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KS3 & KS4 Maths Curriculum Plan - Higher Tier | Oak National Academy
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KS3 & KS4 Maths curriculum plan Higher (KS4) Contents Our curriculum Threads Maths curriculum explainer Year 7 units Year 8 units Year 9 units Year 10 units Year 11 units Threads in maths Exported 04 September 2025 2 Our curriculum All of our curricula share the same set of principles that guide our curriculum design to ensure our curricula are high-quality. They are: Knowledge and vocabulary rich Lessons and units are knowledge and vocabulary rich. Pupils will build on what they already know to develop deep knowledge and apply this knowledge in the form of skills. Sequenced and coherent Careful sequencing and attention to building coherence via vertical threads so that pupils build on prior knowledge and make meaningful connections. Flexible Our flexible curriculum enables schools to tailor our content to their curriculum and context. Accessible Creating an accessible curriculum that addresses the needs of all pupils and meets accessibility guidelines and requirements. Diverse We prioritise creating a diverse curriculum by committing to diversity in teaching and teachers, and the language, texts and media we use, so all pupils feel positively represented. Evidence-informed We take an evidence-informed approach applying the science of learning and subjectspecific research. Exported 04 September 2025 3 Threads What are threads? We use threads to signpost groups of units that link to one another, that together build a common body of knowledge over time. We use the term thread, rather than vertical concepts, themes or big ideas, because it helps us bring to mind the visual concept of a thread weaving through the curriculum. How to use threads 1. Familiarise yourself with all of the threads relating to the subject 2. Identify the unit you will be delivering 3. Review the threads associated with the unit 4. Audit where pupils have and will learn about these threads in your existing curriculum sequence. 5. Ensure you understand how the thread relating to your new unit has been framed in prior and future units 6. Review how the thread works within the unit you will be delivering 7. Teach and iterate your framing of the thread within the unit and across your curriculum sequence Exported 04 September 2025 4 Threads in subject Algebra Geometry and Measure Number Probability Ratio and Proportion Statistics Exported 04 September 2025 5 Tools for using threads Online curriculum Our interactive tool enables you to visualise how threads are sequenced across our curriculum plans. Go to online curriculum Threads in this document The appendix displays the threads and their related units. Go to threads appendix Exported 04 September 2025 6 Maths curriculum explainer Aims and purpose What are the aims and purpose of our curriculum? This curriculum develops pupils’ understanding of mathematics over time so that they become competent and confident in identifying and performing the mathematics they need both at school and in their daily lives. We prepare pupils to become self-assured and resilient mathematicians by developing their ability to select the most suitable tools to solve problems across a range of topics and real-world scenarios. Oak curriculum principles What overarching curriculum principles inform the design of our curriculum? Knowledge and vocabulary rich This principle recognises the important role that knowledge, and vocabulary as a particularly important type of knowledge, plays in learning. We identify and map vocabulary across the curriculum, both in terms of the introduction of new vocabulary and the necessary repetition of vocabulary that has gone before. New vocabulary, called keywords, are signalled in bold in our lesson materials to indicate their importance. Our curriculum develops pupils' knowledge and understanding of mathematical concepts over time. For example, understanding of concepts such as ‘factor’ and ‘equation’ evolves with increasing complexity as pupils move through the key stages. Sequenced and coherent A careful and purposeful sequencing of our curriculum content underpins its design, ensuring that pupils are able to build on and make links with existing knowledge. At its simplest this means ensuring, for example, that pupils learn about the square and square root functions before meeting Pythagoras’ Theorem. Attention is paid to vertical coherence in the curriculum through the strategic mapping of mathematical concepts across the curriculum, allowing for their incremental development over time. Curriculum content is intentionally revisited, for example, a lesson on right-angled trigonometry may retrieve construction or circle theorem content, or a lesson on ratios will use familiar models and tools to explicitly link to prior learning. Evidence-informed Our evidence-informed approach enables the rigorous application of research outcomes, science of learning and impactful best practice both in education in general and at a subject specific level. For example, the design of our resources reflects findings from Sweller’s cognitive load theory and Mayer’s principles of multimedia learning whilst our lesson design draws on Rosenshine’s principles of instruction. We also draw on findings from research organisations such as the Education Endowment Foundation (EEF). At the subject level, our primary mathematics curriculum is inspired by the NCETM Curriculum Prioritisation materials to develop mastery of core concepts at an early age. Exported 04 September 2025 7 Flexible Our flexible approach enables schools to use our resources in a way that fits their context and meets the varying needs of teachers and their pupils. Our curriculum can be used in its entirety or units can be selected to complement existing curricula. Our resources are adaptable so that, for example, teachers can change the mathematical model used to teach a concept to align with their agreed department or school approach or adapt practice tasks to better reflect the prior knowledge of their pupils. At key stage 4 our curriculum aligns with all exam board specifications for GCSE Mathematics. Diverse Our commitment to breadth and diversity in content, language, texts and media can be seen in our choices of real world contexts, mathematics history and application of mathematics plus the use of a group of diverse school age characters. For example, we use real data sets when analysing charts to make discussions and conjectures meaningful and grounded in recognisable places, situations and events. Accessible Our curriculum is intentionally designed to facilitate high-quality teaching as a powerful lever to support pupils with SEND. Aligned with EEF guidance, our resources have a focus on clear explanations, modelling and frequent checks for understanding, with guided and independent practice. Lessons are chunked into learning cycles and redundant images and information are minimised to manage cognitive load. We have removed reference to year groups in our resources so that they can be used when pupils are ready, regardless of their age. Our resources are purposefully created to be accessible, for example by using accessible fonts, colours with good contrast, and captions in our videos. We have used Equatio’s equation editor to create digital, accessible written mathematics in our resources. Oak subject principles What subject specific principles inform the design of our curriculum? Pairing procedural knowledge with conceptual understanding. We introduce concepts and prompts to make pupils think hard about making sense of ideas, while also focusing on efficient procedural methods to ensure calculations can be completed easily and systematically. We often provide visual models to support understanding, then we remove scaffolding as ideas progress and foundation knowledge becomes secure, in order to aid development of mathematical fluency. Aligning with the Concrete Pictorial Abstract approach to mathematics teaching and learning. We incorporate consistent visual models to explain mathematical ideas, and draw upon existing knowledge directly through the models and tools used where underpinning concepts are the same as those taught previously. We make use of pictorial representations of familiar concrete manipulatives such as Dienes blocks, algebra tiles and double sided counters. Exported 04 September 2025 8 Use an agreed set of models and representations which bridge mathematical concepts. We have identified and used the smallest set of models and representations that underpin and support the understanding of the greatest number of mathematical concepts. When pupils meet familiar tools and approaches this signals explicit links between implicitly connected elements of mathematics. For example, ratio tables are used to calculate the dimensions of similar shapes, percentage changes, plotting coordinates and equivalent fractions which signposts the links between them. For maximum impact, these models and representations are shared by both our primary and secondary curricula. Use of variation theory in practice tasks and modelling. Modelling and practice makes use of variation to minimise the risk of pupils drawing incorrect inferences which can cause misconceptions to develop. For example, varying the orientation of shapes in geometry to ensure pupils understand that a horizontal base is not a ‘feature’ of a particular type of shape, or that the ‘base’ of a triangle when calculating the area is not confined to being a horizontal side. We also use minimally different examples in some tasks to draw attention to singular changes and how they affect mathematical models and calculations. National curriculum How does our curriculum reflect the aims & purpose of the national curriculum? There are three main aims of the national curriculum for mathematics: fluency, reasoning and problem solving. Our curriculum ensures that all pupils become fluent in the fundamentals of mathematics. For example, small steps when teaching the knowledge and understanding of counting, helps build fluency in simple addition and subtraction. Pupils are supported and encouraged to reason mathematically by justifying decisions when choosing whether something is true or false, providing the answer to a calculation or conjecturing when identifying patterns. Lastly, our curriculum ensures pupils can solve problems through lessons at the end of each unit that apply the knowledge they have learnt to new and sometimes unfamiliar contexts. Curriculum delivery What teaching time does our curriculum require? Our curricula for key stages 1-3 are designed for 36 weeks of curriculum time across the school year, leaving time for other activities both within and beyond the curriculum such as assessments or school trips. At key stage 4, year 10 also has approximately 36 weeks of curriculum time, but year 11 has only 24 weeks (around 2 terms) to recognise that schools will not be teaching new content in the run up to the GCSE exams. Our maths curriculum provides roughly a lesson a day for all key stages and year groups. Our key stage 1 lessons are designed to be taught in approximately 40 minutes, and 50 minutes to an hour in key stages 2, 3 and 4. We understand that exact time dedicated to mathematics can vary greatly between schools due to differences in curriculum planning, resource allocation and school-specific priorities. Therefore we fully expect and encourage teachers to adapt our curriculum and resources to best suit their needs and available curriculum time. This is particularly important where year groups may be streamed either through sets, or in key stage 4 Exported 04 September 2025 9 where pupils may be working both between and within the foundation and higher exam routes. For example, a year 10 unit will typically include a few lessons revisiting knowledge taught previously, and end with challenging problem solving activities. A teacher may decide that the unit could be compressed to spend less time on earlier content, or more time developing it. Curriculum coherence What are 'threads'? We use threads to signpost groups of units that link to one another, building a common body of knowledge over time. We use the term thread, rather than vertical concepts, themes, or big ideas, because it helps to bring to mind the visual concept of a thread weaving through the curriculum. Primary mathematics threads Number addition and subtraction fractions multiplication and division place value Algebra Statistics Probability Ratio and proportion Geometry and measure Secondary mathematics threads Number Algebra Statistics Probability Ratio and proportion Geometry and measure These threads are the distinct domains that appear in the national curriculum programme of study. These domains have been used as threads because in each domain knowledge is built over time, teachers of mathematics are very familiar with them and they are used by examination boards. In primary, much of