Here is my speaking calendar for 2015 in case anybody is interested in attending Dan’s Blog: The Unplugged Experience. Some of these sessions are private, others have open registration pages (see the links), and others have waiting lists. Feel free to send an e-mail to dan@mrmeyer.com with inquiries about any of them. It’d be a treat to see you at a workshop or a conference.

BTW. Delaware, Idaho, Nebraska, Rhode Island, Tennessee, West Virginia, and Wyoming will complete my United States bingo card. If you’re the sort of person who schedules these kinds of sessions for a school or district or conference in any of those states, please get in touch.

This is your official dy/dan conference planner® for next week’s conventions.

My Sessions

I’ll be doing three lecture-y things, then a panel with the #netkidz, then happy hour with our hosts, Mathalicious and Desmos.

• Monday. 9:00AM. The Future of Math Textbooks (If Math Textbooks Have a Future). ASSM.
• Wednesday. 11:15AM. Mathematical Modeling in Three Acts. NCSM.
• Friday. 9:30AM. Video Games and Making Math More Like Things Students Like. NCTM.
• Friday. 3:30PM. Teachers Leveraging Technology in the Classroom [Panel]. NCTM.
• Friday. 6:30PM. Desmos + Mathalicious Happy Hour. NCTM.

Planning

The conference program is enormous. After making an initial list of every session I wanted to attend, I had three sessions listed for every hour of every day. Here’s how I decided where I’m going:

First, search for all the reliable people I’ve already seen or read.

That list includes:

Ani, Ball, Bass, Boaler, Callahan, Coffey, Danielson, Daro, Dougherty, Douglas, Garneau, Khalsa, Leinwand, Luberoff, McCallum, Mills, Milou, Murray, Olson, Pickford, Serra, Shih, Silbey, Wray, anyone from EDC, anyone from Math Forum, anyone from Conceptua Math, anyone from Key Curriculum Press, anyone from the #netkidz strand.

Then, admit your biases.

This year I’m partial to sessions on a) the transition from arithmetic to algebra, b) modeling with math, c) technoskepticism, d) technology.

In general, I shy from sessions on dead technologies and session titles with exclamation points. (Though exceptions have to be made sometimes!)

Use Google.

So I’m still looking at lots of session conflicts. There’s nothing quite as fun as discovering a new voice with new ideas at NCTM so I’ll head online and scan blogs, professional websites, or Twitter feeds. Occasionally, I’ll find the presenter’s slides online, which helps me make an informed decision.

How do you map out and prepare for an event as huge (in every dimension) as NCTM?

A Few Recommendations

I figure if you’re reading this you’re already going to Ignite, the keynotes, and the same #netkidz sessions I am. So here are some sessions I’m looking forward to attending that you may have missed. (Some of these are for ASSM and NCSM.)

Jere Confrey + Amplify

Jere Confrey has been working on Amplify’s tablet for the last four years as their chief math officer. She isn’t a technologist by training but obviously understands math and math education so I’ve been very curious to see what she’s been up to. She’s obliging my curiosity with three sessions at NCSM, all concerning digital curriculum.

• Monday. 9:30AM. Using Digital Environments to Foster Student Discourse.
• Tuesday. 11:15AM. Using Complex Problems, Rich Media, and Rubrics to Develop the Standards for Mathematical Practice.
• Wednesday. 2:30PM. Jazz Fusion: Uniting Curriculum, Pedagogy, Assessment, and Teacher Support in a Tablet-Based Environment.

Treisman’s Back

• Monday. 12:15PM. Navigating the Waters of Change and the Role of our Professional Organizations.

After his exceptional address last year, I don’t even check Uri Treisman’s titles or descriptions anymore.

Equity Strand

Treisman isn’t speaking at NCTM but we get Gutierrez and Gutstein in his stead.

• Friday. 11:00AM. Why “Getting Real” Requires Being “Radical” in High-Stakes Education. Rochelle Gutiérrez.
• Friday. 3:30PM. Mathematics for Social Justice: Possibilities and Challenges. Eric (Rico) Gutstein.

Technology + Technoskepticism

• Tuesday. 8:45AM. Beyond Graphing Calculators: Using Technology to Facilitate Classroom Discussions in the Common Core Era. Kevin Lawrence.
• Thursday. 9:30AM. How to Teach Geometry … without Technology! David Masunaga.
• Saturday. 8:00AM. Are Students Using Technology or is Technology Using Them? Avery Pickford.
• Saturday. 11:00AM. Two Birds, One Stone: Transformations, Functions, and the Common Core. Scott Steketee.

