My Math Explorations

Today as we settled back into our routines after Spring Break, I took a little time to share with my math group about some math related explorations I did over break. For the first part of the break I took time off entirely: time to play with my granddaughters, time to watch the Final Four, time to hike and look for wildflowers. But the last few days of break I began to look through some math materials and think more about math and the rest of the year.

Math Solutions has a new book that looks interesting, Faster Isn't Smarter. Several chapters of the book are available online (http://www.mathsolutions.com/index.cfm?page=wp18&contentid=994&crid=294&mcrid=107) and that gave me a chance to read through them and mull them over. I shared with my students the name of the book and the idea that sometimes thinking deeper and taking time to process yields a broader understanding than coming up with a quick answer. Being fast in math doesn't necessarily mean you are smarter than others who take more time. I told my students that what is important is to learn what strategies work for you.

I also shared an activity from the latest edition of Teaching Children Mathematics, published by the National Council of Teachers of Mathematics. The activity I read about was for kindergarten students so I upgraded it some for my students. It involved tossing some 2 sided counters (red and white) and recording how many of each color turned up. Students were asked how they figured the totals (recognized the number, counted, knew the number fact, grouped the counters in their mind, etc.) They got practice in explaining their math strategies to the group or to a partner. Some students took on the additional challenge of explaining what they heard another student share as a strategy. We will do this activity again soon, working with a different total number of counters.

More Fractions!

On Monday I got out some play dough and shaped it into squares to represent brownies. Then we worked together to figure out how we could cut each "brownie" into fractions, such as fourths, sixths, and fifths. As students worked, I asked them to put into words the strategies they were using. At the end, the students agreed that it was easier to cut the "brownie" into an even number of pieces, as they could start by cutting it in half. Fifths proved the most difficult.

Then we learned the game Uncover from Marilyn Burn's About Teaching Mathematics: A K-8 Resource. It is the opposite of the game Cover Up which we learned a couple of weeks ago. This time we started with our whole piece covered by the two half pieces. We rolled the fraction cube to see which piece we could remove. Students had a choice on each turn of removing the piece that represented the fraction they rolled, trading one of their pieces in for equivalent pieces (e.g. trading a half in for a fourth and two eighths,) or passing.