NECO Syllabus For Further Mathematics

NECO Syllabus For Further Mathematics

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If you registered for the NECO exams in 2025 and one of your subjects to write is Further Mathematics, I know you are here to read about the NECO Syllabus for Further Mathematics in 2025, so you can prepare very well for your exams and avoid unnecessary topics because your NECO exams starts in few days. I’m very happy to welcome you to Myteriarynews today. In this article we will list the NECO Syllabus for Further Mathematics in the 2025 NECO exams in tabular form so you can see it clearly and start revising on time because further maths needs extra attention to learn the formulas better so as to remmeber tham when you see the questions.

But before then lets quickly do an introduction about the NECO Syllabus generally before we talk about the main context of the article.

About NECO Syllabus

NECO Syllabus is an official summary of all the topics to be written for a particular subject in the NECO exams 2025. The NECO syllabus reduces the topics to be studied for the NECO exams so Students can focus more on particular topics that will be set in the NECO exams so as to help them prepare well for the examination.

NECO Syllabus For Further Mathematics

You will get a full breakdown of all the topics, recommended textbooks, and study tips to boost your scores.

FURTHER MATHEMATICS
TOPICSOBJECTIVES
Sets1.1 Idea of a set defined by a property, Set notations and their meanings
1.2 Disjoint sets, Universal set and complement of set
1.3 Venn diagrams, Use of sets And Venn diagrams to solve problems.
1.4 Commutative and Associative laws, Distributive properties over union
and intersection
SurdsSurds of the form √ , a√ and a+b√ where a is rational, b is a positive
integer and n is not a perfect square.
Binary OperationsProperties: Closure, Commutativity, Associativity and Distributivity,
Identity elements and inverses.
Logical Reasoning4.1 Rule of syntax: true or false statements, rule of logic applied to
arguments, implications and deductions
4.2 The truth table
Functions5.1 Domain and co-domain of a function
5.2 One-to-one, onto, identity and constant mapping
5.3 Inverse of a function
5.4 Composite of functions
Polynomial Functions6.1 Linear Functions, Equations and Inequality
6.2 Quadratic Functions, Equations and Inequalities
6.3 Cubic Functions and Equations
Rational Functions7.1 Rational functions of the form
Q(x) = ()
!() ,g(x) ≠ 0.
where g(x) and f(x) are polynomials
7.2 Resolution of rational functions into partial fractions
Indices and Logarithmic Functions8.1 Indices
8.2 Logarithms
Permutation And Combinations9.1 Simple cases of arrangements
9.2 Simple cases of selection of objects
Binomial TheoremExpansion of (a + b)n . Use of (1+x)n ≈1+nx for any rational n,
where x is sufficiently small. e.g (0.998)1/3
Sequences and Series11.1 Finite and Infinite sequences
11.2 Linear sequence/Arithmetic Progression (A.P.) and Exponential
sequence/Geometric Progression (G.P.)
11.3 Finite and Infinite series
11.4 Linear series (sum of A.P.) and exponential series (sum of G.P.)
11.5 Recurrence Series
Matrices and Linear Transformation12.1 Matrices
12.2 Determinants
12.3 Inverse of 2 x 2 Matrices
12.4 Linear Transformation
Trigonometry13.1 Trigonometric Ratios and Rules
13.2 Compound and Multiple Angles
13.3 Trigonometric Functions and Equations
Co-ordinate Geometry14.1 Straight Lines
14.2 Conic Sections
Differentiation15.1 The idea of a limit
15.2 The derivative of a function
15.3 Differentiation of polynomials
15.4 Differentiation of trigonometric Functions
15.4 Product and quotient rules.
Differentiation of implicit functions such as ax2 + by2 = c
15.5 Differentiation of Transcendental Functions
15.6 Second order derivatives and Rates of change and small changes (∆x),
Concept of Maxima and Minima
Integration16.1 Indefinite Integral
16.2 Definite Integral
16.3 Applications of the Definite Integral
Statistics17.1 Tabulation and Graphical representation of data
17.2 Measures of location
17.3 Measures of Dispersion
17.4 Correlation
Probability18.1 Meaning of probability
18.2 Relative frequency
18.3 Calculation of Probability using simple sample spaces
18.4 Addition and multiplication of probabilities
18.5 Probability distributions
Vectors19.1 Definitions of scalar and vector Quantities
19.2 Representation of Vectors
19.3 Algebra of Vectors.
19.4 Commutative, Associative and Distributive Properties.
19.5 Unit vectors.
19.6 Position Vectors.
19.7 Resolution and Composition of Vectors
19.8 Scalar (dot) product and its application
19.9 Vector (cross) product and its application
Statics20.1 Definition of a force
20.2 Representation of forces
20.3 Composition and resolution of coplanar forces acting at a point
20.4 Composition and resolution of general coplanar forces on rigid bodies
20.5 Equilibrium of Bodies
20.6 Determination of Resultant
20.7 Moments of forces
20.8 Friction
Dynamics21.1 The concepts of motion
21.2 Equations of Motion
21.3 The impulse and momentum equations
21.4 Projectiles

