ࡱ> ]  bjbjzz 781\1\W  8ld6d6z6z6z6777kkkkkkkmpk977777kz6z64kHHH7Nz6z6kH7kHH^`z6@[q$8F^skk0l^6.qB9.q,``&.q+`H 77H77777kkA777l7777.q777777777 > V: 5 year Higher Scheme of Work This 5-Year Higher Scheme of Work offers a flexible approach for Year 7 to Year 11. It is based on a minimum of seven one hour Maths lessons per fortnight (assuming a two week timetable of three lessons in one week and four in the second). This accounts for an average of 140 teaching hours per academic year, with the exception of Year 11, which has 115 due to GCSE examinations in summer (2). In addition to this, there are assessment and review sessions built in. WeekBook / Chapter: TopicTopic break-down (sub-topics)Total no. of teaching hoursLearning ObjectivesMaths Frameworking Pupil Book 1.1Year 7Term 11/21: Using numbers1.1 Charts and financial mathematics7To carry out calculations from information given in charts and tables To know and use financial vocabulary1.2 Positive and negative numbersTo order positive and negative numbers using a number line To use and apply comparison symbols such as > (greater than) and < (less than)1.3 Simple arithmetics with negative numbers 1.4 Subtracting negative numbers 1.5 Multiplying negative numbers To calculate addition, subtraction and multiplication problems involving directed numbersTravelling in Asia and Eastern EuropeTo use and apply directed number calculations in a real-life situation3/42: Sequences2.1 Function machines5To use function machines to generate inputs and outputs To use given inputs and outputs to work out a function2.2 Sequences and rulesTo recognise, describe and generate linear sequences2.3 Finding missing termsTo identify missing terms in a sequence 2.4 Working out the nth termTo identify the nth term of a linear sequence To use the nth term to work out any term in a sequence3/42: Problem solving and reasoning2.5 Other sequences2To explore square and triangular numbers as sequences To know and generate the Fibonacci sequence and Pascals triangleValencia PlanetariumTo apply knowledge of sequences in a context53: Perimeter, area and volume3.1 Perimeter and area of rectangles4To use a simple formula to work out the perimeter of a rectangle To use a simple formula to work out the area of a rectangle3.2 Perimeter and area of compound shapesTo work out the perimeter and area of compound rectilinear shapes by using simple formulae3.3 Area of common 2D shapesTo calculate the area of a triangle. To calculate the area of a parallelogram To calculate the area of a trapezium63: Perimeter, area and volume3.4 Surface area and volume of cubes and cuboids3To calculate the surface area of cubes and cuboids To calculate the volume of cubes and cuboids63: Problem solvingDesign a bedroom1To calculate perimeters and areas in a real-life contextHalf term assessment1HALF TERM74: Decimal numbers4.1 Multiplying and dividing by 10,100,1000 and 10 0007To multiply and divide decimal numbers by powers of 104.3 EsimatesTo use rounding to estimate answers to calcuations, to spot possible errors4.2 Ordering decimalsTo order decimals, including numbers with different decimal places4.4 Adding and subtracting decimals 4.5 Multiplying decimals 4.6 Dividing decimalsTo add and subtract decimal numbers To multiply and divide decimal numbers Financial skills Shopping for leisureTo solve multi-step problems involving decimals in a familiar context8/9/105: Working with numbers5.1 Square numbers and square roots10To recognise and use square numbers up to 225 (152) and corresponding square roots5.2 RoundingTo round numbers to more than one decimal place To round numbers to one or two significant figures5.3 Order of operationsTo use the conventions of BIDMAS to carry out calculations 5.4 multiplications problems without a calculatorTo use an efficient written method of multiplication without a calculator5.5 Division problems without a calculatorTo use an efficient written method of division without a calculator5.6 Calculations with measurementsTo convert between common metric units To use measurements in calculations To recognise and use appropriate metric units105: Problem solving and reasoningWhat is your carbon footprint?2To apply number skills in real life contexts11/126: Statistics6.1 Mode, median and range7To calculate and use the mode, median and range of a set of data6.2 The meanTo calculate and use the mean average of a set of data6.3 Statistical diagramsTo be able to read and interpret different statistical diagrams6.4 Collecting and using discrete dataTo create and use a tally chart6.5 Collecting and using continuous dataTo understand continuous data and use grouped frequency 6.6 Data collectionTo develop a greater understanding of data collectionChallenge School sports dayTo apply data handling skills to a real-life situation13End of term assessment113Assessment review 1CHRISTMAS HOLIDAYTerm 21/27: Using algebra7.1 Expressions and substitution6To use algebra to write simple expressions and recognise equivalent expressions To substitute numbers into expressions to work out their value7.2 Simplifying expressionsTo apply arithmetic rules to algebraic expressions7.3 Using formulaeTo use substitution in the context of formulae7.4 Writing formulaeTo construct formulae from contextual situations27: Problem solving and reasoningWinter sports1To use a formula to calculate costs3/48: Fractions8.1 Equivalent fractions7To find common equivalent fractions To write fractions in their simplest form8.2 Comparing fractionsTo compare and order two fractions8.3 Adding and subtracting fractionsTo add and subtract fractions with different denominators8.4 Mixed numbers and improper fractions 8.5 Calculations with mixed numbersTo convert between mixed numbers and improper fractions To add and subtract simple mixed numbers with different denominators48: ChallengeFractional dissection1To explore fractions in the context of the part-whole relationship5/69: Angles9.1 Measuring and drawing angles5To use a protractor to measure an angle To use a protractor to draw an angle9.2 Calculating anglesTo know the properties of parallel and perpendicular lines To calculate angles on a line To calculate angles at a point To identify opposite equal angles9.3 Corresponding