Fractions Minus the Friction. A guide to four teaching practices

Introduction

Understanding fractions has a significant impact on both individuals and society. Fractions are an integral part of everyday life, from performing various job tasks to making healthy-living choices and managing personal finances. Unfortunately, many adults struggle with basic fraction concepts and procedures. These challenges often begin in primary school and can persist through secondary school. However, there is a growing body of research that offers valuable insights into how to effectively teach and learn fractions. The purpose of this guide is to describe the importance of learning fractions and present four research-informed instructional strategies to enhance fraction teaching and learning.

Importance of learning fractions

What are fractions?

Mathematically speaking, fractions are rational numbers that represent a part of a whole that is partitioned into equal parts. The whole can be defined as a single object (e.g., a pizza), a set of objects (e.g., a box of biscuits), a specific length (e.g., a kilometre), a specific volume (e.g., a litre), or other representations. Fractions are symbolically expressed by a numerator to denote the number of equal parts being counted and a denominator to denote the total number of equal parts in the whole. For example, 2/5 represents the quantity of two equal parts of a whole that is partitioned into five equal parts.

Why are fractions important?

Understanding fractions lays the groundwork for success in advanced mathematics and science. Fraction knowledge uniquely predicts students’ performance in algebra, even more than their knowledge of whole numbers (Bailey et al., 2012; Booth & Newton, 2012; Cirino et al., 2022; Viegut, Stephens, & Matthews, 2024). Booth and Newton (2012) found that students’ ability to place unit fractions on a number line is a key algebra readiness skill, as it is linked to understanding features of algebraic equations (like the equal sign, negative sign, variables), solving equations, and working with word problems. Similarly, the ability to place non-unit fractions on a number line connects to solving algebraic equations, likely because it builds on students’ proportional reasoning skills.

Since fraction knowledge is a unique predictor of success in Algebra 1, which is considered a gateway to advanced mathematics in secondary school (e.g., advanced secondary algebra), building strong fraction skills is crucial (Siegler et al., 2012). Tyson and Roksa (2017) found that success in Algebra 1, particularly in rigorous courses, increases students’ likelihood of succeeding in higher-level maths (e.g., Algebra 2). This, in turn, has a positive impact on higher education and career outcomes (Gaertner, Kim, DesJardins, & McClarty, 2014). Overall, these findings highlight the pivotal role of fractions in advancing students’ maths proficiency and underscore the importance of developing a strong understanding of fractions in upper primary and early secondary school.

What are important fraction concepts?

When students begin to study fractions, it is often their first exposure to number systems beyond whole numbers (see Figure 1). As such, students begin to learn that some properties and concepts that they learned in relation to whole numbers do not apply to all real numbers — which include rational and irrational numbers (see section 2.4 for examples).

There are three important concepts students learn as they deepen their understanding of fractions: magnitude, equivalence, and density. Applying these concepts to fractions is often students’ first exposure to how concepts and operations differ across number systems.

Understanding fraction magnitude means that students understand that fractions represent a unique quantity, and that quantity can be ordered, compared, and represented on a number line. When applied to fractions, equivalence means knowing that a fraction can be symbolically represented in a variety of equivalent ways but still represents the same quantity. Fraction density refers to the fact that a quantity can be partitioned into infinitely smaller parts.

Text box 1: A deeper dive into fraction magnitude, equivalence, and density

Magnitude is a concept that applies to all numbers, but it can be especially challenging for students to grasp when learning fractions. Simply put, magnitude is the idea that a number represents a quantity that can be ordered and placed on a number line as a distance from zero (Siegler et al., 2011). When learning whole numbers, students from an early age can link numerals to quantities (e.g., ‘3’ can be represented as three objects). With instruction, they then deepen their understanding by placing whole numbers on a number line. However, when learning fractions, students often do not see fractions as numbers with magnitude. Instead, they may interpret the numerator and the denominator as separate numbers without understanding that a fraction represents the relationship between the numerator and the denominator. This relationship forms a single quantity that can be ordered and represented on a number line as a distance from zero.

