The Standards for Mathematical Practices (SMPs) were first introduced in the Common Core State Standards (CCSS, 2010) and appear in the revised Oregon Mathematics Standards (2021). These eight standards were adopted in the same form within the revised standards.
The complete wording of each SMP can be found here: Mathematical Practice Standards. However, we believe the SMPs can be made more impactful if the text is interpreted in terms of behaviors one should expect to observe as students engage with each SMP. Ideally, students would view the bulleted statements as the success criteria by which they could self-assess their ability to fully reason with mathematics on a regular basis.
To incorporate MP1 effectively in the classroom, teachers can help students by cultivating a community of growth mindset learners. They can foster perseverance in students by choosing tasks that are interesting and challenging, involving meaningful mathematics. Teachers should look to present problems that allow for multiple strategies and multiple solutions. Importantly, teachers should recognize students’ efforts when solving challenging problems.
To incorporate MP2 effectively in the classroom, teachers can help students by providing opportunities for students to use manipulatives when investigating concepts. They can guide students from concrete to pictorial to abstract representations as understanding progresses and expect students to give meaning to all quantities in a task. Additionally, teachers should give students ample opportunities to see how various representations are useful in different situations.
To incorporate MP3 effectively in the classroom, teachers should establish a culture in which students ask questions of the teacher and their peers, and error is an opportunity for learning.
They should select, sequence, and present student work to advance and deepen understanding of correct and increasingly efficient methods. Additionally, teachers should help students develop their ability to justify methods and compare their responses to the responses of their peers.
To incorporate MP4 effectively in the classroom, teachers should provide opportunities for students to create models, both concrete and abstract, and perform investigations. They should ask students to justify their choice of model and the thinking behind it, as well as the appropriateness of the model chosen. Teachers can also assist students in seeing and making connections among different models.
To incorporate MP5 effectively in the classroom, teachers should help students see why the use of manipulatives, rulers, compasses, protractors, calculators, statistical software, and other tools will aid their problem-solving processes. They should make sure that math tools are readily available and frequently model the use of appropriate tools. Teachers should give students a choice of materials/tools and have discussions with them about their choices to lead them to use appropriate tools strategically.
To incorporate MP6 effectively in the classroom, teachers should consistently model the use of precise mathematics language and symbols and expect their students to do the same. They should ask students to identify symbols, quantities, and units in a clear manner. Teachers should also set expectations as to how precise the solution needs to be and help students understand when estimates are appropriate for the situation.
To incorporate MP7 effectively in the classroom, teachers should encourage students to look for structure, not simply to apply a rule or structure given by the teacher. This means encouraging students to notice key features, such as identifying characteristics of shapes or noticing whether the order in which you add numbers changes the sum. Patterning activities also support attention to structure. Teachers can ask young children to identify the part of a pattern that repeats over and over and can ask older children to figure out a rule for predicting a new instance in a growing pattern or function table.
Mathematically proficient students notice if calculations are repeated and look both for general methods and for shortcuts. Upper elementary students might notice when dividing 25 by 11 that they are repeating the same calculations over and over again, and conclude they have a repeating decimal. By paying attention to the calculation of slope as they repeatedly check whether points are on the line through (1, 2) with slope 3, middle school students might abstract the equation (y - 2)/(x - 1) = 3. Noticing the regularity in the way terms cancel when expanding (x - 1)(x + 1), (x - 1)(x2 + x + 1), and (x - 1)(x3 + x2 + x + 1) might lead them to the general formula for the sum of a geometric series. As they work to solve a problem, mathematically proficient students maintain oversight of the process, while attending to the details. They continually evaluate the reasonableness of their intermediate results.
To incorporate MP8 effectively in the classroom, teachers should present several opportunities to reveal patterns or repetition in thinking, so students can make a generalization or rule. They should help students connect new tasks to prior concepts and tasks, to extend learning of a mathematic concept. Additionally, teachers should ask for predictions about solutions at midpoints throughout the solution process.
It is important to embed these SMPs into lessons every day. Teachers should look for ways to integrate appropriate SMPs in authentic ways to deepen students’ understanding of the mathematics content standards. Ultimately, the goal should be to engage students in rich, high-level mathematical tasks that support the approaches, practices, and habits of mind which are called for within these standards.