and alternate anglesTo calculate angles in parallel lines9.4 Angles in a triangleTo know that the angle sum in a triangle is 1809.5 Angles in a quadrilateralTo know that the angle sum in a quadrilateral is 3609.6 Properties of triangles and quadrilateralsTo know and use the properties of triangles To know and use the properties of quadrilaterals69: ActivityConstructing triangles1To use angles construction and measuring skills with confidence, fluency and accuracyHalf term assessment1HALF TERM7/810: Coordinates and graphs10.1 Coordinates in four quadrants7To use coordinates to identify and locate position points in all four quadrants10.2 Graphs from relationships 10.3 Predicting graphs from relationships To draw a graph using a simple linear rule To know the connection between pairs of coordinates and the relationship shown in an equation and a graph10.4 Graphs of fixed values of x and y, y = x and y = xTo recognise and draw linear graphs with values of x and y To recognise and draw the graphs of y = x and y = x10.5 Graphs of the form x + y = aTo recognise and draw graphs of the form x + y = a10.6 Graphs from the real worldTo draw and use real-life graphs To know how graphs can be used in real-life situations810: ChallengeGlobal Warming1To apply graphing skills in a real-life situation9/1011: Percentages11.1 Fractions, decimals and percentages5To know equivalences between common fractions, decimals and percentages To understand and use percentages greater than 100%11.2 Fractions of a quantityTo calculate a fraction of a quantity without a calculator11.3 Calculating simple percentagesTo calculate a percentage of a quantity without a calculator11.4 Percentages with a calculatorTo calculate a percentage of a quantity with a calculator To know when it is appropriate to use a calculator11.5 Percentage increase and decreaseTo calculate the result of a percentage changeFinancial skills Income taxTo work out the result of a simple percentage change To apply percentage skills in a real-life context11/1212: Probability12.1 Probability scales3To know the vocabulary of probability To know and use the 01 probability scale12.2 Combined eventsTo use sample space diagrams to work out the probability of a combined event12.3 Experimental probabilityTo know the difference between theoretical and experimental probability To calculate and use experimental probabilityFinancial skills Easter FayreTo use experimental and theoretical probability in a real-life context12Revision1End of term assessment1EASTER HOLIDAY Term 31/213: Symmetry13.1 Line symmetry and rotational symmetry4To recognise shapes that have reflective symmetry To draw lines of symmetry on a shape To recognise shapes that have rotational symmetry To find the order of rotational symmetry for a shape13.2 ReflectionsTo be able to reflect a shape in vertical and horizontal mirror lines To use a coordinate grid to reflect shapes in lines, including y = x13.3 RotationsTo be able to rotate a shape13.4 TessellationsTo be able to tessellate shapes213: ActivityLandmark spotting1To apply aspects of symmetry in real-life contexts2/314: Equations14.1 Finding unknown numbers6To find missing numbers in simple calculations14.2 Solving equationsTo solve equations involving one operation14.3 Solving more complex equationsTo solve equations involving two operations14.4 Setting up and solving equationsTo use algebra to set up and solve equationsChallenge number puzzlesTo identify and solve multi-step linear equations4/5 15: Interpreting data15.1 Pie charts6To read and interpret data from pie charts To use a scaling method to draw a pie chart15.2 Comparing data using averages and the rangeTo use the averages and range to compare and interpret data sets15.3 Statistical surveysTo carry out a statistical survey To use charts and diagrams to interpret data and write a reportChallenge Dancing competitionTo apply data interpretation skills in everyday situationsHalf term assessment1HALF TERM6/716: 3D shapes16.1 Naming and drawing 3D shapes 5To know the names and properties of common 3D shapes To use isometric paper to represent shapes made from cubes 16.2 Using nets to construct 3D shapesTo draw nets for 3D shapes To construct 3D shapes from nets, including more complex shapes16.3 3D investigationsTo establish the rule connecting faces, edges and vertices in 3D shapes (Euler)7 16: Problem solving and reasoningDelivering packages1To solve 3D shape problems in everyday situations8/917: Ratio 17.1 Introduction to ratios5To know ratio notation To use ratios to compare quantities17.2 Simplifying ratiosTo write a ratio in its simplest terms To write ratios in the form 1 : x 17.3 Ratios and sharingTo use ratios to find totals and missing quantities To write ratios to compare more than two items17.4 Ratios and fractionsTo use and apply the connection between ratios and fractions as a proportionality relationship917: Problem solving and reasoningSmoothie bar1To use ratios in a real-life context. 10End of term assessment211Assessment review2END OF YEAR 7 / SUMMER HOLIDAY Year 8Term 1Maths Frameworking Pupil Book 1.21/21: Working with numbers1.1 Multiplying and dividing directed numbers7To carry out multiplications and divisions involving negative numbers1.2 Factors and HCFTo know and use highest common factors1.3 Multiples and LCMTo know and use lowest common multiples1.4 Powers and rootsTo know and use powers and roots1.5 Prime factorsTo be able to identify the prime factors of any integerChallenge Blackpool TowerTo be able to use and apply number skills in a real-life situation3/42: Geometry2.1 Parallel lines7To calculate angles in parallel lines2.2 Geometric properties of quadrilateralsTo know the geometric properties of quadrilaterals2.3 TranslationsTo be able to translate a shape2.4 EnlargementsTo enlarge a 2D shape by a scale factor2.5 ConstructionsTo construct the mid-point and perpendicular bisector of a line To construct a perpendicular to a line from or at a given pointChallenge ConstructionsTo complete more complex constructions and produce a set of instructions5/63: Probability3.1 Mutually exclusive outcomes and exhaustive outcomes7To recognise mutually exclusive outcomes and exhaustive outcomes To represent a