| # | TOPIC | TITLE | +/- | |
|---|---|---|---|---|
| 1 | Study Plan | Study plan - KS4 Year 11 Higher | Info | Go |
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Objective: On completion of the course formative assessment a tailored study plan is created identifying the lessons requiring revision. |
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| 2 | Algebraic expressions | Algebraic expressions. | Info | Go |
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Objective: On completion of the lesson the student will understand some of the short cuts used in writing algebraic expressions, and the student will be able to write algebraic expressions down in a way that is easier to understand. |
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| 3 | Algebraic expressions | Substitution into algebraic expressions. | Info | Go |
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Objective: On completion of the lesson the student will be able to replace pronumerals with numbers, and then perform the correct operations. |
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| 4 | Algebraic expressions | Directed numbers: addition and subtraction. | Info | Go |
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Objective: On completion of the lesson the student will be able to add and subtract positive and negative numbers in any combination, and understand adding and subtracting positive and negative pronumerals. |
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| 5 | Algebraic expressions | Directed numbers: multiplication and division. | Info | Go |
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Objective: On completion of the lesson the student will understand which combinations of signs produce a positive answer and which ones produce a negative answer. |
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| 6 | Algebraic expressions | Simplifying algebraic expressions: adding like terms. | Info | Go |
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Objective: On completion of the lesson the student will be able to simplify and evaluate numerical expressions containing patterns, and be able to simplify algebraic expressions that contain like terms. |
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| 7 | Algebraic expressions | Simplifying algebraic Expressions: subtracting like terms. | Info | Go |
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Objective: On completion of the lesson the student will be able to recognise the difference between like and unlike terms, and be able to simplify an expression using subtraction. |
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| 8 | Algebraic expressions | Simplifying Algebraic expressions: combining addition and subtraction. | Info | Go |
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Objective: On completion of the lesson the student will understand how to approach algebraic expressions questions and avoid the most common mistakes. |
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| 9 | Algebraic expressions | Simplifying algebraic expressions: multiplication | Info | Go |
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Objective: On completion of the lesson the student will be able to simplify expressions involving multiplication of pronumerals and write them in the simplest form. |
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| 10 | Algebraic expressions | Simplifying algebraic expressions: division | Info | Go |
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Objective: On completion of the lesson the student will be able to use all the operations needed for simplifying algebraic expressions. |
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| 11 | Algebraic expressions | Expanding algebraic expressions: multiplication | Info | Go |
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Objective: On completion of the lesson the student will be able mentally to multiply and remove parentheses from simple algebraic expressions in one step. |
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| 12 | Algebraic expressions | Expanding algebraic expressions: negative multiplier | Info | Go |
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Objective: On completion of the lesson the student will be able to expand expressions using a negative multiplier. |
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| 13 | Algebraic expressions | Expanding and simplifying algebraic expressions | Info | Go |
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Objective: On completion of the lesson the student will be familiar with expanding and simplifying algebraic expressions. |
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| 14 | Algebraic equations | Solving equations containing addition and subtraction | Info | Go |
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Objective: On completion of the lesson the student will understand how solve simple equations involving addition and subtraction by moving everything but the pronumeral onto one side of the equation, leaving the pronumeral by itself on the other side. |
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| 15 | Algebraic equations | Solving equations containing multiplication and division | Info | Go |
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Objective: On completion of the lesson the student will be able to solve simple equations involving all operations. |
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| 16 | Algebraic equations | Solving two step equations | Info | Go |
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Objective: On completion of the lesson the student will be able to solve two step equations. |
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| 17 | Algebraic equations | Solving equations containing binomial expressions | Info | Go |
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Objective: On completion of the lesson the student will be able to move terms in binomial equations. |
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| 18 | Algebraic equations | Equations involving grouping symbols. | Info | Go |
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Objective: On completion of the lesson the student will be able to solve equations using grouping symbols |
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| 19 | Algebraic equations | Equations involving fractions. | Info | Go |
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Objective: On completion of the lesson the student will know how to solve equations using fractions. |
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| 20 | Algebra- formulae | Equations resulting from substitution into formulae. | Info | Go |
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Objective: On completion of the lesson the student will be able to substitute into formulae and then solve the resulting equations. |
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| 21 | Algebra- formulae | Changing the subject of the formula. | Info | Go |
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Objective: On completion of the lesson the student will be able to move pronumerals around an equation using all the rules and operations covered previously. |
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| 22 | Algebra-inequalities | Solving Inequalities. | Info | Go |
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Objective: On completion of the lesson the student will understand the 'greater than' and 'less than' signs, and be able to perform simple inequalities. |
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| 23 | Algebra-factorising | Simplifying easy algebraic fractions. | Info | Go |
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Objective: On completion of the lesson the student will understand how to simplify algebraic fractions by factorising. |
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| 24 | Algebraic fractions | Simplifying algebraic fractions using the index laws. | Info | Go |
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Objective: On completion of the lesson the student will be able to simplify most algebraic fractions using different methodologies. |
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| 25 | Algebra-negative indices | Algebraic fractions resulting in negative indices. | Info | Go |
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Objective: On completion of the lesson the student will be able to understand how to simplify an algebraic fractional expression with a negative index, and also how to write such an expression without a negative index. |
