H2 Chapter K: Integration

Integration Techniques


Description
This course aims to give a clear understanding of H2 Math Techniques of Integration and is suitable for students of different backgrounds.
Content
  • Lesson Notes
  • O Level/IP Integration Refresher sample
  • Integration Lesson Notes
  • Lesson Videos
  • Pg 1 Introduction to Cancelling Method sample
  • Pg 2 Integration Techniques - Cancelling Method
  • Pg 3 Basics of Cancelling Method (i) sample
  • Pg 3 Basics of Cancelling Method (ii)
  • Pg 3 Basics of Cancelling Method (iii)
  • Pg 3 Basics of Cancelling Method (iv)
  • Pg 4 Basics of Cancelling Method (ii)
  • Pg 4 Basics of Cancelling Method (iii) (Integral Similar to 2017 A level) sample
  • Pg 4 Basics of Cancelling Method (vii)
  • Pg 5 Cancelling Method requiring rearrangements sample
  • Pg 5 Cancelling Method requiring rearrangements (i)
  • Pg 6 Cancelling Method requiring rearrangements (i)
  • Pg 6 Cancelling Method requiring rearrangements (ii) sample
  • Pg 6 Cancelling Method requiring rearrangements (iii)
  • Pg 6 Cancelling Method requiring rearrangements (iv) (Root of x)  sample
  • Pg 6 Cancelling Method requiring rearrangements (v)
  • Pg 6 Cancelling Method requiring rearrangements to MF 26 form (i)
  • Pg 6 Cancelling Method requiring rearrangements to MF 26 form (ii)
  • Pg 8 Introduction to Algebraic Fractions Long Division (i)
  • Pg 8 Algebraic Fractions (Long Division) (ii)
  • Pg 8 Algebraic Fraction (Long Division) (iii)
  • Pg 9 Algebraic Fraction (MF 26) (i)
  • Pg 9 Algebraic Fraction Formula
  • Pg 9 Algebraic Fraction (MF 26) (ii)
  • Pg 9 Algebraic Fraction (MF 26) (iii)
  • Pg 9 Algebraic Fraction (MF 26) (iv)
  • Pg 9 Algebraic Fraction (Partial Fraction) (i)
  • Pg 9 Algebraic Fraction (Partial Fraction) (ii)
  • Pg 10 Algebraic Fraction (Basics of Splitting Up)
  • Pg 10 Splitting Up Method (Further Examples) (i)
  • Pg 10 Splitting Up Method (Further Examples) (ii)
  • Pg 11 Basics of Splitting Up - Example (iii)
  • Pg 11 Basics of Splitting Up - Example (iv)
  • Pg 12 Integration of Trigonometric Functions (i) (ii)
  • Pg 12 Integration of Trigonometric Functions (iii) (iv)
  • Pg 12 Integration of Trigonometric Functions (v)
  • Pg 12 Integration of Trigonometric Functions (vi)
  • Pg 12 Integration of Trigonometric Functions (vii) (viii)
  • Pg 13 Integration of Trigonometric Functions (i) (ii)
  • Pg 13 Integration of Trigonometric function (Sum of Trigonometric Ratios)(i)(ii)
  • Pg 14 Integration of Trigonometric Functions (Sum of Trigonometric Ratios) (v)
  • Pg 14 Integration of Trigonometric Functions (Other Techniques)
  • Pg 15 Integration by Parts (i)
  • Pg 15 Choosing u (LIATE)
  • Pg 15 Integration by Parts (ii)
  • Pg 15 Integration by Parts (iii)
  • Pg 15 Integration by Parts II
  • Pg 16 Integration by parts where LIATE fails
  • Pg 16 Infinite Integrals (i)
  • Pg 16 Infinite Integrals (ii)
  • Pg 16 Integration by Parts (iii)
  • Pg 16 Integration by Parts (iv)
  • Pg 17 Infinite Integrals (iii)
  • Pg 18 Introduction to Integration by substitution I
  • Pg 18 Introduction to Integration by substitution II
  • HANDWRITTEN SOLUTIONS FOR PRACTICE QUESTIONS
  • Practice 1 Handwritten Solutions
  • Practice 2 Handwritten Solutions
  • Practice 3 Handwritten Solutions
  • Practice 4 Handwritten Solutions
Completion rules
  • All units must be completed