chance on a probability scale3.2 Using a sample space to calculate probabilitiesTo use a sample space to calculate probabilities3.3 Estimates of probabilityTo use relative frequency to estimate probabilitiesFinancial skills Fun in the Fairground To apply probability to a real-lifee situationHalf term assessment1HALF TERM7/84: Percentages4.1 Calculating percentages7To write one quantity as a percentage of another4.2 Calculating percentage increase and decreaseTo use a multiplier to calculate a percentage change4.3 Calculating a percentage changeTo work out a change in value as a percentage increase or decreaseChallenge Changes in populationTo apply percentages when analysing a real-life situation9/105: Congruent Shapes5.1 Congruent shapes7To recognise congruent shapes5.2 Congruent trianglesTo know the conditions for recognising congruent triangles5.3 Using congruent triangles to solve problemsTo solve geometric problems using the rules of congruencyProblem solving Using scale diagrams to work out distancesApplying scale factors in real-life situations11/126: Surface area and volume of prisms6.1 Metric units for area and volume6To convert between metric units for area and for volume6.2 Surface area of prismsTo calculate the surface area of a prism6.3 Volume of prismsTo calculate the volume of a prismInvestigation A cube investigationTo apply knowledge of area and work systematically to solve a problemEnd of term assessment1Assessment review1CHRISTMAS HOLIDAYTerm 21/27: Graphs7.1 Graphs from linear equations6To develop graphical fluency with a range of linear representations7.2 Gradient of a lineTo know the gradient of a line from its linear equation To establish the equation of a line in the form y = mx + c from its graph 7.3 Graphs from quadratic equationsTo recognise and draw the graph from a quadratic equation To solve a quadratic equation from a graph7.4 Real-life graphsTo draw graphs from real-life situations to show the relationship between two variablesChallenge The M25To solve problems involving more than one variable in a real-life context3/48: Number8.1 Powers of 107To multiply and divide by negative powers of 108.2 Significant figuresTo round to a specific number of significant figures8.3 Standard form with large numbersTo write a large number in standard form8.4 Multiplying with numbers in standard formTo multiply with numbers in standard formChallenge Space to see where no-one has seen beforeTo apply standard form to solve a problem in a real-life context5/69: Interpreting data9.1 Interpreting graphs and diagrams7To interpret different charts seen in the media9.2 Relative sized pie chartsTo draw pie charts relative to data size9.3 Scatter graphs and correlationTo read scatter graphs To interpret correlation9.4 Creating scatter graphsTo construct scatter graphs and use a line of best fit to describe data trendsChallenge Football attendancesTo use and apply data handling skills in a real-life contextHalf term assessment1HALF TERM7/8/910: Algebra10.1 Algebraic notation10To simplify algebraic expressions involving the four operations of arithmetic10.2 Like termsTo simplify expressions by collecting up like terms10.3 Expanding bracketsTo multiply out brackets in an expression10.4 Using algebraic expressionsTo identify and manipulate algebraic expressions10.5 Using index notationTo write algebraic expressions involving powersMathematical reasoning Writing in algebraTo use and apply algebraic manipulation skills in a range of contexts10/1111: Shape and ratio11.1 Ratio of lengths, areas and volumes8To use ratio to compare lengths, areas and volumes of 2D and 3D shapes11.2 Fractional enlargementTo enlarge a 2D shape by a fractional scale factor11.3 Map scalesTo be able to read and use map scales efficientlyActivity Map readingTo use and apply skills and knowledge of area, ratio and data handling in a real-life context.Revision1End of term assessment1Assessment review1Term 3EASTER HOLIDAY1/2/312: Fractions and decimals12.1 Adding and subtracting fractions10To add and subtract fractions and mixed numbers12.2 Multiplying fractions and integersTo multiply a fraction or a mixed number and an integer12.3 Dividing with fractions and integersTo divide a fraction or a mixed number by an integer To divide an integer or a mixed number by a fraction12.4 Multiplication with large and small numbersTo multiply with combinations of large and small numbers mentally12.5 Division with large and small numbersTo divide combinations of large and small numbers mentallyChallenge GuesstimatesTo use mental calculation strategies and estimation in real-life situations413: Proportion13.1 Direct proportion4To know what is meant by direct proportion To find missing values in problems involving proportion13.2 Graphs and direct proportionTo represent direct proportion graphically and algebraically13.3 Inverse proportionTo know what is meant by inverse proportion To use graphical and algebraic representations of inverse proportion13.4 Comparing direct proportion and inverse proportionTo recognise direct and inverse proportion and work out missing valuesChallenge Planning a tripTo apply knowledge of proportion to a real-life situation5/614: Circles14.1 The circumference of a circle5To know the definition of a circle and be able to name the parts of a circle To establish the relationship between the circumference and diameter of a circle ()14.2 Formula for the circumference of a circleTo calculate the circumference of a circle14.3 Formula for the area of a circleTo calculate the area of a circleFinancial skills  Athletics stadiumTo use and apply knowledge of number and circles to solve multi-step problems in real-life contextsHalf term assessment1HALF TERM7/815: Equations and formulae15.1 Equations with brackets7To solve equations involving brackets To solve equations where the answers are fractions or negative numbers15.2 Equations with the variable on both sidesTo solve equations with the variable on both sides15.3 More complex equationsTo solve equations with fractions and fractional coefficients To solve simple equations involving squares15.4 Rearranging formulaeTo change the subject of a formula, including formulae involving squaresMathematical reasoning Using