Tag: provocation

“The Standards” Aren’t a Race: The Importance of Assessment in Getting to a Finish Line

“The Standards” Aren’t a Race: The Importance of Assessment in Getting to a Finish Line

I didn’t enjoy Math until I was in high school. Trigonometry was the first time that I remember gazing up in amazement and wonder. Sin and Cosine. Identities, theorems, and proofs. Parabolas and Ellipses.  It suddenly became interesting even if it was hard. I loved using the nifty functions on the calculator as well. But why did it take me so long to appreciate the beauty of math? I wonder where and who I might be if I had learned less about standard algorithms and more about number concepts and reasoning at an earlier age.

I don’t see how it’s doing society any good to have its members walking around with vague memories of algebraic formulas and geometric diagrams, and clear memories of hating them. It might do some good, though, to show them something beautiful and give them an opportunity to enjoy being creative, flexible, open-minded thinkers— the kind of thing a real mathematical education might provide. ……. to create a profound simple beauty out of nothing, and change myself in the process. Isn’t that what art is all about?

From A Mathematician’s Lament by Paul Lockart-

For me, if I can invoke wonder and surprise, then the beauty of communicating in numbers becomes self-evident and a student’s heart awakens to the joy of an interesting problem or question. Creating this experience is a passion of mine. After spending a week with Lana Fleiszig, it’s hard NOT to be more inspired to create a love of math in our classroom. Her enthusiasm is contagious, and her advice about inquiry is clear–know your destination, but don’t worry about how you get there. Don’t be afraid to throw students into the “pit of learning” and allow them the experience of confusion. As I have come to appreciate her point of view, I recognize that when students climb out of their “pit”, that’s where beauty lies.

So here we are, in another stand-alone unit, which might be considered the “place value” unit, which is not typically the most exciting math concept. It’s a ho-hum inquiry into base-10 blocks in how we express large numbers and use it to develop strategies for addition and subtraction. But what if we threw them into the learning pit and took our time to really develop number sense. How might we approach our planning and execution of the unit if this wasn’t a race to tick off a curriculum math standard?

The Standalone

Let me break down the basics of the unit for you:

Central Idea: Numbers tell us How Many and How Much

  • The amount of a number determines its position in a numeral.
  • How we know when to regroup.
  • How grouping numbers into parts can help us find solutions

(All lines of inquiry and Central Idea from conceptual understanding in the PYP Math scope and sequence and subsequent learning outcomes in  Phase 2)

Knowledge and Understandings, aka, “The Standards”

I’m going to cross-reference 2 commonly used national curriculum, Australian and American Common Core, because our team needed clarity into exactly WHERE our destination needs to be in this unit of inquiry:

Australian:

Count collections to 100 by partitioning numbers using place value (ACMNA014 – Scootle )
  • understanding partitioning of numbers and the importance of grouping in tens
  • understanding two-digit numbers as comprised of tens and ones/units
Represent and solve simple addition and subtraction problems using a range of strategies including counting onpartitioning and rearranging parts (ACMNA015 – Scootle )
  • developing a range of mental strategies for addition and subtraction problems

The Common Core:

Understand place value.

CCSS.MATH.CONTENT.1.NBT.B.2
Understand that the two digits of a two-digit number represent amounts of tens and ones. Understand the following as special cases:
CCSS.MATH.CONTENT.1.NBT.B.2.A
10 can be thought of as a bundle of ten ones — called a “ten.”
CCSS.MATH.CONTENT.1.NBT.B.2.B
The numbers from 11 to 19 are composed of a ten and one, two, three, four, five, six, seven, eight, or nine ones.
CCSS.MATH.CONTENT.1.NBT.B.2.C
The numbers 10, 20, 30, 40, 50, 60, 70, 80, 90 refer to one, two, three, four, five, six, seven, eight, or nine tens (and 0 ones).
CCSS.MATH.CONTENT.1.NBT.B.3
Compare two two-digit numbers based on meanings of the tens and ones digits, recording the results of comparisons with the symbols >, =, and <.

Use place value understanding and properties of operations to add and subtract.

CCSS.MATH.CONTENT.1.NBT.C.4
Add within 100, including adding a two-digit number and a one-digit number, and adding a two-digit number and a multiple of 10, using concrete models or drawings and strategies based on place value, properties of operations, and/or the relationship between addition and subtraction; relate the strategy to a written method and explain the reasoning used. Understand that in adding two-digit numbers, one adds tens and tens, ones and ones; and sometimes it is necessary to compose a ten.
CCSS.MATH.CONTENT.1.NBT.C.5
Given a two-digit number, mentally find 10 more or 10 less than the number, without having to count; explain the reasoning used.
CCSS.MATH.CONTENT.1.NBT.C.6
Subtract multiples of 10 in the range 10-90 from multiples of 10 in the range 10-90 (positive or zero differences), using concrete models or drawings and strategies based on place value, properties of operations, and/or the relationship between addition and subtraction; relate the strategy to a written method and explain the reasoning used.