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| 26 | Factorisation | Factorisation of algebraic fractions including binomials. | Info | Go |
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Objective: On completion of the lesson the student should be able to simplify more complex algebraic fractions using a variety of methods. |
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| 27 | Algebraic fractions-binomial | Cancelling binomial factors in algebraic fractions. | Info | Go |
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Objective: On completion of the lesson the student should be able to factorise binomials to simplify fractions. |
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| 28 | Rules for indices/exponents | Adding indices when multiplying terms with the same base | Info | Go |
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Objective: On completion of the lesson the student will know how to use the index law of addition of powers when multiplying terms with the same base. |
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| 29 | Rules for indices/exponents | Subtracting indices when dividing terms with the same base | Info | Go |
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Objective: On completion of the lesson the student will know how to use the index law of subtraction of powers when dividing terms with the same base. |
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| 30 | Rules for indices/exponents | Multiplying indices when raising a power to a power | Info | Go |
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Objective: On completion of the lesson the student will use the law of multiplication of indices when raising a power to a power. |
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| 31 | Rules for indices/exponents | Multiplying indices when raising to more than one term | Info | Go |
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Objective: On completion of the lesson the student will be able to use the law of multiplication of indices when raising more than one term to the same power. |
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| 32 | Rules for indices/exponents | Terms raised to the power of zero | Info | Go |
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Objective: On completion of the lesson the student will learn how to evaluate or simplify terms that are raised to the power of zero. |
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| 33 | Rules for indices/exponents | Negative Indices | Info | Go |
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Objective: On completion of the lesson the student will know how to evaluate or simplify expressions containing negative indices. |
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| 34 | Fractional indices/exponents | Fractional indices | Info | Go |
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Objective: On completion of the lesson the student will know how to evaluate or simplify expressions containing fractional indices. |
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| 35 | Fractional indices/exponents | Complex fractions as indices | Info | Go |
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Objective: On completion of the lesson the student will know how to evaluate or simplify expressions containing complex fractional indices. |
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| 36 | Scientific notation | Scientific notation with larger numbers | Info | Go |
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Objective: On completion of the lesson the student will be able to change numbers greater than 1 to scientific notation. |
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| 37 | Scientific notation | Scientific notation with small numbers | Info | Go |
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Objective: On completion of the lesson the student will be able to change numbers between zero and 1 to scientific notation. |
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| 38 | Scientific notation | Changing scientific notation to numerals | Info | Go |
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Objective: On completion of the lesson the student will be able to change numbers written in scientific notation to basic numerals and be capable of solving problems on the calculator in scientific notation. |
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| 39 | Significant figures | Significant figures | Info | Go |
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Objective: On completion of the lesson the student will be able to observe how many significant figures are in a number and how to express a number to a certain level of significant figures. |
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| 40 | Geometry-angles | Measuring angles | Info | Go |
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Objective: On completion of the lesson the student will be able to measure any angle between 0 and 360 degrees using a protractor, and identify what type of angle it is. |
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| 41 | Geometry-angles | Adjacent angles | Info | Go |
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Objective: On completion of the lesson the student will be able to understand the parts of an angle, what adjacent angles are and how they are used to solve simple angle problems. |
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| 42 | Geometry-angles | Complementary and supplementary angles | Info | Go |
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Objective: On completion of the lesson the student will able to identify Complementary and Supplementary Angles and use this knowledge to solve simple geometric angle problems. |
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| 43 | Geometry-angles | Vertically opposite angles | Info | Go |
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Objective: On completion of the lesson the student will able to identify Vertically Opposite Angles and use this knowledge to solve simple geometric angle problems. |
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| 44 | Geometry-angles | Angles at a Point. | Info | Go |
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Objective: On completion of the lesson the student will able to identify Angles at a Point and use this knowledge and other angles concepts to solve simple geometric angle problems. |
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| 45 | Geometry-angles | Parallel Lines. | Info | Go |
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Objective: On completion of the lesson the student will able to identify corresponding, co-interior and alternate angles. |
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| 46 | Geometry-problems | Additional questions involving parallel lines | Info | Go |
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Objective: On completion of the lesson the student will able to complete two step parallel line questions, and identify other ways to solve them. |
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| 47 | Geometry-triangles | Angle sum of a triangle | Info | Go |
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Objective: On completion of the lesson the student will able to identify and use the angle sum of a triangle theorem to solve geometric problems. |
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| 48 | Geometry-triangles | Exterior angle theorem | Info | Go |
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Objective: On completion of the lesson the student will able to identify and use the exterior angle of a triangle theorem to solve geometric questions. |
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| 49 | Special triangles | Special triangles | Info | Go |
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Objective: On completion of the lesson the student will able to identify an equilateral and an isosceles triangle and solve geometry questions involving these triangles. |
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| 50 | Geometry-quadrilaterals | Quadrilaterals | Info | Go |
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Objective: On completion of the lesson the student will able to find missing angles by using the fact that a quadrilateral's angle sum is 360 degrees. |
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| 51 | Geometry-constructions | Geometric constructions | Info | Go |
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Objective: On completion of the lesson the student will able complete constructions with a ruler and a pair of compasses. |
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| 52 | Geometry problems | More difficult exercises involving parallel lines | Info | Go |
