Course Library

Foundations

Grades 6–8

Intermediate

Grades 9–10

Advanced

Grades 11–12

Numbers and Arithmetic

The Integers

Commutative, Associative and Distributive LawsComing soon

Order of OperationsComing soon

The Number LineComing soon

Arithmetic with Negative NumbersComing soon

Properties of ZeroComing soon

Absolute ValueComing soon

Place ValueComing soon

Divisibility and Primes

Factors and Multiples Divisibility Rules Prime Numbers The Distribution of Primes Lowest Common Multiples Greatest Common Factors

Fractions

IntroductionComing soon

Fraction ArithmeticComing soon

Mixed NumbersComing soon

Dividing FractionsComing soon

Decimals

IntroductionComing soon

Adding and Subtracting DecimalsComing soon

Ordering DecimalsComing soon

Multiplying and Dividing DecimalsComing soon

Converting Decimals and FractionsComing soon

RoundingComing soon

Rates, Percentages and Ratios

Ratios and MixturesComing soon

PercentagesComing soon

Percentage Increase and DecreaseComing soon

InterestComing soon

Ratios and RatesComing soon

Roots and Exponents

Square and Cube RootsComing soon

Rational and Irrational NumbersComing soon

Powers and ExponentsComing soon

Large and Small NumbersComing soon

Scientific NotationComing soon

Equations and Functions

Introduction to Algebra

IntroductionComing soon

Constants and VariablesComing soon

Manipulating ExpressionsComing soon

ModellingComing soon

Proportional Relationships

IntroductionComing soon

Direct and Inverse ProportionComing soon

Graphing Proportional RelationshipsComing soon

Constant of ProportionalityComing soon

Linear Equations

Reasoning with Tape DiagramsComing soon

Weighing and BalancingComing soon

Manipulating EquationsComing soon

Solving Linear EquationsComing soon

InequalitiesComing soon

Linear Functions

Input and OutputComing soon

Graphing FunctionsComing soon

Slope and InterceptComing soon

Parallel and Perpendicular LinesComing soon

Linear FunctionsComing soon

Piecewise Functions and Systems of EquationsComing soon

Geometry

Area and Shapes

IntroductionComing soon

Parallelograms and TrianglesComing soon

PolygonsComing soon

Circles and CircumferencesComing soon

Area of CirclesComing soon

Angles and Polygons

AnglesComing soon

Angles in PolygonsComing soon

Drawing Triangles

Pythagoras’ TheoremComing soon

The Coordinate PlaneComing soon

Transformations and CongruenceComing soon

3D Solids

IntroductionComing soon

Nets and Surface AreaComing soon

Prisms and PyramidsComing soon

Cylinders and ConesComing soon

SpheresComing soon

Units and Measuring

MeasuringComing soon

Units and ConversionComing soon

Scale DrawingsComing soon

Scaling and DimensionsComing soon

EstimationComing soon

Probability and Statistics

Introduction to Probability

IntroductionComing soon

Computing ProbabilitiesComing soon

Probability TreesComing soon

Venn DiagramsComing soon

Combinatorics

Factorials Permutations Combinations Winning the Lottery

Data and Statistics

IntroductionComing soon

Center and SpreadComing soon

Visualising DataComing soon

SamplingComing soon

Scatter Plots and Linear ModelsComing soon

Geometry

Euclidean Geometry

Introduction Euclid’s Axioms Ruler and Compass Construction

Even More ConstructionsComing soon

Angles and ProofsComing soon

Origami and Paper Folding

Transformations and Symmetry

Introduction Rigid Transformations

CongruenceComing soon

Symmetry Symmetry Groups and Wallpapers Symmetry in Physics Dilations

SimilarityComing soon

Triangles and Trigonometry

Introduction Properties of Triangles

Midsegments and SimilarityComing soon

Triangle Congruence Pythagoras’ Theorem

Isosceles and Equilateral TrianglesComing soon