The mathematical concept of equivalence is demonstrated in many ways. For example, students learn that the equal sign indicates a relationship between the quantities where both sides have the same value (e.g., 3 + 8 is the same as 0 + 11). When learning fractions, students understand equivalence when they learn that fractions can be symbolically represented in many ways while keeping the same magnitude (e.g., 2/3 = 4/6 = 8/12 = 16/24 = 32/48 and so on). Students often build an understanding of equivalent fractions when working with common or ‘benchmark’ fractions. For example, when students are shown that half of a whole that is partitioned into 10 parts is 5 parts, and can represent this as ½ = 5/10. As their understanding grows, they can begin to use multiplicative reasoning to find equivalent fractions. Procedurally, students can calculate equivalent fractions and understand the correctness of the procedure when they are able to multiply fractions and apply their understanding of the identity property of division (that any number divided by itself is 1) and the identity property of multiplication (that any number multiplied by 1 is that number):

which is the same as

Students understand fraction density when they grasp that a whole can be partitioned into infinitely smaller parts. This concept ties into their understanding of place value and decimals, and represents a unique shift in their understanding of counting. When learning whole numbers, students use a counting sequence to establish a total of objects (e.g., 0, 1, 2, 3). The counting sequence itself also demonstrates that whole numbers have a unique successor (e.g., the unique successor of 2 is 3). When students are first exposed to fractions, they must understand that numbers — namely, fractions — exist between two whole numbers (e.g., ¼, ½ and ¾ are between 0 and 1). Then, they learn that there are numbers that exist between fractions (e.g., ½ is between 2/5 and 3/5). Over time, they recognise that fractions do not behave like whole numbers because they do not have a unique successor. As their knowledge deepens, they can start to see that the number line can be infinitely partitioned into smaller and smaller parts without end (see Figure 7 for an illustration).

Figure 1. Real numbers (Ketterlin-Geller & Chard, 2011)

To support teachers in implementing key fraction concepts and skills in the classroom, this guide begins with Practice 1, which outlines the learning progression that supports students’ development of fraction proficiency. Practice 2 focuses on designing fraction instruction that is coherent across grades and aligned with other mathematics concepts, like whole numbers. Practice 3 explores the relationship between conceptual understanding and procedural fluency, emphasising the importance of making explicit connections for students. Lastly, Practice 4 addresses common errors and misconceptions that can arise if students’ understanding of fractions is not systematically developed over time.

Each practice includes a description of the approach, the research that supports it, and practical guidance for implementation in the classroom. Throughout the guide, several themes emerge. First, we emphasise the power of using the number line to teach fractions. Second, we reinforce the recommendation by Powell, King, and Benz (2023) to implement systematic and explicit instruction while judiciously incorporating multiple representations — concrete, semi-concrete, and abstract — during instruction. Finally, we stress the importance of carefully planning instruction within and across grades. Effective planning includes:

following a learning progression for teaching fraction concepts
building on students’ knowledge of whole numbers to deepen their understanding of fraction concepts, especially magnitude
fostering both conceptual understanding and procedural fluency, and
integrating different instructional models, such as area, length, and set models.

Practice 1: Design instruction along a learning progression

What is this practice?

Learning progressions describe how students develop proficiency in a subject by moving from novice to more sophisticated understanding. They outline the phases or levels through which students build knowledge, develop skills, and deepen their thinking about a topic. These progressions focus not only on concepts and procedures but also on how students process information, such as reasoning and problem-solving strategies.

Given the complexity of fractions, instruction needs to follow a clear progression, with each phase or level of learning well-defined. Each phase should articulate the essential concepts and skills students need to understand, with each building on the next to deepen students’ proficiency. The essential concepts when learning fractions include conceptually understanding magnitude, equivalence, and density, and key skills include procedural fluency in applying the four operations.

What is the research?

Researchers have proposed learning progressions to describe how students develop proficiency in fraction concepts and procedures (see Confrey, 2018, for a comprehensive list of mathematics learning progressions across domains); however, it is important to note that research validating these learning progressions is still emerging.