 

Planning the Unit

If you “peel” back these standards, what (math) concepts and skills seem evident to you? What are the “big ideas” that students need to walk away with?

  • Collection or Group
  • Place Value
  • Position
  • Partitioning: composition and decomposition
  • Reasoning

Since I teach 1st grade, we would be exploring the key concept of Form and Function, mainly, throughout this unit. But we would also look at the Connection between using groups of 10s and developing mental strategies for problem-solving in which we can Change addends/subtrahends around to make friendly numbers. Students would also need to consider the Perspective of other mathematicians in our class when it came to solving a problem in different ways.

With this in mind, we looked at these standards and identified 5 main guiding questions  that will be the basis of our inquiry and the purpose of every provocation that we create:

  1. How does the place value system work?
  2. How does the position of a digit in a number affect its value?
  3. In what way can numbers be composed and decomposed?
  4. In what ways can items be grouped to make exchanges?
  5. How can we use place value patterns for computation?

Provocations to Explore and Reveal Math Thinking

Once we had clarity around the big ideas in our unit and created our guiding questions, it became easy to start planning provocations.  Using a guide like this one, Task Identification Tool_Identifying High-Quality Tasks (1),  from the work of John J. SanGiovanni in his book series on how to Mine the Gap for Mathematical Understanding really helps teams like ours to create a high ceiling, low-threshold activity for inquiry-based maths.

We knew from a previous provocation, (14 or 41–the position of a numeral doesn’t matter. Agree or Disagree. Prove it.), that students still were developing an understanding of what a written number means. We needed to further explore it. So we began with place value.

Guiding Question #1: How does the place value system work?

We decided to launch the unit with an emphasis on language since we noticed that a lot of students were mixing up their teen numbers when explaining their ideas. So we started with Teen vs. Ty, is there a pattern or a rule about these numbers?

  1. Sixteen and Sixty, What do you notice about these numbers?
  2. Seventeen and Seventy? How are they different, how are they the same?
  3. What do you think “teen” means? What do you think “ty” means?

We then began exploring expanded notation with showing the tens in a number. Students were introduced to how expanded notation is related to the place value mat, which can be represented as:

43=40 + 3 or 4 tens and 3 ones. 

The students played a partner game called “guess my number” in which they had to express a number in tens and ones and have the student create it with base-10 blocks and numerals.  They did really well. We thought we were smashing it and ready to move on to using it for addition and subtraction.

But how could we be sure they “got it”? ……….

Assessment

We decided to assess if they got the idea of base-ten and how we use the place value mat as a structure to show the parts of numbers. We used this SeeSaw prompt to assess if they truly understood:

How we know when to regroup – Using a collection of objects – how do you find out how many items you have?

We decided to use unifix cubes because the “tens” weren’t prepackaged, sort of speaking, as they are with base-10 blocks. In this assessment, we had them grab a handful of unifix cubes and organize them on the place value mat, explaining to us what number they thought they had. What we observed stopped us dead in our tracks and ask what misconceptions do we see? Here is an example of a common surprising result:

As you can see, this student didn’t connect the quantity he had in their collection at all. These students would need some additional support with connecting the amount of a number to how it is written and presented.  We felt we needed to go deeper into how we “bundle” tens to count things efficiently. In fact, we felt we needed to do an inquiry into 10, so they could appreciate how this is the basis of base-10.

Back to the Starting Line?

We are in Week 4 of this unit, and we are going back to the starting line. Based on our observations, it seems that the students don’t quite have the idea of ten yet, and, we have a group of students who just need to work on skip counting by tens. It would be easy to move ahead and push through so we can tick off our standards, but we’d rather spend more time immersed in context and play that develops their number sense than to push them along. We understand our future impact. Moving ahead hoping that they “get it” later on would seem like a disservice, as they’d lose the interest and motivation to do more complicated mathematics and have half-baked conceptual understandings.

Since have a free flow of student groups, in which children choose what Must Dos and May Dos they want to participate in. However, ideally, we have 3 primary activities that we want the students to work through in small teacher groups throughout our math learning time:

The Big Idea of our teacher-directed groups: 10 can be thought of as a bundle of ten ones — called a “ten.”