Trigonometry Sine and Cosine Rules

Polygons and Polyhedra

Polygons Quadrilaterals Tessellations Polyhedra

Nets and Cross SectionsComing soon

Scaling Shapes and SolidsComing soon

Platonic Solids

Circles and Pi

Introduction Degrees and Radians Tangents, Chords and Arcs

The Circle TheoremsComing soon

Cyclic PolygonsComing soon

Spheres, Cones and Cylinders Conic Sections

Non-Euclidean Geometry

Spherical Geometry Map Projections Hyperbolic Geometry Metric Spaces Topology

Higher DimensionsComing soon

Algebra

Functions

Relations and FunctionsComing soon

Graphing and Interpreting FunctionsComing soon

Linear Functions and EquationsComing soon

Piecewise FunctionsComing soon

Absolute Value FunctionsComing soon

Inverse FunctionsComing soon

Rates of ChangeComing soon

Sequences and Patterns

Introduction Arithmetic and Geometric Sequences Figurate Numbers

Sequences as FunctionsComing soon

Fibonacci Numbers Special Sequences Pascal’s Triangle

Limits and ConvergenceComing soon

Quadratic Equations

Introduction

Binomial ExpressionsComing soon

Solving Quadratic EquationsComing soon

The Quadratic FormulaComing soon

Graphing QuadraticsComing soon

Projectile MotionComing soon

More ApplicationsComing soon

Inequalities and Systems of Equations

Systems of Linear EquationsComing soon

Row Operations and EliminationComing soon

Linear InequalitiesComing soon

Systems of InequalitiesComing soon

Quadratic InequalitiesComing soon

Exponential Functions

Carbon Dating

Exponential Growth and DecayComing soon

Comparing ModelsComing soon

Compound InterestComing soon

Population DynamicsComing soon

Probability and Discrete Mathematics

Probability

Introduction

Probability Trees and Venn DiagramsComing soon

Conditional ProbabilityComing soon

The Monty Hall Problem

The Birthday ProblemComing soon

True Randomness

Statistics and Data

Casino Mathematics

Data VisualisationComing soon

Center and Spread of DataComing soon

Sampling and EstimationComing soon

Spreadsheets and Frequency TablesComing soon

Linear ModelsComing soon

Graphs and Networks

Introduction The Bridges of Königsberg Handshakes and Dating Planar Graphs Map Colouring The Travelling Salesman Problem

Scheduling ProblemsComing soon

Graphs in Everyday Life

Codes and Ciphers

Introduction

Binary NumbersComing soon

Error DetectionComing soon

Secret CodesComing soon

The EnigmaComing soon

Public Key CryptographyComing soon

Game Theory

The Prisoners’ Dilemma

Cards, Coins and DiceComing soon

The Winning Move

Random WalksComing soon

Algebra and Analysis

Polynomials

IntroductionComing soon

Zeros of PolynomialsComing soon

Sketching Polynomial FunctionsComing soon

The Factor and Remainder TheoremsComing soon

Systems of EquationsComing soon

Function Transformations

Combining and Composing FunctionsComing soon

Translating FunctionsComing soon

Reflecting FunctionsComing soon

Scaling FunctionsComing soon

Inverse functionsComing soon

Rationals and Radicals

Rational and Irrational NumbersComing soon

Rational Functions and ExpressionsComing soon

Solving Rational EquationsComing soon

Exponent LawsComing soon

Radical FunctionsComing soon

Solving Radical EquationsComing soon

Exponentials and Logarithms

Exponential Growth and DecayComing soon

Exponential FunctionsComing soon

Introduction to LogarithmsComing soon

Laws of LogarithmsComing soon

The Number eComing soon

Logarithmic FunctionsComing soon

Sequences and Series

SequencesComing soon

Series and Sigma NotationComing soon

Arithmetic and Geometric SeriesComing soon

The Binomial TheoremComing soon

Logic, Sets and Proof

Logic and Paradoxes Axioms and Proof Proof by Induction Infinity and Hilbert’s Hotel