Here, we focus on the value of learning progressions as tools to help teachers design and sequence instruction. The learning progression described below should not be viewed as a linear sequence in which students must master one phase before moving on to the next. Instead, teachers can integrate key concepts and skills across phases to build on students’ prior knowledge, thereby helping students develop a robust understanding of fraction concepts and skills. Moreover, the phases of learning should be integrated with the Australian Curriculum to ensure that students are meeting the learning expectations specified by the Australian Curriculum, Assessment and Reporting Authority (ACARA; see Text Box for a summary of the development of fraction proficiency specified in the curriculum framework).

In a recent review of this research, Wellberg, Briggs, and Student (2023) identified five phases or levels of learning that progress from early understandings in primary school to more advanced knowledge in secondary. These levels include part-whole relationships, fractions as quotients or fair-shares, measurement, fractions as ratios or rates, and fractions as operators. We define each of these phases or levels below.

Prior to formal instruction on fractions, many students develop initial fraction understanding through experiences sharing objects and reasoning about proportional relationships (Siegler et al., 2021). For example, young children can share a set of objects (such as candies or balls) equally among a group of people. Similarly, from an early age, students can recognize proportional relationships when expressed in non-symbolic ways such as with geometric figures or through story contexts. These emerging understandings serve as a basis for formal instruction on fractions and can be integrated across the phases of the learning progression.

Students are often formally introduced to fractions through the part-whole model, in which they learn that a fraction represents a partition (the numerator) of a given whole (the denominator). Students recognise that when the unit fraction is the same size, the fraction with a larger numerator is composed of more fractional units.

While this model provides an important link to thinking about fractions as ratios of two integers, or whole numbers, concern has been raised about the part-whole model being incomplete (e.g., lacking a focus on magnitude), causing misconceptions (e.g., imprecise partitioning of a whole), and having limited utility (e.g., interpreting negative fractions, modeling fractions with large denominators) (Siegler et al., 2011). These insufficiencies underscore the importance of advancing students’ understanding along the learning progression.

As students’ understanding deepens, they begin to see fractions as fair-shares or quotients, where a whole is divided into equal parts — a concept tied to fair sharing, which often develops early through students’ informal experiences. Students learn that partitioning a whole into more parts results in smaller shares. This idea helps build students’ understanding of the density principle, emphasising that a quantity can be infinitely divided. Symbolically, students understand that fractions with larger denominators are divided into more, smaller parts.

In both levels, students are beginning to understand the relationship between the numerator and denominator, but they may still view fractions as simply composites of the numerator and denominator rather than as numerical values with magnitude (Hamdan & Gunderson, 2017; Rinne, Ye, & Jordan, 2017). This underscores the significance of transitioning to the measurement representation of fractions. In this phase, students recognise fractions as distances from zero on a number line, reinforcing and deepening their understanding of magnitude. Their grasp of fraction density deepens as they see that the interval between zero and one can be partitioned into an infinite number of fractional values. This understanding leads to recognising that equivalent fractions represent the same magnitude and position on the number line, allowing for ordering and comparison (Hamdan & Gunderson, 2017).

As their understanding becomes more sophisticated, students begin to view fractions as ratios and rates, and eventually as operators. At these phases of the progression, they integrate foundational fraction concepts with their emerging multiplicative reasoning to further develop their symbolic proportional reasoning skills. Their knowledge of equivalent fractions helps them see how quantities in a ratio vary together. As students work with scaling ratios, they lay the groundwork for understanding multiplication of fractions and, ultimately, division of fractions.

Text box 2: Frameworks for fraction understanding

In the Mathematics Curriculum Frameworks (ACARA, 2024), initial fraction understanding is introduced in the Foundational Level as students “represent practical situations involving equal sharing and grouping with physical and virtual materials and use counting or subitising strategies” (AC9MFN06) and continue in Year 1 as students mathematically model these situations (AC9M1N06). In Year 2, students “recognize and describe one-half as one of 2 equal parts of a whole and connect halves, quarters and eighths through repeated halving” (AC9M2N03) by using part-whole models and fair-sharing activities. Measurement attributes of fractions are introduced as students “use and represent halves, quarters, and eighths in relation to shapes, objects and events” (AC9M2M02) and are applied to length, weight, and capacity. In Year 3, students use the part-whole model and fair-sharing to “recognize and represent unit fractions including ½, 1/3, ¼, 1/5 and 1/10 and their multiples in different ways and combine fractions with the same denominator to complete the whole” (AC9M3N02).

