HIGHERCHAPTER 1EXPLORING NUMBERS 1Time: 4–6 hours

SPECIFICATION REFERENCE

Prime factors, HCF and LCM NA2a

Squares and cubes NA2b

Understanding and using and3NA2b

Simple integer powers and the general form anNA2b

Rules for multiplication and division; negative and zero powers; powers of powersNA2b/3a

Positive and negative fractional powers with exact answers NA3a

Including solving equations of the type 22n– 1=32 NA6a

PRIOR KNOWLEDGE

Number complements to 10 and multiplication/division facts

Use a number line to show how numbers relate to each other

Recognise basic number patterns

Experience of classifying integers

ASSUMED KNOWLEDGE

Number complements to 10 and multiplication/division facts

OBJECTIVES

By the end of the chapter the student should be able to:

Find: squares; cubes; square roots; cube roots of numbers, with and without a calculator

Understand odd and even numbers, and prime numbers

Find the HCF and the LCM of numbers

Write a number as a product of its prime factors, e.g. 108 = 22 33

Multiply and divide powers of the same letter

RESOURCES

Higher Student book Chapter/section: 1.1–1.7

Higher Practice bookChapter 1

Teaching and Learning softwareChapter 1

DIFFERENTIATION AND EXTENSION

Calculator exercise to check factors of larger numbers

Use prime factors to find LCM

Use a number square to find primes (sieve of Eratosthenes)

Calculator exercise to find squares, cubes and square roots of larger numbers (using trial and improvement)

Use index rules with negative numbers (and fractions)

ASSESSMENT

Heinemann online assessment tool will be available in 2007.

Mental test to check knowledge of squares and cubes.

Test on performance using a calculator to find squares, cubes and square roots.

Test without a calculator on knowledge of squares, cubes and roots of numbers (keeping the numbers small).

HOMEWORK

This could include consolidation of work in class by completion of exercise set, additional work of a similar nature, or extension work detailed above.

Investigational tasks leading to number patterns involving powers of numbers.

GCSE past paper questions.

HINTS AND TIPS

All of the work in this chapter is easily reinforced by starter and end activities.

Calculators are used only when appropriate.

Do exercises 1A–1G for practice. Do Mixed Exercise 1 for consolidation.

HIGHER CHAPTER 2ESSENTIAL ALGEBRATime: 5–7 hours

SPECIFICATION REFERENCE

Substitution NA5d

Further substitution NA5d

Index notation and the index laws NA5d

Multiplying a single term over a bracketNA5b

Collecting like terms NA5b

Taking out common factors NA5b

Multiplying out two linear expressionsNA5b/c

Squaring simple expressions, (a+b)2NA5b

Solving simple equations with the unknown on one side only NA5e

PRIOR KNOWLEDGE

Understanding of the mathematical meaning of the words: expression, simplifying, formulae and equation

Experience of using letters to represent quantities

Substituting into simple expressions using words

Using brackets in numerical calculations and removing brackets in simple algebraic expressions

Experience of using a letter to represent a number

Ability to use negative numbers with the four operations

OBJECTIVES

By the end of the chapter the student should be able to:

Use letters or words to state the relationship between different quantities

Find the solution to a problem by writing an equation and solving it

Substitute positive and negative numbers into simple algebraic formulae

Substitute positive and negative numbers into algebraic formulae involving powers

Simplify algebraic expressions in one or more like terms by addition and subtraction

Multiply and divide with letters and numbers

Use brackets to expand and simplify simple algebraic expressions

Understand and use the index rules to simplify algebraic expressions

Expand or factorise algebraic expressions involving one pair of brackets

Expand and simplify expressions involving two pairs of brackets

Factorise quadratic expressions (including the difference of two squares)

RESOURCES

Higher Student bookChapter/section: 2.1–2.9

Higher Practice bookChapter 2

DIFFERENTIATION AND EXTENSION

Further work on indices to include negative and/or fractional indices

Examples where all the skills above are required

Factorising where the factor may involve more than one variable

Expand algebraic expressions involving three pairs of brackets

Further examples in factorising quadratic expression with non-unitary values of a (including fractional values)

Simplification of algebraic fractions by first factorising and then cancelling common factors

ASSESSMENT

Heinemann online assessment tool will be available in 2007.

HOMEWORK

This could include consolidation of work in class by completion of exercise set, additional work of a similar nature, or extension work detailed above.

