We host a variety of A-Level Maths Past Papers and Mark Schemes for teachers and students to prepare with. This section contains papers from Edexcel covering 2007-2018. These papers can be used for testing your knowledge and are an ideal way to practise and revise. Click on the relevant module/blue button to access a list of past exam PDFs.

If you are preparing for the 2019 A-Level Exams we would strongly recommend the New Specification and IAL Modules. These contain many questions that are relevant for the new exam.

Module Letters

C = Core Mathmatics

M = Mechanics

S = Statistics

**Pure & Applied Papers**

A-Level Sample Papers for 2018 onwards. Click Blue Button to see all available papers.

**Pure & Applied Papers**

A-Level Sample Papers for 2018 onwards. Click Blue Button to see all available papers.

These papers contain hundreds of questions related to the new 2019 A-Level.

Differentiation & Integration (stationary points&their nature, modelling), Geometric & Arithmetic Sequences, Sectors. Trigonometry, Logs, Cubics (factor theorm and polynomial division), Coordinate Geometry, Circles, Transformations of Functions, Binomial Expansion

Further Differentiation & Integration, Parametric Equations (calculus, finding Cartesian, etc.). Further Trigonometry (double angle, harmonic from etc.), Functions, Further Binomial Expansion, Partial fractions and Algebraic Fraction Manipulation, e and ln (calculus, rates&modelling), Numerical Methods (iterations, trapezium rule), Vectors (questions involving 3D lines no longer relevant, check spec)

Forces & Friction incl. Slopes & Connected Particles, Projectiles with Constant Acceleration Incl. Vectors, Moments, Velocity-Time Graphs, Momentum

Projectiles with Variable Acceleration With Angles, Ladders & Hinges, Variable Acceleration incl. Vectors, Work & Energy, Laminae, Further Momentum

Mean & S.D., Median, Quartiles & Interpolation, Probability (trees&Venn diagrams), Normal Distribution, Regression & PMCC. Discrete Random Variable (E(X), Var(X), etc)

Normal Distribution incl. approximations, Binomial Distribution incl. Hypothesis Testing. PDF's and CDF's, Poisson Distribution, Continuous Random Variable

Differentiation & Integration, Quadratics, Algebraic Manipulation, Arithmetic & Iterative Sequences, Co-ordinate Geometry, Transformations of Functions

Further Differentiation (stationary points, tangents&normals), Further Integration (area under curve), Trapezium Rule, Sectors, Trigonometry, Circles, Logs, Binomial Expansion, Geometric Sequences, Cubics, Factor Theorem, Polynomial Division

Further Differentiation (chain rule, product rule, quotient rule), Further Integration (area under curve, finding y=f(x)), Further Trigonometry (double angle, harmonic form, etc.), Algebraic Fractions, Transformations of functions with graphs, Functions (inverse&composite, domain&range), Solving and sketching Modulus Functions, ln and e (differentiation&modelling, Iterations to find roots

Further Integration (by parts, substitution, areas, partial fractions, rates of change and solving differential equations), Implicit Differentiation, Parametric Equations (calculus, finding Cartesian, etc.). Further Binomial Expansion, Polynomial Division, Partial fractions, Vectors (questions involving 3D lines no longer relevant, check spec)

Forces & Friction incl. Slopes & Connected Particles, Projectiles with Constant Acceleration Incl. Vectors, Moments, Velocity-Time Graphs. momentum

Mean & S.D., Median, Quartiles & Interpolation, Probability (trees&Venn diagrams), Normal Distribution, Regression & PMCC. Discrete Random Variable (E(X), Var(X), etc)