• Let's draw out 3/4 and 2/3 on paper.

• Let's use grid paper instead to draw our rectangles. I think you can show 3/4 much more accurately on grid paper than on a circle.
• Please draw 2 rectangles of the same size. (By doing this, we are really dividing two fractions using the common denominator strategy. Christopher writes about it here.)

• What size do you think? Does it matter?
• Shade the first one to show 3/4 and the second one to show 2/3.

• So maybe we should think about the size of the rectangle more carefully. Look at the problem again. Three-fourths divided by two-thirds. Hmmm... What dimensions should our rectangles have so it's easy to divide into fourths and thirds.

• Bingo! I'm drawing these with you. Okay, so two rectangles of 4 by 3 — or 3 by 4 — doesn't matter.
• I'm shading in 3/4 on the first one and 2/3 on the second one. 

• So our question is: How many groups of 2/3 are in 3/4?
• Because I colored mine in, can you help me ask the question again using colors instead?

Someone responds, How many pinks are in the greens?

• Yeah. And how many little squares are pink? Okay, eight.
• So, I'm going over to the green here and round up 8 pink squares. 
• I'm able to round up one group of 2/3 (pink) in the 3/4 (green).

Someone says, There's one left over.

• How much is this one little green square left over worth?
• Right! 1/8 because we called 8 little boxes as one, so 1 little box must be 1/8.
• Our answer then is 1 and 1/8. 

• How do we know that our answer of 1 1/8 is correct?
• Okay, we'll use a calculator.

• Let's do this again. Now with a mixed number just for fun. Let's do 1 1/2 ÷ 2/5.
• How many rectangles are we drawing?
• What dimensions should they be?
• Oh, but we have more than 1 whole here, so...?
• We should have something like this then.

• Okay, your turn to do one all by yourself.
• Please do 2/3 ÷ 1/2. (Same one Christopher used.)

Lauren F: Is there a way to multiply consecutive numbers quickly? You showed us the addition one...

Maddie: Isn't that the exclamation point operation?

Gabe: But we're not multiplying consecutive numbers!

Mia: Doing 40 by 40 then by 13 gives all huge numbers, so we're doing a simpler problem, then find an equation.

Lauren P: Our group is finding a pattern and making a table.

Gwen: We're doing layer by layer. There are more of us (4 instead of 3), so it's pretty quick to divide up the work.

Gabe: I already have the answer because I was too eager to do the math, but I didn't say anything to the group. (He got the answer about 2 minutes after we formed groups.)

Julia: And I got it 3 or 4 minutes after Gabe.

Angela: And I got the answer after Julia. Without her help.

Me [to Gabe, Julia, and Angela who were in same group]: Aren't you guys special. You seriously just sat there and did nothing then while I walked around?

Julia: Well, yeah, we're kinda admiring our work.

Me: Geez Louise. What do you think I'd have asked you if I knew you'd found the answer to this pyramid?

Gabe: If it was 100 high?

Me: No. A million high. A billion high.

Gabe: Hehe. That's why we didn't want to say that we're done. 

• Two students figured out why each stack had 13 pennies.
• Their other questions were answered to their satisfaction, except we didn't know exactly how long it took Mr. Bezos to build it, but we talked about how we might be able to estimate this.
• Kids remembered from last week's lesson that a square pyramid has 1/3 the volume of a cube with same dimensions, but that our penny pyramid had jagged lateral edges.

While everything up to this point had gone as well as I'd expected. Kids immediately responded to the video with WOAHs and WOWs. They asked solid questions in both Acts 1 and 2. They worked well in groups. I'm proud to say that my kids do these 3-Acts like Matt Vaudrey does mullets. If there were a 3-Act lesson throwdown, my kids would kill it. :)

However, the kids and I knew that no one really struggled with the task of just finding the number of pennies. The math was pretty basic and with a calculator, 40 layers of pennies didn't make anyone break a sweat.

What was meant as an "extension" or "sequel" really needed to now become the focus of our lesson — at least for this group of students who valued a good struggle. We needed to try to figure out the equation for this penny pyramid. 

But I also realized that it would be very unlikely for my 8th graders to come up with the equation because it involved summation of a sequence. (You're right, Nathan, it is unlikely, even for Gabe.) But the process of getting there might be worth it. I wouldn't be their teacher if I didn't ask them to explore the patterns that they might see along the way. 

I gave them small interlocking cubes and colored chips so they could build smaller models of the pyramid. 

