Is AQA A-Level Further Maths 2026 Predicted Practice Paper — Paper 2 an official exam paper?

No. It is an original StudyVector predicted-practice paper for revision. It is not official, leaked or guaranteed, and students should still revise the full specification.

How many marks and questions are in this predicted paper?

This paper has 100 marks across 11 questions and is designed for a 120-minute practice session.

What are the A-Level Further Mathematics Paper 2 predictions for 2026?

StudyVector's 2026 A-Level Further Mathematics Paper 2 predicted paper focuses on complex numbers, matrices, hyperbolic functions, differential equations, proof. This is an independent, AQA-style predicted-practice paper modelled on the published specification — it is not a leaked paper and is not official.

What is the A-Level Further Mathematics Paper 2 format (7367/2)?

A-Level Further Mathematics Paper 2 (7367/2) is 100 marks over 120 minutes. 7367/2 model: 100 marks, 120 minutes.

Published 8 March 2026Updated 22 April 2026By Lizzie D., founderPrivacy Policy

Source note: use official specifications as the source of truth. StudyVector is an independent revision platform. AQA, Pearson Edexcel and OCR

Direct answer

This page hosts StudyVector’s independent 2026 A-Level Further Mathematics Paper 2 predicted-practice paper modelled on 7367/2,100 marks over 120 minutes. Predicted focus topics: complex numbers, matrices, hyperbolic functions, differential equations, proof. It is not an official paper, not a leaked paper and not a guarantee — students should still revise the full specification and verify against official past papers from AQA.

Qualification: A-Level Further Mathematics
Exam board model: AQA
Paper code: 7367/2
Total marks: 100 marks
Time allowed: 120 minutes
Last reviewed: 16 May 2026

StudyVector is independent revision support, not affiliated with AQA, Edexcel, OCR, JCQ or any exam provider. Always verify topic coverage with your exam-board specification.

Predicted paper

AQA A-Level Further Maths 2026 Predicted Practice Paper — Paper 2

Q: Which topics are likely to come up in A-Level Further Mathematics Paper 2 2026?

Based on the AQA-style structure and recent paper patterns, StudyVector's prediction prioritises: complex numbers; matrices; hyperbolic functions; differential equations; proof. Students should still revise the full specification because exam boards rotate topics.

A-Level Further Mathematics · AQA-style · 120 minutes · 100 marks

Modelled component: 7367/2 · Calculator permitted

7367/2 model: 100 marks, 120 minutes.

Prediction type: predicted_paper · Evidence mode: historical · Full-length original StudyVector predicted-practice paper modelled on public exam-board structure. It is not official, leaked or guaranteed.

Evidence basis: public exam-board specification structure, historical topic weighting patterns, StudyVector practice-quality review.

AI-generated practice paper. Not an official AQA-style paper, not leaked exam content, and not an exam-board endorsement.

Predicted difficulty score (practice signal)

0–100 model (higher = more demanding)

Candidate focus topics (not guarantees)

complex numbers
matrices
hyperbolic functions
differential equations
proof

Preview mode

0/11 questions attempted · score 0/100 (0%)

120:00Warm up with cards Play Daily

Answer ALL questions. Write your answers in the spaces provided. You must write down all the stages in your working.

Section A

Short and medium-length questions. Answer ALL questions.

Question SECTION-A1 (4 marks)
A-Level Hyperbolic Functions problem. Answer this exam-style question on Hyperbolic Functions. You should show clear working, justify each step and give your final answer in a suitable form.
(Total for Question SECTION-A1 is 4 marks)
Question SECTION-A2 (5 marks)
A-Level Polar Coordinates problem. Answer this exam-style question on Polar Coordinates. You should show clear working, justify each step and give your final answer in a suitable form.
(Total for Question SECTION-A2 is 5 marks)
Question SECTION-A3 (6 marks)
A-Level Differential Equations problem. Answer this exam-style question on Differential Equations. You should show clear working, justify each step and give your final answer in a suitable form.
(Total for Question SECTION-A3 is 6 marks)
Question SECTION-A4 (7 marks)
A-Level Numerical Methods problem. Answer this exam-style question on Numerical Methods. You should show clear working, justify each step and give your final answer in a suitable form.
(Total for Question SECTION-A4 is 7 marks)
Question SECTION-A5 (8 marks)
A-Level differentiation problem. The curve C has equation y = x^3 - 6x^2 + 7x + 4. (a) Find dy/dx. (b) Find the coordinates of any stationary points. (c) Determine the nature of one stationary point.
(Total for Question SECTION-A5 is 8 marks)
Question SECTION-A6 (8 marks)
A-Level Complex Numbers (de Moivre) problem. Answer this exam-style question on Complex Numbers (de Moivre). You should show clear working, justify each step and give your final answer in a suitable form.
(Total for Question SECTION-A6 is 8 marks)
Question SECTION-A7 (9 marks)
A-Level Hyperbolic Functions problem. Answer this exam-style question on Hyperbolic Functions. You should show clear working, justify each step and give your final answer in a suitable form.
(Total for Question SECTION-A7 is 9 marks)
Question SECTION-A8 (10 marks)
A-Level Polar Coordinates problem. Answer this exam-style question on Polar Coordinates. You should show clear working, justify each step and give your final answer in a suitable form.
(Total for Question SECTION-A8 is 10 marks)

Section B

Extended multi-part questions. Answer ALL questions.

