I was so enthralled with Judge Sand’s city of Yonkers case that I couldn’t help but do a little more research on him. And lo and behold, nary a page in from a google search, I found another case that deals with math!

The setup

Henry Barschall, working for the American Physical Society and the American Institute of Physics, investigated the cost of science journal subscriptions for libraries. Even then in 1986 (as we hear is still the case now), science journals were increasing their prices — for a variety of reasons. And science journals were on average more expensive than journals in other disciplines (e.g. in 1985, the average yearly subscription for a science journal was $328, while for philosophy, it was only $47 — here). 

The survey was done and ready to be published in Physics Today. Barschall outlined his methodology here. The intial results which were published in 1986 are below:

Note that for the physics journals, the American Physical Society and the American Institute of Physics were the most cost effective (0.7 cents/1000 characters), while Gordon and Breach were the least cost effective (31 cents/1000 characters). For this case, it’s important to note who sponsored the study! (The same organizations who came out the “winners.”)

An expanded survey, published in 1988, took into account not only the price, but the “impact” (or importance) of the journal… The metric for the impact was the average number of papers which cited an article in the journal two years after its publication. The more “impact” the journal had, according to the study, the more it mitigated a higher cost (hence: a ratio was created). 

Again, APS and AIP were near the top of the list, while Gordon and Breach were way down at the bottom, with a cost/impact ratio more than twice the next publisher.

Gordon and Breach sued the APS and AIP. Judge Leonard Sand heard the case, and summarized it as follows:

This action, a dispute between publishers of scientific journals, raises an issue of first impression: whether a non-profit publisher may be sued for false advertising under the Lanham Act for publishing comparative surveys of scientific journals which, through the employment of a misleading rating system, rate its own publications as superior.

[...]

These articles, G&B alleges, constituted the start of a “continuous promotional campaign” waged by AIP and APS against them with the aid of Barschall’s survey results. First, G&B alleges, AIP and APS distributed “preprints” of the 1988 survey results to librarians (the primary purchasers of scientific journals) at a conference in June 1988. Since that time, G&B alleges, defendants have continued to disseminate the results of Barschall’s surveys to prospective purchasers through press releases, letters to the editor, “electronic mailings,” and meetings with librarians (”secondary uses” of the articles). G&B states that its attempts to reach an accommodation with defendants have been fruitless, and that it has been forced to resort to the courts. After filing a series of legal actions in Europe claiming unfair competition, and failing to receive satisfaction in Swiss, German, and French courts, G&B brought this lawsuit in September 1993.

G&B contends that the articles are promotional materials cloaked in the deceptive guise of “neutral” academic inquiry, and thus constitute misleading advertising under the Lanham Act, 15 U.S.C. § 1125(a), and comparable provisions of New York General Business Law. Barschall’s studies, G&B contends, far from being neutral, in fact constitute a “cynical promotional campaign” by AIP and APS to deceive librarians and other consumers of scientific journals into thinking that their journals have been “scientifically” proven to be of superior value. 

Judge Sand’s judicial opinions, the trial transcript (really interesting stuff! I swear!), Barchall’s papers, and other related material have been put on this site at Stanford for you to read. 

Eventually in 1997 (yes, justice takes a long time to render), Judge Sand made his final ruling:

Barschall’s methodology has been demonstrated to establish reliably precisely the proposition for which defendants cited it — that defendants’ physics journals, as measured by cost per character and by cost per character divided by impact factor, are substantially more cost-effective than those published by plaintiffs. Plaintiffs have proved only the unremarkable proposition that a librarian would be ill-advised to rely on Barschall’s study to the exclusion of all other considerations in making purchasing decisions. This consideration in no way makes Barschall’s study or defendants’ descriptions thereof false, and accordingly judgment is granted to defendants.

And the case is over!

Could this be useful in a math class?

I don’t know. I honestly can’t see myself using it next year, except maybe for a quick classroom discussion — a few “do nows” where each day I introduce more and more of the case and the evidence, and we talk about the math issues it raises…

1. Before presenting the data, it could lead to a discussion of how one might measure the cost-effectiveness of journals, and different ways students could imagine calculating them. 
2. Does Barschall’s method of measuring impact make sense? Does taking a ratio of cost per thousand characters to impact work? Why divide? (That will be hard for my students to get.)
3. A baby project: students could go to the school library and get data about various online databases that the library subscribes to, and try to determine whether subscribing is cost-effective for the school. Or at least, the class could try to brainstorm out what sorts of data we would want (e.g. the cost of the database annually, whether — and if so, how quickly — the cost of the database has been increasing, the number of times the databases are accessed each day, the amount of information the databases contain, etc.)

