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A-Level Further Maths 2017
PURE A-Level Videos
A: Proof
01. Proof by Induction
B: Complex Numbers
01. Introducing Complex Numbers
02. Working with Complex Numbers
C: Matrices
01. Introducing Matrices
02. The Zero and Identity Matrices
03. Matrix Transformations
04. Invariance
05. Determinants
06. Inverse Matrices
07. Simultaneous Equations
08. Geometrical Interpretation
The Exam Papers
AS Only
AQA
Specimen Material
Paper 1 Teaching Videos
OCR B (MEI)
2018
Core Pure Teaching Videos
Statistics a Teaching Videos
Specimen Material
Core Pure Teaching Videos
Statistics a Teaching Videos
FULL A-Level
OCR B (MEI)
Specimen Material
Core Pure Teaching Videos
Statistics Minor Teaching Videos
The Specifications
A-Level Maths 2017
AS only Videos
A: Proof
01. Proof
B: Algebra & Functions
01. Indices
02. Surds
03. Quadratics
04. Simultaneous Equations
05. Inequalities
06. Polynomials
07. Graphs & Proportion
09. Graph Transformations
C: Coordinate Geometry
01. Coordinate Geometry
02. Circles
D: Sequences & Series
01. Binomial Expansion
E: Trigonometry
01. Trigonometry
03. Trig Graphs
05. Trigonometric Identities
07. Trig Equations
F: Exponentials & Logarithmics
01. Exponentials
02. Exponential Models
03. Logarithms
04. Laws of Logarithms
05. Exponential & Logarithmic Equations
06. Reduction to Linear Form
07. Exponential Growth & Decay
G: Differentiation
01. Differentiation from First Principles
02. Differentiation
03. Gradients
H: Integration
01. Fundamental Theorem of Calculus
02. Indefinite Integrals
03. Definite Integrals
J: Vectors
01. Introducing Vectors
02. Magnitude and Direction of a Vector
03. Resultant and Parallel Vectors
04. Position Vectors
05. Vector Problems
K: Statistical Sampling
01. The Large Data Set and Sampling Methods
L: Data Presentation & Interpolation
01. Box Plots, Cumulative Frequency and Histograms
02. Scatter Graphs
03. Central Tendency and Variation
04. Outliers and Cleaning Data
M: Probability
01. Venn Diagrams, Tree Diagrams and Two-Way Tables
N: Statistical Distributions
01. Discrete Random Variables and The Binomial Distribution
O: Statistical Hypothesis Testing
01. Introducing Hypothesis Testing
02. Binomial Hypothesis Testing
P: Quantities & Units in Mechanics
01. Quantities and Units in Mechanics
Q: Kinematics
01. Displacement, Velocity and Acceleration
02. Graphs of Motion
03. SUVAT
04. Calculus in Kinematics
R: Forces & Newton's Laws
01. Introducing Forces and Newton's First Law
02. Newton's Second Law
03. Weight and Tension
04. Newton's Third Law and Pulleys
FULL A-Level Videos
A: Proof
01. Proof
B: Algebra & Functions
01. Indices
02. Surds
03. Quadratics
04. Simultaneous Equations
05. Inequalities
06. Polynomials & Rational Expressions
07. Graphs & Proportion
08. Functions
09. Graph Transformations
10. Algebraic Fractions
11. Modelling
C: Coordinate Geometry
01. Coordinate Geometry
02. Circles
03. Parametric Equations
04. Parametric Equation Modelling
D: Sequences & Series
01. Binomial Expansion
02. Sequences
03. Sigma Notation
04. Arithmetic Sequences
05. Geometric Sequences
06. Modelling with Sequences
E: Trigonometry
01. Trigonometry
02. Small-Angle Approximation
03. Trig Graphs
04. Further Trigonometry
05. Trigonometric Identities
06. Compound Angles & Equivalent Forms
07. Trig Equations
08. Proving Trigonometric Identities
09. Trigonometry in Context
F: Exponentials & Logarithmics
01. Exponentials
02. Exponential Models
03. Logarithms
04. Laws of Logarithms
05. Exponential & Logarithmic Equations
06. Reduction to Linear Form
07. Exponential Growth & Decay
G: Differentiation
01. Differentiation from First Principles
02. Differentiation
03. Gradients
04. Further Differentiation
