## 4 Must Have Workstations: Problem Solving Part 2

In the word problem station, students should also be writing problems. Remember that reasoning has to do with both contextualizing (numbers to words) and decontextualizing (words to numbers). So, make sure you give the students opportunities to write word problems at least once or twice a week. The research states that it is important to give the students the units along with the numbers.

Must read article: The Answer is 20 Cookies, What’s the question?

See my word problem Pinterest Board for some ideas (anchor charts of Think Math)

Happy Mathing,

Dr. Nicki

**Read Full Post**|

**Make a Comment**( None so far )

## Mathematical Reasoning: Developing, promoting and expanding thinking in whole group and small group

**make sense of quantities and their relationships in problem situations.**” It involves students being able to “

**contextualize**” and ”

**decontextualize**” numbers. Are your students able to put words to numbers? For example, can they tell you a story that makes sense about 2.5 x 10? Also, can they take apart and discuss the numbers in a problem? Do they reason quantitatively by “

**creating a coherent representation of the problem at hand; considering the units involved; attending to the meaning of quantities, not just how to compute them; and knowing and flexibly using different properties of operations and objects[?]**” —CCSS

- R
**ecognizing reasoning and proof**as**fundamental**aspects of mathematics - Make and investigate
**mathematical conjectures** - Develop and evaluate
**mathematical arguments and proofs** - Select and use
**various types of reasoning**and methods of proof

What does all this really mean? Well in the next few posts I would like to explore this. I believe reasoning is taught over time and reinforced through our daily practices. It involves questioning, prompting, listening, challenging, proving, giving evidence, thinking out loud, thinking with a partner, thinking by yourself, thinking in a group, and thinking publicly to name a few things. Teachers set up environments where this happens. We set students up to reason or not to reason. We set them up to publicly prove what they know or not. We teach them specific reasoning skills or we don’t.

My point is students don’t just start reasoning. This is a “**habit of mind**” that is d**eveloped, practiced, promoted and expanded** over time and throughout the years. Schools have to think about how they develop a **culture of reasoning**. Grade levels should come up with some **benchmark routines** that promote reasoning. You should think about how reasoning is interwoven throughout the day, week, the month and the year.

Here are some **sample weekly routines**:

**What’s the problem routine?** You give the students some numbers, say 10 x 30 and ask the students to **make up a stor**y about this.

**Convince me paper:** You give the students something that they have to convince you about: **Convince me that** ….. (1/2 is greater than 1/3)

**True or False essays**: You give the students a statement and they have to **decide and defend** whether it is true or false. For example: Anytime you multiply a number by 0, you get 0. True or False? Defend your answer with 3 examples. Show your thinking. Explain your thinking.

Teachers can do these at **any grade level with the appropriate content**. These are great** thinking prompts** that work across grade levels. It’s important to think about **access for all**. I encourage teachers to develop different **graphic organizers** for the responses so that they are tiered and give different entry points. I recommend that you process them in **small guided math groups** so that you can hear the thinking. I also think there should be some whole group sharing, so that the entire mathematical community in your class can engage together. There are benefits to facilitating both types of conversations and there should be a balanced approach.

Happy Mathing,

Dr. Nicki

**Read Full Post**|

**Make a Comment**(

**3**so far )