   But honestly, this seems like it isn’t really worth it. It would make for an interesting independent study, though.

4. A discussion about whether the survey was ethical or not, merely by virtue of the fact that those producing it were players in the game (non-profit players, but players none-the-less). [A similar discussion would be whether drug companies should produce their own studies of drug effectiveness.]
5. Ideas for how one might present the data visually? 
6. Should a court (even with scientific experts being called in) be the final arbiter in whether a mathematical study/survey was sound or not? If not, who should be? 

THE PROBLEM IS HERE!

In the Quach family, there is an age-old tradition that has been intact since the 1500s. In this tradition, every member of the Quach family receives one lottery ticket for his/her first 25 birthdays.

Based on empirical data collected over the years, it was determined by the family Mathematician that the probability of a Quach family member winning the lottery at least once during that 25 year stretch is 211/243.

Assuming the above statement is true, what is the probability of a Quach family member winning the lottery at least once during any 5 year interval? (Assume that lottery wins are completely independent of each other).

So the probability that a member of the Quach family does not win the lottery in 25 years is 32/243. Since winning each year is independent of any other year, we know:

P(not winning any year)=P(not winning 1st year)*P(not winning 2nd year)*…*P(not winning 25th year)

And since the probability of not winning each year is the same, we get:

P(not winning any year)=P(not winning in nth year)^25
32/243=P(not winning in nth year)^25
P(not winning in nth year)=(32/243)^(1/25) 

Now we need to find the probability of winning at least once in a five year interval, which is actually 1-P(not winning in 5 year interval).

P(not winning in 5 year interval)=P(not winning in 1st year)*P(not winning in 2nd year)*…*P(not winning in 5th year)

P(not winning in 5 year interval)=P(not winning in nth year)^5

P(not winning in 5 year interval)=(32/243)^(1/5)=2/3

Since we want to find P(winning at least once in 5 year interval), we know that that will have to be 1/3. 

I want me some of them odds.

I can’t help it… I have to post about this… jd2718 led me to a blog which is so awesomely captivating that I just spent the last hour reading like a zillion postings…

It’s not all flowers and sausages

It chronicles all the funny, frustrating, quotidian things teachers go through… you know what I’m talking about… there are those things which we go through and are funny to everyone

excerpt from blog: ”Well you need to get them to stop. We don’t need children standing there having orgasms. The next thing you know they will all be shivering and shaking and oooooohhhhhhhhh”

… and then there are those things that you only want to tell to other teachers because your friends wouldn’t get it

excerpt from blog: And as the cherry on my sundae, I ended my day with a doctor’s appointment. If that wasn’t sweet enough, I was correcting papers in the waiting room when my name was called. And she had the balls to say, “Oh look, you’re correcting papers, isn’t that cute!” I wonder if it would also be “cute” if Friday I run screaming from the building and bury myself face down in a cocktail?

Out of this list of 1001 books that one ought to read (from this book I guess), here are the ones I have read… about 5.1%. My favorites are marked with a *.