05. Implicit Differentiation and Parametric Differentiation
06. Forming Differential Equations
H: Integration
01. Fundamental Theorem of Calculus
02. Indefinite Integrals
03. Definite Integrals
04. Integration as the Limit of a Sum
05. Reversing the Chain Rule, Integration by Substitution and Integration by Parts
06. Integration with Partial Fractions
07. Differential Equations
08. Differential Equations in Context
I: Numerical Methods
01. The Change of Sign Method
02. The x=g(x) method and the Newton-Raphson method
03. Numerical Integration
04. Numerical Methods in Context
J: Vectors
01. Introducing Vectors
02. Magnitude and Direction of a Vector
03. Resultant and Parallel Vectors
04. Position Vectors
05. Vector Problems
K: Statistical Sampling
01. The Large Data Set and Sampling Methods
L: Data Presentation & Interpolation
01. Box Plots, Cumulative Frequency and Histograms
02. Scatter Graphs
03. Central Tendency and Variation
04. Outliers and Cleaning Data
M: Probability
01. Venn Diagrams, Tree Diagrams and Two-Way Tables
02. Conditional Probability
03. Modelling with Probability
N: Statistical Distributions
01. Discrete Random Variables and The Binomial Distribution
02. The Normal Distribution
03. Appropriate Distributions
O: Statistical Hypothesis Testing
01. Introducing Hypothesis Testing
02. Binomial Hypothesis Testing
03. Sample Means Hypothesis Testing
P: Quantities & Units in Mechanics
01. Quantities and Units in Mechanics
Q: Kinematics
01. Displacement, Velocity and Acceleration
02. Graphs of Motion
03. SUVAT
04. Calculus in Kinematics
05. Projectiles
R: Forces & Newton's Laws
01. Introducing Forces and Newton's First Law
02. Newton's Second Law
03. Weight and Tension
04. Newton's Third Law and Pulleys
05. F=ma and Differential Equations
06. The Coefficient of Friction
S: Moments
01. Moments
Revision Tips Videos
Teaching Order
Enrolment Work
Year 1
01 - Linear Graphs
a. Introducing Coordinate Geometry
b. Finding the Midpoint
c. Finding the Distance between Two Points
d. Finding the Gradient
e. The Equation of a Line
f. Parallel and Perpendicular Lines
g. Sketching Linear Graphs
h. Perpendicular Bisectors
i. Intersection of Lines
j. An Application of Linear Graphs
02 - Quadratic Graphs
a. The Difference of Two Squares
b. Factorising Quadratics
c. Sketching Quadratics from Factorised Form
d. Completing the Square
e. Sketching Quadratics from Completed Square Form
f. Solving Quadratics
g. Using the Discriminant
h. Using the Quadratic Formula
i. Sketching Quadratics using the Quadratic Formula
j. Using Quadratic Methods for Solving
03 - Indices
04 - Surds
a. Simplifying Surds
b. Rationalising the Denominator
05 - Exponentials and Logarithms
a. Introducing Exponentials
b. Asymptotes
c. Introducing Logarithms
d. Laws of Logarithms
e. Solving Basic Exponential Equations
f. Solving More Complicated Exponential Equations
g. Solving an Inequality Problem
06 - e^x and ln(x)
a. Introducing e
b. The Natural Logarithm
c. The Laws of Logarithms
d. Exponential Equations
e. Logarithmic Equations
f. The Gradient Function of e^(kx)
07 - Exponential Growth & Decay
08 - Polynomials
a. Introducing Polynomials
b. Polynomial Division
c. The Factor Theorem
09 - Graph Sketching
a. Sketching Polynomials
b. Reciprocal Graphs
c. Finding Points of Intersection
d. Direct and Inverse Proportion
10 - Graph Transformations
a. An Investigation into Transformations
b. Translations
c. Stretches
d. Reflections
e. Examples of Transformations
11 - Circles
a. The Equation of a Circle
b. Sketching Circles
c. Completing the Square
d. Intersections with Circles
e. Circle Theorems
f. Perpendicular Bisectors
g. Tangents and Normals
12 - Reduction to Linear Form
13 - Inequalities
a. The Basics of Inequalities