the curriculum is focussed on developing knowledge and understanding of ‘number’. Therefore this thread has been further broken down into ‘addition and subtraction’, ‘fractions’, ‘multiplication and division’, and ‘place value’. Common threads across our primary and secondary curricula can enable more effective transition, helping pupils to bridge their knowledge and understanding from primary to secondary. Exported 04 September 2025 10 Recommendations from subject specific reports How does our curriculum address and enact recommendations from subject specific reports (e.g. EEF guidance reports & Ofsted Research Review)? Our curriculum addresses the EEF recommendations from 2018, which found a strong evidence base for the use of manipulatives and visual models to support mathematical ideas. Our slides typically draw upon visual representations of common manipulatives such as the Rekenrek, multilink cubes, and counters, and we promote the use of physical versions of such tools in our teacher tips. We focus on development of both procedural and conceptual mathematics by making sense of concepts whilst developing efficacy through the use of algorithms and practice. Subject-specific needs How does our curriculum deal with elements that arise from the specific needs of the subject? Does the Oak curriculum embrace a mastery approach? Our subject principles align to those of a mastery approach. The concrete-pictorial-abstract approach is evident throughout, particularly as concepts are first introduced. Towards key stage 4, abstraction and efficacy are more frequently relied upon, however this is always with the support of strong visual diagrams, tools and small steps to help pupils make sense of the mathematics being used. We carefully build mathematical ideas using real-world situations and recognisable narrative structures. We offer opportunities for pupils to think hard and discuss concepts and problems together or with the teacher. We design activities for younger pupils to explore ideas using manipulatives while also ensuring they recognise familiar tools used consistently when learning topics underpinned by the same mathematical concept. How are calculators introduced and used in the mathematics curriculum? We have embedded calculator use throughout the secondary curriculum. It is introduced after the understanding of what is happening is taught, and highlights that the calculator is a useful tool for speeding up lengthy or repeated calculations. We make use of calculator functions such as storing answers and displaying them in different formats to create unique activities that can only be enabled by digital technology. Exported 04 September 2025 11 Our curriculum partner Mathematics in Education and Industry (MEI) is an established charity and curriculum development body. Their primary aims are to raise the quality of maths education and promote the relevance of maths education to everyone. MEI are highly respected and are well connected with other quality assured organisations, including being a key partner in the NCETM, and are well known in schools for their excellent training and support programmes. Exported 04 September 2025 12 Year 7 units View interactive sequence online 1 2 3 Place value Properties of number: factors, multiples, squares and cubes Arithmetic procedures with integers and decimals 4 5 6 Expressions and equations Plotting coordinates Perimeter and area 7 8 9 Comparing and ordering fractions and decimals (positive and negative) Arithmetic procedures with fractions Understanding multiplicative relationships: fractions and ratio 10 Transformations Exported 04 September 2025 13 1. Place value Year 7 Go to unit resources Threads Lessons in unit 1. Checking understanding of place value in integers 2. Securing understanding of place value in integers 3. Deepening understanding of place value in integers 4. Exponential and fractional column headings 5. Place value in decimals 6. Checking understanding of place value in metric units 7. Securing understanding of place value in metric units 8. Place value in imperial units 9. Checking understanding of ordering and comparing numbers 10. Securing understanding of ordering and comparing numbers 11. Problem solving with place value Number Unit description In this unit pupils revisit, secure and develop their understanding of place value with integers, decimals, fractions, metric and imperial units. This knowledge is then extended to order and compare numbers of increasing complexity. Why this, why now? We begin year 7 with checking, securing and further development of place value in order to prepare adequately for further work on number in the following units for this term. Prior knowledge requirements Understand value of digits in large and decimal numbers Multiply and divide by powers of 10 Convert between standard and decimal forms Exported 04 September 2025 14 2. Properties of number: factors, multiples, squares and cubes Year 7 Go to unit resources Threads Lessons in unit 1. Checking understanding of factors, multiples, squares and cubes 2. Securing understanding of factors, multiples, squares and cubes 3. Listing multiples 4. Divisibility tests for 2 and 3 5. Divisibility tests for 6 and 9 6. Divisibility tests for 5 and 10 7. Divisibility tests for 4 and 8 8. Square and cube numbers 9. Square and cube roots 10. Power notation 11. Powers and roots using a calculator 12. Listing factors 13. Checking understanding of prime numbers 14. Expressing an integer as a product of its prime factors 15. Calculating integers from their prime factor expressions 16. Highest common factor 17. Lowest common multiple 18. HCF or LCM 19. Problem solving with factors, multiples, squares and cubes Number Unit description In this unit pupils develop their understanding of factors and multiples, then extend this knowledge to learn general divisibility tests for integers and develop strategies to determine the highest common factor and lowest common multiple of two or more integers. Why this, why now? This unit continues to develop proficiency in handling and recognising different types of numbers, as well as understanding their mathematical structure in order to be more efficient and fluent with mathematical operations in the following unit. Prior knowledge requirements Identify and list factors and multiples Recognise and calculate square and cube numbers Apply divisibility rules and prime factorisation Exported 04 September 2025 15 3. Arithmetic procedures with integers and decimals Year 7 Go to unit resources Threads Lessons in unit 1. Checking understanding of arithmetic procedures with integers and decimals 2. Securing understanding of arithmetic procedures with integers and decimals 3. Checking and securing understanding of negative numbers in context 4. Addition of positive and negative integers 5. Subtraction of positive and negative integers 6. Checking and securing understanding of written addition and subtraction strategies 7. Checking and securing understanding of multiplication and division 8. Multiplication and division where only one value is negative 9. Multiplication and division where two or more values are negative 10. Simplifying multiplication and division using multiples of 10 11. Multiplying with decimals 12. Dividing with decimals 13. Priority of operations with positive integers 14. Priority of operations with positive and negative integers and decimals 15. Using the associative, commutative and distributive laws together 16. Using your calculator efficiently 17. Problem solving with integers and decimals Number Unit description In this unit pupils develop their ability and efficacy with the four operations including more complicated and challenging calculations involving fractions, decimals and negative numbers. This leads into an exploration of the priority order of operations. Why this, why now? This unit builds on knowledge established in work on factors, multiples squares and cubes, building on the understanding that any positive integer can be expressed as a product of its factors. This skill is used here to explore multiplying and dividing with decimals. Prior knowledge requirements Perform all four operations with whole numbers Exported 04 September 2025 16 Add, subtract, multiply and divide decimals Apply integer rules (positive/negative) to calculations Exported 04 September 2025 17 4. Expressions and equations Year 7 Go to unit resources Threads Lessons in unit 1. Checking understanding of expressions and equations 2. Securing understanding of expressions and equations 3. Representing a generalised number 4. Algebraic notation 5. Algebraic terminology 6. Representing an unknown or variable 7. Generalised algebraic statements 8. Substituting particular values 9. Like terms 10. Simplifying by collecting like terms 11. Multiplying an expression by a constant 12. Multiplying an expression by a term 13. Multiplying and simplifying with multiple expressions 14. Simplifying before multiplying with multiple expressions 15. Highest common factor with algebraic terms 16. Factorising expressions 17. Problem solving with expressions and equations Algebra Unit description In this unit, pupils learn about generalisation and formal algebraic manipulation techniques such as substitution, collecting like terms and factorising. Why this, why now? This unit is a natural extension of the number work in the previous units. We are now seeking to generalise patterns and behaviours that were first seen in the number units taught before, and pulling in key skills such as factorisation and multiplication of brackets as part of algebraic manipulation. Prior knowledge requirements Simplify algebraic expressions Solve linear equations and substitute values Rearrange and manipulate formulas Exported 04 September 2025 18 5. Plotting coordinates Year 7 Go to unit resources Threads Lessons in unit 1. Checking understanding of plotting coordinates 2. Securing understanding of plotting coordinates 3. Plotting non-integer coordinates 4. Plotting coordinates generated from a rule 5. Plotting coordinates generated from a rule using technology 6. Plotting a relationship 7. Problem solving with plotting coordinates Algebra Unit description In this unit pupils revisit and further develop their understanding of the coordinate plane, and learn how to plot non-integer coordinates. Pupils then plot from an equation both by hand and by using technology. Why this, why now? Continuing from their recent work using algebra, this unit introduces plotting from algebraic equations and developing generalisations from a set of coordinate pairs. Prior knowledge requirements Understand and use axes in all four quadrants Plot and read coordinates accurately Recognise and describe geometric figures using coordinates Exported 04 September 2025 19 6. Perimeter and area Year 7 Go to unit resources Threads Lessons in unit 1. Checking understanding of perimeter and area 2. Securing understanding of perimeter and area 3. Finding the perimeter of polygons 4. Calculating missing lengths with perimeter of polygons 5. Perimeter with composite rectilinear shapes 6. Area of a triangle 7. Using the formula for the area of a triangle 8. Area of composite rectilinear shapes 9. Calculating missing side lengths from the area of composite rectilinear shapes 10. Area of a trapezium 11. Calculating missing side lengths from the area of a trapezium 12. Problem solving with perimeter and area Geometry and Measure Unit description In this unit pupils investigate how to calculate the area and perimeter of rectilinear shapes, and composite shapes using rectangles and triangles. They will also derive simple area formulae. Why this, why now? This unit requires some confidence in the use of formulae and simple algebra, hence it has been positioned after pupils have done some work on algebraic manipulation and number operations. This unit also prepares pupils for further work on geometry later in the year. Prior knowledge requirements Identify 2D shapes and their properties Use and apply standard formulas for area and perimeter Calculate with units of length and area Exported 04 September 2025 20 7. Comparing and ordering fractions and decimals (positive and negative) Year 7 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of fractions 2. The identity property of multiplication and division 3. Checking and securing converting improper fractions to mixed numbers 4. Checking and securing converting mixed numbers to improper fractions 5. Converting fractions to terminating decimals 6. Converting fractions to recurring decimals 7. Converting terminating decimals to fractions 8. Simplifying fractions 9. Converting fractions with technology 10. Limitations of technology in calculations 11. Ordering negative integers 12. Ordering decimals 13. Ordering fractions by converting 14. Ordering fractions by way of a common denominator 15. Ordering fractions in different ways 16. Ordering positive and negative fractions and decimals 17. Between numbers 18. Problem solving with fractions and