Question SECTION-B1 (12 marks)
A-Level Differential Equations problem. Answer this exam-style question on Differential Equations. You should show clear working, justify each step and give your final answer in a suitable form.
(Total for Question SECTION-B1 is 12 marks)
Question SECTION-B2 (13 marks)
A-Level Numerical Methods problem. Answer this exam-style question on Numerical Methods. You should show clear working, justify each step and give your final answer in a suitable form.
(Total for Question SECTION-B2 is 13 marks)
Question SECTION-B3 (18 marks)
A-Level differentiation problem. The curve C has equation y = x^3 - 12x^2 + 13x + 4. (a) Find dy/dx. (b) Find the coordinates of any stationary points. (c) Determine the nature of one stationary point.
(Total for Question SECTION-B3 is 18 marks)

Train weak areas

Turn this paper into targeted practice. Start with the topics where you lost marks, then come back and resit the same style of question.

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Direct answer

Qualification

A-Level Further Mathematics

Exam board model

AQA

Paper code

7367/2

Total marks

100 marks

Time allowed

120 minutes

Last reviewed

16 May 2026

StudyVector is independent revision support, not affiliated with AQA, Edexcel, OCR, JCQ or any exam provider. Always verify topic coverage with your exam-board specification.

AQA A-Level Further Maths 2026 Predicted Practice Paper — Paper 2

A-Level Further Mathematics · AQA-style · 120 minutes · 100 marks

Modelled component: 7367/2 · Calculator permitted

7367/2 model: 100 marks, 120 minutes.

Evidence basis: public exam-board specification structure, historical topic weighting patterns, StudyVector practice-quality review.

Section A

Short and medium-length questions. Answer ALL questions.

Question SECTION-A1 (4 marks)

A-Level Hyperbolic Functions problem. Answer this exam-style question on Hyperbolic Functions. You should show clear working, justify each step and give your final answer in a suitable form.

(Total for Question SECTION-A1 is 4 marks)

Question SECTION-A2 (5 marks)

A-Level Polar Coordinates problem. Answer this exam-style question on Polar Coordinates. You should show clear working, justify each step and give your final answer in a suitable form.

(Total for Question SECTION-A2 is 5 marks)

Question SECTION-A3 (6 marks)

A-Level Differential Equations problem. Answer this exam-style question on Differential Equations. You should show clear working, justify each step and give your final answer in a suitable form.

(Total for Question SECTION-A3 is 6 marks)

Question SECTION-A4 (7 marks)

A-Level Numerical Methods problem. Answer this exam-style question on Numerical Methods. You should show clear working, justify each step and give your final answer in a suitable form.

(Total for Question SECTION-A4 is 7 marks)

Question SECTION-A5 (8 marks)

A-Level differentiation problem. The curve C has equation y = x^3 - 6x^2 + 7x + 4. (a) Find dy/dx. (b) Find the coordinates of any stationary points. (c) Determine the nature of one stationary point.

(Total for Question SECTION-A5 is 8 marks)

Question SECTION-A6 (8 marks)

A-Level Complex Numbers (de Moivre) problem. Answer this exam-style question on Complex Numbers (de Moivre). You should show clear working, justify each step and give your final answer in a suitable form.

(Total for Question SECTION-A6 is 8 marks)

Question SECTION-A7 (9 marks)

A-Level Hyperbolic Functions problem. Answer this exam-style question on Hyperbolic Functions. You should show clear working, justify each step and give your final answer in a suitable form.

(Total for Question SECTION-A7 is 9 marks)

Question SECTION-A8 (10 marks)

A-Level Polar Coordinates problem. Answer this exam-style question on Polar Coordinates. You should show clear working, justify each step and give your final answer in a suitable form.

(Total for Question SECTION-A8 is 10 marks)

Section B

Extended multi-part questions. Answer ALL questions.

Question SECTION-B1 (12 marks)

A-Level Differential Equations problem. Answer this exam-style question on Differential Equations. You should show clear working, justify each step and give your final answer in a suitable form.

(Total for Question SECTION-B1 is 12 marks)

Question SECTION-B2 (13 marks)

A-Level Numerical Methods problem. Answer this exam-style question on Numerical Methods. You should show clear working, justify each step and give your final answer in a suitable form.

(Total for Question SECTION-B2 is 13 marks)

Question SECTION-B3 (18 marks)

A-Level differentiation problem. The curve C has equation y = x^3 - 12x^2 + 13x + 4. (a) Find dy/dx. (b) Find the coordinates of any stationary points. (c) Determine the nature of one stationary point.

(Total for Question SECTION-B3 is 18 marks)