graphs to solve equationsBe able to make links between graphical and algebraic representations to solve equations9/1016: Comparing Data16.1 Grouped frequency tables7To create a grouped frequency table from raw data16.2 Drawing frequency diagramsTo interpret frequency diagrams To draw a frequency diagram from a grouped frequency table16.3 Comparing sets of dataTo be able to compare data from two sources16.4 Misleading chartsTo recognise when a statistical chart may be misleadingProblem solving Why do we use so many devices to watch TV?Be able to interpret and present data in order to make valid comparisons11End of term assessment111Assessment review1END OF YEAR 8 / SUMMER HOLIDAYYear 9Term 1Maths Frameworking Pupil Book 1.31/21: Percentages1.1 Simple interest7To know what is meant by simple interest To solve problems involving simple interest1.2 Percentage increase and decreaseTo use the multiplier method to calculate the result of a percentage increase or decrease To calculate the percentage change in a value1.3 Calculating the original valueTo calculate the original value, given a percentage change1.4 Repeated percentage changesTo calculate the result of repeated percentage changesChallenge Exponential growthBe able to use and apply prior knowledge to extend learning and make links with other areas of mathematics3/4/52: Equations and formulae2.1 Multiplying out brackets10To expand brackets and simplify more complex expressions2.2 Factorising algebraic expressionsTo factorise more complex expressions2.3 Expressions with several variablesTo expand and factorise expressions with more than one variable2.4 Equations with fractionsTo solve equations where the variable is in the denminator of a fractionInvestigation Body mass indexTo use and apply skills to solve problems in a real-life context5/63: Polygons3.1 Properties of polygons5To work out the sum of the interior angles of a polygon To work out the exterior angles of polygons3.2 Interior and exterior angles of regular polygonsTo calculate the interior and exterior angles of regular polygons3.3 Tessellations and regular polygonsTo establish which regular polygons tessellateMathematical reasoning Semi-regular tessellationsTo use geometric reasoning and apply prior knowledge to extend learningHalf term assessment1HALF TERM7/84: Using data4.1 Scatter graphs and correlation7To infer a correlation from two related scatter graphs To draw a line of best fit to show a correlation4.2 Two-way tablesTo interpret a variety of two-way tables4.3 Estimation of a mean from grouped dataTo estimate a mean from grouped data4.4 Cumulative frequency diagramsTo draw a cumulative frequency diagram To find the interquartile range4.5 Statistical investigationsTo plan a statistical investigationChallenge CensusUse and apply statistical skills and analysis to a real-life situation9/105: Applications of graphs5.1 Step graphs7To interpret step graphs5.2 Time graphsTo interpret and draw time graphs5.3 Exponential growth graphsTo draw exponential growth graphsProblem solving Mobile phone tariffsTo use and apply knowledge of graphs to solve best buy problems in real-life contexts11/126: Pythagoras Theorem6.1 Introducing Pythagoras7To use Pythagoras theorem to calculate missing sides in right- angled triangles6.2 Using Pythagoras theorem to solve problemsTo use Pythagoras theorem to solve problems in context6.3 The converse of Pythagoras theoremTo use the converse of Pythagoras theorem to establish whether or not a triangle is a right-angled triangleActivity Practical PythagorasTo apply Pythagoras theorem in a practical contextEnd of term assessment1Assessment review1CHRISTMAS HOLIDAYTerm 2 1/27: Fractions7.1 Adding and subtracting fractions5To choose an appropriate method to add or subtract mixed numbers7.2 Multiplying fractions and mixed numbersTo multiply two fractions or mixed numbers7.3 Dividing fractions and mixed numbersTo divide one fraction or mixed number by another fraction or mixed number 7.4 Algebraic fractionsTo add, subtract, multiply or divide fractions containing a variableInvestigations Fractions from one to sixTo apply knowledge of fractions to a more complex problem To work systematically2/38: Algebra8.1 Expanding the product of two brackets6To multiply out (or expand) two brackets8.2 Expanding expressions with more than two bracketsTo multiply out three or more brackets8.3 Factorising quadratic expressions with positive coefficientsTo factorise quadratic expressions with positive coefficients8.4 Factorising quadratic expressions with negative coefficients To factorise quadratic expressions with negative coefficients8.5 The difference of two squaresTo recognise and use the difference of two squares to solve an equationChallenge Graphs from expressionsTo use and apply knowledge of factorising and expansion in a practical context4/59: Decimal numbers9.1 Powers of 107To calculate with positive and negative powers of 109.2 Standard formTo calculate using standard form for positive and negative powers of 109.3 Multiplying numbers in standard formTo multiply numbers in standard form9.4 Dividing with numbers in standard formTo divide numbers in standard form9.5 Upper and lower boundsTo use limits of accuracy when rounding dataMathematical reasoning To the stars and backTo use and apply skills and knowledge of standard form in a real-life contextHalf term assessment1HALF TERM6/710: Surface area and volume of cylinders10.1 Volume of a cylinder7To calculate the volume of a cylinder10.2 Surface area of a cylinderTo calculate the curved surface area of a cylinder To calculate the total surface area of a closed cylinder10.3 Composite shapesTo calculate the volumes and surface areas of composite shapesProblem solving Packaging soupTo use and apply knowledge of volume and surface area to solve a practical problem8/9/1011: Solving equations graphically11.1 Graphs from equations of the form ay bx = c10To draw any linear graph from its equation To solve a linear equation graphically11.2 Solving simultaneous equations by drawing graphsTo solve a pair of simultaneous equations graphically11.3 Solving quadratic equations by drawing graphsTo solve quadratic equations graphically11.4 Solving cubic equations by drawing