decimals Number Unit description This unit develops understanding and manipulation of fractions, including conversion between fractions to terminating and recurring decimals. Pupils then learn strategies to order fractions of increasing complexity. Why this, why now? This unit builds upon work done in the 'arithmetic procedures with integers and decimals' unit, supporting further development of fluency in working with decimals as well as fractions. Prior knowledge requirements Recognise and convert between fractions and decimals Understand number lines with negative values Exported 04 September 2025 21 Compare values using place value and visual representations Exported 04 September 2025 22 8. Arithmetic procedures with fractions Year 7 Go to unit resources Threads Lessons in unit 1. Checking understanding of addition and subtraction with fractions 2. Securing understanding of addition and subtraction with fractions 3. Checking understanding of multiplication with fractions 4. Securing understanding of multiplication with fractions 5. Deepening understanding of multiplication with fractions 6. Checking and securing dividing a fraction by a whole number 7. Dividing a whole number by a fraction 8. Dividing a fraction by a fraction 9. Priority of operations with positive and negative integers, decimals and fractions 10. Problem solving with arithmetic procedures involving fractions Number Unit description This unit revisits and secures fraction operations and extends pupil understanding to division of whole numbers by fractions and division of fractions by fractions. Why this, why now? This unit continues from the previous one in deepening pupil understanding of fractions whilst also being explicitly linked to the 'arithmetic procedures with integers and decimals' unit. Prior knowledge requirements Add, subtract, multiply and divide fractions Simplify fractions and find common denominators Convert between improper fractions and mixed numbers Exported 04 September 2025 23 9. Understanding multiplicative relationships: fractions and ratio Year 7 Go to unit resources Threads Lessons in unit 1. Checking understanding of multiplicative relationships 2. Securing understanding of ratio as a multiplicative relationship 3. Multiplicative relationships in context 4. Expressing multiplicative relationships as ratios and fractions 5. Multiplicative relationships 6. Equivalent multiplicative relationships 7. Representing a multiplicative relationship 8. Ratio language and notation 9. Checking and securing finding a fraction of a given amount 10. Deepening understanding with fractions of a given amount 11. Expressing one number as a fraction of another 12. Dividing a quantity into a given ratio 13. Determining the whole 14. Determining the part 15. Describing exchange rates with ratio 16. Describing more conversions with ratio 17. Problem solving with fractions and ratios Number Ratio and Proportion Unit description This unit introduces the concept of multiplicative relationsihps, and connects fractions to the idea of ratios. Ratios are then explored in depth and used to solve contextual problems such as those involving exchange rates and general conversions. Why this, why now? This unit finishes our work with fractions in Year 7, relying upon pupil understanding of multiplication of fractions, and explicitly connecting fractions with ratios and general multiplicative relationships. Prior knowledge requirements Convert between fractions and decimals Use fractions to represent parts of a whole Apply ratios to compare and scale quantities Exported 04 September 2025 24 10. Transformations Year 7 Go to unit resources Threads Lessons in unit 1. Checking understanding of basic transformations 2. Introduction to translation 3. Describing a translation 4. Translating objects 5. Introduction to rotations 6. Describing a rotation's direction and size 7. Understanding the centre of rotation 8. Rotating objects 9. Introduction to reflections 10. Describing a reflection 11. Reflecting objects 12. Introduction to enlargements 13. Describing an enlargement 14. Enlarging objects 15. Transformed objects 16. Investigating transformations with Desmos 17. Investigating transformations with GeoGebra 18. Problem solving with transformations Geometry and Measure Unit description This unit introduces pupils to shape tranformations: enlargements, rotations, reflections and translations both by hand and with technology. Why this, why now? This unit utilises prior knowledge with ratios and percentages, applying general multiplicative relationships to the transformation of shapes, whilst also drawing upon recently developed knowledge of the coordinate plane. Prior knowledge requirements Identify and describe reflections, rotations, translations and enlargements Plot points and shapes in all four quadrants Use coordinates to represent movements Exported 04 September 2025 25 Year 8 units View interactive sequence online 1 2 3 Estimation and rounding Sequences Graphical representations of linear equations 4 5 6 Solving linear equations Understanding multiplicative relationships: percentages and proportionality Graphical representations of data 7 8 9 Numerical summaries of data Perimeter, area and volume Geometrical properties: polygons 10 Constructions Exported 04 September 2025 26 1. Estimation and rounding Year 8 Go to unit resources Threads Lessons in unit 1. Checking understanding of rounding 2. Securing understanding of rounding 3. Rounding to three decimal places 4. Rounding to any number of decimal places 5. Rounding integers to one significant figure 6. Rounding integers to significant figures 7. Rounding decimals to significant figures 8. Degrees of accuracy 9. Estimating numerical calculations 10. Checking by estimating 11. Truncating 12. Overestimating vs underestimating 13. Rounding errors 14. Inequality notation to express error 15. Using inequality notation for errors in calculations 16. Problem solving with estimation and rounding Number Unit description This unit helps pupils understand rounding to different decimal places, and significant figures. Pupils will also learn how to truncate numbers and understand the contexts in which these skills are useful. The unit ends will an exploration of rounding and inequality errors. Why this, why now? Students up to this point have been working with integer values and have had few opportunities to work explicitly on estimation. We are starting the year with something that is familiar for students and extend knowledge of estimation and rounding to include more work on rounding with decimals and significant figures. Prior knowledge requirements Round numbers to nearest 10, 100, 1000 Round decimals to 1 or 2 decimal places Estimate calculations using compatible numbers Exported 04 September 2025 27 2. Sequences Year 8 Go to unit resources Threads Lessons in unit 1. Checking understanding of sequences 2. Securing understanding of sequences 3. Formalising a sequence 4. Generating a sequence using a term-toterm rule 5. Generating a sequence using a positionto-term rule 6. Arithmetic sequences 7. Expressing an arithmetic sequence 8. Calculating any term 9. Finding the nth term 10. Representing sequences graphically 11. Justifying terms of a sequence 12. Problem solving with sequences Algebra Unit description In this unit we develop knowledge of sequences to be able to identify, determine, and continue arithmetic sequences. We finish the unit by looking at how sequences may be reprsented graphically. Why this, why now? In this unit pupils are developing their knowledge of plotting coordinates by exploring the idea that a set of points can satisfy a mathematical relationship. This unit sets the foundation for working with graphical representations of linear equations. Prior knowledge requirements Recognise and continue number patterns Understand position-to-term rules Use nth term to generate a sequence Exported 04 September 2025 28 3. Graphical representations of linear equations Year 8 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of plotting coordinates 2. Checking and securing understanding of plotting coordinates generated from a rule 3. Checking and securing understanding of plotting coordinates with technology 4. Checking and securing plotting a relationship 5. Features of linear relationships 6. Defining features of linear relationships 7. Positive rate of change from a graph 8. Negative rate of change from a graph 9. Rate of change from a coordinate pair 10. The intercept point 11. The equation of a straight line 12. Finding the equation of the line y = mx + c 13. Finding the equation of the line ay + bx +c=0 14. Using dynamic software to explore linear relationships 15. Problem solving with graphing linear relationships Algebra Unit description In this unti we develop understanding of linear relationships and explore the key features of a linear equation such as the gradient, intercept and determining an equation from coordinate pairs. Why this, why now? In this unit we continue to build on knowledge developed in the previous work on sequences and build confidence in how a linear sequence produces a linear relationship. We represent that graphically along with development of understanding of the equation of a line, positive, negative relationships and the idea that a linear sequence can produce an infinite set of points. Prior knowledge requirements Rearrange equations into y = mx + c form Use tables of values to plot lines Identify features of straight-line graphs Exported 04 September 2025 29 4. Solving linear equations Year 8 Go to unit resources Threads Lessons in unit 1. Checking understanding of algebraic notation 2. Securing understanding of equality 3. Different types of equations 4. Equality in an equation 5. Solution to an equation 6. Many equations, one solution 7. Solving simple linear equations with an additive step 8. Solving simple linear equations with a multiplicative step 9. Preparing to solve two step linear equations 10. Solving two step linear equations 11. Rearranging to solve linear equations 12. Solving complex linear equations 13. Brackets in equations 14. Solving linear equations where brackets are used 15. Solving complex linear equations involving brackets 16. Solving linear equations graphically using technology 17. Problem solving with linear equations Algebra Unit description In this unit pupils will learn how to find a value that satisfies a linear relationship when one value is known both with a single step operation, and multiple step operations. A variety of cases are explored including using brackets and rearranging. Why this, why now? Further to graphing linear sequences in the previous unit, pupils now learn to connect understanding with solving linear equations after demonstrating how for each point on a linear graph there is a unique solution to the equation of the line. Prior knowledge requirements Understand and apply inverse operations Simplify algebraic expressions Solve one-step and two-step equations Exported 04 September 2025 30 5. Understanding multiplicative relationships: percentages and proportionality Year 8 Go to unit resources Threads Lessons in unit 1. Checking understanding of percentages 2. Securing understanding of percentages 3. Multiplicative relationships presented graphically 4. Scaling diagrams for multiplicative relationships 5. Expressing one number as a percentage of another 6. Finding a percentage with a multiplier 7. Increase by a percentage 8. Decrease by a percentage 9. Finding the original amount after an increase 10. Finding the original amount after a decrease 11. Finding the percentage change 12. Multiplicative relationships and direct proportion 13. Graphing direct proportion 14. Direct proportion in context 15. Inverse proportion in context 16. Problem solving with percentages and proportionality Number Ratio and Proportion Unit description In this unit pupils explore multiplicative relationships with percentages, direct and inverse proportion. Why this, why now? Pupils build upon key stage 2 work with finding percentages of amounts, then extending their knowledge to percentage change, connecting to previous learning around decimals and fractions. Pupils then explore a more general exploration of multiplicative relationships. Prior knowledge requirements Convert between fractions, decimals, and percentages Understand ratio and scaling Solve problems involving direct proportion Exported 04 September 2025 31 6. Graphical representations of data Year 8 Go to unit resources Threads Lessons in unit 1. Checking understanding of pictograms and bar charts 2. Securing constructing pictograms 3. Securing constructing bar charts by hand 4. Constructing bar charts by utilising technology 5. Constructing pie charts 6. Constructing pie charts by utilising technology 7. Interpreting pie charts 8. Constructing scatter graphs 9. Constructing scatter graphs by utilising technology 10. Interpreting scatter graphs 11. Problem solving with graphical representations of data Statistics Unit description