1. The Curious Incident of the Dog in the Night-Time – Mark Haddon
2. Middlesex – Jeffrey Eugenides
3. Choke – Chuck Palahniuk
4. Blonde – Joyce Carol Oates*
5. Memoirs of a Geisha – Arthur Golden
6. The Secret History – Donna Tartt*
7. The Hitchhiker’s Guide to the Galaxy – Douglas Adams
8. Them – Joyce Carol Oates*
9. In Watermelon Sugar – Richard Brautigan
10. The Crying of Lot 49 – Thomas Pynchon
11. The Bell Jar – Sylvia Plath
12. One Day in the Life of Ivan Denisovich – Aleksandr Isayevich Solzhenitsyn
13. Franny and Zooey – J.D. Salinger
14. To Kill a Mockingbird – Harper Lee
15. Pnin – Vladimir Nabokov*
16. Lolita – Vladimir Nabokov
17. Lord of the Flies – William Golding
18. Invisible Man – Ralph Ellison*
19. The Old Man and the Sea – Ernest Hemingway
20. The Catcher in the Rye – J.D. Salinger*
21. Nineteen Eighty-Four – George Orwell*
22. The Little Prince – Antoine de Saint-Exupéry
23. Their Eyes Were Watching God – Zora Neale Hurston
24. The Hobbit – J.R.R. Tolkien
25. Brave New World – Aldous Huxley*
26. A Farewell to Arms – Ernest Hemingway
27. The Sound and the Fury – William Faulkner
28. To The Lighthouse – Virginia Woolf
29. The Sun Also Rises – Ernest Hemingway
30. The Great Gatsby – F. Scott Fitzgerald
31. Siddhartha – Herman Hesse
32. A Portrait of the Artist as a Young Man – James Joyce
33. Ethan Frome – Edith Wharton
34. Heart of Darkness – Joseph Conrad
35. The Hound of the Baskervilles – Sir Arthur Conan Doyle
36. Jude the Obscure – Thomas Hardy*
37. The Adventures of Sherlock Holmes – Sir Arthur Conan Doyle
38. The Picture of Dorian Gray – Oscar Wilde
39. The Adventures of Huckleberry Finn – Mark Twain
40. Treasure Island – Robert Louis Stevenson
41. Alice’s Adventures in Wonderland – Lewis Carroll
42. Walden – Henry David Thoreau
43. The Scarlet Letter – Nathaniel Hawthorne*
44. Wuthering Heights – Emily Brontë
45. Jane Eyre – Charlotte Brontë*
46. The Purloined Letter – Edgar Allan Poe
47. The Pit and the Pendulum – Edgar Allan Poe
48. A Christmas Carol – Charles Dickens
49. The Fall of the House of Usher – Edgar Allan Poe
50. Pride and Prejudice – Jane Austen
51. A Modest Proposal – Jonathan Swift

PREAMBLE

One of my friends is in Paris, helping set up an art installation by Ryoji Ikeda on the number “e”. And I received a frantic email from her asking for help understanding set theory, e, and infinity. 

I sent her information on set theory and e via an email and links, but not on infinity. There are a number of good books and articles on it, making it accessible to a layperson. But I found this youtube video which is directed to the hoi polloi. 

There are bits of the presentation that could be improved (the jokes are not really played well, I see quick and easy ways to make it more “mathy”). But these small things don’t take away from the fact that it is a darn good presentation. And darn it, now I want to give a presentation on infinity! Oh well.

THE CRUX

Interestingly, making the decision to email my friend the video instead of articles gets at the heart of the problem that dy/dan and others are grappling with: when is video an appropriate teaching tool - and is it better?

There are two poles outlined by dy/dan:

1. Video is personable and injects human qualities that can’t be gotten from a text. These human qualities help enhance the learning process, by improving understanding.
2. It takes a heck of a lot more time to watch a video on math than it does to read a paper which goes through the same math (efficiency argument). Reading also allows students to learn at their own pace, go back to sections they didn’t get, and active. 

I thought these poles were meant to be generally taken for video in classroom instruction, even though the examples used were videos from leaving comments in blogs…

So let’s get this out of the way: context is everything, and there isn’t a single answer. Nor is anyone really looking for “an answer.”

With this said I strongly believe the second point is a red herring, and the first is really crucial. I evidence it with a counter-example-question:

Why do I even need to be in the classroom? If students-at-large can learn the content we want them to learn by reading the textbook, do I even need to be there? What am I doing at the board? What am I doing walking around the classroom? I hope (pray!) that it’s not only to answer questions that the book doesn’t address or when they get stuck… because otherwise, why bother showing up?

Teaching with talking, with dynamic visuals (instead of static pictures), with caveats and asides that aren’t easily worked into a text, with auditory and kinesthetic elements… many, many students respond to that. They engage with that. 

(Not that I’m saying students can’t read actively or can’t learn from books… but there is something that books can’t capture that we teachers can.)

I guess what I’m saying is this: I see a defense of the need for good teachers in the classroom to also be a defense of video. (If well chosen/done.)

And I honestly think that almost everyone would agree with that.