Uses of algebra to describe real situation, e.g. n quadrilaterals have 4n sides.

HINTS AND TIPS

Emphasis on good use of notation, e.g. 3ab means 3 ab.

Present all work neatly, writing out the questions with the answers to aid revision at a later stage.

Students need to be clear on the meanings of the words expression, equation, formula and identity.

Do exercises 2A–2J for practice. Do Mixed Exercise 2 for consolidation.

HIGHER CHAPTER 3SHAPESTime: 4–6 hours

SPECIFICATION REFERENCE

Angles at a point and on a line; alternate angles and corresponding angles SSM2a

Triangles, quadrilaterals, polygons and their anglesSSM2a/b/c/d

Sum of angles in a triangle equals 180°; exterior angle equals the sum of interior opposite angles SSM/2a

Names and nets; plan and elevation SSM2i

Proving congruence using formal argumentsSSM2e

Identifying similar shapes; scale factorSSM2g/3c/d

Reflection symmetry of 3-D shapesSSM3b/4b

PRIOR KNOWLEDGE

The ability to use a protractor to measure angles

Understanding of the concept of parallel lines

Recall the names of special types of triangle, including equilateral, right-angled and isosceles

Know that angles on a straight line sum to 180 degrees

Know that a right angle = 90 degrees

OBJECTIVES

By the end of the chapter the students should be able to:

Use angle properties on a line and at a point to calculate unknown angles

Use angle properties of triangles and quadrilaterals to calculate unknown angles

Use parallel lines to identify alternate and corresponding angles

Find missing angles using properties of corresponding angles and alternate angles, giving reasons

Find the three missing angles in a parallelogram when one of them is missing

Draw nets of solids and recognise solids from their nets

Draw and interpret plans and elevations

Draw planes of symmetry in 3-D shapes

Use integer and non-integer scale factors to find the length of a missing side in each of two similar shapes, given the lengths of a pair of corresponding sides

Prove formally geometric properties of triangles, e.g. that the base angles of an isosceles triangle are equal

Prove formally that two triangles are congruent

RESOURCES

Higher Student bookChapter/section: 3.1- 3.7

Higher Practice bookChapter 3

Teaching and Learning softwareChapter 3

DIFFERENTIATION AND EXTENSION

Prove the angles in a triangle add to 180

Find the rule for the sum of the interior/ exterior angles of an n sided polygon

Harder problems involving multi-stage calculations

Draw shapes made from multi-link on isometric paper

Build shapes from cubes that are represented in 2-D

Work out how many small boxes can be packed into a larger box

Harder problems in congruence

ASSESSMENT

Heinemann online assessment tool will be available in 2007.

HOMEWORK

This could include consolidation of work in class by completion of exercise set, additional work of a similar nature, or extension work detailed above.

HINTS AND TIPS

Make sure that all pencils are sharp and drawings are neat and accurate.

Angles should be within 2 degrees.

Remind students a protractor should be taken into the exam.

In solutions ‘alternate angle theorem’ and ‘corresponding angle theorem’ should be stated if used.

Accurate drawing skills need to be reinforced.

Some students find visualising 3-D objects difficult – simple models will assist.

Do exercises 3A–3G for practice. Do Mixed Exercise 3 for consolidation.

HIGHER CHAPTER 4FRACTIONS AND DECIMALSTime: 6–8 hours

SPECIFICATION REFERENCE

Finding equivalent fractions NA2c

Ordering fractions by writing them with a common denominatorNA2c

Ordering decimals by comparing digits with the same place valueNA2d

The four rules with simple decimals NA3i/k

Long division by a decimal NA3i/k

Converting fractions to decimals and decimals to fractions; recurring decimalsNA3c

Adding and subtracting fractions by writing them with a common denominatorNA3c

Multiplying a fraction by an integer or a fractionNA3d

Dividing a fraction by an integer or a fractionNA3d

Word problems involving fractions NA3c/4a

PRIOR KNOWLEDGE

Multiplication facts

Ability to find common factors

A basic understanding of fractions as being ‘parts of a whole unit’

Use of a calculator with fractions

The concepts of a fraction and a decimal

ASSUMED KNOWLEDGE

Understand place value in numbers

Multiply or divide any number by powers of 10

Multiplication of decimal numbers

OBJECTIVES

By the end of the chapter the student should be able to:

