Sixth Form Pure Mathematics

Preface to the Second Edition Chapter I Introduction to the Calculus 1.1 Coordinates and Loci 1.2 The Idea of a Limit 1.3 The Gradient of a Curve 1.4 Differentiation 1.5 Tangents and Normals 1.6 Rates of Change 1.7 Differentiation of a Function of a Function 1.8 Maxima and Minima 1.9 Second Derivative 1.10 Parameters Chapter II Methods of Coordinate Geometry 2.1 The Straight Line 2.2 The Division of a Line 2.3 The Equation of a Circle 2.4 The Intersection of Lines and Circles 2.5 The Parabola x=at2, y=2at, a>0 2.6 The Rectangular Hyperbola x=ct, y=c/t, c>0 2.7 The Semi-Cubical Parabola x=at2, y=at3, a>0 Chapter III Methods of the Calculus 3.1 Integration as The Reverse of Differentiation 3.2 The Constant of Integration 3.3 The Area under a Curve. Definite Integrals 3.4 Volumes of Revolution 3.5 Differentiation of Products and Quotients 3.6 Tangents to Conic SectionsChapter IV The Circular Functions 4.1. Definition of An Angle 4.2. The Circular Functions 4.3. General Solutions of Trigonometric Equations 4.4. Circular Functions of 30°, 60°, 45° 4.5. Relations between The Circular Functions 4.6. Circular Measure 4.7. Vectors 4.8. The Addition Theorems 4.9. Double and Half Angles 4.10. The Addition of Sine Waves 4.11. The Sum-Product Transformations Chapter V The Circular Functions in Calculus and Coordinate Geometry 5.1. The Derivatives of in x and cos x 5.2. Integral Forms 5.3. Differentiation and Integration of Other Circular Functions 5.4. Small Increments 5.5. The Angle between Two Straight Lines 5.6. The Sign of Ax+By+C 5.7. The Perpendicular Form of the Equation of a Straight Line 5.8. Tangents to Circles 5.9. The Ellipse x=a cos 0, y=b sin 0Chapter VI The Quadratic Function and the Quadratic Equation 6.1. The Quadratic Function ax2+bx+c 6.2. The Function 6.3. The Quadratic Equation ax2+bx+c=0 6.4. Some Applications to Coordinate Geometry 6.5. The Cubic Function f(x) = ax3+bx3+cx+d 6.6. Co-Normal Points 6.7. The HyperbolaChapter VII Numerical Trigonometry 7.1. The Solution of Triangles 7.2. Trigonometry in Three Dimensions 7.3. The In-Center and e-Centers of a Triangle 7.4. The Orthocenter and the Altitudes 7.5. The Centroid and the MediansChapter VIII Finite Series 8.1. Definition and Notation 8.2. Arithmetical Progressions 8.3. Geometrical Progressions 8.4. Permutations and Combinations 8.5. Mathematical Induction 8.6. The Binomial Theorem 8.7. Some Other Finite Series 8.8. The Method of Differences 8.9. Finite Power SeriesChapter IX Infinite Series. Maclaurin's Expansion. The Binomial, Exponential and Logarithm Functions 9.1. Successive Approximations 9.2. Maclaurin's Expansion 9.3. The Binomial Series 9.4. The Exponential Function 9.5. The Expansion of Ex 9.6. Logarithms to Any Base 9.7. Natural Logarithms 9.8. Logarithmic Differentiation 9.9. The Logarithm SeriesChapter X Partial Fractions and their Applications. Some Further Methods of Integration 10.1. Partial Fractions 10.2. Application of Partial Fractions to Series Expansions 10.3. Application of Partial Fractions to the Summation of Series 10.4. Application of Partial Fractions to Integration 10.5. Integration by Substitution 10.6. Integration by Parts Answers to the Exercises Index