In this unit pupils will interpret and construct a range of representations of data including bar charts, pie charts and scatter graphs. Why this, why now? Pupils have prepared for this unit earlier in the year by looking at graphical representations of sequences. We build upon that knowledge to show that data can be represented in further ways as well as how to construct and interpret those representations. Prior knowledge requirements Draw and interpret bar charts, line graphs and pie charts Choose appropriate graphs for different types of data Understand and use frequency and grouped data Exported 04 September 2025 32 7. Numerical summaries of data Year 8 Go to unit resources Threads Lessons in unit 1. Checking understanding of the mean 2. Calculating the mean 3. Understanding the median 4. Calculating the median 5. Understanding the mode 6. Calculating the mode 7. Understanding and calculating the range 8. Summarising data 9. Changing a data point 10. Evaluating the range 11. Comparing statistical representations 12. Comparing summaries of data 13. Analysing different statistical representations 14. Correlation 15. Statistical problems - data collection 16. Statistical problems - statistical summaries 17. Statistical problems - data presentations 18. Statistical problems - drawing conclusions 19. Problem solving with numerical summaries of data Statistics Unit description In this unit pupils explore the concept of measures of central tendancy, developing understanding of different types of average and their relative benefits and drawbacks. We then investigate other summaries of data such as the range and data comparison techniques. Why this, why now? Building on work pupils have undertaken on averages in key stage 2, and linking to the previous unit where we summarised data graphically, pupils now explore representing data numerically. Pupils focus on the concept of measures of central tendency and range. We also begin to look at correlation as a relationship between data. Prior knowledge requirements Calculate mean, median, mode and range Organise data in frequency tables Interpret results in context Exported 04 September 2025 33 8. Perimeter, area and volume Year 8 Go to unit resources Threads Lessons in unit 1. Checking understanding of perimeter 2. Checking understanding of area 3. Multiplicative relationships in circles 4. Circumference of a circle 5. Area of a circle 6. Using the formula for the area of a circle 7. Area of composite shapes 8. Perimeter of composite shapes 9. Finding a length in composite shapes 10. Surface area of cuboids 11. Properties of prisms 12. Surface area of prisms 13. Surface area of cylinders 14. Volume of prisms 15. Volume of cylinders 16. Problem solving with perimeter, area and volume Geometry and Measure Number Unit description In this unit pupils extend their knowledge of shapes by exploring the properties of circles and composite shapes before developing understanding of 3-D shapes including surface area and volume. Why this, why now? This unit is an extension of the perimeter and area unit in year 7 (which focused on polygons), and extends this knowledge to focus on circles and circle based composite shapes then extending to look at the concept of prisms and volume. Prior knowledge requirements Use standard formulas for rectangles and cuboids Convert between units of measure Calculate dimensions of composite shapes Exported 04 September 2025 34 9. Geometrical properties: polygons Year 8 Go to unit resources Threads Lessons in unit 1. Checking understanding of angles from KS2 2. Securing understanding of angles from KS2 3. Formalising understanding of triangles from KS2 4. Formal angle notation 5. Corresponding angles 6. Alternate angles 7. Co-interior angles 8. Angles on parallel lines traversed by a straight line 9. The sum of the interior angles of any triangle 10. Using the sum of the interior angles of a triangle 11. Interior angles of a polygon 12. Deriving the sum of interior angles in multiple ways 13. Exterior angles of polygons 14. Interior and exterior angles of regular polygons 15. Missing angles 16. Problem solving with polygons Geometry and Measure Unit description In this unit pupils will investigate internal and external angles of polygons and angles made with a transveral and parallel lines. Pupils will develop their ability to formally prove properties of polygons to generalise. Why this, why now? This unit builds on knowledge developed investigating angles and continues work done in the previous unit investigating polygons. Here pupils will develop understanding of external and internal angles of polygons and traversals through parallel lines Prior knowledge requirements Identify and classify polygons by sides and angles Use angle rules (interior, exterior) Calculate sum of angles and solve problems using reasoning Exported 04 September 2025 35 10. Constructions Year 8 Go to unit resources Threads Lessons in unit 1. Checking compass skills 2. Securing the skill of using a pair of compasses 3. Understanding constructing a circle 4. Constructing triangles 5. Constructing rhombi 6. Diagonals of a rhombus 7. Bisecting an angle 8. Perpendicular bisector of a line segment 9. Perpendicular to a given line through a given point 10. Problem solving with constructions Geometry and Measure Unit description In this unit we develop skills in using a pair of compasses and ruler to construct various accurate shapes and angles including triangles, rhombi, perpendicular lines and angle bisectors. Why this, why now? After studying polygons and circles in depth in previous units, this year culminates in learning to mathematically construct these shapes using knowledge of the properties of triangles, quadrilaterals and circles in order to draw them accurately. Prior knowledge requirements Use ruler and compass for straight-edge and arcs Construct perpendiculars and bisectors Interpret geometric conditions in drawings Exported 04 September 2025 36 Year 9 units View interactive sequence online 1 2 3 Geometrical properties: similarity and Pythagoras' theorem Probability: possible outcomes Probability: theoretical probabilities 4 5 6 Non-linear relationships Expressions and formulae Trigonometry 7 8 9 Standard form Graphical representations Maths and the environment 10 11 12 Maths in the workplace Thinking critically with maths Calculator functionality Exported 04 September 2025 37 1. Geometrical properties: similarity and Pythagoras' theorem Year 9 Go to unit resources Threads Lessons in unit 1. Checking understanding of similarity 2. Checking understanding of congruence 3. Similarity in shapes 4. Congruence in shapes 5. Congruent, similar or neither 6. Rotational symmetry 7. Congruent triangles (SSS) 8. Congruent triangles (SAS) 9. Congruent triangles (ASA and AAS) 10. Congruent triangles (RHS) 11. Applying the criteria for congruence 12. Demonstrating Pythagoras' theorem 13. Further demonstrating of Pythagoras' theorem 14. Length of the hypotenuse 15. Length of a shorter side 16. Determining which side 17. Pythagoras' theorem in context 18. Problem solving with similarity and Pythagoras' theorem Geometry and Measure Unit description This unit explores the concepts of congruence and similarity, and ways to prove or disprove similarity between shapes. We then explore further properties of triangles with Pythagoras' Theorem. Why this, why now? This unit builds on knowledge developed in work on transformations, angles and properties of triangles. Pupils explored the effects of different transformations and whether the transformed shape was congruent or similar to the original shape. This knowledge is built upon and applied to new contexts as pupils formalise the criteria for determining congruence in triangles and study rotational symmetry. This unit also prepares pupils for learning about trigonometry to extend a right-angled triangle in the unit circle to any other rightangled triangle. Prior knowledge requirements Recognise right-angled triangles Apply Pythagoras' Theorem to find missing lengths Use ratios in similar shapes Exported 04 September 2025 38 2. Probability: possible outcomes Year 9 Go to unit resources Threads Lessons in unit 1. Equally likely outcomes 2. Non-equally likely outcomes 3. The scale of likelihoods 4. Experiments to determine how likely an outcome is 5. Using lists to display outcomes for two events 6. Using two-way tables to display outcomes for two events 7. Using an outcome tree to display outcomes for two events 8. Using a Venn diagram to display outcomes for two events 9. Comparing representations of outcomes for two events 10. Using lists to display outcomes for more than two events 11. Using an outcome tree to display outcomes for more than two events 12. Using a Venn diagram to display outcomes for more than two events 13. Comparing representations of outcomes for more than two events 14. Problem solving with possible outcomes Probability Unit description This unit introduces and explores the concept of liklihood as a relative measure, and demonstrates multiple ways to represent likelihood such as Venn diagrams, tree diagrams and two-way tables. Why this, why now? This unit is the first introduction to probability and likelihood. Pupils develop their understanding of how likely something is, looking at relative likelihoods and displaying outcomes but without formalising probability using measurable numerical values at this stage. Pupils explore different ways to display outcomes to gain a sense of what it means to say something is likely or unlikely in preparation for more calculative methods and theoretical probability in the next unit. Prior knowledge requirements Understand outcomes and sample spaces Use fractions and percentages to represent probability Recognise equally likely events and basic probability rules Exported 04 September 2025 39 3. Probability: theoretical probabilities Year 9 Go to unit resources Threads Lessons in unit 1. Checking listing possible outcomes 2. The probability scale 3. Calculating theoretical probabilities from lists (one event) 4. Calculating theoretical probabilities from a table (one event) 5. Calculating theoretical probabilities from probability tree diagrams (one event) 6. Calculating theoretical probabilities from Venn diagrams (one event) 7. Comparing multiple representations to calculate theoretical probabilities 8. Summing probabilities 9. Calculating theoretical probabilities from two-way tables (two events) 10. Calculating theoretical probabilities from Venn diagrams (two events) 11. Calculating theoretical probabilities from probability trees (two events) 12. Comparing multiple representations to calculate theoretical probabilities for combined events 13. Problem solving with theoretical probability Probability Unit description In this unit we build upon the concept of likelihood to work more mathematically with more measurable probability using fraction and decimal representations to both interpret and calculate. We revisit and develop ways to represent and compare probabilities. Why this, why now? Further to developing the basic ideas and foundations of probability, we move towards more abstract measures of likelihood using calculations to assign numerical values to probability. We then revisit the visual models of probability established in the previous unit through the lens of representing and utilising theoretical probability. Prior knowledge requirements Define probability as a ratio between favourable and possible outcomes Represent events using lists, tables or diagrams Calculate probabilities of single and combined events Exported 04 September 2025 40 4. Non-linear relationships Year 9 Go to unit resources Threads Lessons in unit 1. Checking understanding of arithmetic sequences 2. Securing understanding of arithmetic sequences 3. Features of geometric sequences 4. Recognising geometric sequences 5. Representing geometric sequences graphically 6. Features of special number sequences 7. Recognising special number sequences 8. Graphing special number sequences using technology 9. Extrapolating a sequence 10. Problem solving with non-linear relationships Algebra Unit description In this unit we explore geometric and special number sequences like the Fibonacci sequence. We develop strategies to recognise types of sequence and continue them. Why this, why now? This unit builds from the sequences unit in Year 8. We develop understanding of sequences further to look at geometric and other non-linear sequences and how they appear graphically. Prior knowledge requirements Recognise non-linear patterns in graphs and tables Understand simple quadratic and exponential relationships Plot and interpret curves on coordinate grids Exported 04 September 2025 41 5. Expressions and formulae Year 9 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of the distributive law with algebraic terms 2. Checking and securing solving linear equations 3. The product of two binomials 4. Difference of two squares 5. More complex binomial products 6. Additive relationships 