Making Thinking Visible # 4: Recognizing the need for clear learning intentions

Chapter 4 is a great resource to tap into. The routines for “Introducing and Exploring Ideas” are varied and strategically target making observations, uncovering new ideas by connecting prior knowledge, and considering problems from alternate perspectives. Some of the routines are variations of what I’m already familiar with or am currently do in the classroom, so I was reading to learn what I can add or focus on to improve student thinking.

What it really boils down to is clear learning intentions. If learning intentions solely focus on skills, we’re missing the opportunity to develop students as thinkers.

A few of the routines are described below.

The See-Think-Wonder routine, similar to I Notice…I Wonder, invites students to inquire. To maximize the benefit of the routine students may need to experience it several times in order to break through the surface level to dig deeper. My co-teacher and I used this routine to introduce exponents to our 6th graders. We showed this Best Offer video twice.

lump sum
Most students noticed a stack of money. Few noticed the money was bundled or how the bundles were labeled.
exponent
Many students saw the amount of money growing, but were puzzled with what was going on.

Using the video, students were asked whether they would prefer a lump sum payment of $50,000 or be paid exponentially, starting with two dollars. As the students experienced the routine many of their wonderings were surface level. At that point it became clear that the routine needs to be reintroduced so students have opportunities to practice digging deeper.

Another routine I enjoyed reading about was Zoom-In as it will be useful when exploring rational numbers. I’ll likely create a powerpoint to overlay a variety of rational numbers, integers, and whole numbers–attempting to connect prior knowledge with classification. The idea behind Zoom-In is to show a small section of an image and slowly zoom out, or pan from left to right, revealing other aspects of the image.

Yet another routine, the Explanation Game, piqued my interested. The goal is to elicit thinking on the parts of something. It reminded me of David Wees (@davidwees) and his collaborative efforts on the Contemplate then Calculate instructional routine which emphasizes the mathematical practice make use of structure. I’m particularly familiar with this task…

…which asks students to explore structure to find short cuts when calculating. Connecting it to the Explanation Game, students describe the features of the problem, explain their short cut, give reasons for why it works and describe alternatives.

Chapter 4 is a great reminder of existing instructional routines. What is also quite useful is each routine’s description includes its purpose, how to select appropriate content, implement or vary it–all essential when making learning intentions explicit.

Making Thinking Visible #3

A few thoughts and connections while reading chapter 3: Introducing the Thinking Routines. Thinking  routines can be used as: 1) a tool to elicit thinking (i.e. a Think-Puzzle-Explore which is related to a KWL) , 2) a structure to support student thinking (i.e. Generate-Sort-Connect-Elaborate, related to a concept map) or 3) a pattern of behavior where thinking routines are embedded in the classroom culture. When embedded the routines “build an arc of learning” throughout a unit of study.

As I learn about each of these routines in greater depth I’ll be able to explain in greater depth, but already I’ve noticed the tool and structure are closely intertwined. I’m going to take a risk and predict one way these routines would play out when students are learning factors, greatest common factor, and least common multiple.

Present the Think-Puzzle-Explore routine to reveal the level of understanding of  factors. What do you think you know about factors? What’s puzzling about factors? Let’s explore and investigate what puzzles you. I’d likely give each student a document with the prompts to record their thoughts before discussing.

In the middle of the unit prior to GCF and LCM, the Generate-Sort-Connect-Elaborate thinking routine is introduced. Here students would brainstorm identify the differences between factors and multiples. The would be done individually at first then shared and organized  with a partner. A finished product may look something like this:

thinking map

At the end of the unit perhaps the perspective taking thinking routine called Step Inside would help students distinguish between when a problem requires finding the LCM and when it requires the GCF.

I think this scenario is pretty accurate in demonstrating how thinking routines can be used as a tool, a structure, and as a pattern of behavior.

More discussion is on Twitter #eduread.

Making Thinking Visible #2

My reflection and critique of Chapter 2, Putting Thinking at the Center of the Educational Enterprise,  begins with this quote:

What kind of intellectual life are we presenting to our students in our individual classrooms and in our school as a whole? What are my students learning about learning? What messages am I sending through the opportunities I create for my students about what learning is and how learning happens? (p48)

What am I modeling in my classroom? What types of thinking occur in the classroom? As I read chapter 2 I kept relating it to the importance of having clear learning intentions. In my previous post I noted how our math classes do a fine job of identifying the specific skill to be learned, but the thinking objective is not clear–it’s left as an assumption. When it’s left as an assumption what happens in class is the teacher does all the thinking.

To make thinking visible, the first of three strategies, questioning, was introduced. One of the authors provided a scenario in which he modeled the questioning strategy to a group of teachers. Having a strategic list of questions–knowing how you are going to direct the learning–is crucial. Yet when the teachers implemented the strategy, they reported students were not responding with higher levels of thinking. The teachers neglected to listen deeply and ask follow up questions. Listening, strategy #2, was explained in depth using this scenario.

