blackman | Binary Numbers | Math Circle |
Counting: to and then beyond the binomial theorem
October 8th, 2012, 6pm, Van Vleck Hall room B223, UW-Madison campus
Presenter: Richard Askey. How many ways can zeros and ones be put into n places? It is easy to see this is 2^n. It is also easy to show that there are n! ways of ordering n different objects. There are problems which go beyond these two. How many ways can k zeros and n-k ones be put into n places? How many inversions are there in the n! ways of ordering the numbers 1,2,...,n. [123 has no inversions, 132 has one, 312 has two, 321 has three]. These will lead us to what has been called "The world of q".
Proofs with Parity
October 8th, 2012, 6pm, Van Vleck Hall room B223, UW-Madison campus
Presenter: Philip Matchett Wood. Parity---matching objects up in pairs---is a surprisingly useful tool for answering math questions. Bring a pencil and notebook, and we will explore many different situations where parity plays a role.
Fun Flipping Coins
October 15th, 2012, 6pm, Van Vleck Hall room B223, UW-Madison campus
Presenter: Philip Matchett Wood. Flip a coin many times, and what happens? A whole mess of cool probability, that what! Bring a notebook, pencil, and some sharp common sense.
Random walks: how gamblers lose and microbes diffuse
October 22nd, 2012, 6pm, Van Vleck Hall room B223, UW-Madison campus
Presenter: Saverio Spagnolie. We will explore one of the most famous mathematical models of random activity, the random walk. After an introduction to some basic ideas from probability, we will see that the same mathematical tools can be used to study completely different types of problems. In particular, we will find that there are no gambling strategies that can be used to beat the casino, and that tiny microorganisms can't stop moving even if they want to!
Non-Euclidean geometry
October 29th, 2012, 6pm, Van Vleck Hall room B223, UW-Madison campus
Presenter: Beth Skubak. Most of the geometry we see in school is based on the ideas of the Greek mathematician Euclid, who lived around 300 BC. While his ideas are pretty useful, we want to consider geometry in some "non-Euclidean" scenarios, like when instead of being flat, our surfaces are curved.
Rubik's Cubes
November 5th, 2012, 6pm, Van Vleck Hall room B223, UW-Madison campus
Presenter: Mihai Stoiciu. Rubik's Cubes. Some people describe mathematics as the science of patterns. We will explore patterns, permutations, orientations, and counting with the famous Rubik's Cube.
Curious Catalan Numbers
November 12th, 2012, 6pm, Van Vleck Hall room B223, UW-Madison campus
Presenter: Alison Gordon. The Catalan numbers are a sequence that shows up as solutions to all sorts of problems in mathematics. Join us as we count handshakes, match parentheses, and build mountains in order to understand these interesting numbers!
Tiling Problems
November 19th, 2012, 6pm, Van Vleck Hall room B223, UW-Madison campus
Presenter: Greg Shinault. Remember tangrams? You know, given some tiles build a specific shape using them. That is an example of a tiling problem, and to some mathematicians they are serious business. We are going to play with a variety of these puzzles, and talk about some of the things that have been figured out about them.
Binary Numbers
November 26th, 2012, 6pm, Van Vleck Hall room B223, UW-Madison campus
Presenter: Claire Blackman. We're all used to doing arithmetic with the 10 digits 0 to 9. But there's no reason why we shouldn't use just two digits, 0 and 1, instead. We'll be exploring the world of binary arithmetic, which is based on powers of two.
Previous Math Circle Meetings Spring 2012
Date | Speaker | Talk (click for more info) |
---|---|---|
February 13, 2012 | Patrick LaVictoire | Transforms: Pictures in Disguise |
February 20, 2012 | Uri Andrews | Hercules and the Hydra |
February 27, 2012 | Peter Orlik | Madison Math Circles |
March 5, 2012 | Jean-Luc Thiffeault | The hagfish: the slimiest fish in the sea |
March 12, 2012 | Cathi Shaughnessy | Archimedes' method |
March 19, 2012 | Andrei Caldararu | Games with the binary number system |
March 26, 2012 | Laurentiu Maxim | How many pentagons and hexagons does it take to make a soccer ball? |
Transforms: Pictures in Disguise
February 13th, 2012, 6pm, Van Vleck Hall room B223, UW-Madison campus
Presenter: Patrick LaVictoire. How are computer graphics like a massive game of Sudoku? How does a CAT scan get a 3D picture from a bunch of 2D X-ray images? How can you make the same image look like different people when viewed from close up and far away? I'll discuss all these and more, with some neat illustrations and quick games.
Hercules and the Hydra
February 20th, 2012, 6pm, Van Vleck Hall room B223, UW-Madison campus
Presenter: Uri Andrews. We will talk about important techniques of self-defense against an invading Hydra. The following, from Pausanias (Description of Greece, 2.37.4) describes the beginning of the battle of Hercules against the Lernaean hydra:
"As a second labour he ordered him to kill the Lernaean hydra. That creature, bred in the swamp of Lerna, used to go forth into the plain and ravage both the cattle and the country. Now the hydra had a huge body, with nine heads, eight mortal, but the middle one immortal. . . . By pelting it with fiery shafts he forced it to come out, and in the act of doing so he seized and held it fast. But the hydra wound itself about one of his feet and clung to him. Nor could he effect anything by smashing its heads with his club, for as fast as one head was smashed there grew up two..."
For more information on some of the conjectures discussed during this talk see http://en.wikipedia.org/wiki/Collatz_conjecture and http://mathworld.wolfram.com/CollatzProblem.html
Madison Math Circles
February 27th, 2012, 6pm, Van Vleck Hall room B223, UW-Madison campus
Presenter: Peter Orlik. A short introduction to elementary and middle school activities in Madison like Mathematical Olympiad and Mathcounts will be followed by some challenging problems. Please bring your favorite pencils and be prepared to work!
The hagfish: the slimiest fish in the sea
March 5th, 2012, 6pm, Van Vleck Hall room B223, UW-Madison campus
Presenter: Jean-Luc Thiffeault. The hagfish is a bottom-dwelling, scavenger fish that resembles an eel. It has some interesting peculiarities: first, it sometimes willingly ties itself in a knot. Second, it secretes a spectacular amount of slime, which is used in the cosmetics industry. For a long time the purpose of this slime was unknown, but recently scientists have filmed live hagfish using it. (I'll keep this purpose a secret until the talk...) I'll then discuss how we can apply mathematical tools to study hagfish slime.
Archimedes' method
March 12th, 2012, 6pm, Van Vleck Hall room B223, UW-Madison campus
Presenter: Cathi Shaughnessy. Students will use Archimedes' classical method to determine bounds for the value of the number pi. Please BRING A CALCULATOR with you for this presentation. The presenter will provide compass, protractor, straightedge and worksheet for each student.
Games with the binary number system
March 19th, 2012, 6pm, Van Vleck Hall room B223, UW-Madison campus
Presenter: Andrei Caldararu. I will present a few games and tricks which use the binary number system. For more information about binary numbers please see http://en.wikipedia.org/wiki/Binary_numeral_system
How many pentagons and hexagons does it take to make a soccer ball?
March 26th, 2012, 6:30pm (note special time!!!), Van Vleck Hall room B223, UW-Madison campus
Presenter: Laurentiu Maxim. I will first introduce the concept of Euler characteristic of a polyhedral surface. As an application, I will show how one can find the number of pentagons on a soccer ball without actually counting them.