It’s been a long while since I’ve posted. It isn’t because I have nothing to post about! I’ve just been sooooo busy. This is the first year I’m teaching Geometry, and I’m working with the other teacher to turn it on it’s head. Completely. We haven’t cracked the textbook yet.

We started off the year with a very conceptual beginning, focusing on the importance of *words, definitions, *and *classification. *As you might have remembered from our first day activity, we have also been sprinkling in a good amount of conjecturing. [1]

I want to share one activity that I thought was not only was engaging, but led to really interesting discussions in my classroom.

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**Part I: Defining & Counter-attacking**

On the second day of class, I had each of my geometry groups try to come up with a definition for the following words:

This is actually *really* challenging. I mean: you yourself, try to define a triangle without looking it up, or even more challenging, a polygon. Before starting, groups were told that other groups would try to find fault with their definitions, so they should be as specific and clear as possible.

Some things different groups wrote (all are problematic for various reasons):

Circle: “A circle is a closed figure where all the points are an equal distance from the epicenter, and starts and ends at the same point.”

Triangle: “A triangle is a 3-sided, 3-angled shape with straight lines that connect to the endpoints. Also, all the angles add to 180 degrees.”

Polygon: “Any shape that has exclusively straight edges that are all connected, and has to have at least three angles.”

Each group then passed their three definitions to a different group. And that new group was tasked with finding a **counter-attack** to these definitions. What this means is they needed to draw something that satisfies the definition they were given, but is *not* a circle (or triangle, or polygon). Those trying to counter-attack were allowed to read the definitions they were given *in any way that seemed reasonable to them*.

We then had a class discussion. Students publicly posted their group’s definitions (they were written on giant whiteboards), and then those with counter-attacks were allowed to present them to the whole class. When the counter-attacks were presented, it was interesting how the discussions unfolded. The original group often wanted to defend their definition, and state why the counter-attack was incorrect. Then a short spontaneous discussion would occur.

At the end of the discussion, I found myself often being arbiter and passing judgment on each counter-attack: “yes, this counter-attack works, because …” or “no, this counter-attack doesn’t work, because…” I felt the kids needed to know (a) whether the counter-attack really did satisfy all parts of the group’s definition, and (b) whether the counter-attack was using a fair reading of the group’s definition. When I said the counter-attack was valid, the group who found the counter-attack was elated! And when I said the counter-attack was invalid, the group who wrote the definition was elated! It became a bit of a spontaneous contest.

**What was awesome was the subtleties they ended up talking about when trying to find the counter-attacks.** When talking about the circles or polygons, for example, they realized that we have to say this is a 2D figure, otherwise there are many other curves that would work. When talking about triangles, saying the figure had three angles was problematic because there are 3 *interior* angles and 3 *exterior* angles. For triangles and polygons, students realized how crucial it was to say that the figures were closed. I was so impressed with how they were really trying to attend to precision in this task.

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**Part II: Understanding The Textbook Definitions**

Eventually, we looked at a textbook’s definitions for these three words.

It took us a while to understand these definitions, and why the particular language was chosen. The polygon definition was especially challenging — especially the second half!

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**Part III: Taking Things Further**

I started the next class with the following DO NOW:

Although I thought this would be easy for them, it was interesting to see that they found this challenging and abstract.

We also came up with the following two questions for a mini-quiz we gave:

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The ending of our first unit involved students coming up with their own definitions for the bunch of quadrilaterals (kite, dart, square, trapezoid, rectangle, rhombus, convex quadrilateral, concave quadrilateral, isosceles trapezoid, parallelogram). This opening activity was designed to make that exercise easier when we got to there. Specifically, it was designed to show them that *clear and precise language is important to communicate your ideas*, and *it isn’t easy to come up with clear and precise language*. Things that we “think we know” are really quite hard to pin down… Like what a circle, triangle, and polygon are.

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UPDATE: I found some examples of “counterattacks” that my kids drew for various definitions, so I figured I’d scan them in for posterity… We came up with more when we were having our discussion.

And here is a random picture I took in class with two of the whiteboards:

[1] I’m finding this to be a really rewarding thing to have sprinkled in. I’m learning it’s challenging for students to be able to try to make a potential conclusion from a number of examples. But in fact, isn’t that a crucial skill in mathematics? We see a number of examples of something, we decide on a very plausible conjecture, and then we try to reason out why that conjecture is true (or come to realize it isn’t true)?