graphsTo solve cubic equations graphicallyChallenge Maximum packagesTo use and apply knowledge of functions to solve a real-life problem graphically10End of term assessment110Assessment review1EASTER HOLIDAYTerm 31/212: Compound units12.1 Speed7To solve distance/time/speed problems12.2 More compound unitsTo solve problems involving density/mass/volume12.3 Unit costsTo apply the unit cost method to solve problems such as best value Challenge Population densityTo use and apply knowledge of compound measure strategies to a problem in a practical context3/413: Right-angled triangles13.1 Introduction to trigonometric ratios7To know what trigonometric ratios are13.2 How to find trigonometric ratios of anglesTo know how to find the trigonometric ratios of sine, cosine and tangent in a right-angled triangle13.3 Using trigonometric ratios to find anglesTo find the angle identified from a trigonometric ratio13.4 Using trigonometric ratios to find lengthsTo find an unknown length of a right-angled triangle given one side and an angleInvestigation Barnes Wallis and the bouncing bombTo use and apply trigonometry in a practical contextNote: the final references for Year 9 are intended as introductions only for those students who are ready for it.AQA GCSE Higher Student Book5/61.4 Introduction to algebraic proof4.1 Reasoning about number patterns7Make and test conjectures about patterns and relationships Look for proofs and counter-examplesHalf term assessment1HALF TERM712: Introduction to geometric proof12.1 Properties and relationships3Use known geometric results to obtain simple proofs813: Probability13.2 Independent and combined events4To calculate the probability of independent and combined events using a tree diagram 94: Introduction to geometric Sequences4.4 Generating non-linear sequences3To generate and identify non-linear sequences from either a term-to term or a postion-to-term rule10Revision6End of term assessment1Assessment review1END OF YEAR 9 / SUMMER HOLIDAYYear 10Term 1AQA GCSE Higher Student Book1 /21 Number: Basic number1.1 Solving real-life problems7To solve number problems in a real-life context1.2 Multiplication and division of decimalsTo multiply a decimal number by another decimal number To divide by decimals by adjusting the calculation to division by an integer1.3 Approximation of calculationsTo round to a given number of significant figures in order to approximate a result before calculating To round a calculation at the end of the problem to give a reasonable answer1.4 Multiples, factors, prime numbers, powers and rootsTo generate factors and multiples for any given integer To identify prime numbers to 100 To identify square and cube numbers and their roots to 100 To identify and generate triangular numbers1.5 Prime factors, LCM and HCFTo identify prime factors for any given integer To identify the LCM of two integers To identify the HCF of two integers 1.6 Negative numbersTo multiply and divide by directed numbers3 /42 Number: Fractions, ratio and proportion2.1 One quantity as a fraction of another7To find one fraction as a quantity of another2.2 Adding, subtracting and calculating with fractionsTo add and subtract fractions with different denominators2.3 Multiplying and dividing fractionsTo multiply by proper and improper fractions To divide by a fraction2.4 Fractions on a calculatorTo use the fraction button on a calculator to carry out calculations2.5 Increasing and decreasing quantities by a percentageTo increase and decrease quantities by a percentage2.6 Expressing one quantity as a percentage of anotherTo express one quantity as a percentage of another To work out percentage change5/63 Statistics: Statistical diagrams and averages3.1 Statistical representation7To present, analyse and interpret discrete and continuous sets of data3.2 Statistical measuresTo calculate the mean, median and mode of a set of data To choose the most appropriate average to use To calculate and interpret the range of a set of data3.3 Scatter diagramsTo draw, interpret and use scatter diagrams To identify correlation and draw a line of best fit To estimate missing values in a scatter diagramEnd of term assessment1HALF TERM7/84 Algebra: Number and sequences4.1 Patterns in number7To extend and identify number patterns 4.2 Number sequencesTo identify simple linear rules To generate sequences, given the rule4.3 Finding the nth term of a linear sequenceTo generalise and find the nth term of a linear sequence4.4 Special sequencesTo recognise and continue some special number sequences such as square numbers or a simple geometric progression4.5 General rules from given patternsTo find the nth term from a sequence of patterns4.6 The nth term of a quadratic sequenceTo continue a quadratic sequence, given the rule4.7 Finding the nth term for quadratic sequencesTo find the nth term of a quadratic sequence from second differences9/105 Ration, proportion and rates of change: Ratio and proportion5.1 Ratio7To simplfy a given ratio To express a ratio as a fraction To divide amounts into given ratios To complete calculations from a given ratio and partial information5.2 Direct proportion problemsTo recognise and solve problems using direct proportion5.3 Best buysTo find the cost per unit weight and the weight per unit cost To use the unitary method to identify the cheapest option5.4 Compound measuresTo solve problems involving speed/distance/time and density/mass/volume 5.5 Compound interest and repeated percentage changeTo calculate simple and compound interest To solve problems involving repeated percentage change5.6 Reverse percentages (working out the original quantity)To find percentage increases and reductions To solve prolems that require the removal of a percentage interest by reducing the price by a different amount (reverse percentages)11/126 Geometry and measures: Angles6.1 Angle facts5To know the sum of the angles on a straight line, around a point, in a triangle and in a quadrilateral6.2TrianglesTo solve missing angle problems in triangles6.3 Angles in a polygonTo work out the sum of the interior angles in a polygon6.4 Regular polygonsTo be able to calculate the size of the interior and exterior angles of any regular polygon6.5 Parallel linesTo