Write a fraction in its simplest form and recognise equivalent fractions

Compare the sizes of fractions using a common denominator

Add and subtract fractions by using a common denominator

Write an improper fraction as a mixed number, and vice versa

Add and subtract mixed numbers

Convert a fraction to a decimal, or a decimal to a fraction

Put digits in the correct place in a decimal number

Write decimals in ascending order of size

Multiply and divide decimal numbers by whole numbers and decimal numbers (up to two decimal points), e.g. 266.22  0.34

Know that for instance 13.5  0.5 = 135  5

Check their answer by rounding, know that for instance 2.9  3.1  3.0  3.0

Find the reciprocal of whole numbers, fractions, and decimals

Multiply and divide a fraction by an integer, by a unit fraction and by a general fraction (expressing the answer in its simplest form)

Use fractions in contextualised problems

RESOURCES

Higher Student book Chapter/section: 4.1-4.10

Higher Practice bookChapter 4

Teaching and Learning softwareChapter 4

DIFFERENTIATION AND EXTENSION

Careful differentiation is essential for this topic dependent upon the student’s ability

Relating simple fractions to remembered percentages and vice-versa

Using a calculator to change fractions into decimals and looking for patterns

Use decimals in real-life problems

Use standard form for vary large/small numbers

Multiply and divide decimals by decimals (more than two decimal points)

Working with improper fractions and mixed numbers

Solve word problems involving fractions (and in real-life problems, e.g. find perimeter using fractional values)

Use a calculator to find fractions of given quantities

Use combinations of the four operations with fractions (and in real-life problems, e.g. to find areas using fractional values)

For very able students algebraic fractions could be considered

ASSESSMENT

Heinemann online assessment tool will be available in 2007.

Mental arithmetic test involving simple fractions such as ½, ¼, ...

Mental testing on a regular basis, of the basic conversions of simple fraction into decimals.

Testing the ability to perform calculations, using fractions, without a calculator.

Mental arithmetic test involving fractions.

HOMEWORK

This could include consolidation of work in class by completion of exercise set, additional work of a similar nature, or extension work detailed above.

An equivalent fractions worksheet as a preliminary, following on from the initial lesson.

Use the worksheet for comparing fractions, ordering fractions, and adding and subtracting fractions.

Extra examples on a regular basis for revision purposes.

Other work given could have fractional answers as a part of the process.

HINTS AND TIPS

Understanding of equivalent fractions is the key issue in order to be able to tackle the other content.

Calculators should only be used when appropriate.

Constant revision of this aspect is needed.

All work needs to be presented clearly with the relevant stages of working shown.

Present all working clearly with decimal points in line; emphasising that all working is to be shown.

For non-calculator methods make sure that remainders and carrying are shown.

It is essential to ensure the students are absolutely clear about the difference between significant figures and decimal places.

Do exercises 4A–4L for practice. Do Mixed Exercise 4 for consolidation.

HIGHER CHAPTER 5COLLECTING AND RECORDING DATATime: 4–6 hours

SPECIFICATION REFERENCE

Qualitative, quantitative, discrete and continuous data; primary and secondary dataHD2d/e

Sampling techniques to minimise bias HD2c/d

Questionnaires, observation and measurementHD2c/3a

Sources of secondary data HD3b

Tables and histograms for grouped dataHD2d/3c/4a

Drawing frequency polygons HD4a

PRIOR KNOWLEDGE

An understanding of why data needs to be collected

Experience of simple tally charts

Experience of inequality notation

An understanding of the different types of data: continuous; discrete; categorical

Experience of inequality notation

Ability to multiply a number by a fraction

Use a protractor to measure and draw angles

OBJECTIVES

By the end of the chapter the student should be able to:

Design a suitable question for a questionnaire

Understand the difference between: primary and secondary data; discrete and continuous data

Design suitable data capture sheets for surveys and experiments

Understand about bias in sampling

Choose and justify an appropriate sampling scheme, including random and systematic sampling

Deal with practical problems in data collection, such as non-response, missing and anomalous data

Represent data as: pie charts (for categorical data); bar charts and histograms (equal class intervals): frequency polygons

Choose an appropriate way to display discrete, continuous and categorical data

Understand the difference between a bar chart and a histogram

Compare distributions shown in charts and graphs

RESOURCES

Higher Student book Chapter/section: 5.1–5.6

Higher Practice bookChapter 5

Teaching and Learning softwareChapter 5

DIFFERENTIATION AND EXTENSION

Carry out a statistical investigation of their own including- designing an appropriate means of gathering the data

An investigation into other sampling schemes, such as cluster and quota sampling

Carry out a statistical investigation of their own and use an appropriate means of displaying the results

Use a spreadsheet to draw different types of graphs

Collect examples of charts and graphs in the media which have been misused, and discuss the implications

ASSESSMENT

Heinemann online assessment tool will be available in 2007.