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Objective: On completion of the lesson the student will able to identify corresponding, co-interior and alternate angles in questions that are more difficult than previously completed. Students will also learn to use other geometric properties as well as set out log |
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| 53 | Geometry-reasoning | Further difficult exercises involving formal reasoning | Info | Go |
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Objective: On completion of the lesson the student will be able to identify which geometric properties are needed to complete a question and be able to use formal reasoning to write out this information. |
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| 54 | Geometry-polygons | Angles of regular polygons | Info | Go |
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Objective: On completion of the lesson the student will be able to identify and use the angle sum of a polygon formula, and understand that the external angles of a polygon add up to 360 degrees. |
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| 55 | Geometry-congruence | Congruent triangles, Test 1 and 2 | Info | Go |
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Objective: On completion of the lesson the student will be able to identify which test to use to show two triangles are congruent. |
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| 56 | Geometry-congruence | Congruent triangles, Test 3 and 4 | Info | Go |
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Objective: On completion of the lesson the student will be able to identify other tests to use to show two triangles are congruent. |
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| 57 | Geometry-congruence | Proofs and congruent triangles. | Info | Go |
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Objective: On completion of the lesson the student will be able to set out a formal proof to show that two triangles are congruent. |
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| 58 | Similar triangles | Similar triangles | Info | Go |
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Objective: On completion of the lesson the student will be able to identify which test to use to show two triangles are similar. |
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| 59 | Similar triangles | Using similar triangles to calculate lengths | Info | Go |
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Objective: On completion of the lesson the student will be able to calculate lengths using similar triangles. |
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| 60 | Overlapping triangles | Examples involving overlapping triangles | Info | Go |
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Objective: On completion of the lesson the student will be able to calculate unknown sides in overlapping or adjacent similar triangles. |
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| 61 | Surds | Introducing surds | Info | Go |
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Objective: On completion of the lesson the student will be able to identify and know the properties of surds as irrational numbers and be able to distinguish them from rational numbers. |
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| 62 | Surds | Some rules for the operations with surds | Info | Go |
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Objective: On completion of the lesson the student will know how to use the rules for division and multiplication of surds. |
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| 63 | Surds | Simplifying surds | Info | Go |
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Objective: On completion of the lesson the student will know how to use the rules for simplifying surds using division and multiplication. |
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| 64 | Surds | Creating entire surds | Info | Go |
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Objective: On completion of the lesson the student will be able to write numbers as entire surds and compare numbers by writing as entire surds |
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| 65 | Surds | Adding and subtracting like surds | Info | Go |
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Objective: On completion of the lesson the student will be able to add and subtract surds and simplify expressions by collecting like surds. |
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| 66 | Surds | Expanding surds | Info | Go |
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Objective: On completion of the lesson the student will be able to expand and then simplify binomial expressions involving surds. |
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| 67 | Surds | Binomial expansions | Info | Go |
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Objective: On completion of the lesson the student will be able to expand and simplify the squares of binomial sums and differences involving surds. |
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| 68 | Surds | Conjugate binomials with surds | Info | Go |
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Objective: On completion of the lesson the student will be able to expand and simplify conjugate binomial expressions involving surds. |
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| 69 | Surds | Rationalising the denominator | Info | Go |
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Objective: On completion of the lesson the student will be able to rationalise denominators of fractions where the denominator involves surds. |
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| 70 | Surds | Rationalising binomial denominators | Info | Go |
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Objective: On completion of the lesson the student will be able to rationalise denominators of fractions where the denominator involves binomial expressions. |
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| 71 | Simultaneous equns | Simultaneous equations | Info | Go |
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Objective: On completion of the lesson the student will be able to solve 2 equations with 2 unknown variables by the substitution method. |
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| 72 | Simultaneous equns | Elimination method | Info | Go |
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Objective: On completion of the lesson the student will be able to solve 2 equations with 2 unknown variables by the elimination method. |
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| 73 | Simultaneous equns | Elimination method part 2 | Info | Go |
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Objective: On completion of the lesson the student will be able to solve all types of simultaneous equations with 2 unknown variables by the elimination method. |
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| 74 | Simultaneous equns | Applications of simultaneous equations | Info | Go |
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Objective: On completion of this lesson the student will be able to derive simultaneous equations from a given problem and then solve those simultaneous equations. |
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| 75 | Pythagoras | Find the hypotenuse | Info | Go |
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Objective: On completion of this lesson the student will be able to use Pythagoras' Theorem to calculate the length of the hypotenuse. |
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| 76 | Pythagoras | Find the hypotenuse Part 2 | Info | Go |
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Objective: On completion of this lesson the student will be able to use Pythagoras' Theorem to calculate the length of the hypotenuse using decimals and surds. |
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| 77 | Pythagoras | Calculating a leg of a right-angled triangle | Info | Go |
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Objective: On completion of this lesson the student will be able to use Pythagoras' Theorem to calculate the length of one of the shorter sides of a right triangle. |
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| 78 | Geometry-circles | The circle: to find radii of circles | Info | Go |
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Objective: On completion of the lesson the student will be able to describe a circle mathematically given its equation or its graph. Additionally, the student will be able to work out the equation of a circle given its centre and radius. |