NOTE AND CONFESSION: A PLEA

I suspect (but can’t be sure) that most of the discussion about video in the edblogosphere is not talking about videos of a lecture or solution to a problem… but I think that my thoughts about this may still hold. I’m honestly wondering though if those blogging about videos in the classroom have a firm sense of what videos they are talking about? I’m sure they aren’t trying to kick a dead horse by arguing against this type of valueless video:

But if they aren’t talking about these terrible videos, or videos about teaching, or lecture videos, or videos of how to solve a math problem, or small video clips to motivate a class discussion, I’m a bit clueless about what videos they’re talking about. I just don’t know. Am I missing something? (I think I must be…)

How much do I love Feist? From the first song I heard of hers (Mushaboom) to the myriad others that followed, I was drawn to her haunting voice and her upbeat beat down sound.

And then, then, she comes out with this:

which is a take on this:

which is a feat almost surpassed by this:

and again, I could hear this song a million times and still not be sick of it. I’m in love.

PS. If you haven’t heard the Jack Penate cover of the song, go here or here and press the little play button. Addictive. Do I love it more than the original? Quite possibly. Another really good cover is by Bikini. And still another. Other amateur and not terrible covers: 1 2 3 4 (though I am thoroughly sickened by the t-shirt on the singer of cover 3).

As you might recall, I’m spending a chunk of this summer designing a multivariable calc course. The oft repeated phrase of the moment: GACK! This is a mini-challenge, because not only am I trying to plan out the curriculum, but I have to refresh my poor, atrophied brain which hasn’t touched “multi” (as I fondly nicknamed it) in forever. (Well, erm, 9 years, anyway.)

I spent yesterday searching the net for resources to have at my fingertips when designing the course. And to keep them all organized — in one place — I created a website to house it all. 

My Multivariable Calculus Resource Webpage: multivariablecalculus.wordpress.com

I’m actually really proud of it, even though it’s still a work in progress. So if you have any interest, hop on by. Things of notice:

• Nine different free multivariable calc textbooks (!) are available online
• There are loads of great applets to visualize things like div, grad, curl, line and surface integrals, etc.
• There isn’t a set of free videos that I could find that go through major concepts in multivariable calc
• gnuplot is an incredibly powerful graphing utility

I love the MIT magazine Technology Review. This month’s issue had the following diagram in it, associated with an article about carbon footprints:

Anyone else see the problem? And anyone else see a teachable moment?

If you don’t see it, think about the data. You’re saying the World Average is 4 metric tons, the US Homeless Person is 8.5 metric tons, and US Resident is 20 metric tons. In any representation of the data, the US Homeless Person should be a bit less than twice the World Average. And the US Resident should be five times the world average.

Now look at the picture. Does that diagram represent that?

Put it another way: can you fit exactly five of the small circles in the largest circle?

(No.)

The diagram is misleading because you look at it and naturally compare areas. But unless you give it more than a glance, you won’t notice that the numbers (4.5, 8, 20) actually are the radii of the circles!

This could be the hook for a geometry or Algebra I class (on proportions, on circles, on data analysis). A teacher could then to parlay it to a discussion of how to “fix” the problem…

I see two easy solutions:

1. Make a bar graph (boring solution)
2. Make the same bubble graph, but make the radii , , and respectively (more fun solution)

In coming up with the second solution, students will think about areas, proportions, and visual representations of data. I can see students each approaching and solving the problem slightly differently, but still getting the same answer. In that sense, it allows for some grappling and struggle.

I still love the Technology Review. Not only is it full of good reads, but good ideas for lessons!

Look below the jump for a revised graph, which accurately represents the data…

[Created in 5 minutes using Microsoft Word... I used AutoShapes to draw a circle. I right clicked to "Format AutoShape" and set the size to the radii I wanted... and finally, in the same menu, I changed the color of the cirlce.]

This is too good not to use in the classroom… mwa hahahaha.  (Found via Digg: here)

A simplistic explanation (which is all I wanted) is here:

Your brain can make your hand write a 6 in the normal direction no problem at all, and it can circle your foot in a clockwise direction, no problem at all either. But when you try to do both types of movement at the same time, big problems.

This is because your brain now has to send very different movement instructions to your arm and leg together at the same time. Your brain is simply not used to doing different things with your arm and leg at the same time in this way.

Note: another one is to “try to simultaneously rotate the index fingers of both hands in the same direction (clockwise or anticlockwise). Do it slowly at first, then faster, and faster…. Pretty soon, they’re going in opposite directions.” (from metafilter)