Be it anecdotal records, formative assessments, whiteboard work, photos, videos, etc.–any artifact can serve to document (strategy #3) student thinking and be used to advance learning.

I’m not sure it this will be elaborated upon on in later chapters, but I’m looking to read about balancing surface and deep level thinking–juggling when to take students into the deep end and when to stay in shallow waters. I’m certain that depends on the individual student. The reason for my raising the issue is thinking deeply is serious mental exercise. Students need to develop the mental stamina, so perhaps a  variety of thinking activities is in order.

I do believe students need to see their teachers as authentic thinkers and learners as well. Case in point, towards the end of the school year a colleague and I were wordsmithing a conference proposal. This was taking place in the colleague’s classroom, after school, with a student present. At the end of our lengthy discussion the student remarked it was the first time he had seen adults struggle as much as kids do.

Continue the conversation on Twitter at #eduread.

Also check out key quotes found on this post.

 

Making Thinking Visible Chapter 1 takeaways

After reading Ritchart, Church and Morrison’s first chapter of Making Thinking Visible, here are some takeaways:

Chapter 1: Unpacking Thinking

“What kinds of thinking do you value and want to promote in your classroom?” What kinds of thinking does that lesson force students to do?” These two thinking questions are at the heart of Making Thinking Visible.

Every time I annotated or highlighted a takeaway from Chapter 1 I critiqued my practice. For example, “…understanding is not a precursor to application, analysis, evaluating, and creating but a result of it.” I noted how this belief can lead to greater access and equity, After all you don’t have to be fluent with your math facts to solve complex problems. I also thought about how our math team sometimes schedules a group work task at the end of the unit—after the students have completed a string of procedural problems. Often times a task at the end limits the student’s opportunity to think.

Another quote from Chapter 1: “In most school settings, educators have focused more on the completion of work and assignments than on a true development of understanding.” I kept thinking about Michael Pershan’s relentless pursuit of analyzing student work and making sense of it. I also thought about this in terms of our PLCs. We can do a better job of collaborating to improve student learning by studying student work.

I also noted that our lesson objectives do a fine job of articulating what students will be able to do from a procedural standpoint, “I will be able to convert between fractions, decimals, and percents” but the thinking piece needs to be clearly defined. The book’s eight high leverage thinking moves, were previewed and I’m looking forward to studying them at length.

  1. Observe closely and describe what’s there.
  2. Build explanations and interpretations.
  3. Reason with evidence.
  4. Make connections.
  5. Consider different viewpoints and perspectives.
  6. Capture the heart and form conclusions.
  7. Wonder and ask questions.
  8. Uncover complexity – go below surface learning.

I’m also interested in discussing Bridget Dunbar’s comment about metacognition.

MTV

Pam Wilson’s post does a fine job of capturing the salient points of Chapter 1. Check it out and join the conversation on twitter using the #eduread and #makethinkvis hashtags.

Extending the reach of middle school math support with live webinars

For the past three weeks I’ve been hosting and training my 6th grade math support students on participating in online math webinars using the Canvas Conference tool. The students I’ve trained during support then acted as webinar ambassadors to facilitate the roll out to five 6th grade standard math classes.

The notion of not being able to effectively reach more students has been bothering me for quite some time. Due to our schedule, twice weekly math support is only offered during the 30 minute homeroom period. Unfortunately students in band, orchestra, or chorus—which is scheduled during homeroom—have no opportunity for this tier two support. I began thinking online math intervention, in the form of math webinars, could be a solution.

Despite one or two technology issues—mostly due to my lack of experience—offering webinars as a tier two intervention holds promise. My goal next school year is to launch weekly or twice a month webinars for these rising 7th graders early in the first quarter. I anticipate a brief refresher before we dive in and plan to introduce webinars to sixth and eight graders as well.

Why do I think this holds promise? My first evening “test” webinar was Monday evening, 6:30-7:00pm and of the five students who chose to participate two are detached from school. I am hoping this is not a one-time occurrence. If they showed up the first time, they may show up again. Also not one is a student I see during math support.  In addition the webinar was competing with sports practices, other commitments and an absolutely gorgeous, late spring evening.

As an instructional practice my goal with math webinars is to make them as interactive as possible with students using the microphone, chat box, and hand raise feature to explain their thinking to each other. I interact by screen sharing my iPad. A slide deck presentation is the default option in Canvas Conference but I’m mirroring and displaying a Notability document on the iPad by plugging it into a Macbook Air running Quick Time. The images below visually describe by goal.

webinar2 chat
In this example I opened up a student’s mic and wrote his interpretation of the verbal sentence, “2 is equal to five time the sum of a number and 3”. As classmates typed their thinking a fellow student’s mic was then opened for to politely agree or disagree and state their reasoning. Note students in the chat box have typed = for +.

