The Reflective Educator

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Month: December 2014

What did I write about in 2014?

In 2014, I only wrote 50 blog posts (3 are still unpublished) as compared to 2013 when I wrote about 180 posts. I wrote a lot less this past year in the previous year, at least on this blog. Is this a sign that I have less to write about? Or is this a sign that I just have less time to write? I tend toward the latter explanation, given how much work it is to keep up with my two-year-old son…

I wrote about a lot of different topics, including formative assessment, social media, language and learning, strategic inquiry, using mathematics, and ways students can understand mathematics. I found myself writing and tweeting quite a bit less about technology and tools this year and quite a bit more about processes.

My most popular posts, as measured by page views, were on effective mathematics teaching, using mathematics to choose my next apartment, 20 things I think every teacher should do, categorizing student work, ineffective feedback and the Khan Academythe confirmation bias cycle, and what mathematics teachers need to know.

The posts that took me the most time to write were on effective mathematics teaching, ineffective feedback and the Khan Academy, supporting english language learners in math, sharing individualized comments using Autocrat, and what mathematics teachers need to know. From a time-to-write to number-of-views ratio, my post on the confirmation bias cycle is a huge hit. My favourite post from the year is on what mathematics teachers need to know.

My blog has been viewed over 9 million times since I started blogging and has generated 1889 comments. This year’s posts have amassed 275 thousand views and generated 95 comments, both of which make sense given that I have far fewer posts than usual and that most of my page views each year come from older posts.

I’m looking forward to the new year. I have some projects that I have been working on that will be fun to blog about. I’m particularly interested in learning more about how teachers develop as teachers and what potential learning trajectories look like for teacher knowledge.

 

 

Teaching Mathematical Language

The Problem

Imagine you have a list of possible questions you want students to be able to understand and be able to translate into mathematical symbols, like the following.

  1. The sum of six and a number
  2. Eight more than a number
  3. A number plus five
  4. A number increased by seven
  5. Seven more than a number
  6. The difference of five and a number
  7. Four less than a number
  8. Seven minus a number
  9. A number decreased by nine
  10. The product of nine and a number

One common approach I have seen used is to model a few of the questions on the list and then ask students to attempt the other problems themselves or in small groups. This approach has a serious flaw; it requires students to know the thing you are trying to teach in order to do the task.

Let’s imagine a very similar task, except now suppose I ask you to translate the list into German. Here are the first two phrases translated into German (thank you anonymous translators).

  1. Die Summe von sechs und eine Zahl.
  2. Acht mehr als eine Zahl.

Now translate the other 8 sentences.

Unless you already know German, you can’t do this task. Worse, imagine I gave you the entire list in German and asked you to translate it into Hebrew.

  1. Die Summe von sechs und eine Zahl.
  2. Acht mehr als eine Zahl.
  3. Eine Zahl plus fuenf.
  4. Eine Zahl von sieben vermehrt.
  5. Sieben mehr als eine Zahl.
  6. Der Unterschied von fuenf und einer Zahl.
  7. Vier weniger als eine Zahl.
  8. Sieben minus eine Zahl.
  9. Eine Zahl verringert bei neun.
  10. Das Produkt von neun und eine Zahl.

Here are the first two phrases translated into Hebrew. Translate the rest of the phrases from German.

  1. החיבור של שש ומספר
  2. שמונה יותר ממספר

Unless you know German well enough to understand the phrases in the first place and Hebrew will enough to translate the German, you cannot do this task. You also cannot do this task if you do not know how these phrases are related to each other in the two different languages.

If your students do not know the vocabulary in the first list I shared and/or they do not know the mathematical symbols, then they cannot do the translation between the two without some intervention.

 

A solution:

However, students may be able to use their partial knowledge of the symbols or the vocabulary to fill in gaps in either. As an alternative to having them work on the entire list from scratch you could:

  • Give them a copy of both lists and ask them to individually match as many of the items as possible and then attempt to match the other ones as best as they can. They could then work in groups to refine and improve their lists and then individually try to write out the situations using actual numbers.
  • Embed the different phrases in a context through which students could make sense of the relationships between the symbols and the text. One issue here with making sense of what these phrases mean is that students do not have sufficient clues as to what they could mean because the phrases are completely contextless. There is not enough information provided as to what these phrases actually mean. Here’s an example of a task based on equality instead of inequalities but hopefully you can generalize what I mean from it.

If students have insufficient knowledge of either the vocabulary or the mathematical symbols, then they need to build that knowledge first. In this case, these ten recommendations on building vocabulary may be useful to consider.

 

Additional point:

The original goal is probably not a very good goal given that students are rarely, if ever, asked to translate phrases this short into mathematical terminology. Instead of focusing on the small building blocks students might use to translate phrases, it is more useful to start with longer phrases based on meaningful contexts (note: this does not necessarily mean real world) that include more text and to work with students to reduce these phrases to simplest form, and then use these reduced forms to look for mathematical connections between the longer forms of text.