# Levelling Strategy for Stage 3 Maths (Years 5–6) > Teach the levelling strategy in Stage 3 maths (Years 5-6). Practical worksheets, lessons, and tips aligned to the NSW Mathematics syllabus. ## Teaching the Levelling Strategy in Stage 3 Maths The levelling strategy — sometimes called the compensation strategy — is one of the most powerful mental calculation methods students meet in Stage 3 maths. By adjusting one number up and compensating with the matching adjustment on the other, students transform awkward additions and subtractions into calculations they can do in their head. For Year 5 and Year 6 teachers working through the current NSW Mathematics K–10 syllabus, it sits alongside jump strategies, split strategies, and constant difference as a core additive strategy students are expected to apply flexibly. ## Levelling Strategy Resources for Stage 3 _(Dynamic listing feed — browse at the page URL for live results.)_ ### What the Levelling Strategy Actually Does Levelling rests on a simple idea: if you change one number in an addition by +n, you must change the other by −n so the total stays the same. For example, 48 + 37 becomes 50 + 35 — adding 2 to 48 and subtracting 2 from 37 — and 50 + 35 is far easier to calculate mentally. The same principle applies to subtraction, though with a twist: in subtraction students add the *same* amount to both numbers (the constant-difference idea) rather than compensating in opposite directions. So 82 − 37 becomes 85 − 40, which evaluates to 45 with no regrouping at all. ### Why Stage 3 Is the Right Time Students are ready for levelling once they have solid fluency with two-digit addition and subtraction and understand place value deeply. By Years 5 and 6, most classes have already worked through the split strategy (partitioning into tens and ones) and the jump strategy (counting along an empty number line) in Stage 2. Levelling is a natural extension because it demands flexible thinking — students need to see that 48 and 50 are closely related, and that shifting between them doesn't change the structure of the calculation. That flexibility is one of the working-mathematically proficiencies the syllabus keeps asking teachers to develop. Teachers typically introduce levelling mid-Stage 3, after reviewing earlier additive strategies. It pairs especially well with larger numbers — 3-digit and 4-digit addition — where regrouping becomes tedious and students genuinely appreciate the shortcut. ### How to Introduce It in the Classroom Start with a worked example that feels obviously easier after levelling. Something like 98 + 47 works well because almost every student will spot that rounding 98 up to 100 makes the calculation near-automatic. Use an empty number line to show the "shift" visually: arrows moving one number up by 2 and the other down by 2 make the compensation physically obvious. From there, move to problems that aren't as friendly — 54 + 38, say — so students have to reason about which number to round and by how much. Ask "what if we made it 60 + something easier?" and let the class work through the adjustment together. Once they can do this mentally with two-digit numbers, extend into three-digit calculations (265 + 197 → 262 + 200, for instance) and into word problems so students apply the strategy in context. ### Subtraction: The Constant-Difference Twist The biggest stumbling block is subtraction. Students who have grasped levelling for addition often try to apply opposite compensation to subtraction — and get the wrong answer. Explicit teaching matters here. Show side-by-side examples: 48 + 37 versus 82 − 37. In the addition, one number goes up and the other comes down. In the subtraction, both move together — add 3 to both sides and 82 − 37 becomes 85 − 40. Number-line diagrams help enormously because students can *see* that the gap between the two values hasn't changed. ### Building Fluency with Structured Practice Dedicated worksheets and lesson sequences save hours of planning when you're introducing or reinforcing levelling. Look for tasks that build from simple two-digit compensation through to three-digit word problems, and pair any worksheet practice with a short daily mental-maths routine so the strategy stays sharp. Our guides on [addition and subtraction activities](/teacher-guides/addition-subtraction-activities), [place value activities](/teacher-guides/place-value-activities), and [maths warm-ups](/teacher-guides/maths-warm-ups) cover related strategies and routines you can weave into the same unit. For a broader look at structured maths programs that suit the Australian classroom, [EAST Maths](/teacher-guides/east-maths) is worth a read — its daily-review structure pairs naturally with additive strategy work in Stage 3. ## Addition and Subtraction Strategies for Year 5 and Year 6 _(Dynamic listing feed — browse at the page URL for live results.)_ ## Mental Maths Warm-Ups for Stage 3 _(Dynamic listing feed — browse at the page URL for live results.)_ ## Frequently Asked Questions ### What is the levelling strategy in maths? Levelling is a mental calculation strategy where students adjust one number up and compensate by adjusting the other by the same amount in the opposite direction (for addition) or the same direction (for subtraction). For instance, 48 + 37 becomes 50 + 35 — both equal 85, but the second calculation is far easier to hold in working memory. It is sometimes called the compensation strategy and is a core additive strategy in the NSW Mathematics syllabus. ### When should I teach the levelling strategy in Stage 3? Most teachers introduce levelling in Year 5, once students have confident fluency with two-digit addition and subtraction using the split and jump strategies from Stage 2. It is best taught after place value has been revisited and before students attempt larger multi-digit calculations. Introducing it mid-Stage 3 gives students time to practise across Year 5 and consolidate across Year 6, including in word-problem contexts where choosing an efficient strategy matters. ### How does levelling differ from the split and jump strategies? Split strategies partition numbers by place value (48 + 37 = 40 + 30 + 8 + 7). Jump strategies count on in chunks along a number line (48 + 30 = 78, then +7 = 85). Levelling instead reshapes the whole calculation into a friendlier one by shifting both numbers together. It is more efficient than split or jump when numbers are close to a multiple of ten, but less helpful when they are not — teaching all three gives students a flexible toolkit to choose from. ### Can the levelling strategy be used for subtraction? Yes, but with an important difference: in subtraction, students add the *same* amount to both numbers to keep the gap between them constant. So 82 − 37 becomes 85 − 40, which equals 45 with no regrouping. This is known as the constant-difference principle. Students often confuse this with addition levelling, so it is worth teaching the two side-by-side with clear number-line diagrams to show that in subtraction the gap never changes. ### Where can I find Stage 3 levelling strategy resources? The resources above are teacher-created worksheets, lesson sequences, and PowerPoint slides designed specifically for Year 5 and Year 6 classrooms in Australia. Most align to the NSW Mathematics syllabus and cover levelling alongside other additive strategies. You can also browse our [addition and subtraction activities guide](/teacher-guides/addition-subtraction-activities) for broader resources, or explore [maths warm-ups](/teacher-guides/maths-warm-ups) for daily retrieval practice that reinforces the strategy. --- Source: https://teachbuysell.com.au/teacher-guides/levelling-strategy-maths-stage-3 Marketplace: https://teachbuysell.com.au