We look specifically at 45-45-90 triangles on the first day of our Right Triangles unit. I’ve already written specifically about what the 45-45-90 exploration looked like, but I wanted to note a conversation that we had before that exploration.

Jill and I had recently talked about introducing new learning by drawing on what students already know. I’ve always started 45-45-90 triangles by having students think about what they already know about these triangles (even though many have never called them 45-45-90 triangles before). After hearing about one of Jill’s classes, though, I started by asking students to make a column for triangles, right triangles, and equilateral triangles, noting what they know to always be true for each. This short exercise gave students the opportunity to **attend to precision** with their vocabulary.

It occurred to me while we were talking that having students draw a Venn Diagram to organize triangles, right triangles, and equilateral triangles might be an interesting exercise. How would you draw a Venn Diagram to show the relationship between triangles, right triangles, and equilateral triangles?

In my seconds of anticipating student responses, I expected one visual but got something very different.

What does it mean for an object to be in the intersection of two sets? Or the intersection of three sets? Or in the part of the set that doesn’t intersect with the other sets?

Then we thought specifically about 45-45-90 triangles. What do you already know? Students practiced **look for and make use of structure**.

One student suggested that the legs are half the length of the hypotenuse. Instead of saying that wouldn’t work or not writing it on our list, I added it to the list and then later asked what would be the hypotenuse for a triangle with legs that are 5.

10.

I wrote 10 on the hypotenuse and waited.

But that’s not a triangle?

What?

5-5-10 doesn’t make a triangle.

Why not?

It would collapse (students have a visual image for a triangle collapsing from our previous work on the Triangle Inequality Theorem).

Does the Pythagorean Theorem work for 5-5-10?

Students reflected the triangles about the legs and hypotenuse to compose the 45-45-90 triangle into squares and rectangles.

And they constructed an altitude to the hypotenuse to decompose the 45-45-90 triangle into more 45-45-90 triangles.

And then we focused on the relationship between the legs and the hypotenuse using the Math Nspired activity Special Right Triangles.

And so the journey continues … listening to and learning alongside my students.

travis

April 8, 2015 at 1:10 pm

I had gone on a long muse about Venn and your WODB post with 4 intersecting circles, but did not comment, but now that you mentioned it… They were difficult to draw, so I googled them. I even tried to visualize in 3D [I would coin this a Venn-doid of intersecting soap bubbles]. The places where three intersect identify the WOBD….thanks again for your blog.

jwilson828

April 8, 2015 at 1:13 pm

Interesting … You should read Alex’s WODB posts about how he has students creating some WODB puzzles. http://slamdunkmath.blogspot.ca/2015/03/wodb-part-2-creation-day.html (There are three – look before and after this one as well.)