solve problems involving alternate, corresponding, allied and opposite angles6.6 Special quadrilateralsTo be able to calculate the size of angles in special quadrilaterals using their geometric properties 6.7 Scale drawings and bearingsTo be able to make a scale drawing to a given scale To be able to convert measurements to calculate actual distances To be able to read, interpret and draw bearings diagrams To use the geometrical properties of a diagram to calculate a bearing12End of term assessment112Assessment review1CHRISTMAS HOLIDAYTerm 217 Geometry and measures: Transformations, constructions and loci7.1 Congruent triangles4To identify two congruent triangles To justify why two triangles are congruent7.2 Rotational symmetryTo identify and describe the rotational symmetry of a shape7.3 TransformationsTo translate a 2D shape, using vectors to describe the transformation To draw and describe the image of one or more reflections To draw and describe a rotation that will take an object onto its image To enlarge a 2D shape by a positive or negative integer or fraction scale factor and describe the transformation7.4 Combinations of transformationsTo combine transformations To describe a sequence of transformations to map an object onto its image7.5 BisectorsTo construct the bisectors of lines and angles7.6 Defining a locusTo draw a locus for a given rule7.7 Loci problemsTo solve loci problems in practical contexts7.8 Plans and elevationsTo draw 2D representations of 3D objects from different views2/31:8 Algebra: Algebraic manipulation8.1 Basic algebra7To recognise expressions, equations, formulae and indentities To substitute into, manipulate and simplify algebraic expressions8.2 FactorisationTo factorise an algebraic expression8.3 Quadratic expansionTo multiply out a pair of algebraic brackets such as (x + a)(x b)8.4 Expanding squaresTo multiply out a pair of identical brackets such as (x + a)( x+ a) = (x + a)28.5 More than two binomialsTo multiply out a string of algebraic brackets such as (x + a)( x b) (x + c)8.6 Quadratic factorisationTo factorise quadratic expressions with the coefficient of x2 equal to 18.7 Factorising ax2 + bx + cTo factorise quadratic expressions with the coefficient of x2 not equal to 18.8 Changing the subject of a formulaBe able to rearrange formulae4/59 Geometry and measures: Length, area and volume9.1 Circumference and area of a circle7To calculate the circumference and area of a circle9.2 Area of a parallelogram 9.3 Area of a trapeziumTo find the area of a parallelogram and a trapezium9.4 SectorsTo calculate the length of an arc and the area of a sector9.5 Volume of a prismTo calculate the volume of a prism9.6 CylindersTo calculate the volume and surface area of a cylinder9.7 Volume of a pyramidTo calculate the volume of a pyramid9.8 ConesTo calculate the volume and surface area of a cone9.9 SpheresTo calculate the volume and surface area of a sphereHalf term assessment1HALF TERM6/710 Algebra: Linear Graphs10.1 Drawing linear graphs from points7To draw a line graphs using three points (x, y)10.2 Gradient of a lineTo work out the gradient of a straight line To know that the gradient of a line is the coefficient of x (m) in y = mx + c, the general equation for a straight line.10.3 Drawing graphs by gradient-intercept and cover-up methodsTo draw graphs using the gradient / intercept method10.4 Finding the equation of a line from its graphTo find the equation of a line, given its gradient and y-axis intercept10.5 Real-life uses of graphsTo solve problems in practical contexts using graphs10.6 Solving simultaneous equations using graphsTo use the graphical intercept method of solving simultaneous equations10.7 Parallel and perpendicular linesTo know that parallel lines have the same gradient To know that the product of the gradients of perpendicular lines is always 18/9/1011Geometry and measures: Right-angled triangles11.1 Pythagoras theorem9To calulate the length of the hypotenuse in a right-angled triangle11.2 Finding the length of a shorter sideTo calculate the length of a shorter side in a right-angled triangle11.3 Applying Pythagoras theorem in real-life situationsTo solve real-life problems involving Pythagoras theorem11.4 Pythagoras theorem and isosceles trianglesTo use the geometry of isosceles triangles and Pythagoras theorem to solve angle problems11.5 Pythagoras theorem in three dimensionsTo use Pythagoras theorem in problems involving three dimensions11.6 Trigonometric ratiosTo use the three trigonometric ratios11.7 Calculating anglesTo use the trigonometric ratios to calculate an angle11.8 Using the sine and cosine functionsTo find the lengths of sides and sizes of angles in right-angled triangles using the sine and cosine functions11.9 Using the tangent functionTo find the lengths of sides and sizes of angles in right-angled triangles using the tangent function11.10 Which ratio to useTo use SOHCAHTOA to decide which ratio to use11.11 Solving problems using trigonometryTo solve practical problems involving trigonometry, including those with angles of elevation and depression11.12 Trigonometry and bearingsTo solve bearings problems using trigonometry11.13 Trigonometry and isosceles trianglesTo use trigonometry to solve problems involving isosceles triangles1012 Geometry and measures: Similarity12.1 Similar triangles3To show that two triangles are similar To work out the scale factor between similar triangles12.2 Areas and volumes of similar shapesTo solve problems involving the area and volume of similar shapesEnd of term assessment1Assessment review1EASTER HOLIDAYTerm31/213 Probability: Exploring and applying probability13.1 Experimental probability7To calculate experimental probabilities and relative frequencies To estimate probabilities from experiments To use different methods to estimate probabilities13.2 Mutually exclusive and exhaustive eventsTo recognise mutually exclusive, complementary and exhaustive events13.3 ExpectationTo predict the likely number of successful events, given the number of trials and the probability of any one event13.4 Probability and two-way tablesTo read two-way tables and use them to work out probabilities and interpret data13.5 Probability and Venn diagramsTo