7. Multiplicative relationships between terms 8. Changing the subject with simple formula 9. Changing the subject with more complex formula 10. Changing the subject to suit the context 11. Evaluating expressions with and without changing the subject 12. Problem solving with expressions and formulae Algebra Unit description This unit develops pupil understanding of formulae and how to rearrange them. Pupils will learn how to recognise and manipulate binomials and learn to recognise the difference of two squares. Why this, why now? This unit builds on solving linear equations from year 7 where pupils learnt to rearrange aan equation to find a specific value that satisfied the equation. In expressions and formulae, pupils use their understanding of rearrangement to change the subject of a formula. Pupils are then introduced binomial equations in preparation for trigonometry. Prior knowledge requirements Simplify algebraic expressions Use substitution in expressions and formulas Rearrange formulas involving one or more steps Exported 04 September 2025 42 6. Trigonometry Year 9 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of similar triangles 2. Checking and securing understanding of Pythagoras' theorem 3. The unit circle 4. Scaling the right-angled triangle from the unit circle 5. Sine and cosine ratios 6. Tangent ratio 7. Using the sine ratio 8. Using the cosine ratio 9. Using the tangent ratio 10. Choosing the right trigonometric ratio 11. Choosing an appropriate method for finding lengths of a triangle 12. Problem solving with trigonometry Geometry and Measure Ratio and Proportion Unit description In this unit pupils learn how to recognise the relationship between the unit circle and the trigonometric ratios of sine, cosine and tangent. Pupils then apply this knowledge to solve trigonometric problems. Why this, why now? Pupils have recently learned about geometrical properties of similarity and the Pythagorean Theorem. This knowledge is further developed to build on their understanding of congruence and similarity with right-angled triangles. In this unit, similarity is used to extend a right-angled triangle in the unit circle to any other rightangled triangle. Prior knowledge requirements Label sides in right-angled triangles (opposite, adjacent, hypotenuse) Use sine, cosine and tangent ratios Rearrange and solve trigonometric equations Exported 04 September 2025 43 7. Standard form Year 9 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of multiples of 10 2. Checking and further securing understanding of the commutative law 3. Multiples of 10 involving negative exponents 4. Writing large numbers in standard form 5. Writing small numbers in standard form 6. Ordering numbers in standard form 7. Problem solving with standard form Number Unit description In this unit pupils learn to recognise, interpret and write in standard form. Pupils then extend this knowledge so that they can order numbers written in standard form. Why this, why now? This unit builds from arithmetic procedures with integers and decimals. In the prior unit, pupils learnt how to factorise multiples of 10 in order to simplify calculations. This understanding is further developed in this unit as values are converted to meet the conditions for standard form. Prior knowledge requirements Understand place value and powers of 10 Convert between standard and ordinary notation Multiply and divide using powers of 10 Exported 04 September 2025 44 8. Graphical representations Year 9 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of non-linear sequences 2. Extending thinking about sequences 3. Exploring the shapes of graphs using technology 4. Equations and their graphs 5. Efficiently drawing linear graphs 6. Reading from graphs 7. Modelling with graphs 8. Graphically solving two linear graphs that intersect 9. Problem solving with graphical representations Algebra Unit description In this unit pupils draw, interpret and utilise linear graphs to solve problems. This knowledge is further extended to look at intersecting graphs. Why this, why now? This unit builds knowledge from previous work on non-linear relationships. In that unit, pupils considered geometric sequences and how they might be represented graphically. In this unit, pupils study the graphical representation to link features of the graph to its equation. Prior knowledge requirements Plot points and draw axes Interpret bar charts, line graphs, and scatter graphs Select appropriate graphs for different types of data Exported 04 September 2025 45 9. Maths and the environment Year 9 Go to unit resources Threads Lessons in unit No threads 1. Solar power 2. Making a journey 3. Considering a route 4. Understanding weather data 5. Predicting the weather 6. Studying climate change 7. Studying local climate change 8. Making cities greener 9. Designing a green space Unit description - Why this, why now? - Prior knowledge requirements Interpret real-world contexts using mathematical reasoning Use units and conversions appropriately Read and represent data using graphs and tables Exported 04 September 2025 46 10. Maths in the workplace Year 9 Go to unit resources Threads Lessons in unit No threads 1. Agricultural worker (animals) 2. Agricultural worker (crops) 3. Astrophysicist 4. Catering 5. Construction 6. Emergency response worker 7. Engineer 8. Event management 9. Graphic designer 10. Interior designer 11. Media - films and games 12. Medical professional 13. Operational researcher 14. Personal assistant 15. Programmer 16. Running a small business 17. Sales and marketing 18. Sports coaching Unit description - Why this, why now? - Prior knowledge requirements Read tables, charts, and schedules Perform calculations with money and units Interpret job-based and practical contexts using maths Exported 04 September 2025 47 11. Thinking critically with maths Year 9 Go to unit resources Threads Lessons in unit No threads 1. Misleading data 2. Understanding advertising 3. Elections 4. Voting systems 5. Checking a claim Unit description - Why this, why now? - Prior knowledge requirements Interpret and evaluate information logically Justify reasoning using numerical and graphical evidence Identify assumptions and question validity of arguments Exported 04 September 2025 48 12. Calculator functionality Year 9 Go to unit resources Threads Lessons in unit No threads 1. Using the fx-83/85GT CW for number 2. Using the fx-83/85GT CW for statistics 3. Using the fx-991CW for number and algebra 4. Using the fx-991CW for statistics 5. Using the fx-CG50 for number and algebra 6. Using the fx-CG50 for statistics Unit description This unit teaches how to use scientific calculators and expores their functionality Why this, why now? It is important to dedicate some time to understanding the functionality of modern scientific calculators so that they can be used appropriately. Prior knowledge requirements Perform basic operations accurately Use brackets, powers, roots and memory functions Interpret calculator display and rounding appropriately Exported 04 September 2025 49 Higher Year 10 units View interactive sequence online 1 2 3 Algebraic manipulation Simultaneous equations: 2 variables Percentages 4 5 6 Arithmetic procedures: index laws Standard form calculations Surds 7 8 9 Sampling Graphical representations of data: scatter graphs and time series Comparisons of numerical summaries of data 10 11 12 Rounding, estimation and bounds Ratio Linear graphs 13 14 15 Non-linear graphs 2D and 3D shape: compound shapes Angles 16 17 18 Further transformations Similarity Circle theorems Exported 04 September 2025 50 19 20 21 Plans and elevations Right-angled trigonometry Bearings Exported 04 September 2025 51 1. Algebraic manipulation Year 10 Go to unit resources Threads Lessons in unit 1. Further algebraic terminology 2. Checking and securing understanding of factorising 3. Checking and securing understanding of forming linear equations 4. Checking and securing understanding of solving and interpreting linear equations 5. Checking and securing understanding of changing the subject 6. Checking and securing understanding of the product of two binomials 7. The product of three binomials 8. Factorising a quadratic expression 9. Factorising using the difference of two squares 10. Factorising quadratics of the form ax^2 + bx + c 11. Solving quadratic equations by factorising 12. Solving quadratic equations by factorising where rearrangement is required 13. Solving quadratic equations by completing the square 14. Solving complex quadratic equations by completing the square 15. Solving quadratic equations by using the formula 16. Advanced problem solving with algebraic manipulation Algebra Unit description In algebraic manipulation, pupils use apply knowledge of the distributive law to find the product of two binomaials in order to factorise quadratics. Why this, why now? This unit is the foundation for a lot of the generalisation done in this year, and is placed at the start of the year accordingly. Prior knowledge requirements Collect like terms and use basic algebra Expand and factorise expressions Substitute values into algebraic formulas Exported 04 September 2025 52 2. Simultaneous equations: 2 variables Year 10 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of interpreting graphs 2. Forming simultaneous equations 3. Combining equations 4. Solving simultaneous equations by elimination from a context 5. Solving algebraic simultaneous equations by elimination 6. Solving more complex simultaneous equations by elimination 7. Solving simultaneous linear equations by substitution 8. Solving simultaneous linear equations graphically 9. Solving a quadratic and linear pair of simultaneous equations using elimination 10. Solving a quadratic and linear pair of simultaneous equations using substitution 11. Solving a quadratic and linear pair of simultaneous equations graphically 12. Solving simultaneous equations via any method 13. Problem solving with linear and quadratic simultaneous equations Algebra Unit description In this unit pupils will learn to solve a pair of simultaneous equations from different starting points and cases using a variety of strategies. Why this, why now? This unit builds from solving equations in Year 8 and develops those skills further. Prior knowledge requirements Solve linear equations in one variable Interpret solutions graphically Substitute values into expressions Exported 04 September 2025 53 3. Percentages Year 10 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of percentage increase 2. Checking and securing understanding of percentage decrease 3. Percentage profit and loss 4. Simple and compound interest 5. Simple interest calculations 6. Simple interest calculations with technology 7. Compound interest calculations 8. Compound interest calculations with technology 9. Calculating compound interest rates 10. Changing compound interest rates 11. Advanced problem solving with percentages Ratio and Proportion Unit description In this unit pupils will learn how to perform simple and compound interest calculations using percentages. Why this, why now? This unit builds from percentage change and because it utilises a formula it follows on from more work on algebra. Prior knowledge requirements Convert between fractions, decimals, and percentages Find percentages of amounts (including 50%, 25%, 10%) Use percentage increase/decrease in context Exported 04 September 2025 54 4. Arithmetic procedures: index laws Year 10 Go to unit resources Threads Lessons in unit 1. Converting any recurring decimal to a fraction 2. Checking and securing understanding of prime factorisation 3. Checking and securing understanding of LCM and HCF 4. Checking and securing understanding of roots and integer indices 5. The laws of indices - multiplication 6. The laws of indices - division 7. The laws of indices - raising a power to a power 8. The laws of indices - negative and zero exponents 9. The laws of indices - fractional exponents 10. Advanced problem solving with the laws of indices Number Unit description In this unit pupils learn how to manipulate indices and perform calculations without conversion by understanding index laws. Why this, why now? This unit builds on the index work covered in the previous unit to formalise laws around indices. Prior knowledge requirements Understand and apply powers and roots Use rules for multiplying and dividing powers Apply zero, negative and fractional indices Exported 04 September 2025 55 5. Standard form calculations Year 10 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of writing large numbers in standard form 2. Checking and securing understanding of writing small numbers in standard form 3. Adding numbers in standard form 4. Subtracting numbers in standard form 5. Multiplying numbers in standard form 6. Dividing numbers in standard form 7. Problem solving with standard form calculations Number Unit description In this unit pupils will learn how to add, subtract, multiply and divide numbers written in standard form. Why