b. Quadratic Inequalities
c. Discriminant Inequalities
d. Set Notation
e. Representing Inequalities Graphically
14 - Differentiation from First Principles
15 - Graphs of Motion
a. Position vs Displacement vs Distance
b. Velocity vs Speed
c. Acceleration and Deceleration
d. Displacement / Time Graphs
e. Velocity / Time Graphs
f. Acceleration / Time Graphs
g. Graphs of Motion
16 - SUVAT
a. Deriving the SUVAT formulae
b. Using the SUVAT formulae
c. Gravity
d. More Complicated SUVAT Problems
17 - Differentiating x^n
18 - Tangents and Normals
19 - Stationary Points
20 - Further Differentiation
a. Increasing / Decreasing
b. The Second Derivative Test
c. Types of Stationary Point
d. Convex & Concave
e. Points of Inflection
21 - Optimisation
22 - Integrating x^n
a. Integrating x^n
b. Finding the Constant of Integration
23 - The Trapezium Rule
24 - Definite Integrals and Areas
a. The Fundamental Theorem of Calculus
b. Finding Areas
c. Definite Integrals
d. Areas Between Two Curves
25 - Calculus in Kinematics
26 - Probability: Venn diagrams and Conditional Probability
a. Basic Probability Concepts and Notation
b. Venn Diagrams
c. Independent and Mutually Exclusive Events
d. Conditional Probability
27 - Probability: Tree Diagrams, Two-Way Tables and Histograms
a. Tree Diagrams
b. Two-Way Tables
c. Histograms
d. Conditional Probability
28 - Measures of Central Tendency and Variation
a. Discrete Data
b. Grouped Continuous Data
c. Comparing Data Sets
d. Variance and Standard Deviation
29 - Linear Coding & Identifying Outliers
a. Linear Coding
b. Identifying Outliers
c. Critiquing and Cleaning Data
30 - Box Plots, Cumulative Frequency & Histograms
a. Box Plots / Box and Whisker Diagrams
b. Cumulative Frequency Curves
c. Histograms
31 - Bivariate Data / Scatter Graphs
a. Bivariate Data
b. The Product Moment Correlation Coefficient
c. Regression Lines
d. Interpolation vs Extrapolation
32 - Binomial Expansion
a. The Factorial Function
b. Pascal's Triangle
c. Binomial Expansion
d. Finding a Coefficient
e. Approximating using Binomial Expansion
33 - Discrete Random Variables
a. Introducing Discrete Random Variables
b. Discrete Random Variables as Algebraic Functions
c. Discrete Uniform Distributions
d. Cumulative Distribution Functions
34 - The Binomial Distribution
35 - Binomial Hypothesis Testing
a. Introducing Hypothesis Testing
b. Binomial Hypothesis Testing
c. The Critical Region Method
36 - Sampling Methods & The Large Data Set
a. Sampling Methods
b. The Large Data Set
37 - Proof
a. Introduction to Proof
b. Proof by Exhaustion
c. Proof by Deduction
d. Disprove by Counter-Example
38 - SOHCAHTOA, Sine / Cosine Rules and the Area of a Triangle
a. SOHCAHTOA
b. The Sine Rule
c. The Cosine Rule
d. The Area of a Triangle
39 - Radians and Arc Length and Sector Area
a. Radians
b. Arc Length
c. Sector Area
40 - Vectors
a. Introducing Vectors
b. The Magnitude and Direction of a 2D Vector
c. The Angle Between Two Vectors
d. Resultant Vectors
e. Parallel and Unit Vectors
f. Collinear Points
g. Position Vectors
h. Vector Problems
41 - Forces and Newton's Laws
a. Introducing Forces
b. Force Diagrams
c. Resultant Forces
d. Newton's First Law
e. Newton's Second Law
f. Working with the SUVAT Equations
g. Weight and Tension
h. Newton's Third Law
42 - Blocks / Pulleys on a Slope
43 - Coefficient of Friction
44 - Trigonometry
a. Trig Graphs
b. Trigonometric Identities
c. Basic Trigonometric Equations
d. Quadratic Trigonometric Equations
e. Using tan(x) = sin(x) / cos(x)
f. Trigonometric Equations with Transformations
g. More Quadratic Trigonometric Equations
h. Using sin^2(x) + cos^2(x) = 1
i. sin(x) and cos(x) as Transformations of one another
Year 2
01 - Functions, Domain and Range
a. What is a Function?
