Releases: HastingsMath/mathnotes
MATH NOTES
MATH NOTES v1.0.1
Search all AS-LEVEL Pure 1 files
Search all EDEXCEL Pure 1 and 2 files
Search all IEB and DBE CAPS Pure Math Paper 1 and Paper 2 (South Africa) files
Content overview:
-
Pure Math AS-LEVEL Pure 1 / EdExcel Pure 1 and 2
-
Stat 1 AS-Level and EdExcel
-
Pure Math IEB and DBE CAPS (South Africa) Paper 1
-
Pure Math IEB and DBE CAPS (South Africa) Paper 2
Extended content overview:
1. PURE MATH - (AS-LEVEL PURE 1 / EDEXCEL PURE 1 and 2)
BINOMIAL EXPANSION
OPEN BINOMIAL EXPANSION - With Examples
Includes
- Introduction to Pascal's triangle
- Expanding binomials
- Examples of types of questions
- Finding the coefficient of a specific term
- Finding the term independent of x
- Expanding the binomial
- Finding the coefficient of a specific x where r is not given
- Finding an extra unknown in the binomial
- Two bracket questions
- Binomial estimation / approximation
- Finding an unknown n using the expansion of ncr
COORDINATE GEOMETRY
OPEN COORDINATE GEOMETRY - QUADRATIC FUNCTIONS
QUADRATIC FUNCTIONS
Includes
- General from
- Turning point form
- X-intercept form
- Completing the square
CIRCLES, TANGENTS, TRIANGLES
OPEN COORDINATE GEOMETRY - WITH CIRCLES AND TANGENTS AND TRIANGLES PDF
Includes
- Gradient formula
- tanx=m
- Distance formula
- Midpoint formula
- Perpendicular lines
- Parallel lines
- Straight line formulas
- Circle formulas
- Diameter subtends 90 degrees
- Pythagorus
- Consecucircles
- Secant
- Tangent
- Center radius form
- Perpendicular bisectors of chords
FUNCTIONS
EXPONENTIAL AND LOG FUNCTIONS
OPEN FUNCTIONS - EXPONENTIAL AND LOG FUNCTIONS
Includes:
- Exponential functions introduction, transformations and reflections
- Log functions as inverse of exponential functions
- How to graph exponential and log functions
- Laws of exponents
- Log laws
INTEGRATION AND DIFFERENTIATION
INTEGRATION AND DIFFERENTIATION 1
OPEN INTEGRATION AND DIFFERENTIATION 1
Includes:
Introduction to:
- Power rule to differentiate
- Reverse power rule to integrate
- Chain rule to differentiate
- Reverse chain to rule integrate
INTEGRATION AND DIFFERENTIATION 2
OPEN INTEGRATION AND DIFFERENTIATION 2
Includes:
- Power rule
- Chain rule
- Tangents and normal to the curve
- Stationary points and first derivative (Max/min/point of inflection)
- Second derivative (concavity/nature of stationary points/ point of inflection)
- Sketch of the relationship between the curve, first and second derivative
- Sketching cubic graphs
- Optimisation / modelling
- Definite integrals (area / volume)
SEQUENCES AND SERIES
OPEN SEQUENCES AND SERIES - WITH EXAMPLES
Includes:
- Arithmetic sequences and series
- Geometric sequences and series
- Sigma notation
- Quadratic sequences
- Examples of the following:
- Finding the position
- Finding the value
- Finding a formula for the nth term
- Examples of sigma notation
- Examples of the use of simultaneous equations
- Finding certain terms in a sequence
- Sum to n questions
- Sum to infinity questions
- Problem solving questions
- Problems with extra unknowns in the sequence or series
- Recurring decimals proof using sum to infinity
NATURE OF ROOTS
OPEN NATURE OF ROOTS - WITH EXAMPLES
