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Predicted paper
AQA A-Level Further Maths 2026 Predicted Practice Paper — Paper 1
A-Level Further Mathematics · AQA-style · 120 minutes · 100 marks
Modelled component: 7367/1 · Calculator permitted
7367/1 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.
82
0–100 model (higher = more demanding)
- Complex Numbers
- Matrices
- Further Algebra & Functions
- Further Calculus
- Proof
I completed a StudyVector A-Level Further Mathematics derived predicted-practice paper (2026) and scored 0/100. This is practice-only and not an official paper:
Section A
Short and medium-length questions. Answer ALL questions.
Question SECTION-A1 (4 marks)
A-Level Complex Numbers problem. Answer this exam-style question on Complex Numbers. You should show clear working, justify each step and give your final answer in a suitable form.
Question SECTION-A2 (5 marks)
A-Level Matrices problem. Answer this exam-style question on Matrices. You should show clear working, justify each step and give your final answer in a suitable form.
Question SECTION-A3 (6 marks)
A-Level Further Algebra & Functions problem. Answer this exam-style question on Further Algebra & Functions. You should show clear working, justify each step and give your final answer in a suitable form.
Question SECTION-A4 (7 marks)
A-Level differentiation problem. The curve C has equation y = x^3 - 5x^2 + 6x + 4. (a) Find dy/dx. (b) Find the coordinates of any stationary points. (c) Determine the nature of one stationary point.
Question SECTION-A5 (8 marks)
A-Level Proof problem. Answer this exam-style question on Proof. You should show clear working, justify each step and give your final answer in a suitable form.
Question SECTION-A6 (8 marks)
A-Level vectors problem. Points A, B and C have position vectors a = (7, 1, -1), b = (9, 4, 2) and c = (1, 8, 3). (a) Find vector AB. (b) Find the scalar product AB · AC. (c) Use your result to comment on the angle BAC.
Question SECTION-A7 (9 marks)
A-Level Complex Numbers problem. Answer this exam-style question on Complex Numbers. You should show clear working, justify each step and give your final answer in a suitable form.
Question SECTION-A8 (10 marks)
A-Level Matrices problem. Answer this exam-style question on Matrices. You should show clear working, justify each step and give your final answer in a suitable form.
Section B
Extended multi-part questions. Answer ALL questions.
Question SECTION-B1 (12 marks)
A-Level Further Algebra & Functions problem. Answer this exam-style question on Further Algebra & Functions. You should show clear working, justify each step and give your final answer in a suitable form.
Question SECTION-B2 (13 marks)
A-Level differentiation problem. The curve C has equation y = x^3 - 11x^2 + 12x + 4. (a) Find dy/dx. (b) Find the coordinates of any stationary points. (c) Determine the nature of one stationary point.
Question SECTION-B3 (18 marks)
A-Level Proof problem. Answer this exam-style question on Proof. You should show clear working, justify each step and give your final answer in a suitable form.
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