How do you determine the nature of stationary points?
The maximum and minimum are determined by the sign of the gradient on either side of the stationary point.
How can you determine if f(x) is increasing on the interval (a, b)?
f(x) is increasing for a < x < b if f’(x) > 0 for a < x < b.
How can you determine if f(x) is decreasing on the interval (a, b)?
f(x) is decreasing for a < x < b if f’(x) < 0 for a < x < b.
What is the gradient of the tangent at a point (x, y)?
The gradient of the tangent is m = f’(x) and is the same as the gradient of the curve at that point.
What is the equation of the tangent line at (x, y)?
The equation of the tangent is y - y₁ = m(x - x₁).
What is the gradient of the normal line at a point (x, y)?
The gradient of the normal is m’ = -1/m and is the perpendicular gradient to the tangent and the curve
What is the equation of the normal line at (x, y)?
The equation of the normal is y - y₁ = m’(x - x₁).
How is the derivative of y with respect to x denoted?
The rate of change of y with respect to x is called the derived function or derivative, denoted as dy/dx.
What is the notation for the derivative of f(x)?
In function notation, the derivative of f(x) is written as f’(x).
What is the formula for differentiation from first principles?
This expression is used to find the derivative of a function.
What does it indicate if the second derivative d²y/dx² is greater than 0?
The point is a minimum.
This means the function is concave up at that point.
What does it indicate if the second derivative d²y/dx² is less than 0?
The point is a maximum.
This means the function is concave down at that point.
What is the second derivative written as?
d²y/dx² or f ‘‘(x)
It represents the rate of change of the gradient from the first derivative.
What are the basic differentiation rules?
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Chapter 1 Proof8
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Chapter 2 Surds And Indices9
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Chapter 3 Quadratic Functions8
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Chapter 4 Equations And Inequalities4
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Chapter 5 Coordinate Geometry18
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Chapter 6 Trigonometry12
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Chapter 7 Polynomials5
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Chapter 8 Graphs And Transformations6
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Chapter 9 Binomial Expansion8
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Chapter 10 Differentiation14
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Chapter 11 Integration3
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Chapter 12 Vectors14
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Chapter 13 Exponentials and Logarithms11
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Chaprer 14 Data Collection5
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Chapter 15 Data Processing Presentation And Interpretation10
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Chapter 16 Probability6
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Chapter 17 Binomial Distribution8
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Chapter 18 Hypothesis Testing Using The Binomial7
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Chapter 19 Kinematics29
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Chapter 20 Forces and Newton's Laws19
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Chapter 21 Variable Acceleration6
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Kinematics15
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Quadratics12
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Inequalities2
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Forces7
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Integration8
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Numerical measures25
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Probability21
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Sampling12
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Y12 Pure 0001 Transition9
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Y12 Pure 001 Indices13
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Y12 Pure 003 Coordinate Geometry8
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Y12 Pure 004 Equation of a Line19
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Y12 Pure 005 Quadratics23
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Y12 Pure 008 Circles15
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Y12 Pure 006 Inequalities17
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Y12 Pure 007 Polynomials13
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Y12 Pure 009 Differentiation23
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Y12 Pure 016 Proof24
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Y12 Pure 012 Binomial Expansion11
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Y12 Pure 015 Curve Sketching and Transformations40
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Y12 Pure 002 Surds12
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Y12 Pure 014 Trigonometry17
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Chapter 1 Proof COPY8
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Chapter 6 Trigonometry COPY12