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| 79 | Geometry-circles | The semicircle: to select the equation given the semi circle and vice versa | Info | Go |
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Objective: On completion of the lesson the student will be able to sketch a semicircle given its equation and derive the equation of a given semicircle. |
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| 80 | Geometry-parabola | The parabola: to describe properties of a parabola from its equation | Info | Go |
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Objective: On completion of the lesson the student will be able to predict the general shape and important features of a parabola and then graph the parabola to check the predictions. |
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| 81 | Functions and graphs | Quadratic polynomials of the form y = ax. + bx + c. | Info | Go |
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Objective: On completion of the lesson the student will be able to predict the general shape of a parabola and verify the predictions by sketching the parabola. The student will also be introduced to the discriminant and the axis. |
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| 82 | Functions and graphs | Graphing perfect squares: y=(a-x) squared | Info | Go |
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Objective: On completion of the lesson the student will be able to analyse a curve and then check their work by graphing the curve. |
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| 83 | Graphing roots | Graphing irrational roots | Info | Go |
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Objective: On completion of the lesson the student will be able to solve any polynomial which has real roots, whether they are rational or irrational. |
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| 84 | Graphing binomials | Binomial products. | Info | Go |
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Objective: On completion of the lesson the student will understand the term binomial product and be capable of expanding and simplifying an expression. |
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| 85 | Graphing binomials | Binomial products with negative multiplier | Info | Go |
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Objective: On completion of the lesson the student will understand specific terms and be prepared to expand and simplify different monic binomial products. |
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| 86 | Graphing binomials | Binomial products [non-monic]. | Info | Go |
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Objective: On completion of the lesson, the student will have examined more complex examples with binomial products. |
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| 87 | Squaring binomial | Squaring a binomial. [monic] | Info | Go |
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Objective: On completion of the lesson the student should understand the simple one-step process of squaring a monic binomial. |
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| 88 | Squaring binomial | Squaring a binomial [non-monic]. | Info | Go |
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Objective: On completion of the lesson the student will apply the same rule that is used with monic binomials. |
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| 89 | Factorising | Expansions leading to the difference of two squares | Info | Go |
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Objective: On completion of the lesson the student will understand expansions leading to differences of 2 squares. |
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| 90 | Algebraic expressions-products | Products in simplification of algebraic expressions | Info | Go |
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Objective: On completion of the lesson the student will understand simplification of algebraic expressions in step-by-step processing. |
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| 91 | Algebraic expressions-larger expansions | Algebraic Expressions - Larger expansions. | Info | Go |
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Objective: On completion of the lesson the student will be capable of expanding larger algebraic expressions. |
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| 92 | Algebra-highest common factor | Highest common factor. | Info | Go |
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Objective: On completion of the lesson the student will be capable of turning a simple algebraic expression into the product of a factor in parentheses and identifying the highest common factors of the whole expression. |
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| 93 | Factors by grouping | Factors by grouping. | Info | Go |
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Objective: On completion of the lesson the student will be able to complete the process given just two factors for the whole expression. |
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| 94 | Difference of 2 squares | Difference of two squares | Info | Go |
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Objective: On completion of the lesson the student understand the difference of two squares and be capable of recognising the factors. |
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| 95 | Common fact and diff | Common factor and the difference of two squares | Info | Go |
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Objective: On completion of the lesson the student will be aware of common factors and recognise the difference of two squares. |
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| 96 | Quadratic trinomials | Quadratic trinomials [monic] - Case 1. | Info | Go |
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Objective: On completion of the lesson the student will understand the factorisation of quadratic trinomial equations with all terms positive. |
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| 97 | Factorising quads | Factorising quadratic trinomials [monic] - Case 2. | Info | Go |
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Objective: On completion of the lesson the student will accurately identify the process if the middle term of a quadratic trinomial is negative. |
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| 98 | Factorising quads | Factorising quadratic trinomials [monic] - Case 3. | Info | Go |
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Objective: On completion of the lesson the student will have an increased knowledge on factorising quadratic trinomials and will understand where the 2nd term is positive and the 3rd term is negative. |
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| 99 | Factorising quads | Factorising quadratic trinomials [monic] - Case 4. | Info | Go |
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Objective: On completion of the lesson the student will understand how to factorise all of the possible types of monic quadratic trinomials and specifcally where the 2nd term and 3rd terms are negative. |
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| 100 | Factorising quads | Factorisation of non-monic quadratic trinomials | Info | Go |
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Objective: On completion of the lesson the student will be capable of factorising any quadratic trinomial. |
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| 101 | Factorising quads | Factorisation of non-monic quadratic trinomials - moon method | Info | Go |
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Objective: On completion of the lesson the student know two methods for factorisation of quadratic trinomials including the cross method. |
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| 102 | Sum/diff 2 cubes | Sum and difference of two cubes. | Info | Go |
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Objective: On completion of the lesson the student will be cognisant of the sum and difference of 2 cubes and be capable of factorising them. |
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| 103 | Algebraic fractions | Simplifying algebraic fractions. | Info | Go |
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Objective: On completion of the lesson the student should be familiar with all of the factorisation methods presented to this point. |
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| 104 | Trigonometry-ratios | Trigonometric ratios. | Info | Go |
