Read your relevant specification here to know what you have to learn. We currently have the following maths notes on A-Level Maths Core 3 (C3).

- Absolute Value Graphs
- Algebraic Fractions
- Applications of Simpson’s Rule
- Composing Functions
- Curves and Maxima/Minima/Stationary Points/Turning Points
- Definite Integrals
- Differential Equations
- Differentiation – The Chain Rule
- Differentiation – The Product Rule
- Differentiation – The Quotient Rule
- Examples of Domains and Ranges
- Exponential Functions
- Exponential Quadratic Equations
- Expressing Functions of the Formin the Form
- Finding Multiple Solutions of Trigonometric Equations
- Finding Roots Using Iteration Formulae
- Finding the Equation of a Curve After Reflection in the Line x=k
- Finding the Equation of a Curve After Reflection in the Line y=k
- Finding the Equation of the Line of Symmetry of a Graph
- Formulae Used in Trigonometric Proofs
- Functions
- Functions Which Cannot be Integrated
- Functions, Domain and Codomain
- Implicit Differentiation
- Integration by Parts
- Integration by Substitution
- Integration Problems Involving Differences of Areas
- Integration Using Two Substitutions
- Inverting Functions
- Logarithms
- Numerical Solutions to Equations
- Odd and Even Functions
- Partial Fractions
- Practical Exponential Questions
- Proof of Quotient Rule
- Proof of Simpson’s Rule
- Proof of the Chain Rule
- Proof of the Compound Angle Formula for cos(A-B)
- Proof of the Compound Angle Formula for cos(A+B)
- Proof of the Compound Angle Formula for sin(A+B)
- Proof of the Product Rule
- Properties of Integration
- Rates of Change
- Reciprocal Trigonometric Functions
- Reciprocal Trigonometric Functions
- Relationships Between the Values of Trigonometric Functions
- Solids or Volumes of Revolution
- Solving Absolute Inequalities
- Solving Absolute Value Equations
- Tangents and Normals
- The Graph of a Function When the Modulus of x is Used
- The Mid Ordinate Rule
- The Trapezium Rule
- Transformations of Graphs
- Trigonometric Equations with Reciprocal Functions
- Trigonometric Identities
- Using the Angle Sum Formulae to Solve Trigonometric Equations
- Using the Multiple Angle Formulae To Find Values of Trigonometric Functions

If you believe that there are any mistakes with the notes or that there are notes missing, then please contact us here. We advise you to use the search bar for our website on the right to find any notes that you think are missing from this section as those particular notes might be somewhere else on this website. These notes are for all A-Level specifications but we have found it difficult to accommodate each specification for each module so contact us if you have a solution or if there are notes missing for a specification that you think should be here. We are trying to make this a maths website for all. Any help or feedback will be appreciated.