this, why now? This unit deepens pupil understanding of index laws to now cover standard form. Prior knowledge requirements Understand powers of 10 and place value Convert numbers to and from standard form Perform calculations using multiplication/division of powers of 10 Exported 04 September 2025 56 6. Surds Year 10 Go to unit resources Threads Lessons in unit 1. Accuracy of final answers 2. Identifying square factors to support simplifying surds 3. Simplifying surds 4. Addition with surds 5. Multiplication of surds 6. Applying the underlying structure of multiplication and division of surds 7. The distributive law with surds 8. The distributive law with two or more binomials 9. Rationalising a single term denominator 10. Rationalising a two term denominator 11. Solving equations with surds 12. Problem solving with surds Number Unit description In this unit pupils will learn how to recognise surds, handle them in calculations and rationalise fractions with surds as denominators. Why this, why now? This unit continues to build knowledge around the use of indices, looking deeper at fractional indices and surds in general. Prior knowledge requirements Understand square and square root notation Simplify square roots of integers Multiply and divide simple surds Exported 04 September 2025 57 7. Sampling Year 10 Go to unit resources Threads Lessons in unit 1. Checking understanding of statistical problems 2. The Statistical Enquiry Cycle 3. Types of data 4. Sampling methods 5. Stratified sampling 6. Capture/recapture sampling method 7. Sampling limitations 8. Data collection 9. Biased questioning 10. Advanced problem solving with sampling Statistics Unit description In this unit pupils will learn how to sample, and explore accuracy and limitations with various sampling strategies and data collection techniques. Why this, why now? This topic is placed here to benefit from interleaving and builds from prior learning around numerical summaries of data. Prior knowledge requirements Understand the concept of a population and sample Recognise bias and representativeness Select and justify methods of sampling Exported 04 September 2025 58 8. Graphical representations of data: scatter graphs and time series Year 10 Go to unit resources Threads Lessons in unit 1. Checking understanding of scatter graphs 2. Checking understanding of correlation 3. Estimating from scatter graphs 4. Interpolation versus extrapolation 5. Outliers in scatter graphs 6. Constructing time series graphs 7. Interpreting time series graphs 8. Problem solving with scatter graphs and time series Statistics Unit description In this unit pupils will learn how to interpret and extract data from scatter graphs and time series graphs. Why this, why now? This unit builds from data sampling to deepen understanding of the ways in which data can be interpreted and interrogated. Prior knowledge requirements Plot coordinates in all four quadrants Interpret trends and patterns in data Understand correlation and basic statistical language Exported 04 September 2025 59 9. Comparisons of numerical summaries of data Year 10 Go to unit resources Threads Lessons in unit 1. Checking understanding of summary statistics from a list 2. Checking understanding of summary statistics from a frequency table 3. Calculating summary statistics from a grouped frequency table 4. Calculating the mean from a grouped frequency table 5. Weighted means 6. Constructing stem and leaf diagrams 7. Calculating summary statistics from stem and leaf diagrams 8. Checking understanding of measures of central tendency 9. Comparing data sets in context 10. Statistical summaries using technology 11. Comparing various representations of data sets 12. Problem solving with comparisons of numerical data Statistics Unit description In this unit pupils will compare two different data sets and compare different measures of central tendancy when interpreting the data. Pupils will learn to interrogate frequency tables and stem and leaf diagrams both with and without technology. Why this, why now? This unit benefits from the preceding units on data collection and representations. It furthers pupil understanding of data representation and interrogation. Prior knowledge requirements Calculate mean, median, mode, and range Interpret and compare sets of data Understand the purpose of each statistical measure Exported 04 September 2025 60 10. Rounding, estimation and bounds Year 10 Go to unit resources Threads Lessons in unit 1. Upper and lower bounds 2. Upper and lower bounds in additive calculations 3. Upper and lower bounds in multiplicative calculations 4. Using upper and lower bounds practically 5. Advanced problem solving with rounding, estimation and bounds Number Unit description This unit explores the impact of upper and lower bounds on additive and multiplicative calculations. Why this, why now? This unit builds upon ideas around data accuracy and projection that are covered in prior data units this year. Prior knowledge requirements Round whole numbers and decimals appropriately Estimate answers using compatible numbers Understand upper and lower bounds in calculations Exported 04 September 2025 61 11. Ratio Year 10 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of simplifying and unitising ratios 2. Checking and securing understanding of equivalent ratios 3. Checking and securing understanding of sharing in a ratio 4. Checking and securing understanding of converting between ratios, percentages and fractions 5. Checking and securing understanding of real world ratios 6. Combining ratios 7. Changing ratios 8. Writing equations from ratios 9. Algebraic ratios 10. Problem solving with algebraic ratios Ratio and Proportion Unit description In this unit pupils will learn how to combine ratios, interpret algebraic ratios, and investigate quantity changes and their effect on ratios. Why this, why now? This unit builds on prior knowledge of simple ratios but deepens understanding by moving into new areas of practical application and generalisation. . Prior knowledge requirements Use language of ratio and proportion Divide quantities in a given ratio Scale values up or down using ratios Exported 04 September 2025 62 12. Linear graphs Year 10 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of drawing vertical and horizontal graphs 2. Checking and securing understanding of finding the equation of the line from the graph 3. Checking and securing understanding of finding the equation of the line from coordinates 4. Parallel linear graphs 5. Perpendicular linear graphs 6. Identifying perpendicular linear graphs 7. Parallel and perpendicular lines on coordinate axes 8. Ratios in line segments on coordinate axes 9. Checking and understanding graphs showing direct proportion 10. Graphs showing inverse proportion 11. Advanced problem solving with linear graphs Algebra Ratio and Proportion Unit description In this unit pupils consider equations that produce parallel or perpendicular graphs and how their equations relate to each other. Why this, why now? This unit requires strong algebraic skills and understanding of proof, as well as building upon prior knowledge on ratio to work with line segments. Prior knowledge requirements Plot coordinates in all four quadrants Understand gradient and y-intercept in y = mx + c Interpret real-life contexts with linear graphs Exported 04 September 2025 63 13. Non-linear graphs Year 10 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of drawing quadratic graphs 2. Key features of a quadratic graph 3. Drawing cubic graphs 4. Key features of a cubic graph 5. Drawing reciprocal graphs 6. Key features of a reciprocal graph 7. Drawing exponential graphs 8. Key features of an exponential graph 9. Drawing the graph for the equation of a circle 10. Advanced problem solving with nonlinear graphs Algebra Unit description In this unit graphical representations of nonlinear graphs are introduced and explored, and their key features identified. Why this, why now? This unit builds upon the preceding unit to incorporate non-linear graphs as well. Prior knowledge requirements Plot and interpret coordinates from equations Recognise linear and basic quadratic forms Understand symmetry and turning points Exported 04 September 2025 64 14. 2D and 3D shape: compound shapes Year 10 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of converting between metric and imperial measures 2. Checking and securing understanding of scales and conversion 3. Checking and securing understanding of perimeter for compound shapes 4. Checking and securing understanding of area for compound shapes 5. Perimeter and area in a contextual setting 6. Calculating arc length 7. Area of a sector 8. Area of compound shapes 9. Shapes within shapes 10. Equations from complex shapes 11. Shapes on coordinate grids 12. Problem solving with complex 2D shapes Geometry and Measure Unit description In this unit, knowledge of circles and polygons is drawn upon to find the arc length and area of a circle sector and areas of complex compound shapes. Why this, why now? This unit is a summation of KS3 work on shape, but extends into parts of a circle and more complicated compound shapes. Prior knowledge requirements Identify and name standard 2D and 3D shapes Calculate area, perimeter, and volume of standard shapes Break down complex shapes into known components Exported 04 September 2025 65 15. Angles Year 10 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of advanced angle facts 2. Checking and securing understanding on chains of reasoning with angle facts 3. Checking and securing understanding of polygons 4. Checking and securing understanding of interior angles 5. Forming equations with angles 6. Problem solving with angles Geometry and Measure Unit description In this unit pupils use their knowledge of corresponding, alternate and co-interior angles to reason through and solve more complicated problems. Why this, why now? This unit builds upon the preceding unit on shape and develops fluency of understanding of angles. Prior knowledge requirements Identify types of angles (acute, obtuse, right, reflex) Understand angle facts (e.g. angles on a line, around a point) Use a protractor to measure and draw angles Exported 04 September 2025 66 16. Further transformations Year 10 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of congruence and similarity 2. Checking and securing understanding of rotation 3. Checking and securing understanding of translation 4. Checking and securing understanding of reflection 5. Checking and securing understanding of enlargement with positive integer scale factors 6. Checking and securing understanding of enlargement with positive fractional scale factors 7. Enlargement using a negative scale factor 8. Describing a negative enlargement 9. Multiple transformations 10. Identifying multiple transformations 11. Advanced problem solving with further transformations Geometry and Measure Unit description In this unit pupils apply their knowledge of transformations to explore negative enlargement factors and the application of multiple transformations. Why this, why now? This unit extends knowledge of transformations with combinations of transformations. It purposefully follows extended work on ratios as this is a key skill in this unit. Prior knowledge requirements Identify translations, reflections and rotations Use vector notation for translations Describe transformations using appropriate language and coordinates Exported 04 September 2025 67 17. Similarity Year 10 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of direct proportion in context 2. The effect of enlargement on the perimeter of a shape 3. The effect of enlargement on the area of a shape 4. Using the scale factor for enlarging an area 5. The effect of enlargement on the volume of a 3D shape 6. Using the scale factor for enlarging a volume 7. Checking and securing understanding of congruent triangles (SSS) 8. Checking and securing understanding of congruent triangles (SAS) 9. Checking and securing understanding of congruent triangles (ASA) 10. Checking and securing understanding of congruent triangles (RHS) 11. Problem solving with advanced similarity knowledge Geometry and Measure Ratio and Proportion Unit description In this unit, pupils investigate the effect of an enlargement on the perimeter and area of a 2-D shape and the volume of a 3-D shape. Why this, why now? This unit builds upon work completed on shape, ratio and transformations. Prior knowledge requirements Recognise congruent shapes Understand scale factors and enlargement Use ratio to compare lengths, areas or volumes Exported 04 September 2025 68 18. Circle theorems Year 10 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of the parts of a circle 2. The angle at the centre of the circle is twice the angle at any point on the circumference 3. The angle in a semicircle is a right angle 4. The perpendicular from the centre of a circle to a chord bisects the chord 5. The tangent at any point on a circle is perpendicular