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Objective: On completion of the lesson the student will be able to identify the hypotenuse, adjacent and opposite sides for a given angle in a right angle triangle. The student will be able to label the side lengths in relation to a given angle e.g. the side c is op |
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| 105 | Trigonometry-ratios | Using the calculator. | Info | Go |
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Objective: On completion of the lesson the student will be able to use the calculator to find values for the sine, cosine and tangent ratios of acute angles. |
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| 106 | Trigonometry-ratios | Using the trigonometric ratios to find unknown length. [Case 1 Sine]. | Info | Go |
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Objective: On completion of the lesson the student will be able to use the sine ratio to calculate lengths and distances. |
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| 107 | Trigonometry-ratios | Using the trigonometric ratios to find unknown length. [Case 2 Cosine]. | Info | Go |
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Objective: On completion of the lesson the student will be able to use the cosine ratio to find the length of the adjacent side of a right angle triangle. |
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| 108 | Trigonometry-ratios | Using the trigonometric ratios to find unknown length. [Case 3 Tangent Ratio]. | Info | Go |
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Objective: On completion of the lesson the student will be able to use the tangent ratio to calculate the length of the opposite side in a right angle triangle. |
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| 109 | Trigonometry-ratios | Unknown in the denominator. [Case 4]. | Info | Go |
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Objective: On completion of the lesson the student will understand how to use the trig ratios to calculate lengths and distances when the denominator is unknown. |
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| 110 | Trigonometry-compass | Bearings - the compass. | Info | Go |
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Objective: On completion of the lesson the student will be able to identify compass bearings, compass bearings with acute angles and 3 figure bearings from true north. |
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| 111 | Trigonometry-elevation | Angles of elevation and depression. | Info | Go |
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Objective: On completion of the lesson the student will be able to identify angles of depression and angles of elevation, and the relationship between them. |
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| 112 | Trigonometry-practical | Trigonometric ratios in practical situations. | Info | Go |
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Objective: On completion of the lesson the student will be able to use trigonometric ratios to solve problems involving compass bearings and angles of depression and elevation. |
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| 113 | Trigonometry-ratios | Using the calculator to find an angle given a trigonometric ratio. | Info | Go |
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Objective: On completion of the lesson the student will be capable of using a calculator to find the value of an unknown angle when given a trigonometric ratio. |
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| 114 | Trigonometry- ratios | Using the trigonometric ratios to find an angle in a right-angled triangle. | Info | Go |
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Objective: On completion of the lesson the student will be able to find the value of an unknown angle in a right angle triangle given the lengths of 2 of the sides. |
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| 115 | Trigonometry-exact ratios | Trigonometric ratios of 30., 45. and 60. - exact ratios. | Info | Go |
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Objective: On completion of the lesson the student will be able to find the exact sine, cosine and tangent ratios for the angles 30., 45.and 60. |
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| 116 | Trigonometry-cosine rule | The cosine rule to find an unknown side. [Case 1 SAS]. | Info | Go |
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Objective: On completion of the lesson the student will be able to use the cosine rule to find the length of an unknown side of a triangle knowing 2 sides and the included angle. |
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| 117 | Trigonometry-cosine rule | The cosine rule to find an unknown angle. [Case 2 SSS]. | Info | Go |
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Objective: On completion of the lesson the student will be able to find the size of an unknown angle of a triangle using the cosine rule given the lengths of the 3 sides. |
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| 118 | Trigonometry-sine rule | The sine rule to find an unknown side. Case 1. | Info | Go |
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Objective: On completion of the lesson the student will be able to use the Sine rule to find the length of a particular side when the student is given the sizes of 2 of the angles and one of the sides. |
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| 119 | Trigonometry-sine rule | The sine rule to find an unknown angle. Case 2. | Info | Go |
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Objective: On completion of the lesson the student will be able to use the sine rule to find an unknown angle when given 2 sides and a non-included angle. |
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| 120 | Trigonometry-areas | The area formula | Info | Go |
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Objective: On completion of the lesson the student will be able to use the sine formula for finding the area of a triangle given 2 sides and the included angle. |
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| 121 | Quadratic equations | Introduction to quadratic equations. | Info | Go |
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Objective: On completion of the lesson the student will understand simple quadratic equations. |
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| 122 | Quadratic equations | Quadratic equations with factorisation. | Info | Go |
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Objective: On completion of the lesson the student will be able to find both roots of a quadratic equation by factorising. |
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| 123 | Quadratic equations | Solving quadratic equations. | Info | Go |
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Objective: On completion of the lesson the student will have gained more confidence in working with quadratic equations. |
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| 124 | Quadratic equations | Completing the square | Info | Go |
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Objective: On completion of the lesson the student will understand the process of completing the square. |
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| 125 | Quadratic equations | Solving quadratic equations by completing the square | Info | Go |
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Objective: On completion of the lesson the student will understand the reasoning behind completing the square. |
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| 126 | Quadratic equations | The quadratic formula | Info | Go |
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Objective: On completion of the lesson the student will be familiar with the quadratic formula. |
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| 127 | Quadratic equations | Problem solving with quadratic equations | Info | Go |
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Objective: On completion of the lesson the student will be able to express a problem as a quadratic equation and then solve it. |
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| 128 | Quadratic equations | Solving simultaneous quadratic equations graphically | Info | Go |
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Objective: On completion of the lesson the student will better understand why quadratic equations have two solutions and will be capable of solving quadratic equations and problems graphically.. |
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| 129 | Coordinate Geometry-the plane | Distance formula. | Info | Go |
