A-Level Maths Lessons (Full Term)

We’ll cover key algebra tools like proof by contradiction, partial fractions, and algebraic division. You’ll learn how to simplify tricky expressions and tackle challenging exam questions using these methods.

This lesson explores modulus graphs, transformations, and composite and inverse functions. We’ll practise sketching graphs accurately and applying them to real exam problems.

We’ll look at arithmetic and geometric sequences and series, sigma notation, and sums to infinity. You’ll also learn how to prove results using induction and apply these ideas to exam questions.

Learn how to expand brackets raised to powers, including fractional powers. We’ll apply these expansions to approximations and past-paper style problems involving error bounds.

We’ll work with angles measured in radians and apply them to arc lengths, areas of sectors, and small-angle approximations. These skills are essential for exam questions linking geometry and trigonometry.

This session introduces new trig graphs (sec, cosec, cot) and their inverses. You’ll learn how to solve equations involving these functions and apply them in exam contexts.

We’ll explore correlation coefficients and how to interpret regression lines in context. By the end, you’ll be able to spot trends in data and use them to make predictions in exam questions.

This lesson introduces conditional probability using set notation, Venn diagrams, and tree diagrams. You’ll practise applying the rules to structured problems that appear in exams.

We’ll look at the normal distribution curve, standardisation, and using tables to find probabilities. You’ll apply these skills to a range of probability questions.