Geometry and Linear Algebra

Coordinate Geometry

Equations of LinesComing soon

Parallel and Perpendicular LinesComing soon

Equations of CirclesComing soon

Properties of PolygonsComing soon

TransformationsComing soon

Trigonometry

The Unit Circle DefinitionComing soon

Graphs of Trigonometric FunctionsComing soon

Amplitude, Frequency and TransformationsComing soon

Pythagorean IdentitiesComing soon

More Trigonometric IdentitiesComing soon

Inverse Trigonometric FunctionsComing soon

Circular MotionComing soon

Conic Sections and Polar Coordinates

Parametric CurvesComing soon

Circles and EllipsesComing soon

ParabolaeComing soon

HyperbolaeComing soon

Polar CoordinatesComing soon

Vectors

IntroductionComing soon

Vector ArithmeticComing soon

Scalar Products and Equations of PlanesComing soon

Cross Products and Equations of LinesComing soon

Geometry ProblemsComing soon

Matrices

Matrices as TransformationsComing soon

Matrix ArithmeticComing soon

DeterminantsComing soon

Matrix InversesComing soon

Cramer’s Rule and Gaussian EliminationComing soon

Eigenvalues and EigenvectorsComing soon

Complex Numbers

IntroductionComing soon

Complex ArithmeticComing soon

Quadratic, Cubic and Quartic EquationsComing soon

Euler’s IdentityComing soon

De Moivre’s Theorem and Roots of UnityComing soon

Fractals

Introduction The Sierpinski Triangle The Mandelbrot Set

Space Filling CurvesComing soon

Calculus

Differentiation

IntroductionComing soon

Limits and GradientsComing soon

Differentiation Rules IComing soon

Differentiation Rules IIComing soon

Optimisation problemsComing soon

Integration

IntroductionComing soon

Integration RulesComing soon

Definite Integrals and Areas under a CurveComing soon

Improper IntegralsComing soon

Solids of RevolutionComing soon

Numerical Methods

Solving Equations NumericallyComing soon

The Newton-Raphson MethodComing soon

Numerical IntegrationComing soon

Maclaurin and Taylor seriesComing soon

Differential Equations

Simple Differential EquationsComing soon

First Order Separable EquationsComing soon

Second Order Differential EquationsComing soon

Homogenous Equations and Particular IntegralsComing soon

Simple Harmonic MotionComing soon

Coupled Differential EquationsComing soon

Chaos Theory

Introduction

Mathematical BilliardComing soon

The Three Body ProblemComing soon

Phase Space and Strange AttractorsComing soon

The Logistic MapComing soon

Probability and Statistics

Random Variables

IntroductionComing soon

Discrete Random VariablesComing soon

Binomial and Poisson DistributionComing soon

Continuous Random VariablesComing soon

The Normal DistributionComing soon

The Central Limit TheoremComing soon

Statistics and Hypothesis Tests

Sampling and EstimationComing soon

Hypothesis Tests and Confidence IntervalsComing soon

Linear Models and Correlation CoefficientsComing soon

Contingency tables and Chi Squared TestsComing soon

Bayesian StatisticsComing soon

Algorithms

Introduction to ComputingComing soon

Complexity and O NotationComing soon

Sorting AlgorithmsComing soon

Linear Programming and the Simplex AlgorithmComing soon

Graphs, Trees and NetworksComing soon

Machine Learning

IntroductionComing soon

Linear RegressionComing soon

Support Vector MachinesComing soon

Neural NetworksComing soon

Unsupervised LearningComing soon

Log in to Mathigon

Course Library

Numbers and Arithmetic

The Integers

Divisibility and Primes

Fractions

Decimals

Rates, Percentages and Ratios

Roots and Exponents

Equations and Functions

Introduction to Algebra

Proportional Relationships

Linear Equations

Linear Functions

Geometry

Area and Shapes

Angles and Polygons

3D Solids

Units and Measuring

Probability and Statistics

Introduction to Probability

Combinatorics

Data and Statistics

Geometry

Euclidean Geometry

Transformations and Symmetry

Triangles and Trigonometry

Polygons and Polyhedra

Circles and Pi

Non-Euclidean Geometry

Algebra

Functions

Sequences and Patterns

Quadratic Equations

Inequalities and Systems of Equations

Exponential Functions

Probability and Discrete Mathematics

Probability

Statistics and Data

Graphs and Networks

Codes and Ciphers

Game Theory

Algebra and Analysis

Polynomials

Function Transformations

Rationals and Radicals

Exponentials and Logarithms

Sequences and Series

Logic, Sets and Proof

Geometry and Linear Algebra

Coordinate Geometry

Trigonometry

Conic Sections and Polar Coordinates

Vectors

Matrices

Complex Numbers

Fractals

Calculus

Differentiation

Integration

Numerical Methods

Differential Equations

Chaos Theory

Probability and Statistics

Random Variables

Statistics and Hypothesis Tests

Algorithms

Machine Learning

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