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Objective: On completion of the lesson the student will be able to calculate the distance between any two points on the number plane and interpret the results. |
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| 130 | Coordinate Geometry-midpoint, slope | Mid-point formula | Info | Go |
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Objective: On completion of the lesson the student will be able to understand the mid point formula and use it practically. |
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| 131 | Coordinate Geometry-gradient | Gradient | Info | Go |
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Objective: On completion of the lesson the student will be able to calculate the gradient of a line given its inclination, or angle to the positive direction of the x-axis; or its rise and run. |
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| 132 | Coordinate Geometry-gradient | Gradient formula. | Info | Go |
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Objective: On completion of the lesson the student will be able to calculate the gradient of a line given any two points on the line and also be capable of checking whether 3 or more points lie on the same line and what an unknown point will make to parallel lines. |
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| 133 | Coordinate Geometry-straight line | The straight line. | Info | Go |
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Objective: On completion of the lesson the student will be able to draw a line which is parallel to either axis and comment on its gradient, where that gradient exists. |
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| 134 | Coordinate Geometry-slope, etc. | Lines through the origin. | Info | Go |
|
Objective: On completion of the lesson the student will be able to draw a line which passes through the origin of the form y=mx and comment on its gradient compared to the gradients of other lines through the origin and use the information to solve problems. |
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| 135 | Coordinate Geometry-equation of line | General form of a line and the x and y Intercepts. | Info | Go |
|
Objective: On completion of the lesson the student will be able to change the equation of a straight line from the form, written as y=mx+c, into the general form and vice versa. |
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| 136 | Coordinate Geometry-intercept | Slope intercept form of a line. | Info | Go |
|
Objective: On completion of the lesson the student will be able to find the slope and intercept given the equation and given the slope and intercept, derive the equation. |
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| 137 | Coordinate Geometry-point slope | Point slope form of a line | Info | Go |
|
Objective: On completion of the lesson the student will understand how to derive the equation of a straight line given the gradient and a point on the line. |
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| 138 | Statistics | Frequency distribution table | Info | Go |
|
Objective: On completion of the lesson the student will be able to construct a frequency distribution table for raw data and interpret the table. |
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| 139 | Statistics | Frequency histograms and polygons | Info | Go |
|
Objective: On completion of the lesson the student will be able to construct and interpret frequency histograms and polygons. |
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| 140 | Statistics | Relative frequency | Info | Go |
|
Objective: On completion of the lesson the student will be able to collect, display and make judgements about data. |
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| 141 | Statistics | The range. | Info | Go |
|
Objective: On completion of the lesson the student will be able to determine the range of data in either raw form or in a frequency distribution table. |
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| 142 | Statistic-probability | The mode | Info | Go |
|
Objective: On completion of the lesson the student will understand how to find the mode from raw data, a frequency distribution table and polygon. |
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| 143 | Statistic-probability | The mean | Info | Go |
|
Objective: On completion of the lesson the student will be able to calculate means from raw data and from a frequency table using an fx column. |
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| 144 | Statistic-probability | The median | Info | Go |
|
Objective: On completion of the lesson the student will be able to determine the median of a set of raw scores |
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| 145 | Statistic-probability | Cumulative frequency | Info | Go |
|
Objective: On completion of the lesson the student will be able to construct cumulative frequency columns, histograms and polygons. |
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| 146 | Statistic-probability | Calculating the median from a frequency distribution | Info | Go |
|
Objective: On completion of the lesson the student will be able to determine the median from a cumulative frequency polygon. |
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| 147 | Statistic-probability | Probability of Simple Events | Info | Go |
|
Objective: On completion of the lesson the student will be able to understand the probability of simple events. |
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| 148 | Statistic-probability | Rolling a pair of dice | Info | Go |
|
Objective: On completion of the lesson the student will be capable of ascertaining the probability of certain results when 2 dice are thrown simultaneously. |
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| 149 | Statistic-probability | Experimental probability | Info | Go |
|
Objective: On completion of this lesson the student will be able to find the probabilities in an experimental trial. |
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| 150 | Statistic-probability | Tree diagrams - not depending on previous outcomes | Info | Go |
|
Objective: On completion of the lesson the student will be confident in drawing tree diagrams to list outcomes of a multi stage probability problem and then finding probabilities of certain events not depending on previous outcomes. |
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| 151 | Statistic-probability | Tree diagrams - depending on previous outcomes | Info | Go |
|
Objective: On completion of the lesson the student will be confident in drawing tree diagrams to list outcomes of other multi stage probability problems and then finding probabilities of certain events depending on previous outcomes. |
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| 152 | Statistic-probability | The complementary result .. | Info | Go |
|
Objective: On completion of the lesson the student will be capable of ascertaining the probability of certain results where the complementary event is involved. |
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| 153 | Statistic-probability | P[A or B] When A and B are NOT mutually exclusive | Info | Go |
|
Objective: On completion of this lesson the student will be able to distinguish between mutually exclusive and non mutually exclusive events and be able to find the probabilities of both. |
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| 154 | Statistic-probability | Binomial Theorem. | Info | Go |
|
Objective: On completion of this lesson the student will use Pascal's triangle and the binomial theorem to write the expansion of binomial expressions raised to integer powers. |
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| 155 | Statistic-probability | Binomial probabilities using the Binomial Theorem | Info | Go |
|
Objective: On completion of the lesson the student will be able to solve certain types of probability questions using the binomial theorem |
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| 156 | Statistic-probability | Counting techniques and ordered selections - permutations | Info | Go |
|
Objective: On completion of this lesson the student will be competent in using some new counting techniques used for solving probability. |
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| 157 | Statistic-probability | Unordered selections - combinations | Info | Go |
|
Objective: On completion of the lesson the student will be able to use the formula, n c r both with and without a calculator and be able to use it to solve probability problems where unordered selections happen. |