construct and read Venn diagrams to represent probability314 Number: Powers and standard form14.1 Powers (indices)4To use powers of numbers to describe large and small numbers and generate number patterns14.2 Rules for multiplying and dividing powersTo use the laws of indices to calculate or simplify algebraic expressions14.3 Standard formTo convert an ordinary number into standard form and vice versa To calculate using numbers in standard form, applying the laws of indices4/5/615 Algebra: Equations and inequalities15.1 Linear equations11To solve linear equations15.2 Elimination method for simultaneous equationsTo use the elimination method to solve simultaneous equations15.3 Substitution method for simultaneous equationsTo use the substitution method to solve simultaneous equations 15.4 Balancing coefficients to solve simultaneous equationsTo use the method of balancing coefficients to solve simultaneous equations 15.5 Using simultaneous equations to solve problemsTo solve problems, using simultaneous linear equations with two variables To solve problems using linear and non-linear simultaneous equations15.6 Linear inequalities 15.7 Graphical inequalitiesTo solve a simple linear inequality To show a graphical inequality To know how to find regions that satisfy more than one graphical inequality15.8 Trial and improvementTo estimate the solution to an equation that does not have an exact solution, using the method of trial and improvementHalf term assessment1HALF TERM7/816 Number: Counting, accuracy, powers and surds16.2 Estimating powers and roots7To use known facts and trial and improvement to estimate the value of powers and roots16.3 Negative and fractional powersTo represent roots and decimal numbers as indices16.1 Rational numbers, reciprocals, terminating and recurring decimalsTo recognise rational numbers, reciprocals,terminating and recurring decimals To convert terminal decimals to fractions To convert fractions to recurring decimals To find reciprocals of integers or fractions 16.4 SurdsTo simplify surds To calculate with and manipulate surds, including rationalising a denominator16.5 Limits of accuracyTo find the limits of accuracy of numbers that have been rounded to different degrees of accuracy To identify the upper and lower bounds of an estimation 16.6 Problems involving limits of accuracyCombine limits of two or more variables together to solve problems16.7 Choices and outcomesTo work out the number of choices, arrangements or outcomes when choosing from lists or sets9/1017 Algebra: Quadratic equations17.1 Plotting quadratic graphs7To plot quadratic graphs using a table of values17.2 Solving quadratic equations by factorisationTo solve a quadratic equation by factorisation (by sight)17.3 Solving a quadratic equation by using the quadratic formulaTo use the quadratic formula to solve a quadratic equation where factorisation is not possible To derive the quadratic formula by completing the square for ax2 + bx + c = 0 (extension)17.4 Solving quadratic equations by completing the squareTo solve quadratic equations by completing the square 17.5 The significant points of a quadratic curveTo identify and interpret roots, intercepts and turning points of quadratic functions graphically To deduce roots algebraically and turning points by completing the square To use this information to sketch the curve17.6 Solving equations, one linear and one non-linear usinggraphsTo solve a pair of simultaneous equations where one is linear and one is non-linear, using graphs and where they intersect17.7 Solving quadratic equations by the method of intersectionTo solve quadratic equations using intersection points between graphs or at axes17.8 Solving linear and non-linear simultaneous equations algebraicallyTo use algebraic techniques, including substitution and rearranging, to solve a pair of equations17.9 Quadratic inequalitiesTo solve a quadratic inequality algebraically To show a graphical quadratic inequality To know how to find regions that satisfy more than one graphical inequality11/1218 Statistics: Sampling and more complex diagrams18.1 Collecting data7To know the range of methods of sampling and decide which method is best when collecting reliable, unbiased data  18.2 Frequency polygonsTo draw frequency polygons for discrete and continuous data To draw histograms for continuous data with equal intervals To construct pie charts18.3 Cumulative frequency graphsTo find a measure of dispersion (the interquartile range) and a measure of location (the median) using a graph18.4 Box plotsTo draw and read box plots 18.5 HistogramsTo draw and read histograms where the bars are of unequal width To find the median, quartiles and interquartile range from a histogramEnd of term assessment1Assessment review1END OF YEAR 10 / SUMMER HOLIDAYYear 11Term 11/219 Probability: Combined events19.1 Addition rules for outcomes of events7To work out the probability of two events such as P(A) or P(B)19.2 Combined eventsTo work out the probability of two events occurring at the same time19.3 Tree diagramsTo use and construct sample space diagrams and tree diagrams to work out the probability of combined events19.4 Independent eventsTo calculate using the and and the or rule to find the probality of combined events19.5 Conditional probabilityTo work out the probability of combined events when the probabilities change after each event3 /420 Geometry and measures: Properties of circles20.1 Circle theorems7To use circle theorems to find the size of angles in circles20.2 Cyclic quadrilateralsTo find the size of angles in cyclic quadrilaterals20.3 Tangents and chordsTo use tangents and chords to find the size of angles in circles20.4 Alternate segment theoremTo use the alternate segment theorem to find the size of angles in circles5/621 Ratio, proportion and rates of change: Variation21.1 Direct proportion7To solve problems where two variables have a directly proportional relationship (direct variation) To work out the constant and equation of proportionality21.2 Inverse proportionTo solve problems where two variables have an inversely proportional relationship (inverse variation) To work out the constant and equation of proportionalityHalf term assessment1HALF