  • The Base-10 Bank

Students will pick a numeral and build numbers using “ones” which they can exchange for tens. As partners, one person will be the “bank”, which the other partner can trade in their ones for 10. No place value mats, only the base-10 blocks.

  • Race to 100

Using dice, a hundred’s chart and a place value mat, students have to roll and add their way to 100. As they roll their way up to 100, they have to build the new number, using the place value mat to show how the quantity that is ever-increasing, as well as giving a context for exchanging units.

Making Bundles: In this activity, students are given a collection of objects and they have to bundle them up into tens, so that they have an appreciation of the value of a number.

Additional Games and activities that they can do independently, when not working with a teacher. The May-Dos:

Traffic light (Partner Game): One partner comes up with a “mystery” number and, using a place value mat, has to try to guess what digit is in what position.

Big 4 (Independent or Small Group): In this game, we use a hundred chart to try to get to the biggest number in just 4 moves. A child rolls a die and moves that many spaces, moving in any direction, forwards, backward, diagonally, upwards or downwards. This game gives them practice at thinking about number patterns as they move around the hundreds chart.

Ready or Not?

After all that exploration, we hope that these games will prepare them for the following formative assessment:

4+4 = 44. Agree or Disagree? Show how you know. (This actually is inspired by a misconception that we observed) Students can use 10-frames, the Hundreds Chart, Math Racks or Base-10 blocks to provide evidence of their reasoning. (We determined that these sorts of materials would help them to “see” patterns and make connections, rather than loose parts alone)

If they can articulate and demonstrate a firm understanding of place value in this provocation, then we feel that we can move into applying our understanding of using the base-10 for addition and subtraction, examining the guiding question:

How can we use place value patterns for computation?

This is the ultimate reason why place value is such a critical understanding after all. However, it is the journey into number sense that makes this a beautiful experience. We are not quick to move them onto pencil and paper. We want them to experience numbers and segue them into contextual situations.

The Summative

We are still in process with determining the actual prompt, but we feel that we need to give them choices with the task. Choosing a task that shows how they apply grouping strategies to solve addition and subtraction problems will ultimately be our goal.

For our low-level readers, we will give them an oral word problem and then hand them a collection of objects that need to be counted. We want them to observe if they create groups of tens to determine the number. No place value mats offered, but they can request one. For our stronger readers, we will give them a word problem, and, again, offer them concrete materials, but other tools to solve the problem are upon request.

At the end of this task, we can identify the skills and understandings they have acquired. Although we have “mapped out” where we think this unit will go, we can be flexible and stop to address misconceptions along the way. Will they arrive and “meet the standard”? That is entirely up to us, and how effectively we observe, challenge and question our students’ thinking as they playfully and joyfully experience numbers. At the end of the day, that goal–to appreciate and be fascinated with numbers--that is the true destination of math inquiry.

 

#Inquiry in the #PYP: From Paper to Practice: 5 Approaches for Provocations (that “Stick”)

#Inquiry in the #PYP: From Paper to Practice: 5 Approaches for Provocations (that “Stick”)

Even though we all use ‘the framework’, we have all sorts of curriculums in our schools.  Some schools use the PYP Scope and Sequences, others use their national curriculums and yet others look at curriculum like a buffet- take a bit of AERO Standards, some of this from the Common Core and a portion of  NGSS (Next Generation Science Standards). (Nevermind that most schools don’t even acknowledge any Technology Standards) Whatever approach you take to the “Written Curriculum”, you have to bridge what you put on paper with what is the “Taught Curriculum” is going to look like and how on Earth are you going to let student agency influence it.

This sort of tension is what I am really thinking about and concerned with–how are we going to shift our thinking about the “Written Curriculum” being the driver into it being the “map” that we can use to go on divergent paths created by student’s interests. And I think solid provocations are the “starting line” from which are learning journey begins. Although I have written about provocations before, I wanted to come at from a different angle from the ideas presented from the book, Made to Stick. (I am a huge fan of the writing of Dan and Chip Heath). Because at the heart of a provocation, we want it to leave an indelible mark and make a real impact on students’ thinking in order to create action and authentic agency.  They would call this type of learning “sticky”. (Don’t you love that?)

But the challenge of creating a provocation is that you know too much. The Heath brothers term this, the Curse of Knowledge. Here’s what they mean:

It’s a hard problem to avoid—every year, you walk into class with another year’s worth of mental refinement under your belt. You’ve taught the same concepts every year, and every year your understanding gets sharper, your sophistication gets deeper. If you’re a biology teacher, you simply can’t imagine anymore what it’s like to hear the word “mitosis” for the first time, or to lack the knowledge that the body is composed of cells. You can’t unlearn what you already know. There are, in fact, only two ways to beat the Curse of Knowledge reliably. The first is not to learn anything. The second is to take your ideas and transform them.