Students’ development of fraction understanding continues in Year 4 as they “find equivalent representations of fractions using related denominators and make connections between fractions and decimal notation” (AC9M4N03). Also in Year 4, students are expected to locate and represent fractions on number lines (AC9M4N04). Year 5 represents a shift to deeper applications of number lines such as interpreting, comparing and ordering rational numbers on number lines (AC9M5N01, AC9M5N03) and modeling addition and subtraction of fractions (AC9M5N05). Fraction concepts and procedures continue to develop in Years 5-8 with deeper understandings of equivalence and application of operations. In Years 7-8, students begin working with fractions as ratios as they “recognize, represent and solve problems involving ratios” (AC9M7N08) and rates as they “recognize and use rates to solve problems involving the comparison of 2 related quantities of different units of measure” (AC9M8M05). These skills set the foundation for future application of rational number concepts and skills in the remainder of secondary school.

Text box 3: Problems using equivalent fractions

When students begin to scale ratios, problems can be designed to support using their knowledge of equivalent fractions to solve for an unknown quantity, x, in proportions expressed symbolically. The sample problems below include how teachers can show students that the ratios covary in a proportion. Additionally, it is important to note that providing problems where the variable is in different positions supports students not over relying on moving from left to right when solving problems.

What does it look like in the classroom?

Using learning progressions in the classroom typically occurs during the planning phases of instruction. Planning should include consideration of how students develop fraction concepts and skills within the grade level, and how these skills will contribute to future learning in advanced grade levels. Because the learning progression for fractions spans multiple grades, it is important that teachers fully understand how students develop and use their fraction understanding to ensure continuity across grades.

1.1 Use learning progressions flexibly to identify a starting point and make connections by using models

The learning progression for fraction proficiency should not be viewed as static where instruction sequentially moves through phases or levels. Instead, it serves as a resource to guide teachers’ instructional decision-making, including when and how to use the instructional models as shown in Figure 2. For example, as teachers introduce new fraction concepts, they might connect these concepts to the area model to reinforce foundational part-whole fraction concepts before quickly advancing to more complex levels. Relatedly, as teachers collect data about students’ fraction understanding, they can associate that information to the learning progression. These insights help teachers determine students’ starting point, rate of instruction needed to help them reach their goals, and the possibility of persistent misconceptions in their understanding. The flexibility to navigate different phases of the learning progression and the use of various instructional models give teachers the adaptability needed for effective instruction.

Figure 2

Models for understanding fraction concepts

Figure 3

Learning progression for fraction understanding and associated examples (progressing in complexity from left to right)

1.2 Work progressively to build knowledge of fraction understanding

The learning progression of fraction concepts shown in Figure 3 spans multiple years of instruction.

Often, early instruction starts with the part-whole model, helping students formalise their emerging fraction concepts. Teachers can design activities that build students’ understanding of the relationship between the numerator and the denominator and support their comparison of fraction magnitude. Composing and decomposing fractions into units lays the foundation for operations with fractions (Braithwaite et al., 2021). A key learning outcome in these initial phases of learning is comparing fractions with different numerators but the same denominator. Instruction should intentionally integrate concrete representations (e.g., counters or pattern blocks) and semi-concrete representations (e.g., pictorial representations of the concrete models) while explicitly linking these experiences to formal fraction concepts, including fraction names (e.g., one-half) and fraction vocabulary (e.g., numerator). Figure 4 shows a micro-progression that develops students’ understanding of a unit and partitioning units for comparison.

Figure 4

A micro-progression for understanding a unit and partitioning units for comparison.