- Includes notes and examples using the discriminant to comment on the nature of the roots of quadratic functions
POLYNOMIALS
Includes:
- Factoring cubic functions
- Factor and remainder theorem
TRIGONOMETRY
Includes:
- Trig graphs
- Unit circle
- Pythagorus
- Special triangles
- Area rule
- Cos rule
- Sin rule
- Reduction formulae
- Co-ratios
- Cartesian plane quadrants in degrees and radians
- Converting to degrees or radians
- Quotient identity
- Pythagorean identity
- Double angle formulae
- Compound angle formulae
- General solution
OPEN TRIGONOMETRY 2 - CIRCULAR MEASURE
Includes:
- Arc length
- Area of a sector
- Convert radians to degrees
- Convert degrees to radians
- Area of a segment
VECTORS
Includes:
- What are vectors (summary)
- Finding vectors
- Finding the magnitude of a vector
- Finding unit vectors
- Adding vectors
- Subtracting vectors
- Multiplying vectors
- Perpendicular vectors
- Parallel vectors
- Magnitude-direction form
- From magnitude-direction form to component form
- From component form to magnitude-direction form
- Equal vectors
- Position vectors
- The angle between two vectors (scalar product)
- Positive and negative vectors (quick note)
2. STATISTICS (AS-LEVEL STAT1 / EDEXCEL STAT 1)
-Still to add-
3. PURE MATH IEB and DBE/CAPS NSC (South Africa) Paper 1
FUNCTIONS
FUNCTIONS 1
Includes
- Linear (straight line) functions and graphs
- What is a function
- Types of reflections
- Quadratic functions (Parabolas)
- The derivative
- Finding the formula of a tangent to a quadratic function
- Inverse of a function
- Vertical length between functions
- Average gradient
- Maximum and minimum length (optimisation)
- The first and second derivative
- Points of inflection
- The relationship between the graphs of f(x), f'(x) and f''(x)
- Hyperbolic functions
EXPONENTIAL AND LOG FUNCTIONS
OPEN FUNCTIONS - EXPONENTIAL AND LOG FUNCTIONS
Includes:
- Exponential functions introduction, transformations and reflections
- Log functions as inverse of exponential functions
- How to graph exponential and log functions
- Laws of exponents
- Log laws
INTEGRATION AND DIFFERENTIATION
INTEGRATION AND DIFFERENTIATION 1
OPEN INTEGRATION AND DIFFERENTIATION 1
Includes:
Introduction to:
- Power rule to differentiate
- Reverse power rule to integrate
- Chain rule to differentiate
- Reverse chain to rule integrate
INTEGRATION AND DIFFERENTIATION 2
OPEN INTEGRATION AND DIFFERENTIATION 2
Includes:
- Power rule
- Chain rule
- Tangents and normal to the curve
- Stationary points and first derivative (Max/min/point of inflection)
- Second derivative (concavity/nature of stationary points/ point of inflection)
- Sketch of the relationship between the curve, first and second derivative
- Sketching cubic graphs
- Optimisation / modelling
- Definite integrals (area / volume)
SEQUENCES AND SERIES
OPEN SEQUENCES AND SERIES - WITH EXAMPLES
Includes:
- Arithmetic sequences and series
- Geometric sequences and series
- Sigma notation
- Quadratic sequences
- Examples of the following:
- Finding the position
- Finding the value
- Finding a formula for the nth term
- Examples of sigma notation
- Examples of the use of simultaneous equations
- Finding certain terms in a sequence
- Sum to n questions
- Sum to infinity questions
- Probl...
