Explanation of the Eight Mathematical Practices
The Standards for Mathematical Practice describe varieties of expertise that mathematics educators at all levels should seek to develop in their students. These practices rest on important "processes and proficiencies" with longstanding importance in mathematics education. The first of these are the NCTM process standards of problem solving, reasoning and proof, communication, representation, and connections. The second are the strands of mathematical proficiency specified in the National Research Council's report Adding It Up: adaptive reasoning, strategic competence, conceptual understanding (comprehension of mathematical concepts, operations and relations), procedural fluency (skill in carrying out procedures flexibly, accurately, efficiently and appropriately), and productive disposition (habitual inclination to see mathematics as sensible, useful, and worthwhile, coupled with a belief in diligence and one's own efficacy).
The Eight Practices are:
Websites for explanations
Check out this list for a specific description of each. Click on a standard, then read the "Classroom Observations" section to get a better understanding of each standard. You can also watch the videos to get further information.
Here's another website with great resources.
And more info from the CCSS website.
But my favorite website for the Eight MPs? It's this website called ThinkMath.com. I find their explanations very easy to understand.
Posters to put in your classroom
Eight Mathematical Practices Poster (Elementary)
Math Practices Poster
Upper Grade Mathematical Practices Posters
"I Can" Statements for the Eight Mathematical Practices
Very Cool Primary Poster
But really. What do the MPs mean? I'm so confused!
So, what are the MPs? How can you explain them in really easy terms? Here goes:
Let's say I, Amy, ask Shaun to go get me a sandwich for lunch. Let's see how he figures out how to do this using the MPs.
1. Make sense of problems and persevere in solving them: Shaun has to ask himself, "I wonder what kind of sandwich she wants." Then he has to figure out where to go get the sandwich.
2. Reason abstractly and quantifiably: Shaun says to himself, "I'm pretty sure Amy will want only a 6 inch sandwich, and only one, not 20 sandwiches."
3. Construct a viable argument and critique the reasoning of others: Shaun tells Kelly that he's going to get me a veggie sandwich. Kelly tells him he should really get me some chicken noodle soup and a salad. Shaun replies, "I disagree with you, Kelly. Amy's a vegetarian and doesn't eat chicken. I think I'll stick with the veggie sandwich, but you are right about the salad. She's always watching her caloric intake and she likes salad. I will pick one up."
4. Model with mathematics: Shaun pulls out a piece of paper and creates a table with all the ingredients he knows I want on my sandwich to hand to the clerk at the deli. And then, just for fun, he draws a diagram of how it should be constructed.
5. Use appropriate tools strategically: Realizing that the deli has an app, Shaun pulled out his iPhone, downloaded the app, and uses it to place the order ahead of time. Then he uses a map to find the deli.
6. Attend to precision: Just to make sure the deli gets the order right, Shaun calls and speaks to the clerk. He states, "Be sure to include 3 tomato slices and 6 avocado slices. And yellow mustard, not Dijon."
7. Look for and make use of structure: This MP has kids use what they already know to solve problems. Shaun says to himself, "I already know that the deli has a deal where you can get a sandwich and a side. I'll order that for Amy.'
8. Look for and express regularity in repeated reasoning: Shaun checks himself. He wants to use a strategy he's already used and check for reasonableness. He steps back, realizes he's ordered sandwiches from this deli before and knows a shortcut how to get there, checks the order to make sure it's correct, and heads off to get me lunch.
What a good friend!
Checklist to keep records
Eight Mathematical Practices Checklist
Mathematical Practices Matrix
A Really Clear Video to Explain the Eight MPs
Mathematical Practices Video part 1 of 2 (if you're watching this at school, you'll have to enter your username and password to get past the block.)
To get information about MP 1, go to 3:16 in the video.
To get information about MP 2, go to 6:06 in the video.
To get information about MP 3, go to 9:02 in the video.
To get information about MP 4, go to 10:28 in the video.
Mathematical Practices Video part 2 of 2 (if you're watching this at school, you'll have to enter your username and password to get past the block.)
To get information about MP 5, go to 0:00 in the video.
To get information about MP 6, go to 6:37 in the video.
To get information about MP 7, go to 7:40 in the video.
To get information about MP 8, go to 8:47 in the video.
MPs in Kid Friendly Language
MPs in Kid Friendly Language
Classroom Sneak Peeks:
Classroom Sneak Peek: Mathematical Practice #1
Classroom Sneak Peek: Mathematical Practice #2
Classroom Sneak Peek: Mathematical Practice #3
Classroom Sneak Peek: Mathematical Practice #4
Classroom Sneak Peek: Mathematical Practice #5
Classroom Sneak Peek: Mathematical Practice #6
Classroom Sneak Peek: Mathematical Practice #7
Classroom Sneak Peek: Mathematical Practice #8
Standards Bookmarks and Parent Guide:
Standards Bookmarks
Parent Guide to Mathematical Practices
Flip Books No kidding--these are really, really helpful!
Kindergarten Flip Book
First Grade Flip Book
Second Grade Flip Book
Third Grade Flip Book
Fourth Grade Flip Book
Be An Expert Form
Generic Be An Expert Form
Be An Expert Form--MP 1
Be An Expert--MP 3
Explanations and Commentary
Explanations of the Eight Mathematical Practices from Illustrative Mathematics.
Very interesting commentary out of the University of Arizona (go Wildcats!).
Want to continue the dialogue? Check out and add yourself as a member of this website's Facebook page here!!
Thank you to 4th Grade Loma Portal teacher, Amy Kinseth, for creating this page of Teacher Common Core Materials. Please email her with questions or comments at [email protected].