Their collective frustration arose from how "simple" the pyramid was built — nothing more than a sum of layers whose square dimensions were consecutive.

Incomplete Cube

We started with a smaller problem. We did a 5 x 5 square pyramid with a height of 5. We didn't like the "jagged" lateral edges of the pyramid either, hence we pushed the cubes into one corner like this so at least the cubes stacked squarely.

One way would be to imagine that we had a whole 5 x 5 x 5 cube, then subtract from this the small cubes that were missing. We noticed the missing pieces were these L-shapes.

We see a pattern in these missing L-shapes:

• 4 pieces of (2n-1) or (n-1)(2n-1) or 2n²-3n+1
• 3 pieces of [2(n-1)-1] or (n-2)(2n-3) or 2n²-7n+6
• 2 pieces of [2(n-2)-1] or (n-3)(2n-5) or 2n²-11n+15
• 1 piece of [2(n-3)-1] or (n-4)(2n-7) or 2n²-15n+28

Incomplete Rectangle

How else can we see this pyramid? Because my mind has a tendency to reshape things into rectangles, I flattened the pyramid into an incomplete rectangle like this: 

The dimensions of the rectangle were straightforward enough, and unlike the missing L-shapes of the incomplete cube, the missing pieces here were rectangular and came in pairs. For example, in the above right sketch, the missing pieces were two 1 x 4 and two 2 x 3 rectangles. But if n were even, then the number of missing pieces would be pairs of rectangles plus 1 lone square piece.

I talked with them about the sigma notation, and since they knew how to add {1 + 2 +... + n} quickly — we refer to this as "Gauss addition" in class — they thought it was fun to learn the new symbol. 

Then we went into WolframAlpha and typed in what we wanted. BAM! Equation came up with the "newly" learned summation notation.  

1. area of continents
2. mass of a molecule
3. distance between planets
4. number of cells in culture
5. computer processing speed

• The angle that the ball hits the border and bounces back out must be the same.
• Because we're talking about angles, something about triangles.
• This is like shooting pool.
• Right triangles.
• Similar right triangles.
• Do we need to consider the velocity of the ball?
• This is hard.
• I can't figure out how to use the right triangles. 
• Similar right triangles because that'll make things easier.
• Even though it's more than one bounce off the edges, I'm still just hitting the ball one time.
• I think I got this.
• I have an idea. 
• Wish my golfer is Happy Gilmore.

• Then I asked them what the scale factor would be. Many didn't know.
• Next, with a partner, I had them cut out a set of 5 mattresses from construction papers, a different color for each size. Each paper mattress needed to be 8% of the original. 

I almost threw out this cutting part because I didn't really have a follow-up for these pieces, but seeing how some struggled with measuring and cutting that I'm glad I kept it in. Here's a set of the 8% that we used as a key to check for precision.

 

 

• Based on the given price of a certain size mattress, how much should the other sizes [of the same type] cost? And they had to explain how they arrived at the prices, based on what criteria.

 

Part 2: The Flat Sheets

• The handout. To give them more practice with "finding the percent of," I told them that flat sheets are made so that the width is 160% wider and the length is 130% longer than the width and the length of each sized mattress, respectively. Knowing this, find the dimensions of each sheet.

• Then I gave them the price per square foot of each brand of sheets set, and they needed to figure out the rest.

**********

I thought it went well. (When I spend too much time creating a lesson, I convince myself and the kids that it'll be awesome. It kinda works.) 

A very simple rates/proportions lesson, but I'm reminded of some key things:

1. The kids weren't cutting for the sake of cutting — we're not here to make stuff pretty, we're here to make things accurate, and in doing so things look pretty. They had to use a ruler to mark two end points before drawing a segment. They had to understand the significant digits allowed by a simple ruler. Decimals are still tricky for some. Junior high boys are more clumsy with scissors. It's smart to draw the rectangle in the corner of the paper instead of smack dab in the middle of the paper.
2. Student to his partner, "Finding the perimeter doesn't make sense. We have to find the area because that's the material you sleep on."
3. Eight percent is not point-eight.
4. Their proportional reasoning is still developing.
5. Dividing by 12 is not how you change square inches to square feet.
6. "But that's what the calculator says" is a poor excuse on any day of the week.

I thought of you because you do good stuff. You share it. And you're honest about stuff that is or isn't effective in teaching math. You're someone I know I wanted in the room with me.