MATH NOTES
MATH NOTES v1.0.0
PURE MATH
BINOMIAL EXPANSION
OPEN BINOMIAL EXPANSION - With Examples
DOWNLOAD BINOMIAL EXPANSION - With Examples PDF
Includes
- Introduction to Pascal's triangle
- Expanding binomials
- Examples of types of questions
- Finding the coefficient of a specific term
- Finding the term independent of x
- Expanding the binomial
- Finding the coefficient of a specific x where r is not given
- Finding an extra unknown in the binomial
- Two bracket questions
- Binomial estimation / approximation
- Finding an unknown n using the expansion of ncr
COORDINATE GEOMETRY
OPEN COORDINATE GEOMETRY - QUADRATIC FUNCTIONS
DOWNLOAD COORDINATE GEOMETRY - QUADRATIC FUNCTIONS PDF
QUADRATIC FUNCTIONS
Includes
- General from
- Turning point form
- X-intercept form
- Completing the square
CIRCLES, TANGENTS, TRIANGLES
OPEN COORDINATE GEOMETRY - WITH CIRCLES AND TANGENTS AND TRIANGLES PDF
DOWNLOAD COORDINATE GEOMETRY - WITH CIRCLES AND TANGENTS AND TRIANGLES PDF
Includes
- Gradient formula
- tanx=m
- Distance formula
- Midpoint formula
- Perpendicular lines
- Parallel lines
- Straight line formulas
- Circle formulas
- Diameter subtends 90 degrees
- Pythagorus
- Consecucircles
- Secant
- Tangent
- Center radius form
- Perpendicular bisectors of chords
FUNCTIONS
EXPONENTIAL AND LOG FUNCTIONS
OPEN FUNCTIONS - EXPONENTIAL AND LOG FUNCTIONS
DOWNLOAD FUNCTIONS - EXPONENTIAL AND LOG FUNCTIONS PDF
Includes:
- Exponential functions introduction, transformations and reflections
- Log functions as inverse of exponential functions
- How to graph exponential and log functions
- Laws of exponents
- Log laws
INTEGRATION AND DIFFERENTIATION
INTEGRATION AND DIFFERENTIATION 1
OPEN INTEGRATION AND DIFFERENTIATION 1
DOWNLOAD INTEGRATION AND DIFFERENTIATION 1 PDF
DOWNLOAD CHAIN RULE EXAMPLES PDF
Includes:
Introduction to:
- Power rule to differentiate
- Reverse power rule to integrate
- Chain rule to differentiate
- Reverse chain to rule integrate
INTEGRATION AND DIFFERENTIATION 2
OPEN INTEGRATION AND DIFFERENTIATION 2
DOWNLOAD INTEGRATION AND DIFFERENTIATION 2 PDF
Includes:
- Power rule
- Chain rule
- Tangents and normal to the curve
- Stationary points and first derivative (Max/min/point of inflection)
- Second derivative (concavity/nature of stationary points/ point of inflection)
- Sketch of the relationship between the curve, first and second derivative
- Sketching cubic graphs
- Optimisation / modelling
- Definite integrals (area / volume)
SEQUENCES AND SERIES
OPEN SEQUENCES AND SERIES - WITH EXAMPLES
DOWNLOAD SEQUENCES AND SERIES - WITH EXAMPLES PDF
Includes:
- Arithmetic sequences and series
- Geometric sequences and series
- Sigma notation
- Quadratic sequences
- Examples of the following:
- Finding the position
- Finding the value
- Finding a formula for the nth term
- Examples of sigma notation
- Examples of the use of simultaneous equations
- Finding certain terms in a sequence
- Sum to n questions
- Sum to infinity questions
- Problem solving questions
- Problems with extra unknowns in the sequence or series
- Recurring decimals proof using sum to infinity
NATURE OF ROOTS
OPEN NATURE OF ROOTS - WITH EXAMPLES
DOWNLOAD NATURE OF ROOTS - WITH EXAMPLES PDF
- Includes notes and examples using the discriminant to comment on the nature of the roots of quadratic functions
POLYNOMIALS
Includes:
- Factoring cubic functions
- Factor and remainder theorem
TRIGONOMETRY
Includes:
- Trig graphs
- Unit circle
- Pythagorus
- Special triangles
- Area rule
- Cos rule
- Sin rule
- Reduction formulae
- Co-ratios
- Cartesian plane quadrants in degrees and radians
- Converting to degrees or radians
- Quotient identity
- Pythagorean identity
- Double angle formulae
- Compound angle formulae
- General solution
STATISTICS
Still to add