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Intro to Trigonometric Calculus (1 of 5: Review questions)
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Classroom Contents
Differential Calculus
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- 1 Find a tangent's equation
- 2 Derivatives of 6 Trigonometric Functions
- 3 Determining Derivatives for cos(x) & tan(x)
- 4 Differentiability (includes counter-examples)
- 5 Differentiating sin(x) from First Principles
- 6 Interesting Discontinuity Example
- 7 Intuitive Approach to Gradient Function of sin(x)
- 8 Differentiating Trigonometric Functions - examples
- 9 Differentiating Exponential Functions (Computer Aided)
- 10 Differentiating Exponential Functions (First Principles)
- 11 Differentiating Exponential Functions: e
- 12 Differentiating Logarithmic Functions
- 13 Differentiating Logarithmic Functions (Examples)
- 14 Differentiating x to the power of x
- 15 Differentiating a^(cos x)
- 16 Differentiating Logarithmic Functions Without Base e
- 17 3 Approaches for Co-ordinate Geometry Question
- 18 Understanding Exponential Functions and their Gradients: First Principles Approach
- 19 Understanding Exponential Functions and their Gradients: Intuitive Approach
- 20 The Derivative of ln x
- 21 Differentiating Log Functions w/ Chain Rule
- 22 Summarising Derivatives of all Trigonometric Functions
- 23 Differentiating 2^(5x)
- 24 Differentiating Exponential Functions (1 of 3: A Visual Argument for the Derivative)
- 25 Differentiating Exponential Functions (2 of 3: Dealing with Any Base)
- 26 Differentiating Exponential Functions (3 of 3: Chain Rule)
- 27 Differentiating x^x (1 of 3: Reviewing Derivatives of Exponentials & Logarithms)
- 28 Establishing the Derivative of ln(x)
- 29 Differentiating x^x (2 of 3: By Changing the Base)
- 30 Harder Examples & Further Applications (Using 'u' to simplify differentiating exp/log functions)
- 31 Calculus of Exponential Products (1 of 3: Finding the Intercepts and Turning Points)
- 32 Calculus of Exponential Products (2 of 3: Comparing the Behaviour at the extremities to find POIs)
- 33 Calculus of Exponential Products (3 of 3: Using the insight from previous parts to sketch function)
- 34 Derivative of natural logarithmic functions (Discovering the connections between each)
- 35 Calculus of Trigonometric Functions (1 of 2: Using First Principles to find d/dx of sinx)
- 36 Calculus of Trigonometric Functions (2 of 2: Using derivative of sinx and cos x to find d/dx(tanx))
- 37 Application of Differentiating Trig Functions (2 of 2: Tangents and normals of a trig function)
- 38 Applications of Differentiating Trig Functions (1 of 2: How is differentiating used in maths?)
- 39 Maths Test Review (1 of 2: Differentiating a product with a log function)
- 40 Chain Rule (1 of 3: Introducing a substitution)
- 41 Chain Rule (2 of 3: Combining derivatives)
- 42 Chain Rule (3 of 3: Proving a circle property)
- 43 Finding a Normal to a Rational Function
- 44 What is continuity?