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| 158 | Matrices | Basic concepts | Info | Go |
|
Objective: On completion of the lesson the student will have had an introduction to matrices |
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| 159 | Matrices | Addition and subtraction of matrices | Info | Go |
|
Objective: On completion of this lesson the student will be able to recognise when addition and subtraction of matrices is possible, and perform these operations. |
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| 160 | Transformations | Special transformations - reflections, rotations and enlargements. | Info | Go |
|
Objective: On completion of the lesson the student will be able to perform transformations: to rotate, reflect and change the size of various shapes and or points where applicable. |
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| 161 | Vectors | Vectors | Info | Go |
|
Objective: On completion of the lesson the student will be able to represent a vector in matrix and diagrammatic form, as well as add two vectors using matrices and/or a diagram. |
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| 162 | Statistics | Stem and Leaf Plots along with Box and Whisker Plots | Info | Go |
|
Objective: On completion of the lesson the student will be familiar with vocabulary for statistics including quartiles, mode, median, range and the representation of this information on a Box and Whisker Plot. |
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| 163 | Statistics | Scatter Plots | Info | Go |
|
Objective: On completion of the lesson the student will be able to construct scatter plots and draw conclusions from these. |
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| 164 | Translations | Transformations - reflections | Info | Go |
|
Objective: On completion of the lesson the student will be able to take a pre-image and using the appropriate techniques, accurately show its image after reflection. |
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| 165 | Geometric transformations | The definition and concept of combined transformations resulting in an equivalent single transformation. | Info | Go |
|
Objective: On completion of this lesson the student will combine reflections and glide transformations to produce single isometric transformations. |
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| 166 | Trig-reciprocal ratios | Reciprocal ratios. | Info | Go |
|
Objective: On completion of the lesson the student will be able to identify and use the reciprocal trigonometric ratios of sine, cosine and tan, that is, the cosecant, secant and cotangent ratios. |
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| 167 | Trig complementary angles | Complementary angle results. | Info | Go |
|
Objective: On completion of the lesson the student will understand how to establish the complementary angle results for the sine and cosine ratios and then how to use these results to solve trig equations. |
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| 168 | Trig identities | Trigonometric identities | Info | Go |
|
Objective: On completion of the lesson the student will be able to simplify trigonometrical expressions and solve trigonometry equations using the knowledge of trig identities. |
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| 169 | Trig larger angles | Angles of any magnitude | Info | Go |
|
Objective: On completion of the lesson the student will be able to find the trigonometric values of angles of any magnitude by assigning angles to the four quadrants of the circle. |
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| 170 | Trig larger angles | Trigonometric ratios of 0°, 90°, 180°, 270° and 360° | Info | Go |
|
Objective: On completion of the lesson the student will learn how to find the Trigonometric Ratios of 0, 90, 180, 270 and 360 degrees. |
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| 171 | Graph sine | Graphing the trigonometric ratios - I Sine curve. | Info | Go |
|
Objective: On completion of the lesson the student will recognise and draw the sine curve exploring changes in amplitude and period. |
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| 172 | Graph cosine | Graphing the trigonometric ratios - II Cosine curve. | Info | Go |
|
Objective: On completion of the lesson the student will know how to recognise and draw the cosine curve exploring changes in amplitude and period. |
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| 173 | Graphs tan curve | Graphing the trigonometric ratios - III Tangent curve. | Info | Go |
|
Objective: On completion of the lesson the student will know how to recognise and draw the tan curve. |
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| 174 | Graph reciprocals | Graphing the trigonometric ratios - IV Reciprocal ratios. | Info | Go |
|
Objective: On completion of the lesson the student will know how to recognise and draw the curves of the reciprocal ratios: cosec, sec and cot. |
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| 175 | Logarithms-Power of 2 | Powers of 2. | Info | Go |
|
Objective: On completion of the lesson the student should be able to convert between logarithmic statements and index statements to the power of 2. |
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| 176 | Logarithms-Equations and logs | Equations of type log x to the base 3 = 4. | Info | Go |
|
Objective: On completion of the lesson the student will have an enhanced understanding of the definition of a logarithm and how to use it to find an unknown variable which in this case is the number from which the logarithm evolves. |
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| 177 | Logarithms-Equations and logs | Equations of type log 32 to the base x = 5. | Info | Go |
|
Objective: On completion of the lesson the student will have an enhanced understanding of the definition of a logarithm and how to use it to find an unknown variable which in this case is the base from which the number came. |
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| 178 | Logarithms-Log laws | Laws of logarithms. | Info | Go |
|
Objective: On completion of the lesson the student will be familiar with 5 logarithm laws. |
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| 179 | Logarithms-Graph-log curve | The graph of the logarithmic curve | Info | Go |
|
Objective: On completion of the lesson the student will be able to draw a logarithmic curve to a given base and know the general properties of log curves. |
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| 180 | Logarithms-Log curves | Working with log curves. | Info | Go |
|
Objective: On completion of the lesson the student will be able to solve problems with log curves |
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| 181 | Algebra-polynomials | Introduction to polynomials | Info | Go |
|
Objective: On completion of the lesson the student will understand all the terminology associated with polynomials and be able to judge if any algebraic expression is a polynomial or not. |
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| 182 | Algebra-polynomials | The sum, difference and product of two polynomials. | Info | Go |
|
Objective: On completion of the lesson the student will be able to add subtract and multiply polynomials and find the degrees of the answers. |
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| 183 | Algebra-polynomials | Polynomials and long division. | Info | Go |
|
Objective: On completion of the lesson the student will understand the long division process with polynomials. |
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| 184 | Circle Geometry | Theorem - Equal arcs on circles of equal radii subtend equal angles at the centre. Theorem - Equal angles at the centre of a circle on equal arcs. | Info | Go |
|
Objective: On completion of the lesson the student will be able to prove that 'Equal arcs on circles of equal radii, subtend equal angles at the centre', and that 'Equal angles at the centre of a circle stand on equal arcs.' They should then be able to use these pro |
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| 185 | Circle Geometry | Theorem - The perpendicular from the centre of a circle to a chord bisects the chord. Theorem - The line from the centre of a circle to the mid-point of the chord is perpendicular to the chord. | Info | Go |
|
Objective: On completion of the lesson the student will be able to prove that 'The perpendicular from the centre of a circle to a chord bisects the chord.' and its converse theorem 'The line from the centre of a circle to the mid-point of the chord is perpendicular' |