I don’t know Kevin Lawrence but it takes some nerve to throw the gauntlet down at graphing calculators so I’ll hear him out. David Masunaga is just endlessly fun, which would be enough, but I’m especially interested in his provocation here. Former blogger Avery Pickford has a background in computer science so you know his technoskepticism comes from an informed position. Steketee and his co-speaker Daniel Scher both blog for Key Curriculum Press at Sine of the Times and their recent postings have been outstanding.

Judging Books By Their Covers

These were my favorite titles:

1. Thursday. 2:00PM. The Mathematics of Casino Management. Micah Stohlmann.
2. Friday. 11:30AM. Avoid Teaching Rules That Expire! Sarah Bush.
3. Friday. 2:00PM. The Great Nutella Heist. Bonnie Spence.

Just Kill Me Now #1

• Friday. 8:00AM. The Hierarchy of Hexagons: A Geometric Inquiry. Christopher Danielson.
• Friday. 8:00AM. Math Teachers and Social Media: Professional Collaboration or Support Group? Raymond Johnson.
• Friday. 8:00AM. Real-World Lessons with Mathalicious. Matt Lane.

Just Kill Me Now #2

• Friday. 2:00PM. One of Us: Every Teacher a Blogging Teacher. Kate Nowak.
• Friday. 2:00PM. Setting the Scene: Designing Your Problem-Based Classroom. Geoff Krall.
• Friday. 2:00PM. Super Mathematics of Game Shows. Bowen Kerins.

What have I missed?

Also: be sure to say hello if we see each other.

And: I can’t recommend happy hour enough. It was one of my favorite sessions at Denver last year. Let’s make some memories.

PS: I may recap some sessions over at MathRecap. Toss your email address in the little slot if you’d like to receive those via email.

Hi there and happy 2014. I’m currently flying from sunny Mountain View, CA, into the heart of the polar vortex for some work with math educators in Madison, WI. That’ll be the first of 50-ish workshops and talks I’ll be offering over 2014. You can find the rest of that list on my presentation page. I’ve posted links to sessions that have open registrations. (Some later dates haven’t opened registration yet.) If you have any questions, feel free to drop a comment here or an e-mail at dan@mrmeyer.com. Do say hi if we’re in the same area and tell me something interesting you’ve learned about teaching this year.

I’m just now back from CMC South in Palm Springs where attendance was about 1,000 people higher than the organizers expected. My already-pretty-high expectations for California math education conferences were also exceeded several times over. What follows are resources and takeaways from the sessions I attended and from one I didn’t.

Robert Kaplinsky

Real-World Problem-Based Learning Using Perplexing Tasks

Robert showed us this image and asked us to figure out how much it cost.

I’ve seen his lesson plan before but it didn’t prepare me for how interesting the math became.

We used the In-N-Out prices for a hamburger, a cheeseburger (a hamburger + cheese), and a Double-Double (a cheeseburger twice over) to figure out the cost of the 100×100 burger.

Our calculation was exactly right but we arrived at it differently. I used a system of three linear equations. My seatmates used a bit more conceptual creativity and got the same answer with a lot less computation. Robert highlighted all of these methods.

My takeaway: it’s really, really hard to describe in a text-based lesson plan all the awesome, heady moments it may provoke. I knew the lesson would be fun and productive. I didn’t know it would be this fun and productive. How do we create lesson plans that convey all those highs, rather than just the nuts and bolts of their implementation?

Breedeen Murray

Telling Stories, Teaching Math

Bree claimed that stories are a useful medium for student learning. She backed this up with lots of citations that I hope she’ll share somewhere. [Update: She has.] She posed ideas for filtering our own lessons through the logic of stories — setting context, adding conflicts, etc. She closed by asking us try to create story-based lessons for exponentials and fraction division.

My thoughts went to St. Matthew Island, which I’ll link without elaboration.

Allan Bellman

Manipulatives vs. Technology: Bring Your Bias and an Open Mind

Great premise for a session:

Pose two lesson objectives. For instance:

1. Students will be able to understand why the angles in a triangle always add to 180 degrees.
2. Students will be able to understand how to calculate the shortest distance from a point to a line and then back to another point.

Allan then brought any resource you’d want, from low-tech to high-tech, everything from tracing paper and scissors to a class set of TI-Nspire’s. We used what we wanted to explore those objectives and then debated the merits of the analog and digital technologies.

The debate hit a high register pretty quickly. For the 180 degrees question, people tended to favor the diverse ways you could demonstrate it with paper. (Cutting, tracing, drawing, etc.) With the NSpire, you had one. You downloaded an applet from Allan and moved vertices around, watching the angle sum stay constant.