to the radius at that point 6. The angles in the same segment are equal 7. The alternate segment theorem 8. The opposite angles of a cyclic quadrilateral sum to 180° 9. The tangents from an external point are equal in length 10. Identifying which circle theorem to use 11. Problem solving with circle theorems Algebra Geometry and Measure Unit description In this unit, pupils will use their developed mathematical reasoning skills to derive and use various circle theorems. Why this, why now? This is an advanced unit investigating more complex properties of circles, and as such requires in depth knowledge and understanding of shapes, shape properties, proof, angles and ratios. Prior knowledge requirements Identify parts of a circle (radius, diameter, chord, tangent) Recognise angle facts in triangles and quadrilaterals Apply geometric reasoning and proof techniques Exported 04 September 2025 69 19. Plans and elevations Year 10 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of accurate drawings 2. Representing 3D shapes in 2D 3. Drawing the plan and elevations of a solid 4. Drawing the solid from the plan and elevations 5. Problem solving with plans and elevations Geometry and Measure Unit description In this unit, pupils will be considering a 3-D shape from different viewpoints in order to draw the side and front elevations as well as the plan view. Why this, why now? This unit follows on from transformations and further develops spatial awareness. Prior knowledge requirements Identify 2D shapes and 3D solids Visualise 3D objects from 2D views Draw front, side, and top elevations Exported 04 September 2025 70 20. Right-angled trigonometry Year 10 Go to unit resources Threads Lessons in unit 1. Checking and further securing understanding of Pythagoras' theorem 2. Using Pythagoras' theorem to justify a right-angled triangle 3. Calculating the length of a line segment 4. Checking and securing understanding of the unit circle 5. Checking and securing understanding of sine ratio problems 6. Checking and securing understanding of cosine problems 7. Checking and securing understanding of tangent ratio problems 8. Calculate trigonometric ratios for 30° and 60° 9. Calculate trigonometric ratios for 0°, 45° and 90° 10. Applying trigonometric ratios in context 11. Applying Pythagoras' theorem in 3D 12. Applying trigonometric ratios in 3D 13. Advanced problem solving with rightangled trigonometry Geometry and Measure Unit description In this unit, pupils are introduced to a variety of situations where trigonometric ratios are required, such as 3-D problems and problems of elevation or depression. Why this, why now? This unit requires good understanding of ratios, trigonometric ratios and manipulation of formulae, as such it is positoned after several units revisiting and building upon these key skills. Prior knowledge requirements Identify opposite, adjacent and hypotenuse Use Pythagoras' Theorem Understand ratios in similar triangles Exported 04 September 2025 71 21. Bearings Year 10 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of scaled drawings 2. Checking and securing understanding of drawing accurate scaled diagrams 3. Following a bearing 4. Finding a bearing 5. Reverse bearings 6. Problem solving with bearings Geometry and Measure Unit description In this unit, pupils apply their knowledge of angles in order to calculate bearings and solve angle problems within the context of bearings. Why this, why now? This unit requires trigonometry, spatial awareness and angle facts to be able to calculate bearings and reverse bearings. As such it is positioned after those units of work. Prior knowledge requirements Measure angles accurately using a protractor Use a compass and draw angles from North Apply knowledge of angles on a straight line and at a point Exported 04 September 2025 72 Higher Year 11 units View interactive sequence online 1 2 3 Algebraic fractions Non right-angled trigonometry 2D and 3D shape: surface area and volume (pyramids, spheres and cones) 4 5 6 Conditional probability Compound measures Real-life graphs 7 8 9 Direct and inverse proportion Functions and proof Further sequences 10 11 12 Iteration Graphical representations of data: cumulative frequency and histograms Inequalities 13 14 15 Vectors Loci and construction Transformations of graphs Exported 04 September 2025 73 1. Algebraic fractions Year 11 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of solving with simple algebraic fractions 2. Simplifying algebraic fractions 3. Operations with algebraic fractions 4. Solving equations with algebraic fractions 5. Checking and securing understanding of changing the subject with simple algebraic fractions 6. Changing the subject with multiple algebraic fractions 7. Changing the subject where the variable appears in multiple terms 8. Problem solving with advanced algebraic fractions Algebra Unit description In this unit, pupils apply skills in manupulating and solving various equations and formulae to algebraic fractions in order to change the subject and manipulate them. Why this, why now? In this unit we are building on a solid foundation of number and algebra skills to extend into algebraic fractions which require strong skills in algebraic manipulation. Prior knowledge requirements Simplify algebraic expressions Apply fraction rules to algebraic terms Factor and cancel common algebraic factors Exported 04 September 2025 74 2. Non right-angled trigonometry Year 11 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of trigonometric ratios 2. Drawing the sine and cosine graphs 3. Drawing the tangent graph 4. Interpreting the trigonometric graphs 5. The area of any triangle 6. Calculating the area of any triangle when the height is not known 7. The sine rule 8. The cosine rule 9. Using the sine and cosine rules 10. Considering the appropriate trigonometric rule 11. Problem solving with non right-angled trigonometry Algebra Geometry and Measure Unit description In this unit, pupils explore how to apply knowledge in trigonometry to non rightangled triangles. Why this, why now? This unit continues work that pupils completed at the end of Year 10, furthering investigation into trigonometry to incorporate non right-angled triangles. Prior knowledge requirements Use the sine, cosine and tangent ratios in right-angled triangles Apply Pythagoras' Theorem Interpret the sine and cosine rules for any triangle Exported 04 September 2025 75 3. 2D and 3D shape: surface area and volume (pyramids, spheres and cones) Year 11 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of nets of solids 2. Checking and securing understanding of volume of prisms 3. Checking and securing understanding of surface area of cuboids 4. Checking and securing understanding of surface area of other prisms 5. Checking and securing understanding of volume of a cylinder 6. Checking and securing understanding of surface area of a cylinder 7. The surface area of a pyramid 8. The volume of a pyramid 9. The surface area of a sphere 10. The volume of a sphere 11. The surface area of a cone 12. The volume of a cone 13. Surface area of composite solids 14. Volume of composite solids 15. Volume of a frustum of a cone 16. Surface area of a frustum of a cone 17. Forming equations involving complex shape calculations 18. Advanced problem solving with further surface area and volume Geometry and Measure Unit description In this unit, pupils will further develop their understanding of shapes by considering the surface area and volume of pyramids, spheres and cones. Why this, why now? This unit continues work on area and volume from the Year 10, introducing more complicated shapes including pyramids, spheres and cones. Prior knowledge requirements Identify and name 2D and 3D shapes Recall and use area and volume formulas for simple solids Apply formulas for curved surfaces and composite shapes Exported 04 September 2025 76 4. Conditional probability Year 11 Go to unit resources Threads Lessons in unit 1. Checking and securing displaying outcomes 2. Checking and securing exhaustive events 3. Probabilities involving algebra 4. Frequency trees 5. Checking and securing calculating probabilities from tables 6. Checking and securing calculating probabilities from diagrams 7. Experimental probability 8. Experimental vs theoretical probability 9. Set notation 10. Conditional probability in a two-way table 11. Conditional probability in a Venn diagram 12. Conditional probability in a tree diagram 13. Algebra in tree and Venn diagrams 14. Constructing three event Venn diagrams 15. Probabilities in three event Venn diagrams 16. Comparing multiple representations to calculate conditional probabilities 17. Combinations 18. Advanced problem solving with conditional probability Probability Unit description In this unit, pupils use their knowledge of calculating theoretical probabilities and extend it to calculate conditional probabilities. Why this, why now? This unit is placed here to assist interleaving, and draws upon prior knowledge from the unit 'Probability: theoretical probabilities' in Year 9 moving into more complex models of probability. Prior knowledge requirements Interpret probability using tables and tree diagrams Understand dependent vs independent events Use multiplication and addition rules in probability Exported 04 September 2025 77 5. Compound measures Year 11 Go to unit resources Threads Lessons in unit 1. Checking and further securing understanding of direct proportion in context 2. Compound measures for speed 3. Compound measures for density 4. Compound measures for pressure 5. Converting between metric speed measures 6. Converting between metric and imperial speed measures 7. Converting between other compound measures 8. Combining speeds 9. Combining densities 10. Advanced problem solving with compound measures Ratio and Proportion Unit description In this unit, pupils explore the multiplicative relationship between different compound meaures and units such as speed, rates of pay, density and pressure. Why this, why now? This unit builds from knowledge developed from work in ratio and conversion in Year 10. Prior knowledge requirements Use formulas involving speed, density, and pressure Convert between units of rate (e.g. km/h, m/s) Substitute into formulas and rearrange if necessary Exported 04 September 2025 78 6. Real-life graphs Year 11 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of reading from context-based graphs 2. Checking and securing understanding of drawing distance-time graphs 3. Distance-time graphs 4. Speed-time graphs 5. Non-linear distance-time graphs 6. Interpreting and drawing real-life graphs 7. Interpreting and drawing more real-life graphs 8. Calculating the rate of change 9. Estimating the gradient of a curve 10. Improving the estimate of the gradient of a curve 11. Finding the equation of a radius of a circle 12. Finding the equation of the tangent to a circle 13. Calculating journeys from linear speedtime graphs 14. Estimating journeys from non-linear graphs 15. Efficiently estimating journeys from nonlinear graphs 16. Advanced problem solving with real-life graphs Algebra Ratio and Proportion Unit description In this unit pupils expand upon knowledge developed in the linear graphs unit. Pupils are introduced to rates of change and the gradient of the tangent as a way of estimating the gradient of a curve. Why this, why now? In the previous unit, pupils looked at compound measures liike speed, and this work is further developed to look at speed distance time graphs, and links features of graphs to practical interpretation. Prior knowledge requirements Interpret linear graphs and trends Understand units and labels in context (e.g. distance/time) Use graphs to describe rates and changes Exported 04 September 2025 79 7. Direct and inverse proportion Year 11 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of direct proportion graphs 2. Checking and securing understanding of inverse proportion graphs 3. Abstract direct proportion 4. Finding the constant of proportionality for direct proportion 5. Finding the constant of proportionality for directly proportional relationships 6. Abstract inverse proportion 7. Finding the constant of proportionality for inverse proportion 8. Proportion modelled algebraically 9. Problem solving with direct and inverse proportion Ratio and Proportion Unit description In this unit, pupils learn how to represent direct and inverse proportion algebraically as an extension of work done in the linear graphs unit. Why this, why now? In this unit we continue work from linear graphs, and link to the previous unit through interpreting graphs which is utilised here when discussing direct and inverse proportion. Prior knowledge requirements Understand ratios and scaling Use the unitary method to solve proportional problems Identify and apply proportional relationships Exported 04 September 2025 80 8. Functions and proof Year 11 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of functions 2. Defining function notation 3. Finding the