Studying with the NECO Syllabus For Further Mathematics is important because it provides a clear structure of the topics to focus on, exam format, and what is expected from students.

The NECO Syllabus For Further Mathematics is also aligned with WAEC standards, making it useful for students preparing for both exams. This makes it a reliable reference for mastering key topics and understanding how to approach the exam confidently.

NECO Recommended Textbooks for Further Mathematics

  • Spectrum New Further Mathematics (Scholastic Series) by T. R. Moses
  • New Further Mathematics Project (Volumes 1–3) by M. R. Tuttuh-Adegun et al. (Bounty Press Ltd)
  • Further Mathematics (NERDC) by U. M. O. Ivowi et al. (Longman Publishers)
  • WAEC & NECO Further Mathematics Past Questions & Answers

Tips for Success in NECO Further Mathematics 2025

Further Mathematics can seem challenging at first, but with the right approach and consistent study habits, you can succeed. Below are practical reading and preparation tips to help you score high in the NECO Further Maths exam:

1. Start With the NECO Syllabus For Further Mathematics

Begin by reading through the NECO Syllabus For Further Mathematics. It outlines exactly what you need to study and gives you a clear picture of what to expect in the exam.

2. Focus on Understanding Formulas, Not Cramming

Further Mathematics is not a subject you can memorize and pass. It requires deep understanding and continuous practice of Formulas. Break your study into small, manageable parts and go over each topic carefully.

3. Practice With Past Questions

Solve past NECO questions without checking the answers first. This helps you get used to the exam format, improve your speed, and build confidence.

4. Solve Problems Actively

Don’t just read worked examples, try solving them yourself. Even if you make mistakes at first, keep practicing until you understand the Formula.

5. Create a Personal Study Timetable

Plan your reading schedule and include specific time blocks for Further Mathematics. Consistent practice is the key to mastering the subject.

6. Study With Friends

Group study can help speed up learning. Teach each other, solve questions together, and encourage one another.

7. Tackle Difficult Topics Early

Identify topics you struggle with and spend extra time on them. Use online tutorials, textbooks, Tiktok or YouTube videos to gain a better understanding.

More NECO Updates

Make sure you use the recommended textbooks and NECO past questions to prepare for your examination; they will help you understand the exam format and question style.

Preparing with the NECO Syllabus For Further Mathematics gives you a structured guide to all the topics you need to study, outlines the exam format, and helps you use your study time effectively. Since the syllabus aligns with WAEC standards, it remains relevant for most Nigerian students. Make it a habit to solve the maths problems regularly to boost both your speed and help you remember the formulas.

Reading through past NECO/WAEC questions is one of the best ways to understand the question patterns. If any topic confuses you, don’t hesitate to ask your teacher or join a study group. Bookmark our website for updates and drop your questions in the comment section we’re always here to assist.