Instruction should then transition students to understanding fractions as fair-shares or quotients, connecting this with their prior informal exposure to early fraction concepts like sharing. Teachers can design activities where students share a set of objects or a single object equally among a group, emphasising the importance of creating equal-sized sets or parts. Increasing the size of the group among which the object(s) is shared reinforces the concept that partitioning a whole into more parts results in smaller shares. Wilson et al., (2011) designed a series of tasks that gradually increased the number of objects shared among an increasingly larger number of groups, extending students’ understanding. Figure 4 shows a carefully crafted progression of problems to support student understanding of fair sharing by first recognising that students are more familiar with halving and then progressing into other fractions greater than 1 and finally fractions less than 1. Additionally, using concrete representations or manipulatives, such as counters or partitioned wholes like pizza, reinforces this concept. Explicitly linking these activities with abstract fraction notation helps students deepen their understanding. For example, when two friends share three cookies, the cookies are divided equally between the two. This can be represented as 3 2 or . Students may use different strategies to fair share (see Figure 5). Through this fair-sharing context, students begin to see the fraction bar as a representation of division.

Figure 5

Fair-sharing strategies when three cookies are shared equally by two friends

Figure 6

Fair sharing problem progression

Given the importance of the measurement model to students’ deep conceptual understanding of fractions, the number line is an essential instructional tool (Siegler et al, 2011) from which teachers can build on students’ knowledge of whole numbers to introduce and reinforce essential fraction concepts. When students model unit fractions end-to-end on a number line, the idea that fractions measure length becomes transparent, therefore reinforcing students’ conceptual understanding of magnitude (Braithwaite et al., 2021).

Interventions that integrate number lines into fraction instruction have significantly improved fraction outcomes for upper primary and lower secondary students with mathematics difficulty (Barbieri et al., 2020; Dyson et al., 2018; Fuchs et al., 2013). Bouck et al. (2023) offers a series of instructional activities incorporating number lines to teach fraction concepts for students with mathematics difficulty. Explicitly connecting fractions on the number line with previously introduced concrete representations (e.g., manipulatives) and semi-concrete representations helps students build on prior knowledge. Figure 7 in the next section gives a visual depiction of how this can work.

As students progress to lower secondary levels, understanding ratios and rates become a key instructional objective. Teachers can help students extend their fraction knowledge to think proportionally by connecting the part-whole and measurement models, both of which contribute foundational knowledge for proportional reasoning concepts like covariation. This knowledge lays the groundwork for operations with fractions, where students apply proportional reasoning to view multiplication as scaling an original value (either up or down) based on the ratio. To make sense of fraction operations, teachers can use semi-concrete representations like area models or number lines to illustrate the outcomes of fraction operations.

Text Box 4: Scaling 3 up by multiplying it by 3/2

A number line can be used to link to students’ existing understandings of operations with whole numbers and give meaning to operations with fractions.

(Adapted from Fuchs et. al., 2021)

1.3 Ensure students have mastered previous understandings of fractions

It is important to note that some students may have varying levels of prior knowledge as it relates to fraction concepts and skills. Students’ prior knowledge should be identified before beginning instruction on fraction concepts and skills. By identifying where along the learning progression students have demonstrated mastery, teachers can reinforce those concepts and skills before moving into new learning. For example, if the instructional unit focuses on adding fractions with unlike denominators but some students have not fully grasped a measurement understanding of fractions, these students may struggle to learn the new concepts. Teachers can use the learning progression to provide individualised instructional support, as needed.

Relevant teacher resources for Practice 1:

Bouck, E., Bouck, M., & Anderson, R. D. (2023). Teaching fractions to elementary students with learning disabilities using evidence-based practices. Intervention in School and Clinic, 1-6.
Siemon, D. (2003). Partitioning: The missing link in building fraction knowledge and confidence. The Australian Association of Mathematics Teachers, 59(3), 22-24.
Fraction circles, fraction tiles, and number lines manipulatives https://www.didax.com/searchresults.html?menu=math&subject=95&topic=77
Geoboard, counters, and pattern blocks virtual manipulatives https://www.didax.com/virtual-manipulatives.html
Intervention lessons on equivalent fractions, ratios/rates, and proportionality https://meadowscenter.org/resource/mstar-interventions/