Calvin Science 分別設有 DSE/IGCSE/IAL/GCE 數學課程
  • 課程除了適合本地升學的學生,亦適合考國際試,到海外升學的學生
  • 課程設有專校班,可根據學校進度,為學生度身訂造課程
  • 現有專校班包括:DGS, DBS, MCS, SPC, SPCC, SHCC, SFCC
  • 三大課程包括:常規班、操卷班和精讀班
  • 數學科更設有中六限定課程包括: 模擬考試和 Super Revision
常規班 (Regular Course)
  • 跟據學校進度教授每個課題的基本概念和公開試題型
  • 每個課題均設有獨門筆記,拆解多種不同題型,清晰易明
  • 提供收納多種校內試題題型的試題庫,助學生校內考試得心應手
  • 定期設計測驗,並親自批改,助同學操練至最佳備戰狀態
操卷班 (Paper Training Course)
  • 每個課題均設有大量操題練習
  • 教導學生逐步思考,訓練答題思維
  • 操卷設有不同難度,學生可操練由基礎的 CE By Topic / DSE By Topic 題目至高難度的 DSE/AL題目
  • 學生亦可選擇操練學校歷屆 Past Paper (視乎學校及學生級別)
精讀班 (Intensive Course)
  • 每個課題設有老師編寫的詳盡精讀筆記
  • 課程極速完成考試課題
  • 幫助學生掌握每課重點
模擬考試 (Mock Examination)
  • 每年舉行兩次大型的模擬考試
  • 提供專業評卷、改卷及試後分析
  • 幫助應試生累積實戰經驗
Super Revision Course (SR)
  • 課程重點與學生重溫 Maths DSE 所有核心課題
  • 每個課題設有獨門筆記、Past Paper、Exercise、Assignment、Test
Mathematics DSE Core Topics 包括: Number systems, Equations of straight lines, Quadratic equations, Basic knowledge of functions, Quadratic functions, Polynomials, Exponential functions, Logarithmic functions, Rational functions, Basic properties of circles I, Basic properties of circles II, Basic trigonometry, Equations, Inequalities in one unknown, Graphs of functions, Permutation and combination, Probability, Variations, Equations of circles, Locus, Solving triangles, Applications of trigonometry, Measure of dispersion, Arithmetic sequences, Geometric sequences, Linear inequalities in two unknowns and linear programming, Surds, Mathematical induction, Binomial theorem, Trigonometry, Limits, Differentiation, Applications of differentiation, Indefinite integrals, Definite integrals, Applications of definite integrals, Matrices and determinants, Systems of linear equations, Introduction to vectors, Scalar product and vector product, Applications of scalar product and vector product, Mensuration Mathematics DSE M2 Topics 包括: Surds, Factorial notation, Summation notation, Mathematical induction, Binomial theorem, Trigonometry, Limits, Differentiation, Applications of differentiation, Indefinite integrals, Definite integrals, Applications of definite integrals, Matrices and determinants, Systems of linear equations, Introduction to vectors, Scalar product and vector product, Applications of scalar product and vector product Mathematics IGCSE Topics 包括: Decimals, Special numbers, powers and roots, Fractions, Percentages, Ratio and proportion, Indices and standard form, Degree of accuracy, Set language, notation and Venn diagrams, Algebraic manipulation, Expressions, formulae and rearranging formulae, Linear equations and inequalities, Sequences, Real life graphs, Linear graphs, Quadratic equations and graphs, Harder graphs and transformation of graphs, Simultaneous equations, Function notation, Calculus, Compound measures, Geometry of shapes, Constructions and bearings, Perimeter, area and volume, Pythagoras’ theorem and trigonometry, Transformations, Circle properties, Advanced trigonometry, Similar shapes, Vectors, Graphical representation of data, Statistical measures, Probability Mathematics Further Maths Topics 包括: Indices, Surds, Use and properties of logarithms, The functions a^x and log_b x, The manipulation of quadratic expressions and the solution of quadratic equations, The roots of a quadratic equations, Functions of the roots of a quadratic equation, Factor and Remainder theorem, Simultaneous equations, Linear and quadratic inequalities, Graphical representation of linear inequalities, Graphs of polynomials and rational functions, The solution of equations by graphical methods, Arithmetic series, Geometric Series, Binomial Series, Vectors, Rectangular Cartesian coordinates I, The straight line and its equation, Differentiation, Applications of differentiation, Integration, Application of calculus to kinematics, Application of calculus to rates of change, Radian Measure, The three basic trigonometric ratios, Applications of trigonometry in 2 and 3 dimensions, Trigonometric identities Mathematics Pure Maths Topics 包括: Algebraic expressions: basic algebraic manipulation, indices and surds, Quadratic functions: factorising, solving, graphs and discriminants, Equations: quadratic/linear simultaneous, Inequalities: linear and quadratic (including graphical solutions), Graphs: cubic and reciprocal, Transformations: transforming graphs; f(x) notation, Trigonometric ratios and graphs, and area of a triangle in the form 1/2 𝑎𝑏 sin 𝐶 , Radians (exact values), arcs and sectors, Coordinate geometry in the (x, y) plane: Straight-line graphs, parallel/perpendicular, length and area problems, Differentiation: Definition, differentiating polynomials, second derivatives, Gradients, tangents and normals, Integration: Definition as opposite of differentiation, indefinite integrals of x^n, Proof: Examples including proof by deduction, proof by exhaustion and disproof by counter-example, Algebra and functions: Algebraic division and the factor and the remainder theorems, Coordinate geometry in the (x, y) plane: Circles: equation of a circle, geometric problems on a grid, Recurrence and iterations, Arithmetic and geometric sequences and series (proofs of ‘sum formulae’), Sigma notation, The binomial expansion, Exponentials and logarithms: Exponential functions and the laws of logarithms, Trigonometry: Trigonometric identities and equations, Differentiation: Maxima and minima, Definite integrals and areas under curves, The trapezium rule, Simplifying algebraic fractions, Composite and inverse functions, Modulus function, Transformations, Secant, cosecant and cotangent (definitions, identities and graphs) & inverse trigonometric functions, Compound and double (and half) angle formulae, r cos (x ± α) or r sin (x ± α), Exponentials and logarithms: Exponential functions and natural logarithms, Differentiating exponentials, logarithms and the trigonometric functions sin x and cos x, and their sums, differences and multiples, Differentiating products, quotients and using the chain rule, Integrating x^n (including when n = –1), exponentials and trigonometric functions, Integration by recognition of known derivatives and using trigonometric identities, Location of roots, Solving by iterative methods, Proof: Proof by contradiction, Algebra and functions: Partial fractions, Coordinate geometry in the (x, y) plane: Definition and converting between parametric and Cartesian forms, Expanding (a + bx)^n for rational n; knowledge of range of validity, Expansion of functions by first using partial fractions, Differentiating implicit and parametric functions, Rates of change problems (including growth and decay), Volumes of revolution, Integration by substitution, Integration by parts, Use of partial fractions, Differential equations, Definitions, magnitude/direction, addition and scalar multiplication, Position vectors, distance between two points, geometric problems, Vector equation of a line, Scalar product

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