For the shortest path problem, most people preferred the calculator because you were able to set up the constraints and then drag a point around to see where the distance bottomed out. The only analog method we discussed was to draw the scenario and then use string to measure the different possibilities, slowly narrowing in on the answer.

For my part, I was bothered that we never discussed a) any other digital technology, aside from Texas Instruments calculators, or b) the cost of a class set of any kind of technology.

Granted, I probably make sport of Texas Instruments too much (and I’m hardly unbiased here) but truly I just find the user experience miserable. From the untouchable, low-DPI screens, to the time it takes me to find the right button out of the millions, to the mindless, button-pushing worksheets teachers have to pass out just to make the devices comprehensible, to the lurching way the cursor moves across the screen in Cabri, I find the whole experience pretty painful.

It would have been great to see the same problems approached with Geogebra or Desmos, for instance. Or even an Excel spreadsheet.

Then there’s the cost. All other things held equal, the high-tech solution will still cost thousands of dollars more per classroom. So we shouldn’t be talking about which solution comes out barely ahead of the other. Technology should shoulder the greater burden of proof here.

Michael Serra

Polygon Potpourri

Five interesting investigations with polygons [pdf]. Michael spent ten minutes prefacing the set, then let us investigate them for twenty minutes, and then asked a volunteer to debrief each one at the end.

If nothing else, it was a nice morning moment to talk about math with Internet friends. That was enough. But I’ve been struck also by how hard it is to make a given math concept more challenging for students and more interesting at the same time. We use bigger numbers. We mix in fractions and decimals. We lengthen the problem set. We time it.

For instance, once students understand how to find the sum of the interior angles of a polygon, it’s like, what do you do to make this more challenging and more interesting?

Michael introduced donut polygons:

Finding the interior angle sum of a donut polygon makes the original task more challenging and more interesting at the same time. In particular, it has a great stinger at the end when you find out whether or not a triangle inside of a pentagon has the same angle sum as a pentagon inside of a triangle.

Michael had two questions at the end that asked, basically, “Do your conclusions hold if there’s a dent in the polygon?” Then, “What about two dents in the polygon?” This messed me up a little bit, because, no, it shouldn’t matter, but then why would Serra include the two questions? Basically, Serra had your correspondent feeling briefly but completely off balance.

Featured Comment

Cates:

The absolute value was a pleasant surprise. Now I have ammunition when a student says, “When am I ever going to use absolute value?” “Well, when calculating the interior angles of a n-sided star polygon, of course.” ;)

Avery Pickford

Proof Doesn’t Begin With Geometry

Avery wins the prize for Best Session Description by sneaking in the totally droll line, “All hail CCSSM MP3.”

He briefly dinged two-column proofs, the Disaster Island where we usually sequester conjecture and argument. I’m all for broading and deepening the definition of proof but I think Avery stretched it too far to include skills like estimation and asking us to justify our answers to the Locker Problem. Is “justify your answer” any different than “prove your conjecture”?

Later, he got into territory I found challenging and really well-thought-out. He showed how simple puzzles like Shikaku could be used to introduce the difference between axioms and theorems. He showed a Shikaku puzzle and its answer (below) and asked us, “What are the rules here?”

“The numbers define the area of a rectangle” and “the side lengths of those rectangles are integers” are axioms, without which the game wouldn’t make any sense. Theorems are the consequences of the axioms, like “Prime-numbered areas result in long, skinny rectangles with side-length 1.”

He also used a variation on the old game Mastermind to create a class-wide context for conjecturing, contradicting, and proving. Great stuff. Wish you were here.

2013 Nov 4. Avery elaborates on all of this in a blog post.

2013 Nov 6. Avery continues his self-recap.

Brent Ferguson

Geometry, Numeracy, & Common Core: A Vigorous Hands-On Task

I didn’t actually attend Brent’s session, but he explained it to me in the coffee shop and I wished I had. Basically, you give your kids a number line with 0 and 1 marked off. What other numbers can they construct with a compass and a straightedge?

The other integers fall pretty quickly. A lot of irrational numbers fall when students learn the Pythagorean theorem. Trisecting an angle is impossible but trisecting a line is possible using similarity and the properties of parallel lines and the constructions are varied enough to be interesting.

This seemed like a task that could extend through a good stretch of a Geometry course, drawing in lots of conjecture and proof along with some good review of numbers and operations.

The odd thing: I found Brent’s personal description totally engrossing. But this is a really tough idea to sell in a 500-character workshop description.

Takeaway: I probably skip over loads of really interesting, but hard-to-describe sessions at conferences.

Mine

I’ll be giving this talk a few more times and then posting video here. I cited these resources. People were real nice to stop by even though it was the last session on a very pretty day. Thanks for the hospitality, everybody.