b. The Domain and Range of a Function
c. One-to-One, Many-to-One, One-to-Many, Many-to-Many
d. Restricting the Domain
e. Even & Odd Functions
f. Set Notation and Interval Notation for Domain and Range
02 - Transformations (Combinations)
03 - Composite Functions & Inverse Functions
a. Composite Functions
b. Inverse Functions
04 - Modulus Functions
05 - Moments
a. Introducing Moments
b. Centre of Mass
c. Equilibrium of a Rigid Body
d. Tilting
06 - Inverse Trigonometric Functions
07 - cosec(x), sec(x) & cot(x)
a. Introducing & Sketching cosec(x), sec(x) & cot(x)
b. Trigonometric Identities
c. Solving Trigonometric Equations
08 - Compound Angle Formulae
09 - Double Angle Formulae
10 - The Chain Rule
11 - Connected Rates of Change
12 - The Product Rule
13 - The Quotient Rule
14 - Implicit Differentiation
15 - Reversing the Chain Rule
16 - Integration by Substitution
17 - Integration by Parts
a. Integration by Parts Once
b. Integrating ln(x)
c. Integration by Parts Twice
d. Tabular Method for Integration by Parts
e. Further Integration
18 - Algebraic Fractions
a. Simplifying Algebraic Fractions
b. Adding and Subtracting Algebraic Fractions
c. Simplifying using Polynomial Division
19 - Partial Fractions
a. Introducing Partial Fractions
b. Repeated Factors
c. Extensions
d. Partial Fractions with Binomial Expansion and Integration
20 - Numerical Methods
a. The Change of Sign Method
b. The x = g(x) Method
c. The Newton-Raphson Method
21 - Sequences and Series
a. GCSE Sequences Revision
b. Inductive Definitions and Recurrence Relations
c. Describing Sequences
d. Sigma Notation
e. Arithmetic Sequences
f. Arithmetic Series
g. Geometric Sequences
h. Geometric Series
i. Sum to Infinity
j. Modelling with Sequences
22 - Differential Equations
a. Solving Differential Equations
b. Differential Equations in Context
c. Forming Differential Equations
23 - 2D SUVAT
24 - 2D General Motion
25 - Projectiles
a. Introduction to Projectiles
b. Projectiles from the Ground - SUVAT method
c. Projectiles from a Height - SUVAT method
d. Derive a Formula for Maximum Height & Distance - SUVAT method
e. Projectiles from the Ground - Integration method
f. Projectiles from a Height - Integration method
g. Derive a Formula for Maximum Height & Distance - Integration method
26 - Binomial Expansion
a. Extending Binomial Expansion
b. The Range of Validity
27 - 3D Vectors
a. Introducing 3D Vectors
b. The Magnitude of a 3D Vector
c. The Angle Between Two 3D Vectors
d. Vector Problems
28 - Equivalent Forms Rsin(theta + alpha), Rcos(theta + alpha)
29 - Small Angle Approximation
30 - Differentiation from First Principles for sin(x) and cos(x)
31 - The Normal Distribution
a. Introducing the Normal Distribution
b. Finding Probabilities
c. The Inverse Normal
d. Normal to Binomial & Normal to Histogram
e. Approximating the Binomial Distribution
f. Points of Inflection of the Normal Distribution
32 - Parametric Equations
a. Introducing Parametric Equations
b. Cartesian to Parametric
c. Graphing Parametric Curves
d. Parametric to Cartesian
e. Ellipses
f. Modelling with Parametric Equations
33 - Parametric Differentiation and Integration
34 - Proof by Contradiction
35 - Normal Distribution Hypothesis Testing
a. Sample Means and Standard Errors
b. Hypothesis Testing
36 - PMCC Hypothesis Testing
The Exam Papers
AS ONLY
AQA
2018
Paper 1 Teaching Videos
Paper 2 Teaching Videos
Specimen Material
OLD LDS Paper 2 Teaching Videos
Paper 1 Teaching Videos
Paper 2 Teaching Videos
Edexcel
2018
Paper 1 Teaching Videos
Paper 2 Teaching Videos
Specimen Material
Paper 1 Teaching Videos
Paper 2 Teaching Videos
OCR A
2018
Paper 1 Teaching Videos
Paper 2 Teaching Videos
Specimen Material
Paper 1 Teaching Videos
Paper 2 Teaching Videos
OCR B (MEI)
2018
Paper 1 Teaching Videos
Paper 2 Teaching Videos
Specimen Material
