SSS 3 Further Mathematics Scheme of Work | 1st & 2nd Term

Are you ready to take your mathematical skills to the next level? The SSS 3 Further Mathematics Scheme of Work covers a wide range of advanced topics designed to challenge your problem-solving abilities and prepare you for external exams such as WAEC and NECO.

This curriculum introduces critical concepts like matrices, polynomials, integration, and probability, equipping you with the mathematical tools needed to excel academically and in real-world applications.

As you enter your final year, this scheme is designed to sharpen your analytical mind and give you a solid foundation in advanced mathematics.

## SSS 3 Further Mathematics Scheme of Work for First Term

**Week 1: The Binomial Theorem**

- Introduction to the binomial theorem for positive integral index
- Expansion of binomial expressions
- Simple probability problems using binomial expansion formula

**Week 2: Probability**

- Application of binomial probability in solving problems
- Introduction to the binomial distribution formula: prx=r, nCr, pr n-r

**Week 3: Matrices**

- Matrix representation and notation
- Addition and subtraction of matrices
- Multiplication of a matrix by a scalar

**Week 4: Matrices (Continued)**

- Matrix multiplication techniques
- Solving simultaneous equations using determinants and matrix methods
- Linear transformation using matrices

**Week 5: Matrices (Continued)**

- Calculation of matrix determinants (2 x 2 and 3 x 3)
- Finding the inverse of a matrix4

**Week 6: Statics**

- Definition and types of forces
- Representation and composition of coplanar forces acting at a point
- Equilibrium conditions of forces

**Week 7: Statics (Continued)**

- Theorems of composition and resolution of forces
- Moments of forces and their application in static equilibrium

**Week 8: Binary Operation**

- Definition and theorem of binary operations
- Laws of binary operations: associative, commutative, and distributive laws

**Week 9: Binary Operation (Continued)**

- Binary operation identities and inverse elements
- Multiplication laws in binary operations

**Week 10: Polynomials**

- Definition of polynomials and their algebraic properties
- Addition and multiplication of polynomials
- Application of the remainder theorem and factorization of polynomials

**Week 11: Revision**

**Week 12: Examination**

**Week 13: Marking and Recording**

## SSS 3 Further Mathematics Scheme of Work for Second Term

**Week 1: Conic Sections**

- Introduction to ellipses, parabolas, and hyperbolas in Cartesian coordinates
- Parametric equations of conic sections

**Week 2: Integration as the Reverse of Differentiation**

- Integration of basic trigonometric functions
- Integration of polynomials and algebraic functions

**Week 3: Integration (Continued)**

- Techniques of integration: substitution and parts
- Introduction to definite integrals

**Week 4: Integration (Continued)**

- Application of integration to calculating areas and volumes
- Integration by partial fractions

**Week 5: Probability**

- Understanding independent, mutually exclusive, and conditional probabilities
- Exploring binomial distribution models

**Week 6: Correlation and Regression**

- Scatter diagrams and analysis of correlation (positive, negative, zero correlation)
- Ranking data and calculating regression equations

**Week 7: Variance**

- Calculating mean, variance, and coefficient of variance for probability distributions
- Application of binomial, Poisson, and normal distributions

**Week 8: Variance (Continued)**

- Mean, variance, and coefficient of variance for normal approximation by binomial distribution

**Week 9: Revision**

**Week 10: Examination**

**Week 11: Marking and Recording**

**Week 12: Closing**

## Overview of SSS 3 Further Mathematics Scheme of Work

This curriculum guides you through advanced topics in mathematics, including matrices, polynomials, and various forms of integration.

Each topic has been crafted to build critical thinking and problem-solving skills, preparing you for both abstract challenges and practical applications.

You are to delve into statics, probability, and correlation, giving you the confidence to approach and solve complex mathematical problems.

Through this scheme, you learn to work with depth on each subject, ensuring thorough preparation for exams.

With strong emphasis on both theory and application, you are well-equipped to excel in your final assessments.

## Recommended Textbooks for SSS 3 Further Mathematics

**Further Mathematics for Senior Secondary Schools**by M. O. Idowu

This comprehensive guide covers all essential topics in the SSS 3 curriculum, from matrices to integration. It provides practical examples that help students grasp complex concepts and offers step-by-step solutions to problems.**Modern Further Mathematics for Senior Secondary Schools**by O. A. Adeyemo

Known for its modern approach, this textbook incorporates recent innovations in mathematics to keep students up to date with evolving techniques. It features numerous exercises at the end of each chapter to reinforce understanding and ensure that you can apply mathematical concepts in real-life scenarios. The book’s focus on problem-solving strategies makes it ideal for you whose aim is to improve your critical thinking and analytical skills.**Essential Further Mathematics**by I. A. Adedokun

This well-structured textbook provides clear, easy-to-understand explanations of complex topics, such as polynomials, probability, and integration. Each chapter includes review questions and worked examples that are directly aligned with the SSS 3 syllabus, helping you prepare thoroughly for both classroom tests and final exams. With additional revision exercises, this book serves as a valuable tool for self-assessment and continuous learning throughout the academic year.

## Recap

Master important mathematical concepts like matrices, polynomials, and probability through this curriculum. Gain a deeper understanding of both theoretical and practical aspects of further mathematics.

Build strong analytical skills by applying the knowledge acquired to real-life problems and academic assessments.

Practice solving equations using advanced techniques like matrix methods, polynomial theorems, and integral calculus.

Prepare effectively for your final exams with ample exercises and resources tailored to the WAEC and NECO syllabus.

Excel in external exams by staying engaged with both classroom lessons and additional recommended textbooks.

**DISCLAIMER**: *Everything* *on this page is based on our research of what is obtainable for schools in all the states in the country, including government and some private schools. Schemes of work normally undergo a series of reviews and some schools modify them to suit their specific needs. *

*While we do all our possible best to keep up with the latest and **approved schemes of work** in the country, check the specific template your school uses. For example, some private secondary schools integrate the British curriculum. If you teach in such schools, expect to see slight changes to what we offer on this page. If you have any questions or require personalised support, kindly feel free to **contact us**. *