Stickiness is a second language. When you open your mouth and communicate, without thinking about what’s coming out of your mouth, you’re speaking your native language: Expertese. But students don’t speak Expertese. They do speak Sticky, though. Everyone speaks Sticky. In some sense, it’s the universal language. The grammar of stickiness—simplicity, storytelling, learning through the senses—enables anyone to understand the ideas being communicated.

(From Teaching, Made to Stick, by Dan and Chip Heath)

I can really relate to this, especially when I taught older students because I thought they already “knew stuff”. With that in mind, provocations can really reveal what students are thinking and feeling.  So now that you have the context of why provocations can be so powerful and transformative for student learning, I’d like to share with you 5 approaches for provocations (that “stick”):

1.Unexpected: Create curiosity and pique interest with unexpected ideas and experiences that open a knowledge gap and call to mind something that needs to be discovered but doesn’t necessarily tell you how to get there.

Example-Central Idea: The use of resources affects society and other living things.

Take out all the classroom resources that are made from petroleum products after school one day. The next day,  have the students come in and be shocked?-where did all those resources go? Then have them consider what these resources have in common. And then have them consider the impact on society if these non-renewable resources went away.

2. Concrete: Ground an idea in a sensory reality to make the unknown obvious.

Central Idea: Economic activity relies on systems of production, exchange, and consumption of goods and services.

Create a classroom economy by “printing” money and having students create businesses. Turn all of your classroom resources into “commodities” or by providing services (like sharpening pencils) to illustrate the conceptual understandings. This provocation goes on for weeks, by the way, so that they can experience the related concepts of scarcity and marketing.

3. Credible: Demonstrate ideas and show relationships to “prove” a point.

Central Idea: Informed global citizens enhance their communities.

CRAAPgraphicGo through news articles either on a social media news feed or through an internet search on a topic that is relevant and interesting to your students or controversial (ex: climate change). Have the students examine at least 3 websites or sources of information and put them through the filter of the CRAAP test.

4. Emotional: Powerful images, moving music, role-play–anything that incites either strongly positive or negative feelings.

Central Idea: Homes reflect local conditions and family’s culture and values.

Using images from photos of children’s bedrooms from around the world have the children try to match the picture of a child with a picture of a bedroom. Why do they think those images go together? What evidence in the photo might suggest the values and culture of that child’s family?

5. Story: Use a story, whether from a book, a video or from your own life, to illustrate a challenge or provide a context worth exploring.

Central Idea: Our actions can make a difference to the environment we share.

Share the story of One Plastic Bag and have students reflect on the impact her small action had made in her community. What would you do with a plastic bag? (During our  1st-grade classes’ personal inquiry time, students were invited to take some plastic bags and play around with those materials. It is interesting to see who and how they took action.)

So there you go. These are just 5 approaches to 5 central ideas. Crafting provocations are probably one of the best things I love about the PYP and when we share insight into how we can approach these central ideas, I think it elevates everyone’s schools because of the insights gained.  I’d love if others could share and post ideas for provocations to further illustrate the importance that they play in deepening our students learning and inspiring authentic connections and action.

#PYP: What is a Provocation?

#PYP: What is a Provocation?

I love the International Baccalaureate but the jargon really can get you jumbled up, especially when you are new to the program. In the PYP, we use a lot of terminologies that others would just call “best practice”.  However, there is a word that pops up quite a lot: provocation.

Now someone might call it the “hook”, something that draws student’s attention into a lesson. But when I say “hook”, I don’t mean an attention grabber like a joke or cute anecdote or a routine of some sort that gets students on task. No, that’s not a provocation!   A provocation is a thoughtfully constructed activity to get students excited and engaged, but a really powerful provocation creates cognitive dissonance that throws kids into the Learning Pit (of inquiry).  Students should be examining their beliefs and ideas as a result of the provocation.

Here is a list of questions that were shared by Chad Walsh which can help filter activities and perhaps refine them in order to transform them into provocations:

  • Is the provocation likely to leave a lasting impression?
  • Is there a degree of complexity?
  • Might the provocation invite debate?
  • Might the provocation begin a conversation?
  • Might the provocation extend thinking?
  • Might the provocation reveal prior knowledge?
  • Is the provocation likely to uncover misconceptions?
  • Does the provocation transfer the ‘energy’ in the room from the teacher to the students?
  • Does the provocation have multiple entry points?
  • Can the provocation be revisited throughout the unit?
  • Might the provocation lead learners into a zone of confusion and discomfort?
  • Does the provocation relate to real life/their world?
  • Is the provocation inconspicuous and a little mysterious?
  • Might the provocation lead learners to broader concepts that tend to carry more relevance and universalitMight the provocation be best during the inquiry, rather than at the beginning?
  • Does this provocation elicit feelings?