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| 186 | Circle Geometry | Theorem - Equal chords in equal circles are equidistant from the centres. Theorem - Chords in a circle which are equidistant from the centre are equal. | Info | Go |
|
Objective: On completion of the lesson the student will be able to prove that equal chords in equal circles are equidistant from the centre. |
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| 187 | Circle Geometry | Theorem - The angle at the centre of a circle is double the angle at the circumference standing on the same arc. | Info | Go |
|
Objective: On completion of the lesson the student will be able to prove that the angle at the centre of a circle is double the angle at the circumference standing on the same arc. |
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| 188 | Circle Geometry | Theorem - Angles in the same segment of a circle are equal. | Info | Go |
|
Objective: On completion of the lesson the student will be able to prove that the angles in the same segment are equal. |
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| 189 | Circle Geometry | Theorem - The angle of a semi-circle is a right angle. | Info | Go |
|
Objective: On completion of the lesson the student will be able to prove that 'The angle of a semi-circle is a right-angle.' |
||||
| 190 | Circle Geometry | Theorem - The opposite angles of a cyclic quadrilateral are supplementary. | Info | Go |
|
Objective: On completion of the lesson the student will be able to prove that the opposite angles of a cyclic quadrilateral are supplementary. |
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| 191 | Circle Geometry | Theorem - The exterior angle at a vertex of a cyclic quadrilateral equals the interior opposite angle. | Info | Go |
|
Objective: On completion of the lesson the student will be able to prove that the exterior angle at a vertex of a cyclic quadrilateral equals the interior opposite. |
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| 192 | Circle Geometry | Theorem - The tangent to a circle is perpendicular to the radius drawn to it at the point of contact. | Info | Go |
|
Objective: On completion of the lesson the student will be able to prove that the tangent and the radius of a circle are perpendicular at the point of contact. |
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| 193 | Circle Geometry | Theorem - Tangents to a circle from an external point are equal. | Info | Go |
|
Objective: On completion of the lesson the student will be able to prove that tangents to a circle from an external point are equal. |
||||
| 194 | Circle Geometry | Theorem - The angle between a tangent and a chord through the point of contact is equal to the angle in the alternate segment. | Info | Go |
|
Objective: On completion of the lesson the student will be able to prove that the angle between a tangent and a chord through the point of contact is equal to the angle in the alternate segment. |
||||
| 195 | Sequences and Series | General sequences. | Info | Go |
|
Objective: On completion of the lesson the student will be able to work out a formula from a given number pattern and then be able to find particular terms of that sequence using the formula. |
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| 196 | Sequences and Series | Finding Tn given Sn. | Info | Go |
|
Objective: On completion of the lesson the student will understand the concept that the sum of n terms of a series minus the sum of n minus one terms will yield the nth term. |
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| 197 | Arithmetic Progression | The arithmetic progression | Info | Go |
|
Objective: On completion of the lesson the student will be able to test if a given sequence is an Arithmetic Progression or not and be capable of finding a formula for the nth term, find any term in the A.P. and to solve problems involving these concepts. |
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| 198 | Arithmetic Progression | Finding the position of a term in an A.P. | Info | Go |
|
Objective: On completion of the lesson the student will be able to solve many problems involving finding terms of an Arithmetic Progression. |
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| 199 | Arithmetic Progression | Given two terms of A.P., find the sequence. | Info | Go |
|
Objective: On completion of the lesson the student will be able to find any term of an Arithmetic Progression when given two terms |
||||
| 200 | Arithmetic Progression | Arithmetic means | Info | Go |
|
Objective: On completion of the lesson the student will be able to make an arithmetic progression between two given terms. This could involve finding one, two, or even larger number of arithmetic means. |
||||
| 201 | Arithmetic Progression | The sum to n terms of an A.P. | Info | Go |
|
Objective: On completion of the lesson the student will understand the formulas for the sum of an Arithmetic Progression and how to use them in solving problems. |
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| 202 | Sequences and Series-Compound interest | Compound interest | Info | Go |
|
Objective: On completion of the G.P. lesson the student will understand the compound interest formula and how to use it and adjust the values of r and n, if required, for different compounding periods. |
||||
| 203 | Sequences and Series-Superannuation | Superannuation. | Info | Go |
|
Objective: On completion of the lesson the student will understand the method of finding the accumulated amount of a superannuation investment using the sum formula for a G.P. |
||||
| 204 | Sequences and Series-Time payments | Time payments. | Info | Go |
|
Objective: On completion of the lesson the student will have examined examples carefully and be capable of setting out the long method of calculating a regular payment for a reducible interest loan. |
||||
| 205 | Sequences and Series | Applications of arithmetic sequences | Info | Go |
|
Objective: On completion of the lesson the student will be capable of problems involving practical situations with arithmetic series. |
||||
| 206 | Circle Geometry-chords | Theorem - The products of the intercepts of two intersecting chords are equal. | Info | Go |
|
Objective: On completion of the lesson the student will be able to prove that 'The product of the intercepts of two intersecting chords are equal.', and use this result to complete questions that require this knowledge. |
||||
| 207 | Circle Geometry-tangents | Theorem - The square of the length of the tangent from an external point is equal to the product of the intercepts of the secant passing through this point. [Including Alternate Proof] | Info | Go |
|
Objective: On completion of the lesson the student will be able to prove and apply 'The square of the length of the tangent from an external point is equal to the product of the intercepts of the secant passing through this point ', and use this result to complete q |
||||
| 208 | Circle Geometry-cyclic quads | Theorem - If the opposite angles in a quadrilateral are supplementary then the quadrilateral is cyclic. | Info | Go |
|
Objective: On completion of the lesson the student will be able to prove that a quadrilateral is cyclic using the supplementary angles theorem. |
||||
| 209 | Circle Geometry-subtending | Theorem - If an interval subtends equal angles at two points on the same side of it, then the end points of the interval and the two points are concyclic. | Info | Go |
|
Objective: On completion of the lesson the student will be able to prove that ' If an interval subtends equal angles at two points on the same side of it, then the end points of the interval and the two points are concyclic', and use this result to complete the ques |
||||
| 210 | Circle Geometry | Theorem - When circles touch, the line of the centres passes through the point of contact. | Info | Go |
|
Objective: On completion of the lesson the student will be able to prove that ' When two circles touch, the line of the centres passes through the point of contact', and use this result to complete questions that require it. |
||||
| 211 | Circle Geometry-non-collinear | Theorem - Any three non-collinear points lie on a unique circle whose centre is the point of concurrency of the perpendicular bisectors of the intervals joining these points. | Info | Go |
|
Objective: On completion of the lesson the student will be able to prove that ' Any three non-collinear points lie on a unique circle whose centre is the point of concurrency of the perpendicular bisectors of the intervals joining these points', and use this knowled |
||||
| 212 | Exam | Exam - KS4 Year 11 Higher | Info | Go |
|
Objective: Exam |
||||
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