inverse of a function 4. Writing composite functions 5. Solving equations involving functions 6. Solving equations involving composite functions 7. General algebraic forms for specific number properties 8. Making conjectures about patterns and relationships 9. Proving or disproving a statement 10. Writing a generalised statement about specific number properties 11. Writing a proof 12. Logical arguments 13. Multiple approaches to logical arguments 14. Problem solving with functions and proof Algebra Unit description In this unit pupils will further develop their understanding of algebraic notation and graphs by learning about functions, their inverses and composite functions. Why this, why now? This unit formalises what a function is, and proof (including strategies to develop a proof). It links with work done on algebraic fractions earlier in the year. Prior knowledge requirements Understand mappings from inputs to outputs Use substitution in algebraic expressions Construct logical chains of reasoning using algebra Exported 04 September 2025 81 9. Further sequences Year 11 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of special number sequences 2. Fibonacci and alternating sequences 3. Checking and securing rules for generating arithmetic sequences 4. Identifying values in an arithmetic sequence 5. Reasoning about values in an arithmetic sequence 6. Conditions in arithmetic sequences 7. Arithmetic sequences and their graphs 8. Introducing quadratic sequences 9. Quadratic sequences 10. Checking and securing understanding of geometric sequences 11. Sequence notation 12. Advanced problem solving with further sequences Algebra Unit description In this unit, pupils consider different types of sequences such as Fibonacci and oscillating sequences. They then consolidate their knowledge of different types of sequences by solving contextual problems. Why this, why now? This unit builds knowledge of all types of sequences covered so far, and links explicitly to theoretical problems and graphical representations. Prior knowledge requirements Generate terms from nth-term expressions Identify linear, quadratic and geometric sequences Use recursive rules to build sequences Exported 04 September 2025 82 10. Iteration Year 11 Go to unit resources Threads Lessons in unit In this unit, pupils continue to explore composite functions and develop understanding of iteration, building on their work on functions and proof. 1. Checking and securing understanding of compound interest calculations 2. Building on composite functions 3. Evaluating iterative formulas 4. Approximating solutions to equations 5. Signs of a solution 6. Problem solving with iteration Why this, why now? Prior knowledge requirements This unit builds on function notation and compound functions to more efficiently represent and understand repeated applications. Algebra Unit description Understand function machines and input-output Substitute into simple expressions Recognise convergence in repeated processes Exported 04 September 2025 83 11. Graphical representations of data: cumulative frequency and histograms Year 11 Go to unit resources Threads Lessons in unit 1. Constructing a cumulative frequency graph 2. Interpreting a cumulative frequency graph 3. Constructing box plots 4. Comparing box plots 5. Interquartile range 6. Histograms with equal bar width 7. Histograms with unequal bar width 8. Moving between tables and histograms 9. Summary statistics from histograms 10. Constructing histograms and box plots using technology 11. Problem solving with cumulative frequency and histograms Statistics Unit description In this unit, pupils consider cumulative frequency graphs and histograms, and compare these with other known graphical representations. Why this, why now? This unit continues work on representing and interpreting data and incorporates knowledge developed in Year 10 on comparisons of data. Here we also develop the use of technology to better understand and interrogate data. Prior knowledge requirements Interpret grouped data tables Plot and interpret frequency and cumulative frequency graphs Understand class intervals and scale in histograms Exported 04 September 2025 84 12. Inequalities Year 11 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of simultaneous equations 2. Non-solutions to simultaneous linear equations 3. Inequalities on number lines 4. Solving simple linear inequalities 5. Solving more complicated linear inequalities 6. Linear inequalities in context 7. A single solution set 8. Solution set notation 9. Solving a linear inequality graphically 10. Solving a set of linear inequalities graphically 11. Relating graphical solutions to algebraic solutions for inequalities 12. Solving quadratic inequalities in one variable graphically 13. Solving quadratic inequalities algebraically 14. Advanced problem solving with linear inequalities Algebra Unit description In this unit, pupils extend their understanding of inequalities and consider a range of contextual inequalities and ways to find and represent their solutions. Why this, why now? This unit requires strong knowledge of number, manipulation of number, and number generalisation through algebraic skills. Here we further develop that understanding and investigate similar themes through inequalities rather than equations. Prior knowledge requirements Solve linear equations Represent inequalities on number lines Interpret inequality symbols and solutions Exported 04 September 2025 85 13. Vectors Year 11 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of translations 2. Column vectors 3. Parallel vectors 4. Addition with vectors 5. Subtraction with vectors 6. Multiplication with vectors 7. Fluency in arithmetic procedures with vectors 8. Algebraic vector notation 9. Parallel vectors in algebraic vector notation 10. The sum and difference with algebraic vector notation 11. Fluency in arithmetic procedures with algebraic vector notation 12. Calculating the magnitude of a vector 13. Dividing vectors into ratios 14. Geometric proofs with vectors 15. Advanced problem solving with vectors Geometry and Measure Unit description In this unit, pupil understanding of vectors is deepened with pupils exploring column vector notation and arithmetic procedures. Why this, why now? This unit requires confidence in different notation and types of notation as well as strong geometric reasoning and number skills. As such it is placed here as units covering those skills have been completed. Prior knowledge requirements Understand direction and magnitude Add and subtract vectors using diagrams or components Represent vectors algebraically in 2D Exported 04 September 2025 86 14. Loci and construction Year 11 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of constructing the perpendicular bisector of a line segment 2. Checking and securing understanding of constructing a perpendicular to a given line through a point 3. Checking and securing understanding of bisecting an angle 4. Constructing angles of 90° and 45° 5. Constructing a triangle given three side lengths using compasses 6. Constructing a triangle given two side lengths and the angle between them using a compass 7. Constructing a triangle given two angles and the side length between them 8. Constructing a right-angled triangle given the length of the hypotenuse and one other side length 9. Constructing a triangle given two side lengths and an angle not between them 10. Constructing loci 11. Applying constructions to loci problems 12. Solving loci problems in context 13. Advanced problem solving with loci and constructions Geometry and Measure Unit description In this unit, pupils construct triangles and construct diagrams following specific restrictions using their knowledge of loci and their work on constructions. Why this, why now? This unit follows from vectors where pupils revisited and enhanced their understanding of shape and space. We link that knowledge to this unit as well as building from proof and trigonometry to construct accurate and specific shapes and diagrams. Prior knowledge requirements Use compass and straightedge accurately Understand perpendicular and angle bisectors Apply basic properties of geometric figures Exported 04 September 2025 87 15. Transformations of graphs Year 11 Go to unit resources Threads Lessons in unit 1. Checking and securing understanding of function notation 2. Checking and securing understanding of moving between function notation and the definition 3. Transforming graphs: y = f(x) + a 4. Transforming graphs: y = f(x + a) 5. Transforming graphs: y = −f(x) 6. Transforming graphs: y = f(−x) 7. Transforming graphs: y = af(x) 8. Transforming graphs: y = f(ax) 9. Transforming graphs: combinations of transformations 10. Problem solving with graph transformations Algebra Unit description In this unit pupils learn how to perform transformations on functions both algebraically and visually. Why this, why now? This unit explores the structure of transforming graphs and as such it is positioned after function notation which is essential knowledge building towards this unit. Prior knowledge requirements Understand horizontal and vertical shifts Know equations of standard graphs (e.g., y = x_, y = √x) Interpret effect of operations on graph shape and position Exported 04 September 2025 88 Threads in maths See how to use threads Algebra Geometry and Measure Number Probability Ratio and Proportion Statistics Exported 04 September 2025 89 Thread, 'Algebra' Year 7 Unit 4, 'Expressions and equations' Unit 5, 'Plotting coordinates' Year 8 Unit 2, 'Sequences' Unit 3, 'Graphical representations of linear equations' Unit 4, 'Solving linear equations' Year 9 Unit 4, 'Non-linear relationships' Unit 5, 'Expressions and formulae' Unit 8, 'Graphical representations' Year 10 Unit 1, 'Algebraic manipulation' Unit 2, 'Simultaneous equations: 2 variables' Unit 12, 'Linear graphs' Unit 13, 'Non-linear graphs' Unit 18, 'Circle theorems' Year 11 Unit 1, 'Algebraic fractions' Unit 2, 'Non right-angled trigonometry' Unit 6, 'Real-life graphs' Unit 8, 'Functions and proof' Unit 9, 'Further sequences' Unit 10, 'Iteration' Unit 12, 'Inequalities' Unit 15, 'Transformations of graphs' Exported 04 September 2025 90 Thread, 'Geometry and Measure' Year 7 Unit 6, 'Perimeter and area' Unit 10, 'Transformations' Year 8 Unit 8, 'Perimeter, area and volume' Unit 9, 'Geometrical properties: polygons' Unit 10, 'Constructions' Year 9 Unit 1, 'Geometrical properties: similarity and Pythagoras' theorem' Unit 6, 'Trigonometry' Year 10 Unit 14, '2D and 3D shape: compound shapes' Unit 15, 'Angles' Unit 16, 'Further transformations' Unit 17, 'Similarity' Unit 18, 'Circle theorems' Unit 19, 'Plans and elevations' Unit 20, 'Right-angled trigonometry' Unit 21, 'Bearings' Year 11 Unit 2, 'Non right-angled trigonometry' Unit 3, '2D and 3D shape: surface area and volume (pyramids, spheres and cones)' Unit 13, 'Vectors' Unit 14, 'Loci and construction' Exported 04 September 2025 91 Thread, 'Number' Year 7 Unit 1, 'Place value' Unit 2, 'Properties of number: factors, multiples, squares and cubes' Unit 3, 'Arithmetic procedures with integers and decimals' Unit 7, 'Comparing and ordering fractions and decimals (positive and negative)' Unit 8, 'Arithmetic procedures with fractions' Unit 9, 'Understanding multiplicative relationships: fractions and ratio' Year 8 Unit 1, 'Estimation and rounding' Unit 5, 'Understanding multiplicative relationships: percentages and proportionality' Unit 8, 'Perimeter, area and volume' Year 9 Unit 7, 'Standard form' Year 10 Unit 4, 'Arithmetic procedures: index laws' Unit 5, 'Standard form calculations' Unit 6, 'Surds' Unit 10, 'Rounding, estimation and bounds' Exported 04 September 2025 92 Thread, 'Probability' Year 9 Unit 2, 'Probability: possible outcomes' Unit 3, 'Probability: theoretical probabilities' Year 11 Unit 4, 'Conditional probability' Exported 04 September 2025 93 Thread, 'Ratio and Proportion' Year 7 Unit 9, 'Understanding multiplicative relationships: fractions and ratio' Year 8 Unit 5, 'Understanding multiplicative relationships: percentages and proportionality' Year 9 Unit 6, 'Trigonometry' Year 10 Unit 3, 'Percentages' Unit 11, 'Ratio' Unit 12, 'Linear graphs' Unit 17, 'Similarity' Year 11 Unit 5, 'Compound measures' Unit 6, 'Real-life graphs' Unit 7, 'Direct and inverse proportion' Exported 04 September 2025 94 Thread, 'Statistics' Year 8 Unit 6, 'Graphical representations of data' Unit 7, 'Numerical summaries of data' Year 10 Unit 7, 'Sampling' Unit 8, 'Graphical representations of data: scatter graphs and time series' Unit 9, 'Comparisons of numerical summaries of data' Year 11 Unit 11, 'Graphical representations of data: cumulative frequency and histograms' Exported 04 September 2025 95 © Oak National Academy 2024. Produced in partnership with Mathematics Education Innovation (MEI). Licensed on the Open Government Licence v3.0 , except where otherwise stated. See Oak terms and conditions . Exported 04 September 2025 96
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