Paper 1 Teaching Videos
Paper 2 Teaching Videos
Full A-Level
AQA
2018
Paper 1 Teaching Videos
Paper 2 Teaching Videos
Paper 3 Teaching Videos
Specimen Material
OLD LDS Paper 3 Teaching Videos
Paper 1 Teaching Videos
Paper 2 Teaching Videos
Paper 3 Teaching Videos
Edexcel
2018
Paper 1 Teaching Videos
Paper 2 Teaching Videos
Paper 3 Teaching Videos
Specimen Material
Paper 1 Teaching Videos
Paper 2 Teaching Videos
Paper 3 Teaching Videos
OCR A
2018
Paper 1 Teaching Videos
Paper 2 Teaching Videos
Paper 3 Teaching Videos
Specimen Material
Paper 1 Teaching Videos
Paper 2 Teaching Videos
Paper 3 Teaching Videos
OCR B (MEI)
2018
Paper 1 Teaching Videos
Paper 2 Teaching Videos
Paper 3 Teaching Videos
Specimen Material
Paper 1 Teaching Videos
Paper 2 Teaching Videos
Paper 3 Teaching Videos
The Specifications
CIE A-Level Maths 2020
2020 Specimen Papers
Paper 1 (Pure) Teaching Videos
Paper 2 (Pure) Teaching Videos
Paper 3 (Pure) Teaching Videos
Paper 4 (Mechanics) Teaching Videos
Paper 5 (Statistics) Teaching Videos
Paper 6 (Statistics) Teaching Videos
Core Maths Level 3 Certificate
Exam Papers
AQA Mathematical Studies
2016
2017
Specimen Papers
C&G Mathematical Modelling
Specimen 1
Specimen 2
Specimen 3
Edexcel Mathematics in Context
Specimen
OCR Quantitative Problem Solving
2016
2017
Specimen
OCR Quantitative Reasoning
2016
2017
Specimen
Glossary
Resources
Specifications
Teaching Videos
AQA Mathematical Studies Paper 1
AQA Mathematical Studies Paper 2A
Basics
Edexcel IAL Maths 2018
January 2019
Unit P1: Pure Mathematics 1 Teaching Videos
GCSE to A-Level Maths Bridging the Gap
Legacy A-Level Further Maths 2000
The Exam Papers
Decision Computation (DC)
OCR MEI
Differential Equations (DE)
OCR MEI
Mechanics 3 (M3)
OCR MEI
Mechanics 4 (M4)
OCR MEI
Mechanics 5 (M5)
OCR MEI
Mechanics 6 (M6)
OCR MEI
Numerical Analysis (NA)
OCR MEI
Numerical Computation (NC)
OCR MEI
Numerical Methods (NM)
OCR MEI
Pure 4 (P4)
Edexcel
OCR MEI
Pure 5 (P5)
Edexcel
OCR MEI
Pure 6 (P6)
Edexcel
OCR MEI
Statistics 3 (S3)
OCR MEI
Statistics 4 (S4)
OCR MEI
Statistics 5 (S5)
OCR MEI
Statistics 6 (S6)
OCR MEI
Legacy A-Level Further Maths 2004
AQA Videos
Further Pure 1 (FP1)
01. Roots of Quadratics
02. Complex Numbers
03. Matricies
04. General Solutions of Trig Equations
05. Reduction to Linear Form
06. Differentiation from First Principles
07. Integration
08. Series
09. Numerical Methods
10. Rational Functions
11. Conics
2011 June Exam Paper
2013 January Exam Paper
Further Pure 2 (FP2)
2013 January Exam Paper
Further Pure 3 (FP3)
2013 January Exam Paper
The Exam Papers
The Specifications
Legacy A-Level Maths 2000
The Exam Papers
Decision 1 (D1)
Edexcel
OCR MEI
Decision 2 (D2)
Edexcel
OCR MEI
Mechanics 1 (M1)
Edexcel
OCR MEI
Mechanics 2 (M2)
OCR MEI
Pure 1 (P1)
Edexcel
OCR MEI
Pure 2 (P2)
Edexcel
OCR MEI
Pure 3 (P3)
Edexcel
OCR MEI
Statistics 1 (S1)
OCR MEI
Statistics 2 (S2)
OCR MEI
Legacy A-Level Maths 2004
AQA Videos
Core 1 (C1)
01. Coordinate Geometry
02. Surds
03. Quadratics
04. Inequalities
05. Polynomials
06. Equations of Circles
07. Differentiation
08. Integration
2012 June Exam Paper
2013 January Exam Paper
2013 June Exam Paper
Core 2 (C2)
01. Indices
02. Differentiation & Integration
03. Logarithms
04. Graph Transformations
05. Sequences & Series
06. Binomial Expansion
07. Trigonometry 1
08. Trigonometry 2
2012 June Exam Paper
2013 January Exam Paper
2013 June Exam Paper
Core 3 (C3)
01. Exponentials & Logarithms
02. Functions
03. Modulus Functions
04. Graph Transformations
05. Trigonometry
06. Differentiation
07. Integration
08. Solids of Revolution
09. Numerical Methods
2013 January Exam Paper
2013 June Exam Paper
Core 4 (C4)
01. Partial Fractions
02. Parametric Equations
03. Binomial Expansion
04. Trigonometry
05. Differential Equations
06. Implicit Equations
07. Vectors