Their own statistical investigation.

GCSE coursework – data handling project.

HOMEWORK

This could include consolidation of work in class by completion of exercise set, additional work of a similar nature, or extension work detailed above.

Completion of data collection exercise and statistical project.

HINTS AND TIPS

Students may need reminding about the correct use of tallies.

Emphasis the differences between primary and secondary data.

If students are collecting data as a group they should all use the same procedure.

Emphasis that continuous data is data that is measured.

Clearly label all axes on graphs and use a ruler to draw straight lines.

Many students enjoy drawing statistical graphs for classroom displays.

Do exercises 5A–5H for practice. Do Mixed Exercise 5 for consolidation.

HIGHER CHAPTER 6SOLVING EQUATIONS AND INEQUALITIESTime: 6–8 hours

SPECIFICATION REFERENCE

A reminder of the balancing method NA5e

Equations where the x coefficient is a fractionNA5e/f

Equations with x on both sides NA5f

Equations with a negative coefficient and x on both sidesNA5f

Equations with brackets NA5f

Equations with algebraic fractions NA5f

Setting up and solving equations NA5a/e/f

Representing inequalities on a number lineNA5j

Solving inequalities in one variable NA5j

Solving inequalitiesNA5j

PRIOR KNOWLEDGE

Experience of finding missing numbers in calculations

The idea that some operations are ‘opposite’ to each other

An understanding of balancing

Experience of using letters to represent quantities

OBJECTIVES

By the end of the chapter the student should be able to:

Solve linear equations with one, or more, operations (including fractional coefficients).

Solve linear equations involving a single pair of brackets.

Rearrange and solve linear inequalities in one variable and show the solution set on a number line, or to write down all the integer solutions.

RESOURCES

Higher Student book Chapter/section: 6.1–6.10

Higher Practice bookChapter 6

Teaching and Learning softwareChapter 6

DIFFERENTIATION AND EXTENSION

Use of inverse operations and rounding to one significant figure could be applied to more complex calculations.

Derive equations from practical situations, such as finding unknown angles in polygons.

Solve second order linear equations.

ASSESSMENT

Heinemann online assessment tool will be available in 2007.

HOMEWORK

This could include consolidation of work in class by completion of exercise set, additional work of a similar nature, or extension work detailed above.

HINTS AND TIPS

Students need to realise that not all linear equations can easily be solved by either observation or trial and improvement, and hence the use of a formal method is vital.

Students can leave their answers in fractional form where appropriate.

Interpreting the direction of an inequality is a problem for many.

Do exercises 6A–6K for practice. Do Mixed Exercise 6 for consolidation.

HIGHER CHAPTER 7TRANSFORMATIONS AND LOCITime: 5–7 hours

SPECIFICATION REFERENCE

Translation, reflection, rotation and enlargementSSM3a/b/c/d/f

Combining two transformationsSSM3b

Drawing and interpreting scale diagrams and mapsSSM3d

Using compasses to construct triangles, perpendiculars and bisectors SSM2h/4c/d

Constructing lociSSM4e

Drawing diagrams and calculating bearingsSSM4a

PRIOR KNOWLEDGE

Recognition of basic shapes

An understanding of the concept of rotation, reflection and enlargement

An ability to use a pair of compasses

The special names of triangles (and angles)

Understanding of the terms perpendicular, parallel and arc

Coordinates in four quadrants

Linear equations parallel to the coordinate axes

ASSUMED KNOWLEDGE

Ability to use a protractor to measure angles

OBJECTIVES

By the end of the chapter the student should be able to:

Understand translation as a combination of a horizontal and vertical shift including signs for directions

Understand rotation as a (clockwise) turn about a given origin

Reflect shapes in a given mirror line; parallel to the coordinate axes and then y = x or y = –x

Enlarge shapes by a given scale factor from a given point; using positive and negative scale factors greater and less than one

Understand that shapes produced by translation, rotation and reflection are congruent to its image

Work out the real distance from a map, e.g. find the real distance represented by 4 cm on a map with scale 1:25 000