 

Webinar1chat
In this example I ask for  another coefficient besides 4.

I was incredibly proud of the students for respecting others’ thinking, especially when a misconception was noted. Building an online community of learners is as important as a classroom community of learners. As the instructional technology coach and I rolled out the webinar to classes, we discussed protocols and invited students to add more to the list that was generated by my initial math support students. However, I think the classroom teachers’ role in creating a positive climate and culture did more than our brief webinar protocol discussion.

There have been a few technology glitches, but it mostly as to do with me. The biggest hiccup happened during an in-class training session. I accidently ran two webinars simultaneously and that caused my microphone to echo. It was very difficult to speak clearly hearing myself with a slight delay. Another glitch had to do with an older MacBook I was using and it kept crashing. That shouldn’t happen anymore now that I’m using a newer MacBook Air.

 

US Congress: is it representative? A math lesson

As I read Dan Meyer’s post, “A Response to Danny Brown,” and the stream of comments that followed, I began to think about middle school and the lost interdisciplinary units, or the singular, math related, social justice lesson that “matters”-a topic that appears to be dear to Danny Brown. He writes,

…I really want to model something *important*, in the sense that it *matters*, perhaps politically, or socially, perhaps having a *local* relevance for the students in the classroom

I hope there is still a place in middle school for cross-curricular thematic learning. I haven’t seen many IDUs play out in my 15 years of teaching. Some middle schools are more middle school than others. I only know what I’ve experienced.

The point of my post is to share a lesson I slightly modified from the October, 2015 issue of Mathematics Teaching in the Middle School. I do know one thing about middle schoolers–they always seek fairness.

The proportional reasoning lesson is titled US Congress is it Representative?  Students studying the US Constitution use proportions or percentages to examine equity, fairness, and how the racial and ethnic make-up of our country compares to the ethnic backgrounds of the current Congress.

The lesson begins by providing background knowledge on the US Census, which counts every resident of the US then, from that count, determines the number of seats each state has in the U.S. House of Representatives. The NCTM article did not include this background so this is where I deviated from the original lesson.

The most recent apportionment is below.

map

 

If your state lost or gained seats, that would make for good discussion. On a side note, I’m surprised Illinois did not lose more seats in the House!

One major part of the lesson is examining the population statistics and discussing why the sum of the various ethnicities exceeds the total. (The way the Census is counted residents can and do identify with more than one ethnicity.)

stats

Students are then asked, “Based on this data, and the knowledge that there are 435 members of the House of Representatives and 100 members of the Senate, what should a “fair” racial/ethnic make-up of the House and Senate be?

Once they’ve determined what they think is “fair” the ethnic background of Congress is revealed for comparison.

claim

Students use claim, evidence, and reasoning to argue whether the House and Senate are representative of the US population.

I’m with Danny in the sense that I want students to learn about “important” matters. But I also understand that what’s important to a middle schooler may not be the same as an adult.

In my role as math interventionist, I’ll use this lesson to review percentages in our after school math program, but it may get more traction if the lesson is presented by the social studies teachers. So I shared it the social studies teachers instead of the math teachers with the hope they’ll consider it when teaching the Constitution.

Time and timing are the biggest constraints when implementing an interdisciplinary lesson.

Justifying moving the decimal

I need your help. I’ve been thinking of ways to better connect decimal multiplication with fraction multiplication, especially in terms of justifying moving the decimal point. Sixth graders may recall counting the number of decimal places, but do they really know what they are counting and why they are counting it?

The following is work in progress and I would appreciate your input. How can my attempt at creating curiosity  be improved upon? Are the examples sufficient or should they be revised? What am I missing?

point1

I’m anticipating students will say, “Count the decimal places,” so my follow up is this question.

point2

I don’t think students will connect fraction multiplication with decimal place value so my next move will be to ask them to compare the two expressions.

point3

Some students may recognize the two expressions are equivalent, but will they make the place value connection?

point4

I prepared a second example that “culminates” with this slide.

point7

Since the above problem has numbers in the ones place, some students may recognize 2 x 2 = 4, so it would be reasonable to place the decimal between the 5 and 6. I would certainly accept that, but my point is to discuss powers of ten. Yet I need to be careful. My sixth graders haven’t been exposed to negative exponents. Would it be appropriate to describe it as powers of tenths? Is this they best way to address the mathematics? I’ll likely begin with establishing a pattern before I present these slides.

I’m also thinking of creating a similar lesson which connects dividing decimals with dividing fractions using the common denominator method.  The students are familiar with the common denominator method, but I wonder if it will be too messy?