TERM7/822 Geometry and measures: Triangles22.1 Further 2D problems7To use Pythagoras theorem and trigonometric ratios to solve more complex two-dimensional problems22.2 Further 3D problemsTo use Pythagoras theorem and trigonometric ratios to solve more complex three-dimensional problems22.3 Trigonometric ratios of angles between 0 and 360To find the sine, cosine and tangent of any angle between 0 and 360 To use the symmetry of the circular function graphs to find trigonmetric values22.3 Solving any triangleTo use the sine rule and the cosine rule to find sides and angles in non-right-angled triangles22.4 Using sine to calculate the area of a triangleTo use the sine rule to work out the area of any triangle, given two sides and the included angle9/1023 Algebra: Graphs23.1 Distancetime graphs7To draw and interpret distancetime graphs To know that the gradient represents the speed of the object23.2 Velocitytime graphsTo draw and interpret velocitytime graphs To know that the gradient represents the acceleration of the object To know that the area under the graph represents the distance travelled23.3 Estimating the area under a curveTo estimate the area under a curve by using rectangular strips23.4 Rates of changeTo interpret the gradient at a point on a curve as the instantaneous rate of change To apply the concept of rates of change in numerical, algebraic and graphical contexts23.5 Equation of a circleTo recognise and plot the equation of a circle To use this equation to identify the centre and radius of the circle To find the equation of a tangent to a circle at a given point23.6 Other graphsTo recognise and plot cubic, exponential and reciprocal graphs 23.7 Transformations of the graph y = f(x)To sketch translations and reflections of the graph of a given function To be able to transform graphs and identify the effect of transformations on functions such as y = 2f(x); y = f(2x); y = f(x) + 2 and y = f(x + 2)11Revision for Mock Exam412MOCK EXAM212Mock exam review 1Term 212Algebra recap graphs1CHRISTMAS HOLIDAY1/224 Algebra: Algebraic fractions and functions24.1 Algebraic fractions7To simplify algebraic fractions To solve equations containing algebraic fractions24.2 Changing the subject of a formulaTo change the subject of a formula where the subject occurs more than once24.3 FunctionsTo interpret simple expressions as functions with inputs and outputs To interpret the reverse process as the inverse function To use function notation to draw graphs and identify values by substitution24.4 Composite functionsTo interpret the succession of two functions as a composite function and be able to find output values from given input values 24.5 IterationTo find approximate solutions to equations numerically using iteration To set up, solve and interpret the answers in growth and decay problems, including compound interest, working with general iterative processes325 Geometry and measures: Vector geometry25.1 Properties of vectors4To add and subtract vectors To multiply vectors by a scalar To represent a vector in diagrammatic and column form25.2 Vectors in geometryTo use vectors to solve geometric problems To use vectors to construct geometric arguments and proofsThe following topics are revisited to allow the most able to explore in greater depth4/522 Trigonometry22.4 Sine rule7Know and apply the sine rule to find unknown lengths and angles22.4 Cosine ruleKnow and apply the cosine rule to find unknown lengths and angles22.5 Area of a triangle using sineKnow and apply area = 1/2absinC to calculate the area, sides or angles 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)'kd?$$Ifl4\6h91/  t(044 lap(yt1g8 -/$ & F$Ifa$gd): $$Ifa$gd):$qq$If]q^qa$gd): $$Ifa$gd):oprswxʺޜދzziziziޜދzz h4dh):CJOJQJ^JaJ hiOh):CJOJQJ^JaJ h=Rh):CJOJQJ^JaJ hOih):CJOJQJ^JaJhOwh):OJQJ^JhLvh):5>*OJQJ^J&hiOh):5>*CJOJQJ^JaJh):CJOJQJ^JaJ&h*h):5>*CJOJQJ^JaJ&$ $$Ifa$gd):kd@$$Ifl֞ %6h9  K t044 layt):$ & F$Ifa$gd): $Ifgd): $$Ifa$gd): $$Ifa$gd):$qq$If]q^qa$gd):  $$Ifa$gd):kdA$$Ifl4e֞ %6h`9`  `K t044 layt):$ & F$Ifa$gd): $Ifgd): $$Ifa$gd): $$Ifa$gd):$qq$If]q^qa$gd):  $$Ifa$gd):kdB$$Ifl4d֞ %6h 9    K t044 layt):p$ & F$Ifa$gd): $Ifgd): $$Ifa$gd): $$Ifa$gd):$qq$If]q^qa$gd):pqr  $$Ifa$gd):kdC$$Ifl4d֞ %6h 9    K t044 layt):rsxB | $ & F$Ifa$gd): $$Ifa$gd): $$Ifa$gd):$qq$If]q^qa$gd):Argue mathematically to show algebraic expressions are equivalent Use algebra to support and construct arguments and proofsEASTER HOLIDAY1 /2Number recap73 /4Algebra recap75 /6Geometry recap7HALF TERM7 /8Statistics and probability recap79/10Revision and exam preparation7GCSE MATHEMATICS EXAM (TBC)      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t0)v,5h5595 5 55Kyt):$$If!vh#vh#v#v9#v #v #v#vK:V l48 t0)v++,5h5595 5 55Kyt):$$If!vh#vh#v#v9#v #v #v#vK:V l43 t0)v+++++,5h5595 5 55Kyt):$$If!vh#vh#v#v9#v #v #v#vK:V l4. t0)v+++++,5h5595 5 55Kyt):$$If!vh#vh#v#v9#v #v #v#vK:V l4. t0)v+++++,5h5595 5 55Kyt):$$If!vh#vh#v#v9#v #v #v#vK:V l4. t0)v+++++,5h5595 5 55Kyt):$$If!vh#vh#v#v9#v #v #v#vK:V l4. t0)v+++++,5h5595 5 55Kyt):$$If!vh#vh#v#v9#v #v #v#vK:V l4. t0)v+++++,5h5595 5 55Kyt):$$If!vh#vh#v#v9#v #v #v#vK:V l43 t0)v+++++,5h5595 5 55Kyt):$$If!vh#vh#v#v9#v #v #v#vK:V l4. t0)v+++++,5h5595 5 55Kyt):$$If!vh#vh#v#v9#v #v #v#vK:V l4. t0)v+++++,5h5595 5 55Kyt):$$If!vh#vh#v#v9#v #v #v#vK:V l4. t0)v+++++,5h5595 5 55Kyt):$$If!vh#vh#v#v9#v #v #v#vK:V l4. t0)v+++++,5h5595 5 55Kyt):$$If!vh#vh#v#v9#v #v #v#vK:V l4. t0)v+++++,5h5595 5 55Kyt):$$If!vh#vh#v#v9#v #v #v#vK:V l4  tFԴԴԴԴԴԴԴ0)v++,5h5595 5 55KpFԴԴԴԴԴԴԴyt):]kdG$$Ifl4֞ %6h9  K  tFԴԴԴԴԴԴԴ044 lapFԴԴԴԴԴԴԴyt):$$If!vh#vh#v#v9#v1/:V l4  t(0)v++,5h55951/p(yt1g8$$If!vh#vh#v#v9#v #v #v#vK:V l4 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"H""##I##$ $N$$%%X%%&#&g&&'6'|'((N(()$)l))*E**+"+l+,,L,,-0-|-..c../N//0;001,1}12 2r233j344e455c566d677i788q89"9|9:0::;@;;'>>?D?@@d@A&AABLBCCuCD=DEEmEF8FGGmGH=HIIxIJLJK!KKLdLM=MNNNOdOPCPQ#QRRwRS\STBTU*UVVVWvWXdXYSYZDZ[7[\,\]"]^^__``a ab bc cddeeffg gh)hi4ijAjkPklalmsmnoop)pqAqr\rsxttu&uvGvwiwxy!yzHz{r||}3}~a~*Á\,DŽc:؇wU7ٌ{e SF퓕=敏9㗍9䙑=ꛘFTgˢ}1夙Np'ީO{6񮭯i&㱡_ݴ^෢e(뺰t9ƾTwA ţo< ɦuEͷΉ[.ҪӀU,ײ؋d>ݪއdB bD' kS;$ ~l[J:* XYZ xQXYZ - ]XYZ "textCopyright (C) 2007 by Color Solutions, All Rights Reserved. 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