2013 January Exam Paper
2013 June Exam Paper
Decision 1 (D1)
01. Tracing an Algorithm
02. Sorting Algorithms
03. Graph Theory
04. Kruskal's Algorithm & Prim's Algorithm
05. Dijkstra's Algorithm
06. Bipartite Graphs
07. Chinese Postman Algorithm
08. The Travelling Salesperson Problem
09. Linear Programming
2010 January Exam Paper
2010 June Exam Paper
2013 January Exam Paper
2013 June Exam Paper
2014 June Exam Paper
Mechanics 1 (M1)
2013 January Exam Paper
2013 June Exam Paper
2014 June Exam Paper
Statistics 1 (S1)
01. Mean & Standard Deviation
02. Probability
03. Binomial Probability
04. The Normal Distribution
05. Central Limit Theorem & Estimation
06. Confidence Intervals
07. Linear Regression
08. The Product Moment Correlation Coefficient
OCR MEI Videos
Core 1 (C1)
01. Surds
02. Coordinate Geometry
03. Quadratics
04. Inequalities
05. Indices
06. Translations
07. Polynomials
08. Binomial Expansion
09. Equations of Circles
10. Proof
2016 June Exam Paper
Core 2 (C2)
01. Exponentials & Logarithms
02. Trigonometry 1
03. Differentiation 1
04. The Trapezium Rule & Integration
05. Sequences & Series
06. Graph Transformations
07. Trigonometry 2
08. Differentiation 2
2016 June Exam Paper
Core 3 (C3)
01. Exponentials & Logarithms
02. Functions
03. Modulus Functions
04. Differentiation Rules
05. Differentiating Functions
06. Implicit Differentiation
07. Integration
08. Proof
2013 January Exam Paper
2016 June Exam Paper
Core 4 (C4)
Section A
01. Trigonometry
02. Parametric Equations
03. Binomial Expansion
04. Vectors
05. Partial Fractions
06. Differential Equations
07. The Trapezium Rule & Volumes of Revolution
2016 June Exam Paper
Section B (Comprehension Paper)
08. The Comprehension Paper
2016 June Exam Paper
Statistics 1 (S1)
01. Probability
02. Mean and Standard Deviation
03. Discrete Random Variables
04. Permutations & Combinations
05. Binomial Probabilities
06. Hypothesis Testing
07. GCSE Recap & Odds and Ends
2016 June Exam Paper
Statistics 2 (S2)
01. Correlation & Regression
02. The Poisson Distribution
03. The Normal Distribution
04. The Chi-Squared Contingency Table Test
2016 June Exam Paper
The Exam Papers
The Specifications
Legacy GCSE Maths Foundation
01. Addition, Subtraction, Multiplication & Division
02. Rounding & Negative Numbers
03. Fractions
04. Primes, Factors, Multiples, Squares, Cubes & Reciprocals
05. Fractions, Decimals & Percentages
06. Time, Money, Best Buys, Currency Exchange & Simple Interest
07. Ratio & Speed, Distance, Time
08. Types of Data, Questionnaires & Bar Charts
09. Mean, Median, Mode & Range
10. Pie Charts & Steam and Leaf Diagrams
11. Frequency Polygons, Histograms & Scatter Graphs
12. Probability
13. Algebraic Expressions
14. Solving Equations & Trial and Improvement
15. Coordinates & Plotting Graphs
16. Sequences & Inequalities
17. Angles & Parallel Lines
18. Triangles & Symmetry
19. Quadrilaterals, Polygons & Tessellation
20. Bearings & Constructions
21. Circles
22. Compound Shapes, 3D shapes, Elevations & Nets
23. Translations, Reflections, Rotations & Enlargement
24. Pythagoras' Theorem & Metric to Imperial Conversion
WJEC A-Level Maths 2017
2019
Unit 1: Pure Teaching Videos
Unit 2: Applied Teaching Videos
Unit 3: Pure Teaching Videos
Unit 4: Applied Teaching Videos
Home
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A-Level Maths 2017
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FULL A-Level Videos
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D: Sequences & Series
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06. Modelling with Sequences
From the DfE Mathematics AS and A-Level Content (
LINK
):
Modelling with Sequences
D6-01 Modelling with Sequences: The Gardener Problem
D6-02 Modelling with Sequences: The Medicine Problem
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