- 45 Differentiating Exponentials with Non-e Bases
- 46 Calculus of Logarithmic Functions (1 of 4: Introduction)
- 47 Calculus of Logarithmic Functions (2 of 4: Establishing the derivative of ln x)
- 48 Calculus of Logarithmic Functions (3 of 4: Dealing with non-e bases)
- 49 Calculus of Logarithmic Functions (4 of 4: The importance of simplifying first)
- 50 Calculus of Trigonometric Functions (1 of 3: Using visual intuition)
- 51 Calculus of Trigonometric Functions (2 of 3: An alternative version of first principles)
- 52 Calculus of Trigonometric Functions (3 of 3: Proving the basic derivative)
- 53 Differentiating Trigonometric Functions (1 of 2: Key results & chain rule)
- 54 Differentiating Trigonometric Functions (2 of 2: Example using quotient rule)
- 55 Using Derivatives of Trigonometric Functions (1 of 2: Finding a tangent)
- 56 Introducing Calculus of Exponential Functions (1 of 6: Considering other functions)
- 57 Introducing Calculus of Exponential Functions (2 of 6: Characteristics of the gradient)
- 58 Introducing Calculus of Exponential Functions (3 of 6: Using the uniqueness of e)
- 59 Introducing Calculus of Exponential Functions (4 of 6: Simple chain rule examples)
- 60 Introducing Calculus of Exponential Functions (5 of 6: Common mistakes with notation)
- 61 Introducing Calculus of Exponential Functions (6 of 6: Finding equation of a tangent)
- 62 Intro to Trigonometric Calculus (1 of 5: Review questions)
- 63 Intro to Trigonometric Calculus (2 of 5: Investigating the gradient of sin x)
- 64 Intro to Trigonometric Calculus (3 of 5: Investigating gradient magnitude)
- 65 Intro to Trigonometric Calculus (4 of 5: Derivative of cos x)
- 66 Intro to Trigonometric Calculus (5 of 5: Derivative of tan x)
- 67 Differentiating Simple Trigonometric Functions (examples)
- 68 Review of Logarithm Laws
- 69 Differentiating the Logarithmic Function (1 of 5: Using visual intuition)
- 70 Differentiating the Logarithmic Function (2 of 5: Incorporating chain rule)
- 71 Differentiating the Logarithmic Function (3 of 5: Proof by implicit differentiation)
- 72 Differentiating the Logarithmic Function (4 of 5: Restricting domain)
- 73 Differentiating the Logarithmic Function (5 of 5: Equation of a tangent)
- 74 Differentiating Exponentials with Other Bases (1 of 3: Review questions)
- 75 Differentiating Exponentials with Other Bases (2 of 3: Deriving a key result)
- 76 Differentiating Exponentials with Other Bases (3 of 3: Establishing the formula)
- 77 Differentiating Logarithms with Other Bases
- 78 A Turning Point Mystery (1 of 2: Introducing the problem)
- 79 A Turning Point Mystery (2 of 2: An unusual derivative)
- 80 Differential Calculus Exam Review (3 of 3: Product rule, trigonometric functions)
- 81 Differential Calculus Exam Review (2 of 3: Logarithms & exponentials)
- 82 Differential Calculus Exam Review (1 of 3: Chain rule)
- 83 Differentiating Exponential Functions (1 of 2: Reviewing simple derivatives)
- 84 Differentiating Exponential Functions (2 of 2: Step by step Chain Rule)
- 85 Differentiating Exponential Functions continued (2 of 2: Further examples)
- 86 Exponential Functions with Other Bases (1 of 2: Reframing problems)
- 87 Exponential Functions with Other Bases (2 of 2: Deriving the formula)
- 88 Differentiating Logarithmic Functions (1 of 4: Developing intuitions)
- 89 Differentiating Logarithmic Functions (2 of 4: Proving the formula)
- 90 Diffferentiating Logarithmic Functions (3 of 4: Basic examples)
- 91 Differentiating Logarithmic Functions (4 of 4: Further examples)
- 92 Applications of Differentiating Log Functions (1 of 2: Calculating a tangent)
- 93 Applications of Differentiating Log Functions (2 of 2: Calculating a normal)
- 94 Differentiating Trigonometric Functions (1 of 5: Review questions)
- 95 Differentiating Trigonometric Functions (2 of 5: Taking gradient measurements)
- 96 Differentiating Trigonometric Functions (3 of 5: Understanding cos x & tan x)
- 97 Differentiating Trigonometric Functions (4 of 5: Chain rule examples)
- 98 Differentiating Trigonometric Functions (5 of 5: Exploring the derivative of tan x)
- 99 Application of Trigonometric Derivatives (1 of 2: Finding the tangent)
- 100 Application of Trigonometric Derivatives (2 of 2: Evaluating an area)
- 101 Summary of Exponential, Logarithmic & Trigonometric Derivatives
- 102 Question 30 (this year's HSC Mathematics Advanced exam)