That is a very extensive list, isn’t it?

Well, let me share a  few examples of provocations:

How We Organize Itself, The Central Idea: Governments make decisions that impact the broader community.

Students come to class that morning and are treated according to the government system that is being highlighted. (Example, Totalitarian) This goes on for a week and each day students have to reflect on what it was like to be a citizen of this type of government.

Where We Are In Place and Time, The Central Idea: Personal histories help us to reflect on who we are and where we’ve come from.

The “mystery box” (which I think originated from the work of Kath Murdoch): inside a box (or a suitcase, in this example) there is a bunch of seemingly unrelated items that students have to guess what the unit might be about. This is a “tuning in” activity. And since this is a central idea about personal histories, it might include a family photo, an old toy, some cultural artifacts or relics of things we enjoy doing, a clock, a map.

Math Stand Alone, The Central Idea: Mathematical problems can be solved in a variety of ways 

The  “sealed solution“: there are 5 envelopes that have the sum of two numbers “sealed” inside them. Students have to use the digits 0-9 only once to create those sums. What could be the sums inside?


Hopefully, this is helping you to discern what a provocation might be. Even if you are an experienced PYP teacher, reflecting and refining our provocations is something that is critical to developing our student’s learning and sparking curiosity.  A well-designed provocation will not only make it to the family dinner table conversation that night but will have a longer shelf life in a child’s mind and ultimately develops important conceptual understandings.

What have been some of your favorite provocations? What questions or engagements have led to deeper learning? Please share in the comments below so we can all benefit from your experience! (Thanks!)

#IMMOOC: Prototyping the Classroom to Reflect Values and Guiding Principles of our IB Culture

#IMMOOC: Prototyping the Classroom to Reflect Values and Guiding Principles of our IB Culture

 

Our attitudes steer our decisions and build momentum in everything we do. A space is at its most sublime when it reinforces and encourages desired values. The first step in designing a space to support particular attitudes is to define those attitudes. – From the book, Make Space, by d.School

I have come to realize that our learning space is more like a living breathing organism, which changes and evolves. It’s always going to be a prototype of the changing learning needs of students. In one of our last IMMOOC ,Kayla Delzer, a flexible seating expert, discusses the importance of cultivating “workspaces” that provide students with opportunities to learn best.  Anyone who has worked with me knows that my classroom setup changes at least ten times a year. However, instead of shifting a table or bookcase, I decided to take all of the classroom furniture out of the rooms and start all over to get a fresh start and churn up different energy in the learning space.  I’ve been looking at the student data that I have gotten from surveys and student sketches of their design ideas, as well as reflections on our timetable to get an idea of their interests and feelings towards different grouping strategies. I understand that the data that I get from those surveys and diagrams are just a snapshot because the learning environment will shift as our culture of learning shifts.

So then I’ve decided to think about how I could use our classroom as a provocation and context of our current Sharing the Planet unit. I’ve been working on “natural vs man-made” and wondering how I can elevate their love of nature and our environment. In one classroom, I took as much of the plastic and industrial looking furniture and replaced it with wooden furniture that we use for outdoor seating in our corridors.  However, I left one of our classroom spaces with all the normal school furniture in it. I wanted to see how the students responded to the change of environment.

This is our first prototype, but it has been fun to see how the students behave and respond to the changes, even if they cannot articulate it. I have to say that is incredibly hard to take the “man-made” out of our learning environment and so this idea will have to continue to grow and be refined. But when I think back to the original quote from the book Make Space, I want the next prototype to really support the value and love of our environment–what makes our Blue Planet worth appreciating and how can we still be “human”, with our deep desire towards progress and yet honor the other conscious living organisms and their plight to survive? In our IB programmes, we have a strong emphasis on how humans must negotiate our roles and responsibilities in sharing finite resources with other living things.

The aim of all IB programmes is to develop internationally minded people who, recognizing their common humanity and shared guardianship of the planet, help to create a better and more peaceful world. -From, What is an IB Education

I wonder how I might continue to create this awareness in our students and how I can use our classroom environment as the context to develop this appreciation. Although this is the first prototype, taking cues from the flexible seating playbook is helpful, but trying to bring nature back into the classroom is not an easy task, yet this challenge is a fun one. If you have any ideas or suggestions, I am keenly open to it, as collaboration really helps to make an idea stronger. So I welcome your comments below.

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